index	type	question	options	answer	category	l2-category	image	image_path
bio_0	MCQ	The researchers investigated the inheritance of two monogenic inherited diseases, A and B, and obtained related family genetic pedigree maps<image_1>. The incidence of A in the population is 1/289. I_1 does not carry the pathogenic gene of B, and XY homology is not considered. The following statement is incorrect:	['A. The inheritance of B disease cannot be autosomal recessive inheritance', 'B. The probability that the pathogenic gene of III_2 B comes from I_2 is 1', 'C. II_2 If you marry a normal woman, the probability of developing goiter in your offspring is 1/36', 'D. The probability of having a child suffering from both diseases in II_4 and II_5 is 1/16']	D	bio	遗传与进化_遗传的基本规律	['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bio_1	MCQ	Fruit flies have red eyes and white eyes (controlled by A and a), and their body colors are gray and black (controlled by B and b). A scientific research team used a pair of female and male fruit flies with both red eye and gray body to conduct a hybridization experiment. The offspring were cultured in a specific experimental environment. The zygote of a certain genotype was completely killed. The results are shown in the following table<image_1>. The following statement is incorrect ()	['A. The genes that control eye and body color are located on the X chromosome and autosome respectively', 'B. When cultured in a specific experimental environment, the red eyes and gray bodies in F_1 females were fatal', 'C. Cultured in a specific experimental environment, all F_1 females with red eyes and gray bodies were heterozygotes', 'D. The red-eye and black-body females in F_1 were selected to cross with white-eye and gray-body males, and the proportion of the offspring white-eye and black-body males was 1/24']	C	bio	遗传与进化_遗传的基本规律	['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bio_2	MCQ_OnlyTxt	There are many causes of ichthyosis (also known as snake dermatosis). One of them is a recessive genetic disease with X chromosome that occurs most frequently in men. The clinical manifestation is severe squamous xeroderma or tinea on the skin. The main mechanism is the lack of steroid sulfatase. According to surveys, the incidence of the disease in men is 1 in 10,000, and most of it occurs three months after birth. The following statement is correct	['A. Human genetic diseases can be accurately diagnosed through genetic testing', 'B. Pathogenic genes control the synthesis of steroid sulfatase, which in turn affects metabolism, indirectly controls the emergence of ichthyosis', 'C. The probability of carriers of the pathogenic gene in normal women is 1/10,001', 'D. The probability of a normal couple in the population marrying and having a sick child is 1 in 20,002']	D	bio	遗传与进化_遗传与人类健康	['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bio_3	MCQ	When spermatogonia undergoes mitosis, under special circumstances, non-sister chromatids of a pair of homologous chromosomes may also be exchanged. Mitosis of a spermatogonium cell in a male fruit fly with genotype AaBb (gene location is shown in Figure 1<image_1>) produces two daughter cells that both enter meiosis. If only one cell undergoes one exchange as shown in Figure 2 during this process<image_2>, only the chromosomes in the figure are considered and no other mutations occur. The following statement is wrong ()	['A. Whether the exchange occurs during mitosis or meiosis, this spermatogonia can produce four types of sperm cells', 'B. If spermatogonia divides to produce cells whose genome becomes aaBB, the exchange can only occur during mitosis', 'C. If spermatogonia divides to produce cells whose genome becomes aaBb, the exchange can only occur during meiosis', 'D. Whether the exchange occurs during mitosis or meiosis, the proportion of genetically recombined sperm cells is 1/2']	D	bio	遗传与进化_遗传的细胞基础	['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']	['bio_3_1.jpg', 'bio_3_2.jpg']
bio_4	MCQ	During meiosis I of a spermatogonia cell of an organism, if homologous chromosomes are abnormally synapsed, the homologous chromosomes with abnormally synapsed can enter one or two daughter cells; during meiosis II, if there are homologous chromosomes, the homologous chromosomes will separate and the sister chromatids will not separate. If there are no homologous chromosomes, the sister chromatids may or may not separate. The following figure <image_1>shows that the spermatogonia cells of this organism with genotype AaX^bY^B produced four sperm cells through meiosis, of which the genome of sperm cell 1 became Aa. Regardless of gene mutation and gene destruction, the following statement is incorrect ()	['A. This diagram shows that an exchange must have occurred during meiosis I', 'B. During the formation of sperm cell 1 from cell ①, sister chromatids in which genes A and a are located are not separated', 'C. There are up to 6 possibilities for the genetic composition of sperm cell 2', 'D. If the genome of sperm cell 4 becomes AaX^bX^b, then the genetic composition of cell ② should be AaX^bX^b']	D	bio	遗传与进化_遗传的细胞基础	['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bio_5	MCQ_OnlyTxt	Drosophila flies have three types of eyes: deep red eye, scarlet eye, and white eye. They are controlled by two pairs of alleles A/a and B/b. When the A and B genes exist at the same time, they appear as deep red eye. When only A or B genes exist, they appear as scarlet eye. When neither gene exists, they appear as white eye. Another pair of autosomal genes, T/t, is involved in sex determination in fruit flies. Homogenization of the t gene has no effect on male fruit flies, but it will cause the sex reversal of female fruit flies to become sterile male fruit flies. A homozygous female fruit fly with a white-eyed male fruit fly was crossed. F_1 male and female fruit fly were mated randomly. The phenotype and ratio of F_2 were deep-eyed female: deep-eyed male: gorilla red-eyed female: gorilla red-eyed male: white-eyed male =9:9:3:9:2. Crossover and XY homologous segments are not considered. The following statement is wrong ()	['A. Only one pair of A/a and B/b genes is located on the X chromosome', 'B. The three pairs of genes A/a, B/b, and T/t obey the law of free combination', 'C. The parent white-eyed male fruit fly contains both T gene and t gene', 'D. F_2 Deep red-eye female was crossed with white-eye male. In the offspring, the ratio of deep red-eye: scarlet eye: white-eye =6:5:1']	C	bio	遗传与进化_遗传与人类健康	['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kd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/B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bio_6	MCQ	Studies have shown that one of the two X chromosomes in the nucleus of normal women is randomly inactivated and condensed to form a deeply stained Pap body. Adrenoleukodystrophy (ALD) is a recessive genetic disease with the X chromosome (the causing gene is represented by a). 5% of female heterozygotes will have the disease. Figure 1 <image_1>shows the family genetic pedigree of a patient. The gene fragments related to the disease in the cells of the four female women in the figure were cut with enzymes that recognize specific base sequences (see Figure 2<image_2>), and the electrophoresis results of the products are shown in Figure 3<image_3>. What is wrong in the relevant description is ()	['A. Pap bodies exist in heterozygote cells of diseased females, but not in normal females', 'B. The a gene has one more restriction site than the A gene because of the addition or deletion of base pairs', 'C. If II-1 is married to a woman with the same genotype as II-4, the probability of developing ALD in the offspring is 2.5%', 'D. The electrophoresis results of the products after restriction digestion of the a gene corresponded to three bands of 217bp, 93bp and 118bp']	AB	bio	遗传与进化_遗传与人类健康	['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', 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XwLosvhbwZFZXQZAjyzCIZcxIzllTjOSAQOO9Y/w4sXuPA+paXeW1zbPNdXW5Z4HjOyR2wRuAzkGvQqKAPIm0jV5vhcngE2NwNSEgtGm8pvJ8gSbvN342429s5z2r1i1t0tLSG3j+5EgRfoBipaKACvnP9oqwvLvxPpDW1pPMosyCY4ywB3n0r6MowPSgD4O/sXVf+gZef9+G/wAKP7F1X/oGXn/fhv8ACvvDA9BRgegoA+D/AOxdV/6Bl5/34b/CvXv2eNPvbTxvqL3NpPCh05gGkjKgnzE45r6SwPQUuB6UAFFFFABXxf470jU5fH2vyR6ddujX8xVlhYgjeenFfaFJgelAHwf/AGJqv/QMvP8Avw3+FH9iar/0DLz/AL8N/hX3hgegowPQUAfB/wDYmq/9Ay8/78N/hX1P8Cree1+GdvFcQyRSC5mO2RSp+96GvScD0FLQAUUUUAY/itGk8IayiKWdrKYBVGSTsNfFP9gaz/0Cb7/wHf8Awr7upMD0FAHwl/YGsf8AQJvv/Ad/8KT+wdY/6BN9/wCA7/4V93YHoKMD0FAHwkNA1nP/ACCb7/wHf/CvuTTQV0u0BBBEKAg/7oqzgegpaACiiigDxz9oLRtU1nRNGj0zT7q9eO4kLrbxNIVG0cnA4rwL/hBvFn/Qtav/AOAcn+FfcFFAHw//AMIN4s/6FrV//AOT/Cj/AIQbxZ/0LWr/APgHJ/hX3BRQB8t/Bvwr4g0z4n6Xd3+iaja2yJNulmtnRVzEwGSRjqa+pKKKAPK/Cn/Jf/G3/Xrb/wDoCV6pXlfhT/kv/jb/AK9bf/0BK9UoAq6l/wAgu7/64v8A+gmvPvgR/wAkwtv+vmb/ANCr0HUv+QXd/wDXF/8A0E1598CP+SYW3/XzN/6FQB6XXMa/4Un8Q3Ejz65qNlCi4t47Gbytpxy7HHzHPbpge5rp64fxh4pggvv7CktdU+zumbue1spZMqf+WaMo4J7nsPfoAWPh/d6rrPw/tZNUupPtbeZEt2gAaRFYqsgyCMkAHOPeq3wxu7+88F3D3F3Ld3S3t1Gsty5YnbIQuT6V0GgataX+ifaLWyubKygJiiSeAxNtUDkIeQOw+lc78KFeHwtcwTQywyi/uJNksbIdrSEqeR0IoA5/xJ4O1bTLK3kj8aa/LqV7dR28caz7Yy7t8xAAyFC7j17V6xEnlQpHuZtqgbmOScetc5PDc6l4/tt8TLYaVamUOVwHnlyowe+1Fbp/frpqACuH8b/FHRvAeoW1nqdteSyXERlUwKpAGcc5IruK+a/2kv8AkatH/wCvI/8AoZoA7T/hovwp/wA+Gqf9+0/+Ko/4aL8Kf8+Gqf8AftP/AIqvmCigD6f/AOGi/Cn/AD4ap/37T/4qul8E/FXRfHerT6dptteRSwwGdjOqgbQwXsTz8wr47r2P9nD/AJHrUv8AsGt/6MjoA+nKKKKACvLNX+PPhrRtZvNMuLLUWmtJmhdkRdpKnBx83SvU6+IvH3/JQfEP/YQm/wDQzQB77/w0X4U/58NU/wC/af8AxVH/AA0X4U/58NU/79p/8VXzBRQB9P8A/DRfhT/nw1T/AL9p/wDFV6F4Q8V2XjPQU1jT4po7d5GjCzABsqcHoTXw9X1j8A/+SXW//XzN/wChUAenUUUUAVdRvo9M0y6v5gzRW0TSuF6kKMnH5V5T/wANF+FP+fDVP+/af/FV6P4u/wCRN1v/AK8Zv/QDXwzQB9P/APDRfhT/AJ8NU/79p/8AFUf8NF+FP+fDVP8Av2n/AMVXzBRQB9P/APDRfhT/AJ8NU/79p/8AFV65BMtxbxTKCFkQOAeuCM18CDrX3rpn/IJs/wDrgn/oIoAtUUUUAFFFFABRRRQAUUUUAeV+Ff8Akv8A42/69bf/ANASvVK8r8K/8l/8a/8AXrb/APoCV6pQBV1L/kF3f/XF/wD0E1598CP+SYW3/XzN/wChV6DqX/ILu/8Ari//AKCa8++BH/JMLb/r5m/9CoA9LoxRXFfFOe+sfBF1qFhqNzZzW7xf6ggbw0iqQTjPQnoRQB2tFRTxtNbvGsrwsy4EkeNy+4yCP0rj/hhfX1/4QllvruW7uEvrmMSzNliFkIH8qAO1orx/T/EN/qGm/Zor2+XxvHqASWzeRggXzMn5Pu+V5efmx+Oa9goAKxNb8H+H/ElxHPrGlW95LEuxGlBJUZzituuR8XfEjw94JvYLTWJLhJZ4/MTyoi4xnFACf8Ks8D/9C3Zf98n/ABo/4VZ4H/6Fuy/75P8AjXP/APC/fA3/AD8Xv/gMaP8Ahfvgb/n4vf8AwGNAHQf8Ks8D/wDQt2X/AHyf8a0tE8GeHfDl291pGk29nO6eWzxAglcg4/MCuN/4X74G/wCfi9/8BjW94S+JnhzxrqU1ho8tw08UJmYSwlBtBA6/UigDsaKKKACuWvPhv4Pv7ya7utAtJbiZzJJIwOWYnJJ5rqa861P42eDtI1S6066nvBcWsrRSBbckblODg0Aa3/CrPA//AELdl/3yf8aP+FWeB/8AoW7L/vk/41z/APwv3wN/z8Xv/gMaP+F++Bv+fi9/8BjQB0H/AAqzwP8A9C3Zf98n/Gug0jRdO0GwWx0u0jtbVWLCKPoCeprz/wD4X74G/wCfi9/8BjXb+GPE2m+LtGTVdKaRrVnZAZE2nIODxQBsUUUUARzwRXNvJBPGskUilHRhkMDwQa53/hXfg7/oWtM/8B1revryHTtPuL24JENvG0rkDJ2qMmvOP+F++Bv+fi9/8BjQB1P/AArvwd/0LWmf+A60f8K78Hf9C1pn/gOtct/wv3wN/wA/F7/4DGj/AIX74G/5+L3/AMBjQB1P/Cu/B3/QtaZ/4DrXSIixoqIoVVGAB2FeZf8AC/fA3/Pxe/8AgMa9MhlWeCOZM7JFDLn0IzQA+iiigAorl/GvjzSfAlpa3Oqx3LpcuUTyEDHIGeckVxn/AA0R4O/59tV/78L/APFUAet0V5J/w0R4O/59tV/78L/8VR/w0R4O/wCfbVf+/C//ABVAHrdFee+F/jJ4b8W+ILfRdPgv1uZw5QzRKF+VSxyQx7A16FQB5Z4V/wCS/wDjX/r0t/8A0BK9Tryzwr/yX/xr/wBelv8A+gJXqdAFXUv+QXd/9cX/APQTXn3wI/5Jhbf9fM3/AKFXoOpf8gu7/wCuL/8AoJrz74Ef8kwtv+vmb/0KgD0uuI+LTbvh5fwIrSTSvD5cUalmbEqE4A5OACa7eigCIXMLWv2gSp5JXdvzxj1zXDfCpnXwhdxBSlwL+5cJKpU4aQlSQecGu+ooA8Um0xr7R7a5MN/B8Q7e7/16wOGd9/IL42mHZ3zgD8j7Um7Yu/G7HOPWlooAK+a/2kv+Rq0f/ryP/oZr6UrmPE/gHw14uu4bnXLL7RNCnlxnznTC5z/CRQB8T0V9d/8AClPh/wD9Aj/yak/+Ko/4Up8P/wDoEf8Ak1J/8VQB8iV7H+zh/wAj1qX/AGDW/wDRkdesf8KU+H//AECP/JqT/wCKra8M/D3wx4S1CW90Sx+z3EkRidvOd8rkHGCT3AoA6qiiigAr4i8ff8lB8Q/9hCb/ANDNfbtcFqPwg8EapqVzf3mms9zcSNLK32lxlick4BoA+PaK+uf+FI/D/wD6Bbf+BUn/AMVR/wAKR8Af9Atv/AqT/wCKoA+Rq+sfgH/yS63/AOvmb/0KrH/Ckfh//wBAtv8AwKk/+KrsPDvh3S/C+krpmkQmG0V2cIXLck5PJNAGtRRRQBjeLv8AkTdb/wCvGb/0A18M1983dvBd2c1tcoHglQpIpOAVIwR+VcT/AMKr+Hf/AEBbL/v83/xVAHx5RX2H/wAKr+Hf/QFsv+/zf/FUf8Kr+Hf/AEBbL/v83/xVAHx4Otfeumf8gmz/AOuCf+giuN/4VX8O/wDoC2X/AH+b/wCKruokSKJI4wAiqFUDsBQA6iiigDw79pT/AJAOhf8AXzJ/6CK+ca+5/EHhXRPFMEMOtWEd5HCxaNXJG0ngngisD/hUPgP/AKF23/77f/4qgD43or7I/wCFQ+A/+hdt/wDvt/8A4qj/AIVD4D/6F23/AO+3/wDiqAPnv4G/8la0n/cn/wDRL19d1y+j/DrwnoGpxalpejQ215EGCSqzEjIIPU+hNdRQB5b4UH/F+/G5/wCna2/9ASvUq8u8J/8AJefHH/Xtbf8AoCV6jQBV1L/kF3f/AFxf/wBBNeffAj/kmFt/18zf+hV6DqX/ACC7v/ri/wD6Ca8++BH/ACTC2/6+Zv8A0KgD0uobqc21nNOEaQxxs4RerYGcCpqDjHPSgDyY63qTfC2Px7DqtwdRj/0qWAynyGXfhofL6AAcA43ZHWuh8YQte+H5Nak8UXujW6Wolt1tpREN5GRvPV88Db0rD17wnp3ieWLRfD9o8OmT3X2jUrpWdYNoOSsak7S7HqVHHrXWaxqfhuWWbw5qlo8uyEYhezd1dSOAhCkE/SgDR8Ly6hN4V0uXVnR9Qe2QzshBBbHJ44/KteuX+Hui3egeC7LT7wuJELsqOcmNGclVJ9QCK6igAr5y/aLvbq28UaQsFzNEpsySI3K5+c+lfRteO/GH4Z6/441zT7vSDaCKC3MT+fKVOdxPHBoA+bv7W1H/AJ/7r/v83+NH9raj/wA/91/3+b/GvSf+GfPGv97TP/Ag/wDxNH/DPnjX+9pn/gQf/iaAPNv7W1H/AJ/7r/v83+Nevfs73t3c+N9RSe5mlUacxAeQsM+YnrWV/wAM+eNf72mf+BB/+Jr0L4QfC/xB4I8T3moasbQwTWZhXyZSx3F1PTA4wpoA9oooooAK+LfHep38fj7X0S9uVVb+YBRKwAG8+9faVfN3in4F+LdY8V6rqVtLpogurqSaMPOwbazEjI29aAPHf7W1H/n/ALr/AL/N/jR/a2o/8/8Adf8Af5v8a9L/AOGevGn/AD10v/wIb/4mj/hnrxp/z00v/wACG/8AiaAPNP7W1H/n/uv+/wA3+NfVHwJnluPhlbyTSvI/2mYbnYk/e968h/4Z78af39M/8CG/+Jr3X4W+FtQ8H+CYdJ1Mwm5SaRz5LFlwxyOSBQB2lFFFAGN4uOPButEf8+M3/oBr4c86X/no/wD30a+7tZsG1TQ7/T1cRtc27whyMhSykZ/WvAf+GatS/wChjtf/AAHb/GgDw/zpf+ej/wDfRo86X/no/wD30a9w/wCGatS/6GO1/wDAdv8AGj/hmrUv+hjtf/Adv8aAPEBNLn/WP/30a+8dM/5BVn/1wT/0EV8+/wDDNWpf9DHa/wDgO3+NfQ1pCbezggJ3GONUz64GKAJqKKKACiiigAooooAKKKKAPLfCh/4v343H/Ttbf+gJXqVeWeFP+S/eNv8Ar1t//QEr1OgCG7iNxZzwqQDJGygntkYrxzQfh18TfDOmLpuk+KtLgtFdnVPJLYJOTyUzXtNFAHlP/CNfGD/octL/APAf/wC10n/CNfGD/octL/8AAf8A+116vRQB5R/wjXxg/wChy0v/AMB//tdH/CNfF/8A6HLS/wDwH/8Atder0UAeU/8ACNfGD/octL/8B/8A7XR/wjXxg/6HLS//AAH/APtderUUAeU/8I18YP8AoctL/wDAf/7XR/wjXxg/6HLS/wDwH/8AtderUUAeU/8ACN/GD/octK/8B/8A7XR/wjfxg/6HLSv/AAH/APtderUUAeU/8I38YP8AoctK/wDAf/7XR/wjfxg/6HLSv/Af/wC116tRQB5T/wAI38YP+hy0r/wH/wDtdH/CN/GD/octK/8AAf8A+116tRQB5T/wjfxg/wChy0r/AMB//tdH/CN/GD/octK/8B//ALXXq1FAHlP/AAjfxg/6HLSv/Af/AO10f8I38YP+hy0r/wAB/wD7XXqrfdNLQB5T/wAI38YP+hy0r/wH/wDtdH/CN/GD/octK/8AAf8A+116qe31paAPKf8AhG/jB/0OWlf+A/8A9ro/4Rv4wf8AQ5aV/wCA/wD9rr1aigDyn/hG/jB/0OWlf+A//wBro/4Rv4wf9DlpX/gP/wDa69WooA8p/wCEb+MH/Q5aV/4D/wD2uj/hG/jB/wBDlpX/AID/AP2uvVqKAPKf+Eb+MH/Q5aV/4D//AGuj/hG/jB/0OWlf+A//ANrr1aigDyn/AIRv4wf9DlpX/gP/APa6P+Eb+MH/AEOWlf8AgP8A/a69WooA8p/4Rv4wf9DlpX/gP/8Aa6P+Eb+MH/Q5aV/4D/8A2uvVqKAPKf8AhG/jB/0OWlf+A/8A9ro/4Rv4wf8AQ5aV/wCA/wD9rr1aigDyn/hG/jB/0OWlf+A//wBrpR4c+MAOf+Ex0o/9u/8A9rr1WigDzvwH4H8Q6F4r1jxB4i1S0vrvUIkjLW6Ffu46jAHQCvRKKKAP/9k=']	['bio_6_1.jpg', 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bio_7	OPEN	A certain type of crab (XY sex determined) has three body colors: light body color, intermediate body color, and dark body color, determined by a set of multiple alleles T^S, T^2, T^0. Another pair of alleles B/b affects crab survival. Neither of these two pairs is located on the Y chromosome. The relationship between related traits and genes is as follows<image_1>: An interest group conducted the following hybridization experiments using A (dark color female), B (intermediate color male), and C (light color male) as parents <image_2>to answer the following questions. In Experiment 1, the phenotype and proportion of randomly mated offspring were ()		Dark female: Intermediate female: Dark male: Intermediate male 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q2WDcDsPWgD0Giqen6lDqSSvDDdxiKQxn7TayQEn1AdQSPccVn22qXVprv9kaoUY3AaSxuUXaJVHLRsOzqOfRhyAMEUAblFFFAHn/AMU/+ZK/7Gux/wDZ69Arz/4p/wDMlf8AY12P/s9egUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRUc80UEJeaZYU6b2YAAngcnjrXKX2sa5pNmkc7W8skM7efdJDvBiIbyh5YZWaVjsG1eMnPA4oA6+iuRv9b1W1W3WLUtLMtxOkCGWxkVFckZR2Ep2NjoDjJwBV3xnqp0vw5Isd3Ha3l462dtK7hQkkh2hsn+6Mt+FAHQ0VxPjXxC3h/w/aQM99HdTXMEEMw2l5SJF3n5T3UNnIA5966e11Ga6ukRdNuUtni8xbpniKE9lwHLZxz0x70AX6K4nxP4gF5rMXh/TddtdLlt3S4v7uSRf3ag5WIAsMs+OfRc56ipdO8W7tZuhf65oB0mFAiTLIIpJJc84BkYbR0z3PTgcgHY0Vna1qkGlaY9xLKyF/3UTKhb943C9Ae+OelcS/iq9h8Kaxdz6gXmXT7UW5wq4mljwWyoznewPtjgCgD0eiuQ0SfX11S9tQkE8VqYLeVbi+ZirbAzSK3lZYlWX5TgZB6ZzTvFGvpo/iDRS9xMtsjTNeJCC2EERIZlHJAIzxk8UAdbRXn2o+LruWfg3ENsmuRWsD21pM3mwggSZYAq2W3DA549a7XT9Th1ITGGG7jET7D9ptZId3GcrvUbh7igC5RWfrl9d6Zol5e2OnvqN1DGXjtI22tKfQHB/kal0u6uL3SrW6u7NrK5liV5LZnDGJiOVJHXFAFuis3V3vDB5Wl3dtHqCYlWKfBWRAcEMOoHuOhx16HFbxDqEmryxebb2VoyCWF57YygRbATK7LIojUsSoDcnaaAOsorndJ1XULvxDcWM11YvFbQhpY1tnhl3MflK5dgyYB+YcE8Z4NRT6pJd+O10+1u2Mem2hmubWJ13TPIcICCeigEn3ZaAOnorirfxULn4kXWlxLeMILJUkt/l2ibcW6ltpOzHQ11EGon+zXvdQtpNNWMM0i3MkZKKP4iUZlxjnrQBdorzm08VS3lxfeIl8S6dbafJGEstNm2yMyKTiQgSKQ7k8DsNueenUeGtcOoWUMGoajpM2rlDJLBp84cKueOMk8ZAJ6ZoA3qK5PxXq97bXuk2lvaXyiTUE3SxSRKJI1RnZeXBxhecgD9KzNS8T39z4jSxS21GxFrps91d28bwNIAW2xuTvIwNrNgHPQY60Ad/RWF4a1PU77Trb+0tPmik+yxu92WiEczkfNtVXLD15A61zY8Z/YW8UsJJrmZJGk01WVnjkxDEQikf7Ui/LwTu4zzgA9BoriLDxRJH4k1IXv9pSpDp9s5gg024IEhMm8qmwsM4AGeuK7NJkkhSX5lVwGHmKUIz6g4IPsaAJKKZ50X/PRP++hSq6OcKyn6GgB1FcNrPj7UNF3ajL4XuX8ORyBZNSW5Teq5x5ghxuKZ75BxzjFdujrJGsiHKsAQfUGgB1FYkusanH4wt9ITQ5n02S2Mz6mJQEjcE/Jtxyenfv04rboAKKwV8SE+NR4cbT5oybJrsXLuu1wHC4ABJ798fSt6gAooooAKKKKACiiigAooooAKKKKACiiigAooooAK8/8Agl/ySHQv+3j/ANKJK9Arz/4Jf8kh0L/t4/8ASiSgDoPHf/JPPEv/AGCrr/0U1HgT/knnhr/sFWv/AKKWjx3/AMk88S/9gq6/9FNR4E/5J54a/wCwVa/+iloA6CiiigAooooAKKKKACiiigDz/wD5uF/7lT/27r0CvP8A/m4X/uVP/buvQKAMHUtN1C48WaTfW3lLb21vcJK8g3YZzHtAUEH+E8+1VtOS+/4TDXMXFvu8i1yfIbHST/brp6z7bTPs+t3+o+eW+1pEnl7cBNm7v3zuNAFfw3pdzpGmzQXTxPLJeXE+Ys4xJKzjr3wR/ia2KKKAOY8PuuneIdc0q5Oy4ubtr+33f8tomVQSvrtYEEduPUUvi64sk/s+2khdtRuLgQWcoiYiNpAVch8bQQm84J7Vu3en2l+YTdW8crQSCWFmHzRuO6nqD9O3FVtU0dNUutMne4liNhc/aVVMYdtjLhsjp8xNAHD/ABHF5Fo+qWGkXsgeS1ee9j8qIxwwBMc/JuLNjauW7E9FroPDpkur1/P1i8a/sAYLmzdIVQgjKP8ALGGKkcrhu5HUGtLUPD1reaBqOlQkwfbo3WWbG9yzDG4knLHHqegA6CrP9i6cdWh1VrSM6hDCYEuMYbYTkj35H4c+tAHNOv8AYniq+FlC1xdy6ajjIyZZTLJlnIHT19AMAdBXOMkFhrMsVmdQa+TTFuFuP7NuGaS589nLlQmdrEkHttJHavSE0wLr82q+cxMlsluIscAKzNnPvu/SkGlKPET6uZTua0W1Ee3gAOWzn8aAKumXp8QaClzfaVcWUwyZLW7jwUde4zwwyMg/Q8VheHdKvNV+HegQC9giRYrWcf6OWP7tlcD7467cZrtmAZSp6EYNczZeELrTbOKzsvFmuQWsK7IoglowRR0ALQEnHuSaALZtLm18Rf2vd3Fu1t9lW1ARCjb2kGOpIxz61yPioWsvxDt4blI5VMUL+Uyb8gR3fO3nOCR+Yro7rwjc6hCIL3xZrs9vvR2ixax7irBgN0cKsOQOhFbkemWEV5cXcdnAtzcqFnmEY3yADADHqQKAPLbaKxk0vSTpNnYXB/sC5+0EnYocLCCQQrAsO49c5INdv4a0zf4fEVxpllaR3VpEHksp2Ekw8sAlyEQqQMYIJPuKtz+F7CW5tCieRZ21pLaLawZiXY5TupGAAmMe9XrLSbXT5A1ubgYiWEI9zI6BV6YVmIB98ZoA5rw5pNv9p16zhRUhtNUjMMZBKjZbw7M9yAQD16gURQ6rJ4311LW+tIbg2FptkktGdR8038PmD371u2ehx2tzqUxnlb7bdfaSEYx7T5apjIPP3M/jS/8ACP6f9quLoLcie4jWKWRbyYFlXOBw3GNzdPWgDTXcEAcgtjkgYBP0rl/CsiXuu+JtStjmynu0iicfdkaOMI7D1G4bc/7NbD6Lavoy6SJLpbQKEOLlzIVH8JkJL89M5zjvVy2toLO1itrWFIYIlCRxxqFVVHQADoKAJa4rV7S+utUvJdEhuEtRhdSWN/KN4RjKxZHDheC4Izwucjcna0UAcl4ra1b4bXZso/KtfIQRR+WU2LuXA2kArjpjtUuo295r2vWstjIsVvpJeRJZU3RzXJUoFxkEqqs2SO5AB4IrY1zSl1vRrjTnlMSzgAuBkjBB/pV8AAAAAAdAKAOLsdSudU8X6FcXlhLYXK2d9FLBIc4ZZIVJU4G5TjIOBkEV2tYqaAw8UjW5dSuZljt3hhtXVNkW8qWIIUMc7V4JOOa2qAOY8RsuneIdD1u44sbfzraeQ/dh80LtdvQZUKT23eldDcyRJaSPKrSRbTuVIzIWHsqgk/QCpJI0ljaORFdHBVlYZBB6giobWxt7GySztIxBbxqVjROiD0HoB2HQUAc14SSHUtIa+0uWWx0+RvIs0jjAZYIvkXh1OOQ5wRn5ua5/Q5rq4vr7wxBNdXSWWozNqEzT+QkMLOZF2vEAxkO7oDgYbOOBXZ6X4bh0vQrTSI7y7a2t0KHDhGkyc5ZlAOcnsRmqOt+CbW/tl/si6k0O7SFrdZrKNdrRtnKOhGGXJJHQgnIIyaAE8Y2cDabHfyNvaKe2WIsciMGePcw9yMc+g9znnvF8qTpcanew3aukttDZR/ZJWCRGeNmckLgM5A4zkBVHUkV3Gp6T/aelxWTzmPZLDIXVevlur4x2ztx+NO1vSl1nTfsbSmJTLFIWC5PySK+Px24/GgDC8NatcDVbvRm07URYIzPZXktpJEmzPMTb1BBUn5T0K45yDRYWzwePtZjsjBAgsLUlTEWyS8xJ4Yc5yT611tYV94ba51iTVLTWtS024lhSGUWogZZFUsVyJY3wRuPTFAFObwzqI8NyaVDfWsha58/c8DJ1n80jIY+46VY8T3KXnhq5toZQPtjNZl8/cGSsjf8AAVVz+FL/AMI9qn/Q565/35sv/kep9N8M2VhpUmnzyT6ikrSvK98wkZzISXGAAoByeAAKAOC1a001NEcyRsuo3M8GopCQFJR7iNFIPXcqBE7Yz71u6bb7vFGpt/ZuqyGPUYjuS+2rF/o6fNIPNG8e2G69K1dR8EaJeadHaWtlb2HllRG9rEEKKJEdgNuMZ2DnqKtJ4U0uO4adPt4keVZnP9pXHzuoABYb8HgAYPHFAGVf6ZbWnjzR5bdXSW8+1yTOXZiW8tFBG4nAAAwBx7U3xFZTWUfh22t5IEgj1WFYl8okj5X6ndz71v3ukreaxp+oNMyfY0mUIB97zAB1zxjFFzoVheGA3AuJDBKJoybqX5XGQD973NAFixjvoopBf3UFxIZGKNDAYgqdlILtkj1yM+lYHiSRLrxP4Z0+A7ruO7a8cL1jhWN1Zj6Al1X3z7Vu2ml21jc3FxC1wZLjaZPNuZJBwMDCsxC/gBmmWGkWmnT3NxCrPc3Tbpp5WLO+OgyeijPCjAHYUAX6KKKAPP8A4p/8yV/2Ndj/AOz16BXn/wAU/wDmSv8Asa7H/wBnr0CgAooooAKKKKACiiigAooooAKKKKACiiigAooooAq6k9qmm3H26NpLVkKyoImkypGCNqgkjHtXJWtzAPB9vrcUtxbiZjJZQwRxtJIGGyGNfMVsEoFHbqc967K6g+02k0HmNH5qMm9PvLkYyPes/SvD9npdpp8I3zvY2628MspyVULjIHQE9yOe3SgDz7wuuppJf2Gu65cWk99qMqCa1jgCfaAqEpl42+bGNp77TwOK63xjYxf2ZHezOZJIZ7ZIy+MJmePc3Hc8ZPoOMc5uDwpp89lqVlqMaXttfXjXbRyLgKx24Awc8bRzVzVtKTVNOSyEphRZoZMqM8Rur4/HbigDhvF8qTpcanew3aukttDZR/ZJWCRGeNmckLgM5A4zkBVHUkVu+GtWuBqt3ozadqIsEZnsryW0kiTZnmJt6ggqT8p6Fcc5Brd1vSl1nTfsbSmJTLFIWC5PySK+Px24/GtCgDkrC2eDx9rMdkYIEFhakqYi2SXmJPDDnOSfWpJvDOojw3JpUN9ayFrnz9zwMnWfzSMhj7jpVy+8Ntc6xJqlprWpabcSwpDKLUQMsiqWK5Esb4I3Hpimf8I9qn/Q565/35sv/kegCj45u4H8NRT+aqxJfxKzsQACsm05P1BriEg0aPw9q8QtbVb8aXatDGYtr/6kBjjGQuTy2MZPqa9J07wrp1jZQ29x5upNDcvdpPf7ZHWViSWGAFXknG0ACp9W0G01Sx1CFUjt576IRTXKRjewHTJ4JxzjnvQBzmhWM7eKdWkfQ9IzDfRt5gmJaD9wgzH+65OD6r1P42tT021tfHOiXECMs95NcPM5dmJIg2jGSQAAOgwPbmtoeHtPWaWZPtaSSypNIyXsy72UADOH5GFAx0OOaffaSt9qum3zTMn2IykIB9/em3rnjFAHP+JLKaxs9DtreSBII9WthGpiJP3jyTu5Ock+tdPYx30aSi/uoLhjITGYYDEFTspBdskevH0qvc6FYXohFyLiTyZVmjzdS/K69D96prTS7ayu7i5ha5Ms4UP5t1JIvHTCsxC/gBmgA1bVbHQ9LuNS1K4FvZ267pZSCdo6dACT+FS2N7balYwXtnKs1tcRiSKRejKRkGnXVrb3trJbXcEVxbyrtkilQOjj0IPBFOhhit4UhhjSOKNQqIigKoHQADoKAOc8XXFkn9n20kLtqNxcCCzlETERtICrkPjaCE3nBPaub+I4vItH1Sw0i9kDyWrz3sflRGOGAJjn5NxZsbVy3Ynotdxqmjpql1pk73EsRsLn7SqpjDtsZcNkdPmJqHUPD1reaBqOlQkwfbo3WWbG9yzDG4knLHHqegA6CgDN8OmS6vX8/WLxr+wBgubN0hVCCMo/yxhipHK4buR1Bqq6/wBieKr4WULXF3LpqOMjJllMsmWcgdPX0AwB0FdL/YunHVodVa0jOoQwmBLjGG2E5I9+R+HPrQmmBdfm1XzmJktktxFjgBWZs59936UAebskFhrMsVmdQa+TTFuFuP7NuGaS589nLlQmdrEkHttJHau90y9PiDQUub7SriymGTJa3ceCjr3GeGGRkH6HirQ0pR4ifVzKdzWi2oj28ABy2c/jV9gGUqehGDQBxPh3SrzVfh3oEAvYIkWK1nH+jlj+7ZXA++Ou3Ga2zaXNr4i/te7uLdrb7KtqAiFG3tIMdSRjn1qpZeELrTbOKzsvFmuQWsK7IoglowRR0ALQEnHuSaLrwjc6hCIL3xZrs9vvR2ixax7irBgN0cKsOQOhFAFDxbbf2zrcGnZ/d+S1tx3ab7+PdYUc/wDAx61iyrps2sXk+mxTyRyaJciQROI2jZJAmxgGHC7QuOenfrXoF7oWk6k8T32m2l00UhkjM8KvtcjG4ZHXAHPsKy5fBWlSatJeKskMUlvJDJb28jwhy7BmYlGBOcYx0oAi8NWEc+lPDLYalBFcWcKPLNfFllBjwfLAkJjx6gLVbw5pNv8Aades4UVIbTVIzDGQSo2W8OzPcgEA9eoFdDp2h2WlSF7U3QJjWLbLeTSqFXoArsQPqBmo7PQ47W51KYzyt9tuvtJCMY9p8tUxkHn7mfxoAwoodVk8b66lrfWkNwbC02ySWjOo+ab+HzB7963dcsZL/ShAdK0zVX3KTBft5cRI/i+5Jz6DHfrS/wDCP6f9quLoLcie4jWKWRbyYFlXOBw3GNzdPWrtlaRWFnFaQeZ5UShU82VpGx7sxLH8TQBxX/CLS/8ARPPBX/gUf/kOtnw5pD6ddTSN4Y0DSQyY8zTJt7vz0b9xHx+J+ldHRQBz/iG1TxHDJ4fXm3kK/b3HRI8hvLH+02APYEn0zuxGNokMRUx4G0qcjHtXITfCzwhcSzSzafdu8zF5CdTuvnJ6k/vO9ddBDHbQRwQoEijUIijoABgCgDPfxFpKeI4/DzXqDVZITOtttOSnrnGOx4znitSqx0+ybUF1A2lub1Y/LW4MY8wJ12hsZx7VZoA4yb/ktFp/2AZP/R612dYT+D9Gk8Rrr7R3f9pqMLML+cALnO3Zv27c/wAOMe1btABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV5/8Ev8AkkOhf9vH/pRJXoFef/BL/kkOhf8Abx/6USUAdB47/wCSeeJf+wVdf+imo8Cf8k88Nf8AYKtf/RS0eO/+SeeJf+wVdf8AopqPAn/JPPDX/YKtf/RS0AdBRRRQAjAlSASCR1Haqv2Sf/oI3P8A3zH/APEVPNI0SblheU5xtTGf1IFQ/a5/+gdc/wDfUf8A8XQBCumTDVIr1tWvmWONkNsfLET5xywCA5GODn+ZrQrLvNTv4Htxb6DeXIklCSlZoV8pO7nL849BzWpQAUUUUAef/wDNwv8A3Kn/ALd16BXn/wDzcL/3Kn/t3XoFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB5/wDFP/mSv+xrsf8A2evQK8/+Kf8AzJX/AGNdj/7PXoFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXn/AMEv+SQ6F/28f+lElegV5/8ABL/kkOhf9vH/AKUSUAdB47/5J54l/wCwVdf+imo8Cf8AJPPDX/YKtf8A0UtHjv8A5J54l/7BV1/6KajwJ/yTzw1/2CrX/wBFLQB0FFFFABRRRQAUUUUAFFFFAHn/APzcL/3Kn/t3XoFef/8ANwv/AHKn/t3XoFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB5/8U/8AmSv+xrsf/Z69Arz/AOKf/Mlf9jXY/wDs9egUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFef/BL/AJJDoX/bx/6USV6BXn/wS/5JDoX/AG8f+lElAHQeO/8AknniX/sFXX/opqw/BehajN4F8PSp4s1mBH0y2ZYo4rMqgMS/KN0BOB05JPqTW547/wCSeeJf+wVdf+imo8Cf8k88Nf8AYKtf/RS0AH/CPap/0Oeuf9+bL/5Ho/4R7VP+hz1z/vzZf/I9dBRQBz//AAj2qf8AQ565/wB+bL/5Ho/4R7VP+hz1z/vzZf8AyPXQUUAc/wD8I9qn/Q565/35sv8A5Ho/4R7VP+hz1z/vzZf/ACPXQUUAc/8A8I9qn/Q565/35sv/AJHo/wCEe1T/AKHPXP8AvzZf/I9dBRQB5P8A2Nf/APC9fs3/AAk2q+d/wjXmfa/LtfM2/acbMeTs255+7uz3xxXcf8I9qn/Q565/35sv/keuf/5uF/7lT/27r0CgDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDyf4k6Nf2//CI+b4m1W68zxLZxr50dqPKY78OuyFfmHbdleeQa7j/hHtU/6HPXP+/Nl/8AI9c/8U/+ZK/7Gux/9nr0CgDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9c/wDBL/kkOhf9vH/pRJXoFef/AAS/5JDoX/bx/wClElAHQeO/+SeeJf8AsFXX/opqPAn/ACTzw1/2CrX/ANFLR47/AOSeeJf+wVdf+imo8Cf8k88Nf9gq1/8ARS0AdBRRWJq76idUs4orr7Dp+xjLciSMM0pIEcYDq3XJPTsMUAbAmiaZoVlQyoAzIGG5QehI98H8qfXnMc32nxDpF5cT65Dqr3FxpRyLbEeF8xj/AKoB0OwEHrz0zkV11jp+rQavcy3ervdae0YSK2lhj3bupcsqr1zjbg9M55wADYqPz4ftHkeannbd/l7hu25xnHXGe9ed2EdjJrei3kljYW4iu9QmR4bZUIiiJiTJHU/MPrVye6SwmuPFdxcWq6izrElnJcIrfZs4EIJOBISd3+9hc4GaAO8oqppmoxarp8N7BHcRxyjIS4gaJx7FWAIq3QB5/wD83C/9yp/7d16BXn//ADcL/wByp/7d16BQAUyOaKVpFjlR2jba4VgSpxnB9DgisHUm1Z9YmSK5NpbLbgWipLEGu5uSy/OjYAAHOO57Vz2jSRXvie2uoLvXbe91fTzJK0qWy+WsL7drr5f3suRkZyB6UAehUViWdjqFvDqZ1nUV1C0lJMUMsKDy4wMEMVADZ6njjOOetcn4fe2g1Sw1WWwtIrldCWZ1tLdYy7zPkKAO+I8f4CgD0NZ4XmkhSVGljxvQMCVz0yO2akrgVvYfDBXWp7i3u7/UZib+2t5VeR8j5BEucuY1XG0csNxHOBXXvremQwQS3N7DarOm+NbpvJYj/dfBH0IoAv0Vmf8ACSaF/wBBrTv/AAKT/GmQeJ9CutVj0y31eymvZIzKkMUysxUdTx/nr6GgCzdaxpljN5N3qNpby4zslnVDj1wTUB8S6CoJOt6aAOpN0n+NWv7T08H/AI/bbP8A11X/ABrjllsfHInOtXEMWk2t3LClgLhdt0Y3KiSQgglcjhOBxk7uMAHdgggEHIPQ1ELq3JmAnizB/rRvH7vjPzenHPNZ1rrei/8ACPtqOn3VtJpdsjKGtiCihONoA9MYAHtXMeGh9t8IavqEunXK6jq7XD3KsilgQWjVM5xhVUADPYnHNAHeAhgCCCDyCKWuD0L7XdaR4VvrGw1SERW8KS+TcQrDLEY8HehfkA4IO0MPbmtrVZbaXWoSv2qDUrIq0RAIS4ST5NpI4ZdxyVOCCoPHUgHRUVw0EE1gwGqS3zpdXfkW063U8TSTOzsSYhIAkY4A5zxnvWz4Zt57Yai179rimM+DFPetcRogA2mNmOdpHPODnPHFAG750XnGHzE80LvKbhu29M49KRJ4pJJI45UZ4zh1VgSpxnBHbiuO8PXX9q654g1sJ9nkjkS2jluY8r9mVN6lcMCAxYsc44I9KyvButalq2ta9KBbWUl9Mr2zyQtJuAhTYSu5cZUhtufXnigD0qo454pmkEUqOY22OFYHa3XB9DyKwPEuu3nhvwxJc+V9u1BIgMxR7I93A3sCx2rk5xuJPQVysmif2fYxaRbWniC31PVJHkuL6O+VHlbG6WQKs+0MRwMjAyOuMEA9NpMjOMisrRNTW+F1afZbyB7B1t5DdMjM7bFbOVZs8MMk964HxbrCXmsalFPZti3tpLVTGjS7gJYGJbC/LnOMc/rQB6bJeWsU4gkuYUmYBhGzgMQTgHH1OPrU9eVa3djVdV1+dxeQwmOysY0NsD5kEkhD5DISpyWxyPug88V20ep2+j6Q15dX9/cxyXCwxC9gEL7ywQIq+WhIJ5BIOeucUAbcE8NzCs0EqSxN9142DKfoRSxyxzBjHIj7WKttYHBHUH3rzHQpddufDWh6TaQrGrTrcLcRXLReZAjMzqxUEr82xT1DB+3ONrwrLra/2p5Gn6aVbWp/PZ7xwQNw3bQIvmI7ZIz7UAdvRVWTUbeHUYbGVik0ylotwwsmOqg9NwHOOuOexxAuqC8sbybTIzdPBvSMZ2rLIB0VjwRngnpkH0oAvTTRW8ZkmlSOMYBZ2AAycDk+9Prhrlbu4trHSdU1G+uotTie0upLUW7xxTBCXjYeVkDAYA5PI59ado1vqer+CbCbRdb1GyMkapEbtLeXy0U7cnEeWOBxyOozigDt6ZLNFBC800iRxICzu7AKoHUknoK5nxAsB1fSIbm0sbotFPJcPPbq58uNM/Lnp8zLWLptrb3ngzQdAkMEFhJbRTagWIRWUgP5QHcsSM+i5z94UAehAhgCCCDyCKWuZ8PeIYJr+bQ8tcNakrFd26mWF0H8LOuQkiggFWxngjOeN6VLwyExTQInYPCWP57hQBYpskiRRtJI6oijLMxwAPUms+9ttYms5Y7TUrS2uGGEmNmZAh9dvmDNXHnjtoUN3cQoxGCzEIGPfAJ/TJoApf8ACSaF/wBBrTv/AAKT/Gp7TVtNv5WistQtLmRV3MkMyuQPUgHpWT4i8URaTZW72TWt1PcXMdsqm4VQm843n1A644z6iqen2vhnQ9VTUL3VbS513UHEH224lXzJGPSOMZwi8cKPbOTyQDqpp4reJpZ5UijXq7sFA/E07zE8wR713kbgueceuPSuN8aXkF7qmjeGpIJZ4Ly6SS8EYBAjUM6q2SOGZOnJIVuKXVZgvjzR5BpdxOJNOuoVACKeWiOBuYdgeOKAOzorn9EF5pml3y3VtqkkcMzvAt1NHNK0Z5wCrEkDnG4lsetY0lo81gsehXF5LZmdbqKDc8ZJdCREHBVoYxlXOckA7QOgoA7miuEu4nu7W4gtP7TMlpcR22oPBqk6tESqszxb3IYAMOuCBk8kYPdKAEUAkgDqTnNAHAfFP/mSv+xrsf8A2evQK8/+Kf8AzJX/AGNdj/7PXoFABRWF4jaynjhsb1ru2MpMkF5AMGJ0BbhhnadobqMEZHOcViXhu7W4vtY1I3bafHCLi48qeaDyVEYxHGquBI2clmOByAOhwAdxTGmiSRI2kRZJM7FLAFsdcDvXOaRZXEPiWZ5vtyQrbD7Puv5JYpgTliUdiVcYAxyAD1OSBTiuRrXxFn2RNjS7PbaTSIGjLu5WVh8wJI2BQfZuaAOu8+IzmDzU84LvMe4btvTOPSpK82sNfvLz4mXL4tktVthZRXRRiJCJWBO3dwPMBTryRXb/AGi80zSmlv3W/ulLbRaW5j8zJ+VQpZse5LY7nAoAvCeIzmASp5wUOY9w3BScA4644P5VJXlti5m0uTxbeaXqj6rqwjWKaK7EUcauwWGIBZgdoLDJIySSeO3WeGrh9PaHw9cRatJcx25uGutQljkLgtg8q7HqTgdgOtAHTEgdTUM93bWuz7RcRQ7yQnmOF3EAk4z14BP0FcV4u1gL4m02wktWeO2lWcSRguxMkNyuNgHbZnOe/tXPwaibiDw7HAt1bRadoUtxHItrnM4SNcbWQ8bWPOOj9aAPWgQwBBBB5BFMjnhmeRI5Udom2yBWBKHGcH0OCK5jws1tpmgLO+o3y2VrZxl4rq3EUMI27yUby1LDBx95gMetczbatqtzB4mk0m2ATVLhUt5vMKSwTSW8ATI7jDE5H3dh654APThLG0rRCRDIoBZAwyAehI/A0+uC04a5beL9Wjt7Kwluo9MtEDXF/Ic4M2CX8ok5PXj867qIyGFDMqrKVG9UbcAe4BIGR+AoAfRRRQAVHDPDcBjDLHIEYoxRgcMOCDjuPSsOLUNWvvEGrWNtPZQQ2LRBTLbPIzb0DHJEijr7Vl+EINYNjqJiv7BR/al3u3WTnJ81sn/WigDtKZFLHPGJIpFkRujIcg/jXHTa3qV38J7vWZJkivzZSyCS2UoEYbsEAk+g71PFbJZaxLpllplvdG5Q6jK13cFVV2IRtqiNgMkbj05JoA62mSyxwRNLNIkcaDLO5wFHqSa4O+kg1PSNEvZNLtbSX+3Y4tkRD/cmZM7tq9duelaHjm7jmTTtDeGWaHULuFLsRgfLCXHDZI4ZsL643YBxQB1ck8MKqZZUjDsFUswGSegHvUledePdVv7e60nSraK2uWF3b3EgVCghUSqIx1OSzZAHHCk9q7Owmu5v9Pkv7WbT5YFeJI7ZkYHruLFzkY7YHTrQBeknihMYllRDI2xAzAbmxnA9TwfyqSvO5HbxX4nubm+0jU5LPRZQlpDFKkJErIGMzfvFYHawCjsCc8nAseH9Sex2arNb65NBrM0SWyTXKSxQI33MBpSwJHLH9OBQB3hIAyTgVHNPFbwyTTypFFGpZ3dgqqB1JJ6Cua8f6k2n+GLiJYFlF5HNbkl9uweTI2ehz93GOOvWuNvNSil0fXbGC0ul+3ahaQyk2zLshMcCv95cZwSAOfvDjmgD1iKaKdS0UiSKDglGBGaQzwrOsBlQTMpZYyw3EDqQOuOR+dcX4dTzNe1FhqOqJKb7y2C2SrHMsca4EjeThThsdVJwKgv9ce58f20+lRRXQsbe5t5w77QQJLfzCrdMruP1KkcUAd48scbojyIrSHCAsAWOM4HrxT68zUa79r8NXN1bwzPd6rPdRC4vHyivDKUTaYzsCpjgZ5HvXoOnvqD27HUoLWGfe2FtpmlXbng5ZVOcdRigC3RWV4ktdYvdBuYNB1COw1JseTcSxh1XkZyCD1GR0NX7VJ47OBLmYTTrGoklC7Q7Y5OO2T2oAmorntfltZLyCKX7XBeWo+120sQwJdpAaPcMjByqlTjORjpkZEsdxp1xeXmqyXslm9wEE0NzPCTLJIqIqRLIBsXIBYkFjkgY6gHcUwzRCZYTIglZSwTcNxAxk49OR+dYHh+zubbVdTN39sRwUSJJL154WjAyHQOSwJJIOemABnGTm6Pc/wBteNNZ1COMxvZwxW1pNMgZDCxYsy4YH5mU88AhVPOaAOxWaJ5nhWVGlQAugYErnpkdqfXmvhnXr7VPG2sTgW1vFdxQxWs7RswlVTLsbbuGAwDsBnoB612Oo6ndaB4bku7tf7RvYIWcraxeUJSoJJwWbYMDklv1IFAGqs8TyvEkqNJHjegYErnpkds1JXmENnJbaV9vex1f+3dddA17HdLGhdlJUKizj5UUHaD6cnmuw8O3nlk6E1vqYlsLeItPfyRyPIG3AEsrnLfKc0AbclxDFJFHJNGjykrGrMAXOM4A78UrTRI215EVuOCwB5OB+vFcL4pu7208V6XLPfWiQWkc1wpFjJKULskKAqsmWJMh6Y6Hiub1W7nvr7xTJqF1YvJZ6ZFZLK9uYzOCX3tEPMynzj/a5QUAew1HDPDcKzQypIqsUJRgQGBwRx3BrnbXXYtP0jU7+913T9RtrE7D9kj2GJgoHlsfMfc5OMdOTXK2U+tz6Ld6XYQiMX2rTiC6jnMTpi5dpVbAJX5FOGH97GPUA9NSWOR3RJEZoztcKwJU4zg+nBFPrhtEk11Nb8Tm107TWmN/EH82+kAA8iLoRESePXHNdyOnNABRWJLZa+3jC3vItVhTQVtiktiYQXeXJw2/GQOnft05rboAKjgnhuYhLBLHLGcgPGwYHBweRWDYX+sapfatHDcWMEVleG2QPavIzAIjZJEi/wB707Vj+EhrMHgeOeG9sAqfaHCtZOTkSOevmjv7UAdyzKilmIVQMkk4AFIjpIiujBkYZVlOQR6iuQv9X1Cf4faVqZnEN5dPYtI9uu0DzJY9wAJPGGI5zT7W3SxvLzRtP0ezuLexAnDXdyRjzmd9qjy2wAQcDPTFAHXUyWaKBA8siRqSFy7ADJOAPqScVw6vb6jeeB9UGnW9pJdSSTGOPDbN1u5A3YGfyq34muY9Q8UaFoTwSS25uPtE7BQUEiIzxK2SM8qWwMn5V9aAOteaKJ40klRHkOEVmALHGcD14p9ebeKtdvYvGmiWipbyw2EzT3FwI2AjZoJTt27jkhAzdR/D613UDXluLm4vry3ntzhoVgtmVkXHIPztvJPTAHpzQBbeeKOWOJ5UWSTOxCwBbHJwO9SV5qs41vU9Q8S6tpGqmLSmmt7WOC4SL7MqD945xKrF2xz6AADvWt4cu7jSZLaK9t9Zll1i4LxtcXEcsUHyFgq5kLBQq+5J5wM4AB2M00VvC800iRxIpZ3dgFUDqST0FHmx7FfzF2Nja2eDnpiuZ8fLfSeF7u3tri3RLtVtCjws7M0riMYIcY+96GuV1fVp9UuPD1g1/ZXFhdagJA7ae8McKwq+0OGk+cNImRggfIeooA9RR1kQOjBlIyGU5BponhNw1uJUMyqHaMMNwU5AJHXHB/KuH8H3jfa2gj1zS1E15eTPYLETI+JCpZD5vyrkbsbT94896qx+JHl8X6jrOmW8d3Yrp8aStvw2xJbgb07MMr07ggg8cgHoZljWVYjIgkYFlQsMkDqQPxH50+vN9Pt/EFh4h8NQ3sFtc3yadds8k9/IxZmaItkmMlcE4AGRj6V39g169lE2oRW8V3j94lvKZEB9mKqT+QoAs15/8Ev+SQ6F/wBvH/pRJXoFef8AwS/5JDoX/bx/6USUAdB47/5J54l/7BV1/wCimo8Cf8k88Nf9gq1/9FLR47/5J54l/wCwVdf+imo8Cf8AJPPDX/YKtf8A0UtAHQVka7pVzrVjcaeZrMWVxCYpY57VpCc9cEOuPy61r1VutPtrxs3CvIuNpjMreWw9GTO1vxBoA4Qxao2u6cbe+gvLLQIJEkuksZJf3pUJtwJSzuFBJ28gkDHPHSaNqN3qiz39rrOmapZiMosFtbmJllHOGcyNtPYqVyK3oYYraFIYIkiiQBURFCqo9AB0qC306ztLq6ure2jinumDTugwZGAwCffHGaAOGvNGt4pvDyvoWk6bdTakuFssSSBVDSt+82KeqcgA/WpvP8UTaZLaTxyQfbIms0nLBXjmEpjEgHX5ov3nsV966iTw1okusSavJpds9/JCYHnZASyHqD29s9ccdKU+GdBbGdE0045GbROP0oAv2yJHaxJHI0iKgUOz7ywAxknufepags7K0061S1srWG2t4/uQwRhEXvwBwKnoA8//AObhf+5U/wDbuvQK8/8A+bhf+5U/9u69AoA5/wAR6DdeILKWzlvLSK1LJJGTas0kbKQwYOJBggjriuciu9Sk8R3fiNry2bTbe1FnHeR6dJKj/PudgqyltoO0b+RwegGT21zpNleuxu4TcIww0Uzs8R/4ATt/SrgAUAAAAcACgDnrWe+1DRby7jvdL1+2uU/0aK2TyY2XGGUyb5AQee3HIrn7jRo4fEOkQ2mm6dpt6LK5mxpyg7dqBEy+1SwzJwCo713Fjp1npscsdlbR26SytM6xjALtyxx71Sj8K6DFeXt2mkWnn3xU3LGIHzMdMg8defc89aAOcSbxBqdrb2eoJLp6Xr21zvSXZJCgXfPHwcgBlC59JMdq7kYOCMHjg1lP4X8PyAiTQtMcEFSGtIzkHqOlacMMVvCkMEaRRRqFREUKqgdAAOgoAfRRRQA0skYG5lUdBk4rnfBJB0e8IOR/ad7/AOj3reurS3vrWS1u4I54JVKvHIoZWHoQah0vSrHRNNh07TbWO2tIRiOKMcDv+PPegCa4tYbryxMm9Y3EiqTxuHQkd8Hn6gHtWP4PwfD57/6Xdf8Ao+St6q1jYWum232azhEUO9n2gk/MzFmPPqST+NAHKeH9Zt/D0F74e1FvKudOdmtlY4+0WzP+7ZPXG4IfQj3FW9Q1GVvG9jp90tvDY21rLqBl87JOMRjcCBtA3sep6e1a2s+HtJ8QwxRarYxXIhcSRM2Q0bA5yrDBU8djVo6fZtfi/NtEbsR+V5xUbtmc7c+meaAPMvEXhq11fU9J1EWUVjZNqEdtaxLAEaTcrlppFxzyBtVuwJP3uOr8LNpd0NQtG0O20/VYcQajHHaiNZePlYMAA6EHI54Bwa6O6sba9MBuIhIbeUTRZJG1wCAf1NWKAOKaxudU1LxLZQLG1u15F56NIU81RBF+7yAcA9zjpx3yMo6druqap4igsYNPtLuK+t5Yrj7W5+zusCYKjyvmGOCDtyCR716HBZW9rNczQxBJLlxJMw/jYKFBP4KB+FJBZW1tcXM8MQWW5cPM2SS7BQoP5ACgDm/GH2v/AIVvff2l5C3fkJ5xt2Pl7ty5Kk4OPrW3JoljNcwXLi4aWDd5T/apfl3DB/i7irtxbwXdvJb3MMc0EqlJI5FDK6nqCDwRWH/wgng//oVND/8ABdD/APE0APjGn+HtWSH7Q4l1m6LATy7vnWIDC556IPWuFv7XUZ7rxLqFvpd5Jah5EVjEytKd8B/doRub/VtzgD3r0Cw8K+HdLulutP0DS7O4UECa3s443APXkAGtegDzDxBLJPqGrS3F5LpkjnTD9m3xE4848tlTyPY4z6132kT28sM0cOr/ANpvFKVkkLxFoycHYfLVQMAjqM1ajs4Irue6SMCecKsj5PzBc7fyyfzqegDkPBzWK+C9KFzcJC5jbB87y2I3t3BBxWdoc+gW0Gp3moaqLeO31qd0dtSeNc7sDcA4DA56HINdxY2NtptnFaWkQigiGEQEnAznqeasUAYevaTL4hWPT5CsemECSWZD+9ZgflVD/D6luvYdcifTLbUbTSmsXNqsluPLt51j+R0AG0tGCNp7EA44yMA4GrTJY1ljaNiwDDBKsVP4EcigDitVsr3QbrUNXgv7J9S1OJLdLSOzcG5lUNt2jzvvYbBbsq5PAqPSXv8ARtL07wv/AG9pun6lHbJFCtzpr/vCAM7CZgsh/wB08dwOldjbaZZ2kzTw26idlCtO+XkZR0Bc5Yj6mlvdOs9SSJLy2jnWKVZo94zsdTlWHoQaAMjU9NfUdUt1u9D0m8ijgKm8u2yVLfeVYirZHyg8sPrXK6ONZt9Ct28P226K6+3TxBAFiR1mLQj0VWGVx6Eeld9q2kafrmnS6fqdpHdWso+aOQcfUHqD7jmof+Ec0TZGh0ewZY0WNA1uh2qowAMjoBQBU0Pz7jU9S1G4mkAnZYobYykoixjaxC9Mly2T3AWtP+0YP7lyfpbSf/E1DaaBo1hdLc2ek2FvcKpRZYbZEcKeoBAzg1o0AU31OBEZzHdkKMkLaSk/gAvNGmahHq2nxXkdvdW6vn91d27QyKenKsARVyigDmvFzoU0VQylhrFsCM/7VdLWbdeH9IvtWtNVudOt5b+0z5FwyfOmff8Ax6VpUAc3rdtDbapobxrh5tV3yMTksfIkH8gAKTxgs9pDp+uW8LztpVx50sUYy7wMpSTA7kBt2O+2ty6sLW9ltZbiESPay+dCST8j7SufyYj8as0AZVvr1rqUMsmkywXgWCOdX83bGyvux8wBx909q5jTbtNV8I2tzLp9rfatqrPdw28iiVIy5IVmJHCKu0E98YHJArqNP8N6PpV3fXVhp8NvJfkG68sELIRnkr93PJyQOc81ds7K1060itbO3jgt4lCRxxrgKo6AD0oA8l0vQ9O8Lf21cX2mxatp0F/5GoNLbCZ1VoYm80Jg/KGZsqOitx93FeuW3ki1iFugSDYPLVV2gLjgAduO1MtrG2tJbmWCII9zJ5sxBPzvtC5/JQPwqxQB5/8AFP8A5kr/ALGux/8AZ69Arz/4p/8AMlf9jXY/+z16BQBzPi28uUfS9MjihMGp3sdtJI0uHC8uwC45BVCOveuY+IOl2niDRdWuLa0hjtLOCSae9SIB7qUKdqK/UqOrHoSAvPzY9FubC0vJbeW5t45ZLZ/MhZ1yY2wRkehwSPxovLK21CxmsrqISW0yGOSMkgMp6jigDk9Ah0vTfEI0i50a3h1GKJpbG+jtBmaA4z+8A+VlyFYE88HvxNd21w3iy6stNKW7NpMSBwceUvmScqMdew44684wetACqAOABgVCtlbrfvfCIC5eNYmk7lASQPzY/nQB57c6TqEniCbR7fS9PiT+xEijQX8iiMCU4YMIidwPPTqM5rs9Gj1iHQhFrs1rPfIrK01tkLIB0YggYYjqBxnpV4WVsNQa/EQ+1NEITJk52AkgfmTVigDjvCGj2OpeANCW486RPs0EgAuZAAy4YHhuxA/KtLUYtP8AD87a/PcSpiOO0YzTkoFaVefmPByfWlfwP4SkkZ38LaIzsSWZtPiJJPc/LSw+CvClvMk0PhjRYpY2DI6WESspHQgheDQBzmr219ffEJpbKxnlitYYmlmZCkefLuRgMR8x/epwuffFZRlnk0vRRdG50gx+H7qMCXYsj4WEEFWB2g46fe+nSvVagazt3vorxowbiKNo0fJ4ViCw9OSq/lQBh+E57f7Bb2664b6f7HDIbd3hJhXbjICKDgnj5s9Kr6I1quqeJzdSpGP7U+V2faQfs8Q4PY4z0rq6r29jbWktxLBEEe5l82U5J3PtC5/JQPwoA4oJos/jHXo7rUWS2On2u511GSM4DTE/Org/rSfEO58Nah4EtJ9Rm1G60ma6gMMulOHd2z8pyTyPXv6c4rvqKAGoAI1AzgAYz1p1FFAGN/wjVm2rX2ovPe+beFCyxXUkSrsXaOEYZ/GsPwfo9nNZanma/wApqt2h23869JT6Pz9a7Wq9nY21gkqWsKxLLK0zgfxOxyxP1NAHMeINKh0P4V6pptu8jxW9hKqtIcseCeT+NW5tNnn8Tw3n2C3uLcacIt07AAPvzgcE9Pat28s7fULKazu4hLbzIUkQk4ZT1HFTABVAHQcCgDg5bO407w/olrdQJBKNfVvLRwwCtO7LjH+yQa2vFaJFb2EscamV9Utc9i5EgwM1pXeg6VfatZ6pdWEEt/Z5+z3DL80eeuD/AJxVq6sre98n7REJPJlWaPP8Lr0P4UAcL4isdTsYYZ3trOae61izkknNyyliJFCoF8s4Veg5Pc4yTW34a03X9Mv71b37AulzO00FvDM8j27sxLKGKLlD97GOCSOmK3ruytr5YluYhIsUqzICTw6nKn8DzVigDlNDtYbnxH4rDvLkX0YISZ04+zxdlIrSPhnTo7awgia5hgsJI5YUFy7KNnQHcTxj/wDXT7/wt4e1W6N1qOg6XeXBABluLOORyB0GWBNVf+EE8H/9Cpof/guh/wDiaAOe8W3x8TeGNGfSoJb2S+eQxi3XcozBIh3N91QGYA5IqpfG+htNetrizntYzqVk5uyQEA/0dfkLD5iCpzxtHqelej21tBZ20dtawxwQRqFSKJAqoPQAcAU27s4L6DybmMSR71faSR8ysGU8ehANAHHeG57a31TUjN4mc79VdEgke3AuGMSYHCBif90jp9a0dQ8r/hYGnefs8r+yrrfv+7jzIc5z2rp6rvY20l/HfNEDcxxNEshJ4RiCRjpyVH5UAcl4hk0xvEHhki/BBv5CxF43yjyJf9rj8K6DQ5tIME9ppN+LpbaUrMDdtcNG5+YgszMe/TNatFAGP4n1i80LQLjUbDSLjVriLbts7c/O+SAcYBPGc8A1p20rT2sMzxNC8iKzRv1QkZwfcdKlooA5jXb64PifRNJeOBbOeR7mSXzvmIhXdgrjgbihzk9K5Pxlodlrsceox2UVvpsN7bqjxxBHvJHnRWckclACcZ+8TnoFJ9Kl0+znvIbyW2ie5hVkjlZQWRWxuAPocD8qW9sbbUIBBdRCWISJIFJI+ZWDKePQgGgDmPDK6ZHqV7pc+jW1prNrGI5p4rQILmAn5XVwOjY5XPDA+maZcWdxe+IPEFhZ7I43trVJMPs+TEnyKQDtyOM44BJHOK7KoIrK3gu7i6jiCz3G3zX7ttGF/LNAHns+mavqGva5p9pZafayLbWPlOl44+zFDIUdP3XJGPukAcYzg11F+NSHgHUF1c2zX40+YTNa7vLZth5G7kfStmKytob2e8jiAuLgKssmTlgudo/DJ/Op2VXQqyhlYYIIyCKAMDS9Gsb3QtHkm8+TyoYpoiLqTCtswCMN6E/nTrlNP8O6h/aUlxIr6hJBZnz5tyggttxuOckse/pTf+EE8If9Cpof/guh/wDiamtfB/hixuo7q08OaRb3EZ3Ryw2MSOh9QQuRQBz2plpPF6STW10TKcwFbOWVAsGdgYoCFzLIW5I4Reea5q+1uC4tPEUzPbaW0+lWo+x3ICuCDKCq/MOAQecc8V7BVeOytor2e8SIC4nVFlfJywXO0fhk/nQBQ0TU49Qe9VdZ07UjFKBiyXHkggEK3ztk988fSsjws1muj3X2qZIWOp3oVjL5bY+0NnByD2FddVezsbawiaK1iEaNI8pAJOWdizHn1JJoA4ewfQU1PxRNf6oYbaG/im8z+0pIx8sERySrjIz2OfSu9iljnhSWJ1kjdQyOpyGB6EHuKfRQBhya7fJ4zi0QaFdtYvamc6oD+6VwceWeOv4556d63KKKAMSDwvZQ3d/cme+L3lwZ3Ed5LEqnaq4ARgOij3rB8GaHZX3guENNfje1wh2386gfvXHQPiu5qvY2NtptotrZwrDAhJCL6kkn8ySaAOa8TWMel+CrDT4Wdora5sIUZ+pCzxgE478VYbSriTxJq902nW08M0ECRSTsBkqHyB8p/vD0rdvLK21CAQXUQljDpIFJI+ZWDKePQgGrFAHDW1rPYL4Bs7qMRXMG6KWMMG2sts4IyODWp4gQwazoBtYo/Oe8lYBjgMxgk5J/L8BWodB0o66utmwg/tNYjCLrb8+w9s1amsre4ube4liDy2zFoWP8BIKkj8CRQBwmoWGpabq3h6EWdlPJLqU0rzSXTA3DtBLksPLO0Y4AG7AAHvW/4R07XdJs5bLVXs3tUP8AoawSu7RJ/wA82ZlXcF6A4BwBmtueytrm4tp5og8ts5eFiT8jFSpP5Ej8asUAch4c0611G28QQ3HmvHJql3HIizuoKk4IwpHY1q3ukWNoltqBkuEGlh5o1a4ZlwI2Ug7ieME+lLeeEfDWoXcl3e+HdJubmQ5eaayjd2PTklcmoP8AhBPB/wD0Kmh/+C6H/wCJoAzPE+pfbtFsNQtElntkRbxWt4mm3Ow2xYCAkgM+84B+4PWsW81G2tNV0SxWEafBZX0JiurqFolkiNtMq7g+0hgVYEHHY969LjjSGNY4kVI0AVVUYCgdABUNxZW13NbSzxB3tpPNhJJ+RtpXP5MR+NAHG+DtYhd47Ya/pLCW8vcWaKDNKfOchlPmcDHONp4PWtJDAvxB1U3DIsY0y1JLkAA+bNjr711FV1sbZb+W+EQ+0yxrE8mTyqklR6cFj+dAHIah/Zb+OtIU6gTGbC7DML5wR80P8QbI79K6bRLjTJ9MRNJvFu7WAmEOLgzkFTgguSSSPc1o0UAFef8AwS/5JDoX/bx/6USV6BXn/wAEv+SQ6F/28f8ApRJQB0Hjv/knniX/ALBV1/6KajwJ/wAk88Nf9gq1/wDRS0e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'bio_7_2.jpg']
bio_8	MCQ	For example, Figure 1 <image_1>is an image of a certain period of meiosis of a diploid animal (only part of the chromosomes are shown), and Figure 2 <image_2>is a graph showing the relationship between the number of chromosomes and the number of nuclear DNA molecules in cells ① to ④ in the animal. The following statement is correct ()	['A. Figure 1 shows that the creature is a female', 'B. The B gene on chromosome 4 is a mutation of b', 'C. Cells containing homologous chromosomes in Figure 2 include ②④', 'D. The cells containing two chromosomes in Figure 2 have ③④']	D	bio	遗传与进化_遗传的细胞基础	['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'bio_8_2.jpg']
bio_9	MCQ	<image_1>Genes A/a and B/b are two pairs of alleles on a pair of homologous chromosomes in the oogonium of a diploid animal. During meiosis, the non-sister chromatids of this pair of chromosomes are exchanged only once at a certain location, forming a secondary oocyte that divides to produce an egg with genotype ab and a polar body. Regardless of other variations, the following statement is correct ()	['A. Non-sister chromatid exchanges cause changes in the type and number of genes on chromosomes', 'B. If the exchange segment is at the position of gene A/a, the possible genotype of the polar body is Ab or ab', 'C. If the exchanged segment is not at the position of genes A/a and B/b, the genotype of the polar body is ab', 'D. No matter where two non-sister chromatids are exchanged, the polar body cannot have AB genotype']	CD	bio	遗传与进化_遗传的细胞基础	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADFAIoDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKK8h8W/HrTPDviZtJtNOa/jt32XM6yhQp7hRg5I/DmgD16iqGi6xZeINGtdV0+XzLW5QOjdD9D6EHg1foAKKKKACiiigAorlfEni6403VrfQ9G0xtV1meMzeQJRGkUY43ux6c8D1q14V8Ux+JLe5SS1ksdSspPJvLKUgtE/UcjqpHIPegDoKKKKACiiigAooooAKKKKAOf8AHGunw14K1bVkI82CA+Vn++eF/UiviKSR5ZGkkYs7kszHqSa+nP2i9Te18D2VhG+37XeDeP7yopOPzK/lXzDQB9E/s4eITNYap4fmkJMDC5gUnorcMB+OD/wKvdq+R/gZqf8AZ/xQsY2bCXcckDf98lh+qivrigAooooAKR2CIzscKoyTS1z3jvUjpPgXWrxTiRLR1T/eYbV/UigDE+GsZ1RdY8WzDMmsXj+QT1W3jJSMfoT+NGuKPD3xP0TWIxtg1lG026A6FwN0TfXgrXR+EtLGi+EdI04Dm3tI0b3baNx/PNYPxXiZfA8upxDNxpVxDfRfVHGf0JoA7eio4JVnt4pkOVkQMD7EZqSgAooooAKKKzte1VNE0O71F1LmFMog6u54VR7kkD8aAI9O8Q6fquranplrKWudNdUuF7AsMjH8vqK1a8bSzT4feP8Aw9qTXAaDXIjZ6m4bIa6J3Bz9WbH0FeyUdAPnj9pW+3ahoFgD9yKWZh/vFQP/AEE14PXr37RUxfx/aRdo7BP1Zq8hoA6DwLcm08e6DOG27b6IE+xYA/zr7fr4L0qdrXWLK4X70VxG4+oYGvvNTlQfUUALRRRQAVwvxZfd4MSz73t/a24HrmUHH5A13VcJ8RwJ7zwhaHpJrsL4/wBxWb+lAHdKAqgDoBisTxnZ/wBoeCdctcZMljMB9dhxW5Uc8aywSRuMq6lSPYigDI8G3P2zwVodxnJksYST/wAAFbdec+B9WvrL4J2F9aWL397bW7pFbx9XKyMoH5AflUy+LtW03xnoGh6jc6ddHVI5POjt4yklrIqhgD8xyDnHOOlHWwHoFFFFABXJ+I4LvVfEekWEmlTz6NFIZ7qX5DG7hSEUqTkgE7jx1ArrKKAOB+Ingqz1LwZeW+jaLANTyr2zWsMaOHVgR83GB68103he71O78P2jazZSWmorGFuEYqQXA5IIJGD1rYooA+VP2gmz8SyPSziH/oVeV16r+0Gu34lA/wB6yiP6tXlVAEludtzEfRwf1r72tW32kLeqKf0r4IhGZox/tD+dfetkNthbj0iUfoKAJ6KKKACuE8djf4s8Dp/1FGb8omru64bx18nirwRJ/wBRRk/OJqAO5pG+6fpS0h+6aAPI/D8OtXPwHltvDxcakJJ0j2NtYgTtuCnsducGnXOnanJrngvU9O8IXdra6dJKLiJjGJSzoo3N83IyPvE5NdD8Iefh7bN/eublv/Iz13VC0dwEGSBkYPcUtFFABRRRQAUUUUAfLv7RMTJ8QbWQjh7BMfgzV5FXuv7StmE1bQb0DmSCWIn/AHWUj/0I14VQBZ0+Iz6laxL1eZFH4kCvvRFCxqo6AAV8PeDLY3njbQ7cDO++h49t4NfcdABRRRQAVwvxEUpqPg65zhY9ciU/8CVxXdVxHxTxF4Vtb3GTZanaXAPpiVR/ImgDt6ZM6xwSSMcKqkk+gAp4OQCO9Yvi+6+w+DNbuc4MdjMwPvsNAGH8I0K/DHR2YYMglkx9ZXNdtXP+BbT7D4C0G3xgrYxZ+pUE/qa6CgAooooAKKKKACiiigDxf9o/T2m8I6XfqpP2e82MQOgdT/VRXzRX2r8R9DfxF8P9Y06JN87QGSFfV1O4AfXGPxr4rIIJBByKAPQPgppn9pfFLSyRmO2Elw3/AAFTj/x4ivr6vn39m7Qcyav4gkU4AFpEfyZv/Za+gqACiiigArmPiJp7an8PtbtoxmQWzSoP9pPnH/oNdPTJolnhkicZR1KsPUGgDP8ADuopq/hrTNRQ5W5tY5foSoJFc78Vrho/h9f2sXNxftHZwr/eaRwuPyzWZ4D8Q6Z4b0K78Pa1qVtZz6NeSWqm4lCeZGSWjYZ/2WH5U7XNRsvGHjrwvpWmXcN3a2btqtzJC4dQEG2MZHfcelAHoFpAtrZQW6fdijVB9AMVNRRQAUUUUAFFFFABRRRQByfxF1W80zwwsOnSmG91G6isIZh/yyaQ4LfgAfxqTSPh54X0jS1sY9GtJxtxJLPEsjynuWJGean8caPb634Rvrae6Fp5a/aI7o/8sHT5g/4Yry3SP2jdNTS1TV9Ku2vo12l7baY5SO/JBXPpzQB1+hWMfgv4jt4e07K6Nqlo97FbZyLeZWAbb6KQQceteiV5b8MdYXx9rmpeMrlljmhH2C1s1Ofs8XDEk9yx7+2K9SoAKKKKACqupXg0/Sru9K7hbwvLj12qT/SrVRzwpc28kEq7o5FKMPUEYNAHn3gPwjpup6NF4o1u0g1HWNXUXU01xGHCKw+VEB6ALgfhUXifRbLwVrmleJ9CgjsvOvIrK/ghUKk8UjbQdo43AkHIrN8LeJ9U8LvqXh2LRL/XdJ0i5Ntb3tiqs6jG7y2UkZK5xkelTtqt/wCNvH2kaVq2mXGi6faD+0obe6x5t46HAzg4UKTnHJoA9VooooAKKKKACiiigAooooA84+OGuf2N8NLyJWIl1CRbRMehyzf+OqR+NfI9fQn7St/tttA08N995ZmH0CgfzNfPdAHsP7O+tPZ+NLrSmf8Ac31sSF9XTkH8t1fT1fFfwz1BtM+JGg3KnH+lLGfo/wAh/Rq+1KACiiigAqjrWoJpOh3+oyEBbW3eY5/2VJ/pV6uK+K0zJ8Pr6BDh7uSG2HvvkUEflmgCf4Z6c+n+AtOecf6Veqb24Y9WeUl8n3wQPwql8SR/ZzeH/Eq/KdL1GMTP6QS/u3/DkV29vCtvbRQoMLGgQD0AGK5z4jWX9ofDrXrfbuP2N3A91G4fqKAOnByM0VmeHbz+0PDWl3hOTPaRSE+5UGtOgAooooAKKK4/4jeKNS8HeHTrNjFazokiRvFMrZO44yCD9OMUXA7CiuN1zXfE3h7Qn1qWz0/ULaCPzbiGAvFIqdSVJLA4Hbiuk0bVrbXdGs9VsyxtrqISx7hg4PY+9AHzh+0bcGTxxYQZ4isVOPq7f4V47Xqv7Qb7viUB/dsoh+rV5VQBf0S4+ya9p1yDjyrmN/yYGvu8HIBr4FgO24jPowP61962jb7KB/70an9KAJqKKKACuF+JQ88+FrLPE+u2xYeoXcxH6V3VcN45+fxX4Ij7HVGf8om/xoA7mq9/bJeafc2snKTRNG30II/rVikPQ0Ach8LLlrr4Z6Ez/eSAwn/gDFP/AGWuwryjwxqmoaJ8D7jUdM8j7RZNduonUspCyucYBFeieHL2bUvDOl31yQZ7m0ilkIGAWZQTx9TQBp0UUUAFeb/HP/kmVzjr9pg/9DFekVyXj/wle+NND/siHUYbK3aRJHZrcyMSpyAPmAA6UmrjRheP9L8XXvgSeO21GykthBuuoIbdoZJYgMsquXcAkZ7V0nw91HTNU8B6TcaRbtb2QhEaQucmMqdpBPfkHnvVbUPDvifVtJfS7nxFaQW0sflSvaWBWQpjBALSMBke1bnh7QrLwzoVrpGnqy21sm1dxyzHqSfcnJqu5PY+Z/2gRj4mE+tnF/WvK69d/aJhKfEG1lxxJYJ+jMK8ipDHwjM0Y9WH86+9bIbbC2HpEo/QV8I6bCbjVLSBeskyIPxYCvvNFCxqo6AAUAOooooAK4bxvx4w8EN2/tGQfnE1dzXDfEQ+TqPg+7PAj1yJM/76uv8AWgDuaQ9DS0yZ1igkkc4VVLE+gAoA8j0cf8Y96yezR3x/8iPS6lpV9pnwm07xLpmtahDqdhp8NwM3DeU6BVJjMf3cY46Z9c1s+A9FXWfgra6ZcO0S6hbzhnUcqJHc5H4Grsfg7V7zw3beGtX1C0fSYFjidraJkluI0xhWySFzgZxnPtS7/L9Q7f12Or0e+Op6JYX7Jsa5t45in93coOP1q7TY40hiSONQqIAqqBwAO1OqnvoJbBRRRSGFFFFAHzz+0rp+290HUQPvxywMfoVI/wDQmrwavqb9oPR31D4fx30S5awulk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bio_10	MCQ	The P in the DNA of spermatogonia cells of a diploid animal ($2n=4$) was all $^{32}P$. The spermatogonia cells were cultured in a culture medium without $^{32}P$. After one of the spermatogonia cells underwent mitosis and meiosis I, four cells were produced. The chromosomes and chromatids of these cells are shown below<image_1>. Without considering chromosomal variations, the following statements are incorrect: ()	['A. The spermatogonia cell underwent 2 DNA replications and 2 centromere divisions', 'B. All four cells were in prophase of meiosis II and all contained a chromosome group', 'C. The process of forming cell B involves pairing and exchanging homologous chromosomes', 'D. Four cells complete division to form eight cells, and four cells may not contain $^{32}P$']	ABD	bio	遗传与进化_遗传的细胞基础	['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bio_11	MCQ	"There are two monogenic inherited diseases, A and B, in a family, and the related pathogenic genes are A/a and B/b respectively. The pedigree of the family is as follows<image_1>. Genetic testing was carried out on different individuals, genes A/a and B/b were treated with the same restriction enzyme and then subjected to electrophoresis. The results are shown in the following table<image_2>. Note: ""+"" means that the gene or fragment was detected,""-"" means that the gene or fragment was not detected, and blank means that no detection was carried out. If mutations and homologous segments of the X and Y chromosomes are not considered, the following related analysis errors are ()"	['A. The pathogenic genes for A and B diseases are located on autosomes respectively', 'B. The causative gene for onychia is produced by base pair substitutions of normal genes', 'C. Women with the same genotype as I-2 marry II-8 and give birth to normal children', 'D. When II-6 and II-7 mate, the probability of having a sick boy is 1 in 18']	C	bio	遗传与进化_遗传与人类健康	['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'bio_11_2.jpg']
bio_12	MCQ	As shown in the picture<image_1>, the genetic pedigree of a family is shown. Nystagmus is controlled by genes A and a, and Duchenne muscular dystrophy is controlled by genes B and b. If the gene is located on the X chromosome, the male individual can be considered homozygous, and II4 is not known to carry the gene that causes Duchenne muscular dystrophy. The following statement is incorrect ()	['A. Duchenne muscular dystrophy is a recessive genetic disease with X chromosome, with more male patients than female patients in the population', 'B. The pathogenic gene of II2 comes from I1 and I2, and the probability that III4 is heterozygous is 2/3', 'C. Genetic diseases can be detected and prevented through genetic testing, amniotic fluid testing, genetic counseling, etc.', 'D. If III3 and III4 are married, the probability of having a boy suffering from both genetic diseases is 5/48']	D	bio	遗传与进化_遗传与人类健康	['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bio_13	MCQ	The pedigree of A (related gene is A/a) and B (related gene is B/b) inherited diseases in a family is shown in Figure 1<image_1>. These two pairs of genes are independently inherited. Gene A/a is cleaved with the same restriction enzyme to form fragments with different base pairs (kb). Some members of the family are tested for whether they carry the ongoy causing gene. The electrophoresis results are shown in Figure 2<image_2>. The following analysis errors are ()	['A. B gene b in II-4 comes from I-3 and I-4', 'B. The 1670kb DNA fragment is the pathogenic gene for thyroid disease', 'C. If III-1 does not contain a 1670kb fragment, it is female', 'D. Mutation in gene a adds bases to gene A']	C	bio	遗传与进化_遗传与人类健康	['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bio_14	MCQ	The flip wings (A) of fruit flies are dominant over the normal wings (a), the stellate eyes (B) are dominant over the normal eyes (b), and the bristles (C) are dominant over the short bristles (c). In order to determine the genetic characteristics of these three pairs of traits, the researchers used PCR and electrophoresis to detect the genes that control these three pairs of traits in eggs produced by female Drosophila (A) of a certain genotype. The results are as follows<image_1>. At the same time, male fruit flies with normal wings and stiff hair were crossed with male fruit flies with turned wings as parents. The F_1 phenotype and ratio obtained are as follows<image_2>. The PCR products of the gene can be distinguished by electrophoresis, regardless of lethality and mutation, and all types of gametes have the same vitality. The following statement is correct ()	['A. Inheritance between the above three pairs of alleles does not follow the law of free combination of genes', 'B. The genotype of A is AaBbX^CX^c, and a total of 8 genotypes of egg cells are produced', 'C. The number of electrophoresis bands for gene C/c in F_1 was the same for male and female individuals', 'D. During meiosis, chromosomes are exchanged in the primary oocyte of A.']	ABD	bio	遗传与进化_遗传的基本规律	['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', 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'bio_14_2.jpg']
bio_15	MCQ	Some members of a family suffer from two single genetic diseases: red-green color blindness (A) or neuropathic deafness (B). Their genetic pedigree is shown in the figure below<image_1>. After testing, II_6 does not contain the pathogenic gene of B. The following relevant analysis is unreasonable: ()	['A. Neurotic deafness is an autosomal recessive genetic disease', 'B. The thyroid disease causing gene in III_8 may come from I_2', 'C. The probability that the genotypes of II_4 and III_10 are the same is 1/4', 'D. If II_3 is pregnant again, the probability of giving birth to a normal child is 9/16']	BC	bio	遗传与进化_遗传与人类健康	['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bio_16	MCQ	Ethanol dehydrogenase (ADH) and lactate dehydrogenase (LDH) are key enzymes in anaerobic respiration in plant cells, and the metabolic pathways they catalyze are shown in Figure 1<image_1>. In order to explore the effect of Ca^{2+} on the respiration of root cells of waterlogged pepper seedlings, the researchers designed Group C as the experimental group, and both A and B were control groups. Among them, Group A was a normal growing seedling. Part of the experimental results are shown in Figure 2<image_2>. The following statement is correct (    ）	['A. In the process of producing lactic acid or alcohol, the energy of NADH is used to synthesize ATP', 'B. The rate of lactic acid production by root cells of pepper seedlings in group B was greater than that of ethanol production', 'C. The treatment method in group C was to select pepper seedlings with consistent growth status for flooding treatment', 'D. During flooding, Ca^{2+} affects the activities of ADH and LDH and reduces the damage caused by the accumulation of acetaldehyde and lactic 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']	['bio_16_1.jpg', 'bio_16_2.jpg']
bio_17	MCQ	An experimental team set up two groups of experiments to explore the effect of overexpression of ROCK1 (a protein kinase gene) in cells on cellular respiration. The control group consisted of normal myoblasts, and the experimental group consisted of myoblasts overexpressing the ROCK1 gene. Different substances were added to myoblasts cultured in vitro to measure the cell oxygen consumption rate (OCR, which can reflect cell respiration to a certain extent), and the results are shown in the figure<image_1>. The following statement is correct (    ) Note: Oligomycin is an ATP synthase inhibitor;FCCP can act on the inner membrane of mitochondria and is a mitochondrial uncoupling agent, which prevents mitochondria from producing ATP; antimycin A is a respiratory chain inhibitor, which can completely prevent mitochondria from consuming oxygen.	['A. After adding oligomycin, the reduced value of OCR can represent the oxygen consumption for ATP synthesis in the third stage of aerobic breathing.', 'B. The addition of FCCP increases the oxygen consumption of cells, and the energy produced by cells is released in the form of heat energy', 'C. Overexpression of ROCK1 not only increases cellular basic respiration, but also increases cellular ATP production', 'D. After adding antimycin A, myoblasts could only breathe anaerobically and could not produce [H] and 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bio_18	MCQ_OnlyTxt	There is a certain probability that two pairs of genes located on a pair of homologous chromosomes will exchange, resulting in the production of recombinant gametes, which is called incomplete linkage; if the two pairs of genes do not exchange at all, it is called complete linkage. Studies have found that the probability of incompletely linked gene swapping to produce recombinant gametes is positively correlated with the distance between the two genes on the chromosome. When the two genes are very far apart on the chromosome, the proportion of gametes produced is almost the same as that of non-allelic genes on non-homologous chromosomes. By mating purebred grey-bodied fruit flies with purebred black bodied fruit flies (the alleles that control these two pairs of relative traits are not known to be located on the sex chromosome), all $F_1$fruit flies appear to have grey-bodied long wings. A reciprocal cross experiment was carried out using $F_1$Drosophila and double recessive type Drosophila as experimental materials. When $F_1$Drosophila was used as the male parent,$F_2$only appeared two types of gray body long wings and black body residual wings, and the ratio was 1:1; When $F_1$Drosophila was used as the female parent,$F_2$appeared four types of gray body long wings, black body residual wings, gray body residual wings and black body long wings, and the ratio was 1:1:1:1. The following analysis error is ()	"['A. The dominant traits of the two pairs of relative traits in the question stem are gray body and long wings', 'B. $F_1$Drosophila is used as the female parent. During meiosis, chromosomes are exchanged to produce an equal number of four gametes', ""C. The results of orthogonal and reverse crosses are different, and the inheritance of each pair of relative traits does not follow Mendel's laws of inheritance"", 'D. If male and female individuals in the $F_1$generation are randomly mated, there are three representative types of sub-types, with a ratio of 2:1:1']"	CD	bio	遗传与进化_遗传的基本规律	['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bio_19	MCQ	The sex expression of a diploid plant is controlled by three pairs of alleles. The phenotypes corresponding to different genotypes are: A\_ G\_\_monoecious, A\_ggy\_monoecious (female and hermaphrodite), A\_ggyy all-female, aaG\_\_androecious (male and hermaphrodite), aagg\_\_hermaphrodite. There are three different homozygous strains A, B and C of this plant, and their genotypes are AAggyY, AAGGyy, and aaGGYY respectively. Regardless of mutations and swaps, according to the hybridization results in the table<image_1>, the following inferences are erroneous: ()	['A. It can be determined that G/g and Y/y are independent inheritance, and A/a and Y/y are independent inheritance.', 'B. When crossing a gynogenic plant as a female parent and a gynogenic plant as a cross, the cross needs to be decasculated.', 'C. Among the F ˇ dioecious plants in combination 1, there were 3 genotypes in the self-bred descendants that did not have character segregation.', 'D. If F obtained from crossing A and C is selfed, the proportion of monoecious plants in F is 9/16']	ABD	bio	遗传与进化_遗传的基本规律	['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bio_20	MCQ	The figure <image_1>shows the distribution of three pairs of alleles in a female fruit fly and the entanglement of non-sister chromatids during the tetrad period. When the two pairs of genes are far enough away, they can be regarded as a free combination. It is known that there is no entanglement and exchange during meiosis in male fruit flies. The exchange rate between a pair of genes in female fruit flies ( %)= number of recombinant gametes/number of total gametes) ×100%. The following statement is correct ()	['A. The exchange rate between A/a and B/b genes is greater than that between B/b and C/c genes', 'B. If the relevant gene is located on the X chromosome, test crosses of female fruit flies with genotype AaBb are carried out, and the proportion of recombinant types among the offspring males is equal to the exchange rate', 'C. If a double exchange occurs between A/a and C/c as shown in Figure 3, it will affect the exchange rate between A/a and C/c genes.', 'D. A pair of male and female fruit flies with genotype AaBb (the gene positions are the same as shown in the figure) mated. When the sub-representative ratio is 71:4:4:21, the exchange rate between female A/a and B/b is 8%']	ABC	bio	遗传与进化_遗传的基本规律	['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bio_21	MCQ_OnlyTxt	The SREBP precursor is transported from the endoplasmic reticulum to the Golgi apparatus with the assistance of S protein. After digestion, it produces a domain with transcriptional regulatory activity, and is then transported to the cell nucleus to activate the expression of genes related to cholesterol synthesis. Betoline can specifically bind to S protein and inhibit its activation. The following related statements are incorrect ()	['A. Cholesterol is insoluble in water and participates in the transport of lipids in the blood in the human body', 'B. SREBP precursors are often transported from the endoplasmic reticulum to the Golgi apparatus in the form of vesicles', 'C. S protein regulates the transcription of cholesterol synthase gene in the nucleus', 'D. Betulin inhibits cholesterol synthesis and reduces blood cholesterol 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bio_22	MCQ	"The left picture <image_1>is a pedigree of two autosomal monogenic diseases A and B in a family. The right picture <image_2>is an electropherogram of two genes related to genetic diseases in members 1 to 6 of the family (each band represents one gene, and ""■"" indicates a related gene). The following relevant statements are correct ()"	['A. Disease A is a recessive inherited disease, disease B is a dominant inherited disease', 'B. Bands 2 and 3 represent the pathogenic genes of diseases A and B respectively', 'C. Genes that control A and B diseases are located on non-homologous chromosomes', 'D. The probability that III-8 is a normal boy is 3/8']	C	bio	遗传与进化_遗传与人类健康	['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'bio_22_2.jpg']
bio_23	MCQ	<image_1>One of the homologous chromosomes of a spermatogonia cell is inverted, as shown in Figure A (the letters in the figure represent chromosome fragments). During meiosis, due to chromosome inversion, inversion rings are formed when homologous chromosomes are symphysis, which is often accompanied by the exchange of homologous chromosomes, as shown in Figure B. After division is completed, if a chromosome segment is missing in the gamete and an identical segment is added to the chromosome, it cannot survive, but the gamete with inversion can survive. The following statement is incorrect ()	['A. In Figure B, II and IV are exchanged', 'B. The section between ① and ④ in Figure A has inverted', 'C. The spermatogonia cells produced two types of fertile male gametes', 'D. There were no chromosomal fragments deleted during meiosis of the spermatogonia cell']	D	bio	遗传与进化_生物的进化	['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']	['bio_23.jpg']
bio_24	OPEN	Watermelon shape (long, oval and round) and skin color (dark green, green stripe and light green) are important breeding traits. In order to study the genetic rules of the two types of traits, homozygotes $P_1$(long dark green),$P_2$(round light green) and $P_3$(round green stripe) were used to cross. For convenience of statistics, long shapes and elliptical shapes are uniformly recorded as non-circles. The results are shown in the table<image_1>. The $F_1$non-round melons in experiments ① and ② were investigated and found that they were all oval. If the $F_1$plants in Experiment ① were selfed, the proportion of round dark green melon plants in the progeny was ( 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']	['bio_24.jpg']
bio_25	MCQ_OnlyTxt	The sex determination of Drosophila melanogaster (2n=8) is XY, but the sex is affected by the embryonic sex index i (i= number of X chromosomes/number of autosomes, i=0.5 is male, i=1 is female, i=1.5 is embryonic lethal). Male individuals with Y chromosomes are fertile, and males without Y chromosomes are sterile. Homogeneity for the autosomal recessive gene t can cause female flies to become male flies, but has no effect on male flies. The following relevant statements are correct ()	['A. Somatic cells of Drosophila melanogaster have 2 genomes, each group has 4 autosomes', 'B. Drosophila melanogaster with genotypes TtXO, ttXXY and ttXYY are all sterile male flies', 'C. Individuals with genotypes TtXX and ttXY were crossed to yield $F_1$, and $F_1$mated with each other to yield $F_2$. The male and female ratio in $F_2$was 5:11', 'D. The X chromosome of a male fly (TtXY) in the late stage of meiosis II was not separated and crossed with a normal female fly (TtXX). The proportion of sterile male flies in the offspring was 1/4']	C	bio	遗传与进化_遗传的基本规律	['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bio_26	OPEN	The normal wings and small wings, gray body and ebony body, normal wings and spread wings, red eye and white eye of fruit flies are relative traits, among which the dominant genes are represented by A, B, D, and E respectively. None of the above genes are on the Y chromosome, among which B, b, D, and d are located on the same pair of chromosomes, and D has a homozygous embryonic lethal effect. The following table <image_1>shows the hybridization experiment of fruit flies under normal circumstances. During meiosis, female fruit flies form recombinant gametes due to non-sister chromatid exchanges of homologous chromosomes, and the probability is related to the distance of the gene on the chromosome. If the distance is very far away, the probability of recombinant gametes and non-recombinant gametes is close and difficult to distinguish; if the distance is very close, it is difficult to produce recombinant gametes. Male fruit flies do not swap. There are currently a number of hybrid combinations of gray bodies with the same genetic composition but may have different linkage conditions. Among them, one pair of Drosophila produces 1/5 of the ebony bodies with normal wings. Based on this, it can be inferred that B/b and D/d are on the chromosomes. The distance. If the chromosome distance between B/d and/d is very far away, and a pair of grey-bodied Drosophila melanogaster crosses produce normal wings of ebony bodies, then the proportion of ebony bodies normal wings is ().		$1/16$	bio	遗传与进化_遗传的基本规律	['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OTbGo3I27lTjIPcV3Hjv/knniX/sFXX/AKKajwJ/yTzw1/2CrX/0UtAHP/8AC0/+pC8c/wDgn/8As6P+Fp/9SF45/wDBP/8AZ16BRQB5/wD8LT/6kLxz/wCCf/7Oj/haf/UheOf/AAT/AP2degUUAeT+E/iT9h8G6HZ/8IV4yuPI0+3i8630rfHJtjUbkbdypxkHuK2P+Fp/9SF45/8ABP8A/Z10HgT/AJJ54a/7BVr/AOilroKAPP8A/haf/UheOf8AwT//AGdH/C0/+pC8c/8Agn/+zr0CigDz/wD4Wn/1IXjn/wAE/wD9nR/wtP8A6kLxz/4J/wD7OvQKKAPP/wDhaf8A1IXjn/wT/wD2dH/C0/8AqQvHP/gn/wDs69AooA8//wCFp/8AUheOf/BP/wDZ0f8AC0/+pC8c/wDgn/8As69AooA8/wD+Fp/9SF45/wDBP/8AZ0f8LT/6kLxz/wCCf/7OvQKKAPP/APhaf/UheOf/AAT/AP2dH/C0/wDqQvHP/gn/APs69AooA8//AOFp/wDUheOf/BP/APZ0f8LT/wCpC8c/+Cf/AOzr0CigDz//AIWn/wBSF45/8E//ANnR/wALT/6kLxz/AOCf/wCzr0CigDz/AP4Wn/1IXjn/AME//wBnR/wtP/qQvHP/AIJ//s69AooA8/8A+Fp/9SF45/8ABP8A/Z0f8LT/AOpC8c/+Cf8A+zr0CigDz/8A4Wn/ANSF45/8E/8A9nR/wtP/AKkLxz/4J/8A7OvQKKAPP/8Ahaf/AFIXjn/wT/8A2dH/AAtP/qQvHP8A4J//ALOvQKKAPP8A/haf/UheOf8AwT//AGdH/C0/+pC8c/8Agn/+zr0CigDz/wD4Wn/1IXjn/wAE/wD9nR/wtP8A6kLxz/4J/wD7OvQKKAPP/wDhaf8A1IXjn/wT/wD2dH/C0/8AqQvHP/gn/wDs69AooA8//wCFp/8AUheOf/BP/wDZ0f8AC0/+pC8c/wDgn/8As69AooA8/wD+Fp/9SF45/wDBP/8AZ0f8LT/6kLxz/wCCf/7OvQKKAPP/APhaf/UheOf/AAT/AP2dH/C0/wDqQvHP/gn/APs69AooA8//AOFp/wDUheOf/BP/APZ0f8LT/wCpC8c/+Cf/AOzr0CigDz//AIWn/wBSF45/8E//ANnR/wALT/6kLxz/AOCf/wCzr0CigDz/AP4Wn/1IXjn/AME//wBnR/wtP/qQvHP/AIJ//s69AooA8/8A+Fp/9SF45/8ABP8A/Z0f8LT/AOpC8c/+Cf8A+zr0CigDz/8A4Wn/ANSF45/8E/8A9nR/wtP/AKkLxz/4J/8A7OvQKKAPP/8Ahaf/AFIXjn/wT/8A2dH/AAtP/qQvHP8A4J//ALOvQKKAPP8A/haf/UheOf8AwT//AGdH/C0/+pC8c/8Agn/+zr0CigDz/wD4Wn/1IXjn/wAE/wD9nR/wtP8A6kLxz/4J/wD7OvQKKAPP/wDhaf8A1IXjn/wT/wD2dH/C0/8AqQvHP/gn/wDs69AooA8//wCFp/8AUheOf/BP/wDZ0f8AC0/+pC8c/wDgn/8As69AooA8/wD+Fp/9SF45/wDBP/8AZ0f8LT/6kLxz/wCCf/7OvQKKAPP/APhaf/UheOf/AAT/AP2dH/C0/wDqQvHP/gn/APs69AooA8//AOFp/wDUheOf/BP/APZ0f8LT/wCpC8c/+Cf/AOzr0CigDz//AIWn/wBSF45/8E//ANnR/wALT/6kLxz/AOCf/wCzr0CigDz/AP4Wn/1IXjn/AME//wBnR/wtP/qQvHP/AIJ//s69AooA8/8A+Fp/9SF45/8ABP8A/Z0f8LT/AOpC8c/+Cf8A+zr0CigDz/8A4Wn/ANSF45/8E/8A9nR/wtP/AKkLxz/4J/8A7OvQKKAPP/8Ahaf/AFIXjn/wT/8A2dH/AAtP/qQvHP8A4J//ALOvQKKAPP8A/haf/UheOf8AwT//AGdH/C0/+pC8c/8Agn/+zr0CigDz/wD4Wn/1IXjn/wAE/wD9nR/wtP8A6kLxz/4J/wD7OvQKKAPP/wDhaf8A1IXjn/wT/wD2dH/C0/8AqQvHP/gn/wDs69AooA8//wCFp/8AUheOf/BP/wDZ0f8AC0/+pC8c/wDgn/8As69AooA8/wD+Fp/9SF45/wDBP/8AZ0f8LT/6kLxz/wCCf/7OvQKKAPP/APhaf/UheOf/AAT/AP2dH/C0/wDqQvHP/gn/APs69AooA8n8N6//AMJH8dZLz+yNV0vZ4aMXk6nbeRI2LkHcFycrzjPqD6UVsf8ANwv/AHKn/t3RQB0Hjv8A5J54l/7BV1/6KajwJ/yTzw1/2CrX/wBFLR47/wCSeeJf+wVdf+imo8Cf8k88Nf8AYKtf/RS0AdBRRRQAUUUUAc/4E/5J54a/7BVr/wCilroK5/wJ/wAk88Nf9gq1/wDRS10FABRRSMyohZmCqoySTgAUALRWbpviLQ9ZleLStZ0++kRdzpa3SSlR0yQpOBV25urezt2uLqaOGFcbpJGCqMnAyT7mgCWiuKb4gWvnW8JmsIWGpfZJ2e5VkaLYziVDkcH5Rz0ORzjNamk+LdP1FiJb3ToTNOY7OMXitJMvYlezHBIXk4xnByAAdDRWHrHiCHTNS022NzaIk8zpcGVwDGqxs+eoxyo6+tVP+Et86/uYbRNOa1ieBI7qe/MazNKgZAuEYHOcDnmgDp6KyNG1iXULS7nvbeG0+zXUluds+9TsON2Sq45z2rNsPFy3zXcMc2ltdxXssEcMl55ZeJWCh+jE8kDpjmgDqaK4t/Gt+miX2pf2VZH7HLJG8P8AaDbjslMeR+66Eg11F1qUFkyJMlyzMM/ubWWUfminH40AXKK5bRvGUV+b83NvdIkV9JbW5jsJzvVccn5T82d3Ht0FbFtrVtdXy2kcF+HZC++WxmjjGD0LsoGeemaANGisW61t4fE9vpiJD9nW2a4u55H2+UCwWMD3Yh+vZaiTxLbt4on0w3NmLaOzjuBL5oyWZ2UjrjooP40Ab9FUodX0650ttTt72CaxVWY3EUgZMLndyPTBrN03xEzadbyatA1ve3CtMlpBFJNIkRY7C6qCQcYz2zkUAb9FY9p4n06/mto7Rb6ZbgsqTLYTeUCuc7nKbRyCOT1qvq3iuLS5NTjXTby6bTrYXM5iMYUKQxHLOD/AegNAHQUVz9lruo6ndX8VnplsFs5hCxuLwoxYxo/RY2H8YHXtV/QtTfWNJjvZLcW7s8iGMSbwCjsnBwM5256UAaNFc1rus6uNbtdB0CK0+2ywNdTXF6GaKGIMF+6pBZiTwMjGDmneHda1K41O/wBF1uG1TU7JUl8203eVPE+drAMSVOVYEEnp15oA6OiimTTRW8LzTyJFFGpZ3dgqqBySSegoAfRWdpmv6NrRkGlatYX5iwZBa3KS7M9M7ScdDV+SRIYnlkYJGilmZjgADqTQA6iuK1X4gWtmmppBNYNJbCGS3mNyrRzo77WHBBDLhsj6HvitG38ZaXLf3ay6jpkNhEVSKd71A0r5+bC/3RwAc8nPGMEgHSUVj+I9aXRdJe4jltxPvjVFmbghpFUnGQehP5VSvfF8Ed/Hb2DWF1D9nnnmunvNkcQiZVcEqrcjdz0xigDpaKxNK1q6vtXu7K4tLWOOC3inWeC6MqyCQtjqi8YXOfeqbeLrdde1DTvtOnfuYoWtvNuhH5zvvJXPPQJngGgDp6K5aHxPqM2oX9mNP08SWmwg/wBoNiUNHv8Al/dc8Vo6br6Xfh7TdVuLaaI3sKSiKCN7gpuXOMoufxwKANiiuWtfGMUviDU7OS3ultLRIdkgsJ95d8khht44244Gc1qrr9o9zBbrb6kWmfYGOnTqq8ZyzFAFHuTQBqUVj6zrEun32l2dtFFJLdznzPMbaI4FUl3z7fKPqwqG98S29tr+l2EdzZtBdrMZXMoymwKRjnHOT1oA3qKq2Wp2GpGcWN5b3PkSeXL5MgfY2M7TjoeaybHxIJTd3F2ixWRuTBp5jVnluQo+ZggBJG4NjHYZ6c0AdBRWIfFmmFnWJNRmdJVhkWHTrhjGxwcNhPl4IJz2NT3+tJY6na6elnc3VzcxSSosOwYVCoOS7L/fFAGpRXLaZ4su9auIorDSkQvZpdn7XdbCFZ3UD5FcZ+TPXvWpo+q3Goz6jBc2kdvJZXAgPlzGRXyivkEqpH3wOlAGrRRXn3iL4k3/AIUEk2seEbyK18xkhljvbeRpgMnIjDbsYGTxwOuKAPQaKhs7lbyygukUqs0ayAHqARn+tTUAFFZdj4k0LU7xrOw1rTru6UEtBb3SSOAODlQc8VqUAFFMlZkhdlALBSRnpms3wzqc+s+GdN1O5jjjnurdZXSMkqCRnjPNAGrRWZ4g1ZdF0K+v98Ilgt5JY0lbAdlUkCse/wDGJg0S51KxTTb8WtsZpo0v9rhlUFl2hG6ZXqe4oA6uiuei8Q3h1rTrGWxtPKvfOxLDeFyhjAyCpjHOTjr60viDxTBo2jaldRw3Tz2kEjqGspjGWUEgFguMZ75/GgDoKKxbXxHbS20RmhvlnMatIiadcEKSP9zpnNXtP1KHUopJIYrqNY5DGRc20kBJHcBwCR7jigC5RWFpHiAX7X8ty1tb2qXTw2jtLhpkTCsxB/2wwGOwqDSPF9hc6O19qV/YWuLqWAZmCg7ZWjXqepwPzoA6Siq93f2dhEst5dwW8bNtV5pAgJ64BPfg1gab4xsbzUdQ82/0uLT4pBHaym8XzJSB85K54XPAOecHtg0AdPRVSx1Ow1NZWsL23ulibZIYJVcK2M4ODwcEVhL40jljs5YdJvjBdySxxzO0SrmNXJ4Dlv4COlAHUUVyzeJ9UXwzDrp0m0NtLDHMIxfNv2vjA/1WM/N611NABRWbrd9qOn2Im0zR5NVnLhTBHOkJC8/Nucgfh71znhj4iR+IvE1zoEuj3Nje20TSSF5o5Y8qVDKHRiCQWGfTvigDtaKKpalq+maNAs+qajaWMLtsWS6nWJS3XALEc8GgC7RUFne2mo2kd3Y3UN1bSDKTQSB0btww4NNvr620+3825uYLcMdqPPIEUtgkDJ+lAFmiuJt/iJYyz6cZ5bO0iliuWukknVnjeIgAKQeQ2SQccjGK29E8SWmpxQRzXenx6hMGdbSC8WVwoPHTuBjOMgHuetAG3RWBqXia007XLS0mvbKK1aCeW4kllAMezZjnOB945z6VBF4pmub+4t4INPVEuzaQvcX5jM7+Wr/KBGc8N0z2NAHTUVk6LrR1HRU1C9ihsi0skZXz96ja7J94heu3PSsnRvF76xpNpNbnS5b6RC01ub3yynLbcAKx5Ck8+hoA6yiuOtPGd7c6XpN//ZloIr+a3iKLfEvEZcEZHl9gc9ea7GgAooooA8//AObhf+5U/wDbuij/AJuF/wC5U/8AbuigDoPHf/JPPEv/AGCrr/0U1HgT/knnhr/sFWv/AKKWjx3/AMk88S/9gq6/9FNR4E/5J54a/wCwVa/+iloA6CiiigAooooA5/wJ/wAk88Nf9gq1/wDRS10Fc/4E/wCSeeGv+wVa/wDopa6CgArgvidNNJH4d0lLf7TDqOqJFPbmTYsyqrOEY/3CVGeDwDweld7WL4l8PL4hs7ZUuWtLyzuEurS4CB/LlXOCVP3lOSCMjI7igCnpniS7XxMPDeraXb2N01p9qtmtLozxSIrbWXJjQqRkcYxg9a19Ws7S5ginvZJFgs5BdEIxAJTJG4DqAeceoFZmm+GrmPxE+v6xqEd7qAt/ssAgtzBDDGSGOFLuSxI5JbpgYFbV9bfbNPubXfs86Jo92M4yCM4/GgDz+HxJdwXE0stnfXVtf6gRYyGS7jHlMm5cKsRG35Wxgk89K1/CckN4zWmqCaXVrSea7SO5WZvJjkkcRlTKoz8owDjIGemTV660W6jtPDNpbnzk065iMz8LlEhdN2CfUjjnrVrT9FuLXxDqGq3N99o+0RRQRJ5QQxohY/MQcMcueQBwB9aAM3xJdzW2veHi0dogN5IIzLcFAx8lwM/LxnIHfqK5fxVeX+ky3Gp6hp6b/wC0bOZIopSUk8qJnfa5UEgYIztFdxd6V/aN7Pd6ha+fDHbyW0FplSXV8b2OTjLYAAzwOvXAx73wfd6loE1rLMqzR2LWlhFLIXEQIA3yPjLOQACQOBkDPJIBraLa31rp2pAwrHNJfXE0QkwwZWclTwe9cmv2+R7jRre2i1W11WN7+5VVMJtzM42Bm3n5RtcnALfLwK6vTR4ghOoXOo2VjvkMYtra0umkAwuCWd0TAzzwpwM9elZFj4f1zQ/ts0EOnakdRkM1zE00lu0LHPyxPh8qM8AhcEk55wADkLmyvJ/C2qTNBsWznvFe+yP32+7yY1TJwMoCSenAHUkesarqMOk6XcX0+SkKZ2jq56BQO5JwAPU1wc2l3jaLBo58F6yLWObzW8jW48SEvvbezSAuCeu4HrxXaXltLM1rdS2jXE8WClusq+VHJg/OScE46ZwcdQM0Aecyy3MOk6HZXNhN5lvq5vbkSxMplKK807qCMlQzBVOOSOM5Feh6O+rXMtzfXskC2k4U2dpGoLRpj7zODgls5wOBxgmksNHlGpSatqckc188fkokYPl28eclFzySTjLHGcDgAYqpoelaxoepTWSTWs/h7G61V2YT2xJ/1Y4IZB2yQQOOcCgDMtf+JJ4s1vUL+aWWWWxgmkiRyy7y8iqiL0J4VRxkn61h2mn3mh+K9S1mWLzdVNlDf3kcfJcGSRWiX12pgL6lB61239kNP4tu765t45LRrKKGMtg5cNJu4+jDn3NZ6+DNMfxXdXUuh6c2ntZRRIrW8ZBkV3Ynbj0K80AHiLVNI1LwhDqw19rXTDJHKLi2MR87n5Y/3ileWxwR1HPep/Clqpa61G5lmudTudvnXEsDIAg+5GjFVDKAeqjBJJ4zitG606a10z7P4fg020kMgYCa3JiXnLNtQrlu/Uc96iTT9bjl8wa1DKSvIms8qp77Qjrx/vbiPWgCr4E/5E6z/wCuk3/o565TxbHv1Txi32W+l26RD89vc+WifLN99d67h+DV1Oj6Frej6faWMWsWLQQys8hOnNukVnLFQfOwp+brg/Sm6n4WuNSu9ecagbeLU7KO1XYgYqVDglgRz9/oCOlAGPao6a7rMm7TY4JL9I2kurMyFW+yxty29cA4P4/WtzwQDH4dFsfMbyZ5gJTbtCkgZy4aMNyU+bAPfHcc1Ug8O6jdXmu2180UOnXU6SwyxNmZmWKNQ47JtZMjqSfQDnW0D/hIEilg14WMjRNtiurZmBnXszRkYQ+uGIznoKAOI8e+IdKt3uNU03UdSsfEGlQSxxyJpc8kUo6mNyY9hUlR82Rjrmq3gfxVH/wlYtprXVtQudVt45J9antJIo/MA+WFY/LAVACcNnBJPJzmvRPEmnTav4Y1XTbdkWe7tJYYzISFDMpAzjPHNZ2meG9Qs9ettSl1y5a1j05LQ6YM+SJFxmQc9ePTPv2oA6WoLyKKe0kSa1W6TG7yCqtvI5Aw3GcgYzjmp6qalb3d1YSRWF8bK54Mc/lLIAQc4KnqD0OCDg8EHmgDhUu2u/i7pt3qOnS6JINOlgtkutpkvmLBiu6MsmEC52lt3zZxiu61PTodW06axuGlWCYbZPKcqWXPIyOx6H2JrDi8MX154gsNY13VLe7k04P9khtLM28as42s7bpJCxxwOQBzwa6egDzq/wDE0ttqmp6nBBeXmjpHFFCVe5iQSK7pJt2xleu0Ekjpxmruizx3mtXthrSTk3c6z2NrcC4ePbEibiDKijhznBHXB9KvXvhy6t/BE+j2cn2id7gyg4CZDXHmEcnsCR74rRk0W4l8V2+ryX263t4JI4rfygGDOVyd4PIwowMZ680AUfHM0sPhyZvLgEImt8yPKVx++TttPH41heMv7RubW8vLi1txbHR7yCOW3mMqOZWiEYJKry3PAB+prsNQsJNTvrVJRtsraVbgjIJmkXlB7KD831A7VmWvhsu4gMRtNKS6a7W0Lh2eUncM44VA3zBQTk4ORjBAIfCMtzqUsms/ZDb295p1qItzhgGXzMjjB4yvYdazLq81PTtda9toor651GX7LNYRQ7XEdushJVmkAy25OvA3DrWj4a0rxFo/2K1vItPNhYWckCm3uXeWdiylTtZFVOFPG5uvWmroWuQ69c+I4Y9OkurhPJ+wTu6okfHIlAbDnA3fIQcKP4ckA5vT9GvI9R1HS0slQ2zW8guFlytkEtsBRk7pGwxUEjB5JHRT2vg+WO38AaJNM6pHHp0LO7HAUCMEk1z0llqUFrqUC+ENU36hJ5k01lribshcDa7urADsuMe3auhtdNz4ZsbWfTJ4oLeNFGmrOjsyqAFV2yFOMcjdg+poA4TU7m61Lw7r8QsJ0l1u4hKNPEyq3mOkcKKSPm/dJubGcbsdc13mjXWp6pdx3yGG20YQ+XHbFN0sj55YkH5AuCoXk9c44FSx6Tc32rQalqrRD7KWNpaQkskbEYMjMQNz4JA4AXJ69arR6Tq+l+JWuNLltX0a8YyXdpOWVoZe7xEAj5upU4GeQRk0AUr23a28fafql7csim1ukCCQiOOJNh+YdCSSWOenHpmufvNMur/xlpuvMnlahdx3JsklGPKiiVTErem45ZvTfjtXbajpkt74k0q5aFHtLaKfzCx/iYx7eO/3SfwrP1Lwhp934k0q5XRrBrSJLj7TugTDFwoXIx83OaAJv7a0/wASeD725h1N9OQROl1KpUS2bKPnVsggEc9vcdjWb4SjtdQvYdSa8uL9YoPK05ntx5cUPGW3oix72wMgdAAPWukGk2+n2FzHothp9rNImFUQhI2YDC7woBIwAPpVWPTtf2xSTa1bGYffiSzKwA9toDh/zcg+goAg8M/8hjxR/wBhQf8AoiKqPiSPzPHGhj7NeXH+hXfyWlx5L/eh53b049s1attB16yfVJbbWtPWa/uPPLPprsIzsVOB5wzwn61dvNGubrxFpupC7ES2trNC/lqNzM5jIwGBAHyH36UAcLoSSJHp06LaBYtFt/M+125mKqZnBPDjoMk8npXVeE1+z6rrsO9ZlkuFmE1vatFb58tUKKSSCwKc4Jxn1yBV03wxqmnanb2nmW0+mDTFtJ7iRfnfEjkqI+gyG6kkcdDnjT0Oz1/SryTT7l7W80aNR9lumkZbhF7RuuCHxwN2QcYyCc0AZj674r1i8vZPDdnpI0+yuHtidQeQSXTocPs28IAcqCc5I6VyGNR13S7fUptKudT1PxKk+nyXMY/daJGcoVC88A53HI3EHnoK7S48I6vb3t8+geJW0y0vpTNNbvZLPskb7zRMWGwnrghhnnFSnwa9sPD0Gla1e2FlpLlpYEOftoPUSHIySck5B6njuADorC2Nnp1ralgxhiSMsBjOABn9KmdEljaORFdGBVlYZBB6ginVFcxyTW0sUU7wSOhVZUALISOGAYEEj3BFAHnXia58zxR4SS70eXQ7Cxv/AN1fXHllWbbsSFPJZ9gfI+/sGFxyeK9Krkrnwrq2tNYReINbtbqzs50ufKtLA27TSIcrvYyuNueSFC5OOQOK6xlV0KOoZWGCCMgigDmLSC41bxFc6608yafb27WtlCrkJNnl5WA4YZAVc9lJHUVk6dLqWn/DLRNY0pTPPZWEcktmT8tzEFyyj0cDJU+vHQ11msvqcGlSto1nb3VyqkJbzSmINx0DAHB+ox7imeG9Ml0jwvpmm3LI81tbJFIU+6WC4OM9qAM/VbpfEPhCKWymSKz1aBYvNkiLNGsy7VbG4dCw4rjNfk1LV/DGrGS0iNtpkN1Fb6io2K6KnlsoTeSWLK3JwAAOp6ega9Y3V9pTaTYRRxJcJ5TTtwtunTKqOSw/hHAGM54wecu9A1WLQItBm0a11XToVCLJbag9rLIoOcOpGDn+L5yG54GaAIrO0uI/HOkXk1qbJbp7xxbFw5JEca+YxBIBYKDgHAHXJJrV8dXaNpkWkhJpWvHDTpBG0ji3QhpCFUEnIAQY7uKr2cWoXni211K48L6naPHE0YluNUje3jDYyRGrthsDHCjPf1rZmtL2G6uH0+BWvLgAPfXbAqi84VUXkhc/d+UHOd2c0Acla6pet44vr9NOQ3cun21jFG7bRFcEPMY2bsArAnGT8vAJwK7KO11f+wEtLi/il1F12S3ccXlhc9WVcnkDp74qq3hS1Ph6bSxcTiaWQ3DXuR5v2jO4S+mQwHHTAx0q3oI1xNOEevmye8Rivm2ZbbKvZirD5Se4BIoA5LS4pF8F2/hzTpJfPup7m2EjyF2gt1mdWfJyeFwq/wC0RVfwfeWfhKwtoJdltpN3eXNtG5OFhlSdwgJ7BlwufVQO9dPofh6GPRzBqthbSzPcTSssirIMGV2Xrns34ZNVPDngvS7TTCuo6HprXP2i4cFreNyEaZnUZx6bePYelAE3jFWL+HnjVWddXhKhmwD8j98Gt3zNQ/59rb/wIb/4isjxPpmoX40ZdMESG21COaRnXKoiqwztyCeSOAaveRrv/QR07/wAf/49QBmeEt5vfEhkRVc6q24K2R/qou+B/KuO0SLFr4eY2t8m65vf3stzuhb5J/upvO3/AL5Heu68N6ZfadJq737RO91ftOjRLtDLsRc7STjlTxk1m2fhG8tdN0yJtQ3SWMtxL5QQbHMgkAUHAIx5g556dKAOaFtK/gSC1km02FxY20kQj05mmkBAICYclnypHCn8K7nXfEJ0nQI9QispZrm4eKG2tX/ds0shAVWJ+7gnn0waxbTw/wCIU8NaXMlxZ2mvafbrHDHgvCV2gNFI3Vg20HIxggYzg52L/R5vEnhtbTV1WyvCUlD2cxk8iVSGVkZlGSCB1HtzQBymsXfjc3Om6Lq9xpVla6vcG3a/0vzPMiwjMYwH6MwUgP254zip/BGmS3GpxaoNBm0C106CbTIbGYZaVfMVhKDgdcHPXJ5yeta9j4W1STV7TUPEGv8A9qGxy1rDFZrborlSpkYBmLNgkDoBk8Vf8MaHe6Dp89tfa3d6vJJcPMs1z95FY8IOTwP8gdKANuql59gtQdTvRbx/ZY3P2mUAGJDgt8x6DgZ+gq3XLeMvCt94pFjBFqtvb2EEnm3FncWZmjumGCofEiHaDztzgnGelAFD4aWzmy1nV0ge2sNX1KS8soGXaREQAH29txBbHoRXR6umn2rw61qM0scenhmXBYopYbdxUdTgkD03GpNLg1aBXXVL2wuRwIhaWT2+31zulfPbpjHvSa/pX9t6Hdab53k+eoHmbd23BB6ZGelAHD6drup2kFpp9/p9/Lez+eyySTXinCtkZAiPZl6Z98V0Pg0213ptqblpJ9a063S1u5LhJPMjcqGYZkAPOQSR149BV+/sLu48U6VeRAi2gt7lJHDDKs/l7cA9funt2p2haNPpc2pz3V6Lqe+ufOLLF5YVQiooxk5OFGTxk9hQBk6veXcHjPSAsNkJ3tbsQpLdFA7ZiwCdhwT7A965zVby70fX7C6vbHMkuvmVY1fgxtAkBcEjkB5BzgZ9q6++0NdUGo3OpWrz/aYPssVtGyho4s5yGJADlsNnPG1cZI5o6p4W1HUrB7h5bd9TQwC2jkkbyo0jlWQqX2kksUG59vYcccgFzTY77RvCDGSFI54JJ5WSQb/kMrsCMHrtINc3aWuogf8ACMQww39lprQsuoKhiEM3MpLDeS2AUwo6k8kCuntF8RRWN+13Z6e95c3BMMUVwzxRIUUfO7KpPIPCr3A96xrbw3rOhaHLpEFtbataS7neZbuSzuQzDnBAbPoDuXAAHOM0Ac3pNpcvo3hW/a1NrEJtOt95cM13tyQ2ASFUbyOzE9cAYPr1efixvZJtFtx4N1SCHTHQQAavF9nXaMKXUSEsB1ztLcfhXoAzjnrQAUUUUAef/wDNwv8A3Kn/ALd0Uf8ANwv/AHKn/t3RQB0Hjv8A5J54l/7BV1/6KajwJ/yTzw1/2CrX/wBFLR47/wCSeeJf+wVdf+imo8Cf8k88Nf8AYKtf/RS0Aa9/qNjpVo13qN5b2dspAaa4lWNATwMsxAqtpviLQ9ZleLStZ0++kRdzpa3SSlR0yQpOBXLfFl2j8LWDrG0rLq9mRGhG5j5o4GSBk+5Aro4NekFtcXOpaPqGlwwKG33Jhk35OMKsMjknOBjGSSAMmgDYoqhpWs2OtQyy2Ukh8qTy5UmheGSNsA4ZHAYcEHkcg1foA5/wJ/yTzw1/2CrX/wBFLXQVz/gT/knnhr/sFWv/AKKWugoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA8/8A+bhf+5U/9u6KP+bhf+5U/wDbuigDoPHf/JPPEv8A2Crr/wBFNR4E/wCSeeGv+wVa/wDopaPHf/JPPEv/AGCrr/0U1HgT/knnhr/sFWv/AKKWgCTxV4d/4SbTra0+1fZvIvILrf5e/d5bhtuMjrjGe1X9X1H+ydJub8Wl1eGFCwt7WIySyHsFUdTV2igDmfBsguLa9vZ0uV1C7mE10JbKe3VTtCqieailgqqBuA5OTxnFdNRRQBz/AIE/5J54a/7BVr/6KWugrn/An/JPPDX/AGCrX/0UtdBQAUUUUAFFFFABRRRQAUUUUAFFFcc/jiZbW+uBYWgW1+0sInvGWSVIHKsVHlYPTpnjIzQB2NFco/i+5i1a3099PtpHkuo7WXyLp2MJdGcE7olU/KuSA2eR6itHxFri6LbW7rNarI91DEyzvjCO4Vm6joCT6cUAbVFcxceKmuEmXSBBdOhXEiRzzxkEBh80cZHKkHgnr3q3p+vyahrLWCW6IIofNm8zzo5FBJCYV4lBB2t/F26GgDcorFutbeHxPb6YiQ/Z1tmuLueR9vlAsFjA92Ifr2Wok8S27eKJ9MNzZi2js47gS+aMlmdlI646KD+NAG/RVKHV9OudLbU7e9gmsVVmNxFIGTC53cj0wazdN8RM2nW8mrQNb3twrTJaQRSTSJEWOwuqgkHGM9s5FAG/RWPaeJ9Ov5raO0W+mW4LKky2E3lArnO5ym0cgjk9ar6t4ri0uTU41028um062FzOYjGFCkMRyzg/wHoDQB0FFc/Za7qOp3V/FZ6ZbBbOYQsbi8KMWMaP0WNh/GB17Vf0LU31jSY72S3Fu7PIhjEm8Ao7JwcDOduelAGjRXNa7rOrjW7XQdAitPtssDXU1xehmihiDBfuqQWYk8DIxg5p3h3WtSuNTv8ARdbhtU1OyVJfNtN3lTxPnawDElTlWBBJ6deaAOjooooAKKr299Z3c1xDbXUE0tu+ydI5AzRNjOGA6HHY1NJIkMTyyMEjRSzMxwAB1JoAdRXFar8QLWzTU0gmsGkthDJbzG5Vo50d9rDgghlw2R9D3xWjb+MtLlv7tZdR0yGwiKpFO96gaV8/Nhf7o4AOeTnjGCQDpKKx/EetLoukvcRy24n3xqizNwQ0iqTjIPQn8qpXvi+CO/jt7BrC6h+zzzzXT3myOIRMquCVVuRu56YxQB0tFYmla1dX2r3dlcWlrHHBbxTrPBdGVZBIWx1ReMLnPvVNvF1uuvahp32nTv3MULW3m3Qj8533krnnoEzwDQB09FctD4n1GbUL+zGn6eJLTYQf7QbEoaPf8v7rniraeJGPgQeJXswD9g+2m2Euf4N23dj9cUAb1FcsPFV41xbwJY2DyzXH2YqL5wYn8syfODFwNq8HnOR25qTQfFT63qhtBZxCE2i3SXMUzMrAuyAYZEP8JIPIIoA6Wiuf1DxNBY+IrTT3urFIZbeV2aWYKwlV41VM5wMl/TNV18UT3LW09nbCWzfJdhbXTFhjgowhx1+tAHUUVlaHq76zHczCKJII5jChVpNxK8MGV40KkHI4zVfTPEAvbzU/PNvBZQXJt7WVpMNMVAEhwewfK/gaAN2iub0zxfYTafe3mpX1hax295NAGMwUbUcqpOT1PFaGvapJpeiy3NrEtxdviO1hzxLK3CDjtnknsATQBqUVjz+JNPsYZDfTEPboDdPBBJLHC2MkFlUgY98HGKsWOs22oXclvDDfKY0Dl57KWJGB7KzqAT7D1oA0KK5lfGUcv2RodKvmhurmW2SZmiC7ow5Y43lsfu27VEfFOp/8IoniEaRaG2e2W5Ef25t+1gDj/VYzz60AdXRQM4GRg1Q1i8vrHTnn07S31K5BAW2SZIiwJ5O5yBx1oAv0Vw+hfEYat4u/4Rm70O6sL9Y2eQtPFNGhUAld0bEbsEcdRnmu4oAKKRmVELMwVVGSScACorS8tdQtI7qyuYbm2kGUmhcOjj1BHBoAmoorH1rVbnTtQ0WCCKJ0vrz7PKXJBVfLd8rjv8lAGxRRXO6j4rtdO8RW+ny3VjHBJayyvJNOE2yK6Kqk9Bnf9eKAOiorl/8AhJ9Q/tiPTvsOnEyW5mSUaixQnzAm3Pldcn9MVp+H9Xl1rT5bia1S3eO5mtyiSmQHy3KZyVXqQe1AGrRXGJ45nk0171dPtBtUyCBr1hIyCUx7gPKwRuHODxkeoq1H4tuDr1tpbWFu5kumtJZILl28l1iMh+9GobgDoTjNAHU0Vh6/4gi0aXT1NxaRrNdLFOZ5AvlxlGYt1GPujk8VUm8USzhhpkcU5jlVXdYriZCvBIDRxEZ2kEHJHIoA6eisXS9dk1TVLi1SCNI7eNTKW85JFZvuja8SjBAJzn8KH1xh4ok03bAtnb2okuLiR9pWR2+RB2+6rE/h60AbVFc/beJ7aTxDqdhLdWaW1pDDKkvmgE79+4HnHG39a1YdUsLjTF1KK9t3sGTzBciQeXt9d3TFAFuiuYk8Y2LeIobK3v8ASmsUhL3VxJeKpVifkVOcMeGJ9BjnnB2LXW9Kv7o2tnqdncThPMMUM6uwXOM4B6ZoAv0VzmpeLo7A6kI9Lvbr+z3RJmjMSrucKQBucHow7VJZa3qepG9a00208q1upLYma8ZWYocE4EZA/OgDforP0PUm1jQ7PUWg8g3MQk8rfu257ZwM/lVq7lmgs5pbe3NzMiFo4FcKZGA4XJ4GemTQBNRXnx+Js9n4i0/Q9Y8MXlheXsqogF3BOEDHAZ9jEqCemRzjjNeg0AFFFFABRRRQAUUUUAFFFFAHn/8AzcL/ANyp/wC3dFH/ADcL/wByp/7d0UAdB47/AOSeeJf+wVdf+imo8Cf8k88Nf9gq1/8ARS0eO/8AknniX/sFXX/opqPAn/JPPDX/AGCrX/0UtAHQUUUUAFFFFAHP+BP+SeeGv+wVa/8Aopa6Cuf8Cf8AJPPDX/YKtf8A0UtdBQAUUUUAFFFFABRRRQAUUUUAFeb+IPDb2fhXWJzLqLMiXtxF8lsFj83czAZy2MHBOc/SvRZkV4XV4/NUqcpx83tzxXLQ6VqFxa6a15pGnfv55Bf2jxxsqQNuKjOOWX5AcZByfrQBX/seSG80iSQ6q1vFefapHla0WNXKMu5yMOclscZ7Uz4gyXVw+i6dZTNCx1C3mnmUAmNBIFXggjJdgQCP4W9KlvfD19daS8c2l6TdywX2YoZreMx3NvuGN4K4VwpOCO6j1IrY8QabNd2tollBGXW9tpJOi/u0kDH8gOlAHHT6fcyavcW2sOst4JYrx/stq8qyAwCLO3ypFA3K3XnitfwVarBf3gthm2tLS3sfmR0fzELucqyJjiRTwMc1cvvDt7fa9JqbSRxbrdIBGrI2NrMc5eJuu7tjp3qxoOk32jXNxHsgktbqVp5ZTMBIr7VUAIsSqRheuR9DQBk2v/Ek8Wa3qF/NLLLLYwTSRI5Zd5eRVRF6E8Ko4yT9aw7TT7zQ/FepazLF5uqmyhv7yOPkuDJIrRL67UwF9Sg9a7b+yGn8W3d9c28clo1lFDGWwcuGk3cfRhz7ms9fBmmP4rurqXQ9ObT2sookVreMgyK7sTtx6FeaADxFqmkal4Qh1Ya+1rphkjlFxbGI+dz8sf7xSvLY4I6jnvU/hS1UtdajcyzXOp3O3zriWBkAQfcjRiqhlAPVRgkk8ZxWjdadNa6Z9n8PwabaSGQMBNbkxLzlm2oVy3fqOe9RJp+txy+YNahlJXkTWeVU99oR14/3txHrQBV8Cf8AInWf/XSb/wBHPXKeLY9+qeMW+y30u3SIfnt7ny0T5ZvvrvXcPwaup0fQtb0fT7Sxi1ixaCGVnkJ05t0is5YqD52FPzdcH6U3U/C1xqV3rzjUDbxanZR2q7EDFSocEsCOfv8AQEdKAMe1R013WZN2mxwSX6RtJdWZkKt9ljblt64Bwfx+tbnggGPw6LY+Y3kzzASm3aFJAzlw0Ybkp82Ae+O45qpB4d1G6vNdtr5oodOup0lhlibMzMsUahx2TayZHUk+gHOtoH/CQJFLBrwsZGibbFdWzMDOvZmjIwh9cMRnPQUAcR498Q6Vbvcappuo6lY+INKgljjkTS55IpR1Mbkx7CpKj5sjHXNVvA/iqP8A4SsW01rq2oXOq28ck+tT2kkUfmAfLCsflgKgBOGzgknk5zXoniTTptX8MarptuyLPd2ksMZkJChmUgZxnjms7TPDeoWevW2pS65ctax6clodMGfJEi4zIOevHpn37UAdLVbULMahp9xZm4uLcTIUMtu+yRM91bsferNRXK3D20i2ssUVwVPlvLGZFU9iVDKSPbI+tAHC/DzTLPRvEXjHT9PgEFrBewLGgJOP3CnknkknJJPJJrtNT06HVtOmsbhpVgmG2TynKllzyMjseh9ia53QfDOuaRr2o6lNrWnXCalMs11EmmvGcqgQBGM7begPIautoA86v/E0ttqmp6nBBeXmjpHFFCVe5iQSK7pJt2xleu0Ekjpxmruizx3mtXthrSTk3c6z2NrcC4ePbEibiDKijhznBHXB9KvXvhy6t/BE+j2cn2id7gyg4CZDXHmEcnsCR74rRk0W4l8V2+ryX263t4JI4rfygGDOVyd4PIwowMZ680AUfHM0sPhyZvLgEImt8yPKVx++TttPH41heMv7RubW8vLi1txbHR7yCOW3mMqOZWiEYJKry3PAB+prsNQsJNTvrVJRtsraVbgjIJmkXlB7KD831A7VmWvhsu4gMRtNKS6a7W0Lh2eUncM44VA3zBQTk4ORjBAIfCMtzqUsms/ZDb295p1qItzhgGXzMjjB4yvYdazLq81PTtda9toor651GX7LNYRQ7XEdushJVmkAy25OvA3DrWj4a0rxFo/2K1vItPNhYWckCm3uXeWdiylTtZFVOFPG5uvWmroWuQ69c+I4Y9OkurhPJ+wTu6okfHIlAbDnA3fIQcKP4ckA5vT9GvI9R1HS0slQ2zW8guFlytkEtsBRk7pGwxUEjB5JHRT0+kWB1T4TWOn7nH2rSI4dyKCw3RgZAJAPX1rMkstSgtdSgXwhqm/UJPMmmstcTdkLgbXd1YAdlxj27VttaXkXgu3tbLRES7ihSG2tZ5kk8gYChnY8HaOSBnOOM0AYGs6FJHqmjgy6rvurvy5nxahnC20qjkL6ZHPYnvW9o2nvaeJrmecXwLWkVvC10bYKyozEhFiweNwzkCkvNEupLq/WGy08xrbLJYTPbxlo7jDAjBH3SNvPX5mGfR0OiTL4h0zUZNK0wj7MwnIhTfaTYHMT43FWywI9geOcgGLqLarqHxRt20y6S3itbGWJTIm5JmEkTSqe+NrKMgghh7EHItdHgurKFbtZmltI47WVYrN5VVoZGLDf5DYOTg7WHTqa7u5sLseKbK9treI20NlcRn5gv7x3jIH47WOcVlw+E72NrxmuEzc3Es5C+UQu9icfNAx4z6/lQBZ8NrdzeFpZrV4ke+uJri3lG4hY5ZCyvhgDnac4IFY+kpNY+FJdC0yaZr24vru2gklcyNDGJWDyknso59CxA711Ph6yvNL0yHTbiKBYLSKOG3kjmLtIqqBlwUUKcjoM1U0bw/EtjdpqtjbSvNezzbZFEgKGVmTrns2ce5oA5TwpPZeCrUo2230aTUbmyZ2OFgdZWEbMfRslSfXb61t+MJ47XUtMnj12S0v3V47K0AiZJHOMuQyMxwOy8nOB1NSaB4L0u2troahoWmtK97cyR77aNyInkJUZxwNuOK2b+11R57VNLmsLW2UESvLbmSRRxgRgMAPqc4wODQBzmr2NrYfCvWYrXz23Wk0ks1xC0cs0hBLOwYA5J9vpxXaQ/wCoj/3R/Kuc1Pw9q+paNf6Y+twtFdxNEZZrMvIFIxn5ZFXP0UVp2ltrMV4jXWo2UtosZUwxWTRsW4w28yt+WO9AHnuixYOhObW+XOr3w82S53Qtxc8Km84P/AR3ohtJJfh7DZyTaZAX0yB4iunM00gZeAuHJZ8jHCntxzXU2XhK7trTTlfUcvZ3txdeUEBR/M83C5wCP9Z156dKqaf4d8QJ4W0tvtFpZ67p0CpboAZItoUBo5T1YNgZIxggYzjJAN3V/ECaR4XbWWtJ3bYnl2rLskaRyFVDn7pLMAfSuS1vUvHlrHZ2uoyaNZW2qXSWhvLDzGlst+ez8MT90NxgkHFdbc6XN4j8Lvp+vQR201wg8wWk5fy2BBVkYqOQQCOOo71mW3hPVp9QsZ/EHiM6pb2Egmt7dLJYA0oBCvIQx3kZ4A2jPOKAMfwlo8kuvQSxaHcaLZ6DJc2sYucs1/5m39/uwMklck85z19PRaxPD2h3uivqbXmt3epi7u2niFx/y7oeka8ngfgPYVt0AZHiHQbPxDYpbag07Wsb+a9ukhRJ8A4WQD7y5wdvQkDORxWL8KwB8MtDAGAIW4/4G1dHqkOpT2wTTLy0tZSfme5tWnUrjoAsiYPvk/Ssnwb4e1Lwvo0Gk3Op2t7aW6bYTHZNDIMsSSxMrA9ewFAGtq+oHTtPkmjiM1y3yW8APMsh+6o/qewBPauTbSJtFj8I2l1eS3l0dVeWeaRy26RoZmbaD91cngDoK7gxozq5RS652sRyM9cVzmq2OtX/AIq0bbb2g0qzma6e584+Zu8tkCbMd9+d2ex4HGQCP+1bvQ/GFro12Hm07VA7WNweWhlUbmhY9wRkqevBHpWf4gn1Gy1k6pbS2zXtttsbe1MBImFxJGQ2d4xjY3/fJNdu0aOyMyKzIcqSMlTjHHpxXKahoWr6j4hg16IWkEliCltaXG5hNnILSMpwrDJC4DbQzHndgAHMtpt5L4ja3/sba2o2Ty/ZXm/49t9yrmSRg3JB+banfAB6tXWeBVePQbpXkaV11K8BcgAsfPfnA4rNaDVrfUru+k8H3Et1cwiB5LLWgVVMk4TeYynODlQDmtPw3YyWXheS2l0S5hCtJILW7u0uJpmLFiWbJXJY8fMffFAHM614ak0zwpI3nak0luGWNzHbAKskyuyjgsBnHc9K3ItHe11vSHk/tQ21tLLIHna0WNZHUr823DlmLnoDz1qa30e9lTSRf6ZpzpKj/wBpQmJGWJiNybTj5tpG30Oc9qry+H7+4sNPa70vSbq4t77EsUtvGUlg3kLLyvyyBcNx3yMcjABX8cNfXniDw5YadcG2aK886WcKG2MY5FjGCCDkhiR6D6VlzabJc6jeW2qfNdRTPNIttavMp82OMbsGGQAZjbHf6V2mt6fcXN1pMlpChEN+s9wchflEbrn35Kis+48N31zrd3qbSxxm4jiTy1MbbQgPd4W67j0xQBF4Mh8v+0pbVA1siw2sQIdGLQpsYMHRSOcdvWq2nlvD2s+JJ55Jry6lW2l8oOSJZ3DgKingdFUeygnpmtrw9pd9ovmWjJA9o8kk5m87955juTt2LGqhcHqD+FLDo3m+I9Xu722i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bio_27	OPEN	The inheritance of the three traits of flower color, stem height and grain color of a diploid hermaphrodite plant involves only 2 pairs of alleles, and each trait is controlled by only 1 pair of alleles. The alleles that control grain color are $D$,$d$; The smooth and serrated shape of the leaf edge is a pair of relative traits controlled by 2 pairs of alleles $A$,$a$and $B$,$b$, and as long as there is a pair of recessive homozygous genes, the leaf edge appears serrated. In order to study the genetic characteristics of the above traits, <image_1>a cross experiment as shown in the table was carried out. In addition, we plan to use the leaves of all serrated green grain plants in $F_2$obtained by selfing $F_1$in Group B as materials to detect all alleles controlling these two traits in each individual by PCR to help determine the relative positional relationship of these genes on chromosomes. It is expected that after all individuals in the tested population are classified according to the principle that the electrophoresis band composition (i.e., genotype) of the PCR products is the same, the electrophoresis profile of the population will only be Type I or Type II, as shown in the figure<image_2>, in which bands ③ and ④ represent genes $a$and $d$respectively. It is known that the PCR products of each gene can be distinguished by electrophoresis, and each relative character shows a completely dominant and recessive relationship, regardless of mutations and chromosome swaps. If the electropherogram is Type I, the proportion of the tested population in $F_2$is 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']	['bio_27_1.jpg', 'bio_27_2.jpg']
bio_28	MCQ	Yeast requires three enzymes X, Y and Z to synthesize tryptophan. TrpX, trpY and trpZ are tryptophan dependent mutants of the coding genes of the corresponding enzymes. It is known that none of the three enzymes can enter or exit cells, but intermediates from the tryptophan synthesis pathway can be secreted outside the body when accumulated to a certain extent. The three mutants were evenly streaked and inoculated onto a medium containing a small amount of tryptophan, and the growth was as <image_1>shown in the figure. According to the map analysis, the order of action of the three enzymes in this synthetic pathway is ()	['A. \\( X \\to Y \\to Z \\)', 'B. \\( Z \\to Y \\to X \\)', 'C. \\( Y \\to X \\to Z \\)', 'D. \\( Z \\to X \\to Y \\)']	A	bio	生物技术与工程_发酵工程	['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']	['bio_28.jpg']
bio_29	OPEN	In strain A, expression of both X and Y genes can increase ethanol production in fermentation. The researchers fused the X and Y genes to build strain E (pictured <image_1>) in which the XY fusion gene could be expressed, which had higher ethanol production during fermentation. There were no separate X and Y genes in strain E, and other genes were not disrupted. Briefly write down the construction idea from strain A to strain E ().		The X and Y genes were obtained from strain A, and four primers were used to amplify the X and Y genes respectively. The partial sequences at the back end of the X gene and the front end of the Y gene were complementarily paired to form a PCR product with overlapping strands. Then fusion PCR technology was used to construct the fusion gene, and then the obtained fusion gene was constructed into a gene expression vector, the gene expression vector was introduced into the strain, and the target gene was detected and identified, and finally strain E was obtained.	bio	生物技术与工程_发酵工程	['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']	['bio_29.jpg']
bio_30	MCQ	Brain calcification is a genetic disease associated with cellular aging. In the figure below<image_1>, the disease in family 1 is only controlled by gene A/a, and I2 in family 2 carries only another pathogenic gene t. The two pathogenic genes are located on a pair of homologous chromosomes. I1 in family 1 and I1 in family 2 have the same genotype. Individuals with two non-allelic disease-causing genes are also known to have the disease. Regardless of gene mutations and exchanges, the following statement is incorrect ()	['A. After cell aging, cell membrane permeability changes and material transport functions are enhanced', 'B. In family 1, II3 and II5 have the same genotypes, and II1 and II2 have the same genotypes.', 'C. II1 in family 2 can produce four types of egg cells carrying disease-causing genes', 'D. If a III in family 1 marries a III in family 2, the offspring may get sick']	ABC	bio	遗传与进化_遗传的基本规律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADGAaEDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACs291/SNPinkutRtoxbqzSL5gLKAMn5Rzn2rSrw/xvaxadealBo1vdxapcXct1vuY7d/PdgMhFaNmKDHXgDJy1AHrmn+I9H1O2tp7TUraRblFeJfNAZgwyBtPOeenWp5NVsotYg0qSbbezwtNFGVPzqpAbB6ZGRx1ryjwRa6R4k1azNob29t4Uhvmubm3t7cxSo2VEYjjUsCykNyRx1q14msoB491EMb7yPs1sgmgvpQ9rNM0uWRMkHIjX5cY4HFAHo+meINL1eFpbO7jdBM8HzHaWdGKnGeoyDgjg1pb1DhNw3EEhc8kev6ivB/Bdz/AGbrv9nXFnYbLeSO5UPo1xJcQqzHCBwBgqFGHZeSSea9HisGtfi2ly93cTtc6TcEJI3yRKJoAFUDgDqc9TmgDsqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigCvc31pZ7ftV1BBu+75sgXP51nWvizQLy5ureHVbUyWrhJQ0gUAkZGCeox3Fc78Q7fT4/I1G8trqSWO3lhilUwiGHdj52MoIBGBjr34NeZ6NdRNLLb3sl3Pqi3UawWgsbVIHicgI0knkAgEnGfl6jAoA94vtZ0/TtPS/ublVtHdEEy5ZcsQByM8ZI56Uja3pyas+lvdIt2kImZG4wpJAOenY8Vwvi/QbbT9I8MaXbRTuFuVtxbfbHjEkYVnKkqQD064zxXBvdxw6/p2pwQpJBqyxIserWU14QHj3jay4LbMKoAJJ3EnPWgD6Ae7to4RM9xEsR6OzgKfxqUEMAQQQeQRXDanaaB/wjtjq+qWYuUt4DBbaeIGiiklcgYWFuQxIwM9Bn61ueDNKu9E8H6bp19KZbmGL5yTnZklggPcKCFHstAG9RRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRQTgE1xej+NNY13SbfU7DwrO9rcKWjZruNSRkjp+FAHaVxF58PYrrUdV1BriEzXj71h+zhYmOBjzsfNIOOhOD6Vof294k/wChRl/8DYqteHfEMmuTalb3GnyWNzp86wSxvIr8lFcEEezCgDJ034fW+n29jImoTxalbzyTPdWwEYkEj73jK8jyyeg7dRTrnwTO99d6lBqpS+nvBdlniBRtihYkYddqcng85NdjRQBxlr4ElsbmPU7XWJl1ySXfe3roGF0pxlCnQKAAF/u478107aZbvrMWqkN9qjt3tlOeNjMrHj1ygq5RQAUVha54jOm3cOmWFm2oatcIXjtkcKEQHG+Rv4VzxnuelUDbePnPnf2l4fjOci2+ySsuPQybwc++38KAOsorntJ8SSzap/Y2s2YsNVKGSJQ++K5QdWjbjOMjIPIzXQ0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRXP6v4ivLHWotLsNHkv53gM7FZljCqG2/xfWgDoKK5j+3vEn/AEKMv/gbFUT+LdTtNQ0+21Lw5Nax3twLdJftKOFYgnkDntQBZ8TeFI/Et1YSS3CwraszbhAryZOPus2dv1xn0xWRafDSwXVNQubx0kguLU2kccalWClw5d3JJaTcoO7tiu6ooA5O68HXNymnK2vXbNYQSJFNIitJ5jcCQnGCQuR071Rg+HEckEcOo6lLPHZW622liNdhtAu0rIPWTKL83tjFd1RQBy134MXWI9Ll1jVLyW/08N5dxav5ILHgttGRnHGfrW/p9kNOsktRcXFwEz+8uJN7nJzyfxpdQ1C10rT5768lEVvCpd3PYVzSX3jDXUE+nW9jo1m3MbX8bTTuvY7FZQn0JJ+lAHXUVyEmseJfDqedr1tZ3+nr/rLzTlZHhH95omJyPUqePSurgniuYI54XWSKRQyOpyGB6GgCSiiigAooooAKKKKACmSxRzxPFNGskbgqyOMhgeoIPWn0122RswUsQM7V6mgDzz4SabY2thr0tvaQRS/2zcxb0jAbYNuFz6D06V6LXGfDvTdR0mz1eDUbGS2a41Ka6jLMrAo+3HQ9eDxXZ0AFFFFABRRRQAUUUUAI33T9K4/4Vf8AJMNC/wCuLf8AobV2DfdP0rzj4feI7TRfAmk6df22ow3UERWRDYynB3Mey+9AHpFebaf4il0bxr4whTQdY1EPfQt5ljCjqv8Ao0QwSzjmum/4TfSP7mof+AE3/wATVHwVKbvXPFd+sNxHb3N/E8LTQtGXAt41JAYA9QRQA7/hOrj/AKEvxT/4CRf/AByo5/iC9rbyXE/g/wAURxRKXd2tYsKoGSf9ZXZ1k+KP+RS1n/rxm/8AQDQBhW/xCa7torm38H+J5IZkEkbraxYZSMgj956VJ/wnVx/0Jfin/wABIv8A45Wt4Q/5ErQf+wdb/wDota2aAOL+H8v9qy6/r1xDJFeXWovAY5hiSCKIBUjYZIBHzMQO7V2lcZcO/gzxDfag8Uj6Dqjiedo03G0uAArOQBnYyquTzgg+tbyeJtBktftS61p5gxnzPtKYH60AZnjyMLoltqCOkdzYXsE8Dt2O8KR+Kswx711FcVPdf8Jzqdnb2MbN4ftJ1uLm7dcLdOhykcYI5Xdhi3TgAda7WgAooooAKKKKACiiigAooooAKKKwvFmuT+H9Lt7u3ijkeW9t7YiTOAskgUnjvg0AbtFFFABRRRQAVzbf8lIj/wCwU3/owV0lchq2ox6R48gvLqG6Nu+nNGHht3kG7zAcHaDjigDr64r4iXZsf+Edultbi6Meqowht1DSP8jcKCQM/jWl/wAJvpH9zUP/AAAm/wDiaw9d1u313VvDkNhb3ztFqSSyF7ORFVQrDJJUAdaAND/hOrj/AKEvxT/4CRf/AByj/hOrj/oS/FP/AICRf/HK6+igDil+Iu+8ks18IeJzcRIsjx/ZY8qrEgH/AFnfafyqb/hOrj/oS/FP/gJF/wDHKu2n/JQtW/7Btp/6MnroqAPO9Q19/EviDw/pFzoOr6fbSXZnkN/CiJL5aFlUYZs/Ng/hXolYPirS7vUNOguNOK/2jYTrdWwY4DsMgoT2DKSPxpul+MtH1D9zNcrYX6cS2d4RFKh7jB6j3GQaAN9lV0KMoZWGCCOCK5fwJ+50rUNOUkw6dqVxawE/88w25R+G7b+FP1XxnYwFrLSHTVNWcYitbVg+D6uw4RR3Jq/4Z0dtD0KG0lkEtyS01xKP45XJZz9Mk/hQBr0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBxUd/qKfGU6XJfyyae2hPdLbEAIr+ei546nHr6mu1rgWk2/HBLkxzfZ/wCwmtPO8ptnmmdW25xjOBmu+oAKyfFH/Ipaz/14zf8AoBrWrJ8Uf8ilrP8A14zf+gGgBnhD/kStB/7B1v8A+i1rZrG8If8AIlaD/wBg63/9FrWzQAEZGDXkXjPTtX0G2uPF76V4ckghnV3sH05Gl8tpAoJl7vyCccZzjPf12vNdZ8d+DdZ1Q6fqGt2q6dYzK8sZJP2mVDlRwOUUgH3IHYHIB6NbuJLeJxGYwyhtjDBXI6EVJUVtcR3dpDcxZ8uZBImRg4IyOKloAKKKKACiiigAooooAKKKKACuN+Jf/IuWX/YWsv8A0ctdlXG/Ev8A5Fyy/wCwtZf+jloA7KiiigAooooAKKKKAOP+Jl3qGneDJ77Tr+azlimhBMQGXDSohGSMjhj0wa65OY1J9BXG/FMNL4FurWGOSW4mlgMccaFi22ZGboOwBNdfbSpPaxSxklGUEEgj+dAEtFFFAHO2n/JQtW/7Btp/6Mnroq520/5KFq3/AGDbT/0ZPXRUAFYnidNITTTc6po8WqFWCw25tlmeRycBVDDr/IAk9K26ZKY0QySlVWPLFm6Lgdc9uM0AcZ4R8SWLa1ceGpPDR8OajHF9oW1CR7JY8gFlaP5SeRn/AOsa7auW0+yj1PxY3iibCRrbfYrANwXQtud/xIGPYZ711NABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAGTrHiKw0Sa2guVupJ7nd5UNrbSTuwUAscICcDIqj/AMJpZf8AQL8Qf+Ca5/8AiKh1n/kovhj/AK4Xn/oKV1VAHN/8JpZf9AvxB/4Jrn/4ij/hNLL/AKBfiD/wTXP/AMRXSUUAc2fGtkP+YV4g/wDBNc//ABFQWnxB0nULWO6s7HW7i3kGUli0md1YexC4NdU33T9K4/4Vf8kw0L/ri3/obUAXP+E1s/8AoE+If/BPcf8AxFH/AAmtn/0CfEP/AIJ7j/4iulooA5r/AITWz/6BPiH/AME9x/8AEVkeI/GttN4a1WFdE8QqXtJVDvpMyqMoRkkjge9d5WT4o/5FLWf+vGb/ANANAHLeGPGlvb+E9HgOieIXMdjChaPSpmVsIBkEDke9av8AwnVt/wBAHxL/AOCeb/CtHwh/yJWg/wDYOt//AEWtbNAHK/8ACdW3/QB8S/8Agnm/wqE+MdOHTwx4hP00WX/CuwooA5MeO7cDA8O+Jsf9giX/AApf+E8g/wChe8Tf+CiX/CurooA5T/hPIP8AoXvE3/gol/wo/wCE8g/6F7xN/wCCiX/CurooA5b/AITiH/oXvEv/AIKpKP8AhOIf+he8Sf8AgqkrqaKAOf0zxfY6lqqaYbLU7K6kjaWJb20aHzFXG7aT1xkfnXQVyWrf8lP8N/8AXje/zirraACiiigArjfiX/yLll/2FrL/ANHLXZVxvxL/AORcsv8AsLWX/o5aAOyooooAKKKKACiiigAooooAKKKjnuIbWBpriVIokGWeRgoH1JoAwbT/AJKFq3/YNtP/AEZPXRV5/p3jbwxP8QtS8vXbAiSxtokPnABnV5iwB9RuH5136sGUMpBBGQR3oAWsrxF4ftfE2kvpl7NdR20hBcW8pjLY7Ejt7Vq0UAcpovw90jQ9Vh1GG61O5nhVhELy8eZUyMEgN0OMjPua6uikJA6mgBaKTcvqPzo3D1FAC0UUUAFFFFABRRXIePvEmq+F7LT7vT1s5Fub2KzZLiNiQXz8wIYdMdMfjQB19FcXqfiHXbDxzonh9W054tRhllaUwOGTywMgDfznP4e9dpQAUUVymrXV7rviF/Dum3T2lvbRLLqN1EfnXd9yJD2YgEk9hjHWgA1kgfEXwxyP9Ref+gpXV1yw+HHhFkYTaJb3Ej/fmuMySOfUuTnP41UnguPA93bT291PcaBPKsE9vO5ka0LHCujHnbnAKnOMjHSgDtKKKoa1qsOiaNdalOCyQJu2jqx6BR7kkD8aALznCMT6Vx/wpIPwx0L/AK4t/wChtRa+Dl1yFb3xcWv7mXD/AGJnItrfuFVBgMR/ebJJz06VPL8P9Fh3TaLG2i3v8NxYNs57bk+6w9iKAOqorD8MavdalaXFtqKomp2Ext7oICFYgAq4B7MpB/TtW5QAVk+KP+RS1n/rxm/9ANZvxHvLnT/h3rt3aTvBcRWpaOSM4ZTkcg18kzeOvFdxC8M3iHUXikUq6NOxDA8EGgD7F8If8iVoP/YOt/8A0WtbNfEEHjnxVbQRwQ+INRjijUIiLOwCqBgAV9bfDe8udQ+HeiXd5O89xLb7nkkOWY5PJNAHU0UUUAFQT3lralRcXMMJY4USOFz9M1z3iPUL271ez8M6RcG3u7mNrm6ulAJtrZSFyM/xMxCrwejHtU1p4F8M2qtv0e0u5nwZJ7yMTyyEDGWZ8nNAHQgggEEEHoRS1xOp6G3g63k1rwyrRQW+ZLvSgSYZo85cov8AA4GSNvBxjHPHY29xFd20VxC26KVA6NjqCMigCWiivCPjZ8U7/Sb8+GNBnNvKqBru6Q/OM8hFPbjqevPagD0nViP+FoeGxkf8eN7/ADirrq+BJZ5pp2nllkkmZtzSMxLE+pPXNeyfB/4r6naeILTw/rt7JdWF44hhmnYs8Mh+7zySpOBz0yD0FAH0vRRRQAVxvxL/AORcsv8AsLWX/o5a7KuN+Jf/ACLll/2FrL/0ctAHZUUUUAFFFFABRRRQAUUUUAHSvkb4t+P77xX4nubGK4dNJspWihgVvldgcFzjqTzj0FfW7rvRlzjIIr4X8TaXPovibUtOuVZZILh1+YYJGeD+IwaAMqvcvgN8Qb1NaTwnqNw81rcKxs2c5MbgFiufQgH8R714bXc/CLw/P4h+IdhDG08cEAeaeaCQo0ahSBhh0JYgfjQB9jUVy3/CC2n/AEGNe/8ABlJWPqXhZLbxDotnHrWuiG6M3mg6g+TtUEY9OaAPQa4vxHoun67480m01O3+0QDT7hwhdlG4PEM8Eepq3/wgtp/0GNe/8GUlZ9locWi/EawEV5fXHm6bcE/a7hpduHj6Z6daAL//AArbwh/0Bo/+/sn/AMVWLr/hDQdBn0S80zTxbXH9q26b1kc/KScjk16JXL+Nv9Ton/YYtv8A0I0AdRRRRQAUUUUAFeefGA/8U/on/Yctf/Zq9Dqnf6Tp2qrGuo2FreLG29BcQrIFb1GQcGgDi/ERH/C5vBwz/wAul5/Ja9AqlJo+mTXsV7Lp1o93CNsU7QqXQeitjI/CrtABXJeFytv4u8X2cy7bqS9iu1Y9XhaCNVI9gyOK62sHXdBnvby31XS7pbTVrZSiSMu5JYycmOQd1zz6g8igDerl/iGynwPqMGR5twFghBOMyMwCgfjUR1/xfbq8M3gprm4XAEtpqUPkSHucuVdR/wABNS2eh6pqeq2+q+I5YAbVi9pp9sS0UL4xvZiAXcDpwAMnHrQB0kClII1b7wUA/XFc18Qhjwm0zJvht7u2nmXPWNJkZvwABP4V1NR3EEV1byW86CSKVSjo3RgeCKAHqyugdWDKwyCDwRS1x0Vr4n8Kwi2022j17S04hhe4EN1CvGF3N8rgc9Sp6daka/8AGOsF7e20aPQojwbu9uI55MY/gjjJGfdm/A0AP0Bkn8ceKrmFF8kfZbdnU53SojFvxAdRXVVn6Lo9voemR2NuzuFJd5JDl5HJyzMfUnmtCgDkPil/yS/xD/16N/MV8X19z+KtDPiXwtqOjCfyDeQmLzSu7bnvjvXih/ZpkAyfFCAf9en/ANnQB4HX1f8ADjw/ql18PNEnh8W6raRvb5WCKG2KpyeAWiJ/MmuN/wCGaJP+hnT/AMA//s69q8KaGfDXhfT9GM/nm0i8vzQu3dyTnHOOtAHPeINI17SfDupajD411d5bW2kmRXgtNpKqSAcQ9OK0R4Z1kgH/AITfWuf+mFp/8Zq341/5EbXf+vCb/wBANbifcX6UAcVosM2ifEO8sdR1S61CbUdOiktbi6WJSfJeTzIxsVQSPNRsYzgn0rtqydf0KPXLaECeS1vLaTzrW6i+9C+MZ9wQSCDwRWQ+o+N9ORYpPD9hq7ZI+0Wt8LfI7FkkXgn0BNAG7rt1DZeH9QubhtsUdu7McZ42mqfgywuNM8F6NZXRJnhtI1fOc52+9UDoGq+ILyGbxNJbJYwSCWPS7V2eN3ByrSuQN+DyFwBkA84FdXQAV8b/ABetprb4pa55yFPMmEiZ7qVGDX1zqut6Xodo11ql/b2cA/jmcL+XrXn3jTwFpHxb0O11vS5zbXmz/Rrt4yFmjzwGXrj0OAR6UAfKFX9DtJ7/AF/TrS1Gbie5jjjGcfMWAH613E/wL8fw3jQJpMM8YbAuI7uIIw9QGYNj6jPtXsPww+Dcfgu9XWNVuYrvVlUrEIQfLhzkEgkAkkcZwOpoA9XooooAK434l/8AIuWX/YWsv/Ry12Vcb8S/+Rcsv+wtZf8Ao5aAOyooooAKKKKACiiigAqO4uIbS3e4uZo4YYxueSRgqqPUk9KkrnfEGvXENzFomiqk2tXIyA3KWsfeWT29B1Y/iQAZNh8UdD1zxZb+HtBL6jM+5prhBtiiRRycnr6DA6kVW+Ifwm0jx2VvBI1jqqLtFzGuRIOwde/sRg/XpWr4a8A6b4b1m51eKWW41C6hCXE8xy0j7izP7Ek9BxgCusoA+bof2bNaM6ibXbBYdw3MiOWA9gQOfxr2jwP4C0nwJpRtNPDSzyYNxdSfflP9B6D+dZ93LdwfGPS7cX901pPps8jWzSfuwwZQCFH9c13NABXO61/yOHhv63P/AKAK6Kud1r/kcPDf1uf/AEAUAdFWDrXhuTVdUtdRttYvtNubeJ4Q1ssTblcqSCJEb+6Olb1FAHm2tapYeHtRSw1b4oalbXTgERtBakgHoTiA4/GtxfCNxfS2Nzd+LNU1C3gmS6jjdLYI5XlTlIgcfQ1Y8V21hB4Y1aD7Gk8+pK0awbQzXEzLtUfhxz/CBnjFaHhnSn0Pwzpulyy+bJa26Rs+c5IHNAGrRRRQAUUUUAFFFFABRRRQAUUUUAcZrF7qFt8UPDdpHqE4sbuK5MlrhQhKx5B4GT+JNdnXDeIG/wCLpeFJcMYoYroSyBSVjLR4Xcegyema7mgAooooAxtf0u/1lIbO11S50y2OWnntComOMbVUkELnJJOO2O9YXgKfV4dQ8Q6Hqd/LqUOl3aR217OB5jq6B9rEdSu4DP8A+qr/AI08V/8ACM2MIhs7y5urliqfZ7ZpvLHd2A9M8DPP51X8D61YahDPaadpmqW6RHzZrm/tzE08rklm56sep9OAOKAOvooooAK53xZpmj3WnyXmuvctZW0bExxyOqr6thOScevTtjmuirE1PW77TtWhtY/D9/fWksW77VatGQr5PyFWYEcc7unNAGR8K5ZJvh3pjSaouothwJQ+4ou47UJPJKjA5/lXZVzPgjw9L4e0y/WWNIWvtRnvhboQRAJCMJkcZAAzjjOccc101AGF41/5EbXf+vCb/wBANbifcX6Vh+Nf+RG13/rwm/8AQDW4n3F+lAC1xnxE1G8Xwzq1hpkxhuV0+a5mnUZMUSox/BmIwPbce1dnXE+J/B88uh+JpdP1LUWutRt5ma3UxkSv5RVU5TOMAKBn9STQBueDneTwRoEkjFnbTbcszHJJMa8mtiSRIYnlldUjQFmZjgKB1JNYng2wudK8G6RaXkkzTxWcSyLNtzGQigpwBwOn9axpDN491CSDaU8K20myRjwdRkU8qP8ApkD1/vHjoDQBzPifwcvxa8y/tUjsbKMAWd7JF892cjL46iLaDjpuJ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bio_31	MCQ	When studying the inheritance mode of a single gene inherited disease, gel electrophoresis technology can be used to display one band for the normal gene and another band for the pathogenic gene at a different position. This method was used to conduct genetic analysis on a patient's family, and the results are as <image_1>shown in the figure. Among them, Nos. 1 and 2 are parents, and Nos. 3 and 4 are descendants. It is known that all related genes are located on chromosomes, regardless of mutations and homologous segments of X and Y chromosomes. The following descriptions are incorrect: ()	['A. If No. 1 and No. 2 are normal, the disease-causing gene No. 4 can be passed on to the daughter but not to the son', 'B. If both parents have the disease, the probability of them having a normal girl is 1 in 8', 'C. If both children have the disease, the probability that the parents will have another sick boy is 1 in 4', 'D. If Nos. 3 and 4 are normal, the incidence of this genetic disease will differ between men and women']	B	bio	遗传与进化_遗传的基本规律	['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']	['bio_31.jpg']
bio_32	MCQ_OnlyTxt	"On July 31, 2024, the WHO reported that ""highly virulent Klebsiella pneumoniae (hvKp)"", which causes pneumonia, meningitis, urinary tract diseases and other diseases, is spreading globally. The nucleoid DNA molecule of hvKp has approximately 5.5×10^6 base pairs. Among them, GC base pair content accounts for about 58%. During the fourth replication of this DNA molecule, the base A in one strand of a DNA molecule mutated to the base G, and the bases of the other strands were not changed. The following statement is incorrect ()"	['A. hvKp has two free phosphate groups in its DNA molecule', 'B. Before the base mutation, the DNA fragment was replicated three times, requiring a total of 1.848×10^7 free adenine', 'C. Thymine accounts for 21% of this molecule, and the thermal stability of the mutated DNA molecule is enhanced', 'D. Among the daughter DNA produced by the mutated DNA molecule after n replications, 1/2 of the DNA with the mutation site G-C accounted for.']	AB	bio	遗传与进化_遗传的分子基础	['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bio_33	MCQ	The figure <image_1>shows the genetic family diagram of two monogenic inherited diseases: A and B. One of the genetic diseases is sex-linked inheritance. The incidence of B disease in the population is 1/256, and the pathogenic genes of the two diseases are not on the Y chromosome. The following statement is incorrect ()	['A. A disease is inherited with X chromosome recessive, and B disease is inherited with autosomal recessive', 'B. If III1 marries a normal man, the probability of having a girl with B disease is 1/51', 'C. If III3 and III4 have a child, the probability of developing both diseases at the same time is 1/34', 'D. The appearance of III3 is the result of genetic recombination that occurs when III2 and III3 gametes combine']	ABD	bio	遗传与进化_遗传与人类健康	['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bio_34	MCQ	For example, Figure 1 <image_1>is an image of a certain period of meiosis in a diploid animal (genotype AaBb)(only part of the chromosomes are shown), and Figure 2 <image_2>is a graph measuring the relationship between the number of chromosomes and the number of nuclear DNA molecules in cells ① to ④ in the animal. The following statement is incorrect ()	['A. Figure 1 The B gene on chromosome 4 of a cell is a b mutation', 'B. The cells in Figure 1 can correspond to ④ in Figure 2', 'C. The cells with one genome in Figure 2 have ①②', 'D. In Figure 2, ③④ ④ ④ ③ Cells must contain homologous chromosomes']	D	bio	遗传与进化_遗传的细胞基础	['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', 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']	['bio_34_1.jpg', 'bio_34_2.jpg']
bio_35	MCQ	Short tandem repeats (STR) located on homologous chromosomes are rich in polymorphism. Tracking the parental origin of STR can be used for genetic relationship identification. Analyze <image_1>the transmission of STR on the autosome (D18S51) and STR on the X chromosome (DXS10134, not on the Y chromosome) in the family shown below, regardless of mutations. The following statement is correct ()	['A. The probability that III-1 and II-1 will obtain the same D18S51 from the same individual in generation I is 1/2', 'B. The probability that III-1 and II-1 will get the same DXS10134 from the same individual in generation I is 3/4', 'C. The probability that III-1 and II-4 will obtain the same D18S51 from the same individual in generation I is 1/4', 'D. The probability that III-1 and II-4 will obtain the same DXS10134 from the same individual in generation I is 0']	ABD	bio	遗传与进化_遗传与人类健康	['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bio_36	MCQ_OnlyTxt	Regarding the experiment of identifying PCR products using agarose gel electrophoresis, the following statements are correct ()	['A. The selection of agarose gel concentration takes into account the size of the DNA fragment to be isolated', 'B. The role of the indicator in the gel loading buffer is to indicate the specific position of the DNA molecule', 'C. Under the same electric field, the longer the DNA fragment, the faster the migration rate to the negative electrode', 'D. DNA molecules in agarose gels can be detected under violet 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bio_37	MCQ	The following figure <image_1>shows some of the operating steps of genetic engineering. Note: Amp^{r} is the ampicillin resistance gene, and Tet^{r} is the tetracycline resistance gene. The outer strand of the plasmid is the a-strand and the inner strand is the b-strand. The template strand transcribed by the gene Amp^{r} belongs to a fragment of the a-strand. The sequence from the beginning to the end (one strand) of the coding region of the ALDH2 gene is 5'-ATCCATGCGCTC... (Intermediate nucleotide sequence)... CAGTGAGTAGCG-3'。The recognition sequences and cleavage sites of the four restriction enzymes are shown in the table below<image_2>. The following statement is correct ()	"['A. The template strands for plasmid replication are ""a"" and ""b"", and the template strand for transcription of the gene Tet^{r} is a fragment of the b strand', 'B. Process ③ needs to be the core step of genetic engineering, and the medium used in process ④ is selective', ""C. To amplify the target gene, the primer pairs to be selected are: 5'-TCTAGACGCTACTCACTG-3'and 5'-GGATCCAATCCATAGCGCTC-3'"", 'D. According to the selected primers, after 5 cycles, 32 target genes that meet the requirements can be obtained']"	AC	bio	生物技术与工程_基因工程	['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']	['bio_37_1.jpg', 'bio_37_2.jpg']
bio_38	MCQ	The picture <image_1>shows the genetic pedigree of A and B diseases in a family. Individuals of one sex are methylated and modified when producing gametes, and individuals of the other sex are de-modified when producing gametes. The effect of the modified gene is equivalent to that of the pathogenic gene. It is known that I-1 does not contain modified B-related genes. The following statement is correct ()	['A. B disease is a dominant inherited disease with X chromosome', 'B. B disease related genes are modified during egg formation', 'C. The probability that I-2 and II-4 genotypes are the same is 1', 'D. The probability of II-3 and II-4 reproducing a normal child is 3/8']	D	bio	遗传与进化_遗传与人类健康	['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bio_39	MCQ	The following picture <image_1>shows the pedigree of two genetic diseases, A and B, in a family. Disease A is controlled by one pair of alleles (A, a), and disease B is controlled by another pair of alleles (B, b). These two pairs of alleles are inherited independently. The following statement is correct ()	['A. A disease is an autosomal dominant inherited disease, and B disease is a recessive inherited disease with X chromosome', 'B. The probability of carrying the gene causing B disease is 1/2', 'C. Among the men in the figure, the genotypes that must be the same are II_3 and III_13', 'D. If III_3 does not have the B-causing gene and III_9 and III_12 marry, the probability of having a sick child is 17/24']	D	bio	遗传与进化_遗传与人类健康	['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']	['bio_39.jpg']
bio_40	MCQ_OnlyTxt	Grass rabbits live on the ground all their lives. They do not dig holes. They are good at running and mostly move at night. The color of the back hair of the grass rabbit is controlled by multiple alleles e_1, e_2, and e_3 located on the autosomes. Gene e_1 determines the cinnamon color, gene e_2 determines the light camel color, gene e_3 determines the gray camel color, and homozygosity for gene e_2 will lead to the death of the grass rabbit during the embryonic period. It is known that gene e_1 is dominant to e_2 and e_3, and e_2 is dominant to e_3. Now let a pair of grass rabbits with genotypes e_1e_2 and e_2e_3 be crossed to obtain F_1, and then let the female and male individuals in the F_1 mate freely to obtain F_2. The following statement is correct ()	['A. There are 6 genotypes in this grass rabbit population', 'B. There are 2 phenotypes of F_1, with a ratio of 3:1', 'C. During the free mating of F_1 to obtain F_2, the population did not evolve', 'D. F_2 Cinnamon color: light camel color =5:2:1 in grass 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bio_41	MCQ_OnlyTxt	There were 3600 individuals of genotype AA, 1600 individuals of genotype aa and 4800 individuals of genotype Aa in a randomly mated insect population. There are 2000 individuals with genotype AA who have migrated. The following analysis of the population before and after migration is correct ()	['A. The frequency of A gene in the population before immigration was 60%', 'B. The AA genotype frequency in the population after immigration was 30%', 'C. The migrating population will evolve faster than the original population', 'D. The genotype frequency and gene frequency of the original population remain stable from generation to 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bio_42	MCQ	Studies have shown that the ABC transporter (PcABC) plays an important role in the adaptation of golden grass to lead (Pb) stress. <image_1>The figure shows one of the transport pathways of PcABC to Pb^{2+}. The following related statements are correct ()	['A. The path shown can weaken the tolerance of Golden Grass to Pb^{2+}', 'B. PcABC is a channel protein that does not require binding to Pb^{2+}', 'C. Phosphorylation occurs during PcABC transport of Pb^{2+}', 'D. The PcABC transmembrane region is rich in hydrophilic groups, which facilitates its insertion into the middle of the phospholipid bilayer']	C	bio	分子与细胞_细胞的代谢	['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']	['bio_42.jpg']
bio_43	OPEN	Magnetic field stimulation is an effective method to regulate the physiological state of the nervous system. In order to study its improvement of nervous system passivation and electrophysiological mechanism, the following experiments were carried out using mice as an animal model. Mice were randomly divided into three groups: control group, nervous system passivation model (HU) group and magnetic field stimulation (CFS) group, with 8 mice in each group. The cognitive function levels of mice in the above three groups were measured, and the results are shown in Figure 1<image_1>. The resting potential was measured, and the results were shown in Figure 2<image_2>. The above experiments show that at the cellular level, CFS can improve the neurons that appear when the nervous system is passivated (); at the individual level, CFS can improve the decline of cognitive function caused by the passivated nervous system.		Decreased excitability (or increased absolute value of resting 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bio_44	OPEN	Google scientists used the AlphaFold program to successfully predict how almost all known proteins fold into 3D shapes and successfully won the 2024 Nobel Prize in Chemistry. As we all know, the structure of a protein (<image_1>the first-to-fourth-level structure of a protein is shown below) determines its function, so AlphaFold's ability to recognize 200 million protein structures makes it the main force in helping identify new proteins that humans can utilize. Please answer the following questions: The figure below <image_2>shows the structure of insulin in a certain organism. In this substance, -S-S-is formed by removing 2 H from 2-SHs. When the insulin is formed from amino acids, the reduced molecular mass is 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']	['bio_44_1.jpg', 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bio_45	OPEN	"The clinical manifestation of central precocious puberty (CPP) is the premature appearance of secondary sexual characteristics in women, accompanied by menstruation and other manifestations, which causes children to develop negative emotions such as anxiety, fear, and inferiority complex, which seriously affects children's physical and mental health. Please answer the following questions: Creuprorelin is a gonadotropin-releasing hormone analogue, often used to treat abnormal increase in sex hormone secretion. Prepared rehmannia is a classic traditional Chinese medicine that has a good effect in regulating sex hormone secretion. In order to explore the effect of different doses of prepared rehmannia on CPP, the following experiments were carried out.
Experimental materials: Normal rats, NMA solution (40mg/kg), creuprorelin (100ug/kg), and prepared rehmannia root low, medium and high dose solutions (0.8, 1.6, 3.2 g/kg).
The relative expression of gonadotropin-releasing hormone (GnRH), the content of gonadotropins (LH and FSH) and estradiol (E2) were measured. The results are shown in the table below<image_1>. It is speculated that the site where prepared rehmannia root plays a role is ()"		hypothalamus	bio	实验与探究	['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']	['bio_45.jpg']
bio_46	OPEN	Rubisco enzyme can catalyze both carboxylation and oxidation of C_5. If C_5 is oxidized, glycolic acid will be formed, which can inhibit the activities of various dark reaction enzymes. In order to reduce such toxic metabolites and carbon loss, plants have evolved photorespiration pathways, and the relevant pathways are shown in the figure<image_1>. According to the map analysis, photorespiration consumes (), which affects the dark reaction and causes a decrease in plant photosynthesis rate.		ATP \text{and} NADPH, O_2	bio	分子与细胞_细胞的代谢	['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']	['bio_46.jpg']
bio_47	OPEN	The following figure <image_1><image_2>shows some physiological phenomena that occur on biomembrane during photosynthesis and respiration. The dotted line represents the electron transfer process, which can provide energy for the transmembrane transport of $H^+$. Herbicide $P$can rob the electrons in the reaction center of $PSI$. Please analyze its weeding principle based on the information in Figure 1 ().		The herbicide $P$prevents plant cells from synthesizing $NADPH$and $ATP$, which cannot provide raw materials for dark reactions, resulting in the inability of photosynthesis and causing plant death.	bio	分子与细胞_细胞的代谢	['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'bio_47_2.jpg']
bio_48	MCQ	Halophages are suitable for survival in a high $Na^+$environment. Their intracellular $Na^+$is not high and need to accumulate $K^+$to fight against the high osmotic pressure of the external environment. The rhodopsin present on the cell membrane of halophilic bacteria cultured under light and anaerobic conditions participates in the process of converting light energy into energy needed for bacterial growth, as shown in the figure<image_1>. The following statement is incorrect ()	['A. $Na^+$and $K^+$enter halophage cells differently, and $K^+$requires energy to transport across the membrane', 'B. Both $H^+$enter and exit halophage cells are actively transported, but the two supply energy differently', 'C. Rhodopsin needs to bind to $H ^+$every time it transports $H ^+$, and ATP synthase needs to bind to ADP and Pi when it functions', 'D. ATP synthase does not allow other ions such as $^Na +$to pass through, which is related to the diameter and charge distribution of its own channel']	B	bio	分子与细胞_细胞的代谢	['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']	['bio_48.jpg']
bio_49	MCQ	Maintaining the balance of $Na^+$in cells is one of the salt-tolerance mechanisms of plants. Under salt stress, the $H^+ATP$enzyme (proton pump) and the $Na^+H^+$antitransporter on plant cell membranes (or vacuoles) transport $Na^+$from the cytoplasmic matrix to the outside of the cell (or vacuole) to maintain low $Na^+$levels in the cytoplasmic matrix (see figure below<image_1>). The following statement is incorrect ()	['A. Phosphorylation of the $H^+ATP$enzyme on the cell membrane is accompanied by a change in spatial conformation', 'B. The concentration gradient of $H^+$on both sides of the cell membrane can drive the transport of $Na^+$outside the cell', 'C. Inhibitors of the $H^+ATP$enzyme interfere with the transport of $H^+$, but do not affect the transport of $Na^+$', 'D. The gene expression level of $Na^+H^+$antiporter may increase under salt stress']	C	bio	分子与细胞_细胞的代谢	['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bio_50	MCQ	<image_1> After the telomeres of a chromosome are broken, sister chromatids fuse at the break, and the fused chromosome can randomly break at any place between the two centromeres due to the traction of the spindle filaments in late cell division. The following related statements are correct ()	['A. Figures ①~ ④ The process can only occur during cell mitosis', 'B. The daughter cells formed after Figure 5 can contain both genes D and d', 'C. Figure ③④ The number of chromosomes and DNA doubled during the process', 'D. Figure ① The D and d on the chromosome must be produced by genetic recombination']	B	bio	分子与细胞_细胞的生命历程	['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bio_51	MCQ	Figure 1 <image_1>shows normal spermatogonia cells (only some chromosomes are shown) from Drosophila melanogonia with genotype AaX^BY (2n=8), and Figure 2 <image_2>shows the changes in the number of homologous chromosomes during division of the spermatogonia cells in Figure 1. Figure 3 <image_3>shows the change in the quantity of a certain substance or structure during a period of division of spermatogonia, in the order of change from C→D→E. The following statement is incorrect ()	['A. The cell in Figure 1 contains two genomes, and the ③④ segment in Figure 2 contains four genomes', 'B. In Figure 2, A and a may be exchanged in Section ④ (④), and A and a may be separated in Section', 'C. If a in Figure 3 represents 4 chromosomes, then the cell cannot form a tetrad in the CD segment', 'D. If a in Figure 3 represents 8 chromatids, then the change in the DE segment can correspond to paragraph ③ in Figure 2']	C	bio	分子与细胞_细胞的生命历程	['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bio_52	OPEN	Common wheat (6n =42, AABBDD, one letter represents one genome, each genome contains 7 chromosomes) is an allohexaploid food crop. Wheat has three pairs of genes related to amylose synthesis, E/e, F/f, and H/h, which are located in turn on chromosomes 7A, 4A, and 7D (the number represents the number of chromosomes). When there is no dominant gene, it shows waxy. Whether wheat is resistant to rust is controlled by the Y/y gene. There is an existing non-waxy rust-resistant pure wheat line and waxy rust-susceptible pure wheat line to obtain F_1. F_1 is self-bred to obtain F_2. The phenotype and proportion of F_2 are shown in the figure<image_1>. Please answer the following questions. It is not possible to determine whether the genes Y and y are located on the 7A chromosome based on the experimental results, because when the parent genotype is______, graphical results may appear regardless of whether Y and y are located on the 7A chromosome.		YYeeFFHH、yyeeffhh	bio	遗传与进化_遗传与人类健康	['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bio_53	MCQ	The bidirectional promoter can simultaneously combine two RNA polymerases to drive the expression of downstream genes. The researchers built <image_1>the expression vector shown in the figure below to test the effect of the bidirectional promoter. The following analysis is incorrect ()	['A. The constructed expression vector can be introduced into plant cells by Agrobacterium transformation', 'B. To connect the GUS gene, SalI and SphI enzymes were used to digest the plasmid that had integrated the bidirectional promoter and the LUC gene', 'C. Microbial receptor cells successfully introduced into the expression vector can be selected by adding spectinomycin to the culture medium', 'D. The role of the bidirectional promoter can be confirmed by observing the presence of fluorescent and blue substances']	B	bio	生物技术与工程_基因工程	['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bio_54	OPEN	"The bile salt hydrolase (BSH) secreted by intestinal flora is closely related to hyperlipidemia. Studies have shown that BSH activity in the small intestine increases after a high-fat diet, increases the bile content in the blood, and achieves the purpose of reducing blood lipids. Researchers used genetic engineering technology to modify related strains (B bacteria) in the intestines of mice in order to obtain engineered bacteria BS bacteria that secrete more BSH.
Screening of strain X: The 16SrRNA gene is an important basis for identifying microorganisms. Its size is about 1500bp. The 16SrRNA gene of strain X with high BSH production has two restriction enzyme cleavage sites for the restriction enzyme Apal, and only one among other strains. The results are shown in Figure 1<image_1>, and it can be seen that ()(fill in the number in Figure 1) is the selected target strain."		1、5、10、12	bio	生物技术与工程_基因工程	['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']	['bio_54.jpg']
bio_55	OPEN	"Acinetobacter bahnii (Bacillus A) is a non-pathogenic bacterium that absorbs DNA from the environment and integrates it into its own genome, a process called horizontal gene transfer (HGT). Scientists are trying to use the HGT ability of strain A to detect colon cancer. Colon cancer is often caused by mutations at the G12 locus in the KRAS gene, which scientists use as a colon cancer test point
① As shown in Figure 1<image_1>, an expression vector designed for the KRAS gene is introduced into colon cancer cells. An enzyme can cut off the phosphodiester bond from a specific site in the same sequence, and the nick is reconnected during the repair process, thereby realizing the replacement of specific gene fragments., obtaining transgenic cancer cells.
② In order to verify that strain A has the ability to absorb specific DNA fragments, according to the principles in ①, <image_2>the expression vector shown in Figure 2 was constructed and introduced into strain A to obtain sensor A. Sensor A was mixed with transgenic cancer cell lysate, and after a period of time, the growth of Sensor A in different media was observed. Please select the corresponding sequences____from a~e.
a. KRAS fragment 1  
b. KRAS fragment 2  
c. kanR  
d. specR (spectinomycin resistance gene)  
e. G12 locus"		bda	bio	生物技术与工程_基因工程	['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bio_56	MCQ	The double antibody sandwich method is a commonly used method for detecting antigen content, and the flow is shown in the figure<image_1>. Among them, the national antibody is a monoclonal antibody connected by a solid phase carrier. The following statement is correct ()	['A. Compared with using only monoclonal antibodies, this method can increase the number of recognized antigens', 'B. The role of enzyme-labeled antibodies is to bind to the antigen to be tested and catalyze its decomposition', 'C. The number of solid phase antibodies used should be greater than the number of antigens to be tested', 'D. If the use of enzyme-labeled antibodies is too small, the measurement results will be too high']	C	bio	生物技术与工程_细胞工程	['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']	['bio_56.jpg']
bio_57	OPEN	"Research found that red-crowned cranes rely on habitats such as Suaeda salsa beaches and reed beaches for food. It is difficult to see red-crowned cranes distributed in a single Spartina alterniflora community. In winter, the structure of some food webs in Yancheng Wetland is shown in Figure 3<image_1>. With the invasion of Spartina alterniflora in the reserve, the population density of red-crowned cranes has greatly decreased. Please analyze the reasons_______. (Numbers are optional and sorted)
① The invasion of Spartina alterniflora led to an increase in the number of local reeds
② As the population of benthos decreases, the number of crabs decreases significantly
③ Red-crowned cranes have nowhere to forage and inhabit
④ The number of benthos such as shellfish and shrimp in the intertidal zone decreases due to the decrease in food types and quantities
③ The invasion of Spartina alterniflora led to a significant reduction in the number of local Suaeda salsa"		③ ② ④ ③ and ④ ③	bio	生物与环境_种群和群落	['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']	['bio_57.jpg']
bio_58	OPEN	Shade plant Sanqi in a certain area is suitable for living under 5\%~10\% full sunshine conditions. Non-photochemical quenching (NPQ) is the first line of defense to achieve photoprotection by dissipating excess light energy. The main process is as follows: <image_1>Acidification of thylakoid cavities activates Pabs and VDE, which on the one hand promotes LHC II aggregation and blocks energy transfer; On the other hand, VDE catalyzes the conversion of Vx to Zx, promoting heat loss, thereby alleviating the production of reactive oxygen species (caused by excessive electron transfer, etc.). Please answer the following questions: Under strong light, there are reasons for the increase in H ins in thylakoid cavities ()		Water photolysis produces H, which is transported into the thylakoid by electron transport chains	bio	分子与细胞_细胞的代谢	['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bio_59	OPEN	Rice and corn are two important food crops. Under high light intensity and high temperature environments, rice has high photorespiration, while PEP carboxylase exists in the mesophyll cells of C_4 plants such as corn, which can concentrate CO_2. The following figure <image_1>shows the mechanism of CO_2 concentration in corn and the electron transfer on the thylakoid membrane. Please answer the following questions. According to the map analysis, there is no PS II on the thylakoid of vascular bundle sheath cells, and its physiological significance is ().		No photolysis of water occurs, reduce O_2/CO_2 ratio,(reduce photorespiration) and improve photosynthetic efficiency	bio	分子与细胞_细胞的代谢	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAFJAxsDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAoornvE3jLSfC0aC8lL3Uv+pto+XkPsKAOhqneatp+nIWvL2CAD/npIBXAxR+PfF58yW4Xw/prH5Y0GZmHue1aNl8KfDsLebfpPqU5OWe6kLZP0oA1T4/8ACoJH9uWZI6gPmoJfiT4Ti+9q8R+gJ/pWhB4P8O23+p0azT6RCrY0HSQMDTbX/v0KAOePxS8IAf8AIVB+kbf4VGfir4WKkw3U8xHaO3c/0rphomlKeNOtR/2xX/Cpo9Ps4v8AV2kCf7sYFAHGf8LV0qTIttM1WdvRLY01fiPeT8W3hHV3btuTaP1ru1ijT7qKPoKfQB5+fHPidjiPwNe+xaVRSjxN48nQtD4Qij9pbkCu/ooA4JdT+I9xGduiaZbt/wBNJyaAfia/VdFj/Emu9ooA4Mp8SwP9Zox/A03f8Th/yy0Vv+BEV31FAHBrN8TAfmtdFP8A20apftPxGAGbHRj/ANtWrt64nX/G91pF1rMUdnbMmnNZZkllKgi4k2HPHGOTmgBBd/EX/oG6P/3+anC7+IXfTtI/7/NVhvEEUHji5jn1WGLTYtLWd1Z0CB/MILFuvAHrip7/AMSPBr9rbQT2Q06XTpb1rmUkgBWQZBBxtw2aAKK3fxAPP9n6R/3+anC88f450zSR/wBt2rmdE8bXdpoWrPJcr9vlN7f2UV3G5Vo1LMEU5wNoAynBHpWpr3jn7LJpEP26OC4S2TUL2KIDfMCvyQRq2cl2OOOQB7igDSN34/I407SQf+uzU37V8Qv+gfpH/f5qg0zxlq979jWayt4Hu7u8gCPndCIS2A2CQThcHBxmmJ4w1WTw/wCFr9vs6S6qJDOEhZlGIncbRnPVR+tAFxbzx8PvaZpLfSdqJdR8eIoKaJprnuBcGsPwv47uNW1Bbq51WxEX2W2tRbGRUEl26GRiOCehCgZxkN3HHb+FtXl1/wAM2GqzQpDJcx7yiMSByccn2oA50a54+U/P4Ys2H+zc1Kmv+NMnf4Uix/s3QrtKKAOMPiXxYoyfCLn6XC1C3jDxPH9/wXdH/cmU13NFAHFR+NdYI/eeENSU+gKmpf8AhNNRAyfCmqZ+grsKKAOKfx3fR9fCerfggph+IF4Bk+EtY/79iu4ooA4U/EO6H/Mp6z/36pV+Ik5zu8K6yv8A2yruaKAOKHxCfq3hrWQP+uFSJ8Qrc48zRdWj+tua7GjAPUUAce/xE06Pl9P1NR6m2alT4leHSpaaW4gA6mWBhj9K64opGCoP4VE9rbyqVkgiZT1BQHNAGXp/i7QNUIW01W2kY/w7wD+RraBBGQciue1DwP4d1NW87TIFc87412sD9RWN/wAIprvh4mXw5rEs0I/5cr1t6n2B7UAd1RXIaV46ia9XTdetm0rUDwqy8JJ/ut3rrwQRkdKACiiigAooooAKKzNa8QaZ4ftPtGpXSQoThQTyx9AO9cuNf8V+In/4kemrYWR6XV4OWHqFoA7okAZJxUD39nH9+6hX6uBXHr4Bur5jJrniPUbsn/lnFJ5aD8BV6P4c+GEj2NpwlHcyOTn9aAN3+2NMzj+0LXP/AF1X/GnrqVi4yt5AR7SCsEfDvwoP+YPB+Z/xpy/D7wuowulRD6E/40Ab3260/wCfmH/vsU8XVu3SeM/RhXO/8K98M/8AQNX/AL7b/GoZPhv4afpaOn+7Kw/rQB1QljPSRT+NODqejD865D/hWnh4fdS5U+07Un/CttFAAWe/XBzxctQB2GR6ijI9a5L/AIV3pWCBd6kM+l01M/4Vzp4GF1TV1+l21AHY5HrRXGL8O7aM/u9c1pPpdmnf8IE4Py+JdbA9DcmgDsaK43/hBJh93xPrQPvcE0n/AAhWqp/qvF+rKP8AafNAHZ0Vxq+FPEKfd8YXh/3owacfDPibHHi6f/vwtAHYUVx3/CN+KQPl8WyZ/wBq3FNPh3xf28Vj/wABxQB2dFcZ/YfjRT8vieFv962FSDS/G3/Qw2f/AICigDr6K5L+zvGw/wCY7Yn62opklj48U/u9Y0xh/tW2KAOworjY0+ICHEkukyD12kU95vHaLlbbS3PpvIoA6+iuJGp/EBThtD05/cTmnf2x46HXw7ZH6XNAHaUVxR1vxyD/AMizaH6XNNPiLxquc+FIzj0uBQB29FcKfFXjBevg5z9JxUieK/FJHzeD5h9JhQB21FcYPFniMdfCF1+Egpf+Es8Qf9Chef8AfxaAOyorjR4r8Qn/AJlG7/7+LS/8JX4h/wChRu/+/i0AdjRXFDxzqNuzfb/CupwoP40XeP0qa1+JXhqeYQXF41lMf4LpDGf1oA6+io4Z4riJZYZEkjYZDKcg1JQAUUUUAFFFFABRRRQAUUUUAFFFFABRRVTVNRt9J0y4v7ptsMCF2P0oA53xt4w/4R2CGysYvtOsXh2W0CjPP94+1VvCHgj7BIda15/t2uT/ADvJJ8whz/Cvpis/wBp0mv39x421RCZ7olbONhxFEOhHua9GoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuE1nwbqWqaxrU8c9vHbXz6cyhwWLCCXe2fTjp6+1d3RQBykMEI+JtwvlJgaRHxtH/PVqzvE0Ms3j7TYrXTYL24GlzmJLjAijbzYsO3sPYZ6dOo7cWtuLtrsQRi5ZBG0u0bioJIXPXGSTj3p/lp5nmbF34xuxzj0zQB5H4i0aXwR4eu1uLyC8sb22u3uJ7mACWO8kjb542UdHLbdp554OOK1LqFZtd8Pq19N5lpYxSHT4NPMshfGFkLn5RjkDdwDnHPT0iSNJU2SIrrkHDDIp2Oc0AeQ6bHC19p8ks1wTFquq/aGMjDZlnALbflUk+mBmpNOZJfDfgWH7R5H2exnvJJCR8qCLyxyeOTIPyNeqQWlvbRvHBBHEju0jKigBmYksT7kkkn3qD+x9MFs1t/Z9r9neEQNF5S7TGM4QjGNoyePc0AeJ6Bp8rQK+nvZRy2Q0+9W1lcQ+cfsrKcN0HMhPTmvU/AElv/wh1lZwXEc72ANpO0bAgSpwwHtnkexBrbk0rTpiplsLVyqhV3QqcAdAOOlTwW8NtEIoIY4ox0SNQoH4CgCSiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAz9X0TT9dsza6hbpKnYkcqfUHtXGxX+o/D+6js9SeW80GVsQ3Z5a3J/hb2r0Kobu0gvrWS2uYlkhkUqysMgigB0M0dxCk0Lq8bjKspyCKkrz/RribwT4gXw9eyM+l3bFrCZz9w94z/SvQKACuT8U+LX02ZNJ0iIXetT8RwjkIP7zegqx4y8S/8ACO6UDAnnahct5VtCOrMe/wBBUXg/wt/Ytu99fyfadXuvnuJ36jP8I9hQBBoXglYroarr839paq3O6QZSL2UV2AAAwBgCiigAooooAKKKKACiiigArB8Ua3caRb2aWSwvd3NwqDzs7EiHzSu2CDgIrc+pFb1ec/E3Tje3ml4tEMTLJHdXU2oG2jSHKlojjrvIA6HgHjuAAHxDur7ULq50hrObSIntYYxNFIrzyS4yqv0UgMuAVOTxW9q3iW7OjQnR7ORdTvJTDbRX0RjCkZy7A442gkdzxXnAsobSK7itVuDGfEOmMWRwAzM0JJ5C8kng4A6dBXdX+mQP4NN/LHMt3pcFzLAst4bkRy7GGWJJDkc43A4oApP471q4KfZNHCfZ4I767SXPmtAVOVRDjDlgQOWAx3JAPU2etzTWrTzWke0SshMFwrhAMY37tu1ueV5xXC6ldzf8IVDqKTQQT+VBNPOI4vlTKmQ48r+7u4ro9f8ADNgvw/1rTtIjtbNb6OSV5ZW2KXfku7df8BxQBIPEt+fHkmkfZQLFNNS6IO3zN5kdc7t2NuF6YzTtX8UX1r4U1HWLbThiJC9rL5ySxyJtyJDhhxnjAJPT8POotdlk8dXeoy6TaxaSdKjjWdrY/wCoMkgFwY85Cls++3BxXXyaPKPhroej2dzBcNEbfzJLYuYpERgzjKAnBAPXrmgCvL8RdStm1Z5dNjksoLpbWC6idSVdoFcbk3HcN7DoeAfatPRfHn2zw1fapdwx4soYvnif/j4mZASqJ1HznYOTk5HavPNA0+b+3/D7vb3Btbgp5SgFkLrHdbyPMG3ODH+AFb2paO8134qis9Mhmu4msZLdLiVLcRuBJiTKYB25LY74oA6S3+IltEZbS/ty1/ZWEl5qC2vzJAYwhdfmxk4kXpnuK0F8YRyHWBHYTD+zbBL353UeYGV2C8ZxwnX3rza9tI7KxurK0ezj8jwtqYm+zzeeGYtCW3Phcsc56cVtxSG1h8aSzyeZt8PWxyFx/wAspsCgDYn+IF010tja6UpvHntERTLvDLKrSOeAMbURj9cV09jr1tfaxdaWkNwk9tDHM5kTClXJAxz/ALJryJ9H8rx1byPZIbyKS0gWGOQqpBtJiw9MkqO3auq+G0cltqVxb3ME1vPDp1pabZkKmRoQRKy56qGcDPQ0AekUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFUr7SNO1OIx3tlBOh7SIDV2igDhp/AdxpVwbvwtqc1i45No7FoW9sHpVnRvGjG+XSfEFsdP1InCZ/wBXL/umuwrM1vQbDX7FrW+hDA/cccMh9Qe1AGnRXB6RrN94V1WPQPEEhltpTtsb9v4v9lveu8oAKKKKACiiigAooooAKKKKACvO/ilJLqSaR4Yt2Ik1O6USgdox1z7V6JXnEZOpfHWUPymnaeNo7At/+ugD0CztYrGyhtYFCxQoEUDsAKnoooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAw/FmhJr+gz22MXCDzLeQdUkHIIqDwXrp1rw8j3Hy3dsTDcKezL3ro68h8RamfBXinXVVtsOp2ZliXoPN6cfnQBu+H4v8AhLPG974gmG6y09ja2SnkFh9569BrB8GaauleE7C3C4Yxh392bk1vUAFFFFABRRRQAUUUUAFFFFABVO50rT7y+tr25s4Zrm13eRK6AtHnrj06VcooAyB4Z0k3t5dy2cc8t3Mk8hmUMA6KqqRnpjaPxqc6Jpw0q602G1jt7W6V1lSBQmd4wx47+9aFFAGNN4X0u40VtJlW4azaD7OyfaZOUxjHX0q3f6RY6mkMd7D58UTbhE7EoxHTcvRsY4zmr1FAGeNFsv7bk1coTdSWq2jZPy+WrMwGPqxpNK0DSdDimi0qwgs0mcvIsK7QxP8Anp2rRooAx7fw1p9tFpcaCUjTGZrcs+SCylST68MagHgzQme9a5sheC7nSeRbtzMAyghcBicAZPHua36KAMm58N6VeX8V3cWkchjtXtFiZQY/LcqWG3p/APwqFvCOjtNduLcqt35ImjU4RliJKrj0yeR36VuUUAc3J4G0SWaeaRLszTXC3BlF5KHV1Uqu1g2QAGYY96taf4W03TdSXUImvZLpY2iV7i8lm2qSCQA7EdQPyraooAKKpapq9hotm13qN1Hbwr/E56/T1rhW8ZeJfFBaPwno/k2xOBf33yqfcL1oA9HorgIfBviu8UNqvjG4Vj95LWMKv51M3w5kK/8AI0azu9fOoA7mivP38H+L7AZ0vxhLJjkR3cQYH2zUb+NPEnhllXxRoZlts4N7YfMo9yvUUAeiUVn6Trena5aLc6ddRzxkc7TyPqO1aFABRRRQAUUUUAFFFFABRRRQAUUUUAZXiHQbXxFpMtjdKORmN+6N2IrH8Faxcyx3Gh6o3/Ez047GJ/5aJ/C35V1tcJ4xRtD8SaT4lgGF8wWt16FG6E0Ad3RSKwZQykEEZBFLQAUUUUAFFFFABRRRQAVwHh+HPxa8STntBEv8q7+uI8Prj4l+JT/0zi/kKAO3ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACmyFxE5jVWkAO0M2AT2ycHH5VG13bLcLbtPEJm6RlhuP4VJJIsUTyOcIgLMcdAKAPOn+Jt/aaDea5f6BCmn2GoNY3hgvjJIhVwhdVMahhkjuDWrpni7V9T1jWtPXSNPiOlNGHlk1Fgrh03g/6rjjrXOeCvDmmeI7fWk1aG+eL+257tLWfzIonUvlHKkDcO9RWlrpep+LfG51BtQgtb0wxwSxrPGHAh2sRtADYPrmgDopvGeuQ6/o+jN4fs1udTtpJkL6i2I2RcspxEePQjrWx4Q8Ux+K9NuLgWr2lxaXMlpcwMwbZIh5AYdR054rg767TX/iD4SmWDVLW1hguonlEMkbKCNsZLY+XdjOD2IzXpOhaBpvhvTvsOl2/kwlzI2WLM7nqzMeST6mgDTorm/GGq+INK04S6BpA1CY5yC4G38O9eEv8AEb4jzeM7C2vraa1LTACzWPyxJ7ZPWgD6aorhT4p8Yquf+EPc/S4WlTxX4tJw3g2YfSdf8aAO5orzfUfihc6Orf2hoMkLAfdNwmT+Gaybf44vc8x+ENXkX+9HHmgD16ivKJvjbHbx75/CetRr3LRYxVvS/jLY6sF+z6HqLMeNoUE/lQB6ZRXHf8J7jlvD2sAev2eoj8SrGNsS6TqyfW1agDtqjnkaKIukLzMP4EIyfzIH61laF4ls/EAl+yw3UZjxkTwsn5Zq9qgzpN6MkfuH5H+6aAKd7r8enzWUVxZXaveT+RCBsO59rNj73HCmpf7TuRcTK+lXKQxxBxKZIvmOeVxv445yeOteaWscmoad4TGmad/aB0qzjv7/APeldzGHasYbkFyHZscdBkjcKntrqz1O38d6jZRyxwzaLCyLICrLmKbIIPQ5H6UAdK/xEsDvMFheTJFdLaTEGNSjtKIhgF/mG49RWrdeJBa6zZaY2m3Znu45ZI8GP/lmASPv98gCvC38PvpkWl/ahZzLerDOwjYkhmu7cspGBwA2M59a3dB1CXU/F+n3kq2wkfSJXZ4YipLNACQSSc4PT0oA9G/4WDpfn38fkXCJprhb+WUoiwDLDd975uVIwMml0Dx7putT20DbIJrxn+yqsol3KvIDleEcr8209u/BrxbRdHu9GXQdTmvYVXUwWJj3TSq3kzkKExhmYMuOT82ODXc+B45tQ1TQY4B5UunWvnXskcpkTYwZY4ZA3/LUZJzwRgjAB4BnrlFFHSgQUVxevfFTwl4eaSO61NJJ04MUILNn0qv4R+K2geKoLqUzJYCGTaBcyBSw9aAO8rx/44aUL248MTDIJv1hYj0JFelDxRoJ6azY/wDf9f8AGud8Yf2b4ij0kW2q2J+y30c7ZmX7o696AO0gQR28SDoqAfpUhOBmqQ1bTcDF/bY/66ipYb60uH2Q3MMjdcI4JoAgbXNKS3Nw+oWywhdxkaQBQPXPpSNremrNbw/alZ7h9kewFgTjPJAwBx1OB271574i1C+vPBviy2uLuSWabUJtMsraNFy+/CqgGMkgMT16A+lbEOui88TeG4dM1eWa0la5juoWRVYPHHnY4KhlIPY4NAHSTeJ9EgYo+p25kHJjRtz4zjO0ZOM98cYNK3ibRVsYr06lb/ZpdnlyBsht5AXH1yK8TuH1uTxdPrZe/WEam2mC5CnbtF4w25x93Y23PqCKWz1+e88GeF9OzdCOGW0iJMibG2m3blQmSB5gA57c5oA9sn8SaLbO0cup2wlUEmIPukOM5wo5P3W4A7H0psfibSJdTfT0vEM67ASQQm5hkJv+7vxztznHOK8Q8U3viJvF+s6/b/aTFpV0LSOeOEERgLPx0xx5qjJ6bxmrv2SI6fq9oIjHMdVWC0tmEs0MsjAMYfMBJ8xSCS/ADE8kCgD3iimpny1yMHAyM9KdQAUUVU1PVLLRtPmv9RuY7e1hGXkc8Dt+JzxjvQBbornR4ysFns4ri01G2F7KsNs89qyrIx6D/Z9cNg0S+NNMEt2ttHeXsdk5S6mtLdpEhYdQSPvEdwuSKAOioqrp2pWer6fDf6fcx3NrMu6OWM5DCrVABRRRQAUUUUAFFFFABWV4j1+z8NaLPqV42EjHyr3duyj3NateX6ih8b/FFNLdt2k6IBLMnaSXsD9KAHaF4Yv/ABrep4j8WgiAndZ6b0VF7FvU16FYXljOZ7aydD9jk8mWNVx5bYBx+RB/GnTSXMMipb2iyRbfveYFwfTGK4LQ7m3uvEPirTLlYxcy35Jt/t/lsymGMcKDkj3xQB6OSACT0FVNN1Oy1ixjvtPuEuLaQkJInRsEg4/EGsaa21eTwpJYuttpsnMJlS5aXyrf++GZQS+3jnvzmub0zxFpEEFhbaZBdwaKdKa5ildpQ0SpII8lM8rg7sjsM0AekVXae0luXsXkiefyxI0BILbCSM49MgisnQNDTTNDggtdXurjzHa4kumcSecz8kjOQFJOQB+vOeT1K/uYnW7juAfFEeof2RFmMECOSRZM7ccjygGz2IPuKALWu+CZ9Ku217wi32W9T5pbQf6u4HcY7Gt7wj4rg8Uac0nlm3vYTsubZ/vRt/hWpp2ny2JuGk1C7uzO+/FwVIj9lwBge3NcN4utT4P8RW/i6xUrBK4h1CNehU9GoA9HopkMyXEEc0TBo3UMpHcGn0AFFFFABRRRQAUUUUAFFFFABWL4u00at4V1G043NCxQ+jAZH8q2qbIgkidD0YEGgDnvAeoPqfgnS7iVt0ohEch/2l+U/wAq6OuO+GyiLw5Pbj7sN5MgHoN5rsaACiiigAooooAKKKKACuJ0E/8AFzfEY/6ZRfyFdtXD6C3/ABdHxGv/AExi/kKAO4ooooAKKKKACiiigAooooAKKKKACiiigAooooAiubmGztpLi4kWOGNSzOxwAK4L+3de8aTvD4eU2OkglW1CQfM/+4Kj1Frjx74rl0eNymg6cwN0yn/Xyf3PoK9BtraGzt47e3jWOKMbVRRgAUAc5oHgTS9DuRelpbu/73M7lmz7eldRRRQAYxSYHoKWoftdt9q+y/aIvtGN3lbxux6460AS4HpS02SWOJQ0jqgJCgscck4A/Oobq+tLEKbu6hgDfdMsgXP0zQBYqGW0tp5Y5JYI3kjOUZlBKn2qKLVLG4Utb3MdwBwTAfMx9ducVHBrmlXLrHDqNq8jHAQSjcT9OtAEmp3o07S7q8IBEETPg+wrxLTvi7f+O9Zt/D9qRpAnyr3C/Mzc9F9OK9Y8cW95d+DNUtbCJ5bmaExoqDJOa4v4ZeAtJ8EWEd5qjoNYn43TqU2/7Kbup+lAHW6P4C0LSSsptvtd11M9yd7E+vNdIkMca7UjRR6AYqlJrmlwzGGe+hhlAyUmbYR+eKlbVLGMwCS7hjNw/lweY4XzWxnCZ+8cAnj0oAsNFG4wyKw9CM1z+qeB9C1QmRrRbe46ia3+Rgfwro6KAPOpdT1rwDdxrq0r6joDttF2RmSD03e1d/bzwXltHcQMskUihkYdCDTb2zg1CyltLmNZIZVKsrDIIrI8I6JdeHtHbTri4E0ccreQR/DGTwKAN4ADoAKiu4PtVlPb7tvmxsm7GcZGM1NRQBmaDosGgeH7PSbfbstoVjLogTeQOWwO5PP41kw+DNkXiJZtVuLiTWYRAZJUXMKBGUAbcA43Me39a6migDkdS8CQ6iulg6jcL9g8sAMAwcJLFJ07Z8kD8auXvhb7b4gh1Nr91jhtpoI7by12oZAASCMHGB0OevWuiooA5IeCDDYaFBbavcRzaQAI5mQOD+6aMkKeAcMcdce9P0bwUvh7VjdaVqlzFbXDGS9tpQJftEp/5abjypPfHB9q6qigAooooA5TxD8OPC/iVWN9pkQmbnzohtf8xWb4Y+Evhzw5DcxG3S9WWTepnXJQY6V3tFAHPSeBfC8n39Esz/wCmDwJ4WjGBo9queB8tdJXDfEiWSKPQAjsu7VIgcHGaANc+BfDRGP7Jg/KrOm+FNF0i8F3YWMcE4UruXPQ9a2B90UtAHK+HvCxstW1TUtQUS3EuoTT2mW3LFG2ACB2YgYJ64qOTwzdnx/Z6vDb2MNlF5sssiFhLLI6BBlcY4A65/CuuooA4CTwVqLaLJbj7H9obWGvgSDnYboy43eu329veqKfDmW08M6BaWlhaf2hE1qb64edsoU8reUGCGz5QGOP51B8TPHr+GfF3hyyinKxtMHulU/wE45r1JHWSNXU5VgCD7UAefaj4I1C80PxJbBbXztQvZJ4cgltpK4+bOAflNQxeDNb03XrfxBY2mmEx/IujiVlhhyAvmrJjmTaACdvTjnqez1bxNo+iAC+vo43PSMHLH8BWC/jbUb9tugeHbu7B486f90g9+aAOzTcUUuAGxyAcgGs278Q6PYX62N3qVtBdMu4RSSBWI9eaxVtvGt/Fma9sNO3dVjQyMPxPFeZeNfg54i8SeLLaf8AtT7RE0IEt3NxswegAoA92ininUNFKkinoVYGvPvi6jrpnh+9lVn0yz1m3nvwBkLECcs3sCRWh4G+HVn4KizHfXN1Oy4YyOdo+grs3RJY2jkUOjDDKwyCKAMrVrjT7rS4gZ4XNwy/Y2X590ucoy464IByOgBJ4zXH/CG6t9P+HX2S9kS3u9OnnW/SVgpibexJbPsRzXa2Hh/RtKnafT9KsrSVhtLwQKhI9MgdKL3w9ouo3Qur3SbK5uAABLLArNx05IoA474O2tzB4UvbiRHjs7vUZ7ixR8jEDH5cA9ASCR9c96726uUtLWW4dXZY1LEIu4n6Cuc8Q2UFzrml4sroywyJKLqGFm8sK33FYDC7ujZx8uc9q6mgDjm+JOix/wCtg1GPH960amr8UfDLZ/f3Kkdmt2H9K7LYp6qPypvkx/8APNfyoA5NfiX4ZYZ+2SD6wt/hQ3xN8KJ9/Udv1jb/AArrPJi/55p+VRvZWso/eW8TfVAaAObT4leEHx/xO7YE9iSK5SX48+G7bxFPp1wkotkOEu4xuVvwr0g6LphOTp9sT/1yFcdN8HvCd3r8+rXVo00krbvKJwg/CgDqNG8T6P4hs2udJvorlFXJ2HlfqK4/4RqLux1rV3wZbzUJCW7kAnFdtp+h6bpFq8Gm2MFqjLjESBc1x3wj/wBH0PUtOYESWmoSqwPXlqAPQq46Hwja6n/wkcGvafHJbXmoGaBmI3bfKjXepHKnKn0PFdjXE/EyVh4fW2eVfs9zIsItlcrJeSsQEhB42qx+8c9AfXNAGxqWgSXujWmhrcuNNWMRXUjuTNLGoA2Z/wBrnc2c+g5yMuw0zUp/HjXk+m2tvpFrpzWds8M4dZlaQEfLgbcKvI6c8E1wb3OoXltqemXUxmvzqqJ9mjmmkRYFeMSBYyCvljcQfY810OrzxL8P7m60sPFBbecLSTSWktoodrhSrruG47g3OCOD0zyAdVo+lTeEtIbT7KOfUY2uZXt41KoLdGO4ISzfdHTjJ56ViXPg7W5tdXxZHd2Ca9Gnlx2rRlrYR4PyluG38n95jocbcVleJNZj0+bQNNt4NUsLi+vVlvIxOzvFAp/2XYDeQOByRu4zXoWjR6YbM3elOkkF23mmVHLiRsYzknrxj8KAItAvdYvrWR9Y0uHT5VfaixXQmEg/vZAGB7daPE2nJqvhrULJ1DCSBsZ9cZFa1V791j066djhViYk/gaAOa+Gt8974F08yPukhBhY+6nFdbXBfCFGXwOjkYElzK6+4LGu9oAKKKKACiiigAooooAKKKKACjtRR2oA4/4dnOmal/2EZ/8A0Kuwrjfhz/yC9T/7CM//AKFXZUAFFFFABRRRQAUUUUAFcNoI/wCLp+Iz/wBMIv6V3NcRoIH/AAtDxGe/kxfyFAHb0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAVk+J9S/sjwzqN+PvQwsV+vQfrWtXHfFESHwBqGzP8G76bhQBN8OtG/sfwfa+ZzcXebmZj1Zn5/liurqlo+P7EsNvT7PHj/vkVdoAKKKKACvN/FHhTTJNb0W10i0RdbOorfzXi/62OINmRnfqQfugHjkY4FekVx//AAgb/bby6HifW1a8k3zhJI13DsuQm4ADgAEYoA5v4rzXGsk6JYzXscljB9vLWtvJLunH+pjbYDtzgtz/ALJqp8Qdat/FXwHi1sIhebyGPH+rk8wK4H0IIr0PRfDn9jT6lP8A2neXcuoSiWRrgR5VsbeNqjjAAwcjj61zD/CWxfQrnRW17Vv7Oubj7TJAPJA353ZH7vKjPOBge1AFP4r2lvoVhpniTSoY7bWLa+iijeFdpmRjgxtj7wIHQ+nvXOXOjz6rrHxF0fTdBF5PcXEHkybo0S3cxA78sQQckn5Qa9N/4QyC51S11DV9SvdVms232y3OxY4n/vhEVQW9zml0Dwgmg61qWqJqt9dTaiQ1ys4j2swGFYbUGMDjjigDCutS1vR4PCmnS6fqcs0N0lvPMk0WLzbby56yZIJG75sfd9cCn+MtK0jUvDuoX+p6Mx1W9h+x2cFzsklEnOwR7SQvJ3Eg9Bk8DjtrmxtryW1knjDvay+dCckbX2sufyZh+NYGr+D31XXU1Ya/qlrNFGY4Y4DFsiBxu2hkOCccnr26cUAcXqemyaP4s+Htvc2J1S9TTrqC4CbN0xWOMclyAQMnqe9QaRb614Nm0W0vtM09bXVdekaG3kPmvYKwJVY8fKDgNyD3+tdp/wAIIp1jStUfX9VkuNMV1h8xo2yHx5m4lMndj147Yq/4g8LReIb7S7qXULu2bTZ/tEKwbMGTpk7lOeCR+NAG/RRRQBm61o1rrlolrfNIbQOHlhV9qygA/K2Oq5wcd8c8cVyHgK3t9CtfEd7BM0PhpbpnsFkYlEjRf3jqT/AWDY9hnvXU+JdGudf0d9Pt9Tm08SnEkkKKzMvdeex71iS+CtUutLl0688UXFxbSCNPLNpEiCNTnZtQAYPAPsMUAcl4N165tviQz317HLD4otvtMcYkB+zSoTtiIzwfK259SKu+NfC+jWOteFRHp9uzXmutJcvJGrNLv3uQxxyMngHsBXXeKvCZ8TJphF+9lcadcC5iniiUsHAxxngD1Hfik8QeFbjX7zR7l9UMDaZMLhFSAESSAYycnpgngfnQBwvirwvoGi/EXwckOjxPbXct881vHbhw37tMDbjkAkkDsSa6n4a6Tq+k6fqqahFNbWct/JJp9pNJuaCA9F6naP8AZ7Vpax4Vl1bxPo+tnUmik0rzPJiEIKt5gAfdznkAfSuloAKKKKACiiigAooooAKKKKACuF+JXI8O/wDYVi/rXdVwvxK6eHf+wrF/WgDuR0FLQOgooAKKKKAPnv4z+DY5PGFjqt3qpihvX2HcvEKqO1dxor+JvE+lW9naXD6dpUSCP7aVxNOAMZXPT60fE3SINc8S+E7K5G6Frsl19QBnFehyz2emWYaWSK3t41wCxCgAUAZGkeDNF0jEiW32i5/iuLk+Y7H1yen4VvgADAGBXnPjD4pWWnaFdy6EXu7yMfKywkxj6muX8GfHO/1idLTUNAmmkJx5tmpI/EUAera/4o0vwxFDNqrzQwSuE88QO8aEnA3MAQv40/VvEVhoyWclz9odLyRYoWggaUMzfdGVBxntmsXx9DBqvg+GC7hPkXV7ZpJFJwSrToCD+Bri421Xwjr+j+DNRMt3pkmoxzaRetyVjXOYXPquRj2/AAA9S1XXtO0VbI6hcCD7bcJbQBgctI3Qe3SoPEHifTfDENvLqRuFjuJRDGYrd5cuei/KDye1cF410i98e3GrpZWiXEGmxG2s5TOIyl0Cru44OcbUTt/GKq+IPESeJ/ht4T1IsvnvrFmk6g/dlV8MPzFAHocPi7SJdYXSXknt790LxwXNu8RlA67CwAb6DP6Vn/8ACyPDiw3M0k11FBa3P2S4mks5FSGXONrttwvPc8VhfFJkvNQ8I6fYsrawdXimhCffSNcl29lA6/SsHQ/Dl94si8d6Mmo29rp9x4gmFwfILykBgTtO4AZxjkGgD0my8Y6TqOtXekWv2qS8tEDzJ9mfCqRlTuxg5HT1qXQPFWmeJWu1003LfZJTBMZbd4wsg6r8wHI7iuI8MWUtr8VvF1np1zHBHBa2MYEkfmEqsIA7ir3wo3CLxaHcO48RXe5gMAnI5xQB6HRRRQAUUUUAFFFFABXnAk/4RH4pyCUhNN11flY8BZh/jXo9Yvinw5beJ9GksZ/lkB3wyjrG46EUAbVcn450xLmysryOze4uoL61KlELsiCdGYgDpwOSOw9qoeFvFdxZ3I8OeJ8W+pxfLDM3C3K9iD613XJIIIx3oA8u0vQdTg8UWt9LYzh7uzu7mcqhxG8s6ssZIYDcFwMZ/hNXdF8L6nqvgi30m4u5tNtHurw3kJg/fSo1w7IAzZ2gg5zgk5GDXotFAHCaj4Th0eLTP7Pju7y4l1mCa4uJnaaUoN33mPIVQeOw+pOep0jQ7LRPtosVZEvLlrp0J+VXYAHaOwOM/UmtKigArivihrp0jwjPbwMftt+RbQKvUluD+ldPq+r2Wh6dLfX86xQRjJLHr7CvPfDNhf8AjjxQPFurwmLTLc4022ccn/bIoA7bwjpH9heFdO07HzRQqH/3upraoooAKKKKACiiigAooooAKKKKACjtRQelAHG/Dn/kF6n/ANhKf/0Kuyrjvh3/AMgvUv8AsIzf+hV2NABRRRQAUVz/APwllvcavd6ZplldajPZ4Fy1vsCRMRkIWZgC3sM474qp/wAJ9pq2Ecz2l8l1NdtZQ2BjHnySrjcAucYAOSScY5oA6uisGHxVbf29Dot9aXOn3twhe2E4UrOAMsFZSRkdwcGt6gAridA/5Kb4kP8A0yiH6Cu2riPDxz8SvEvskX8hQB29FFFABRRRQAUUUUAFFFFABRRRQAUUUUAFZniLTRq/h2/sMZM0LKv1xx+tadFAHHfDPWW1TwjDBccXlixtZ1PUFTgfpiuxrzXX4LvwJ4nbxNYQNNpN4QuoQp/Ae0gFd/p2p2eq2Ed7ZzpLBIMh1NAFuiiigAopCQASSAB1JqjNrOnwajbafJdILm5R3iQZO4LjccjgYyOtAF+isuy8R6PqENtLbahCy3QYwhm2s4X72AeeMU6bxBo9vHvl1O1VcgZ80HrjH8x+dAGlRVKy1ew1C5ube0uFmkttol2ZIG4ZHPQ/hVzI9RQAtFNV1fO1g2Dg4OcGqM2u6Tbxu8uo2qqgJb96M4HXj8DQBoUVnQ67plxqMlhFeRvcxqjMo6DdkqM9MkAnHXHNaNABRRRQAUUUUAFFFFABRRTS6qwUsAzdATyaAHUUiurjKsGGcZBzS0AFFFHSgAopNylioYbgMkZ5paACiiigArhfiV08O/8AYVi/rXdVwvxJ6eHf+wpFQB3Q6CigdBRQAUUUUAeX/FTWV0HW/DeoMu8xTOVjHVzjgD8a1NK8K3niIpqviuVpTJ88VgpxHEO2R3Ncx8ZnEXibwlNJGXt4LnzZQBnCgjJr162uIrq2jngcPFIoZWHQg0AU5tC0yfTW097KEWrDBjVQAR+FP07RtN0iERWFlBboP+eaAfrV6igChqei6ZrKRpqVhb3axHcgmQMFPqM/SpZ9OsrmKCKa2idLdleEMv3CBgEenHFUZvE+kW2upotzeLBfy48qKQFfN4z8p6GpbvxBpdjqttplzdiO9uf9TEUYl/pgY+vpQA6y0HSdOtbi2stOtreC4z50cUYVXzwcgdeprPHgTwoE2Dw7poQNv2/Zlxu9enWtebUbO3v7axmuI0uroMYIifmk2jLY+gNUdT8U6Lo9/DY398sF1OMxRFGJk/3cDmgCay8P6PpskkllplpbySrteSOFVZh6E4yRSab4e0bRppZtN0y1tJZf9Y8MQUv9cdaZbeJ9FvYLma21GGVbUZnVcl4/95cbh+VVrDxr4b1OW3js9Xt5GuSRB1USkdQpIAJ9hQBYi8LaDBey3sWkWaXUwYSTLCAzgjByepzmpdM8PaPoskr6ZplrZtL/AKwwRBN/1x1q/FNHMGMbhtrFGx2I6ioL/UbTS7GW9vZhFbRDLyEEhR6nFAFqisA+NfDi6KusnVIhprPsFztbYT9cfrWpZ6nZ6hFDLaziRJ4/NjOCNy5xnntQBbooooAKKKKACiiigDG8ReGNN8TWYgvovnXmOZOHjPqDXKLceL/BSFLiBte0tPuSRcTovuO9eiUUAchp3xL8NX4Cy3hspuhiu1MZB/Gt+PXdJmTfHqVqy+olWm6h4f0jVFIvtOtp892jGfzrG/4Vt4SwQNGhAPoWH9aANO58V6BaKWn1iyQDrmYZrmrz4nWlxN9k8OaddavdHgNGhWNT6ljWrb/DnwlbTiaPRLbzB0LAt/M10NtZ21nHstreKFfSNAv8qAODtPBGqeIr9NS8Z3azKhDQ6fCcRR/73rXoMcaQxLHGgRFGFVRgAU6igAooooAKKKKACiiigAooooAKKKKACg9KKD0oA4/4djGk6h76hP8A+hV2Fcj8Pf8AkD3v/X/P/wChGuuoAKO1FFAHmXw6uoPDd/4m0TWpUtNQfVZrxGnYKLiF8bXUng9Dn0qHxFLFH8RfDPixIpBokMk9tPciP5A7oAsuR/Cfu7jgfL6YJ9Plt4J8edDHJjpvUHH508orLtKgqRjBHFAHmvjAx+J/HPhG20iZLhtOumvbu4ibKQRADhmHGWxgDr+FdzqOu2Gm6U+pSS+baqcF4Pn747VNc20EWnXMcdisyNG2beNVXzePu84HPTmsvwrYtBplz9p0x7KS4uGmlgk2Y3ED7oRmAXgD1OCSOaAMxfin4SZwpv3Un+9C3H6Vzvhrxn4eb4g+IZzqcKRzCMRs5wGwOa9KOmWDZzZW5z/0yFefeHvD2jXfxB8UJPpltIsbx7Q0YwMgdKAO4g8R6LcMFh1S0cnoBKKuLfWjqxW5hYKMna4NYcngHwvKxY6Pbqx7oNv8qzJ/hZ4dKSG1S6tpHB5juXH9aANvSPGGga5NJDp+pwTTRsVaPdhgR7Gtyvm6x+AXihNWluItVgsFEhMUiuzPjPtXt3hDRda0PTjbaxrJ1NhjY5TaV/HvQBNrOv3Gl69ommx2Mc6anK8ZlacoYtqlidu07uAe45rHi8eyyXF1ZnSVN+uptptrBHdbvOZUEjOxKDYoVgTwx+vGYvHCWlz4t8HWlzcNEHup8+XOYn/1RAwykEZOBx1ziuJ0hbbTPHMWp/aidMstevYJppJTJ5Zlt4QjOxJOCyMu49+M0Aegz+M7u2vo9Jm0UjWZpxFb263GY5F2FjJ5m0YQAHPy5zxitfQddXWkvIpIPs17Yzm3uoN+8I2AQQ2BlSCCDgfSuS1zVbafx14c1uNs6RYyXFpNeg5hEksY2nPoCoXd0y2M9ak8J3dnF4r8Va1LewxWeqXkMNm0jhRN5SbWZM/eBZgMj0oA7Gy1qx1C5e3tmmMiAlt9vIgwDjqygHrWhUc6NLBJGkhjZlIDjqvHWuFl+HmqTOzN4z1YFj0BAoA76kLKOrAfU1w0Hw5nQfvfFetSf9tcVHe/D3TYLWS4vvEOrJCgy8kl2QFHqT2FAHd+bH/z0X86QzwjrKg/4EK84/4QTwxEl7LJ4hv3jsBm6zeEiL5Q3zfgQa2bX4f+HLi1jmjku54pFDI/2pyGBHB60AdVNJZzxPFNJC8bjDKzDBFeC/FDS73wZa7PCeoXKWd/JmW0hJYIRzkY6V6NceCvBcYuTNc7BalVnLX7Dyi2NobnjORjPrVo/Dnw1FBulSdUHJLXTYH4k0Aed/DH4xSDydC8VCRJhhYbp16+zf416fqHxA8M6XrK6VfanFBcOoZS/wB0g+9c5ffD/wACRkPc3qo2GYZuhkhQWOO5wATXGa98EBr+qx6tY65BFo8sSsskrtJIy+oyMY/GgD3aC6tb+DfBNFPE46owYEV52i2beMtWaeO1hj0iRbazASJFRJIo2YEEjPPT0q54P+Flj4UhcJquoXBkjKMPOKKARjgDofer3i7wmb7wtdWemJK91LJCcNMRv2umSSTyQq9/SgCh4Ehig1nXNMjjh+x6aYFtB5aFk3x72O8ZJySe9eYQXviRpIdfhe6e6vNRa3jkEQVZCDbR7SQuAD5bD32n3z70fD9k17BeE3PnwEsh+0uBkjHIBw3HrmuP/wCEO1my8HafaQR2E2o2t5HcbQpXOJt/MhPTHX5foDQBmeCorCx8Q3Wn2MGq3L2ckKkpL5ajCmKSSRdwDDzI34wfYV1Him9htrqPSNHsrefX9QyyB1ysKdGmk/2R6dzx61nad4U17w7rMVxpptblZ4IUvJ5JdjF/PklmYLtOQ3mnHPFaMGia7pnifWtVtI9OvDqMkZSS4neN4o1QKI8BGGAdx991AGp4Y8NWXhXS/slu7STTSGW4nkPzTyn7zEdB06DoBXkXiPVdZbxze6rB5hTTLxLNZYrcMEDCXCnjGcP1P94V6ZfWHinVNR0iWVNKtYbG8FzIUmklZxsdCoBReznnNZd/4U1S40jxBEkCeZd35uIV89lZ0BQ8YOATtOM/pQBwv2aI6dqsCi4S6GpokNrPdSss0jYbyxIHIE6kZ34wCSMkcj3mPiJdwwdoyCeleaW/hHWdK8QW2uWel2clqj/LpC3JXyWZQhuN5BDSbRgjHTOCSST6FqFiup6dLaSvJEJVwzRPhh9DQBaDKwyGB+hpc1xcXw4tIRiLWNXX6XRrl/Ethb6Tcppthr2uXeqyfdtop8/99HtQB65RXi8Pw9+Il0TN/wAJbJYKRxCztIR9TTbnw78TtCzLL4ilv7VRljbqN6/gRzQB7VULXVuk4gaeMSkZCFhnH0rzLQbTXvENobjT/HkzMhxJE9sm6M+hGK4Xx54F8e33jO3ksrqe9mEK4uk/dKuD04oA+jGG5SAxGR1HavNvFM89prtneXV1vl0OCe+aFpF8yaIqU3J+6C5zjI7Z+hq14E0Xx3ptssXiLV7eeHbgKF3SL/wLpVzxx4eWfwrqd4Zrq5v4NOnhhYqhYhwNwwqjqVXp+FAGT4Psr1dcl04XreVZXEl7cmCUgNJMSyo37sBsIeRnjIIxgVL4qlvodb8TTRT3UUUWhq8TIJSokHnHIKkAHgcnPaul03w3BbQWbxXd7F5b/aGRZAokdh82/jLdTwenHoK5fxdp1/r+hanHp0d5p+mRW00sk7yOJrpgrERohOVQnqSASOAMHNAC+GftM3iXw5dTy3EobRJC0jiUDexh6lmIJPPT0riPEPjOaLxw6GOf+yoLl7Ka1k1CTy5CDcIWY9uitj/ZArsfD2n6hpdnodjq+iXWrWjLE9reRufMtX25xKjMMbeQHH0Iz1yb3Q5G8OeIJ106Tz21+WdZDbK3AuQA4JO7G3PTtn3oGUbW/wBUjg1PV476V7i1vkWe9jg/0gxYUoxhLHMJBb5Mg4w2M5x7j1rxqzsvsHia1vNTstRn8PLdG6gvJLEtNPdlQuZFUbwm7cVyo5IHQLXsgOVBHcd+KBC0VyFxfeOkvJVh0rS3twx2MZmBI96X+0fG4HOiaeT7XBoA66uQ8daZd6k+hfZYWlEOoJJJj+FR3qGTWPHaDK+HLJvYXVQp4i8ebj5nhG3x/s3goA7sdKK8M+JvjPxzp2n2EsWmtpT+ccPFKJN/HTGK1fh/498dawqJqnhlprfj/Sh+6P1wetAHr1FczqXi1bPUNFt4bOZ11G4aJzJG6NGBGz5AIyT8vSq+i+NxqczwSafL539oT2qCHnEcbFfMYNggdAcZxkUAX9Y8Mxazrdje3DI0Fujo0TLnfurGk8La1oExl8L34+y5z/Z9ycoP909q1tV8W2+k6xcafLbOxgsftrOHUZXcQQAcc/LUOm+M4tV1HSLa3s28vUrR7pZGmXMagKQCozyd478e9AFdfEviaD93d+FZXcdWt5gVP0pzeKdeZkSLwld5Y4JeVQAKXUPHMdjr6aH/AGdI1/Km+PdMixH/AFuMtkkf6lux6jiqUPxKtJHmu2tHOkRlY/tEeXfd/E5XH+rBIGc574xzQBU+ImiJ4ovfDmlzSyWsstw7LJE3zQyCGRlIPswFZ/hrxFqF9410nQPEMHl69pUVwszgfJcRkJtlU++Of8gd9qPhrTNW1K11K6S4Nza8wtHcyRhTzzhWAzgkfTjpUl/4f03Ur1L24tz9qSF4Fnjco4R8bhuUg9vw7UAeSeMrjUL3UpPG9lp9/Kmi3ifY5o2QQtbRllnz8+7LEsMheiDsa6bxNeQ6h8QPhzeW7h4Z2uZEYdCphyK66PwrpMXhqTw8kMw0yRSjRfaJM7T1Xdu3Ae2cYyO9Zkfw28MxGzMdveL9iz9lxqE48jPB2fP8ufagDC8RqsXxt8JtpwAu5be4F/5f8UAX5d/tnOM98VyngrwrqfjD4beGbNja2umWmoPdtcLKxnfbI/yqu0BeT13H19q9ZtfCOi2QumgtpVnu12zXJuJGnYenmlt4HHY1N4f8N6X4XsTZaTDJBbFtwiaZ5FU98bicfhQBBDpM2iRyvpNut1NLKzMt1eyIqqTnjIfJ/AfWud0W41l/CeqLPp9mtsbjUd8q3rM6nz5cgL5YBAPHUcc8dK7+qN7pFlqGmTadNEyWsxYyJC7RFtxy3KkHkk59cnNAHjtwNU/4ZxjJez+yfYU4CNvxvHfOM/hXqlroFq95aamXn8xYANvnyYycHON2McdMYqs3gLw83h1dAa2uDpatuFv9rlx9PvZ28Zx0zzit2xsodOsorSAyGKIbV8yRpGx7sxJP4mgCxRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABQehopD0NAHJ/D4Y0a8976b/ANCNdbXJfD450S7I6G+m/wDQzXW0AFFFFABRRRQAUUUUAFcL4UBPxB8WMRx5kYz/AMBruq4nwmP+K38Vnv56D/x2gDtqKKKACiiigBjwxSOrvGjMvQlQSKQW8KqwEMYD/eAUfN9akooAZ5UfleV5aeXjG3aMflXN+L9OvL/T0s9P04Ss6lVmSREERypAYHrGcfMF54HBzx09FAHHfEwKvgaaVy4MVxbHMZYMMzIpxt5OQSMe9cV4qhlFnrV3psGoW+hpDbBVmEkW6589QTGr4YDYSD0BzXpPi7R7rXtAfT7R4Y5HmikLyk4ASRX7A9duPxpvizRbvxB4Zk0y3eCKaV42ZpGO1drhuMDn7uO3WgDz7xRbWI0fW9QtLa/sBa3NpbSQM7/OS8bb1UEkHa7LgdRWxHpj6lqusQ6fbajD4dns44pIZt8AlmLHfsWUZAKHBwBnsc8jU8SeHvEfiKF7drjT7e2PlEQq7tl0kV9zNtGeE2gY4yTzXQa4lzJozrBYQ3l4ceVFIQY1k7MxP8IPPHPHAzQB4XLNOnhC2Uy3UX2ieOe4MVyrrInnOoDRFMbiQFUDOdvOAuK7zQdUk0XxD4jY3dxqlmkUbLJG4YefwBGUAAWVg6D5flbGeDkVLc+AlTTLXSrLTFluLe18hdQuJFSJHYZaZVXLl8k4BwB2I6nY8G6XrOgiXStRtLe4i3vcNq0cvzXMjNnLRkZVsehI4GPQAHEGVovg5q+p6lEiajd6s0l0EbcXkW6Vdo9cBMADsK7IXmvt4Q8QazqQS1ElrJLY2TRhmt0WM4LnoWPUr26VjT+A7q68G3yvZCTWBqE1xapPN8qKboyDb1Clk79ecGtbWF8UayL23TSDbWUmlXMBSW6jJeZgNmApI7EckfeoA8eN1qFpY3n2i6NpBqdvNeNHPbAfalLMUQEgEbt2DtOcHHcV6Fpmtx3Hih9PvNOhD2dt/o6JGzb2L4yj7iApRT1A54+ulqvgnUNVn0KJY4LOG3hxcyo/m5KvE2zacdfLIyM0eHvCOpL4j1ae6Etnp7KkKREq3njdI52kElFBcY6HjpQB6GvKjjHHT0paQAAADoKWgAooooAKKKKACiiigAooooAwPGOvN4e8PTXUK77pyIoE9XbgVW8HeFk0KxFzdt9o1W4/eXNw3JLHqB7VvXunWmoiIXcCyiGQSIG7MOhq1QAUUUUAfPXxW17U/Anj2LUdCtfsYnh/ePjMc59x0yK9n8F6tca54P0zU7oqZ7iEO5UYGaj8Y+FbDxl4en0+5VCxUmGXqUfsQaXwRpdxonhDT9NuSpltk8slTkHBoA6GiiigAooooAKKKKACiiigAooooAK5Lxvq97pT6ILObyxcX6RS8Z3Ke1dbXC/EcZl8N/8AYUjoA7Oe0trsJ9ogjl2HK71BwfbNS4WOP5V4A4VRTh0ooA8x8dRSnTtT1Kys2WxfSLtpvNtijxTeWSkikjKtywNXvDtrLa6uuqy6VcEXGy3ghhgQLbxgczMxwcsSSdueCMg447LWdMj1rRL/AEuZ2jivLd4HdOqhlKkj35q1bwrb20UCklY0CAnqQBigDz3x1PFpf23WLiK7W8urJtPhtreRGaVQWbcFxnHOSeMAVU8EySappXhzUdOjae702zS0mt7m4WPykZE3NtCE9FBXPBBzmu3fwxYyfbJZGlmvLqJ4Wupm3OiNn5V7KBnoAPfJqqvgfR1GlOBcR3OmwxwR3MMpikkRBgK5XG4cdKAPGvE/hya6uvFuv+dGottQMao0btlQHBOQMDmUcZ/h7VtWyTX9/e6OqyS3+o6kssMkrNBd26CMFrojacIRgKnHZTznHpNz4JsLnTdVsnuLkLqVw1xIRIQFYkcADjHyjrUMvgO0a9XU4dT1GHWM4fUVkUyOmf8AVlSNmz0AXjrQM6tQVRVJyQMZ9aWkUFVALFiBjJ6mloEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABSN90/SlpH+430oA5L4eY/sC4x/z+zf+hmuurj/hxz4euP8Ar9m/9DNdhQAUUUUAFFFFABRRRQAVxfhMf8Vp4rP/AE8J/wCg12lcZ4PGfFHilz1N2B+lAHZ0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABWR4n02z1Xw5fW97Ak0QhdwrdmCnBHoRWvVTU7Wa90y5tYJ1gkmjKCRk3hQeDxkZ496APF9H1m40/wWfCfi7bPDeaV9q0i9k+7KPL3eUT2dDjH4e2ev8RTW+mfD/SvD1jdW2mvqsS26zSOEWKMpulck98ZH+84rV1DwDaaz4Eg8MarMtwLaJY4LpItjRlBhWAyecdeeeauWHhq4tfEMepz6gk8cVktnFAYMeWowSQ27qxAzx2HpQBxml6pH4m+BeqpfeXcXmmWdxbzH7wEsSHY4Pfjac1XXw9Z23wYtNf00tp2sWulrdreW7FHdlXcQ/wDeDYwQfWujm+H14b/xLNba4sFvr8ZjuLf7JlUBUruX5vvYJye57U8+Abq58M2fhu+1120i3jSKSK3txE86LjCs+48cc4AzQM4O1fTda8c2WoappD3H9o+GEu5re1gZy07PywC9DjgNxjjmqlpo+o6frfgD/hJNOlvdSlN4ZoSyvLIirmIOSQCVHPJ4r1O28GyWfjWLxBb38UUMVkLCOzW2wqwBtwAO7rnvjHtS6v4YuNa8V6Tr8GrRRf2WZBDCLfeG3ja+47h/TFAHMaNZ2lx8cLydtHeycaWtwI5gufNMhBkG1iMkcZ69a7zxNplnq/h29tb6BZoTEzYPYgHBB7EetZ0Pha8j8dy+Jm1RG8y3+ym2FtgCIMWHzbvvZ7/pW5qlrPe6ZcWttcLbyyoUErR79oPB4yKBHjFhq1xp3gyTwh4vxOl1pZutHvn+7KPL3CMns6E8fh7Z7DxPJa6X4F03w5Y3VvpbapGIElZwiwx7d0j5JH0+ritPVPAdrrvgaDw3q06ztbxKkF2kWxoyowrYyecdeeeelXrHw5c2/iMapcX6XEaWi2kMBgx5Sg5JDZ6kgZ47D0oA4/RdUi8VfBK+TUBHPd6fazW0/wA2/EsSna4PckbWz71VPhy0t/g3Z69pbHTdYtdKjvFvLdijOwQMQ/8AeDcjBz1roX8AXqah4jns9bjt4NdXbPbizBVPl27l+b72CcnoTzinv4Cu7vw3ZeHL/XXfSLaNIpIbe3ETzomMK77jxwM4AzQM4OFtM1nxza3+p6NJcjUfCou5ba2gaRmnaRfmAXocZAY46jkV13gzRfF0Oi6RNrGpSxywrLuiljWSREJG1WPUnA/Ctq38HzWvjePxDDqEaRx2I09LNbb5VhDBgN27rkDnH4V1dAjkp/FiJ4us7RV1AWj2U0kkf9nTZLq8YU42ZwAzdOOee1chpkNjD8XvEksOgz3im0t3RI41UxmRDvJV2XBbJz365r1F9Ogk1aHUm3faIYXgXnja5Unj6oKwLHwre2PjLU/EI1WN21CNYngNrwoQYTB3ZyO/rz07AHC/D/RZL2z8YHTR/Z9wNYuLdVaNWZYxjEeckAD2OK9fto5YrdEnn8+Qfek2hd34Cuc8JeFLjwxcatI+pLdrqV295IvkbNsjnnB3Hj2/WuooAKKKKACuH+IozN4bH/UUjruK4f4h/wDHz4aH/UTSgDuKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKbJ/q2+hp1Nk/1bfQ0Ach8N/+Rcn/AOvyb/0M12Ncf8Nx/wAU5N/1+Tf+hmuwoAKKKKACiiigAooooAK4vwQd2ueKGzk/b8fpXaVw3gAltW8UE/8AQQIoA7miiigAooooAKKKz9Y1vTtAsGvdTukt7dTgu/TNAGhRXl2q/HrwfYZW3knvXHaJMD8zXS+A/Hll480ua8tIXgaGTY8TnJHoaAOsooooAKKKKACiiigAooooAKKKKACiszxFqp0Pw3qeqrH5rWdrJOE/vFVJA/SuP0C68XarJZzXOswRadqVsJY5IjC0qSY3fugY8FCOCG3EetAHodFNRSqKrOXIGCxxk+/FOoAKKKKACiiigAooooAK8B8FfEhtD+JGr+HdTl/0C4v5FhZj/qm3HH4Gvfq8e8UfB+zh1CbxLp6Pd3guTdSW0h4cZyQPegD2EEEZByDRXP8AhvxZpGv2iraTCOaMBXtpDh0I7YroMj1oAKwj4kRvGI0CGAyFbczTSg8R88A/WoPEHjCx0dDbwOt1qUnyw2sR3Mzds46CmeDvD9xpVvcX+pOJNUv382dv7g7KPYUAdPRWX4ke6i8N6jNZXb2lzDbvLHMiKxBUZ6MCCDjHTvXld9471CD4QRazB4yifxCVjmaIJbFvmZVKeXs6AEn198cUAe0UVy+nXuvx6hYWk8Bu7ZrYvJdSSorOcr8xVUABAJG0dam17xjp3h7XdF0m73GbVZjFGwPEfHBP1Yqo+vtQB0VFcz4n8VXPh3UNKtY9Ja8XUrgW0Ui3CoFkIJwQR0wCc0xPGRi15NC1LS5bHU543ks1eVWiuduchZB0PsQKAOporz6L4oqmjLrWoaHPa6WLtrOadZ1kMLhtmWXj5c9xn6V3L3tvHewWbSYnnRnjXB+ZVxuOen8Q/OgCxRXHXXjW+g8Q6ppEPh6S4k0+BblmS6UGSNicFQR14PBNaOg+Jx4lh0/UNMtd+kXdu0v2l5ArxyBtvllPwPOccUAdBXDfEX/j58Nf9hRP5V3NcN8RCPtfhgE9dTSgDue1FFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFVJtUsLe8js5r23jupBlIXlAdh7DqafZX9nqMHn2N1Dcw7ivmQyB1yO2RQBYooooAKKKKACiiigAooooAKKKKACiqWrataaJpsuoXzyJbQjdI6RNJtHckKCcD1rGn8feHrbQYdbmubhNNmOEuDZzbT0wfu8A5GCeD2oA6aiqlpqVte7BEzhnjEoSSNkYKTgZDAEdOhq3QAUUUUAFFFFABRRRQAUUUUAFNk/1bfQ06myf6tvoaAOR+HH/ACLc3/X5N/6Ga7CuP+HH/Itzf9fk3/oZrsKACiiigAooooAKKKKACuF+HpzqXig/9RFq7quF+Hn/AB/+J/8AsJNQB3VFFY8Xizw7NN5MWuac8u7ZsW5Qnd6Yz1oA2KKo3etaVYTpBeajaW8zjKpLMqsR7Ammajrljpmitq80jSWCx+aZoFMg2Yzu+XtjnNAGjWfrWi2PiDSptO1GBZreUYIPb3HvWYPG2jmfSof9L8zVkMlkPsz/AL1QASRxxgEHnsa6OgD42+JHw/uPAuteUH82xmJMEmefofeuq/Z7vr638YXFvFE72c8JEpHRCOh/nXXfG34bXuqq3iLS5Zp3jH7+2ZiQB/eUV5D8OPF9x4M8XW90C32aRhFcx+qk/wAxQB9n0Vk6vr0OleHJtcFvNdW0MJuHWHbu8sDcT8xHQVj6h49g07wjaeJZtIv2srnyyFQx70DkBCRvxyWHQn3oA66isS08VaVd6r/Zf2mKO9CBmhMqEhiSCnBOWG05H0rJ8RXd5retQ+HtIvzbPERLfSKOVj7AH1NAGlqXjLRNLMqy3XmSRMFeOEb2BPbiqn/Cc2rXcMEem6i4lUMJBD8orW0vw7pWkIwtLONXc7nkYZZz6kmtTAHQUAccvxCtPJuJX0nU0WFgpzD97nqKsf8ACe6Ss0MUkV4jSruG6E8fWuowPSkMaN95FP1FAHKr8RvD7QXEwln2QHD/ALk/pTj8Q/D4W1JnmH2n/VjyjXSfZLbaV+zxbT1Gwc0fY7U7c28Xy/d+QcfSgDmJvHnhq4W9tJpJJEiRlnRoSQy9CPeua8PXHw88JbdU0m3uoftW6NC3mSbBnJChidozjpXpf2O13M32aHLfeOwc/Wl+yW20L9ni2r0GwcUAYH/CeaD9sktftMgljTewMTdMZpE8f+HHtPtX2/EW7bkoev5V0BtLYuXNvEWIwTsGTUZ02xKbDZW5XOdvlDH8qAM9fFuhNNFD/aMIklUMingkVNH4j0aWN3TUrYqhwx3jip20fTHlWVtPtTIvCsYlyPxxUEvhrRJoXifS7TZIcuFiAz+VAFqPUrGYL5d5A2/7uJBz9KsB0YkBgSPQ1ht4N0BpIX/s5FaHiPazDb+RrMm8H6D9suIIdRuba7uRkpHeENjOeATQB2NFcjF4R1OzghisvE98qxtn98BJuHoc08/8JlY3M77rK/tgCY4wCj5+tAHV1xvxI8R3/hzQIX0zYt3dXCW6O4yE3HGcUWvxE02G5isNeA0nUXJHkyuCOO+R2rmvi1rel3Wi6UbXULaYrqMTERyA4GetAGTr3wx1qW3k1W/8S2lpOo3tcxQ+WR+IIrD8O+F/HXizTZpLDxtM9ikhiDkkb8elUPjfrupahrMWn2eqx3GmGISeRbuPlPfdjrXsXw1i07RfAOlWi3UCv5IeQeYM7m5NAHB6Fo+teBfHWg6feS2d39vLCSbYTJwPU17lXl/i2eG7+K/hAW8qSlDIW2MDjivUKAM3xDFcXHh7ULe0gM9xNbvEkYYLkspHU8Y5rz3UPCmu3fwVi8LppKrqqxxQkmZNvyOrbt2ehAx65/OvVKQEHoQcUAUrOc2+ixTXyC08mEGYSOMRhRySQcY4zmvJte0658b+H/EXiS11LTo7fcPshkjYyxC3JZMPvAQsxJ5U8MK9mOMHOMd81XtLu0vY3a1ljlRGKMUOQCO1AHkmq+N9L8Q2PgG/kvbeK5XU4pbyIvgwERuGLA9Bk9T61q+JL628V+N/DY0mVJrLRZ2vr/UUP7mFQvCb+hJxyAelem+Wn9xfypdoAwAMemKAPH/AXh/SvGGgXdve6ncXFrDq01w+nK6CM/vCULALuKnrgnBrsLvQNVbxTpkq69qbRpb3Aafybf8AdkmPA/1WOcHqO3HeuwCqvRQPoKWgDyZYrbVfi1rGmf8ACRXMTvpcVs8kDxLJOylt652YDAddoBHNT6dpeieGPi7o2laaywxx6LLCIzKW+YyKwGCeGI3N78mvUdig52jPrijauc7Rn1xQAtcD8SD/AMTHwr/2E1/lXfVwHxI/5CXhX/sJr/KgDv6KO1FABRRRQAUUUhdQcFgD6ZoAWim71zjcM+madQAUZxWP4j11dC07zUiM93KdlvADzI/pWRbeHtW1h7a/13UJoZFXmztX2xjPqepNAHUm6txnM8Yx1+ccU8SxtjEinPTB61zqeAvDyQSxG0kZZTuctO5JP1zT28E6MZopUS4jeJdqbbh8AfTNAHQ5HqKWuRHgC1jtZYItW1VBIwbcLkkjHpUn/CH3KzW7x+ItTVIUC7N4O73PFAHVUVyo8KaoLeWMeKtR3O2Q5C5UenSn/wDCMan50D/8JNf7Y1AZcL859TxQB09FcovhXV0gnRfFV/vkbIcqp2+w4qZfD+tLcwSf8JLcFI1w6GJfnPqaAPOXs0PibWtK8RaDrN7eXGq/a7Ca3L+TIvHlkuPu7AME9hx2r2lEWNAqqFHoBXNpoWvRx3AHiNmkkYFGNuvyD0qT+zfEi3UTDWYTCqYZTByxx1oA6KiuVFp40jtZMalp0k5cFN0JAC/nSlvGiXkOE0yS32fvD8wO72oA6miuHHibxRZB0v8ARbSS4Z8QxQ3IDOPXmtNPE98k0Md14fvYg6bndcMFOORQB0tFc1Z+OtDukkeSWW0CSeWftMRj5/GujjlSZA8bq6sMgqcgigDO1nX9M0CBJtSuVhVzhcjJb6CskfEXwwQCNR/8ht/hWb4hjhufih4dt50WRBbzPscZGeOcV2P9mWH/AD5W/wD36X/CgDA/4WJ4Y/6CQ/79t/hWxpGu6brsDzadcrOiNtYjsan/ALMsD/y5W3/fpf8ACuZ8GRQw6z4kSFFRReD5VAAHFAGl43/5EHxF/wBgy5/9FtXlXiCPWx+z9ZPNeae1h9mssRJausuPMjwN5kIz0z8vPtXtOo6da6tYyWV7GZbaUbZI97KGHcHBGR7Vly+DNAn0aPSJbHfp0Ryls00hQenG7oMcDt2oAkh8M6SurjVxZw/aig+fYM7s53Z9ea2qit7eO1t44It2xBtXcxY4+pJJqrrWqJo2j3N+8Us3koWWKJCzO3ZQAD1PFAGInjiyf4hP4SETCRbcuLgn5WlADGMcdQpDde9Mu/FWpRePk8L2+nWrl7I3qXD3DL8oYrgqFPOR61wuvaHqOleFNF8UW9zcXurWt6t8YI7bDSvK2Zk4G7GCRz2UCtc6xbz/ABgs9aEN4th/YZhaVrSQBZDIW2H5euKANSb4hXFsmuWd3pCW+taTbG7a1a4zHcQAZ3xuF59MEU6x+IM7X/hmDUdLSGHxDB5trNDOX2NtDFXBUdmHIzXLa/a3mt6z4m8UfYbu3sF0OTS7FZIGEl3I247gmNwGTgZHPFdD4K8IaReeGdDv7qK+Oo21ikAaaeZWtm2gOEUn5DxjIHSgDt49Qinvruyhybi2RGcMML82dvP/AAE1wL/E2/ttD1nWbjQ4TaaPqLWN2sV2S/DKpdQUAPLDgkVs2nhZbbxDql3Lc6ktsYoTHJ9tkJYrv3Z+bJxkdfWuT8E+GtN8QT+J4tYtr5opdbmu47eVpoopo8goxXhW5Hf0GaAPQtG1W51LUdQDy2DWirDJarBITMqOpJ81T0yQcY6jPpW1XnPgO0isviN44W3s3trWd7ZoD5DIj7VYOVOMH5m/WvRqACmyf6tvoadTX/1bfSgDkfhx/wAi3N/1+Tf+hmuwrkPhxx4cm/6/Jv8A0M119ABRRRQAUUUUAFFFFABXD/D0f6X4kbHB1J67iuJ+HZ3f283rqMn86AO2rxyTSL/Xrn4iaLp+n2sxvL5EE1xJtSFjGvzYwTkdRjvXsdYejeF7PRNSv7+2uLt5r9/MufOkDK79A2McHHHFAHmk+j614PudSvreGDxTpMlrBZ6vbv8A8fEZihVSVzkMNp3Y5+9+NdVfz2Nx8C7iTTGlax/sMrCZQA+1YsDdjjPHOK3pvCNjLd6hcJc38DaiQbpYbgqsnyhen8PAAyuD71Jf+F7K88LHw7BJPY6f5P2fbald3l4xty6t279fegDgx/yMHwh/7B9x/wCk0Ver5BOM9K5EeALUXWg3H9s6qZNDiaKz5hwFYBTu/d8/KAPw9eapeKl1rw3rDeJtNaS7smCreWRPRRxvX3oA7O/tftthPa+Y0fmoU3r1XPevj/xX4U1T4f8AjGKa+iE9uLgSxzbcrKu7OD719Z6P4i0zXNHXU7S5Q25HzFjjYe4PpXM+K9Y8CeItJuNM1bVbKRCCAQ4LI3qKAJ/E2r2N/wDCLVb6GWJILnSZhF8wALGI4Ue+eMVw3iRoo/gdpMra7JIrR2QW3ZotuVePcBhQ3y/XjHNQ/D3xr4e8OWN54b1PUo7m1t5C1pP5e8Mp9sdRXSz/ABL8BSW5sZ7h5YZAVLG1ACg8HovFAHe2D6XqTf2rYTQXXmxrH50MgdSFJIHHHBY1zXg9jceLfFFxJb7HW5EQk/vKBWD8NZ9P0PxDqug2NyH0yYC8sSWyNh6gH2qXw74q0XTviDruny6vFI17cK0CA5G7GMA0Aen0UE460UAFFFFABRRRQAUVj+I/EuneGNO+138hGTtjjQZeQ+gFc3D438Q3kQntPB92YG5UySBWI9cUAd5RXCN4x8ULn/ijLo/SVaiHjrxID83gm+/BxQB6BRXCL471kf6zwbqY+hBqB/itb2FzFHrWhalpsTtt8+WPKKfcigCn8UPiFq/huI2WhaTcT3JHz3JjJSMe3qa+ZbrX9cbW21S4vbldQ3bvMLEEH/CvuKKS3vbZJoyksMihlbGQQa81+IXwj/4TS9S4t76CyVF4RYBy3uRQBH8I/iU3inS2tdZuLdL+EhVO/DSD1xXqecjINfGXjDwHrPgG+iE86sW5SSAnI9/avYPhV8W9JXQYtJ1+/livYQT51wchx6ZoAueEfC2keLPEni251m1+1Sx3pijZznYOelU7DwZ4X8PXmtabrVtBOlqhuYHLHcU7A+9N8AeO9J0nWvEr3Rn+y3d4ZoJ0hYhl59K5rXPG+j+JfGhkJaO3nnWF5Np5gU88e9AC638PtOtvAdvrjQPHc3t6pVc/diY8Kfwr1a0+EvhT7HCTaz7mRScTt6V518UNb0TVdNtl0vX7lo1njH2REO2NR3FegeH9IXWdMjk03xrfToqgMEZSV46EdqAOO8ZeFtL8G+NPC02mzXttDd3Pk3HlyuXKd8bfm/Lmu507XdM0lLq9tbnVr2O5u47C2srh3d2nAJOzzDlQQ3O7H3M96zta+H2v3WvaJf2+rR3iabcLcf6bIyliD90bVOPrn8K3PG3h271SzsL/AE24tLHUNNuxfCSYExsQu1g2BkgjjPXigDL8D6pd/wBv+NjqE16IrS6jKxXkocwjy9xAxwFzyMdsVz3wj8dyeIfGHiK0nkJSWUz26k9FzjArD0/UfFWs6j4pXS7WHUI9Y2CWe3jaOONlQJ8rM3IwMdOevHSuY+H+g+IfCfii61hdOmuk052hnjgYEnPWgD3nxxqd2Es9B03IvdTcxlx/yyjH3mrd0HRbbQNJisLUfKgyzHq7dya868LeKbLxd8VZbmEuot7DakMowyNn5uK9XoAKKKKACisvS/EOl61ZXN5p90s8FtLJDKyj7rIfmH+eorMj8eaPJdWlqsd+bi8gNxBGbRw0kY6sBigDp6K5KL4j6BPO0EYv2lW2+1lBZSbvKzjfjGcZ4rodL1Wx1rTINR064S4tJ13RyJ0I/mD2welAFyuA+JGTqnhQD/oJr/Ku/rgPiN/yF/Cf/YSH8qAO/ooooAKKKKACvMPGdnZw/FfwtdjRzezSw3LSxwom+VkVdjHcyg7e2TxXp9cpqPhK/v8AxnY+IRrQjWxDpBam1BAVwA4LbgSTj8KAOP0nTotS+LuvSQ6fLpF0LCKVDLHEZEkZjucAFly3Qnr1r0Lwrpd5o/huxsb66a4nhgjQ5C4TCAFQQBkAjqea5HU9A8Q+Htb1Hxha6nHfzSxrHJatbBQIVOQAQeo9e9d3peowatpsF9bMGjmQMMHp7UAczftFffE/T7SVHP2Ozadf7u4nFdlXISvLD8UosyRLBJp5GCRuJDV19ABRRRQAUUUUAFFFFABRRRQAUUUUAFec/E698d2VqX8MQRNahPndBmUHvxXo1HWgD4aude1+LW1vru+uvt8L7g0jHIIPpX1n8M/GL+NPCcN/PCY7iM+XL6Mw7iuC+J/wk1PX9Qm1bT5YZByRAsYRgPr3rzDwJ4v8Q+BfE66XDhopZhFLbTHC8nGQexoA+trqztLqFkubeKWM8kOgNeOpqHi1Nev9f8Mad52ixlovs0s+A5XglR26V7IXMlkXIwWjyRnOOK4zwJd29l4BmupnCRRyzs7enzGgDlrZ/Hmu+IdN8Uf2FYqsFuyJF9pPO7144rZm8a+M7fW7fSJPDNn9quI2kjxdnBC4z2963fCs9vo3g5NQvrrbBO7T73PADHIH5VyWr+MtDk+KuhXCalD9mjtJg8meASRgH8qANfWPGfirQdPa+1LQLOC2U4aT7Qzhfc7VOB71S8A+I4Eu521BZ0vdaufNhVLaXyyNueGKgHjn6Vt+Lde0rWfh74lGnX8Fz5enzbvLbOPkNZVtfa7ongm31m4WzubKx0MT2yJEQVmCKFLZJP3SRkY43e1AHZy+JNLh8Sw+H3uCNSmiM0cWw4Kjrz0qp4z8VW/hDQjqU4DDzFjCk4zk1xEBnb4ieBr+71h7/wC1abdSbnWNVUlEJK7QODkdc/d+tct+0BqU2pCxsbGaKW1hbdLskB+c8AUAe92twl3aQ3EZykqB1+hGa5WbxBqGq+MotJ0XYLSzO6/uGGR/uD3rM8H67NY/COK7vHT7VZ2hBAcMeBgdPwra8AaUmneGIJyd1xe/6RM56sW5oA6miiigAorG1bxRpmi6vpOl3krLc6pK0VuAMjIGcsew6D6n61HrfidNEmlRtL1C7WG2N1NJbLHtjQE9S7rz8p4GelAG7RXDz/Ey0t9Ji1STw9rn2KW0N6koSAgxDbk/63r868defY1p6X420/UdVtdMltb2wu7u3+02qXaJiePGSVKMwyB2JB9qAOlooooAKQ/dP0paD0NAHJ/D0Y0G4H/T7P8A+hmusrlfAWP7FugO17N/6Ga6qgAooooAKKKKACiiigAPSuH+G5zHrv8A2Epf513B6GuG+GoHka4QeupS/wA6AO5ooooAKKKKACmvsKlX27TwQe9eK/ET4yXGm6tNovh+NWkhO2a4POD6KK8mvPFmv6gkkk+pXm8HIHmkZ/ClcD0z4keFvsPizSLTQ7mSK11ifbdWUMm1TgjJ/GvVLPwD4XtLeONNFtPkXGWTJr5g+Hd9eXnxO0Q3V1LOVn4LuWxx719iUwMuLw3okH+q0mzX6QrRd+HtHurOW3l021MbqQR5QFalI33T9KAPibVNZ1LSNVktLO6aGOzllihZD8wQseD7Vc8MXOkaN8QdIv7m88yxRknkkxkqcZIP41keJRt8TawmFx9qk5PUfMelZ6W5Ko0v3WX5Qvb60AfX+k/FXwnr+px6Zpt6013IGKI0bKDtBY849BVaz+JUmr6bZ3+i6St9BcXbWb4uCjQyAZAIKdMc56DNeF/ByxupfiDZ3MduWt7eOTzXC8LmNwMntk8Vv+C/HEuieJrPQ9Q0+30fS45pPNjSNl2zMpAdyxJ9B9DSuM9a0r4oaTqmo3GkQ+XJrEG8G2hdmR2XqquyqCeD2HTjNc7pfx60m6NxHf6TdWdxDIUMSt5nA9eBg+1efeGPBuoaJ8RIdSvYpbWw0+Z7ifUX4glj5wVboScjgZPNcVr6w6z4g1a+SKaJJrqSWJkXI2sxIzRcD6CHx18MNL5Sw3hf+7sGaWT44+HIhlra9x0zsr5gi0y7Scts+58wycbvp71qQpHdWweRQdzBSMcg/wCNFxHpniX4pWWseOtP1HT7R7kWkJS2tpxhWnc7QT7DOfwr1+8sPFlpZW13ba2bq4E0RubUWsYjMe8eYIv4lO3ONxb88EfOPhfwxJ4k8Y/2bZ3McN0luJreQ5KiRCCN3txj8a+nrW+8Q3NtBFNpMdjcZHnzPMskSgddgU7mJ7ZC4z3xgsCpB8QdFudIutSjS9MNrdizlT7OfMExIXYE6k5IH41x+r/ETULq207U7X7Vp1nFr4sbmPyA7TRBiCOMnd8p4Ud8VfsdItNU+Kk9/pWoRXOjmJL65jgdXjN2N0aHI4zgFiPVQfSqI8H+J4rNrcWFq6WfiL+1YSLoBriMyMxAGMKcEdTQBta18VtItNCnudP3Sait0tktndKYGSVuhcNgquMnPtWZ4s1eRPhhrN3JqcGuXEmIJPIiTybWQkKwA+8MZ/iJOcU3UvAWr3/iaXxgkEKXy6hb3EOntIBuiiTYQzjK7znPcDAGaZ4g8H61daT4tubXTVS412eBktRMg8lIsZdznG5sHhc9uaBnP/Cn4h6ZoGhXWm69q0+6C4ZII5Y8+Wg7AjrXoC/FvwczYGpnP/XM1822LN9r1AsCp+2SHaRnac/lWkYWjmWXO7Bztz6jrSbEe/yfEPwLqXy3F9bSj/ptFnH5ivNfiQPAmvXGiQ6IbN7qe+SOX7KuCUPXNcOjlo/MlVhlscjGRUVpEsPivQ1CAD7fHg/jQB9KaX4UsfC+g3UEEhe2WFiizKCIxj1rzT4aadYXHi21jdILkR2TSbtgwSxNe06pzot38gf9w/ynv8p4ryn4ViM+KpWS28gf2bHhP7vNMD1U6LpZ66da/wDfpf8ACvN5BZeFPjXBFbulpZ6hYlpYwdqbwev6V6tXzv8AHEBviLpSnp9jx+poA97OsaYOuoWv/f5f8ay/ElxZan4b1Cyg1K2WWaBkQ+cOuPrXys0SyXbIdi7QADng0LAyo7uCABwGGM/SpuB738J/FGmrpsXhSZfsur2YIeIj/WjP3ge9WfCep2WjS+L7/UJkgto9RYu7dOleVfByIP8AFKOV8l/sjHk55rZ8Z3j2/gfxWipnztY2En607gP0TS77xL481fxh4cZbGKMqLYS/Ktx/e/A11Gv+PvFEWh3VrH4duoNRCHZcQESJkdxXjNlduLdMyypEExhJCMH6VKuoXkUDbJrh4weMzMN2falcDovBfir4oeMdTFvaaiUgRv3s8sYCoO4+te0+IbzUNL8KR6bBdi61y/ItLZz8uZG6v7BV3N/wGvmy11G7s7Mw2dxNFKZSSsblQB1yPWibWLuW6trt3mluIhuicyEsjZ7HsadwPavCFu/gv4i3Ph6e1S00/WbZZ7OJZPMUSxqFcZwOSBk/hWpqwVfjj4bRQABpVwAB25rzDR/HkaX1tc+KtMh1TYQsdxMgM0Izng17tDovh/Vbq319NPtZrqRVkjuygL4xxg0wOJ1K2vpvjfLb6Tc2tpM3h3BeWAyKAZj0UMvOTmu08H+GYfCHhi00WCd7gQBi0zjaXZmLE47DJ4H86ihtPCz+L51htrM6/DGs8rCP96qsSAS3vjpn09RW5Pd21qFNxcRQhuhkcLn86AJq4D4jHGseE/8AsJD+VdTJ4n0OKdYDqls0rSpCEjfed752jAz12n8q5b4ilTrHhQAjI1IZH4UAd/RRRQAUV5p8Q/ihH4ckOl6UqzaiwO9zysI9/U14pP458T3dwZptXumdm+6H2AD8KVwPraivk2LxP4jkkZn1G6VF4yLgnNWk8Ta9IjFdYu1OcLmY80uYD6nZQ6lWAIIwQa89N/F8PfEUkF3IItBv2MkTn7sEnUr9DXjJ8WeIUAiTVr1pe+JTisrxXcavrOmxJcalcXW1twjkbI/Ci4Gp8RLy61Hx3Zavpepz3Gn3sgjt5UYgLyAyivqHT4zDptrGSSUiUEnvxXxHband29nFYTTTr9mmE0ESj7r+tdtb+OvHMiI76/JFHjhAu5gO2adwPq+ivJrLWNd1GbwtJLBPJaahaSG/njeSNYyGADbg2EOMn3rK8VeI9X8D2VneWOpT6jJfNIyS3Ds6RQKfkATOCTkZY0XHY9uor598SeMdf/sTQvG9lq09vFcK9tc2iktEJVz8yr6HaevTiuW/4Xn4qLbVvBycAmNaBH1XVDWtWg0PSLjUbn/VwrnA6sewFfP1t8VPF9wWMeoRkL6wCqfij4i69faQkGoTwzQedG7Kse0tg9KLgexabD4y8QWy6hNqMelwzDdFbJFuZVPTJNWm8O+KsfL4pOfe3FMmvvGGn6Lb6gbbTJI8R+ZZRrIZIUJAJD5w5AzxtX68c68Pi/QJtNuNQTVrd7S2cRzTLnajeh9+n50wMkaF4yT7viaFh/tW4pf7F8aD/mZLb/wGrE174oBbW3u9Fa3W1TWU0+7ku0ZSE4y69AMHcOT2zjmuj1H4geH7Pw7PrFtfRahHHKLdI7VwzSTN91APU/y5oApzQeONLRroX1nqKINzQeVsJHsa6LQdah17So72FShOVdD1Rh1Fc3q3ivV/D/gvUNf1WOw84Rg21pb7nEbHja8mcN1GcBehHNeUaH8S9f0K51OFLe0kiknMoLIy4Y9eM9KAPo0gMCCMg8GvLvF3wR0XXne706V9PvidwZTlSa5v/hcniFkytrY/kf8AGmSfGLxGnJhsceyn/GlcDQh1nxv4OsrXwpqEUd3d3knkWN/nKgH+99KTXvBPiXQ/Bz6fb6408d1MA8SRcBmOT+FZOneM9W8U/ELwymopAqRzMVEY71694uUPa2AN15A+2R8/3vamBzsHgrxT/ZUNjL4liMCIqiM2wIAA6VmXfwkvJdQXVP7UgluokKoj24CH6ivVx0oPSgDiPDulaP4k8LS2d5pkcOJWhu4YHaMSMvHO0gkHPQ8V1Fno1hYaQNKhgzYhDH5MrtINhGNvzE8Y4xXhl18QNc8L65rFnYLbGE3rt+8Ukg05PjL4m4JismHsh/xoA6TxR4E8O2mvaBp9hYxWAmlf/Sd7MVHXau4nHt6ZOOtX/G3g/Q9K8KRpaafEHa5jUu3zM2Tzk15v4j+JGra7YLFfWlr8h3xPHkNG3qDXaWepX+p/B3SL3Ubk3FxLdx5duuN+AKAJviJ4H0/S/BV9qOkSNp9ykQ3Ij/JL0+XHrWz8OPGtne+GrOw1J1sdRt4lRoZzsLDHDDNef/EbxVd/8J39hmxcafZlHW2ZsKzY7+tQax8RLXWVjXUPDVhIUG1W3HIHoDQB6J4k+MvhvwzrEmm3S3EsqAEtEoZSD71reD/iBY+MxNJYWV3FbRDJnmTahPoDXzNq0mnajrtvdLpCxQIMPCkhIkPbJr0uz+Lsml6amm2/h2yS2RNgiWT5SPf1oA2/Eum3/jLS9b8SWCW0i28inS5/tBDotszEso2kHe+/ncMjb6V18viO08R/Ca71qKWJVuNMkMg3jEb7DuUn2ORXmq/GeSCGSzi8M2CwscvErAKc9cjGDTE+M0ccLWp8I2XksdzRJgKT64xikB2F3PCP2clcyx4/sREzuH3tgGPrnitnw34VS7n8P+Jb3UHuprTTUitIo0CRxh0G5upLMRx1x7Vy3h/4teFNUeLStU0aPTUZtyiSNWh3evTivWLIWgs4vsIiFsRmPyQAuD6YpgWKKKKACg9KKO1AHKeAv+QReD0vp/8A0M11dcn4CbOm6iPTUJh/49XWUAFFFFABRRRQAUUUUAIehrg/hcd1nrZ/6ic3867w/dP0rgvhZ/x463/2E5v50Ad9RRRQAVg+NNRl0rwdql5AcSxwNsPoa3q5L4m5/wCFeauAM5i6fjQB8mGWWSVpXLO+/dJLjoaszbXimaIEBQCxz/SmQws8kitEdhA4LcZqO7nVFl3K+/p8o4NQM0/hm274naKdu39//Q19l18ZfDGQv8S9EOOTOBj86+qPEPjXT/D18tjIhnuzbtcmJZY4yEHHV2GSTwAMk4NWI6WkPQ1yqePdM/saPVrhJLa0liWSISsolckgbfLzuyDnt2NeK+PvFPjTUvFUTaAurWtpdqBBFgjeR1OO1AHl/ifB8Y6pnlftkmf++jVdXDNngAn5sdB9Kr3Uc6ajKt9vE4kImLckNnnNTQWbXUR8sF3XsOcfWkwJ4r3Y7ptYH/ZOOPwpwL+X5kXmbSPnbpzmiOCeIDNsxYeimrxsb/7OpS1lw3JXy2P9KVgOj0LxZqOm6HJpM5jvdNfLNbXKkqvupBBU/SqH2pZS72aRxxNklAxJA7Cq1pp2pNandE4Pp5Tf4VJFpV/FLvW3lIxj5Ym/woAEdHMe87NwPyj1+vrVCVTDrCrFLiO4Usc/3hWpHpt6qymW1mJIwCYm5+nFZd/azQahAfLkKQxmRyUI2D34oSGd58Hwq/FO29TZv0NfTlfJ3wk1qxtfiXZz3MyQxNC8e+Q4G419UwX9pcgGC6hlB6bJAaoRHp2lafpEDQabZW9pEzF2SCMICx74HerlFFABUVzzay/7h/lTpZY4YnlldUjQFmdjgKPUmsiXxNoM1hNLFrWnSIP3e5bpCN5HC5z1PpQB8rWRk+2aqigNi9kOD061oypiaMu5b5ACuOPrmqulEmbVXEe8reSEcgdTVi4llKm38khmHDAjj9algQzqoTyww4+YuDnj0ArGvruVbqylsGka6SfdCNvJbHBA+uK2Sp+wRwyx7XXjIYc1SstL8zxDokKyNGZb1BvByRz2oQz1DQF0PxBpwk03VZLnVJdPP2+xmg/dgryzz5+8wbo3UkjtmtH4RFv+EilVphIRpsQ3L069K9Q1lILTw/qMywqCbdy+xcFvlNecfDKzWz8WOiRGJW0uJtjdRnmqEUzrk2p+INZS/wDFzaRqFjqzJBY7X8yWJTiNETzArhxjPyk5OfSud+MNqlj4/wBMihMmz7GzAvKzkHJ7sSa99k0XS5tTTUpNOtHvk4W5aFTIv0bGa8F+OUTS/EDTFUkZs+cem40gPP2bz3YhY8kc4GCuP51dbyZIFiZSI/4BgiorfzSvlmJSQSC2OcVYuZ4vJCupAHyjPapsM6j4SBW+LMjRrtQWfT8Kn8dOf+EC8RPj/mN/1qn8GVZPihICSV+xnafarXjfn4e682ODrZx780xHnKfbrhVZYIUDYORLjgVoD7aJkK20Lx9G/f5O3vV+CW1hgt1KL0G7jpkVJcGzwiQspyMngAipGjV8M+H4NWkvYp5JE8mArasDt3XDAlB7jCtT/DOm6Dq2nyyyR3MlzFbTXcrpLsVSi5VcY5yOpq74bvDoek2N59otnefUBLMs7IxiRcBOv3er89s0aPbWel674jhTUbRbGeC5W1PmoFbzAdgBz6HHtTuBUvbHw3/YUeq29lf3CSXS2/k+c2SfKDEAbfXIzXoHh7VtQ8OW2seH9Oj+2Lpw8yGa7lWNLeMqHIkOR93JHA7ckda4W2vJtL8BiKy1UxXH20yFYrgI5QpgZAOcZ/xrW+F1td6hZ+KLVW825uLNkQyt95mUgEt7k9apAdNd2ttpWgtrNlep/bof7VLqktxCBKWwGDAOcx7QAEHouDnmk8c6j4om8FwW17Z21vdX919iC2MpnFwrxSAEAqNoJ2nuceldHqfh/Wb7wC2gqLFZ2s0t9xdsZAA9Par3ibSbrU20MW8EUy2t+s0wkYBQgjcZ9+WHSmI8d0+81KDU7WxlnM81hcypBpt1AECkQsxbOM5LEKD0G4+tXv7Rg1O/0e5NsIbw66Vk/wBG8s7F+VVLDhyMN0JxmuwuPAd3da1rGozxxCGRHSCzhI2y744gWyfusDHgfXPFc9daLqWjQeExqkziefV2mNq21hAXdmxuH3jhhnJPI4oA9nrN1/URpPh+/vyceRCzj644rSrlfiSxT4ea0w6i3P8AMUAfLU19NeXUk9yC0sjl2LZy2amhjAkK4Pl56hcjP4802NIZH8wO3mgYx0qSPzkkYtuKA8ue3rUMZdgMEVswI2rkvuYY6dOKbbYeMSyHaUzyTjPuKqsySRY2SOBkBqIlJRgeQ+Opx061Iy6LdcK6Phsg7ietT3DrHZFjn90pbj9KLTypoY3OVQ8AN3xVfWSRpF0iv2GMemadhFfS9EhgRZrly91MPMLf3Qe1X3VYWjVGy4z17j6VFBcxiAO2RtUYJ4zwKRZGuGWXAGDzjutAHaa3f6Zf6XpFvay3ZlsYzGVljCK4Jznhj+VXor6w8RaZYaJqlybGe2ytvdlQ8ZU/wsMjHQc1ykToRlmGAO9Ss8bKqlc8c4qgN/xZamws7PQYrV49NswzRSEfLcO3LPxkY5OBnjNeeXXhq0nuFk2FWyMqvRvwroPPZD5bSN5OMhCeAfWq6hknZ9ybXPU5pAYDwt4euDsdmtZOMsOYz/hTtXgku7eCOH5pDMnlg8ZJrW1hIprR4ygdirdTgccg1jaRO13/AGa7SZP2mIFQPRqaA+ptP8Q3V5p1skWi38V86qskNzEUSL1Jk+6R/ukk+lctN4cuIvijLYWroNF1Dy9XvYQPuzRkqBjoA7bG99hr0mMfuEU/3QP0rK0HwvpHhqOdNKtfJ89t0hZ2djyTjLEnGSTj3PrVCPLbvRNabSr+wPh++kFv4q/tNmCKVltyxOUGcscdgKb4i8E6hrHiO78TW+kOdOXUbKZrB0xJdxxKwkfyz3+YAKcEgH2z7ZRQB4zrmg6h/YnjZ9N0q9Wy1d7dbGxSFtzSKQZJNmPkB9TgnH0rznVyJfEV/JsdAZfuyKVI4HBB6V9WV8veJ2VfFOq+v2luBSYFGJAT90DNNmtElfdnAHpUkLBlAwQaWRfLjCgnrUjNLwYAPiH4eXHIlbn14r3nxdkWVkwtxNi7j4P8PPWvBPBvHxI0Af8ATVv5V7t41y1hZRrciBnu0Ayfve1UhGzeaxpenTRQXuo2ltNL/q45p1Rn7cAnmpLbULO9eZLW6hnaFtkvlSBtjf3TjofavI/EdjLB431yDW/D2u6vp+qrB9kbTnk8s7UClJMMAAGBPPTJPevXbKEwafbxMgRkiVWUMWwQMdTyfqaYHzB4o/5GjVdw3A3j9ayVDKWCp8vbPatLxPKR4q1UY+Vbt+TVOAjcxY8kZGaAKU6GNH3jjaea9a0kA/A/QBnrdx/+hmvKtQz5TEcDBr1bR1P/AApTw8D/AM/cfH/AzQBxfxKWOPx5qDfKCCmSfpXPMwdyAoVUH3sda2filpi33xA1JjLJHtC429OlcimiOIyft86gD1pMDTwrJuVSB3JqNlbYT8vsDVFdHuZYygvrjpk+lRXGjyxqo/tGQ8dMf/XoA3NC0S41/WYdOtGjW5mBw0pIUYGeSAfSl0jwrqus3k9uLyztJY7pbURzl8mQ7sgbVbptOScdqueFC2nWOpahNNOEhijt0liQb/MkbPGfRYz+da8Volv8cYJ4TKbe/uYr6A4wGWVN5z+JNIDDl8GzrpNxfvq2lta28YklfE5wDIYyMeXnIZfToQelemfCzXrvQL2Hw3qt5BPY3dsLvTrqNyUZO4ywBHQ8EA1wmiOq6F42a8tWntx5IMbMU3fvz3HNUNMvP+Eq8Y6LbTRm0tIlFrBDakr5cQz8oJySTk5PWmB9Aaj43+y+JRbwQCbRrRMapfjlbZ3x5YyOuOrf3QwJxXSX+oR2enG9WSAxAr88kwRMEgZ3dO9cd4WtZbnwMqWcTWtoyzRmNZlDcMyk58vqcZz1rBOh29p8IJdS083UD3trA6Wsl08kMTNIh+VTgAk46D1xTAvp8V11HSxc6XBZi4mxFb2tzdATPKxUL8gH3BuyTnjBrurTWBd3xtFtZgVi3vLuTap7KRu3ZPUcY4614ldeHH8N67p+jKkUyXH2VYmuF2SbVljZwMEjnyj3HB9q634ZTOPEerxfbonR4oSIbni627ARn1C7tpJBycHPqAdH8PmzY6t7alOP/Hq7CuO+HqlbXWQ3/QTm/nXY0AFFFFABRRRQAUUUUAIfun6VwXws/wCPHW/+wnN/Ou9P3T9K4L4Wf8eOt/8AYTm/nQB31FFFABXI/E0hfh5q5OceV2+tddXIfFD/AJJ1q+Tj91/WgD5Widdo2F2+vrXrHgz4MTavZR6jrcwgjmG5YkGWIPQn0rzPwVbi68YaZazhiklygG3oRnvX2WihEVVGABgCkM8K1T4f6V4F8e+EbnS2l3XF2yv5hz0A/wAa9A8S+Ftdl8V2viXw1qVrbXi2xtLiG8QtFLHncOnIIP8AnrmP4l+FdS8QWenX2jOo1LS5/PhVjgP6j9KyNR8feMtL0pprnwhsaNPnleYBM0xEngHQBfa3rOq6vcR6ldwXbQJKRlMjqyjoPYdhXpLwxEhzGhZAdpI5H0rwP4cav4+calc6VoMBtLyYzDzyUVWPp61t+KNX+LltpUrLptikTAhntPndB9KAKPhzwrF4j8GeK0gsLa41CW+mWGSUDIOT3rhvC+k+I/hn4sim1jQpZbCRhHORH5i7fUEZ6V7V8MNQ8O2nhKKCzv088MTdecdr+aeuQfevQHRJV2uqsp7EZFAHGN4q8JLc3MB0+Yy2sK3EwXTXbbG3IfheR7j39K0j4l8NLaafNBLFcLqAzaR20JkeUdyEUZwO5IwO+K5W5ttRu/izrlrpN5aWjvo8CM80Jk2gs4+UBgMj3zWT4O8PQ+CPixHo0sjtAdG8uwnmOPMPmb5QvvuLNgdBQB6AnifQJLbUZVV9+nc3dubVhNEMZyYyNxGOQQMHtVeTxv4dg8LL4ldLhdKYjE5sn6E4BxjOCTjNch4pzc/FS+ksGG218NzpqLr0G7cY1Y+vf6VkazHef8M2Qu17E1v9ktv3Qhwf9anG7P8ASgD1K+8SaPYeHF1u5UxW7pvjSWIrI3oApGcmvK/DvijSrrUtV1bxPpV2i337pI3tGKJF78V6/FptjfafYfabaKbyY0aMOM7Tgc1oNBCybGiQr0wVGKAPnLxBofg+bx9oP9kSQ22mXQKPJH0V+wIPSuvu/hlf2F1JcWiLc2qrmMW8pjk/wNbHj74R6X4ms3uNNX7DqUfzxtHwrH3FYPgTTPFN5YzWCeLbm3urJvKmtpowxQ+oz2oA1NFivdsUOn+Jbuxvjn/QtSG4nH1re/4SDxVomTrWjJd2y9bmxbJ+pU1j6n8Nte1Z4prvxMZZ4WDRuYQCpHvVC1f4h2/iN9CuPENkshQvA0tvnzVoA0/GviG08V/D3UE0S6RrhQkj28knlOwV1LJ1BBIBFU/CNxoOvW2s6tDo+oWcbWyLdzancu8krryoG5jlVx14649ayPEfwx8VahHLqFxqunm6jG/fBAVLY7YHWvJ7fxRq765BpWt3k1ppkkix3KRJ5W5M9SKAPc/g/pFjd+Ebi6uLKKTzr2VkaRASV3cV3j+GNDkOW0q1J/65isufXNF8I6NYWVinm+YgFpbQfM0g9f8A69ZpvPHOpXP7s2WmW5OQGjMj49+2aQHQHwd4dJydItf++K4D4kaNpGiX/he4tLOC3Y6mgLKMcV0GqWnxAt7KVrTV7CdmUhQYNrA+2K87v7G78Q2o8P8AijVryHVxJ5lpPIR5YlHYEdKYHqni+/8AtVrHoNhcquo3hACjkqnUk+nFZ1jAbD4qNCfuyacqqfXbWHoWl+N/DiqyaHp99dBAjXck/wA7gVQvta8Y/wDCyNKkm8Pw/a0t3HlRTZDLz3oA9nrynxTotpr3xm021vFLRDTmbg4IO410J8VeKEOG8Hzn3Wda5/w/LqV38Wpb7xDa/Yp3s9tlDnI2Z5yfWgDcX4TeF1JIgmyTknzDUT/CHwzIcstz9PMrvqKLAeIW9vonw++MXltKbezk0/iSU5GfrXNa5rmla14VuNMtrtWkuda3FQedpbrX0NfaVp97ulurKCZwpG6SME4rg/hp4f0ifSr24k063eVb+XaxjHGDxigByfB3RGiTdc3P3R3FOb4PaMRxdXAOMAnBIr0ailYDwrxh8NNQ0eye5s5WvLJF3OuMMnvjuK8xMyGCVQCXQfjjvivsGRFljaN1DIwIIPQivk/X9NXT/FmrW0KbkSVtq9hzUyQyERtcx+WvBXBGRzjHpXp3wPCpqOqRhtzLEgY+9eZw27LbFpAolByQD2r074JwGPVNTdgMmJenfmhAe0UUUVYgrgPiMM6t4T/7CS/yrv64H4i/8hfwn/2El/lQB31cn8TSB8N9cJ6C3P8AMV1lcl8Thu+G2uj1tj/MUMD5ajl2BdqswYZB6NVwTjazM23gBlznmiO3aZYgiAKigkt2xWlo2kxa14j0/T5HG25mAkAPbvUDLvhbwV4g8SpNdafZYtN3yvMdgf6V1a/BnxBIMyfYV/2fNb/CvdLKyg0+yhtLWNY4YlCoqjoBViqsK54DH8HPEkTnAsmHvM3+FMvPhF4meF0WCzIZSDic9Pyr6BooaA+I9VW70nWP7Jm8tvIfy2w+VJ+vtXq+mfC/xBPZQyx28HkvHuUrODnNeq+I/hl4W8TlnvdOVJ2586E7Gz+Fcr4nstQ+H+k+G4LLxFcxac2qxWcu9gMQvuJyx6Y2nmiwHOH4X+J0jIFsjHH/AD2FN/4Vt4kUfNZyk9PlkXH861ZfiFrdhquqaTpl8uqW1xqFtYaXqUyBljklGXBZQA4UA/pnNdT4vvtX8CaVa6+mrXWoW0M0cV/b3ITEiO20uuFBVgSOBx7UWGcO3w9111+bTbgf8DT/ABqNvAGuhMf2Zc/mp/rXaaBrDp428VafqfiC6+y2hiS1jlkUbRJHuJyBkkE8VW8C+Kb6Lw5r+r6vqFzqUVrfSW9uCAWZVOBgKByaLAeYeKPDGraVYRmWynS4kby4U4JcnjoDWGPD2qaCLE3ltPBHBcRvIZIioAyOpr1bRvEp1HxH/wAJD4ssr62SM7bOFrdvLiH94nHWu58UQ2vi3whK2myRXe0rKgQ53bTnFOwjpdPvLe+sIbm2mSWJ0BV0OQas1wWlr4b1qztHt7yTTrq2GGginMRRh1BXvzU8uvap4bSSW+ni1az3fK8GBKg9x3oA7ais3TNdsNWsY7u3nUI4ztc7WH1FXftVv/z3j/76FAEtfMWs2V7e+M9X8i1uZI1uGyyQlh+lfRWra/p2j6fLeXVzGEQcDcMsfQVgfDu0uF0q71K6hMUmoXLTqjDkL2oA8UXQdQB3Cyux/wBu7/4US6BqzlSLK7Iz/wA+7/4V9JXOpWFkcXN3BCT2dwKzNQ8V6da2by2k8F7OPuwRTLualYDxLwxo15ZfEPQJri1mhBkPMqFc8ds1634knF74u0TSVg80I5uJT/cA6ZrkfGuqa9PdeHNZi00WaRTkM00gIjJ4BOO1dr4b02x0159Qn1WO9v7s7pJ2kGMeijsKAOpo7VB9ttf+fmL/AL7FQ3WrafaW7zz3kCRoMklxTA+ada0XUtT8W6y1rZ3MkS3j5ZISwP5U3/hF9WVl3WF50/593/wr174Za4t/qGu2zQtF5l01zAWGPMjPGRXo9AHynfeHNWMbZsbtUVDybdv8K9L0sC3+D/htG4P2uMc/75r124hW4t5YW+7IpU/iK8d8W+DNR0TRNMsrfxFcmAXqCGMxj5STmgDj/H1ve3nxD1SOztppFDKWaOMsAMe1Y/8AYl8EIa0uzz2gf/Cvojwt4Vk0GW9urq/e+urxgzyOoGMDtXS7F/uj8qQHymdJvTCyi3ulY9zA3+FVm0W9fCNBcr7+Q3+FfWnlp/cX8qTyo/7i/lRYD5UWy1a201rKCS+EDvveHa4Rj6kdOw/Kie411plm/tS9F3EpRZGmcOqnqAc5xX1X5MX/ADzT8qydc8MaZrtk9vc20YYj5ZFUBlPrmiwHyy2q6pF9oibU7xfPH75RM2JTjBLc8/jVvwMR/wALA0IA5/0j+lO8Y6RLoupXVkx3TQvjdj7y9jUPw6WMeO9G3uTL9p4/KkB9QWPhnTdPsBZwJMIcscGZycsST39SaJvDWnS+Gk8PqskdhGiIqo53BUIIGTk9hWxRVAYzeFtKfVBqEkBknEPkr5jFggznK56N7ijQvDdnoP2p4XlmmuZjNJNOQz9AAoOOgAA/CtmigDkfAa7Y9a/7Cc38666uT8DH5da/7CUtdZQAUUUUAFFFFABRRRQAh+6fpXBfCz/jx1v/ALCc38670/dP0rgfhYw+ya4v8S6nLkfiaAO/ooooAK4/4pcfDnV/+uQ/nXYVx/xR/wCSdav/ANcv60AfOXgVYh420co+CLlDsr69r488BW6/8Jzo833ZGuVGO2K+w6ACvOmibx/4tmjmJOgaW+Ao4E8w9fUCu41d5o9HvHtkLzCFtir1JxxWV4G0l9H8J2dvMhW4cGWbPXcxyc0Ab8UUcESxRIqIowFUYAp9FNeRIkLyOqIoyWY4AoA+XvjD4Q1zR/Fs+vpEX0+aQOskK4CezY719H+HNRXVvDenX6nInt0f8SOakM+la3BLaebb3kTArIgIYEVJpmmW2j6fFY2abLeIYRc9B6UAV4vDmiwaq2qxaXaJqDElrlYgJCT1+brTtb0HTPEWntZanapPEeVJGGjP95W6qfcVemuILZQ080cSk4Bdgo/Wo21CyRUZ7uBVcZUmQAN9OeaAOT8NeBB4fsLnRJntNS0Sd2k23EAE+Sc4kYcSfUgEflW0fCHh1tOGnHRLA2QfeLfyF2BvXbjGeK2FdX+6wbvwc06gDjbPTLKz8bQLYWd5aRW0ToSkUghlLAELn7gRdvA/vNx3z2VFFABXn/i5D4Z8Vad4otwVhmcW16o6FT0Y16BXCfFrV9L03wRdw6k7qblSkJVc/OORQB3SMrorqcqwyDXN+MNBk1O1iv7AY1WxPmWzDuf7p9jVT4b+KbHxL4Ss2t7gSXEESxzp3UgY5rX8T+IE8OaSt2YDPLLNHbwxAkb5HOFBIBOPXAJ9AaAI9H8S2t/ZgXLLBfxx7ri1Y/OhxzxXmet/E34Za+8lpq+nvKwJUu1vypHoetdHDY33ivVLtrvQodPuLeQKL50kAuImHVQdp3DkEH2rP0j4F6BYeJJtUunNzDu3RWzD5VPqfWgDL8D3Oj23xADr9pNhPaKmly3YIC4J3KpP4Ul9pVrdePfiBYweH/7QmmtLbyFhiQeVK0Zw24kbTuwcj0r1PWfDOma3pqWVzbhUj/1TR/K0R9VPauI07wF4o8NeIrzVtJ12K8+1qiSx3keSyoMKMj0BoAyvA1lqOq+MZdB8WzC9Ph7T4FS3kbfG8r/MZGB4ZlBCgn61e8ceGfD3h/RNe1W1WGB7rytsEYChJ0ZiCo7Z3cgenvVzUvCnizUvEEOtW89lpeorH5L3NsxPmx5ztdTkNz07+9XLX4ZW99M914pvpdYuXIO1vkjXHoooA0ofGuk2Oh2b3d2JbtoVJhi+dy2OmBVbw5Yalqnim48TalA1tG0Xk2lu/wB5V9T9a6LTfDukaSP9B0+CFv7wT5vz61p0AJvUHG4Z+tcp410i4uksdU06PdqFjMrIB1Zc8iuR1zTdIX4rapHc6RNdpPoqz+VaxMzmYyMNwx91iAPm4+tYq2firRtO0G/8Xabca7ptvYvHe2gl8yW3YyMVlZc/OQmBntg9OpAPcomLxIxGCQCR6Gs+PxDo02pnTI9Us3vwSptlmUyAjqNuc9qyfh/Nps/hKF9J1B76zaaZ0klZi6hpGbY27nKhgOfSs2wA/wCF2aucf8we3/8ARj0AbHirxXB4WSyNzYXdyl9cLaRNb7P9Y2doO5h1weaxrfV9P8D6lZ+H/sGos2ptLcpNI8OxdoDSbjuGAoPp9M1S+MMsYsPDMbXIgf8At62bcCNyKA+W5yOM9xiq2uBbT4ueCRPrMl7mO9/15iGzMa4+4q/e989OKAO90nxFpWuNMun31vO8LFXWOVWIAOM8Hoe1alQ29pDahxCgXe5dvck5NTUAFfMHir5fGesh+hnb6V9P18teMZGPjfWEH3WnYEVMgM1IZmtBNIoVweM16l8F2Z9U1Mtx+5TivJTLNNFl3Kqnytkce1es/BNkk1HVGTPESDk+lJDPZqKKKsQVwPxF/wCQv4T/AOwkv8q76vP/AIjMBrPhJT1OpD+VAHoFcl8TiV+G+uEdRbn+Yrra5L4nHHw41vp/x7nr9RQwPmCOY+UmAwR1+bI5NdB4EQf8LC0IHj99nH4VzSgjrGruwyCOwrqPAsgPxB0ROrCX8uKgZ9U0UUVYgooooAK4zx/oOseIP7Ej0y3tXSw1GK/kaecpu2bhsACnru6/pXZ0UAcx4w8Kt4p0O2himWy1CzuI7y0lA3LFMnIz0yOSP1ritd1HUPF+s2ng3xNZxaFbCVJ5pWlLrqGwg7ImwAMnBOTn2r1yo5oIbiMxzxJKh/hdQw/I0AcX4d0bxBpfijxHq1zY2Xlan5bxRx3ZJVo02hSdnQ+vb0NZ2hwa34H8P6k2paNbXcbXc18xt7rJCs2SoDIMsOw7+1ek1m6tpB1YQD7fdWohfzAINhDHsSHVgcdR6HnqBQBfMccke1o1KkfdIrktU8NSaPctrXhtBDOOZ7VeI5l7/L0BrrkXYirknAxknJNOoA5iwtPDni+xTUH022lkbiQPGN6MOoNPfwF4Zdt39lRD2XIFUnQeHPG6OjbbHVuGTssw7/jXHeIdalvPGfiLTL/xX/YBs/Jayz5ilo9gYlMSKrksWBDK3YUAaviHwV4f0XUbS+i00yQyuIpoVc/KP7wFdInw/wDDDKHXTwQRkfO3+NX7fQbCe2SeeOWWeWL5pJpHLDcOcAk7foOBWRbzat4TMVg9rPqlizny50+/ECejDvigDQtvA3hy1uEnj0uIyIcqXy2D+NZ3izVtTfVrHw1ob+Rc3aM8tyAD5EY7j3ry/wASfFTxzbeM5dH0q0Vgz4hja3+YiuttbPxlpV7beLtYSK9uPJMVxZ2y4KJ149TQBw6Qto2g6rrr3q6pq1lrb2C2l7EkovFDhcAY3BsEnIOOOldto2mW3xBn1iW3t7fStLs7hrOA29rE0srqPmdmdWAGTwBg+9Hwz1CyiutXGo2dvDdXOozXkUzlCUVzkLk8gjn2qWynn+HV9q8VqkGo6Rf3D3lsUuFV4JW6owPVcgcg5HoaAKmm6VrPg6zmOqzG90g3j28sMyZUxbsI6g5xkdq7UeAPC0i7hpUO1vmGMgVyi6prXj2GDTVhSOAzCW7nQHy0UYwik8seOvvXqKKERUHRRgUAc1/wr3wx/wBAuP8A76P+NLH8P/DEciuNKiJU5G4kiumrzbxZNDa/E7SYrq+1OKyutPnM0VtdThS6lQpCxng4J5AoA3ta0uay13SdV0y2z5TfZ544xj90fb2NdXXh0WoeMrDR9M1HV4NZuvD9vf3JljikaO8a2wPJeTBDEA7iRkds16H8Prm0vdKv7rT9Zl1SxmvC9u087SSQJ5aDy23cghgxwexB70AdP9stRN5P2iLzc42bxn8q474gzRSSaNaK4af7dG/ljrjPWodQt4P+F3aO/kx7v7InO7aM5Drg/qfzqeXX9Y/4Wqvhxjpf2H7D9uErWz+aF37Nm7zMZ75x+FAHaoysPlIOODj1p1ec23jLxFFq/ii1uLeyvItGCBBZWrK0heMuGbdNgKMYOMk13enXj31kk8lpPas3WOcKG+vBIx+NAFuiiigAooooA+c/i8Avi+9CjBMaH9K5D4eDPxC0dj1Fx/Sus+L+f+EyvcH+CP8AlXKfD9tnxA0bIyWuR/KkB9dUUUUwCiiigDkfA3/McHpqMlddXIeBTmTXh6ajJXX0AFFFFABRRRQAUUUUAFcB4MdNO8ceJ9GxtJlF0g9Q3/667+vN/FWfDXxJ0fxFgi0vB9iuT2BPQmgD0iigEEAjkGigArj/AIpED4c6uTnHldvrXYVxfxXJHw21fH/PMfzoA+bfBzXX/CVaS0USSyrKHRXfywxHbODj8jX0VZeP9RvvhzN4vj0G3WKNXkFsdQO4xoWDHd5XXK8DHPqOlfOfgqSJPEmm3DOVMcg3Z6AV6no2l2Q+A9080uopfi3uI/swuZ1HmMz7F8oHByMHGMHnPegD2PRNTm1PQbXUru2jtGniE3lpN5gRSMjLFV7deKxLPxjeazp0+q6JohvNMid1SWS58qS4CnBMSbSCODjcy5xTNIu9O1XwPZ6GuoxRXl3pYgEe/bKpMW04U85HP5VkeBdZj8L+BY9I1i2ubfUdLDRPbiFmaf5iVMeB84Oe340Adp4f16x8S6Jb6tp0he3nGQGGGUjgqR2IPFcX4wmbUvil4W8N3jZ0ieKa5lgYfJcSIpKq3YgYBweK0vhX4evvDngmK21GMRXU88ly8I/5ZbzkL9cYrd13w1Y6+bWWdpoLyzk821u7dgssLd8Eggg9wQQe4oA4/wATRr4d+I/hO50eJYH1OZ7S9ghAVZowMhmUdSuSc12usancafHiDSr693IxLW3lYT673X9M1np4Xit799ZutRnvNTigaO3ub0JstgRyVVAo+p69s4qfwzPeXmmXH265W6Tz3WCXaEd4f4S4HAJ5xgDjBxQB594q1GbWfglIb/R70SLpkEovLoRMrv8AJ8wIctk5JyQKd49tUfTfB1vLocFtAmsWkSH5GAQ5ygAHAPp0rute8I2mueF08Oi6ubLT1jSIrblSxRQAFywPHA96q6z4JGuWel291rmoD+zpUnjdFiDPIhO1m+THGcYGBQBo6botzY6rdXL6ncSwybQsLLGBgDHO1AeO2DW1TY1ZIkVnLsqgFyBlj68cU6gAooooAK80+OWlPqXw7maKMvLBKjqAOeuP616XXGatrOqN8QLLwx9n0+XT7y3a5Z5VYuqoQCuM4JJ6H/DkAqfCLwkPC3gq2E0e29uh502RyM9B+VdH4r8NW3izQZdMuJpbcllkinhOHikU5Vh9DXP2Xi7Vz411vRJ7W2a00qON91tG5kkEi5UAZwMd66vRNSOr6RbXrQSQtLGrMrqV5Kg8Z6jmgCh4a8P3mirNLqWt3Or3kqqnnTIqBUXO1Qq8dySepzW/RRQAUUUUAFFFFABRQSB1OK42fx4iX1paLZGCRr2S0uvtbbBBsiMpcEZDKVGQfcdKALkXhm9j8dS+JW1OJhJbC0NsLYgCIMWHzb/vZPXGPap73QtQfxE+safqq2zSWyW0kEtv5sbBWYhjhlOfnPf86TQfEUur6WLyS0MLkM/kMcSmLJ2OE64YDIBxWVqfxJ02xurWCG2nneW8NpKCNhiYBi2eDnG3pQBteF/DVt4X0uSzgkaV5p5LmeVgF3yOcsQo4UdgB0AqtbeGruDx3d+I21CFo7i1S1NsLYgqqkkHfv68+lP0HxT/AMJC9x9ksnEULFPPZ8IXBIK9M7h9Mc8E0228VNd2WuXcVj+60yaSJGaXAuDGoLkccYbcv4UAbs9na3JBntoZSOAZEDY/OmNp9kzh2s7cuMYYxLkY6dqqaVrCapYWF2BFF9rtFuRCZAZAGAPTuBkDNY1t8QtKnuYIpYbi1SeFZY5Z9oUlpfKC/KSclvbGOTigDraK5zSvF9nqC2kdzssr25nlgW2kfLMyZyVOOVIGQTjNdHQAV8reL0Y+MtUYDJa5fmvqmvljxfIv/CWanCWUmS4ckZxgZqZAY0iN5G6QALI25lA7j1r1b4HxLFqmrgOWzGnUV5V5DRyosYYoF+9v6f416t8Dmd7/AFV5eHMacDpSQz2miiirEFeRfGHVGsfE3g8If9Xe+a/GcDIGf5167XkPivSpPF3inW3hJI0qyCxY/wCenXH6UAeuIweNWHQgGuT+J2D8ONbz0+zn+YrU8J6mur+F9PvFbcWiAb2YcGs34mDPw51v/r3P8xSYHyyXeJowsWGdTsb0UVv/AA9Zz8RtG8wqztNk4HTg1jAIEdeQSAMk5K1vfDy3C/EPR23E7ZsZ9eKzT1A+rqKKK1AKKKKACiiigAooooAKKKKACiiigDy/4x+J7TQbDTQ+/wC2LcpNF8vy4B5ya7DTT4d8YWlnriWdnfMoHlXEsCsyEc8EjIwa4T45+HLnxDY6JBZxl5mu/K47A9zXovhrQ4PDnh6y0q3AC28YUkdz3NAGtRRRQBTGlWA1I6h9li+2FdpmK/Nj61coooAxr7wpoWoz+fdabA8p6uBtP6VXTwP4bjdWGlxEqcjcScfma6GigCOC3htohFBEkcY6Ki4AqSiigArldQ8Oapd+PNP8QRXlolvZwPAIGhYs6vgsd27APHHFdVRQBh6rpWqT65Zanpt/BAIIZIZYJ4S6yhyp6hhtI29eetQ+FPCw8ONqk7zRSXOpXRuZRBF5caHAACrk/ic8k10VFAHJ3ehatN8RbLxBGtn9jtrV7Uo0zCRg5UlsbMAjHTPPqKw9Q0Uan8ZUvb/RJLrSl0r7L501uHjE3mbh19s8+9ekUUAeeeCNMOneNfFZTRprLTb14Ta5t9kbBUIbjtye4Gc16H0oooAKKKKACiiigD5u+MRH/CZXvr5afyrkPh+T/wAJ7opOf+PkV1/xjH/FYXxC5Jjjx+Vcf4ADDx/ooIP/AB8ikB9g0UUUwCiiq9/crZafcXTnCxRs5P0GaAOV8AsJDrzqcqdSlA/CuyrjvhnC48IJdyDD3s0lwffcxx+ldjQAUUUUAFFFFABRRRQAVi+K9Bj8SeHbrTn4d1zG3dXHQitqigDj/h5r82qaKdP1AFNU04+RcI3U44DfjXYV5/4z0a+0jVU8YaEha5hXbeW6/wDLeMd/qK6zw/r9l4j0mLULGQMjj5kP3kPcEUAalcZ8VgT8N9WwP4B/OuzrnPHmmTav4J1WytxmV4DtHrjnFAHzP8N0Y+PdHRY2b98rHA6CvrrA9BXxj4d1Wfw94k06/dcCCdRKD1AB5FfZFndQ31nFdW7q8UqhlZTkEGgDFu7C+uPFNncfYLY2Nq3mpJ521/NKFC5G05wpKgZ7n0FdDgelFFABRRRQAyWKOeJ4pUV43BVlYZDA9QRUdpY2lhEYrO2ht4ydxWJAoJ9cCp6KACiiigAooooAKKKKACvN/EFvFffF3SXudNvZ7GGxkt5JltZTGsjsCo3AYx79B3xzXpFFAHmfhG1Wx+KvidotOvYLC7igS2ke0lWNyifP8zDA5z169s16UiLGioihUUYCgYAFOooAKKKKACiiigAooooAztblaKw+SwF67OoWJs7QeoLYBIAPfBryfWtLsW8daMNaMryv5k10YkeGKCMjyo0RB6u4yzHkjHQ4HsN7Hdy2xSxuIoJyRiSWIyADv8oYfzrLs/CthCt814X1C4v12XU1zgl0xwgAACqMnAH86AOUGmSWWn6/Z6ldzxWMluoh1V4YbebYeGiLnAJ6YJA+96ivC9Wu9Mk1XUJodQuWVlkurYOnzLI0pIUksSfkGCx9enr9L6Z4XutLW4gj8QX09myhYILlUk8gezEZb0Gc496yI/hhZtrOoX95qt9c/afLMW4qskLKOocDPXJAGF56GgZwvwk+zOdYt9P1R21ZlItDcylYwrcuwiBOSD1J64HTmlktbM+EbnwpaXQFwk9893dyyDzVt4p5MLk/xO2OB2LHvz6f4Y8KzeGS1vHqYuNPAJiie2RZAxOSzSD7xP0H41Na+F4rbQ9R07zUd72a6lM3lAFTM7N0zzgMB747UAcT8MNX0iGG28PTtbyapb2Mc9tcABneKRAxQsOjKSRtP8O0+tc/puiza5d2FtHbZD6YH87eGkiQ3EmZIgxwGwcA543Z5xg+vW2iCy8MxaTbTBJYrNbVbnyxnhAu7HrxnGayNM8F3Gj60L201l2gSzSyht57dW8qNcnAZSuecdc9D1zwCKnh9ZdV8R2Wtactz/Yv2J4t14yuTIGC/JyWQ/J83ZsevJ7muf0Tw5c6HbWNnb6q7WdqZMxGFf3u4k/MevBJxjH410FABXyf4nmjbxrqIfJDXbKcjgDPrX1bNKkEEkshwiKWYnsBXyBqzPqeu6pMrkK87tGB6E1MhoT7SgdwSMKDjJ5r1f4FYN/q7A5yiV5EIklVlCsDgZ46nHNeyfAa1YW+p3RUgErHnHGRSQM9loooJABJOAKsRmeINXh0LQ7vUJiMRISo/vN2H51j+A9HlsfDzT3q5u9Qczzk9fm6A/hWRcM3jvxbHbx7v7D0qTfK2PlnlHQD1Ar0EAKAAMAdBQBwXhGYeHPFGoeFJuI3Y3Vmx6FWPK/hWn8Sxn4c62P+nc/zFP8AGOgz6hBBqem7V1SwbzIWP8Q7qfrVPUL+Lxp8OdSW1OLhrdkli/iSQdQR+FJgfNThShiwcFQciuj8CEjx9oadB5v9K5kyBlJHDr8r57GtrwTeLbeONEuJiFhFxt3H3qEM+sqKAcjI6UVoIKKKKACiiigAooooAKKKKACo7iVoLeSVYXmZFJEceNzewyQM/UipKZKypC7MwVQpJJOAKAOPs/H9hqnhO58TR6HqjWNmXYh1h3kJkOyjzO2D3B9M1c03x9oV/bWMs1wlg96gkihvJ4lk2EAqSA5xkEY715n4ah834F6xcJrk8caR3oa2QxbM7nwDlS3P178V6P4DtbO78C+GrkrHJJDp8Shhg4OwAg/lQB1lFFFABRRRQAUUUUAFMmdo4nZFDOFJVS2Nx9M0+sfX5LgQwR22nRXcrsdrTAlIuPvEAEk8njjPTIoAxF+IlkZIDJZzwQtb3E03n/LJE0LiNo9gB3EscDB5restbW80hbw2kyXAVTNZBkaaFiAdrAHAOCD16GvKV0bTG+IzW18929wLPE92gMZNzKdyIiD5UCrGSASc55yevQ3FsLDwvqcOv3E9vDBeJJFdqsNtJexgBlQ4PLAg5wFJ28daANGT4m2B1TTrW206+mhu0mczBMbRHtHA/i5bB5GK6HQfEMHiGye9tra5itOsU0wUCUdyoBJGCCOQK+XnmtIZrhY9YMk1s8C27+TjcjbvNyu7/aU577K9S+G1na6j4Q1TTLDU3F9K/lXMrykkWuTgxoOFJBI6nBbJJ6UDO6Hjb/ihrvxOdPYQxF2iiMozNGH2h844yOcYrfudWtrazu5y6SSWtubiWBHBcLgkce+DjPpXhOtLZax8OLXTrWaGOLTNPjub2TePMmlI2xxg9SAMk+mFH07bRNc0mXwt4j0kNA2paVZTQy3CKP38Sodr7xweMZGeCDQI6KDx7YXF1NaCCSC62Rm2S5ZVEzPE0oXKltvCHJP/ANar+i+K9P1hLGIsbbULu2+0/Ypf9YijGQfoT9a8wsdGa51i9nubSRLext7Ke4nhkBuEVYS21GYgqG2jJBzgYxzkd94Yhu7rXr3XEWVNJv7aJ7Zbgq8mT8xIIJKrz9w9CeMdKAOuooooAKKKKAPm74wSL/wmV6M/NtjwD9K5XwCSfHeijIx9pBre+MsiN41vW3gsqoAAfauY+G4kk+I2iKTn9/nH4UgPsSiiimAVxnxGvZjo8Oi2Z/0vVJRAoHZc/Mfyrrrm5hs7aS4ncJFGpZmJ4ArhvCiS+KvEdx4suVIs0Bg0+Nv7o6v+NAHaaZYx6ZplrYxACOCJYxj2GKtUUUAFFFFABRRRQAUUUUAFFFFAAQCCCMg155rfhvUfDGqS+IvCqFlc7rzTx92Udyo9a9DooAwfDXi7TPE9rvtJNlwvEttJ8skZ9CK3iMjB6VyXiDwJZard/wBpWEr6dqqj5bmA4yf9od6yE8V+JPCgWDxRprXlsDgX9mN3Hqy9qAOE+LHwpuluLjW9BtvNgkO+e2jHzA9yBXGeC/ib4l8Ex/2ebc3dmDkQy5ynsDX0rpHjDQdcjBs9QhZm6xudrD2INM1PwX4c1tvMvdLt5WP8QGM/lQB5Uv7RkKoPO8Pzh8c4cYpkn7SEIQtHoE3sWkGK9EPwn8FHrokP5mnRfCrwXF93Q4PxyaAPKW/aQvySF0GIemXNVpf2g/EssmINGtkGM4OTXt8PgPwtb/6vQ7Pj1jBq5D4c0G24i0uyT6RLQB8+n49+MHXKabaDnHCk1Um+OnjmQ4jt4Y/pbk19KDTNJj6Wdov/AGzUUeTpSceXaL+CigD5qj+MfxGkGVjUj1+y08/F34k4zsT6fZq+k/M0uMfftFH1Wk+2aT/z8Wf/AH2tAHzaPjB8Rm6Q/na//Wo/4W78SWPyxqMett/9avpP7dpX/P1af99rSfbtK/5+bP8A77WgD5tHxd+I+cGME+1rx/KpV+LPxGI+6mfe2/8ArV9HfbdLA/4+bTH++tH27Sj/AMvNp/32tAHzn/wtf4jYyfKH/bv/APWpV+K/xFZsDyvxt/8A61fRX23Sv+fmz/77WlF1pZ6T2n/fS0AfPA+KvxEx8xhH/bv/APWqQfFnx+m3K27Z9YMf0r6FFxpx6S23/fS04NYHo1ufxFAHz03xe8dxNhobU84yYjipF+Nfi9XVHs7Qk5ydhAr6AMWnv1S2P4LSG005hgwWx+qrQB4GPjh4rKnGm2rkdQFarEPxt8USEhtJthxnkEV7j/Z+lf8APraf98LR/Zeknn7FaH/tmtAHjyfGjXlj3Po0Dcfwk05fjXrB2ltGt1DDI3SYNeuNoejScNp1m3/bJajHhnQv+gVZ/wDfoUAeVn406soBOiwYP/TSpv8Ahd1whG/RVb12S16d/wAIxof/AECrT/v0KYfCXh8/8wi0/wC/QoA88i+NZcZOgzH6SCnN8bVViDoFyfo4rvm8H+H2XH9k2wHsmKrHwD4YJydJh/WgDhv+F4qX2/8ACO3Y+rCnN8cI1xnQLnn0cV23/CvvC/8A0CovzNMk+HPhSVdraRFj2JFAHGL8dbPcQ+i3Qx/tilHx208vt/sS+z+FdY3ww8IOcnR48/7x/wAaT/hV/hHOf7KX/vtv8aAOaT436c3XSLxfqRQ/xx0tFJOl3ee3I5rpf+FYeEsY/stf++2/xp3/AArPwqF2jTQB/vmgDyLxl8VtQ8SQNp1mgsbN/wDW7Xy7j04rz7z4kdtpzxgmvpk/Czwk3XTj/wB/DSR/CvwnFJuXTzjuu84P1qbAfPXh3QtS8TXtvb6VA+X++XXAQepNfT3hTw5b+F9Bg0235KjdI/8AeY9TVyw03TNDtBDZwQWsKj+EBf1rG1Tx7o9hL9nt3kv7snAhtV3nPuaaQHTO6xoXdgqqMkk4ArhNU1y78XahJofh5mFkvy3moL90DuqnuacNJ8R+Lnzrbf2ZpR5FnC37xx/tHtXY6dp1ppVnHaWUCQwoMBVFMCPSNJtdE0yGws02xRDHuT3J96vUUUAFcTr+g3uk6m/iHQI9zsMXlmPuzL3IHrXbUUAfKnjHRImvJNU0tSsFw2THjHlt3Ujsa5RrxYyIpC0coOQRwR7ivqrxF4JttVMl1YstrfMuCcZST2Yf1rz4+GdA0y48nxXoUls+eLu2y0Tf4UrAUPCPxvksbFLPWbSW6WPCpPEcsR711R+PHhdWCtBfqT/0xNWNP+Gvge+iEmnzGRDyAk2f0q5/wqLw0CSFnyf9umBnL8ePCHRxfIf+vcmpB8dfBXQ3F4D6G2atEfCfw6Fxib/voVBJ8H/DcnJNwD6h6AKp+O3gkHBubv8A8Bmp6/HLwQ3/AC+3A+tu1PHwa8PKxKzXQz7j/Ck/4U3oH/PxdD8R/hQBJH8a/BLkD+0JVz/ehYVMvxj8Ek4/tYD6xtVU/BzQiuPtNz/47/hUZ+Cvh9utxcn8qANFfi/4Ib/mNRj6qakX4s+CW/5jtuPrmsZ/gjoDf8vNwBnONq1Vl+BWkNJuS+lH1jXNAHUL8UvBbHH9v2o+rYqQ/EfwTOhifxBp7KwwVaQYIrlB8DtNHI1B8+8Yph+BmmM+5rsM3YmIUAdWni3wF5ZiXVNHCPglQUwcetWYPGvg22i2Qa3pcUec7UlUDP0FcPN8C7GRCq3kYz/0xFUz8BIwflvbQf8AbA0AelDxz4VPTX9P/wC/604eNvC56a9p/wD3/X/GvMX+ApYjGoWnH/TuaY/wAVjkX1p/35P+NAHqw8XeHSMjW7D/AL/r/jTl8U6A33dYsT/23X/GvJ0+AZVQPttlx38lv8aX/hQ8oBAvrHr/AM8W/wAaAPWh4l0M9NWsj/22X/Gnf8JBo3/QUs/+/wAv+NeQt8B5yMC+sj/2zahPgTdI5f7dZZxgDY1AHrw8QaOTgapaH/tsv+NVdQ1e1uYRHZa/ZWrZ+eQ7ZGx/s5IAPuQfpXln/Cjr8HP2+x9v3bUjfBHUzg/bLAEeiNQB6FDpvhNNIu9NmvoLlbxzLczTXIMssnHzlgQQRgYxjGBjFNsILaysZrOTxpPcoz5jeaSJpIkx90Njk+5ya8/HwQ1Atua8sj/wFqkX4LXw/wCXi0z6/NQB0Fp4H8MRrf8A2jxHNPLczvNHMLpUki3Dbjd1b5ePmyMdhXQeHobPQrJ7J/EVpcWqrst4xHFD5S/8B6n8vpXnZ+COpEnN7Ze3ytTP+FJaru/4+rE/g1AHeyaXoUngMeF/7btQn2dYGuAU3HBBJxnvitTWJNG1bRZ9MbVbWKG4URyssi5aPI3L17rkZ7ZrypPgjq6uc3NiRn/ap0nwS1Y8C4sv/HqAO7g0e0guNakfxXFMmqoI5BIse5EC7VAIIHALdvT051dIW10lbWEeI4pbS2tlt0t2MYB24AYnruwPp7V5TJ8DNWcnFzZj/gTUjfA3WXUL9qs1AGM7myaAPb/7Z0z/AKCFr/39X/GmHXNKHXUrT/v8v+NeHj4Fa2Rhr2y/NqT/AIULrGc/brL6fNQB7gdf0gDJ1O0/7/L/AI1zXin4oeG/Ddg8n9oQ3N0QRHDCwck++OleZD4B6zzm+sv/AB6lj+AOqk4a/skHqFY0AeT6xqVzrurXOq3j/v7ly5GfujsK9R+Bvgye51r/AISK5iYWtuCsLMMb3PcfSum0L4B6baXKz6xem72nIjjUqp+teuWlnb2FrHbWsKQwxjCogwAKAJ6ZNNHbxNLM6pGgyzMcACuf17xto2gDZNceddHhbeD53Y/QVzo0fxB46lEuubtN0U/MtkjfvJR23GgCG9uLr4k6o2nWReLw5A/+kXI4+0Efwr7V6La2sNlaxW1vGscMShUVRwAKbY2NtptnHaWkKxQRjCoowBVigAooooAKKKKACiiigAooooAKKKKACiiigApGVXUqwBB6g0tFAHOan4F8O6q/mTadHHL/AM9If3bfmKy/+FcpAc2HiDV7bHQCbcB+ddvRQBxf/CF6wPu+MNS/ELUcngXV5fveMtUx/s7RXcUUAcInw4kY5uPFGsy+wm20snwv06YDzNX1hj6/azXdUUAcTD8L9FiGGu9Tk/37tz/Wnn4X+G2OXjumPvcv/jXZ0UAcX/wqzwuettOfrcP/AI0n/CqfCP8A0D3/AO/7/wCNdrRQBxX/AAqjwj/0D3/7/v8A40f8Ko8ID/mHP/3+f/Gu1ooA4o/Cnwif+XB/+/z/AONJ/wAKn8I/8+En/f8Af/Gu2ooA4n/hU/hH/nwk/wC/7/40o+FXhMdLKUfSd/8AGu1ooA4v/hVfhbORbTj6XD/404fDHw4OkV0P+3l/8a7KigDjx8NNAHT7YPpcv/jTv+Fc6J/fvf8AwKf/ABrrqKAOR/4Vzon9++/8Cn/xqF/hnpDZ23upp9Ltq7SigDiV+GWmocrqmrA/9fTVJ/wrqyxxq+rj/t6NdlRQByA8AW6jA1nVx/28mo5Ph8rD5PEGsJ9LjNdnRQBxQ8ATKAE8T6wPrKDTv+EEux93xVq4/wC2g/wrs6KAOL/4QbUcceLtW/Fl/wAKcPBeqrjHi7U+PXaf6V2VFAHIf8Ihq3/Q2aj+S/4Uv/CJav8A9DZqP/fK/wCFddRQByR8Kax28WX4/wCAr/hSf8InreOPFt9/3wtddRQByH/CKa9/0N17/wB+1o/4RLW24fxdf4/2UUV19FAHHj4eWE7btR1DUb49xLOQD+AroNN0PTNIiEdjZQwgDGVXk/U9a0KKACiiigAooooAKKKKACmyRRzIUkRXU9VYZBp1FAHMXngLQrmYzwwyWcx6vayGP9BxVYeDdTtxts/FOoxp2EmHx+ddhRQBxa+GfFiMSvi+Rh6NbrTv+Ee8X548Vr/4DCuyooA5AaH4v/6GiM/9uopG0bxmPueJbf8AG1FdhRQBxv8AZPjkH/kYbIj3taDpvjsfd1vT2+ttXZUUAcalp4+U/NqWlOP+uLCpfs/jn/n90r/v01dbRQByZi8c44udJP8A2zamlPHi9JdIb/gLCuuooA5DzfHi/wDLvpL/APAmFKt146HXT9KP/bVq66igDk/tnjj/AKBeln/tuaQ33jgf8wjTT/28GutooA5L7f4376Pp3/gQaDqXjUf8wSwP0uDXW0UAcedV8bD/AJgFmfpcUh1rxmvXw3bn6XFdjRQBxw13xjn5vDEWPa4FOGu+Lc8+GE/8CBXX0UAcn/bvirv4ZX/wIFH9veKMc+F+f+vgV1lFAHJ/2/4n/wChWP8A4ECj/hIPE2P+RWbP/XwtdZRQByf9v+KP+hXP/gQKT/hIPE//AEKzf+BArraKAOS/4SDxP/0Kzf8Af8Uf8JB4n/6FZv8Av+K62igDkv8AhIPE/wD0Kzf9/wAUf8JB4n/6FZv+/wCK62igDkv+Eg8Uf9Csf/AgUh1/xWQdvhbB97gV11FAHGHUPHdypEOj6fbZ6NLMWx+AqP8A4RfxPqw/4nPiNoYj1hsU2DHpu6129FAGBovgzRNCbzLW0D3B6zzHe5/E1v0UUAFFFFABRRRQB//Z']	['bio_59.jpg']
bio_60	OPEN	Erysipelothrix erythrosipelis is a pathogenic bacterium of pigs (causing erysipelas). Its surface antigen A protein (SpaA) and choline binding protein B (CbpB) can induce pigs and others to produce specific antibodies. Bacillus subtilis is a probiotic that lays the foundation for the development of oral live carrier vaccines for pigs. The researchers constructed a recombinant plasmid (the process is shown in Figure 1<image_1>) and introduced it into Bacillus subtilis. After a period of time, the bacteria and spores were collected respectively (with strong resistance and can germinate to form bacteria under appropriate conditions), and the recombinant bacteria live vector vaccine expressing SpaA on the surface of the bacteria., a recombinant spore live vector vaccine expressing CbpB on the surface of the spores, and the immune effect was evaluated through mouse immunization experiments. Researchers studied the effects of humoral immune responses of different vaccines. The results are shown in Figure 3<image_2>. Group A is phosphate buffer, Group B is wild-type Bacillus subtilis bacteria, Group C is wild-type Bacillus subtilis spores, Group D is recombinant Bacillus subtilis Bacillus subtilis live vector vaccine, Group E is recombinant Bacillus subtilis spore live vector vaccine. After oral administration of bacterial live vector vaccine (expressing SpaA), serum anti-SpaA antibodies were low; spore live vector vaccine did not express SpaA, but serum anti-SpaA antibodies were high after oral administration of spore live vector vaccine. The reason was ().		Spores have strong stress resistance and can smoothly enter the internal environment through the gastrointestinal tract; under appropriate conditions, the spores germinate into bacteria and express SpaA, activating humoral immunity	bio	生物技术与工程_基因工程	['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bio_61	OPEN	Metallothionein (MT3) is rich in sulfhydryl groups and has a strong affinity for metal ions, reducing the damage to plants caused by heavy metals. The signal peptide (MF-α) mediates the secretion of the recombinant fusion protein outside the cell. The researchers synthesized the MF-α-EGFP-MT3 fusion gene and built an expression vector to transform tobacco to study the effect of secreted MT3 on plants. The figure below <image_1>shows the construction process of the expression vector. Please answer the following questions. The upstream primer sequence used in process ① is 5'-GCGTCGACATGGAGATTCCTTC-3', and the downstream primer sequence is 5'-CGGATACTCAGTGGCAGCAGCTGCAC-3'. Based on this, it is speculated that the restriction enzyme used when cutting vector 1 in Process ② is ().		Xho I、EcoRV	bio	生物技术与工程_基因工程	['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bio_62	MCQ_OnlyTxt	"After the birth of ""test-tube baby"",""designing test-tube baby technology"" came into being. The following statements related to the two are correct ()"	"['A. Both ""designing IVF"" and ""IVF"" require embryo selection, but the purposes of the selection are different.', 'B. The technology of ""designing IVF"" belongs to ""therapeutic cloning""', 'C. Both used in vitro fertilization technology, embryo transfer technology and genetic diagnosis technology before transplantation', 'D. ""Designing IVF"" must be approved by the government, while ""IVF"" does not require it.']"	A	bio	生物技术与工程_生物技术的安全性与伦理问题	['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bio_63	MCQ	A nonsense mutation is a mutation in which the codon sequence encoding amino acids in a gene changes to the premature stop codon (PTC) sequence, resulting in the production of a truncated non-functional protein. The researchers designed Guide snoRNA to use single base editing technology to recruit pseudouridine synthetase to accurately and efficiently edit uridine (U) to pseudouridine (PSI) in PTC and achieve full-length protein expression. The relevant process is as follows<image_1>, and the relevant description is correct ()	['A. A nonsense mutation is a base substitution in a gene that results in a replacement of the first base of the corresponding codon', 'B. Guide snoRNA is designed mainly based on the partial base sequence on both sides of the premature stop codon in mRNA', 'C. Base complementation between ΨAA, ΨAG, ΨGA and the anti-codon ensures normal translation', 'D. The full-length protein translated into mRNA edited by this technology has normal functions']	BC	bio	遗传与进化_遗传的分子基础	['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bio_64	MCQ	Common wheat (6n =42, AABBDD) is an allohexaploid food crop. Rye (2n=14, RR) has excellent characteristics such as strong disease resistance. In order to transfer the excellent trait genes of rye into ordinary wheat, researchers used the method of crossing ordinary wheat deficient bodies (missing a pair of homologous chromosomes 4D) with rye and then backcrossing them. The main process is as follows<image_1>: The relevant statement is correct ()	['A. There are 4 chromosomes in the somatic cells of the 4D absent chromosome of ordinary wheat, and 27 chromosomes in the somatic cells of $F_1$', 'B. After colchicine treatment, after microscopic observation,$F_1$plants containing 54 chromosomes were selected for backcrossing', 'C. Using anthers of $BC_1F_1$to observe meiosis, 20 tetrads were observed', 'D. Heterogeneous chromosome substitution lines wheat with restored chromosome number can be obtained by selfing individuals with chromosome number 40 in $BC_2F_1$']	BC	bio	遗传与进化_生物的变异与育种	['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']	['bio_64.jpg']
bio_65	MCQ	In population genetics, Wright called genetic drift the phenomenon of random fluctuations in gene frequencies caused by changes in the subgenerations of individuals with different genotypes in a small population. The following figure <image_1>shows the changes in the frequency of A gene in populations with population numbers (N) of 25, 250, and 2500 respectively. The following statement errors are ()	['A. In general, the smaller the population, the more significant the genetic drift is. Genetic drift produces new heritable variations, which leads to biological evolution.', 'B. Genetic mutations, genetic recombination, genetic drift, and migration all affect the A gene frequency of the population in the figure', 'C. Natural selection is the main cause of genetic drift, and the impact of genetic drift on population gene frequency is random', 'D. If the population mates randomly, the Aa genotype frequency in the population with N = 250 in the 125th generation was lower than that in the population with N = 2500']	ABC	bio	遗传与进化_生物的进化	['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bio_66	MCQ	The occurrence of many diseases such as Alzheimer's disease (caused by apoptosis of nerve cells) and cancer is related to abnormal apoptosis. Studies have found that after cells receive apoptosis signals, caspase plays an important role (as shown in the following figure<image_1>), and eventually forms membrane-coated bodies of varying sizes and containing organelles and nuclear debris, called apoptotic bodies. The following statement is incorrect (    ）	"['A. The formation of apoptotic bodies may be related to the cleavage of cytoskeletal proteins by activated protease caspase Y', 'B. After receiving an apoptosis signal, the protease caspase amplifies its effect, which facilitates rapid apoptosis.', ""C. Alzheimer's disease and cancer can be treated by inhibiting the activity of the protease caspase"", 'D. Phagocytes swallow the apoptotic bodies in a endocytosis manner and decompose them through lysosomes']"	C	bio	分子与细胞_细胞的生命历程	['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']	['bio_66.jpg']
bio_67	MCQ_OnlyTxt	During meiosis I, if homologous chromosomes are abnormally synapsed, the homologous chromosomes with abnormally synapsed can enter 1 or 2 daughter cells; during meiosis II, if homologous chromosomes are present, homologous chromosomes are separated but sister chromatids are not separated. If there are no homologous chromosomes, sister chromatids are separated. Does abnormal connections affect the survival of gametes and the behavior of other chromosomes? During meiosis I in multiple oogonia with genotype Aa, only the homologous chromosomes where A and a are located are abnormally synapsed and non-sister chromatids are exchanged. Regarding the daughter cells eventually formed by these oogonia, the following statement is incorrect (    ）	['A. Considering only cell type and A/a gene, oogonia can produce up to 12 seed cells', 'B. There are up to 10 types of fertilized eggs formed by combining with sperm formed during normal meiosis of spermatogonia cells Aa', 'C. When the oogonia produces a genome that becomes AA, it produces an equal amount of polar bodies with a genome that becomes AA.', 'D. if an egg cell compose that gene Aa is produced, the homologous chromosome enter a daughter cell at meiosis 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bio_68	MCQ	During meiosis in eukaryotes, in the early stage of synapsis, a temporary protein structure called synaptonemal complex (SC) is formed at the site where homologous chromosomes are synapsed. After a period of time, the SC will gradually disintegrate and disappear. Diploid yeasts can produce haploid spores through meiosis. A mutant yeast has been found, and some individuals will produce abnormal spores. The process is shown in the figure<image_1>. The following statement is wrong (    ）	['A. In the presence of SC, the ratio of core DNA to chromosome number of yeast cells is 2:1', 'B. SC may be involved in synapsis and gene recombination of homologous chromosomes during meiosis', 'C. The reason why mutant yeast produces abnormal spores may be slow degradation of SC', 'D. If SC protein synthesis is blocked, sister chromatid separation is abnormal']	D	bio	分子与细胞_细胞的生命历程	['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']	['bio_68.jpg']
bio_69	MCQ_OnlyTxt	During meiosis I, if homologous chromosomes are abnormally synapsed, the homologous chromosomes with abnormally synapsed can enter 1 or 2 daughter cells; during meiosis II, if homologous chromosomes are present, homologous chromosomes are separated but sister chromatids are not separated. If there are no homologous chromosomes, sister chromatids are separated. Does abnormal association affect gamete survival, fertilization and the behavior of other chromosomes? During meiosis I in multiple spermatogonia with genotype Aa, only the homologous chromosomes where A and a are located are abnormally synapsed and non-sister chromatids are exchanged. The sperm formed by the above-mentioned spermatogonia combines with the egg cells formed by normal meiosis of the oogonia of genotype Aa to form a fertilized egg. It is known that A and a are located on autosomes. Regardless of other mutations, the maximum genetic composition of the above sperm and fertilized eggs is (    ）	['A. 6;9', 'B. 6;12', 'C. 4;7', 'D. 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1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxM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bio_70	MCQ_OnlyTxt	In fruit flies, red eye (D) is dominant to white eye (d), and the gene that controls eye color is located on the X chromosome. Researchers used white-eyed female flies and red-eyed male flies to cross. F_1 not only include red-eyed female flies and white-eyed male flies, but also a small number of red-eyed male flies and white-eyed female flies with equal proportions. It is known that a fertilized egg of Drosophila melanogaster contains 1 X chromosome and develops into a male, and a female with 2 X chromosomes; if there are more than 2 X chromosomes or no X chromosomes, it cannot develop normally. Oocyte cells with abnormal chromosome numbers can participate in fertilization, but sperm with abnormal chromosome numbers do not participate in fertilization. The total number of fertilized eggs produced is represented by B, and the number of fertilized eggs with abnormal chromosome numbers is represented by A. The following statement is wrong (    ）	['A. F_1 Fertilized eggs with neutral chromosome composition Y and XXX cannot develop normally', 'B. The sex chromosome of F_1 red-eyed male fly is XD, and the meiosis of its female parent produces egg cells without sex chromosomes', 'C. The sex chromosome of the F_1 white-eyed female fly is X^dX^dY, which may be due to the fact that the sister chromatids did not separate during the MII process of the female parent.', 'D. F_1 The proportion of flies with neutral chromosome composition XY is (B-2A)/(2B-A)']	D	bio	分子与细胞_细胞的生命历程	['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bio_71	OPEN	The three traits of an insect: body color, wing length and eye type are controlled by alleles A/a, B/b and D/d respectively. Currently, male and female individuals with both genotype AaBbDd are used, and the segregation ratio of F_1 traits is shown in the following table<image_1>. Researchers selected a new strain that was dominant homozygous for death from individuals treated with radiation. The dominant gene (located on the autosome) caused cracking of the trailing edge of the wing, which was normally smooth and without gaps. To explore whether the split wing gene and the wing length gene (long wing is wild-type and dominant) are located on the same chromosome, please use this new strain and the wild-type homozygous strain to design a hybridization experiment and predict the experimental results: ().		The short-winged individuals (Eebb) of the new line were crossed with the wild-type homozygous strain (eeBBB), and the male and female individuals with split wings and long wings were mated with each other in the progeny, and the phenotype and proportion of the progeny were observed. If the split wing gene (E) and the wing length gene are located on the same chromosome, then the offspring split wing and long wing: normal wing and long wing =2:1; if the split wing gene (E) and the wing length gene are located on a non-homologous chromosome, then the law of free combination is followed, the offspring split wing and long wing: split wing and short wing normal wing =6:2:3:1	bio	分子与细胞_细胞的生命历程	['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']	['bio_71.jpg']
bio_72	MCQ	Corn grain size is controlled by two pairs of genes, R/r and Q/q. The R/r gene of the parent regulates the expression of the Q/q gene in grains. Researchers used small-grain corn (RRqq) and small-grain corn (rrQQ) to conduct positive and negative cross experiments. All the grains produced were large grains or small grains, and some grains were selected for planting. The grains produced after F1 planting were separated in traits. The process is as shown in the figure<image_1>. Then select some grains from F1 and F2 and plant them separately. The following statement is correct ()	['A. The genotypes of both large and small grains in F1 are RrQq, and the grain size is related to whether the male parent carries the gene R', 'B. There are 6 genotypes for F2 large grains, of which 1/9 are homozygotes', 'C. If one plant is randomly selected from F2 large-grain plants, the probability of character segregation in the grain produced by the plant is 1/2', 'D. One plant was randomly selected from the F2 small-grain plants to pollinate the F1 small-grain plants, and the small-grain accounted for 1/2 of the grains produced']	D	bio	遗传与进化_遗传的基本规律	['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']	['bio_72.jpg']
bio_73	MCQ_OnlyTxt	The coat color of a certain mammal is determined by three pairs of alleles located on the autosome. Among them, enzyme 1 encoded by the A gene can convert yellow pigment into brown pigment, and enzyme 2 encoded by the B gene can convert the brown pigment into melanin. The expression products of the D gene can completely inhibit the expression of the A gene, while the expression products of the corresponding recessive alleles a, b, and d do not have the above functions. Now two homozygous yellow breeds of animals are used as parents for crossbreeding. Both $F_1$are yellow, and the coat color phenotypic separation ratio in $F_2$is yellow: brown: black = 52:3:9. The following statement is wrong ()	['A. The three pairs of genes that determine coat color are located on non-homologous chromosomes', 'B. There are 21 genotypes for individuals with yellow coat color, of which 6 are homozygous', 'C. The genotypes of the above two homozygous yellow varieties are AAbbDD and aaBBdd respectively', 'D. Individuals of AaBbdd were crossed multiple times, and the sub-representative segregation ratio was yellow: brown: black = 4:3:9']	D	bio	遗传与进化_遗传的基本规律	['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bio_74	MCQ	The sex chromosome composition of a certain insect is XY. The long wing (A) is completely dominant over the short wing (a). Homogeneity for the recessive gene b on the autosome will cause the female to appear male and unable to produce gametes. A hybridization experiment as shown in the figure was carried out using this insect<image_1>. The following inferences are correct ()	['A. The genotypes of the parents are $BbX^aX^a$and $BbX^AY^A$respectively', 'B. There are 4 genotypes for male fertile individuals in $F_1$', 'C. $F_1$produces four equal proportions of male gametes', 'D. $F_1$The proportion of female homozygotes in $F_2$produced by free mating is $2/5$']	C	bio	遗传与进化_遗传的基本规律	['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bio_75	MCQ	The flower colors of Brassica napus are usually mainly yellow, but also white, milky white, golden yellow, etc. In order to explore the genetic mechanism of flower color genes, the researchers conducted the following <image_1>hybridization experiments. The following statement is correct ()	['A. Brassica napus color is controlled by at least three pairs of alleles', 'B. F1 from groups A and B were crossed, and the proportion of milky white individuals in the offspring was 1/4', 'C. A recessive homozygous individual was crossed with a golden parent, and the proportion of white individuals in F2 was 1/64', 'D. When white and yellow individuals in the parents are crossed, the proportion of yellow individuals in F2 may be 3/16']	ABD	bio	遗传与进化_遗传的基本规律	['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']	['bio_75.jpg']
bio_76	MCQ	When the C gene on chromosome 9 of corn exists, the color of the grain appears colored, otherwise it will be white; when the Ds gene exists, the C gene cannot synthesize pigments. If the Ds gene breaks or falls off from its original position, the C gene can be expressed again; When the Ac gene exists, the Ds gene breaks and dissociates from the chromosome. When the Ac gene does not exist, the Ds gene does not break or separate from the chromosome. The positions of the three genes are as <image_1>shown in the figure. This mechanism only occurs in the grain. Individuals with genotypes of CCDsDsAcAc and ccdsdsacac were crossed to obtain F_1, and F_1 was selfed to obtain F_2. The following related statements are incorrect ()	['A. The reason why the kernels of corn with genotype CCDsDsAcAc are colored is a genetic mutation', 'B. The proportion of colored individuals in F_2 is 9/16', 'C. Colored individuals in F_2 In self-bred descendants, colored: white = 11:25', 'D. If F_1 is selfed and half of the primary spermatocytes have a single exchange of alleles C/c or Ds/ds during synapsis, the proportion of individuals with ccdsdsacac in F_2 is 3/64']	AC	bio	遗传与进化_遗传的基本规律	['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']	['bio_76.jpg']
bio_77	MCQ	The m gene on chromosome 2 of a diploid hermaphrodite plant is a male sterile gene. M is completely dominant to m, and the purple-stem of seedlings is dominant to the green-stem, controlled by alleles B and b. The two homozygous parents, purple-stem male fertile at seedling stage and green-stem male sterile at seedling stage, were crossed, F1 was selfed, and the F2 phenotype was counted. The results are shown in the table. In order to study the characteristics of heterozygotes in this plant, two homozygous lines A and B were crossed. It was found that there was a toxic protein that killed the pollen in the pollen of the hybrid. About half of the pollen was caused by the lack of the corresponding detoxification protein. Pollen abortion. The study found that the genes encoding these two proteins were only located in the R region of chromosome 12 of strain B, and the genes in this region were not exchanged, as <image_1>shown in the figure. The following statement is correct ()	['A. In F1, the gene MB (mb) is located on one chromosome, and fragments are exchanged on the chromosome where it is located during meiosis I', 'B. The functional protein expressed by the ORF3 gene in the pollen of the A/B hybrid was at least after the end of meiosis I.', 'C. Among the selfed descendants of A/B hybrids, 1/4 of the individuals whose chromosome 12 came from line B were all from B', 'D. F1 test cross progeny showed that purple stem fertile: purple stem sterile: green stem fertile: green stem sterile = 4:1:1:4']	ABD	bio	遗传与进化_遗传的基本规律	['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']	['bio_77.jpg']
bio_78	MCQ	The flowers of a diploid plant are red due to the carotene content, and the genes P, W, and Y control the synthesis of three key enzymes required in the carotene synthesis pathway respectively. Among the haploid recessive mutants of this plant, the P gene mutant is pink flowers, the W gene mutant is white flowers, and the Y gene mutant is yellow flowers. To verify the impact of these mutations, the researchers constructed several dual-gene mutant haploids with the flower colors <image_1>shown in the table. The following statement is correct ()	['A. The order of the three genes affecting the carotene synthesis pathway is W gene, P gene, and Y gene', 'B. The colors of each substance in the carotene synthesis pathway are white, yellow, pink and red in order', 'C. The pink flower homozygote crosses with the yellow flower homozygote, and the offspring color shows safflower or yellow flower color', 'D. Three pairs of diploid plants heterozygous for all genes were crossed, and safflower plants accounted for 27/64 of the descendants']	AC	bio	遗传与进化_遗传的基本规律	['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bio_79	MCQ	The color of a diploid plant with hermaphroditic flowers is controlled by three pairs of alleles, of which gene A controls purple color and a has no function of controlling pigment synthesis. Gene B controls red, and gene B controls blue. Gene I does not affect the function of the above two pairs of genes, but individuals homozygous for i have white flowers. Plants of all genotypes can grow and reproduce normally, and individuals with genotypes A_B_I_and A_bbI_show purple-red flowers and indigo flowers respectively. There are three different purebred strains of this plant A, B and C, and their colors are indigo, white and red respectively. Regardless of mutations, based on the hybridization results in the table<image_1>, the following inferences are correct ()	['A. Test crossing plants containing only recessive genes with F2 can determine the genotype of each plant in F2 that controls flower color traits', 'B. All F2 purplish red plants in the above table are self-bred for one generation, and the proportion of white flowers in all progeny is 1/6', 'C. If the proportion of white-flower plants in the selfed progeny of a plant is 1/4, there are at most 9 possible genotypes for the plant.', 'D. If the F1 obtained by crossing A and C is selfed, the F2 phenotypic ratio is 9 purplish red: 3 indigo: 3 red: 1 blue']	BC	bio	遗传与进化_遗传的基本规律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACtAhQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3e/vrfTNOub+8k8u1tYnmmfaTtRQSxwOTgA9K4f8A4Xb8PP8AoYf/ACSuP/jddB47/wCSeeJf+wVdf+imroKAPP8A/hdvw8/6GH/ySuP/AI3R/wALt+Hn/Qw/+SVx/wDG69AooA8//wCF2/Dz/oYf/JK4/wDjdH/C7fh5/wBDD/5JXH/xuvQKKAPP/wDhdvw8/wChh/8AJK4/+N0f8Lt+Hn/Qw/8Aklcf/G69AooA8/8A+F2/Dz/oYf8AySuP/jdH/C7fh5/0MP8A5JXH/wAbr0CigDz/AP4Xb8PP+hh/8krj/wCN0f8AC7fh5/0MP/klcf8AxuvQKKAPP/8Ahdvw8/6GH/ySuP8A43R/wu34ef8AQw/+SVx/8br0CigDz/8A4Xb8PP8AoYf/ACSuP/jdH/C7fh5/0MP/AJJXH/xujwl/yV74i/8AcM/9J2r0CgDz/wD4Xb8PP+hh/wDJK4/+N0f8Lt+Hn/Qw/wDklcf/ABuvQKKAPP8A/hdvw8/6GH/ySuP/AI3R/wALt+Hn/Qw/+SVx/wDG69AooA8//wCF2/Dz/oYf/JK4/wDjdH/C7fh5/wBDD/5JXH/xuvQKKAPP/wDhdvw8/wChh/8AJK4/+N0f8Lt+Hn/Qw/8Aklcf/G69AooA8/8A+F2/Dz/oYf8AySuP/jdH/C7fh5/0MP8A5JXH/wAbr0CigDz/AP4Xb8PP+hh/8krj/wCN0f8AC7fh5/0MP/klcf8Axuj4Jf8AJIdC/wC3j/0okr0CgDz/AP4Xb8PP+hh/8krj/wCN0f8AC7fh5/0MP/klcf8AxuvQKKAPP/8Ahdvw8/6GH/ySuP8A43R/wu34ef8AQw/+SVx/8br0CigDz/8A4Xb8PP8AoYf/ACSuP/jdH/C7fh5/0MP/AJJXH/xuvQKKAPP/APhdvw8/6GH/AMkrj/43R/wu34ef9DD/AOSVx/8AG69AooA8/wD+F2/Dz/oYf/JK4/8AjdH/AAu34ef9DD/5JXH/AMbr0CigDz//AIXb8PP+hh/8krj/AON0f8Lt+Hn/AEMP/klcf/G69AooA8//AOF2/Dz/AKGH/wAkrj/43R/wu34ef9DD/wCSVx/8br0CigDz/wD4Xb8PP+hh/wDJK4/+N0f8Lt+Hn/Qw/wDklcf/ABuvQKKAPP8A/hdvw8/6GH/ySuP/AI3R/wALt+Hn/Qw/+SVx/wDG69AooA8//wCF2/Dz/oYf/JK4/wDjdH/C7fh5/wBDD/5JXH/xuvQKKAPP/wDhdvw8/wChh/8AJK4/+N0f8Lt+Hn/Qw/8Aklcf/G69AooA8/8A+F2/Dz/oYf8AySuP/jdH/C7fh5/0MP8A5JXH/wAbr0CigDz/AP4Xb8PP+hh/8krj/wCN0f8AC7fh5/0MP/klcf8AxuvQKKAPP/8Ahdvw8/6GH/ySuP8A43R/wu34ef8AQw/+SVx/8br0CigDz/8A4Xb8PP8AoYf/ACSuP/jdH/C7fh5/0MP/AJJXH/xuvQKKAPP/APhdvw8/6GH/AMkrj/43R/wu34ef9DD/AOSVx/8AG69AooA8/wD+F2/Dz/oYf/JK4/8AjdH/AAu34ef9DD/5JXH/AMbr0CigDz//AIXb8PP+hh/8krj/AON0f8Lt+Hn/AEMP/klcf/G69AooA8//AOF2/Dz/AKGH/wAkrj/43Viw+L/gTU9RtrCz13zLq6lSGFPsk43OxAUZKYGSR1ruK5/xl/yA7b/sK6b/AOlsNAHQUUUUAc/47/5J54l/7BV1/wCimroK5/x3/wAk88S/9gq6/wDRTV0FABRQeAeM+1c2dW1SbxfFYW8CrbxWTTXMUkijDM4EeSA2OFk4oA6SisrQNYbWNIW+mgS2ZppYtgl3jKSMnUgdduenepb7U5LEyE6bdSwxrvadHhVAMZP35FPH0oA0KK5K28R6mLye+lsXl0CeKOS1n8+2BVycEbhLtZT8pB65JHPFbun6heXl1cR3Gj3VlFGF8uWeSFhLnrgI7EY96ANCiuSk8TTW66jcyzR7Z2lTSIDET5nkxku7EfwllPJwMAc8irF5q2rQ6Hpt/HLZb7qa1Rla3bAErqGx8/YMcUAdLRRXKX2valN4g26TGJtL0zP9psqbmlc/8s4/VkGWbHsvU0AdXRUNpd29/aRXVpMk9vKu5JI2yrD2NTUAef8AhL/kr3xF/wC4Z/6TtXoFef8AhL/kr3xF/wC4Z/6TtXfnO07QCccAnFAC0Vw+l+MPEmra3rGkweHNLS40qREmaTV5Arb13AqRbnIx6gVuprWow+HrnUdQ0V4rq28zfaQTrJuC5wyuwQEEDPQHnpQBt0Vm+H9WGveHtP1ZYTCLy3ScRlt2zcM4zgZqzfG5W2LWssUTryWkhaUY7/KrA5/GgCzRXDarf60nibQI11NVSVpw6Lpk6q2I8jcvmfNjHHpW9pVzqV1qk6z3aPbwIFaP+yprcsx5DLI7kMMcEAH6igDborjde1uW116ytoNR1WJJ5JVkjj0/eF2RlhsJhO7kDPJ4PaqfhrxRe3Ok6PNJc3tzc6hPCLhryyMUaB42YiFgiBhlPVsZoA76isXwpPNc+HopZ5XlkM04Lu2TgTOAM+wAFbVAHn/wS/5JDoX/AG8f+lElegV5/wDBL/kkOhf9vH/pRJXoFABRRRQAUUUUAFFFFABRRRQAUUVR1i6vbLSp7mwtIbu4iUuIZpzCrAcn5grYOOnH4igC9RXD6N4v8T694Wt9fsfDGnPbzxGWOD+13ExAJGMfZ9ueP71Xdc8Ua1YvIdH8LT6rFbqGuXN0kG04DFUDAl2AOT0HbOeAAdXRWdoGt2niPQrPV7Ev9muo96Bxhl7EEeoII/CjUZL+KVTbXUEUZGNr2Uk7E/VHGB+FAGjRXC6RqOstrniFX1IOkNxGFVtLuHCjyUJCqJPl5J47nnvXTaRcXcmkfa76484vukTZYSWzonZTE7M24fr6UAalFeZ6t4ovrW41CK31fV9sElmiFtMGQJZNr5zD1A+76n16Voalr92dG1C2tri8CwaWs6XN1btb3Rk8xkJYbUx93PCjrQB3lFRXETzQNHHcSQMekkYUsP8AvoEfpXIWt/eND4iurrX7xLTSrh41ZY4ASqRqzFv3fJ3FhxjpQB2lFZHhhtUfw1YSazKJdQkiEkxEYTBbnaQOMgHHbp0qvZXVw3jnV7V7iQ20VlbSJCcbVZmlDEd+do/KgDforlU1pNP8QeJbm/vXWwtIbZlQnKqWVs7R1JY4GB1OK0011U8Lvrl/Zz6ekdu08kFzgPGACcHBODx0689jQBr0Vwuk63f2GnaBBd6lazS6nDJdy3Fw2RCmN5wdwDAF1UDjjnPFSXXiWedLC3tr1ZZU1CzSW9tUVYLiOXJ+Qb3OMdcn6H0AO2ooooAKKKKACiiigAooooAKKKKACuf8Zf8AIDtv+wrpv/pbDXQVz/jL/kB23/YV03/0thoA6CiiigDn/Hf/ACTzxL/2Crr/ANFNXQVz/jv/AJJ54l/7BV1/6KaugoAr3wuzasLExCfIwZASMd/xriL+7bT4Wg0u6hbUP7WtY9QmW73zMzsow/7vABU4wBgDoBXcXcM1xAYobk25bhpFUFgP9nPAPuQfpXO6h4WnK6VZaVJZ22mW94l1dJJE7TSMrb9wfdyxYDJYEnJOfUAzLbw3qQurVNN1qV9Nh1Bp7i1F5FtjO8uVGLbefmP3WcccZrqdU0aPWQIL6QvYcFrVRhZT/tn+Jeny8A98jior3w7aXeuWesxvJbX1s2Hkgbb58eD+7kHRl5yM9COMVbu01KZjFayW9vGcfv2Bkf3AXgA+hJP0NAHMXeqXWqy2fhuym8jUI5wNSKRqfKt05J2sCuJMqAMdGP8AdNbWl+H7XQ9MvbGGe6exlZ3jgLk/Z0K4MceOQvUgDpnAqpN4OhQm707Ub2z1c8vqG4SPP7Sqw2uvouBt/h21Y0218T4u4dW1PTXQx7beextGjkDY+8wd3XI9MEUAcxo1tbvoeo38Gn6lFD9hlt7T7aJAbeEKeD5x3ktgEkAjAUZ4zT5tOsIfDugTQ6FFbzfabD/SFhiB5dM8qc81uSeFJf7PeFdTkuruVGWS71FWnIypGURWRIzz/CBTbjw9rM+lWVh/a9gq2rwOr/2e+SYiCM/vu+2gDb1C0kvIvK+1ywQkHzPI+V2HoH6qPpg+hFc9ol4ZNFtZNJ07V0sHTdCEFmowe+C2fz5rpLOK7jsI4724iuLoLiSWKIxKx9QpZsfmazPD+hXWkaBY6fJqUpe3iCN5aptyPTK5x9aAMTwnodjNdyaxZ3et200V1PFdQzyxIl1IGwWeOMbCQeAygE45zXb1k+H9Jl0ezuYZphM0t5PcBgOzuWAPA55rWoA8/wDCX/JXviL/ANwz/wBJ2r0CvP8Awl/yV74i/wDcM/8ASdq78gMpBzgjHBxQB5doulXep/EXx8lrrl/pv722U/ZUhIfMPU+ZGx4/2SK7y9ga18IXNu7b3isGRm9SIyM1U0nwToWh6tNqlhDeR3k5zNI+oXEnmnGMuHchiO2QcVq6pplrrGny2N4JjbyjDrFO8JYem5CDj1GeaAMb4ef8k58O/wDYPh/9AFaesCwS3WfULqa3iQ4BiuZItxPQYQgsT2HJ9KXRNC0/w7pqafpkc0don3I5LiSbYPRS7EgcdBxV4wxNMsxiQyqCquVG4A9QDQB5pBatrM8nihRqqafpk0kMNi13P57AEpNI2Xyrf3UB6LzycDptC0n7XdJrUtxI8BG+wjTULiUKjDkuTIUcnjjaQOxPWrGjeFl0u6up5dRursS3UtzFC5CRwl23EbVxuOT1bOO2Kfb+E7Cy1s6nYzXtoHLNLZwXBW2lc9XMfTd7jGe+aAFuLYvrov7zeBDC8NrFHE0mN2N7sVBGTgADsM+uBzuj3TQeEFtfspe60KUwQO1jNceY0a7d4RQCpIJGMkjPeutl067kld11q+jViSERIMKPQZjJ/M1Us/Dktj9o8jXdTHnzNO+Vtz8zdf8All7UASeFrKew8NWcF06NcFWlkKIyKGdi5ADfMAC2OcHjmtiqemWMun2nkS6hd37b2bzrrZv5OcfIqjA7cVcoA8/+CX/JIdC/7eP/AEokr0CvP/gl/wAkh0L/ALeP/SiSvQKACiiigAooooAKKKKACiiigAqrqX/ILu/+uL/+gmrVU9T0y21jT5bG88428ow4hneFiPTchBx6jPNAHnfwv0O9uPAPhe9XXr7yIv3psWSEQ4DMMZEYfvnljzXfatdyrEbKy2tf3CkRAjIjHQyN/sjP4ngdaj0Dw3pfhixNlpEU0NrnKxPdSyqn+6HY7evbFZuq/D3w1rWpy6lqFncy3coAdxqFwgwOgAVwAPYDuaANfQtMtNE0W10qxbMFmgiHOTkdSfc5z+NYvivUNJ0O1ur25fUri5WIzfZLS9mDbQOu1WAReOWOB+PFbukaPYaDpkWnabB5NrFkqhdnOSSSSzEkkknqah1rRItW0HUtMjcWn26J0eaOMEgsMbiO5oA4220e48PyeZfz3N1e6wwIkGozRQx3GMLGW3Z27cAEgsdp7kCuu0TR30aykeWWW6vpgGnfz5WV3Ax8qyyPt4wOD2p0Ph6z/syWyvzJqQnTZO96Q/mD/d4VR7KAM89abo/h6PRLa4gttR1KVJSfL+1XJnMAxwqb88D3z+VAGDrOntHoWqTTNI+oPcx382yCQp+5KusStjptQLu9STjtUeuvca7ptmbG3WCfVoooLhn0+4l8uMnef3qgAAZbG4AEkciuiuNEubq1lt5de1IxyoUbCW44Iwf+WVRf8I7crpq2MXiPVoY1jEavGLcOoAxwfK68UAaeo38Ol6dcX1wSIoULHHJPoAO5JwAPU1xwtrXw94YjuPEkMTWV7ubVUlTeqSSOXGR3AZin/fPpXU3elvdfZma53vbYaPzo9ylx/GyqVyfToATnHTDf7BtZrkXOoM+oTLnZ9pwUjByDtQAKOCRnBbBwSaAM7wnosdiL3VWso7OfUnV/s8aBRDEoxGhA43Yyx92I7VDFZ2l34+1xby3gmj/s60BEyBhgtNnr2q9pfhptG1DfY6tfJpm07dMcrJEh7bGYF1Uc/KGwO2BxT7jwppN3r7azdQPPctGkflyyFohsJKt5f3dw3HkjjtjnIBj6Dp+mSeMdYe2ggNvbRWf2VYseVGNjgFVHy8DgHHHOOtbmrRW2q6Lch8vFH5hKHozJkYPqAwz+AqC88NNNq8+pWWt6lps1xGiTLaiBlk2Z2kiWJ8HkjjFS6V4fj0nRrnTkvry6Nw8sjz3bKzlpCSxwoUAZJ4AAoA4gWupp4U0WWzmia41PTYdMiiP3o0aMHepx1HzM3bAHcDNrULL7DrCwxwSR20eq6ZFCzKQrBUx8p744Fddo/h+30mC0Bke4ntbZLWOWQD5EUAYUds4BPc8c4AwzV9Bl1bUtOuDqlxFbWlwtw1oscZSVlzt+bbuHOD19sUAbVFFFABRRRQAUUUUAFFFFABRRRQAVz/jL/kB23/YV03/0throK5/xl/yA7b/sK6b/AOlsNAHQUUUUAc/47/5J54l/7BV1/wCimroK5/x3/wAk88S/9gq6/wDRTVz/APwlvxD/AOiYf+V+3/woA9Aorz//AIS34h/9Ew/8r9v/AIUf8Jb8Q/8AomH/AJX7f/CgD0CivP8A/hLfiH/0TD/yv2/+FH/CW/EP/omH/lft/wDCgD0CivP/APhLfiH/ANEw/wDK/b/4Uf8ACW/EP/omH/lft/8ACgD0CivP/wDhLfiH/wBEw/8AK/b/AOFH/CW/EP8A6Jh/5X7f/CgD0CivP/8AhLfiH/0TD/yv2/8AhR/wlvxD/wCiYf8Alft/8KAPQKK8/wD+Et+If/RMP/K/b/4Uf8Jb8Q/+iYf+V+3/AMKADwl/yV74i/8AcM/9J2r0CvD/AA74i8ZQ/Efxpc23gT7RfT/Yftdn/a8KfZdsJCfORh9w546dDXYf8Jb8Q/8AomH/AJX7f/CgD0CivP8A/hLfiH/0TD/yv2/+FH/CW/EP/omH/lft/wDCgD0CivP/APhLfiH/ANEw/wDK/b/4Uf8ACW/EP/omH/lft/8ACgD0CivP/wDhLfiH/wBEw/8AK/b/AOFH/CW/EP8A6Jh/5X7f/CgD0CivP/8AhLfiH/0TD/yv2/8AhR/wlvxD/wCiYf8Alft/8KAPQKK8/wD+Et+If/RMP/K/b/4Uf8Jb8Q/+iYf+V+3/AMKAD4Jf8kh0L/t4/wDSiSvQK8P+FviLxlY/DjSbbSfAn9qWKed5d5/a8MHmZmcn5GGRgkjnrjPeuw/4S34h/wDRMP8Ayv2/+FAHoFFef/8ACW/EP/omH/lft/8ACj/hLfiH/wBEw/8AK/b/AOFAHoFFef8A/CW/EP8A6Jh/5X7f/Cj/AIS34h/9Ew/8r9v/AIUAegUV5/8A8Jb8Q/8AomH/AJX7f/Cj/hLfiH/0TD/yv2/+FAHoFFef/wDCW/EP/omH/lft/wDCj/hLfiH/ANEw/wDK/b/4UAegUV5//wAJb8Q/+iYf+V+3/wAKP+Et+If/AETD/wAr9v8A4UAegUV5/wD8Jb8Q/wDomH/lft/8KP8AhLfiH/0TD/yv2/8AhQB6BRXn/wDwlvxD/wCiYf8Alft/8KP+Et+If/RMP/K/b/4UAegUV5//AMJb8Q/+iYf+V+3/AMKP+Et+If8A0TD/AMr9v/hQB6BRXn//AAlvxD/6Jh/5X7f/AAo/4S34h/8ARMP/ACv2/wDhQB6BRXn/APwlvxD/AOiYf+V+3/wo/wCEt+If/RMP/K/b/wCFAHoFFef/APCW/EP/AKJh/wCV+3/wo/4S34h/9Ew/8r9v/hQB6BRXn/8AwlvxD/6Jh/5X7f8Awo/4S34h/wDRMP8Ayv2/+FAHoFFef/8ACW/EP/omH/lft/8ACj/hLfiH/wBEw/8AK/b/AOFAHoFFef8A/CW/EP8A6Jh/5X7f/Cj/AIS34h/9Ew/8r9v/AIUAegUV5/8A8Jb8Q/8AomH/AJX7f/Cj/hLfiH/0TD/yv2/+FAHoFFef/wDCW/EP/omH/lft/wDCj/hLfiH/ANEw/wDK/b/4UAegUV5//wAJb8Q/+iYf+V+3/wAKP+Et+If/AETD/wAr9v8A4UAegUV5/wD8Jb8Q/wDomH/lft/8KP8AhLfiH/0TD/yv2/8AhQB6BXP+Mv8AkB23/YV03/0thrn/APhLfiH/ANEw/wDK/b/4Vn6v4i8ZX0en22reBP7LsX1XT/MvP7Xhn8vF3ER8ijJyQBx0zntQB6hRRRQBz/jv/knniX/sFXX/AKKaugrn/Hf/ACTzxL/2Crr/ANFNXQUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAef8AhL/kr3xF/wC4Z/6TtXoFef8AhL/kr3xF/wC4Z/6TtXoFABRTJJooigkkRDI21AzAbj1wPU8GkFxC1w9us0ZmRQzRhhuUHoSOuDg/lQBJRRTIpopgxikSQKxRijA4YcEH3FAD6KKRmVFLMQqgZJJwAKAFopsUsc0SSxOskbgMrqchgehB706gAooooA8/+CX/ACSHQv8At4/9KJK9Arz/AOCX/JIdC/7eP/SiSvQKACioxPCzSqssZaLiQBhlOM8+nHNLDNFcQpNBKksTjcjowZWHqCOtAD6KZLNFAgaaRI1LBQXYAEk4A57k8U+gAooqN54o5I43lRXkJEaswBcgZIA78UASUUUUAFFFRw3ENzH5kE0cqZK7o2DDIOCMj0NAElFMjljlDGORXCsVbac4I6g+9EsscETyyyLHGgLM7nAUDqSewoAfRUTXECiItNGBKcR5YfOcZwPXjmpaACio3nijkjjeVFeQkRqzAFyBkgDvxUlABRRRQAUUx5oo5I43kRXkJCKzAFiBk4Hfin0AFFIzKilmIVQMkk4AFJFLHNEksTrJG4DK6nIYHoQe9ADqKKKACiiigAooooAKKKKACiiigAooooAKKKKACuf8Zf8AIDtv+wrpv/pbDXQVz/jL/kB23/YV03/0thoA6CiiigDn/Hf/ACTzxL/2Crr/ANFNXQVz/jv/AJJ54l/7BV1/6KaugoAKKKKAOc8fAN4D1nrxbEjHqMGsrWtM06O70IR+HIoxJfBXAhgHmDypDtODyMgHn0rp9e0ldd0O70t5mhS5TY0iDJAyM4rI8QWEKX/h4b7jnUQObmT/AJ4y/wC1QBWsLO1tfiOottNWxH9kuSiIiBj5q84Q4P410g1azF1dW0kohltkEkgl+UeXj74J4K9RnsRzUUWiW0Otf2qklwZ/s5ttryl12lg2fmyc5HrWbrXh6fxFehrl0toLM7rQqodnk4O58j7mRjZ3xknpgA2bea21fThJ5Re2nU4WaPG9fUqex689jXH+IrXT5r9fDfh/SNMGrTIHnuWs0ZLGE8eY3HLnnavc8ngV0l/qN/p3hW81CazV7+2tpJDBAS6uyg4298HGfXmuZ8J694P0XSA0/i3RJtSuz9ovrh7+IPLMw5zlsgDoB2AAoA6rw/oVr4b0S30qyed4YRw08pdmJ5JJPTJ5wMD0FadcpdePvDzalpNnp+uWN7Ld3YhaKymWdtpRjkhMkDcF5rq6ACiiigDz/wAJf8le+Iv/AHDP/Sdq9Arz/wAJf8le+Iv/AHDP/Sdq9AoA8r1HXvtutTyia/ls7LW0kjmjt2Mcca25RgjMuwt5hI25zk9KkN7a/wDCRSxatN4gWLUdLgKoLCQ3NwqPKHEggjzHjeucBTyPcVqeNJLubxNpNnaWVhNKwIErSStPErcM2xY2VV4X53yMnGKzhMdH0ddbsXstJuTNJFNNdo00VyUkZNks2AYlJBKnhVJAGelAHSr4gNl4NS+j02/hbcbe2t3s5mkHzFEZowC4XADHIzj34ql4biklL6fo889tplrk3N8YQk11dscyfLIh4GTuOOpwOhrf8QTuvh6eWDVrPTGZVxe3GGjjBIyfvL2zg5FZejavo2nRR2/9uLJDsBjMqpBBj+9GSAXBPcM/PU0AJ4bTUtXtItQutcvswXlxGYUSBY5VSR4wG/d56AHgjmq/jLULi9ubTw1bWt40Oos6XU8BVT5aruaNCzKNzDgnPAJ74qPwf4k0O10Hy59YsI3l1G6RFa4QFi1w+0AZ75FaHiCNJfFvhdHZlBkucbXKH/UnuCDQBi29r5et29vp2n6/aWejKrPaR3ylXJU7FYNMV2BcnA6kjpjntNI1JNY0i01KKGWGO6iWVElxuAIyM4JH61EuhWMc9xOguVluABK4upctgYH8XYVBokllYSHw3bT720y2hAWRwZNhBAJx/u+goA2aKKKAPP8A4Jf8kh0L/t4/9KJK6LxpqR0vwfqlwk7wzm3dLd4wd3mkEIFxzktgD3rnfgl/ySHQv+3j/wBKJK78khSRjOO5xQB5tpmoPL4h1BUGsrJfyxOiJZ7Q6iBUJmEibkTcCM/Lkjg1D4U1SxGlaBJHDrd/qVskVlsWwuVt7bokuG2iM4wcszE8HB7VUtDNey3c1xpNh9gfUY4itndTeVM0rgFvMaIb8EnIRgvUEGus0C7ksfEkuhLe2K2iQF4tPNv9nmtsEACMdJIsE/MM4Ixk9gCHxNq9hJrCwX9veva6WyXHlrZSsl1cH/VIH27DgkEDPLFfQ1Jfy6/Z6fpNxdanJb3l5ewwXEECRNHEHPIQshJI9STT9cmi/wCEli+1eIreBYod1vYQQCW6D87pFX5s8HH+rOBnkZOaniLxBpE1nom3VrZymq2zMZJ4w2A3LEA8fkMegoA6qztZNLguHudTvL4M5k3XCxkoMfdURovHtgmuGE3/AAkGs32vapo+qtBpDyW9pFBOkXkYUGSQ4lVi7AjjsBjrmu6sNa0vVJp4dP1G1u5LfHmrBMrlM9M4PGa5/wAO2Ftft4ljnMrK+qzo6JO6ggonGFI7GgCv4cvZtLa3a7t9albW7kGE3FxHLFAPLLKq5lLBQq8nqTzgdK7asW50Owt47O633EaaWTNEpuGZeI2TB3E8bWPp9a0NMv4dU0u1v7eRZIbiJZUZDkEEZoA5zxTHr8euaZeWOoFdKjDLc2CQyFp3/hO+NGZQP6d88c/oM2p22nNClheWV1uuDFK/21lRWmLMTGYdhO05XOST6ZNaPxF1DVVS20uDRDc6ZdGM3F+ZQFgYSptUqQc54H498Gs/UbQ6TqOtjT44re9k0mKK3NnsVvMeZ1XBVE5zj8qANeN431Bl0zWtWS6lu4heFtKHOAOHIgG0lQBkkYBz6Vb8X3Fmttd6bMt4ZbvTrqYNHMQirGgByNw5O4Y4PvUXhtl1LW9bubTUp1ijvYt6IEw5ECAq+5SwOeoBBBFT+KrRbjUtJjCIHvfP095W3ExxSRM7bQCBkmNeTnFAGJe3sE2q6LELS8eztoort5ft4QpK6lYov3jgEkFjwc8D1rqNEgjtLW7v5bDULCWeQvNDeXZuW44BUCR1GRjhfpiuUtdVN1oMdkLCxFvfaXc3UkcsbSAiLbHtbLfNkEc8YAxXX+FmT/hFdJRWXctlDlVJO3KAgckn8zQBxwm/4SDWb7XtU0fVWg0h5Le0ignSLyMKDJIcSqxdgRx2Ax1zWl4cvZtLa3a7t9albW7kGE3FxHLFAPLLKq5lLBQq8nqTzgdKseHbC2v28SxzmVlfVZ0dEndQQUTjCkdjWpc6HYW8dndb7iNNLJmiU3DMvEbJg7ieNrH0+tAG1XMeJI/ElvqMWraZqcEel2dpPJc2MkAYzyBSU+bqBnHQjp3zxu6Zfw6ppdrf28iyQ3ESyoyHIIIzXPeLNX1a0nNjBorXGlz2Nw9zqAlAFuVRsAr3zx+ftQAy00vU9cfSvEF1d6a0q2qyW8TWDssDSAFmH73lsYGfTPqauJf6xB4vstLubiymtp7OadjFbNGwKNGoAJkYfxntVHw9f+Fl8NaUJbvRxILOEMGkiznYM596bBcaTP8AEXT/AOy5rKQDTLnf9lZTj95DjO2gBPGWoXF7c2nhq2tbxodRZ0up4Cqny1Xc0aFmUbmHBOeAT3xVG3tfL1u3t9O0/X7Sz0ZVZ7SO+Uq5KnYrBpiuwLk4HUkdMc7XiCNJfFvhdHZlBkucbXKHPknuCDWquhWMc9xOguVluABK4upctgYH8XYUAR2/iPTn8O22uXk6adZTxpIGvZUj2Bvuhju2gnI71V/4Tvwf/wBDXof/AIMYf/iqZZxW6QP4V0/Vbm0m023gAliMTzhDkDIdWXnbj7tP/wCEe1T/AKHPXP8AvzZf/I9AGVFq1/4r8Q6xY6PrZ0+10xIQkttFFKbiSRN4Yl1YGMDH3cE8/NWn4J8QzeJfDiXd3EkV7DNJa3SR/dEsbFWI9jjP41zuvx6ZpevTXWkanqM3iqWBIZrKweNnu8D5GnXYVjH+38mATg9BXReB/Dknhbwpa6bPKJrvLTXMgJIaV2LNgnkjJx+FAD/FFh4kvo7AeHNYg0147lWuWmgEoki7qAR1/LPqKy/DV1rsfjDU9Ku9YXWtOggST7UYI42t5if9SdgAJ2/N0yMjPUZt+OPFVx4R0+zv10z7XZPdJFeSmTaLaNjjeeDkVh6Fo+ir8QYNX8HC3TTJLKRdQawI+zSPuXywNvylx85OOQOvXkA9ErzbXNV8W+FPB+uG41a31HWAJru3lWBUW0th0LDGCc8AHOSe4Br0mvFtcHjm68EeM73VLTTNPt5PPVo5oHeeWFRhdriTaABwPlx1ODk0AexWUjzWFvLIcu8Ssx9SQKnrL8OLqC6BZjU5baS58sZa2jZE2444ZmOcdea1KACiiigAooooAK5/xl/yA7b/ALCum/8ApbDXQVz/AIy/5Adt/wBhXTf/AEthoA6CiiigDn/Hf/JPPEv/AGCrr/0U1dBXP+O/+SeeJf8AsFXX/opq6CgAooooAKr3NjbXkttJcRB3tpfOhJJ+V9pXP5MevrViigAooooAKKKKACiiigAooooA8/8ACX/JXviL/wBwz/0navQK8/8ACX/JXviL/wBwz/0navQKAKn9mWPkTQG0haOc5mVkB809Mtn7x9zUdnoum2GjLpFtZxJp6xmMW+MrtPUHPXOT1q/RQBWTT7NLCGxFtGbWFVWOJl3KoXG3r6YH5VZwM5oooAKp6lpGm6zAsGqadaX0KtvWO6hWVQ3TIDA881cooA5//hBPB/8A0Kmh/wDguh/+JrR0zRNJ0VZF0rS7KwWQguLW3SIMR0ztAzV+igAooooA8/8Agl/ySHQv+3j/ANKJK7q5tYLyEw3MSyxH70bjKt7EdCPY1wvwS/5JDoX/AG8f+lElegUAZ97oel6jc2dzd2MEs1lIJLd2XmNh0x/h0/Kp59PtLm8trya3je5tSxglI+ZNwwcH3FWaKAI1ghWd51ijEzgK8gUbmA6AnvjJ/OpAMDAoooAKx73wl4b1K7e7vvD2k3VzJjfNPZRu7cY5YjJ4rYooA5//AIQTwf8A9Cpof/guh/8Aia3Yoo4IUhhjSOJFCoiDAUDoAB0FPooAgu7O3vrfyLmMSRblfaScZVgw/UA1Vi0DSYdUl1OLT7dL2Zg0kyoAzsBgE+pAJ59z61o0UAZN94X0HU7+O/vtHsp7yMgrPJCpfjplsZIHoeKluPD+i3dwZ7nSLCaYtu8yW2RmzjGckelaNFAGOPCfhxQAPD+lABSoxZx8A9R06VasNF0rSmkbTtMs7NpQBIbeBYy4HAztAzjtV6igDHvfCXhvUrt7u+8PaTdXMmN809lG7txjliMniq//AAgng/8A6FTQ/wDwXQ//ABNdBRQAyKKOCFIYY0jiRQqIgwFA6AAdBTbm3iu7Wa2nTfDMjRyLkjKkYI49qlooAjt4IrW2it4ECQxIERR/CoGAPypjWdu99HetEpuY42iSTuFYgkfiVH5VPRQBT1LSNN1mBYNU060voVbesd1CsqhumQGB55rL/wCEE8H/APQqaH/4Lof/AImugooAoaZomk6Ksi6VpdlYLIQXFrbpEGI6Z2gZq/RRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVz/jL/AJAdt/2FdN/9LYa6Cuf8Zf8AIDtv+wrpv/pbDQB0FFFFAHP+O/8AknniX/sFXX/opqP+Ee1T/oc9c/782X/yPR47/wCSeeJf+wVdf+imroKAOf8A+Ee1T/oc9c/782X/AMj0f8I9qn/Q565/35sv/keugooA5/8A4R7VP+hz1z/vzZf/ACPR/wAI9qn/AEOeuf8Afmy/+R66CigDn/8AhHtU/wChz1z/AL82X/yPR/wj2qf9Dnrn/fmy/wDkeugooA5//hHtU/6HPXP+/Nl/8j0f8I9qn/Q565/35sv/AJHroKKAOf8A+Ee1T/oc9c/782X/AMj0f8I9qn/Q565/35sv/keugooA5/8A4R7VP+hz1z/vzZf/ACPR/wAI9qn/AEOeuf8Afmy/+R66CigDyfwxo1/J8UvHsCeJtViki/s/fOkdqXmzAxG4GEqMdBtC++TzXcf8I9qn/Q565/35sv8A5Hrn/CX/ACV74i/9wz/0navQKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDn/+Ee1T/oc9c/782X/yPR/wj2qf9Dnrn/fmy/8AkeugooA5/wD4R7VP+hz1z/vzZf8AyPR/wj2qf9Dnrn/fmy/+R66CigDn/wDhHtU/6HPXP+/Nl/8AI9H/AAj2qf8AQ565/wB+bL/5HroKKAOf/wCEe1T/AKHPXP8AvzZf/I9H/CPap/0Oeuf9+bL/AOR66CigDyf4QaNf3fwt0aeHxNqtlG3n4ggjtSiYnkHBeFm568k9fTiu4/4R7VP+hz1z/vzZf/I9c/8ABL/kkOhf9vH/AKUSV6BQBz//AAj2qf8AQ565/wB+bL/5Ho/4R7VP+hz1z/vzZf8AyPXQUUAc/wD8I9qn/Q565/35sv8A5Ho/4R7VP+hz1z/vzZf/ACPXQUUAc/8A8I9qn/Q565/35sv/AJHo/wCEe1T/AKHPXP8AvzZf/I9dBRQBz/8Awj2qf9Dnrn/fmy/+R6P+Ee1T/oc9c/782X/yPXQUUAc//wAI9qn/AEOeuf8Afmy/+R6P+Ee1T/oc9c/782X/AMj10FFAHP8A/CPap/0Oeuf9+bL/AOR6P+Ee1T/oc9c/782X/wAj10FFAHP/APCPap/0Oeuf9+bL/wCR6P8AhHtU/wChz1z/AL82X/yPXQUUAc//AMI9qn/Q565/35sv/kej/hHtU/6HPXP+/Nl/8j10FFAHP/8ACPap/wBDnrn/AH5sv/kej/hHtU/6HPXP+/Nl/wDI9dBRQBz/APwj2qf9Dnrn/fmy/wDkej/hHtU/6HPXP+/Nl/8AI9dBRQBz/wDwj2qf9Dnrn/fmy/8Akej/AIR7VP8Aoc9c/wC/Nl/8j10FFAHP/wDCPap/0Oeuf9+bL/5Ho/4R7VP+hz1z/vzZf/I9dBRQBz//AAj2qf8AQ565/wB+bL/5Ho/4R7VP+hz1z/vzZf8AyPXQUUAc/wD8I9qn/Q565/35sv8A5Ho/4R7VP+hz1z/vzZf/ACPXQUUAc/8A8I9qn/Q565/35sv/AJHo/wCEe1T/AKHPXP8AvzZf/I9dBRQBz/8Awj2qf9Dnrn/fmy/+R6P+Ee1T/oc9c/782X/yPXQUUAc//wAI9qn/AEOeuf8Afmy/+R6P+Ee1T/oc9c/782X/AMj10FFAHP8A/CPap/0Oeuf9+bL/AOR6P+Ee1T/oc9c/782X/wAj10FFAHP/APCPap/0Oeuf9+bL/wCR6x/EmjX9pp9nPN4m1W9jXVdOzBPHahHzeQjkpCrcdeCOnpxXcVz/AIy/5Adt/wBhXTf/AEthoA6CiiigDn/Hf/JPPEv/AGCrr/0U1dBXP+O/+SeeJf8AsFXX/opq6CgAooooAiubhLWBppBIUXqI42kb/vlQSfyrNuPE2m2tvJcXAvooYlLvJJp86qqjqSSnArXJABJOAOprhwv/AAsO/YuD/wAIpaS4Veg1OVTyT6wqR0/iI9ByAdfp+oWmrafBf2E6T2s6B4pU6MDVmkVVRQqqFUDAAGABWLqPiEaNeNFqFs4imIFlJAC5nfH+qx2fPTsR3GDQBrzTJAm9w5GcfIhY/kATVSbWLK2VWnaaJWcIpeCRQWJwAMr1J4AqjrWoajZeCdS1FljttQhs5ZlVCHEbBSVGSMEjjPGKxvFjlbHQkuNSmDT38EhZljARY/3jucLwAFPJ4GeaAOkudbt7aa2jNrqEhuJREDFYysEz/E52/KvufWtKubvrm8g8SeHoINTme1u3mMqlYyJFWIsvIXPXng10lABRRRQB5/4S/wCSvfEX/uGf+k7V6BXn/hL/AJK98Rf+4Z/6TtXoFAGfd6zZ2dxbQPJvkuLkWoWPDFHKlwG544H8qin8RadaXd9BdTeQtjbpcTzSECNUcsBznr8h/SvP9Wh1WLXpZLrS7VDdan9ttreSUyvMI4RDhgq7AvIbl92P4SeKl0b7a/iYSaToejXuyxijkKSSW1rZyxvJ8sRMLbj8/YAjBzjNAHpkE8dzbxzwtuikUOjYxkHkVV0nVrbWbWS5tBJ5KTSQhnTaHKMVJX1XIODWRcR+JU8JvEw09tUkkbzCLp0jiiZyTiQoTkIcZ29eccYqroek/wBrFLvULKCLTIYRb6fp3+siCDrMQyjk9F4GF5/ioA61nVSoZgCxwoJ6nrxUGo6hbaVptzqF5KIra2jaWRz2UDJrlvBeiaTNpS3kul2T3UF/d+VO1uhePE7gbWxkYAAGOwqPxf8AbLrxDodjPcWdvpcs7uUuELiV403qXAZflB6LnkgE9MUAbmn+LNC1OCzkg1O1WS8C+VBJMqykkZ27c53e1bVcIZ5dR8S3Mt1qmiyPpSJ9mZ7YlQzqSzKPO4bgDPPHTGTnp/Dd/car4a03ULoxGe5t0lfyVKplhngEk9/WgDUooooA8/8Agl/ySHQv+3j/ANKJK72WWOCJ5ZXWONAWZ3OAo9Se1cF8Ev8AkkOhf9vH/pRJXS+L7a+vvCmo2OnWgubm7ga3VDIEC7wV3EnsM5Pf0zQBbg1i1ubjUII95axZVlOOCSgcbT34IqGx8SaXfrpoS4CTajB9ot4JP9YUxnJAzjrXn1rcGLVry7vrXSFi+0IJ7iVJJTbOkYh2wkxqS+R6AfNgFq1PCNt4mTw3pcFtoumafEjQrNczXcgnmjjIBZovJGCyrwGfIzg9MUAdrqmrW2kRW73AkY3FwlvEkSbmZ2OBx6Dkn0AJq9XHa7LrcfiFZINPsbg7PK0zddNuSRh+8lZPLxhQQCd3Tgctiq2teHbHT9N0OOSKO7uW1O2juLuaNTJcZb5t5xyD6UAdwrq+drA7Tg4OcH0rJ1XxPpOi6nYaff3Swz32/wArcQFAUZLMT0HQZ9TVq10yx0i3nGlabaWxkYyNHBGsQkf1bA6+/NcPpl1f21x4l1e51TSv7RhnkhIlgYny41DLGv70YXJPbkkk+wB3dlqmn6mZfsF9bXXksFk8iVX2EjIBweOKt1wWj3U2myaKLe90mV9Yud94Utz5zsYnkLFvNOTlQOmAOAAABXe0AJkZxkZPaqWk6tbazayXNoJPJSaSEM6bQ5RipK+q5Bwa53xj4U/tO/stfso1OrWKNFG0t40EaRPw7EhW+YAnHHfJzgCl0PSf7WKXeoWUEWmQwi30/Tv9ZEEHWYhlHJ6LwMLz/FQB1rOqlQzAFjhQT1PXioNR1C20rTbnULyURW1tG0sjnsoGTXLeC9E0mbSlvJdLsnuoL+78qdrdC8eJ3A2tjIwAAMdhUfi/7ZdeIdDsZ7izt9LlndylwhcSvGm9S4DL8oPRc8kAnpigDc0/xZoWpwWckGp2qyXgXyoJJlWUkjO3bnO72rarhDPLqPiW5lutU0WR9KRPszPbEqGdSWZR53DcAZ546Yyc9P4bv7jVfDWm6hdGIz3Nukr+SpVMsM8Aknv60AahOBk9KjnuIra2kuJnCQxIXdyeAoGSaq6zpNrrujXelXoc213EYpNjbWwfQ1xllolhba7e+HJn1GTSLPTbRLe3jnn2gZkB3eWec7V6+lAHbaXqEWraXbX8Mc8cVxGJFSeMxuAfVTyKt1xviSCztvC+rT282tRzx2crxv8AabwbWCEg8titS9mv7bwaJNPkX7SlnuE9wS+3CZ3EdWP1P1NACr4w0L+2r7SpNQghuLLZ5xmdUXLDO0EnkgYyO2RWvaXdtf2sd1Z3EVxbyjdHLE4ZWHqCODXnNtLLZ+DNKs4dX0sR6m0S3J8pvNJlG6RmfzcljyCeOvGOK6Xw9dyx6zc6LHLpjWFnZwvCtjbmIKWZxj77DACD86AOnorCm17Uop5I08JazMqsQJElswrj1G6cHB9wD7VzXjnxFfp4aia40rUtIs5NQtoLyaeWHIt2f5yGikfaOACTjhuKAPQqK87Edl4Z+KOh6foMcFvZataTm6s7YBY8oAyS7RwCeRkdffFegTwpcQSQyAlJFKMAccEYPNADwQRkHI9qWvFvF/hTwh4J0KwsLaO/tb4XCG11mQSstlmTJLSqNqj7w2DqTkjktXs8bBo1ZXDggEMOh96AFyM4yMntS1zHiLRdK/tzTvE08U82q2KtBZQxykCV3yApH4nnoBkngcZXgaK6g8ZeM47y6a5uBPal3PQEw5IUdlGcAelAHeUUUUAFFFFABRRRQAUUUUAFc/4y/wCQHbf9hXTf/S2Gugrn/GX/ACA7b/sK6b/6Ww0AdBRRRQBz/jv/AJJ54l/7BV1/6Kaugrn/AB3/AMk88S/9gq6/9FNXQUAFFFFAGF4xstQ1Hwpf2emBjczIE2q4RnQsN6qx4DFdwBPc1XtdYvbK0htbbwRrUUEKCOONZbIBVAwAP9IrpaKAOXj1DXb/AMS6aw8NXdlYRxyi5mvLi3yMhdu1Y5HJ5HfH1rSufD9nqF3PPqIN3vTy4o5PuwLxnZjoxIzu69MYxWtRQBzfia1lt/h5rFs08t1IthMokcDe/wApxnHU4wM96v6fpai4j1G6Yy3IgEUQIwsKHBIA9TgZPfA6AYrVooA4KDT7PSvG+kaVp0d75cU13eMjwv5MCPHjCPjbt3H7oJwWrvaKKACiiigDz/wl/wAle+Iv/cM/9J2r0CvP/CX/ACV74i/9wz/0navQKAOG8TWt/rWqW8lpd6mukwf8fiIFWCRec7U8p3mJyOMbOOuazpILjVvA9rqogv77yXlkt5LV/s11DGHYI8SYVWOwL8h25HrnFelUUAYOtPaar4S8ySz1G9tblI3EFmTHO4JBA4ZSO2eRxnNQaeLnTpd0PhYwJIoLNDLE8ze0jMy/MPZnz610tFAHI+HZdX0jShazeHL9pHvp3JWa2wiSTMwY/veysDgc1P4nlay17w9qL2t5NbW8s4ma1tZJ2TdEQpKxgtjPGcV09FAHPnxjpZGDaa4Qf+oDe/8Axmk8P6st9qF5a2mmXtppttFEtu89k9qhPzblVHCtx8vRcV0NFABRRRQB5/8ABL/kkOhf9vH/AKUSV3V1cx2tu0kpcDoBGhdifRVAJJ9gK4X4Jf8AJIdC/wC3j/0okr0CgDy1bbV9L1O3udQvtVa7vb+GKy+0rHPIImYeaCUh2Q5UMcK/T3FdBY2/9j+O9klpewjUInAmhmMlrcSDDbnU8xygA4xkEdzjA7KigDlNUsILrxLK6+HrvULk2yo0tzPsstuSQpUsctnPSNscZxUOrDVb200qKHw9dL9lv4J2RHt1VY0OSB+95wPYfQV2NFAFGwvrq7mnS40m6skjxsed4mEueuAjsRj3xXNaVrEWhX+uW1/ZasryalJNG0GlXM6OjKmCHjjZT0PftXZ0UAcveeLNJkh8z+zdamnhBeDOgXhKvtIBUmLg8kZyOtbej3E93o1lcXVvLbXEkCNJDKMOjEDIIyec1dooA43xrpGqX91azrd3kuhohS80qxTE10xI27XDKVAOM/MMAHsTV3Txc6dLuh8LGBJFBZoZYnmb2kZmX5h7M+fWulooA5Hw7Lq+kaULWbw5ftI99O5KzW2ESSZmDH972VgcDmp/E8rWWveHtRe1vJra3lnEzWtrJOyboiFJWMFsZ4ziunooA58+MdLIwbTXCD/1Ab3/AOM0nh/VlvtQvLW00y9tNNtoolt3nsntUJ+bcqo4VuPl6LiuhooAo61bX95ot5b6ZeCyvpIisFwUDiNuxwetcjocmq6b4tv7e9hudWu49MsknuoFijDuDLk4ZlxnPb9K7yigDlfFOoXs3hLWIhoWogvZTLkvAcZQ9hIT+QrVlhkm8JvAiEyvYlFTuWKYxWrRQByGheKrGz8P6bbXFjrsc8NrFHIn9h3h2sFAIyIiDyO1OuvFFq91btpmkavNezzwwyOdGuIf3W7ktJIiqFALHk9z611tFAGFN4K8KXM8k8/hnRpZpGLvI9hEzMx5JJK8mkl0XStC0y6GkeFbWUXACTWllbwRecOR824qpAyepPXoa3qKAON8K+DRp2sTa7eWVjZXLReRa2FggWGziJyRkAbnY4LNgdMDjk9dOsjwSJFJ5cjKQj7c7Tjg471JRQB51Y2njK98Jah4Y8Q6e15dziWBdWkkgFu8bZw5RW3ggHgbOSBkjrXe2Folhp1tZxsWS3iSJWbqQoA5/KrFFAHIeJ/CGoeIvE2kXi65c2WmWaSedbWsjwySMwwCHQgjt+XvVLwl4Kn0Pxnr+oyz6m1tK8X2Rp9QeUTjy8MXBYliDwCwyO1d5RQAUUUUAFFFFABRRRQAUUUUAFc/4y/5Adt/2FdN/wDS2Gugrn/GX/IDtv8AsK6b/wClsNAHQUUUUAc/47/5J54l/wCwVdf+imroKjnghureW3uIo5oJUKSRyKGV1IwQQeCCOMVh/wDCCeD/APoVND/8F0P/AMTQB0FFc/8A8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQB0FFc/8A8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQB0FFc/8A8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQB0FFc/8A8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQB0FFc/8A8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQB0FFc/8A8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQBz/hL/kr3xF/7hn/AKTtXoFc/wD8IJ4P/wChU0P/AMF0P/xNH/CCeD/+hU0P/wAF0P8A8TQB0FFc/wD8IJ4P/wChU0P/AMF0P/xNH/CCeD/+hU0P/wAF0P8A8TQB0FFc/wD8IJ4P/wChU0P/AMF0P/xNH/CCeD/+hU0P/wAF0P8A8TQB0FFc/wD8IJ4P/wChU0P/AMF0P/xNH/CCeD/+hU0P/wAF0P8A8TQB0FFc/wD8IJ4P/wChU0P/AMF0P/xNH/CCeD/+hU0P/wAF0P8A8TQB0FFc/wD8IJ4P/wChU0P/AMF0P/xNH/CCeD/+hU0P/wAF0P8A8TQBz/wS/wCSQ6F/28f+lElegVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQUVz/APwgng//AKFTQ/8AwXQ//E0f8IJ4P/6FTQ//AAXQ/wDxNAHQVz/jL/kB23/YV03/ANLYaP8AhBPB/wD0Kmh/+C6H/wCJqSDwX4VtbiK4t/DWjQzxOHjkjsIlZGByCCFyCDzmgDcooooA/9k=']	['bio_79.jpg']
bio_80	MCQ	Human blood type is produced by the interaction of two independently inherited pairs of alleles I, i and H, h. As <image_1>shown in the figure, the ABO blood group of most people is determined by the IA, IB and i genes. When H antigen cannot be produced, the extremely rare Bombay type blood appears. Since there are no A and B antigens on the cell membrane, the phenotype of Bombay type blood is also recorded as Type O. A man with type O blood and a woman with type A blood have given birth to a child with type AB blood. During allogeneic blood transfusion, rejection will occur if the infused antigen is different from the own antigen. The following statement is correct ()	['A. There are 12 possible ways to combine genotypes for this pair of parents', 'B. The genotype of the child with blood type AB must be HhIAiIB', 'C. 2 people with type O blood may have offspring with type A or B blood', 'D. No rejection occurs when blood transfusions between individuals with type O 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bio_81	MCQ_OnlyTxt	Gene A (curled wings) on Drosophila chromosome II is dominant to gene a (normal wings), and gene F (stellate eyes) is dominant to gene f (normal eyes). Both genes A and F are homozygous lethal genes. All Drosophila strain M has curled winged star eyes, and the descendants of fruit flies in this strain also have curled wing star eyes. There is currently a fruit fly of this strain that is mated with a male fly X with normal eyes and normal wings after mutation treatment. A male fly with curling wings is selected from F1 to be crossed with a female fly of strain M, and male and female individuals with curling wings are selected from F2 to mate with each other. Regardless of the exchange during meiosis, the following statement is correct: ()	['A. Strain M of Drosophila, genes A and F are located on the same chromosome, so they do not combine freely', 'B. If all F3 is a curling fruit fly, then a homozygous lethal mutation has occurred on chromosome II of fruit fly X', 'C. If 1/3 of the individuals in F3 are new mutations, a recessive mutation has occurred on chromosome II of Drosophila X', 'D. If three-quarters of F3 individuals are new mutations, a dominant mutation has occurred on chromosome II of Drosophila 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eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMM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bio_82	MCQ_OnlyTxt	Organoids refer to tissue analogues with a certain spatial structure formed by cultured adult stem cells or pluripotent stem cells in vitro. They can simulate real organs in structure and function. A research team used human conjunctival cells to cultivate the first human conjunctival organoid, which has true human conjunctival functions, such as producing tears. The following statement is correct ()	['A. Appropriate amounts of antibiotics and serum can be added during the culture of human conjunctival cells to prevent contamination by miscellaneous bacteria', 'B. Human conjunctival cells can be treated with collagenase to relieve cell contact inhibition', 'C. Human conjunctival cells have always been highly differentiated in the process of cultivating adult conjunctival organoids', 'D. Adult stem cells are tissue specific and can differentiate into induced pluripotent stem cells in 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bio_83	MCQ	PSMA is a membrane protein highly expressed on the surface of certain tumor cells, and CD28 is a receptor on the surface of T cells. The double hybridoma cell formed by fusing two different hybridoma cells can not only grow and reproduce in suspension in culture medium, but also produce the bispecific antibody PSMA× CD28. PSMA× CD28 can not only selectively target and bind to PSMA protein on the surface of certain cancer cells, but also specifically bind to CD28 protein on the surface of T cells, thereby activating T cells and identifying and killing target cancer cells through activated T cells. Figure 1 <image_1>shows the preparation process of bispecific antibody PSMA× CD28, and Figure 2 <image_2>shows the structure and mechanism of action of bispecific antibody PSMA× CD28. The following analysis is correct ()	['A. ① During the process, mice need to be injected with PSMA protein and CD28 protein respectively, so that the bispecific antibody PSMA× CD28 shown in Figure 2, which effectively activates T cells and kills cancer cells, can be finally obtained', 'B. Figure 1 Double hybridoma cells XY can be obtained by performing at least three antigen tests and screening. The last screening requires simultaneous addition of PSMA and CD28 proteins into the wells of a 96-well plate.', 'C. Before subculturing the double hybridoma cells obtained in the ④ process, they need to be treated with trypsin or collagenase', 'D. The obtained hybridoma cells XY were cultured in a CO2 incubator containing a mixed gas of 95% air and 5% 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']	['bio_83_1.jpg', 'bio_83_2.jpg']
bio_84	MCQ_OnlyTxt	Researchers induced vitamin B5-dependent plant cells to fuse with chloroplast-deficient plant cells, and then used selection medium to select hybrid cells. The following related statements are correct ()	['A. Cellulase and pectinase are used to remove the cell wall before inducing fusion', 'B. The process of inducing fusion to produce hybrid cells reflects the totipotency of the cells', 'C. the selection medium require that addition of carbon source, nitrogen source, water and inorganic salt', 'D. Vitamin B5 is not added to the selection medium']	AD	bio	生物技术与工程_细胞工程	['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bio_85	MCQ	<image_1> Cell fusion technology breaks through the limitations of sexual hybridization and makes distant hybridization possible. A research team used mouse A as experimental material to design experiments to develop monoclonal antibodies against virus A. The following statement is incorrect ()	['A. Mice had to be injected with virus A before the experiment in order to get B lymphocytes that could produce specific antibodies', 'B. The spleen taken out of the mouse was cut into pieces with scissors and treated with pepsin to disperse it into individual cells', 'C. Screening 1 A specific selection medium is required to perform screening to obtain fused hybridoma cells', 'D. Screening 2 A sufficient number of hybridoma cells capable of secreting the required antibodies were obtained through one screening using a 96-well plate']	BD	bio	生物技术与工程_细胞工程	['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bio_86	OPEN	When the insulin receptor on a specific neuron in the hypothalamus binds to insulin, a certain kinase and potassium ion channel in the neuron are activated one after another, and finally acts on the liver through the vagus nerve, reducing the production of glucose in the liver and lowering the blood sugar level. The above process is as shown in the figure<image_1>. Answer the following question: After receiving sufficient insulin, a diabetic model mouse still had high blood sugar. According to map analysis, among the possible reasons for persistent hyperglycemia in mice, in addition to insulin receptor dysfunction, there are also ()(only 2 points are needed).		Vagus nerve damage, abnormal potassium channel, etc.	bio	稳态与调节_体液调节	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAFSAjQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigApGZUUsxAA7mobu6is4GllOFH61hy3LaqmJAVt2/h7kUAaj63psZIa8jyO2aiXxBpzMB9oAz3NZtvpGm23MVqufU1NLBAVx5S4+lAGzDeW0/wDqpkb6Gp65EabYrcLKyMhB5Kmsq313VNO16aW7uQ2iqv32/h5oA9DoqtYahaanbLc2c6TRN0ZDkVZoAKKK8jPjPxrceGtb8Q20+jpaabPLGIJLdy7BGx1DYoA9corzy3+ImrLZWz3fhtEllhWT5tUgj3ZGchWOQK57wX8StXfSro3lgL+T7ZKFkl1OCMqu7hcMeQPXpQB7JRWfo19d6jpy3N5p7WMjE4iaVZOOx3LxzWV4s8WN4am0q3h0yXULnUrgwQxRyKnzAZ5LcUAdLRXmsuveNLvxMpPh+aO0tlWRbO31CESMTwfN5OU9OBWr/wAJ1qFrrmlaZqvhi5sf7SmMMUrXUcgDAZ5C0AdrRRXDeNNb8QaDdpNbX9jDZS/LGjafNcOGA5yUPAoA7mivAdY+I3idNa0dY9ahVGlYOselXCKwx/Ep5cewrp9L8Y+KNV1GGyt9V07zZWwPM0a6Qf8AfTHAoA9XopsYcRIJCC+BuKjgnvinUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUyWaOCNpJXVEUZLMcAV5x4i+MujaZcPZaVDLqt6Dt2QLkBvfpQB6VRXjsWpfFbxTGxgsYNEhf7kknJx+tdZ4I8Ja7oMstxrevPqE0mcoB8gPr0BoAt69fGTXotMaMmPyvN3e+algXaOvHYVBriNH4iS4/h8jb+tEVwCBzQBpqRimsRVUT470jy5HWgAuBvjZc4yMVzc11oSQzaDqtw3+nAoFA9fxrckkOKz447KXUopbmOMvG2VZh0oA574U3a6Jr+peFvOJt4y00O/rgnAFewV4v8OLiPVvidrd0YB+6RkVx04avaKACvmqRPDh8F+Kmu9dmg1X7XceVZLfMiv83H7vODmvpR3WNC7sFUckk4Arw+3tbRfhD4vnuLeETNdXRjkkQbj8/GCeaAF1KLVJ9QsEOkmTTxpduY7mPREvWZ9vKknGAK47w7ox1Xw5qFo9reeXLcyo0lv4fWVl+bs+QVPsOlexLrlxceE7DRPD0jPrEtlGBNGAVtMqMO5PGO2Bk+1ZN74XufDkySyzzx6VsEnnWXJsrk/wCsuGB+8Ce3P0oA7XwXrVhrfhq3k04zmG2/0U+fHsbdGApyM8VgfEWK7XWvCOo2+n3d5DY6g0062sRkZV2YzgV03hqx0jTNLW20iSN43Jmcq+S7NyXI7EnmsK90LxVbeOL7XdHuNNktrq1jg8i9eQbCvJIC8c0AZc3i/wAO3/iZXXRPESavZhZZFgsmR2Q8L5gB+ZfQHiqMc1iNZtr250zxZc29lMbmzilsHZopW+8S5bLD0XoK0bXw745tfF9/4iU+H2nvLeO3aItNtUIcgjjOaXSp7rSPGWu6r4l1bT45GsolNramUrGAeGww5z7ZoA6XTdU03x54alltHvIbWV2hYgmGVWU4OCDkc1zOt+EtI0SKN2l8X3hkJAWzvZpSPrg8Vp/C/TbzS/CLxXsDQPJezzIrdSjNlT+IqrrpvdT8Uiz0nxNqsQYATxWUULR2wx95mYZOfbNAHmDyaBp94moeMV8X2WXK2MEkkpMZH8SyFgSSO2OK9A0Hwhba2ZLov4jtdOZQbd59UmWVz3ynYehzzXHr4VGneI9Jh0PxbqF7Hqly8N1LNCkhiK5OQHXjn2rd1vw/rKa3Bbv4w1WC9tyG0+e7jiW3lY9V+Rew9RQB6NoXhm08PvK1td6hOZQAftd282Mem48VtVFbCRbWESuHkCAO46MccmpaACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDL8Q63F4f0efUZo2kWIE7VOCeK5iL4qaI3g4eIJmWLK5Ft5gZ9xHArE+OviFtL8JizhIE07r1/u9DXzVpFjqWqahBZWMUlzJuBEIJI69xQB7lpg8X/ABgu5Li5uJNL8OK+BEuQXHXHv9cV6x4b8EaB4UiVdLsEjkC7TMwBdvqawvANp40sVt7bWrTTrbTY4dqpA/zg9sjaP5131ABRRRQBnavp5vrcBMB1Oc+tc08bWz7CPmHau2qlfabFeocnY+OHA6UAcsZiF5GDTWugibmNXZ/Dt8g/dzLPz/F8v8qpzeH9S3KFgjZT975zx+lAEf22PZu6isDUZ57wSWunqGnmGwEDOz3rpF8I3slwqtIkVsR8wVstXQaT4c07R8m2iO89Xc7j+tAGV4G8HweFdMI4e6nYySyY5yeorq6KKAILyzttQs5bS7hSa3lXbJG4yGHoaoaj4Y0TV7GCx1DS7a5tYP8AVRSJlU4xwPpWtRQBR0nRdN0Kz+yaXZQ2lvuLeXEuBk9TV7rRRQBlaZ4a0XRry4u9N0y3tbi4/wBdJEmC/OefxrVoooAKqXWl2N9c21zdWsUs1q++B3XJjbGMirdFAAQCMHpVXT9MstKtzb2FtHbwly5SMYG4nJP41aooAqRaXYwajNqEVrEl3OoWWYL8zgdATTr/AE+01Sze0vreO4t3+9HIMg1ZooAbGixRrGihUUBVA7AU6iigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKa7pGhd2CqOSSadXnHiXVn8SeLYvDFhcyJbw5N60eQVZSCFz6EUAb8/ime61D7HotoLnb/AKyd/wDVr7e/4VWfS/E15qi3X/CQJb2wzut4V4/UVsxW9rp1itnZReVEowAvFSQqgTIzmgDn73R/En9sxXNr4mkFpj57d1GDz/u1dgu9attXMc81vNZnPODuFach2jNZ8oEmWc4PagDznx74VvfHnjqyhluIrfTIEIZnbAf5s4+tek+HPBPh/wALwhdK0+KN8fNL1Zvfmuc17RLfVLRvl23MQ3xyd8jkVa+HfixtYt59LvcrfWTeUd3VwBkmgDuqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDw3Wfi/q2ifFS50maNX0qCbyNiqMktjBJ68ZrsNJ0RNK8R6xrLzAvqc3nRjH3RtwRXjvxt0STQ/HaamhP8ApzG556ZUj/CvSvDfiOLxT4a0qSOVWvY4cTqOqnP+FAHdx3YLBGI+tPab94FBGKwIpNoYO2Co71Jb3omImB4XjFAG5NJ8pGaz3kDEKTUeo3aNY745QrEisp58QozSfNjr60AXdRvPKKQqPnbjPpXLabeWPh3xNf6mQ8zxwyM/ljgnFXb66WaJoxMqysMKSa5HV9RsvCXhXUbXUZPNv70koVOSARigDpPh18XLvxt4wn0t7KOG28tpI2B+bA9a9dr5x+AWk29pe3Gv3d7awBVMKrJKqk5HXk17/wD25pH/AEFbH/wIT/GgC/RVD+3NJ/6Cll/4EJ/jR/bekn/mKWX/AIEJ/jQAmsa7pegWq3WrXsVpAzbA8pwCfSqWleM/Dmt3RtdN1i1uZ1XcURucevNcp8Wrj/iU6FPbxC7/AOJlEyRow/eewJ4rltSjt9a+Il1NrugJpq2+ktIsV0wdQQfvHyz0oA9X1vxPp+gmyF0Wf7XOII/LwcMfXnpWuJoicCRCfZhXy34iGmyJpj2yaQUa5X5oLK7UMPfceR7Dmu98BWmn3/jM2z6LYNDBD58d3b29xDh89P3hoA9qqteajZ2FrLc3dzFDDEu6R2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bio_87	MCQ	In mammals, genes on only one of the two X chromosomes of a female individual are normally expressed, a phenomenon called X chromosome inactivation. Sequences on the X chromosome called the inactivation center transcribes non-coding RNA (Xist), which binds to the X chromosome and recruits a series of proteins, causing changes in DNA and histone modifications, causing the X chromosome to condense, and genes on it cannot be expressed normally. Genes on the X chromosome in male individuals are expressed normally. ALD is a human genetic disease controlled by a pair of alleles located on the X chromosome. The normal gene and ALD pathogenic gene contain 1 and 2 recognition sequences of the restriction enzyme BstI respectively. Figure 1 <image_1>is the genealogy of ALD, and Figure 2 <image_2>is the electrophoresis results of some family members after cleavage by the restriction enzyme BstI. The following statement is correct ()	['A. ALD is caused by base pair substitutions in normal genes caused by X chromosome inactivation', 'B. If II3 is female, the pathogenic gene for ALD is a recessive gene', 'C. If II3 is male, the pathogenic gene for ALD is a dominant gene', 'D. If II3 is male, the probability that the electrophoresis result of II2 is the same as II1 is 1/2']	C	bio	遗传与进化_遗传与人类健康	['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'bio_87_2.jpg']
bio_88	MCQ_OnlyTxt	The sex determination of a certain bird is ZW type, and its feather color is controlled by two pairs of alleles, neither of which is located on the W chromosome. Now F_1 is obtained by crossing one green feather and one brown feather. F_1 has four phenotypes: green feather, red feather, brown feather, and black feather, and the proportions are equal. All green feathers in F_1 are selected to mate freely to produce F_2, regardless of mutation, cross exchange and death. The following description of this hybridization experiment is incorrect ()	['A. If the genes controlling feather color are located on two pairs of chromosomes, the genotypes and phenotypes of F_1 male are 2 or 4.', 'B. If the genes controlling feather color are located on two pairs of chromosomes, F_2 can have 0, 1, 2 or 4 phenotypes', 'C. If the gene controlling feather color is located on a pair of chromosomes, the sex of F_1 green feather is different from that of its parent green feather.', 'D. If F_1 has two phenotypes that are female and two are male, backcrossing F_1 with green feathers can produce offspring different from their parents.']	D	bio	遗传与进化_遗传与人类健康	['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zxkd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL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bio_89	MCQ	The body color of Angola rabbits is controlled by a pair of alleles (B, b) located on the autosome. The gray body is dominant to the black body. Individuals containing only one gene cannot develop (die). The figure <image_1> is a schematic diagram of the cultivation and hybridization experiment of Angola rabbits. No mutations other than those shown in the figure occurred in the experiment. The following statement is incorrect ()	"['A. When A and B are crossed, both male and female individuals are gray', 'B. The breeding method of cultivating B belongs to mutation breeding, and the mutation principle of B is chromosome variation', 'C. If the genotype of F1 is bXBX, it has a chromosomal number variation', ""D. When B's spermatogonia undergoes meiosis, gene recombination occurs between B and XB genes""]"	C	bio	遗传与进化_遗传与人类健康	['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bio_90	MCQ	The gender and fertility of fruit flies are related to the number of X chromosomes, as shown in the figure<image_1>. During meiosis, only two of the three homologous chromosomes in a trisomal cell can pair. The homologous chromosomes with higher homology are easier to pair (accounting for 80% of the total), and the chromosomes that have not paired move randomly to the poles. The normal eye and astroeye of Drosophila melanogaster are controlled by alleles A and a. The A and a genes are located on the autosome. The normal wing and small wing are controlled by alleles B and b. The B and b genes are located on the X chromosome. The astroeye and normal wing are dominant. A population consisting of female and male flies with normal eyes and female and male flies with normal eyes are all homozygous. The male and female flies in this population are parents and randomly mated to produce F1. In F1, female flies with normal eyes and small wings account for 21/200, and male flies with small wings account for 49/200. Male and female fruit flies mated randomly in F1, and a small-winged fruit fly with a sex chromosome composition XXY was found in F2. It mated with a normal-winged fruit fly with normal chromosomes, regardless of other mutations. The following related statements are incorrect ()	['A. The proportion of male flies with trisomy microptera in the offspring of F2 hybrids between Drosophila trisomy and normal Drosophila is about 9/40', 'B. In the parent male fruit flies, 7/10 of the star-eyed normal wings', 'C. The reason for the appearance of F2 medium trisomy fruit flies is the abnormal second meiotic division of the female parent Drosophila', 'D. The number of parent star-eyed normal-winged flies is equal to the number of normal-eyed small-winged flies']	ACD	bio	遗传与进化_遗传与人类健康	['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bio_91	MCQ_OnlyTxt	A dioecious plant (XY type) has purple, red and white color, controlled by two pairs of alleles A, a and B, b. It was found that gene B could turn the color of plants containing gene A into purple. By crossing a homozygous safflower female plant with a homozygous white flower male plant, F_1 yielded a purple-flower female plant: safflower male plant =1:1, and F_1 mated freely to obtain F_2. Regardless of variation, the following analysis errors are ()	['A. Gene B is located on the X chromosome, and the location of gene A cannot be determined', 'B. If 1/4 of the plants in F_2 are white flowers, the genes controlling flower color are all located on the X chromosome', 'C. If 3/8 of safflower plants in F_2 were found, the genes controlling flower color were located on two pairs of homologous chromosomes.', 'D. F_1 safflower plants mate with each other, and the descendants will appear purple flowers']	BD	bio	遗传与进化_遗传与人类健康	['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bio_92	MCQ	Congenital myotonia is divided into two types: dominant (AD) inheritance and recessive (AR) inheritance. AD is caused by a dominant mutation in gene D to D+, and AR is caused by a recessive mutation in gene D to D-. The pedigree of a family with congenital myotonia is shown in the figure<image_1>. Genetic testing was performed on some individuals in the figure, and the results are shown in the table<image_2>. Regardless of the homologous segments of the X and Y chromosomes, the following statement is incorrect: ()	['A. The pathogenic gene that controls congenital myotonia is located on the X chromosome', 'B. Genes 1, 2, and 3 represent genes D, D+, and D-respectively', 'C. Both II2 and II7 are AD congenital myotonia and have the same genotype', 'D. The probability of II7 and II8 having another boy without the disease-causing gene is 1 in 8']	AC	bio	遗传与进化_遗传与人类健康	['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']	['bio_92_1.jpg', 'bio_92_2.jpg']
bio_93	MCQ_OnlyTxt	Multiple sclerosis (MS) is a chronic central nervous system disease. Cytotoxic T cells mistakenly attack the sheath sheath outside the nerve fibers, causing the lysis of the glial cells that make up the sheath sheath, affecting the normal transmission of nerve signals, and causing damage to the nervous system. Function. The following statement is incorrect ()	['A. The occurrence of MS suggests mutual regulation between the nervous system and the immune system', 'B. The formation of cytotoxic T cells is inseparable from the activity of antigen presenting cells', 'C. MS is an autoimmune disease caused by abnormal cellular immunity', 'D. Use of immunosuppressants such as glucocorticoids can slow down the development of 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bio_94	MCQ	In order to study the mechanism of melatonin's anti-gastric cancer, the researchers injected a certain amount of gastric cancer cells into normal immune mice to create gastric cancer model mice, and divided them into model group, model + melatonin group, and the same number of healthy mice with the same physiological conditions were taken as the control group. The model + melatonin group was injected with physiological saline containing appropriate amount of melatonin. After the mice in the three groups were cultured under the same and appropriate conditions for a period of time, the levels of Th1 and Th2 (two different subsets of helper T cells) cells in the peripheral blood of the mice in the three groups were measured by flow cytometry. The results are as <image_1>shown in the figure (percentages are the proportion of Th1 or Th2 cells in peripheral blood). The following statement is wrong ()	"[""A. The body's recognition and elimination of tumor cells are the immune defense function of the immune system"", 'B. The control group and model group needed to inject the same amount of physiological saline', 'C. The proportion of Th1 cells and the value of Th1/Th2 in the model group were significantly higher than those in the control group', 'D. Melatonin plays an anti-gastric cancer role by promoting the differentiation of Th1 cells and Th2 cells']"	ACD	bio	稳态与调节_免疫调节	['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bio_95	OPEN	"Patients with\beta thalassemia have mutations in the H gene (such as h1, h2, etc.), which results in inhibition of the production of\beta chain and cannot combine with the\alpha chain to produce sufficient hemoglobin A. Individuals with two mutant genes showed severe anemia, while individuals with one mutant gene showed mild or asymptomatic disease. Many patients with thalassemia major carry the mutant gene of DNA methyltransferase 1 (DNMT1), which causes changes in the methylation degree of the\gamma chain gene. The\gamma chain gene is activated. The highly expressed\gamma chain can replace the missing\beta chain and form hemoglobin F with the\alpha chain, thereby significantly alleviating anemia symptoms. Figure 1 below <image_1>shows the results obtained after gene sequencing of the patient's family (black out in different areas represents carrying the corresponding mutant gene, regardless of exchange). Figure 2 <image_2>is the electrophoresis profile of related proteins in normal people and the ""individual"" in Figure 1. Please answer the question:
It can be inferred that the genotype of the I-1 individual is ()(DNMT1 gene is expressed as D/d)."		Hh1Dd	bio	稳态与调节_免疫调节	['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']	['bio_95_1.jpg', 'bio_95_2.jpg']
bio_96	MCQ_OnlyTxt	Carp aroma virus disease is a disease caused by rhabdovirus that is often prevalent in carp fish. The virus is surrounded by an envelope containing a single strand of RNA. The following relevant statements are unreasonable ()	['A. The constituent elements of this rhabdovirus must contain C, H, O, N, P', 'B. The preliminary RNA hydrolysis products of this rhabdovirus contain four kinds of ribonucleotides', 'C. The genetic material of carp fish is the same as that of the rhabdovirus', 'D. The genetic material of the rhabdovirus can be completely hydrolyzed to yield six hydrolysates']	C	bio	分子与细胞_组成细胞的分子	['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bio_97	MCQ	<image_1>As shown in Figure A and Figure B, the monomer structure diagrams of protein and nucleic acid are shown in order. The following statement is correct ( )	['A. ①② in the figure can represent amino and carboxyl groups, and the structural differences of various monomers depend on the difference in R groups.', 'B. Some nails in the human body cannot be synthesized by themselves and must be obtained from food. They are called non-essential amino acids', 'C. To judge the type of nucleic acid, the main basis is ③, which has nothing to do with ④', 'D. The nucleic acid formed in Figure B has hydrogen bonds if it is DNA, but has no hydrogen bonds if it is RNA']	A	bio	分子与细胞_组成细胞的分子	['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bio_98	MCQ	Sutherland first proposed the second messenger theory in 1965, which believed that the hormone signal of the receptor on the cell membrane was called the first messenger, and that the substance (such as cAMP in the figure) that converts the extracellular signal received by the receptor on the cell surface into the intracellular signal was called the second messenger. There are few known types of second messengers, but they can transmit a variety of messages outside the cell and regulate and amplify many physiological and biochemical processes. The following figure <image_1>shows the process chart of the role of epinephrine in regulating blood sugar. The following related statements are incorrect ()	['A. According to the map, adrenaline belongs to the first messenger', 'B. The range of action of epinephrine depends on the distribution of the receptor and is inactivated once accepted by the target cell', 'C. cAMP produced by ATP hydrolysis can serve as a messenger to convey extracellular information and play a regulatory role', 'D. Hormone trace efficiency may be related to amplification of second 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']	['bio_98.jpg']
bio_99	OPEN	Slc26a9 is an anion transporter that is highly expressed on parietal cells and is crucial for maintaining the survival and function of parietal cells. Slc26a9 knockout mice have severe loss of parietal cells, which can cause them to develop gastritis. The researchers conducted relevant experiments, and the results are shown in the table <image_1>. Based on the experimental results, please speculate that the hypothesis put forward by the researchers is ( ). Note: The fewer inflammatory cytokines, the lighter the inflammatory response.		Deletion of the Slc26a9 gene promotes the inflammatory response in mice, which in turn causes damage and death of parietal cells, causing mice to develop (autoimmune) gastritis	bio	稳态与调节_免疫调节	['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']	['bio_99.jpg']
bio_100	MCQ	<image_1>Pr and Pfr are two forms of photosensitive pigments that can be transformed into each other in the organism as shown in Figure 1. The degree of shade can change the ratio of Pr to (Pr+Pfr) in plants, and the greater the degree of shade, the greater the ratio. Figure 2 shows the effect of shade degree on the stem growth of Tianqi (shade loving) and licorice (sun loving) plants. The following statement is correct ()	['A. Photosensitive pigments are pigment-protein complexes mainly distributed in meristem tissues of plants', 'B. The energy in the red and far-red light absorbed by the photosensitive pigments can be used for photosynthesis', 'C. Light is a signal, and photochrome receives the light signal and enters the nucleus to participate in regulation', 'D. Tianqi is less affected by the degree of shade, which means that the phytochrome in its body cannot affect the expression of genes in cells']	A	bio	稳态与调节_植物生命活动的调节	['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bio_101	MCQ_OnlyTxt	The African swine fever virus (ASFV), which causes African swine fever, is a very huge and complex pathogen with high pathogenicity and infectivity. Its genome is double-stranded linear DNA, and the virus particle contains more than 30,000 protein subunits. ASFV can replicate in the cytoplasm of several cell types in pigs, especially reticuloendothelial cells and mononuclear macrophages. The following statements about African swine fever virus are correct ()	['A. Preliminary hydrolysis of ASFV nucleic acid produces four ribonucleotides', 'B. The genetic material of ASFV exists in its nucleus', 'C. ASFV synthesizes its own protein in mononuclear macrophages', 'D. ASFV specializes in parasitizing reticuloendothelial cells and mononuclear 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bio_102	MCQ	<image_1>Compound b consists of 1 molecule of phosphate, 1 molecule of base and 1 molecule of compound a. As shown in the figure, the correct description is ()	['A. If m is adenine, then b must be adenine deoxynucleotide', 'B. There are 4 types of b in influenza virus and Helicobacter pylori', 'C. In human cells, there are 5 types of m', 'D. If a is deoxyribose, then the nucleic acid composed of b can exist in the HIV virus']	C	bio	分子与细胞_组成细胞的分子	['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bio_103	MCQ	<image_1>Biological macromolecules usually have certain molecular structure rules, that is, polymers formed from certain basic structural units in a certain arrangement order and connection method. The following statement is correct ()	['A. If the figure is a structural model diagram of a peptide chain, 1 represents a peptide bond, 2 represents a central carbon atom, and there are about 20 species of 3', 'B. If this figure is a structural pattern of a section of RNA, then 1 represents ribose, 2 represents phosphate group, and there are 4 types of 3', 'C. If this figure is a structural pattern of a piece of single-stranded DNA, then 1 represents a phosphate group, 2 represents deoxyribose, and 3 has 4 types', 'D. If the diagram shows a structural pattern of a polysaccharide, starch, cellulose and glycogen are the same']	C	bio	分子与细胞_组成细胞的分子	['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']	['bio_103.jpg']
bio_104	MCQ	<image_1>The figure shows a schematic diagram of a certain nucleotide chain. In the following related descriptions, the incorrect one is ()	['A. The compound shown here can only be found in the nucleus of cells', 'B. T, C, and G can participate in the synthesis of 5 nucleotides', 'C. The elemental compositions of the compounds shown are C, H, O, N, and P', 'D. Nucleotides are connected in the same way in DNA and RNA']	A	bio	分子与细胞_组成细胞的分子	['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']	['bio_104.jpg']
bio_105	MCQ	The following conceptual diagram about the classification relationship of compounds is correct ()	['A. <image_1>', 'B. <image_2>', 'C. <image_3>', 'D. <image_4>']	B	bio	分子与细胞_组成细胞的分子	['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', 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', 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', 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']	['bio_105_1.jpg', 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bio_106	MCQ	<image_1>The material basis of life is the elements and compounds that make up cells. For example, the serial numbers in the figure represent different compounds, and different areas represent different contents. Among them, I and II represent two major types of compounds. The following statement is correct ( )	['A. If V and VI represent protein and lipid respectively, VII represents nucleic acid', 'B. The most abundant compounds in dry and fresh cell weights were V and III respectively', 'C. Solutes in medical physiological saline and sugar solutions belong to IV and V respectively', 'D. Among the above substances, the compound with the highest oxygen atom content is III']	BD	bio	分子与细胞_组成细胞的分子	['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']	['bio_106.jpg']
bio_107	MCQ	A classmate conducted four groups of experiments according to the following table <image_1>. The experimental materials in each group were observed after treatment according to the experimental conditions in the table. The following related statements are correct ()	"['A. In the Group A experiment, after washing off the floating color with 50% alcohol, small orange fat particles stained by Sudan III dye solution could be observed under a low-power microscope', 'B. If the apple homogenate is replaced with white granulated sugar solution and the above Group B experiment is carried out according to the correct operation, the result is that the color of the solution will be blue', 'C. In group C experiment,""? ""It can be"" biuret reagent, requiring water bath heating ""', 'D. After the experiment in Group D, the solution did not change blue. It was possible that starch had precipitated to the bottom of the beaker, so only the supernatant was sucked and tested in a test tube.']"	ABD	bio	分子与细胞_组成细胞的分子	['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']	['bio_107.jpg']
bio_108	MCQ_OnlyTxt	In the following description of the experimental steps, the correct one is (    ）	"[""A. Fehring's reagent solutions A and B used to detect soluble reducing sugars can be directly used for protein detection"", ""B. When detecting soluble reducing sugar, Fehlin's reagent solution A should be added before solution B should be added"", 'C. In the fat detection experiment, a microscope is needed to observe the fat particles dyed orange', 'D. Biuret reagent A and B solutions used to detect protein must be mixed well, then added to the test tube containing the sample, and ready for use']"	C	bio	分子与细胞_组成细胞的分子	['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+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/Bkx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bio_109	MCQ	Neuropathic deafness and peroneal muscular atrophy are two monogenic inherited diseases controlled by B/b and D/d genes respectively. Figure A <image_1>is a genetic pedigree of a family, in which the characteristics of the deceased individual are unknown, and it has been tested that IV_{24} does not carry the pathogenic genes of the two diseases. In order to determine the distribution of the perone-muscular atrophy disease gene on chromosomes, researchers amplified DNA fragments containing related genes from individuals III_{12} and III_{13}, treated them with a certain restriction enzyme, and conducted electrophoresis analysis. The results are as shown in Figure B<image_2>. Regardless of variation, the following statement is correct: ()	['A. The inheritance mode of nervous deafness is the recessive inheritance of the pathogenic gene in the homologous region of the XY chromosome', 'B. The pathogenic gene of IV_{19} comes from II_{4} and II_{5}', 'C. The genotype of III_{13} is BbX^DX^d or BBX^DX^d', 'D. When V_{22} and V_{23} mate, the probability that a girl in their descendants will not be sick is 7/32']	C	bio	遗传与进化_遗传的基本规律	['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Blt/6LWgDoq89+Gv/ACHPHP8A2HZf5CvQq89+Gv8AyHPHP/Ydl/kKAPQqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDn/AB1/yT/xF/2Dbj/0W1N8A/8AJO/DX/YMtv8A0WtO8df8k/8AEX/YNuP/AEW1N8A/8k78Nf8AYMtv/Ra0AdFXnvw1/wCQ545/7Dsv8hXoVee/DX/kOeOf+w7L/IUAehV8g+MfHfiuz8aa1bW/iHUY4Yr2VERJ2AUBjgAV9fV83eJfgT4r1fxPqeo28+m+Tc3Mkqb5WBwzEjI20Aeb/wDCxPGP/Qy6n/4ENR/wsTxj/wBDLqf/AIENXaf8M8eMf+fjS/8Av83/AMTR/wAM8eMf+fjS/wDv83/xNAHF/wDCxPGP/Qy6n/4ENR/wsTxj/wBDLqf/AIENXaf8M8eMf+fjS/8Av83/AMTR/wAM8eMf+fjS/wDv83/xNAHF/wDCxPGP/Qy6n/4ENR/wsTxj/wBDLqf/AIENXaf8M8eMf+fjS/8Av83/AMTR/wAM8eMf+fjS/wDv83/xNAH0R4LuZ7zwTolzcyvLPLZRPJI5yWYqMkmt2snwvps2j+FtK025KGe1tY4ZChyNyqAcVrUAFFFFAHH/ABSv7vTPhvrF5Y3ElvcxRoUljbay/Oo4NfK3/CxPGP8A0Mup/wDgQ1fWvj/QbvxN4I1PR7Fo1ublFVDKcLwwPJ/Cvn7/AIZ48Y/8/Gl/9/m/+JoA4v8A4WJ4x/6GXU//AAIaj/hYnjH/AKGXU/8AwIau0/4Z48Y/8/Gl/wDf5v8A4mj/AIZ48Y/8/Gl/9/m/+JoA4v8A4WJ4x/6GXU//AAIaj/hYnjH/AKGXU/8AwIau0/4Z48Y/8/Gl/wDf5v8A4mj/AIZ48Y/8/Gl/9/m/+JoA4v8A4WJ4x/6GXU//AAIatfwp498WXXjDRLefxDqMkMt/AkiNOxDKZFBB9sVu/wDDPHjH/n40v/v83/xNaXh74DeLNL8S6XqE8+mmG1vIp5AszE7VcMcfL1wKAPpMdBRQOlFAHP8Ajr/kn/iL/sG3H/otqb4B/wCSd+Gv+wZbf+i1p3jr/kn/AIi/7Btx/wCi2pvgH/knfhr/ALBlt/6LWgDoq89+Gv8AyHPHP/Ydl/kK9Crz34a/8hzxz/2HZf5CgD0KiiigAooooAKKKKACiiigAooooAKKKKAM3X9cs/DeiXOr6gXFrbANIUXccEgcD6muA/4X94H/AOe19/4DH/Gtn4w/8kq13/rmn/oxa+OKAPq7/hf3gf8A57X3/gMf8aP+F/eB/wDntff+Ax/xr5RooA+rv+F/eB/+e19/4DH/ABo/4X94H/57X3/gMf8AGvlGigD6u/4X94H/AOe19/4DH/GrOn/HHwbqepWthby3hnuZkhjDW5A3MQBk59TXyRW34N/5Hnw//wBhK3/9GLQB9yUUDoKKAOf8df8AJP8AxF/2Dbj/ANFtTfAP/JO/DX/YMtv/AEWtO8df8k/8Rf8AYNuP/RbU3wD/AMk78Nf9gy2/9FrQB0Vee/DX/kOeOf8AsOy/yFehV578Nf8AkOeOf+w7L/IUAehUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBW1DT7PVbGWyv7eO4tZRh4pBlW5zyPwrn/APhW3gv/AKFnTf8AvyK6migDlv8AhW3gv/oWdN/78ij/AIVt4L/6FnTf+/IrqaKAOW/4Vt4L/wChZ03/AL8ij/hW3gv/AKFnTf8AvyK6migDlv8AhW3gv/oWdN/78ipLf4feELS5iubfw7p8c0TiSN1iAKsDkEe+a6WigAooooA5/wAdf8k/8Rf9g24/9FtTfAP/ACTvw1/2DLb/ANFrTvHX/JP/ABF/2Dbj/wBFtTfAP/JO/DX/AGDLb/0WtAHRV5P4K8T6FoXiPxrDqurWdlLJrcrIk8oQsMAZGa9YrJn8LeHrq4knuNC0yaaRizySWiMzE9ySOTQBQ/4WH4O/6GbS/wDwJX/Gj/hYfg7/AKGbS/8AwJX/ABq1/wAId4Y/6F3Sf/AKP/Cj/hDvDH/Qu6T/AOAUf+FAFX/hYfg7/oZtL/8AAlf8aP8AhYfg7/oZtL/8CV/xq1/wh3hj/oXdJ/8AAKP/AAo/4Q7wx/0Luk/+AUf+FAFX/hYfg7/oZtL/APAlf8aP+Fh+Dv8AoZtL/wDAlf8AGrX/AAh3hj/oXdJ/8Ao/8KP+EO8Mf9C7pP8A4BR/4UAVf+Fh+Dv+hm0v/wACV/xo/wCFh+Dv+hm0v/wJX/GrX/CHeGP+hd0n/wAAo/8ACj/hDvDH/Qu6T/4BR/4UAVf+Fh+Dv+hm0v8A8CV/xo/4WH4O/wChm0v/AMCV/wAatf8ACHeGP+hd0n/wCj/wo/4Q7wx/0Luk/wDgFH/hQBV/4WH4O/6GbS//AAJX/Gj/AIWH4O/6GbS//Alf8atf8Id4Y/6F3Sf/AACj/wAKP+EO8Mf9C7pP/gFH/hQBV/4WH4O/6GbS/wDwJX/Gj/hYfg7/AKGbS/8AwJX/ABq1/wAId4Y/6F3Sf/AKP/Cj/hDvDH/Qu6T/AOAUf+FAFX/hYfg7/oZtL/8AAlf8aP8AhYfg7/oZtL/8CV/xq1/wh3hj/oXdJ/8AAKP/AAo/4Q7wx/0Luk/+AUf+FAFX/hYfg7/oZtL/APAlf8aP+Fh+Dv8AoZtL/wDAlf8AGrX/AAh3hj/oXdJ/8Ao/8KP+EO8Mf9C7pP8A4BR/4UAVf+Fh+Dv+hm0v/wACV/xo/wCFh+Dv+hm0v/wJX/GrX/CHeGP+hd0n/wAAo/8ACj/hDvDH/Qu6T/4BR/4UAVf+Fh+Dv+hm0v8A8CV/xo/4WH4O/wChm0v/AMCV/wAatf8ACHeGP+hd0n/wCj/wo/4Q7wx/0Luk/wDgFH/hQBzXjLx34UvPBOu21t4h02WeWwnSONLhSzMUIAA9c1veAf8Aknfhv/sGW3/otan/AOEO8Mf9C7pP/gFH/hWvBBFbQRwQRJFDGoRI0UKqqOAAB0FAH//Z']	['bio_109_1.jpg', 'bio_109_2.jpg']
bio_110	MCQ	The defense-related reverse transcriptase (DRT) system plays an important role in bacteria's resistance to phage infection. Researchers have recently analyzed the mechanism of the DRT2 system of Klebsiella pneumoniae to resist T phage infection as <image_1>shown in the figure. The following statement is correct ().	"['A. The study shows that bacteria can use RNA as a template to create genes that they do not contain', ""B. Inhibition of bacterial growth affects the phage's ability to obtain corresponding amino acids, nucleic acids, energy, etc. from bacteria"", 'C. ① and ② processes include the formation and breaking of hydrogen bonds and phosphodiester bonds', 'D. The diagram process includes all the elements of the central law']"	A	bio	遗传与进化_遗传的细胞基础	['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bio_111	MCQ	<image_1>The following figure shows a family pedigree with two monogenic inherited diseases, A and B. The two diseases are independently inherited. The incidence of A in the population is $\frac{1}{1600}$, regardless of X and Y homologous segments and mutations. The following statement is incorrect ()	['A. The inheritance mode of thyroid disease is autosomal recessive inheritance, and B disease cannot be inherited with Y chromosome', 'B. If B disease is inherited with X chromosome dominant inheritance, III-2 marries a male with B disease, and the probability that the offspring will have both diseases at the same time is $\\frac{1}{246}$', 'C. If III-3 is normal, I-2 must be double heterozygous for two genetic disease-related genes', 'D. If I-1 does not carry the gene causing B disease, B disease must be a dominant inherited 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bio_112	MCQ	Figure 1 <image_1>is a pedigree diagram of two monogenic inherited diseases, A and B, in a family. The A disease is an autosomal inherited disease, and the enzyme digestion and electrophoresis results of related genes are shown in Figure 2 <image_2>(regardless of the homologous segments of the X and Y chromosomes). The following related statements are correct ()	['A. Band ①④ in Figure 2 represents normal genes', 'B. \\(II_1\\) related genes were electrophoresis, and the obtained band combination was the same as\\(I_1\\)', 'C. The probability of reproducing a boy with both diseases in\\(II_1\\) and\\(II_2\\) is $\\frac{1}{4}$', 'D. If\\(II_3\\) is homozygous, the DNA restriction electrophoresis pattern of the boy in the offspring is the same as\\(II_3\\).']	D	bio	遗传与进化_遗传的基本规律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAFNAqwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoryjxt8ZItJ1NtD8NWZ1XVs7G2AsiN6cdTXPv4m+NUMAvX0GNoiN3lLECwH+6DmgD3eivIvB3xtg1HUl0fxPZHStQJ2B3BVC3oQeVr1wEEAg5BoAWiiigAooooAKKKKACisvxJez6d4Z1O9tSBPBbSSRkjIDBSRXzna/En4jaj4Zv9ei1W2W2snVZF8kBjkgcfnQB9QUV82p4q+Kcl1o1uur227V4/MtzsGAMZ+bjioj4w+KC3OuW7axbiTR13XA2LyP8AZ45oA+l6K+Yb/wCIvxK0jw/p2tz6pbPaX/8AqsRAkdeox7V9D+F76fU/C2l310wae4tkkkYDAJIyaANeiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAK1+t49m62EsMdzxtaZSyj6gVwGj+IvF+qeM9b8P8A2jSU/spYmaXyHPmbxkcbuOlekV5r4Q/5LP47/wCudp/6CaAPSIw4jUSEF8DcQOCe9OoooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArzP40eNbnwt4ZSz05imo6kTFG69UX+Ij35wK9Mrwj4/4TXfCksn+qEx3f8AfS0Ad18Mfh/Z+DtBhmlhV9XuUD3E7DLAnnaD2ArvKFIKgg5BHFLQByHj3wHpnjbRpIZ4US/RSbe5Aw6N2GfT2rmPg14vur60vPC+sy51TSW2KXPLxg4/Eg8fiK9Wr5dl8HzeMvjf4h06wv3sPLkllaZAeMEDHBHc0AfUVFeD/wDCivE6H9340lA7fPIP60f8KR8YL93xvL/39l/xoHY94orwn/hS3jXt45m/7+y/41x+m+DfFepfEHUfCn/CWXKTWSb2nM8hVuAeBn3oA+pqK8I/4Ur40HTxzL/39l/xoHwY8bg8eOZf+/0v+NAHsHild/hTV19bSX/0E18w+Ffm+DniwDqHjP6rXdXvwf8AG0Wn3DSeN5XjWNiyGWXDDHI61xfgpM/Crxoh52oP0xQB2dnj7Z8N29YCP/HKpzY/4Sn4lr62uf8Ax0VZsWG/4bt/sEf+OmqdwSPGnxGX1syf/HBTAwPFY3fA/wAKv/dlI/V6+h/ALb/AGgt62UX/AKCK+evEnzfAbw4fSc/+hPX0D8Ojn4deHz/04xf+gikI6eiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAGu6RqWdlVR1LHArzLwjdW4+MnjljPEFaO12kuMH5T0r0i8srbULZra7gSeFvvI4yDWQvgrwwshkXQrAOerCEZNAG8CCMg5BopqIsaKiAKqjAA7CnUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV578X/AAZN4v8ACB+xLu1Cxbz4FH8f95fxH8q9CpKAPOfhV8QbXxJocGmX0oh1qzQRTRSHDPt43D+tej15f44+Dll4iv21jRbxtJ1fO4ugOyQ+pxyD7iuYh8M/GywX7LBrkEsQ4EjzBuPqy5oA9V8ZeMNO8G6HNf30qiTaRDDn5pG7ACuA+CGg3rnVvGWqIyXOrufKVh/BncW/E4x9KTQfg1eX2qJq/jvWH1a5Q5W2ViUH1J6/QAV69FFHBEkUSKkaDaqqMAD0oAkooooAK8X8Pny/2lfEC/3rYH/xxK9orxfT/wB1+05qQ/56WgP/AI4v+FAHtFFFFAFLV+NGvv8Arg//AKCa+XvA5z8NPG69/Kz+lfU19AbqxuLdSAZY2QE9BkYr51g+DfxC0m01Gw069042l+pSdfM++v4rx1oAs2swXTfhvPnjzvL/AD4pbpf+K88fL/e07d/5DFUx8JviaLTT7X7VZeTp0nm2o88fu2znPSnyfC/4pSajfX7XVl9pvovJuHEwG9MYxjb6U7jMXXW3fATQfa5Yf+PPX0F8Nzn4b+H/APryj/lXiEnwh+JFzoNvoUs1h/Z8DmSOMzDgkk9cZ7mvfPB+k3GheENK0q6KGe1t1jkKHIyBzikI3KKKKACiiigAooooAKKKKACiiigAooooAKKKKAGTTRW8LyzSLHGgyzucAD3NZR8V+H1ODrVhn/ruv+NVfHtu114B1+FPvNYy4/75Jrx/4VfCzwv4s8Dw6pqkFw900zozJMVGBjHFAHtY8VeHz01mx/7/AK/404eJ9CPTWLH/AL/r/jXDH4CeCD/ywvR/28mm/wDChPBP/PK+/wDAg/4UD0O9HiLRW6atY/8Af9f8a0IZoriJZYZEkjYZV0OQfoa8J+Inwe8L+HPA+pavpwvVurZVZN8+5eWA5GPevRfhMd3ww0M5z+4/qaBHaUjOqKWdgqjkknAFJJIsUbO7BUUZZicACvCdW1bXfjF4mn0Tw9dvY+G7M7Z7sZ/en1989h+NAHrtx4w8OWspjn1uxRx2Mwq/Y6pYanHvsb2C4X1ikDfyrzay+AHg+3iAumvryTHLvNtyfoBWZrXwYuNBU6r4E1e8tL6H5xbSSZWTHYH/ABzQM9oorz34Z/EQ+LbabTNVjFrr9j8txCRjeBxuA/mO1ehUCCiiigAopAQyhlIIIyCO9IzopUMwBY4UE9T7UAOoqFry2S7S0aeNbh1LrEWG5lHUgd6kWRHd0V1Lp95QeR9aAHUUVG1xCrlGmjDjqpYZFAElFRfaYP8AntH/AN9CiO6t5ZnhjnjeRAGZFYEgHoSPwoAlooooAKKiguYLqPzLeZJUyRuRgRkdRUtABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAEN0bkWshs1ia42/uxMxCE+5AJxXD+GfEXiC++JWtaJrP2NI7KzjeOO0LFCWIO4lgCTzjpXfV5xoP/JdfFP8A2D7f+lAHo9FFFABRRRQAV4uvyftPP/tWIP8A47XtFeMS8ftPJ72A/wDQTQB7PRRRQAUUUUAcX4r8TXFt4r0TwtZXK2c+ph3e6ZQxRFH3UB43H36VmeJ7/WfAVxpmpf2vPqOlz3SW13BdqpZd5wHRlA6eldzdaNpt7qNrqF1ZQy3dpkwTOuWjz1wa4nWYH+IXiezsrU50DR7kTXdyPu3E69Ik/vBT1PTtQB6GCGAI6EZpaBwMCigAooooAKKKKACiiigAooooAKKKKACiiigAooooAzPEeD4Z1bP/AD5zf+gGuA+ADbvhmg/u3ko/Ra7/AMR/8ixq3/XlN/6Aa89/Z9/5Jq3/AF/S/wDoKUAeq0YoooA4f4v/APJK9d/65L/6GtJ8IG3fC/RvaMj9TS/GD/kleu/9cl/9DWo/g0c/C7SP91v/AEI0AUPjnrs2jfDyaK3YpLfSC3LDsp5b9Bj8a1/hX4dg8OfD/TIY1HnXMS3M7d2Zxn9AQPwrI+OeiS6x8Op5oFLSWMi3BAHO0cN+hz+FbXwu16HxB8PdJuI2BlhhW3mXPKug2/qAD+NAHY4pKWigDwn4mWw8GfFbw74qsFMf26Ty7lF4DkEBvzVv0r2HUdKW/ljuDqd9aoq4K285jVvc+9eT/Fu4j8Q/ETwj4WtSJJ4rjzpwvOwEjr+Ck16F8SBj4a69tJBWzYqQcEEcg0AYnxEtrzw54IvdU07W9VW6haMIzXRYfM6qeD7E1003hSK4gkhk1fWDHIpVh9tYZBrkviJGIvgcyIWOILXl2LEnen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'bio_112_2.jpg']
bio_113	MCQ	A self-pollinating plant whose single and clustered flowers are controlled by alleles R and r respectively. R and r are known to be located on chromosome 10. A mutant plant was found in a certain group. The relevant chromosomes and genes of normal and mutant plants are shown below <image_1>(fertilized eggs without R or r cannot develop). The following related statements are correct ()	['A. Compared with normal plants, the heritable variation occurring in the mutant plants is genetic recombination', 'B. There are two types of gametes produced by meiosis in both normal and mutant plants', 'C. Among the progeny produced by self-pollination of mutant plants, solitary flower plants: clustered flower plants =4:1', 'D. A plant could not distinguish whether it was a normal plant or a mutant plant through self-pollination experiments']	C	bio	遗传与进化_遗传的基本规律	['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bio_114	OPEN_OnlyTxt	When researchers studied the inheritance of mouse traits, they found that a yellow mouse appeared in the gray mouse group. This yellow mouse was crossed with homozygous chinchilla, and half of the two species of mice in the offspring were divided into half. Several pairs of chinchilla and chinchilla in the offspring were mated. Two thirds of the descendants of each pair of chinchilla were chinchilla and one third were chinchilla. In order to ensure the stable preservation of the yellow trait, we can try to obtain a recessive homozygous lethal gene b (its allele B has no lethal effect) on the chromosome of Citellus dauricus, so that it does not separate the trait after self-pollination (regardless of new mutations occurring during the hybridization process). The above-mentioned Citellus can be used to detect whether a recessive mutation gene (regardless of body color) that determines a new trait appears on chromosome 1 of wild-type chinchilla. The specific operations are as follows (regardless of new mutations occurring during the hybridization process): Citellus chinchilla is crossed with the wild-type chinchilla to be tested; select offspring male and female chintellus chinchilla to mate freely; and count the phenotypes and proportions of the F2 generation. If the F2 generation of old character Citellus: new character Citellus: old character Citellus: new character Citellus =(), it means that a recessive mutation gene that determines the new character appears on chromosome 1 of the wild type Citellus to be tested.		8:0:3:1	bio	遗传与进化_遗传的基本规律	['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bio_115	MCQ	Cells from a male animal (2N=8, with nuclear DNA fully labeled with ^{15}N) were cultured in common medium. Take one of the dividing cells, label the centromere of two chromosomes with red fluorescence and green fluorescence respectively. Under a fluorescence microscope, it is observed that two fluorescent spots appear in ①-four different positions in the cell over time (the arrow indicates the movement path), as <image_1>shown in the figure. The following statement is wrong ()	['A. The cell is undergoing meiosis', 'B. ①→② stage, there may be two single strands of DNA containing ^{15}N in these two chromosomes', 'C. During the movement of the fluorescent spot from ③ to ④, there may be 16 chromosomes in the cell', 'D. One or two fluorescent spots of the same color may be seen in each daughter cell obtained after the cell division']	C	bio	遗传与进化_遗传的分子基础	['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bio_116	OPEN	"Lhcb2 is a protein on thylakoid membranes involved in light energy conversion and responds to environmental changes through rapid phosphorylation and dephosphorylation. The content of phosphorylated Lhcb2 was analyzed, and the results are as shown in the figure<image_1>. It is speculated that the ""strategy"" for applying exogenous melatonin to cope with drought stress is to_____(fill in to ""accelerate"" or ""slow down"") the dephosphorylation of Lhcb2."		accelerated	bio	稳态与调节_植物生命活动的调节	['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bio_117	OPEN	Phenylacetic acid has a promoting effect on the germination of eggplant seeds. On this basis, the students of the scientific research team further explored the effect of different concentrations of phenylacetic acid on the germination of eggplant seeds under salt stress. The experiment was divided into five groups. Groups A to D were regularly applied with equal amounts of 0.1 mg/L, 0.075 mg/L, 0.05 mg/L, and 0.025 mg/L NAA respectively, and Group E was applied with equal amounts of distilled water. The results are as follows <image_1>. The experimental conclusion that can be drawn is		Different concentrations of NAA promoted the germination of eggplant seeds under salt stress, and with the increase of concentration, the promotion increased first and then 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']	['bio_117.jpg']
bio_118	MCQ	In order to study the relationship between abscisic acid (ABA) and gibberellin (\(GA_3\)) in regulating the growth of above-ground parts of rice seedlings, rice seedlings were treated with\(ABA\),\(GA_3\) and\(GA_3\) synthesis inhibitors (PAC), and the experimental results are shown in the figure<image_1>. The following statement is correct ()	['A. The control rice seedlings in the experiment did not contain\\(ABA\\) and\\(GA_3\\)', 'B. The\\(ABA/GA_3\\) ratio in the body became larger during the rapid growth period of rice stems', 'C. \\(ABA\\) and\\(GA_3\\) had little effect on the growth of rice seedlings', 'D. \\(GA_3\\) can relieve\\(ABA\\) inhibition on the growth of above-ground parts of rice']	D	bio	稳态与调节_植物生命活动的调节	['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bio_119	MCQ	<image_1>The flowering of autumn chrysanthemum is affected by the photoperiod, and the relationship between its flowering status and the length of sunshine is shown in the figure. The following statement is incorrect ()	['A. Autumn chrysanthemum is a short-day plant, and its leaves are the parts that experience changes in the photoperiod', 'B. The photosensitive pigments in autumn chrysanthemums can sense the day length and regulate their own flowering conditions', 'C. Photoperiod serves as a signal to regulate plant flowering and is the result of long-term evolution.', 'D. The blooming of autumn chrysanthemums can be delayed by shining at night or increasing daytime light time']	B	bio	稳态与调节_植物生命活动的调节	['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bio_120	MCQ	<image_1>When the external auditory canal is infected or stimulated by a foreign body, the stimulation signal will cause the Na^+ channel of the vagus nerve to open, and Na^+ will flow into the vagus nerve endings, which will cause it to release acetylcholine. Acetylcholine can cause the cough reflex after acting on the bulbar cough central neurons of the brain. This reflex is also called the ear cough reflex. Mycoplasma pneumonia can cause severe coughing for a long time, and some antihistamine allergy drugs can relieve cough symptoms by blocking the binding of choline receptors to acetylcholine. The following analysis errors are ()	['A. To record the action potential of the vagus nerve during excitation, both microelectrodes can be placed in its membrane', 'B. When excited, Na^+ enters the neuron through Na^+ channels and causes changes in membrane potential', 'C. Some antihistamines act on choline receptors and induce inhibitory signals from central neurons in the medulla oblongata', 'D. Severe coughing may be caused by inflammatory substances releasing a large amount of acetylcholine or reducing the activity of related 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bio_121	MCQ	On the short track speed skating competition field of the Asian Winter Games, athletes will rush out like arrows leaving the bow at the sound of the starting gun. This behavior involves the body's reflex adjustment, and some of its pathways are as shown in the figure<image_1>. The following statement is wrong ()	['A. The sprint competition rules stipulate that starting within 0.1 seconds after the gunshot is regarded as a rush, and this behavior is a conditioned reflex', 'B. Excitation is transmitted through ②, there will be a transition from electrical signal → chemical signal → electrical signal', 'C. Commands issued by the motor center of the cerebral cortex control neurons ② and ③ in the spinal cord through subcortical neurons ④ and ④, thereby accurately regulating muscle contraction, reflecting the hierarchical regulation of somatic movements by the nervous system.', 'D. If the excitation of central neurons ④ and ④ can cause the contraction of the b structure, the contraction intensity of the b structure will be strengthened by cutting the nerve fibers at the arrow']	AD	bio	稳态与调节_神经调节	['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']	['bio_121.jpg']
bio_122	MCQ	Type A interstitial cells are a special type of cells in the renal collecting duct. When acidosis occurs in the body, interstitial cells accelerate the secretion of H^+ and the reabsorption of HCO_3^-and K^+. The specific mechanism is shown in the figure<image_1>. The following statement is incorrect ()	['A. When the body is acidosis, the activity of carbonic anhydrase increases', 'B. Reabsorbed HCO_3^-Used to maintain relative stability of pH', 'C. K^+ enters and exits the cells of type A in the same way', 'D. Blocking reabsorption of K^+ will not affect H^+ secretion']	CD	bio	稳态与调节_内环境与稳态	['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bio_123	MCQ_OnlyTxt	Traced organs refer to organs that have lost their function and degenerate during development, leaving only traces. For example, the hind limbs of whales and manatees have degraded, but traces of hindlimb bone are still retained in their bodies. The following statement is correct ()	['A. Traced organs are obtained through use and abandonment and can be passed on to future generations.', 'B. The gill clefts and tails that appear in early embryonic development are trace organs', 'C. Determining the kinship between organisms based on trace organs is more direct than on fossils', 'D. Adaptation means that the morphological structure of an organism is suitable for performing certain functions']	B	bio	遗传与进化_生物的变异与育种	['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bio_124	MCQ	"<image_1>Studies have found that fragments of chromosomes 9 and 22 in patients with chronic myeloid leukemia (CML) have been broken and reconnected. After the\text{ABL} gene on chromosome 9 and the\text{BCR} gene on chromosome 22 are recombined into a fusion gene, the expressed and synthesized\text{BCR-ABL} protein is not controlled by other molecules and remains active, leading to uncontrolled cell division and causing CML. Clinically, through high-throughput screening technology, it was found that 2-anilinopyrimidine (drug name ""Gleevec"") can bind to the active site on the\text{BCR-ABL} protein, thereby targeting the treatment of\text{BCR-ABL}. Cancer caused by the gene. The following judgments are correct: ()"	['A. The type of mutation shown here belongs to genetic recombination', 'B. The fusion of the\\text{BCR} and\\text{ABL} genes is the root cause of CML', 'C. Presumably\\text{BCR-ABL} gene is a tumor suppressor gene', 'D. Genetic testing of fetuses in families with a history of CML to determine whether the fetus has CML']	BD	bio	遗传与进化_生物的变异与育种	['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bio_125	MCQ	Mutations in the\text{ads} gene can cause a single genetic disease in humans, and three alleles of the\text{ads} gene exist in the population. Figure 1 <image_1>shows the family map of this genetic disease, and Figure 2 <image_2>shows some results of electrophoresis after treating the\text{ads} genes of some family members with restriction enzyme F. The following statement is incorrect ()	['A. This genetic disease is a recessive genetic disease with X chromosome', 'B. \\text{ads} Two restriction enzyme F cleavage sites exist on normal genes', 'C. The direction of DNA migration in the electrophoresis tank is B-A', 'D. III1 may have multiple base pairs replaced in a\\text{ads} gene in the corresponding fertilized egg']	BC	bio	遗传与进化_生物的变异与育种	['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'bio_125_2.jpg']
bio_126	OPEN	Researchers found that the epidermal tissue on the stems and leaves of a certain plant formed a special structure-superficial hairs. The development of epidermal hair is controlled by genes T/t and R/r. Gene R reduces the number of epidermal hair branches. The number of epidermal hair branches in plants without gene T is 0. The more the number of gene T, the more the number of epidermal hair branches. Individuals with genotypes ttRrRr and TTRr were crossed to obtain F, and F was selfed to obtain F. The number of epidermal hair branches in F and the proportion of corresponding plants were counted. The results are shown in the following table<image_1>. Individuals with 1 epidermal hair branch number in F ˇ were allowed to mate freely. The latter representative type and its proportion were		0:1:2:3:4 =9:16:8:2:1	bio	遗传与进化_遗传的基本规律	['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']	['bio_126.jpg']
bio_127	MCQ	Figure 1 <image_1>shows the pedigree of two monogenic inherited diseases: A and B. A certain restriction enzyme was used to cut the onych-related genes of some individuals in Figure 1 and then electrophoresis. The restriction sites and electrophoresis results of the onych-related genes were as shown in Figure 2<image_2>. Individual 3 did not carry the disease causing gene B, and neither disease gene was located in the homologous segments of X and Y. The following statement is correct ().	['A. B disease must be an X chromosome recessive disease', 'B. The fragments obtained after restriction enzyme digestion of the normal gene associated with onygiosis were 1.2 kb and 0.6 kb', 'C. Individual 2 and individual 4 have the same genotype', 'D. If No. 10 is female, the probability of developing B disease is 1/2']	AB	bio	遗传与进化_遗传的基本规律	['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'bio_127_2.jpg']
bio_128	OPEN	Studies found that there are two adjacent genes on chromosome 12 of indica rice: gene D encodes a toxic protein that kills pollen, and gene J encodes a protein that neutralizes the toxicity of the toxic protein. The fertility of one-grain hybrid rice pollen is shown in the following figure<image_1>, which is related to the expression period and action period of gene D and gene J. Based on this, it is speculated that the action periods of gene D and gene J are ( ) respectively (fill in the serial number: ① pollen mother cell period ② pollen period).		②②	bio	遗传与进化_遗传的基本规律	['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bio_129	OPEN	<image_1>Human PWS syndrome and AS syndrome are genetic diseases related to imprinted genes, both related to chromosome 15. Symptoms of the former include obesity, short limbs, etc.; symptoms of the latter include dyskinesia, special facial appearance, and often smiling, etc., so it is also called happy puppet disorder. Some patients were caused by the deletion of fragments in the q11-q13 region of chromosomes (Figure 1), while others were caused by the phenomenon of unparent diploidy (UPD) in this region (some fragments of homologous chromosomes all originate from one of the parents)(Figure B). Note: Different colored chromosomes in the figure represent chromosomes from different parents. The symptoms of male parent loss are different from that of female parent loss because		The q11-q13 region of chromosomes involves two pairs of imprinted genes. One pair is a paternal imprinted gene whose loss of function leads to PWS syndrome, and the other pair is a maternal imprinted gene whose loss of function leads to AS syndrome.	bio	遗传与进化_遗传的基本规律	['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bio_130	MCQ	Chr2 protein is a light-sensitive channel protein, and its function is as shown in Figure 1<image_1>. The researchers introduced the gene encoding Chr2 protein into Lhx6 neurons (denoted as Lhx6^+), and recorded the potential changes of Hert neurons after stimulating Lhx6^+ with 470nm light; then added antagonists of different transmitter receptors in turn to record the potential changes respectively. The results are shown in Figure 2<image_2>. The following statements are correct ()	['A. Chr2 protein changes its permeability to Na^+ when stimulated by specific wavelengths of light', 'B. Based on the results in Figure 2, it is speculated that there is a synaptic connection between Lhx6^+ and Hert cells', 'C. The results in Figure 2 illustrate that Lhx6^+ neurons regulate Hert neurons through at least two transmitters', 'D. The study provides a potential clinical treatment for human retinal degenerative diseases']	ABD	bio	稳态与调节_神经调节	['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'bio_130_2.jpg']
bio_131	MCQ	Studies have found that chronic stress can be caused by prolonged depression, insomnia, anxiety, etc. Chronic stress can affect human digestive function and also affect the proliferation ability of liver cells. The mechanism is shown in the <image_1>figure. IL-6 is a cytokine and NE is norepinephrine. The following statement is wrong ()	"['A. The signal conversion form of excitation in the postsynaptic membrane at ① is electrical signal → chemical signal → electrical signal', 'B. Chronic stress promotes the release of NE from sympathetic nerve endings, weakens gastrointestinal peristalsis, leading to weight loss', ""C. Long-term anxiety can lead to a decrease in IL-6 released by macrophages, leading to a decrease in the body's immune function"", 'D. Psychological counseling or immunosuppressants can help patients recover after partial hepatectomy']"	AD	bio	稳态与调节_神经调节	['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bio_132	MCQ	Long-term potentiation (LTP) is an electrical phenomenon in which the intensity of synaptic transmission increases after presynaptic fibers are subjected to high-frequency or repeated stimulation and lasts for hours to days. LTP can increase the number of proteins and AMPA receptors involved in the growth of new synaptic connections. The figure <image_1>shows a schematic diagram of the LTP generation mechanism in a lateral branch of the hippocampus. The following statement is wrong ()	['A. LTP may be related to the formation of long-term memory', 'B. Repeating a certain stimulus can increase the number of AMPA receptors and reduce the sensitivity of nerve excitations', 'C. After injection of NMDA receptor inhibitors, high-frequency stimulation affects postsynaptic membrane potential changes and produces LTP', 'D. The diagram shows NO as a signaling molecule, and the exchange of information between these two neurons is one-way']	BCD	bio	稳态与调节_神经调节	['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']	['bio_132.jpg']
bio_133	OPEN	"The Dabieshan frog is a new species discovered in the Dabie Mountains of Anhui Province in recent years. <image_1>Figure A shows the reflex arc of hind limb movement of the Dabie Mountain Frog during predation. I and II are synapses. Figure B shows the potential on the sensory neuron at a certain moment, and Figure C shows the enlarged structure of Synapse II. Answer the following questions.
Researchers peeled off the reflection arc of the Dabieshan Frog in Figure A, connected the two poles of the meter to the outer sides of points 1 and 2, and gave stimulation at the midpoint of points 1 and 2 on the second side. From the moment of stimulation, the meter pointer The order of changes is ()(answer with <image_2>A, B, C, D and arrows in the figure below)."		D \rightarrow C \rightarrow D \rightarrow B \rightarrow 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'bio_133_2.jpg']
bio_134	OPEN	"Studies have found that when fasting or high-intensity exercise, the body's blood sugar concentration decreases. At this time, nerves and immune cells ""cross-border cooperation"" jointly regulate blood sugar levels to maintain internal environmental stability. The nervous system can increase blood sugar by increasing the number and location of innate lymphocytes (ILC2), thereby affecting the secretion of corresponding endocrine cells in the pancreas. The adjustment mechanism is shown in the following figure<image_1>. The researchers used in vitro cell culture technology to verify that ILC2 promotes the secretion of glucagon through experimental materials such as islet A cells, activated ILC2, IL-13 and IL-5, and cytokine blockers. The cytokines secreted by ILC2 act rather than the direct effect of ILC2. Please write down the experimental design ideas and expect the experimental results ()"		Experimental design ideas: Take islet A cells with the same physiological state and randomly divide them into four groups and number them A, B, C and D; Group A is not treated, group B is added with a suitable amount of activated ILC2, group C is added with an equal amount of activated ILC2 and a suitable amount of cytokine blocking agent, group D is added with a suitable amount of IL-13 and IL-5; cultured under the same and appropriate conditions, and the glucagon content in the culture medium is measured; expected experimental results: glucagon content B> A> 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bio_135	OPEN	"Emotion is one of the higher-level functions of the human brain. If negative emotions caused by stress are accumulated for a long time, it may cause people to suffer from depression. Tests found that the content of the neurotransmitter 5-hydroxytryptamine (5-HT) in the patient's synaptic gap decreased. 5-HT is mainly synthesized in the cell bodies of DRN neurons (M region) of the brain, released by the axons of DRN neurons, and acts on the postsynaptic membrane receptor (R1) in the cerebral cortex and hippocampus (N region), producing a sense of pleasure. After 5-HT is activated, it can be recovered to synaptosomes by transporters (SERT).
Further research found that SERT and 5-HT receptors (R2) also exist on the cell membrane of the M region. 5-HT outside the M region can act on R2 and regulate the frequency of action potential firing in DRN neurons. The regulation mechanism is shown in Figure 1<image_1>. The antidepressant drug F can combine with SERT, but the effect is not good in the early stages of use. The extracellular 5-HT content in the M region was measured in normal mice (group A), depressed mice (group B) and depressed mice (group C) after brain injection of drug F2 hours, and the results are shown in Figure 2<image_2>.
It can be seen from the figure that the early use of drug F will cause (), resulting in a decrease in the 5-HT binding to the N region R1 and no pleasure feeling. Therefore, the early use of drug F will have poor effect."		The relative content of extracellular 5-HT in the M region increased, the 5-HT binding to R2 increased, the frequency of action potential firing from DRN neurons decreased, and the 5-HT released from axon terminals decreased	bio	稳态与调节_神经调节	['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']	['bio_135_1.jpg', 'bio_135_2.jpg']
bio_136	OPEN	"The vagus nerve is a cerebral nerve connected to the brain stem. It promotes the peristalsis of the gastrointestinal tract and the secretion activity of the digestive glands. It can also produce anti-inflammatory effects through a series of processes, as <image_1>shown in the figure. The percentage of blood T cells and T cell proliferation ability can reflect the strength of cellular immune function. Atropine is an acetylcholine blocker, and a series of related studies were carried out using rabbits as experimental animals. Answer the following questions:
Immediately after cutting one side of the vagus nerve, if the percentage of blood T cells and the proliferation of T cells increase significantly (), the vagus nerve contains efferent and afferent fibers."		Stimulate the peripheral end (the end away from the brainstem) and the central end (the end near the brainstem) respectively	bio	稳态与调节_神经调节	['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']	['bio_136.jpg']
bio_137	MCQ	Researchers crossed a homozygous parent of a melon (2n) to obtain F_1, which was selfed to obtain F_2. The results are shown in the table<image_1>. It is known that the A and E genes are on the same chromosome, and the a and e genes are on the other chromosome. When E and F exist at the same time, the peel shows the character of covered lines. Regardless of chromosome exchanges and mutations, the following analysis errors are ()	['A. The genotypes of female parent and male parent are aaeEFF and AAEEff respectively', 'B. The genotype of F_1 is AaEEFf and eight gametes are produced', 'C. F_2 has 4 phenotypes and 9 genotypes', 'D. The proportion of yellow-green plants without covered peels in F_2 was 3/16']	ABC	bio	遗传与进化_遗传的基本规律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEgA6QDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+sn/AISnw9/0HtL/APAyP/Gtasn/AIRbw9/0AdL/APAOP/CgA/4Snw9/0HtL/wDAyP8Axo/4Snw9/wBB7S//AAMj/wAaP+EW8Pf9AHS//AOP/Cj/AIRbw9/0AdL/APAOP/CgA/4Snw9/0HtL/wDAyP8Axo/4Snw9/wBB7S//AAMj/wAaP+EW8Pf9AHS//AOP/Cj/AIRbw9/0AdL/APAOP/CgA/4Snw9/0HtL/wDAyP8Axo/4Snw9/wBB7S//AAMj/wAaP+EW8Pf9AHS//AOP/Cj/AIRbw9/0AdL/APAOP/CgA/4Snw9/0HtL/wDAyP8Axo/4Snw9/wBB7S//AAMj/wAaP+EW8Pf9AHS//AOP/Cj/AIRbw9/0AdL/APAOP/CgA/4Snw9/0HtL/wDAyP8Axo/4Snw9/wBB7S//AAMj/wAay/EnhvQoPC2rzQ6Lp0csdlMyOlqgZSEJBBA4NHhvw3oU/hbSJptF06SWSyhZ3e1QsxKAkkkcmgDU/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKP+EW8Pf9AHS//AOP/CgA/wCEp8Pf9B7S/wDwMj/xo/4Snw9/0HtL/wDAyP8Axo/4Rbw9/wBAHS//AADj/wAKy4PDehHxTfwnRdOMS2VsyobVNoJecEgY6naPyHpQBqf8JT4e/wCg9pf/AIGR/wCNH/CU+Hv+g9pf/gZH/jR/wi3h7/oA6X/4Bx/4Uf8ACLeHv+gDpf8A4Bx/4UAH/CU+Hv8AoPaX/wCBkf8AjR/wlPh7/oPaX/4GR/40f8It4e/6AOl/+Acf+FH/AAi3h7/oA6X/AOAcf+FAB/wlPh7/AKD2l/8AgZH/AI0f8JT4e/6D2l/+Bkf+NH/CLeHv+gDpf/gHH/hR/wAIt4e/6AOl/wDgHH/hQAf8JT4e/wCg9pf/AIGR/wCNH/CU+Hv+g9pf/gZH/jR/wi3h7/oA6X/4Bx/4Uf8ACLeHv+gDpf8A4Bx/4UAH/CU+Hv8AoPaX/wCBkf8AjR/wlPh7/oPaX/4GR/40f8It4e/6AOl/+Acf+FZegeG9Cm06VpdF052F7dqC1qhOBcSADp0AAA9hQBqf8JT4e/6D2l/+Bkf+NH/CU+Hv+g9pf/gZH/jR/wAIt4e/6AOl/wDgHH/hR/wi3h7/AKAOl/8AgHH/AIUAH/CU+Hv+g9pf/gZH/jR/wlPh7/oPaX/4GR/40f8ACLeHv+gDpf8A4Bx/4Uf8It4e/wCgDpf/AIBx/wCFAB/wlPh7/oPaX/4GR/40f8JT4e/6D2l/+Bkf+NH/AAi3h7/oA6X/AOAcf+FH/CLeHv8AoA6X/wCAcf8AhQAf8JT4e/6D2l/+Bkf+NH/CU+Hv+g9pf/gZH/jR/wAIt4e/6AOl/wDgHH/hR/wi3h7/AKAOl/8AgHH/AIUAH/CU+Hv+g9pf/gZH/jR/wlPh7/oPaX/4GR/40f8ACLeHv+gDpf8A4Bx/4Vl6B4b0KbTpWl0XTnYXt2oLWqE4FxIAOnQAAD2FAGp/wlPh7/oPaX/4GR/40f8ACU+Hv+g9pf8A4GR/40f8It4e/wCgDpf/AIBx/wCFH/CLeHv+gDpf/gHH/hQAf8JT4e/6D2l/+Bkf+NH/AAlPh7/oPaX/AOBkf+NH/CLeHv8AoA6X/wCAcf8AhR/wi3h7/oA6X/4Bx/4UAH/CU+Hv+g9pf/gZH/jR/wAJT4e/6D2l/wDgZH/jR/wi3h7/AKAOl/8AgHH/AIUf8It4e/6AOl/+Acf+FAB/wlPh7/oPaX/4GR/40f8ACU+Hv+g9pf8A4GR/40f8It4e/wCgDpf/AIBx/wCFH/CLeHv+gDpf/gHH/hQAf8JT4e/6D2l/+Bkf+NH/AAlPh7/oPaX/AOBkf+NH/CLeHv8AoA6X/wCAcf8AhXL/AA80DRr3wLptxd6RYTzv5u6SW2R2bErgZJGegAoA6j/hKfD3/Qe0v/wMj/xo/wCEp8Pf9B7S/wDwMj/xo/4Rbw9/0AdL/wDAOP8Awo/4Rbw9/wBAHS//AADj/wAKAD/hKfD3/Qe0v/wMj/xo/wCEp8Pf9B7S/wDwMj/xo/4Rbw9/0AdL/wDAOP8Awo/4Rbw9/wBAHS//AADj/wAKAD/hKfD3/Qe0v/wMj/xo/wCEp8Pf9B7S/wDwMj/xo/4Rbw9/0AdL/wDAOP8Awo/4Rbw9/wBAHS//AADj/wAKAD/hKfD3/Qe0v/wMj/xo/wCEp8Pf9B7S/wDwMj/xo/4Rbw9/0AdL/wDAOP8Awo/4Rbw9/wBAHS//AADj/wAKAD/hKfD3/Qe0v/wMj/xo/wCEp8Pf9B7S/wDwMj/xo/4Rbw9/0AdL/wDAOP8Awo/4R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6x8KHN6+zfeoNo8iP7n7rkZz6c5rvPAqxr4A8PeSoVDp0BAAx1QGqWqv6fiv+AS97ev4P8A4J0FFFFIYVk+HP8AkGTf9f8Aef8ApTLWtWT4c/5Bk3/X/ef+lMtAGtWdqt+1pGEiaRJ35VhYy3KgZ5yI/wDEVo1S1j/kCX//AF7Sf+gmpm+WLfYqKu0jh7DVNQsfEOtXF1ePBHd3ECQNNol3slbygMIu/g5BHcnFM8Nalq2j+HrJbqS92RTyGW2/sC8lmdDI2AG3fKMEEcHA4xWBJNpJ8OeE82XhcyefaGRvtib2+TnzB5XHvyefWun8Ptp0nxJka0tdIiZdIOP7NmWVf9cM5IRcHpV2963m19yuZ82l/Jfi7Gr4tv7e7EPhs3EkDajE0k8io25bZSN+3AzubIX2BJ7DKWMlzr+kwXlrp8sVsHZLXfqs8BlgHCSnYCfmxkBsnBBzzV3xLBq141ra2drZzadIWN+bi5aLKDGF4Rsg85HGQMZwayr+zt5dTsbow6JewXiyLMBaqX4X5ZIzyWAOFbPGCD8uDmb2Tf8AX9dPvL3a/r+v+GDTI7q08ftDdPJDF/ZgdYv7TmuIyxl25IkwM9AOK7SvLfA2mWmuaXoouNJ0RZbO0gku2uLNZp7kMgaN1JxtHfecksrDAxk+pVTVlbtf8yd236fkFcl8M/8Aknul/wDbX/0a9dbXJfDP/knul/8AbX/0a9IZ1tFFFABRRRQAVj6pqksE4htpJI3X75bS7i4U5HGCmB+prYrlviIyr4OmZxEUF3abhM21CPtMedxwcD14pDRxq3eqJ4D1TSGuJ11G5iv5IbRtHuvPkBkfBQ7uB8yY4wu5a67StYvYbywtrqa5nhljEOxNDukKPjO6SZ2IA7cjqc561y1zNo3/AAnGmkWHhLy/7Pudyi9Tyyd8OCT5XDdcDHTP49B4A+yNfeKHtYbGIHUkGLJw8WPs8WAGCjPOe3Umqj38vydv1Jf9fPUi8Qa5ZXGsSSSSXDwaBIG+zQhw9zeMoEaZHbDgDPDFx2BzsS2Gp3ZjuHsfLlljVpYxrlxGI3xyoCLjA9RjNR36ao3iM3F5FpkWj2wX7LNPcnd5jDBYx7QCeSo+cYyeueOW8U6etnZ6nbw2OkSsk9i9rJDaiN0Z50DxyYHCnIxkglWI+bBNStl/X9f5JFPf+v6/pnS+CmmU63HdTSGZdTkRY5LyS4CKqR8Kz8459B1qDxhq8N7N/wAIla3c0V1eRFryS1heWS3t+A2Aith23ADPABJ7AGTwtplhdXj67b6Xo9rEwKQRQWSLcQOCVk8yQdGP3WUDjb1NNvY5rT4iaeNNtLZ2bTLpnWSUxAkyw5bIVsn6/nTtfli+35L9bCTtdrv+b/S5nQ3s8erWWnaZretCx03YbxZtMaVnGPkh4hDDI+YsTnG3GckjtdK1W01rTor+xd3tpchWeNkJwSDwwB6g1iafY+ILLWdXvmstMZb+SN1UX0mU2xqnP7n2zVjwfbT6b4ds9NvUEV9DGXliDbgoZ2x8w4NO99xWsb9cLpniXxVcX+qW+raWulpbXJS1ddPnuxPF2OYzgHpz3z0GK7quA8V+JtE13w3dJp17a3f2HVrOG7SRiqK32iPIYkfd4IyARweuKnr/AF3Wo+hgm71Vfh1faN9ouBqU1vdvFaf2RdfaGHmNgqd3A+ZcHGBkCu003WLyPU7W2uZrieCZPKVU0O6j8twM7pJXZgBjjkde9clNNo3/AAnNkRYeEvL/ALOnyovU8vPmRYJPlfe64GOma6H4e/ZGl8Svaw2canVcEWbh4sCCLG1gBkcnsOc1UdV8vydhS/r5q/6Ha0UUUhhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABVO/tJ71REl5JbQEfvPJGJG9g/8IxkHAzzwQauUUAc7e+GEMvh9NMWC1ttMvTcumD8wMcinHqxL5JPXk8mkHhL7JrIvtH1W80yCSQvdWUIR4JickkK4IjYnklcZ78nNdHRQBk3thdTaxbX6RwSi2VlhSSUqELDDScKctj5QOMAtzzxQ1LwfD4gMcmv3kt1JA3mWy22bdLeQdJEAJYuPVmI9AMmulooA5qx07xdZanFHLrthf6UCS73NkVugOy5RlQ9/m2j6GuloooAyfFP/Ioa1/14T/8AotqPC3/IoaL/ANeEH/otaPFP/Ioa1/14T/8AotqPC3/IoaL/ANeEH/otaANaiiigAooooAKKKKACiiigAooooAKK5Dxl46g8I6jo1vJCZIru4VbuXBxbQn5Q5Pb5yvXqA1dfQtVcHo7BRWRbag82r6q7zqmnWSpCd2APMC75GLegVkHXGQ1WNN1vSdaWRtK1SyvljIDm1uElCk+u0nFAF+o1nheaSFJUaWMAugYFlz0yO2ac7pFG0kjBUUFmYnAAHeuC8GX7anFqniextoJJtS1B4ma7maApHGRHEg+Rs5AzjjljQtXYHtc71HSRA8bKynoynINOrhpJ9Q8Gx3txJFYhNV1AfZoXvJWSOeQAbVCwE4ZwWPux+tdnam5a0iN5HFHclB5qwuXQN32sQCR+Ao6XDqTUVx/jSyGk+Cta1Gyu9Riu7e0klik+3znawGQcF8fpWo2g6VE9tql1NeBrIGZZZtSn2R/LhiQz7SMZ6jGM0AzcooBBAIOQehFZ2uasujaXJciIzzn5IIFODLIQcKPToST2AJ7Um7K7Gld2Ro0Vg+CtbufEng3S9Yu44o7i7h8x1hBCA5I4ySe3rWpe6lY6eq/bb23tt4OzzpVTdjrjJ5pzvG/kTF3V0VF8TaA6hl1zTWUjIIu48EfnVuz1Ow1EyCxvra6MeN/kSq+3PTODxXBeBvFlnp3gfR7OeEiWG2VWBu7ZDn6NKGH4gVPofiLSYvF/iDUby7tbJLw2cMBmuYSZGCsMAo7A8sO9NrWwzvZJY4VDSSKgJCgscZJ4ApJbiCBolmmjjMr7Iw7Ab2wTgZ6nAPHtXP8AjKe2g00f2hdWY02UPHd2lyMm5jK/djxz5mcYHOc+uCMnVbC6n1bwlp73cgnS6a9kiUBvJRInBOSDkBpEQZ9aS1B6HdUVzXhrUrg6ffPqV9JcmPVZrSOSREUhRJsRfkVR6c4qHxdr0kD22g6cLhtR1JzAJLdVJt12MxbLEKHKq20E9ecEDBOia6/8OPq79P0OnhnhuYhLBKksZzh0YMDjg8ipK8zl0a3gNn4X0bTvEGmRxxi5lFvqID+UGxhcz7QWbqeuM8c5HcaJrKawt4q2lzbNZ3BtpFuChJYKpJBVmBHzCjfb+un5k/1/XyNGWaKBA8siRqWCguwAyTgD6kkD8aJJooSgkkRC7bE3MBub0HqeDXGeK7q21PxdoHhqZGkiMjXsybSUdo1Zoo2ODgFgX5/55+9ZXjnxFfW+qaDplxpFtLN9rS9Iiuy4RUJxuzGMEk8Yzyp9KF0Xd/1+o318l/X6HpdFZljcavPd7rm009LBogySQXbyuWz6GNRtx3z+FadABRRRQAUUUUAFFFFABRRRQAVk2/8AyN+pf9eFp/6MuK1qybf/AJG/Uv8ArwtP/RlxQBrVFcm4WBjapE83G0SuVX8SAf8APpUtFAHP6V4UgsdVbV7qdrrUiHCso8qGEOcuI4gcDceSWLMT1ajXtBvbtlvtF1JrLUojvjEw823c+jI2duQSCybW56npXQUUAZ2qaNa61bww3/nNFG+9o4pnjSXgja4UjcvP3TkcVD/wj1lDem/s4kivEgEFuXBeK3Uf3I8gKDxnbjIArXooA4+18FPeeHJrPXbpTqM96999q07dEbeUnhoiclcDjnOckGuthjMUKRmR5CoA3vjc3ucU+ijpYPMKyfDn/IMm/wCv+8/9KZa1qyfDn/IMm/6/7z/0ploA1qKKKACuc1Xwy3iS4H9ryqlioZPs1qSrTITyskvDbDhSUXaMjksK6OigClfaXBf2QtWknhVRhHglZGX8R1Hscg9wareH7HVNOsHtNTvob3y5CttNHCImMOBtDquF3DkfKAMAcCtaigAooooAKyfDn/IMm/6/7z/0plrWrJ8Of8gyb/r/ALz/ANKZaANaqepR3s9sYLP7MpkBV5LhS4QY/uDG/wChYfj0q5RQ1cNjG0Hw1ZaAJ3hknuLq42+fcTvln2jCgKMKqgcBVAAFV5dBv7XXbfUNK1NkgZ9t3aXQ81Xj6/u2PzoQeig7P9kV0NFF9bh0sZl94f07U9QgvL6J7gwDEcMkrGEEHIYxZ2lh2YjIqndaBNZ2epTeH3t49VvGLtPfh5w57ITuDBRk4AOFzwK36KTV1Yd9bnL23gq1hsvD6/a7mK+0eBIFu7ZhG0yKoBRxggoSAdp7iuoooqm7kpBXJfDP/knul/8AbX/0a9dbXJfDP/knul/9tf8A0a9IZ1tFFFABRRRQAVk6zp97q0X2KOaG2tW2s8+wSSgg5GxWG1SCAQx3YI+70Na1FAGbpWg2GjaV/Z1okogLM7GSZnd3Y5Zi5OdxPOc9apaXouo6TrczxambjR54yxt7ld00cvABEvV1K8HfuYYHOOm/RR1uHSxkDw1pv267vnSeS7uQy+e9w7PCrDBWIk5iHf5Mc/hWXqfhS4bTtN0jR5rS00qK6ilukliZpXCSCTKvu5dmUZLA5yTnPXq6KFp/XYDHt/DlraeI7jWrWa5hkukAuLZHxBK4/wCWhTH38ADIxwKh1fRNQutbs9W0vUre0ubeCW3Zbm0M6SI5RuiyIQQUHOe/St6ijt5Ac/8AY/GH/Qd0P/wTTf8AyVRpui6zF4hk1bVNbhuQbYW62tpZGCPhi247pJGJ5xwQK6CijzDyCubuvCsJ+022mW9jpdvdyie5uLeBTPJIDnKgjarA4Ic7uc4APNdJRQBm6boVhpOkDTLSORbbLE7pnZ2ZjlmLk7txJJznOap6Touo6RrNwU1P7To8yFhBcIGnilyORIOXUr/fy3A5Nb1FHW4dLBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUZA79aACis/VNZtNG+yte+YkVzOtusoXKo7HChscgE8Z6ZIzirzyxxsiu6qzttQE4LHBOB6nAJ/CgB1FBIAJJwBXN6d498M6lp0l8mr2sEEckiE3EqxkhCQWAJ5U4yD3FAHSUU1HSWNZI3V0YBlZTkEHoQadQBk+Kf+RQ1r/rwn/wDRbUeFv+RQ0X/rwg/9FrR4p/5FDWv+vCf/ANFtR4W/5FDRf+vCD/0WtAGtRRRQAUUUUAFFFFABRRRQAU13WNGd2CqoyWJwAKdVHV9Istd0ybTtQSSS1mGJEjmeIsPQlCDg9xnBpO9tBq3U4C50nXPGGh63KdI0uW015ALeW51CSKWOBR+5OwQMBzmTG7q56Vo/D7xU1z4CmbWCU1HQvMtNRUnLBoh973yoHPc5rrtM0m00jTI9OsxOttGNqLJcSSso9AzsWAHYZ47Vh2Pw48L6be3F3a2Vys9yQ1wz6hcP55zn5w0hD8885p6K6W3+Wwt7N7/1f9DL8R2tjZ/DZLbX1ui97cRNLDauFeW5klD+XuPG3ccHP8IqrpIvk+N8p1BLOGebw8GMNqSQoE+ACxxvI9dq8YGO57jWtE03xDpcumatapc2cuN8bEjkHIIIIIPuDWfZ+B/DdhqVtqNtpaLeW0flRzGR2YrnPzEk7znHLZIx1pp2lf1/KwPa39b3Ne/sotRtHtZyfJkwJFH8a55U+x6H2JrjNFsn1DwX4otISyzSalqIhZOCriVyhHuGAI+ld5WDp/hW2sorhHurtzNdz3R8q4khAMrl8YRhnGcZNTbfzX6r/Id9vJ/ozOgW71u68Kf2pbmK5trb+0buIj/Vz+WI1UjtzJIf+AV1F1Z2t9D5N3bxXEWQ2yVAy5Hsazx4a08TPMH1ASOoRnGpXGSBkgff/wBo/nVzTdOttJsY7K087yI87RNO8zDJz95yWP51TdyUrHJ/EDQdGg+Huvyw6TYRyJYylXS2QFTtPIIHFb3/AAi/h6e1Ec2haZIjKNyvaRkH8CKh8VeGW8T6Y1h/at3YwzYS4WDaRNFn5kIYHGR3GD656VvABVAHQDFIb6f12/yGQW8Nrbx29vDHDDEoSOONQqoo6AAcAV5/qviS8g1zVJLvwn4iuVt0e3s5La2jaEIR80mS4JLH24UDHU59EpsiLLG0bjKsCpHqDUyTaY4tJo4P4O6g158ONLgNjd24toRGJJ0CpNyTujIJyO3OK76qelaVZaJpdvpmnQ+TZ267Io9xbaPTLEk/iauVpN3k2RBWikcxpvh/WNP1XWNR/tSxebUbgSEvZOxSNVCxpkSjoBnp1Jp2j6rq9z4w1bS7qWzls7C3gPmQ27RsZZNxxy7cBQP++hWvq2ny6jYSQwX1xY3GCYriBuY2xwSp4Yf7LZB/Wqfhzw+NBtrjzb2e/vruXzru8nADSvtCjhRhQAoAA6VK/IpkPirSb/W7a3tLaK1MMdzBcs00xUkxyB9uAjcHbjOe9cTd+JdWtvGFm1pZ+cWuXhvbqG48yOcJE7GFMxZxGeSEBOcjJbNek3+nnUV8qW6njtiMPFA3lmT2Lj5gOn3SvuSOKqTeHbVr7RZrfbbQ6SztFbxRgKQ0ZTHHQAGhaf1/X9fiP+v6/r/LnI/DcWrX1pqUOnWM1hPdC8maLXrp4WbO4SJCFETNuAPIA49ea0fFaTHWfCotXiimOpuQ8kZdf+PabOQCufzqwfBWkprq6vate2MxkMk8NndPDDcN6yIpAY559++au63ocetx2mby6s57ScXEFxalN6NtZTw6spBDMCCD1o6JB39P8yl/Yes/8JB/a/8Aa1h5n2X7Ns/s98Y37s/67rTtBs7jRp7yHUJoZZ9RvpbmNoFKrt2KMEEkg/KeMn60f8I9qn/Q565/35sv/kemxeFGOsWWpX3iDWL+SyLmCOZoY0BYYJIijQtx2JI9qFp/Xnf8wev9eVinrqW+meJ/D04RzuubqWQqCzyMYGH1J6AD0AFYOpMlreWWoahFdnVLvWbdpwtpM6xRoHCRIwTDbQSeM5ZmI4rvL3SlvNW0y/aUqbBpGVAPvl0KcntgE03V9IGrfYN07RC0vI7r5RkuUz8vsDmhbp+a/NA9mvJ/kc/4Q1W8S/utEk03URpsJZtPvZrSSJfKz/qnDgEFeinGGUDv17KiigOoUUUUAFFFFABRRRQAUUUUAFZNv/yN+pf9eFp/6MuK1qybf/kb9S/68LT/ANGXFAGtRRRQAUUVT1XU7XRdKutTvpPLtbWJpZG9AB29T7Um7K7Gld2RcorEs/F+gXtvaSpq1mjXewRRSzqshZuilc53e1bdU1YlO4UUUUhhWT4c/wCQZN/1/wB5/wClMta1ZPhz/kGTf9f95/6Uy0Aa1FFFABRRWbr+u2PhvRLnVtRkZLa3UFtoyzEnAUDuSSBQBpUVlweJdDuZreGLV7Fp7g4iiFwu9jjOAuc5wOlalABRRRQAVk+HP+QZN/1/3n/pTLWtWT4c/wCQZN/1/wB5/wClMtAGtRRRQAUUVk+IPEem+GbGK71KUpHNOlvGFGSzucDA9uSfYGgDWorOt9f0e8vEs7bVbKe5dS6wxXCsxA6nAOeMitGgAooooAK5L4Z/8k90v/tr/wCjXrra5L4Z/wDJPdL/AO2v/o16AOtooooAKKKKACiiigAooooAKK56z8b+Hby41CAanbwtY3DW8pnkWMMygZ2knkA8Z9Qa27S7t760iurSeOe3lUPHLGwZXU9CCOtHmBNRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFch8QoYrjT9FjmCMh1qzBRwCHBkwQQfYmuvrnPElu2oat4esUBO2++2y4/hjiRjn/vtox+NHVeq/MOj9H+RzeoXNoPDOp6zb+CdCng06S4DxzOquTBIykgCEj+DI5H9a2NI8MAalFf6ra+G2TAa0htdLCPFJ1DLKzEk49FHTPHfm9Jn8LX9nrOn3dla3NzPqt7BNO8KBYzJPIFDTMAAxBGFBLcjAq34an8PafZwafq+madH4j0eWK2fdbIsrlnWOOeM4yQ+5TkdCSDRHo/T/g/oEt2vN/np+pteN7jUpY7HS7REitL67jtbq4kJ5V85RFUgnIGCcjAOBk5K1tVstQvNY0zwzPLpjWD20l0YhYuI2ELRqsbJ5vK5kBxkD5QMEVf8bpHJBoiTOyRtq9uCyyGMjO4DDAgjn0NXm8K6W97HeMb83McbRpJ/aNxlVYgsPv8AQlV/KiO1/N/krfc2Et/l+r/yIvD9/qFzqet2N69o0en3EcMJt4GjyDCjnILN/fx+Fb9c1s03wlqUIF06nXNQVG+1TmQ7xAQoVmOefLUck8nA6iulo6AZPin/AJFDWv8Arwn/APRbUeFv+RQ0X/rwg/8ARa0eKf8AkUNa/wCvCf8A9FtR4W/5FDRf+vCD/wBFrQBrUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFZNv/yN+pf9eFp/6MuK1qybf/kb9S/68LT/ANGXFAGtRRRQAVxWtNqeseNNN0lo7aDTkhlvUFwjSmaWJ4wpZFZcKDJkAk8jJHArta5LWLaG6+ImixTySoDpt5t8qd4mJ8yDjKkE8Z4oXxL5/kw6Mrpa6lrPi27S7uNNkbR/K+z77F2UPIu4uF83hgOAecDOMZOdvwpqV5q/h6G9vzAbh5JVPkoUXCyMg4JJ6L60ReFdLhuZ7mM36zT7fNcajcZfaMDPz9hUGkPp+gahbeFbe53MLaS6jSaTdKwMhJOe/LHtmhdv67g+/wDXY6GiiigArJ8Of8gyb/r/ALz/ANKZa1qyfDn/ACDJv+v+8/8ASmWgDWooooAK4i4Oq6149W2kW1trWwtVu7SO4iaYs7MyeYwV1AICnaMnAOeCcDt65Ge0gvPiXNHNLOh/siMqIbl4if3z5+4wz1H50L4l8/yYP4X8vzRWsoNT1XXdU1GefTXudJnNnbtJYuwQeWjsyjzflLb8E8nCjmuh8L6jc6v4U0rUrzyvtN3axzyCJSqgsoOACSe/rUUXhPS4DcmE38bXLmSYrqNx87bQuT8/XAA/Co9DnsdNvB4TtbgOdMsLcojsDKU+ZcnHX7i9APve4oW1vT9bg97/ANeRv0UUUAFZPhz/AJBk3/X/AHn/AKUy1rVk+HP+QZN/1/3n/pTLQBrUUUUAIzbVLYJwM4Aya4iwGs6z401K5uPsVq+mpHHaQywtOYlkXczEq6jecAHGcAYB6k9xXH2NjbXvjnxKJZblZFFqdsN3JFwYzyQjDPQ8mgDKjn1VdE1zxj5umPqNsl3GhksnYqluzqEU+b8qsU3H3bnOBXf2byS2UEkxQytGrOUGFyRzgEnA/GsObwTo8mkXemRtqENvdLKHEeoTnmTJc4ZyCSWJ5BHPSruk6ra3d9qemQzxvLpkqQuin5lBjRgW/MjPt7Ghdge9/X/gGrRRRQAVyXwz/wCSe6X/ANtf/Rr11tcl8M/+Se6X/wBtf/Rr0AdbRRRQAUUUUAFFFFABXMeOdS1Sw0CT+y0VHkaOOS6c8Qq8iplQOWf5uOgGMk9AenrmfiBs/wCEMuvMbannW+5t23A89MnPb60mNGZqunX1nbaN4Yjn05NOvpWtmjjs5FAjWN5Cp/ekkNsweQTk81q6LdX8PiW90OY2H2OzsreWFbW1MO0u0i4xvYYAj/WrUvhbS7ia3nlN+8luxeFzqNxlCVKkj5/QkfjVK9h0zwhNPrj3cqG8e1s5Dd3LSKq+aQCC5yP9ax6446dc0t/Ul7f1/WxbutV1qK5la10D7VZRsUyLsR3DkdSkbqFK+hMgz6Yxl9prjapI8FnY30EixsXkvbSSFY2/hHzACTn+4SMDryMsudN12a5lurfXvszbiIrU2yS2+3sX4WQsepw4A6Y4ySO81i0jnvNcFjbWNpC0jtZvJM0uBksVKAoAATtBcnPXjmempXXQ5K603UtG8eaEmmeKNU1G6uZWbUrG7uBJELfaS0ojAAj+bAGAMkgetek15Trdn4V8XXuk6z4OktZNfF/DMbqwG11j3AyGfGMDZn74yTgDrivVqpfDr3/y/D9bkv4tO3+f9fcc1rvg2DXfEmla22p6haXGmhxEltIoVt3cggj/ABHBqh8L7y+vvCcsmo3s15cpqF1EZpmyxCyED2A46DAq54i1zXNI1/Sxb6faN4fYO2pahcTiP7MB0PJGPXoc9OOtYXwd1Wwv/C95Fa3kMsyajcyvErguqvKxUkdQCOh70ob6dn+aHLp6r8mei0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFcl/wszwh/0F/wDyWl/+IoA62oxBELlrgIPNZAhb/ZBJA/U1y3/CzPCH/QX/APJaX/4ij/hZnhD/AKC//ktL/wDEUAdFc6XYXdhcWE9pC9pchvOiKDa+7liR6k85qrqnhrRdZktZNQ06CeW0dXt5SuJIipBG1xgjkDoax/8AhZnhD/oL/wDktL/8RR/wszwh/wBBf/yWl/8AiKAOlvrCz1O0e0v7SC7tnxvhuIxIjYORlSMHmsf/AIQTwf8A9Cpof/guh/8Aiapf8LM8If8AQX/8lpf/AIij/hZnhD/oL/8AktL/APEUAatl4T8N6bdpd2Hh/SrW5TO2aCyjR1zxwQMitiuS/wCFmeEP+gv/AOS0v/xFH/CzPCH/AEF//JaX/wCIoA1/FP8AyKGtf9eE/wD6Lajwt/yKGi/9eEH/AKLWuX1/4h+Fr3w5qlpb6pvnntJY41+zyjczIQBkrjqaNA+Ifhay8OaXaXGqbJ4LSKORfs8p2sqAEZC46igDvqK5L/hZnhD/AKC//ktL/wDEUf8ACzPCH/QX/wDJaX/4igDraK5L/hZnhD/oL/8AktL/APEUf8LM8If9Bf8A8lpf/iKAOtorkv8AhZnhD/oL/wDktL/8RR/wszwh/wBBf/yWl/8AiKAOtorkv+FmeEP+gv8A+S0v/wARR/wszwh/0F//ACWl/wDiKAOtorkv+FmeEP8AoL/+S0v/AMRR/wALM8If9Bf/AMlpf/iKAOtorkv+FmeEP+gv/wCS0v8A8RR/wszwh/0F/wDyWl/+IoA62iuS/wCFmeEP+gv/AOS0v/xFH/CzPCH/AEF//JaX/wCIoA62iuS/4WZ4Q/6C/wD5LS//ABFH/CzPCH/QX/8AJaX/AOIoA62iuS/4WZ4Q/wCgv/5LS/8AxFH/AAszwh/0F/8AyWl/+IoA62iuS/4WZ4Q/6C//AJLS/wDxFH/CzPCH/QX/APJaX/4igDraK5L/AIWZ4Q/6C/8A5LS//EUf8LM8If8AQX/8lpf/AIigDraK5L/hZnhD/oL/APktL/8AEUf8LM8If9Bf/wAlpf8A4igDraK5L/hZnhD/AKC//ktL/wDEUf8ACzPCH/QX/wDJaX/4igDraK5L/hZnhD/oL/8AktL/APEUf8LM8If9Bf8A8lpf/iKAOtorkv8AhZnhD/oL/wDktL/8RR/wszwh/wBBf/yWl/8AiKAOtorkv+FmeEP+gv8A+S0v/wARR/wszwh/0F//ACWl/wDiKAOtorkv+FmeEP8AoL/+S0v/AMRR/wALM8If9Bf/AMlpf/iKAOtorkv+FmeEP+gv/wCS0v8A8RR/wszwh/0F/wDyWl/+IoA62iuS/wCFmeEP+gv/AOS0v/xFH/CzPCH/AEF//JaX/wCIoA62iuS/4WZ4Q/6C/wD5LS//ABFH/CzPCH/QX/8AJaX/AOIoA62iuS/4WZ4Q/wCgv/5LS/8AxFH/AAszwh/0F/8AyWl/+IoA62iuS/4WZ4Q/6C//AJLS/wDxFH/CzPCH/QX/APJaX/4igDraybf/AJG/Uv8ArwtP/RlxWR/wszwh/wBBf/yWl/8AiKzofiH4WTxHe3bapiCW0t40b7PLyyvMWGNueA6/nQB31Fcl/wALM8If9Bf/AMlpf/iKP+FmeEP+gv8A+S0v/wARQB1tUdT0XStajjj1XTLK/SMkot1AsoU+oDA4rA/4WZ4Q/wCgv/5LS/8AxFH/AAszwh/0F/8AyWl/+IoAu/8ACCeD/wDoVND/APBdD/8AE1e03w9omiyPJpWj6fYvINrta2yRFh6EqBmsT/hZnhD/AKC//ktL/wDEUf8ACzPCH/QX/wDJaX/4igDraK5L/hZnhD/oL/8AktL/APEUf8LM8If9Bf8A8lpf/iKAOtrJ8Of8gyb/AK/7z/0plrI/4WZ4Q/6C/wD5LS//ABFZ2i/EPwtaWEsc+qbHa7uZAPs8p+V53dTwvdWB/GgDvqK5L/hZnhD/AKC//ktL/wDEUf8ACzPCH/QX/wDJaX/4igDraztT0DRtaaNtV0iwv2iBEZurZJSgPXG4HFYf/CzPCH/QX/8AJaX/AOIo/wCFmeEP+gv/AOS0v/xFAF3/AIQTwf8A9Cpof/guh/8Aia0dM0PSNFEg0rS7GwEmC4tbdIt2OmdoGawf+FmeEP8AoL/+S0v/AMRR/wALM8If9Bf/AMlpf/iKAOtorkv+FmeEP+gv/wCS0v8A8RR/wszwh/0F/wDyWl/+IoA62snw5/yDJv8Ar/vP/SmWsj/hZnhD/oL/APktL/8AEVnaL8Q/C1pYSxz6psdru5kA+zyn5Xnd1PC91YH8aAO+orkv+FmeEP8AoL/+S0v/AMRR/wALM8If9Bf/AMlpf/iKAOtrL1Hw1oOsXAuNT0TTb6dV2CS5tI5WC+mWBOOTWN/wszwh/wBBf/yWl/8AiKP+FmeEP+gv/wCS0v8A8RQBd/4QTwf/ANCpof8A4Lof/ia1NO0nTdHt2g0zT7SxhZtxjtoViUn1woAzXPf8LM8If9Bf/wAlpf8A4ij/AIWZ4Q/6C/8A5LS//EUAdbRXJf8ACzPCH/QX/wDJaX/4ij/hZnhD/oL/APktL/8AEUAdbXJfDP8A5J7pf/bX/wBGvR/wszwh/wBBf/yWl/8AiK57wN458OaN4NsLC/1HybqLzN6eRI2MyMRyFI6EUAenUVyX/CzPCH/QX/8AJaX/AOIo/wCFmeEP+gv/AOS0v/xFAHW0VyX/AAszwh/0F/8AyWl/+Io/4WZ4Q/6C/wD5LS//ABFAHW0VyX/CzPCH/QX/APJaX/4ij/hZnhD/AKC//ktL/wDEUAdbUVzbQXltJbXUEc8EqlZIpUDK4PUEHgiuX/4WZ4Q/6C//AJLS/wDxFH/CzPCH/QX/APJaX/4igC7/AMIJ4P8A+hU0P/wXQ/8AxNS2/g3wtZ3EdxbeGtHgnjYMksVjErKfUELkGs3/AIWZ4Q/6C/8A5LS//EUf8LM8If8AQX/8lpf/AIigDraK5L/hZnhD/oL/APktL/8AEUf8LM8If9Bf/wAlpf8A4igDraK5L/hZnhD/AKC//ktL/wDEUf8ACzPCH/QX/wDJaX/4igDraK5L/hZnhD/oL/8AktL/APEUf8LM8If9Bf8A8lpf/iKAOtorkv8AhZnhD/oL/wDktL/8RR/wszwh/wBBf/yWl/8AiKAOtorkv+FmeEP+gv8A+S0v/wARR/wszwh/0F//ACWl/wDiKAOtorkv+FmeEP8AoL/+S0v/AMRR/wALM8If9Bf/AMlpf/iKAOtorkv+FmeEP+gv/wCS0v8A8RVvTPHPhzWdRisLDUfOupc7E8iRc4BJ5KgdAaAOiooooAKKKKACiiigAooooAKKKz9c1I6NoGoaoIfPNnbST+Vu279qlsZ5x0obtqNK7sjQormrvxFqllLpUcmlWZbUpvIh23zfK3ls/wA37rgYQ9M84q1Y61eTeI7jRrywiheG0juvNhuTIpDu6hcFFIPyE96Otib6XNuioLy+tNPg8+9uYbaHcF8yZwi5JwBk8cniud1bxpp9nqWjQWupaXLFeXTQ3DNcr+7QRu+4YPHKgc+tAzqaKzrfxBo13fJZW2q2U906F1hinVmKjGTgH3FaNAGT4p/5FDWv+vCf/wBFtR4W/wCRQ0X/AK8IP/Ra0eKf+RQ1r/rwn/8ARbUeFv8AkUNF/wCvCD/0WtAGtRRRQAUUUUAFFFFABRRRQAUUVR1PWtK0WOOTVdTsrBJCQjXU6xBiOoBYjNAF6iuf/wCE78If9DXof/gxi/8Aiq2rq7gsrKa8uJAlvDGZJHxnCgZJ468UATUUikMoYZwRnkYpaACisXxTrFxomi+fZQJcX000VvawuSBJI7hQDjsAST7A1JrWrT6PDZXH2RriKS5jt51iyWj8whQ4HcBiMj0JPbBP+GA1qKb5ieZ5e9fMxu255x64qveXc1syCLT7m73ZyYWjG3673X9KALVFYMPiZri/u7GHRdSe5tAhmj3QDbvBK8mXByAehrS0u6u73T4573TpdPuGzvtpZEkKc/3kJBz160AXKKKha7tkvEs2uIhdSIZEhLjeyggFgvUgEjn3FAE1FFc9qOq6kvi6x0Wye1ijnsprp5JoWkIKPGoAAdevmH8qOtv67h0udDRXLeI9S17QNGbUFudNuNs8EflG0kTcJJUQ/N5px97PQ11BO1STnAGeBmjpcBaKwLPxGtxey5EMunOA1td277ixG4SI6dVZGAB93AwDmqmh+M4L6CL7erwzXOo3FlbCO2lKv5buFy2CASqEnJHQ+lHkD0Oqoorm77xDfr4oh0vStLbUIIEL6jKjqpgLD92i7mALHqRngYPcUAdJRWNoviFdbur+BNOvbZbOQRNLOqbJH/iCMrMG2ng+h46g1s0AFFYvh7WbjWzqU7W8cdlDePb2kqsSZlTCsxHpvDgHuB+btE1eXUV1RrlIoks72W3VlY8omPmbPQ8/pQv0v+X+Yf52/r7jYooBBAIOQe9FABRRRQAUUUUAFFFFABRRRQAVk2//ACN+pf8AXhaf+jLitasm3/5G/Uv+vC0/9GXFAGtRRTJXMcTusbSFQSETGW9hkgZ+poAfRWFqPiVtJ06e/vtF1GK1gXfI+YG2j6CQmnXetanFAHtvDGo3Dl1Gzz7ZPlJ5OTL2GTjv0460AbdFUdXvDYaRcXvnx2yQRmWSWWFpQiKMsSqkE8Z6GuZfxPqS61b6eJ1KzW8k/mf2Fd5G1kGNu7JB39e2PejrYOlztKK4jTvFl9fWdvNLeQ2z3F01tGG0S6ZSwkKD5t4Aztzz0zz0rt6ACsnw5/yDJv8Ar/vP/SmWtasnw5/yDJv+v+8/9KZaANaiio7iVoYHkSCSdlHEce3c303ED9aAJKKwdQ8THS7Zbi90XUYomlSINmBvndgijAkPVmAqWfWNTSS3WHwzqEivKFkYz26iJD1b/WnOPQUAbNFZuuXzabp32oXUVuiyIrPJbPPncwUAKhByWIrmx4o1M6vd2PnLi3to5w/9h3WWLtIMFd2QB5fXocn0NK9h2O2orjdF8UXmqQ6M815DBJqKI6wto9yoPyb2VZC+37oPzdOOh6V2VU01uSncKyfDn/IMm/6/7z/0plrWrJ8Of8gyb/r/ALz/ANKZaQzWooqpeajBYsizJcsXBI8m2kl6euxTj8aALdFcjqHjUReJdM0mxs7mbzlea8L2U4aCEDAYLsySWIA4xwelaV54ps7OON/sOsz75FTbBpVwxXJ+8fk6Dqf0zRuBuUVla5qEmnQQSrdxW6ySiL57OS4Ls33QFRgR0Nctc+MtTgTWmDo39mxeYoOi3Q8393vwfm+T0yfrSv1Gld2O+ormdM1y6u9Ss7WW+iEk8TTeS2j3EJdFA3bXd9owXXnB69Oa6aqasSncK5L4Z/8AJPdL/wC2v/o1662uS+Gf/JPdL/7a/wDo16QzraKKKACiiigAooqjc6vbWs7QyR3jOuCfKsppF5/2lUj9aAL1FcjaeNRe+Kr+whs7ltNs4UWS4FlcF/tDZJj2hOAF2k5x94da1l8SWr6pbWKWWrM1wG/fHTZ1ijx2d2UBc9vp24oA2KKwdV1W4s9US0jvYkeSIypCNMnuX2ggEkxsBjJHbvXOw+NdUl0/TrrdGDeXX2cr/Y10QgywyDu+Y/L0HPPtRf8Ar8APQKKxdD1ObUbq8je8im+zFUeMadNasjkbuTIxz8pHQcevNSalqtxbarp2nWVqtzPcuXn3PtEECj5pCcHnJUAdyT0AJABrUVzWr+MLHT5bJra7sLuKS5WC5RLpA8SsceYOcEKfvD0Oc8YOnZ+ING1HUJLCy1SzubuOMSvFDMrsFJxng/5yPUULUHoaVFFYFn4u03VZrqHRRJqj2kphuRbFB5Ljsd7LnPOCMjg80Ab9FYP/AAkx/tUaZ/Yuo/bDB9o8vdB/q923OfMx1PTOat2OpX91qU0E+h3dnbJGrR3M00LCRs8rtR2Ixxz356YGQDTooooAKKKKACiiigAooooAKKKKACiiigAooooAKwfGDQTeGNS017+ytLi+tJYITdzCNSzKV+uBkdM1vVTv7yW2Crb2ct1cuPkRRtUe7OeFHPucZwD0pNXVhp2dzy7XLbSIr/wvGt/4TbF/tkMVmgUDyJOX/e8rnHpzj6VvaRNo2i+MJLx9c8PJFqFvDZwQWIWEvKryNyoZuzAA556Y6Zq+IPDLSa94cv8AV5Gu9SutSMbyQAqtrH5ExCRd1AbB3dSwBOMADobbU/EOlajFpupaVNqlvI22HU7IoOOf9fGxXYcD7y5BPQLnFUt7+f6Ilq2nkvzY3x9/yBtOAGSdYsMAdT/pCGodTur/AFTV9GntdDv2TTb93uQ0luCoMEijAMvXMin6HNXNeaC71vSre5nihtbOf7XK0jgb5ApEUYz1OTv46bB/eFZevR+INVuJLjwtDNaiSExXct1mDzlB4ESsCyyj5gHZQuG/i42ytF8/0X+RT1fyt+f+Zq+H72w1/Ur/AFaPTriK5t5DYie5CHIT7wjKsRt3ZBI6kd8DHR1yOg+KNGtXs/DiaXqmlXSL5cNlPYyH5V6kSIGQjnlt2OeTXXVT8iTJ8U/8ihrX/XhP/wCi2o8Lf8ihov8A14Qf+i1o8U/8ihrX/XhP/wCi2o8Lf8ihov8A14Qf+i1pDNaiiigAooooAKKKKACiiigArkfiiqv8MPEIZQwFmx5GeRgiuurk/iNbanqXgrUdK0nSpr+6voWhXZLFGseccsXZePpn8KiorwaRUNJJmdpPirST4P0XTp7DUpxc29rZus2mXEcTbwqHMjxhMc+vPbrXQa4izvpeixj5LiYPKvpBFhj+BYRof9+sjT9S1ux8L2Vg3gjVJ7q1tYowr3FmI2kRRj5vPJAyM5259q19HstROpyX+qhfPS2it4ypGCcb5WUDoCxC4PP7sfWtptObfn/w39eZnDSKXl/X9eRzOu/EIQ3WsQadrPh2xl0tjH5OqTfvLuQKGKqBIpQc7Q2Gyc8DHPVeFPEEPirwvp+twRtEl3HuMbHJRgSGGe+CDzXKm08X+EfEuqyaJocGuaRq1z9r2m9W2ktZSAHyWB3KcA8DP9e6sFu1sYvt7xtdEFpPK+4pJztXgEgdMnk4zUR+HXy+/qVL4tP67HGeLDe3HjHwvMrvDY22qLCFx/r5HhkLHn+FQAo9SzelalvZ6A/iS80WbRNNW4jhS6hP2VP3kTEqT06hgc+zLSeMVc33hYpG8hXWFYhRzgQTUl9HcSak2t23h/Uv7UjsZLWAtLbhMMQ3I83+8o/Wktvm/wAl+o3v8l+b/Qr+B9KgLajrT2dkkk97PHZvFaRxvHbK5VV3KoYglS3JPUV0Mk+siVxFp9g0YYhWe9dSR2JAiOPzNUdJmutPj03SYtAv47SKIRNcySwbY9qgAkCQsc+wNbkrmONnCM5AztXGT9M1T0EtTidGm1geOvFBWwsDIUs96m9cAfI2MHyufyH4101hJrr6hcDUbTTobLYvkG3uXkk3d9waNRj0we3vxgeEr1dU8W+KtQgguUtWkt7dXngaIs8aMHADAHgkDpXZUgKuoX8GmWMt3cE7EAwqjLOxOFVR3JJAA7k159Z2dxB8aLC6vmzfXeizSSqGysQ81Nsa+yjjPc5Peu08Q+HbfxJaQW9xd31r5EwmSSyuDC4YAgfMOe5riU+G91b/ABH07UY9V1+bToLNt9zNqjO4lEikRnJ3FCASRjB70R+JX8/yYP4Xby/NHphztO0gHsSM15z42S50q/0vWbzVrT7a7f2dbQostsrCV0LszrNnChN3px6kEej01kRmUsqkqcqSOhxjI/AmjqmHSx53qdppN1YlLzxnpYgSSOZi93My5Rw4yGuSCMqO1dxpaX6wSNfX1reeY++F7e3MSqh6Dl23fXIrj/F2sR+ID/whsFlfjULmeD7Qj252R2wkDPIZBlNpVWA5zk4xmu5nWA20i3AjMBUhw4G0r3Bz2oW1w62OM0i9vxqHiCb7PDPexXZsrKG3hMUZwqyNI+SdoLP8zZ52jGTgGvaWu/wt4ZutCguNWSw1Bri42qsMkzFZkldRIVX/AFjk9cY6E1bvfDVp4gdbS10W307TAQZ7s2qxTzAH7kYwGQHu5wcfdHO4c/4Y8Py6f4RstQsvD9jqqOZTPY3EaLLjzWAaJ2GPu4+RsA8EEHO5bJfL8P8AMb1b87/j/wAA7jSLvWNUsL6Wa1OnO9wy2vnSRzMseANxEbFc53cbj7+lcXpM2k2Xg7V2n16ZdTiuNQO6TVHjkZ1lkCkoHAzgL2rt/CzWr6IjWXh+bQrcsxWzlt44WHq2xCQMn1waw/D2tw6FZ3en6hYawk6ahdvmLSbmZHV53dWV442Ughh3okr+75f5Ans/P/MyfP0mPQ/DCadrUn2qS7slkih1WRiQSu8FN+MdcjFd9qwvJLB7ewOy4n/drNjIhB6v74HQdzgdMkZM3irRbgIJtP1mUI4kQP4fvTtYdCMw8EetXPC19d6j4ft7q9srqzncvmK6XbJt3HaSM5GRjg4PtVPW/rf8tCVpb0t+ZxumxWtn8MbFWsoNS1ENLY6ct1Ersz+a6oOnQBdzH0UmqHhDQNG0LzNP1W0tb22nv5rA3F5CsmZlwVyWB+/lx9Qo7iuk8JaK1xoFndvdXEFxHJcCFkRCY1aZ84DqRluOcdAMY5zQ0zwoPENhrtjqOqambNtXn3xhYVE2MYbPl54POVIwV9qUX7zfl+q/4P8ASG/hS8/0f9f8OegW9vDaW8dvbwxwwRKEjjjUKqKOgAHAFSVyOv3uv+GbTQ4tItBqlksyQahcXk485YyVUMDkbnJPofpzkddTEFFFFIYUUUUAFFFFABRRRQAVk2//ACN+pf8AXhaf+jLitasm3/5G/Uv+vC0/9GXFAGtUF0t08OLSWGKXI+aaIyLjvwGX+dT1DdXcFnD5txIEXOBwSWPooHJPsOTQBxfj6PWG8MfYZL+wdr+6t7RESydSS8q55809ACenQVc0e98R+JvCkOoW+padp813G2wiwaUxHJGRmUAnjPIx9atxWF1revW+rahC1vZ2O42Fq+N7SMCpmkH8J2khV6gMScE4GJ4R16HQvCNnpt/puuJeWqukkaaPdSAkO3RljKkHsQcUtk7/ANf1+oddDqNShll8PvY3dumpTXEJhlRAYY5SRhixydi9c8k46ZPB8tv7aC88PWZttNScHU1SfVIrOOASRmQAJblEdjGXwOQxKoc53Ln0jS0m8QeEdPbVre7tHlt1N1azfK7nGCr98E844JHB7iuVtbOK++GeiaLfXn2KB9OiZ44IjLeNhePLj2krg4O4An029abupPya/P8A4A1qrFJ7GO21HSIE0827T36RxzR2kcRib5n3gvYqM/KeM55/GvV68ssUtNH12yu9TtbnSrC0XdG13pkUjTMQVDGaKLEQAJ+8wck8hcfN6ijh0V1zhhkZBB/I0+hPUdWT4c/5Bk3/AF/3n/pTLWtWT4c/5Bk3/X/ef+lMtIZrVXu0vHjUWU8EL5+YzQmQEewDL/OrFV7y+t7GIPO5GeFRFLu59FUZLH2AoA4bx8+sRWWk273lhNJLqUUqRpZup/c5mJJ808AR8/Wtiyk8S694Zsb611bTrCW8t4rgEac0vlhgGK8ygHrjOKa+kX2rXN3rOoQGKVbOW206yLBjEHHzO5HHmNhRgEgAYycmsvS/E6ab4As7P+zNfGp22mpF5C6Nd581YwNoby9vUdc496Sdk7+T/P8AyQ7Xat6f197Oj8TRi40KS1ntbe6LKsjtcZS2j2EN5khz90EA7cknp0yR5pdWcN5B4Ya30iQQvMwlvXso4JrxhHI0fyRxPmIgM20r/EmeQ2O88S2p1vwDeS3kFxEW02SRrKTA/eeWSA4GckHtnGeoOBjN1+xg1jRrLTr+8eFLeKKQW1jF5t277RjI2sY16g4HIPLAZBdrN38v1/y/rok7ped/0/zM3TbNLfxZolrHYm0ZmkdJY7aOHYqJyvzWaZBB2/KwOD1r0+vNdDkttJ8TC51W3m0r5PItbafTIt7s5HzGeGLZk9AiuT3PJwPSgcjNPoJbhWT4c/5Bk3/X/ef+lMta1ZPhz/kGTf8AX/ef+lMtIZrVT1LUY9Ot95jeadztht4+Xmfso/qTwBkkgCrlN2J5nmbV3427sc49M0AeaeFJbma+13U9UvtSg1aW/e3nFhZGeFUi+VERjC3Aye/JJOBmuh0DULu58Y6raNqV/cWcFlbyJHd2qwkO7yhj/q0J4Qe3Wq/hTRop11yac30ZfWLoqI7uaJSN/UBWA/Gjwu1tN448Qy2S35gitrW3d7wTZ81WmZlBl5OFdDxx8wPeiOy9F+QS+16/r/l+Be8bLDNokkc0NuI4R57XV2uYLXAP7wr/AMtGHOE7nGccGuCvdPivNW0LZoEltbPZSs4ltI0muZQEBM0ccEisoVv7oG4npiu3+IWmLqHhO/dxLMY4wYYByvmbhhsDlj6ZyB1AzzVLxfZW+tXUa3NzJI1lIGgstNiE00jcHErFSEQ4A2kBeMsTwAl/X5f1/Vn/AF/X9f8ABoeH7dY/HFlbpaNaulpNN5iQRxbkDIpQg2kbEEsD8rfwivSK888Ly2ul+IZ21GOSwurj/R7Wzk0xEcDOSTNFEEctgHajMox1J6eh1XRE9WFcl8M/+Se6X/21/wDRr11tcl8M/wDknul/9tf/AEa9IZ1tFFFABRRRQAVja/q1zZWksGlxJcao0ZaNHJ2RDn95IR0UYPHViMDuRs1VvY0WwvGVFDPGxYgcsduOfwAqKjtFsqGskjgfA7Rw+D9OnGq6+s97ELy5Mem7w80g3u27yDnk8HJ4xXR+Db67v7XVHur24uhFqM0MLXEKxOsa4wCoVffqM1Q8I6PbW/w/0Sa5OqK6adA0kcd3c7gfLGQEVv0A/CrHw/aObSNQubdbkWtxqVxJA1ysgd0yAGPmfN2PXmtpaTkvJ/mjNawT8/0ZR8aC3k1PT7max3bZlt1PkJLPdEtkwwpJ8oXjc8hxhV49RzEGkpL4m1lzoiQRrJF9nto7QMkUezKnYLWUI5yzHkHkDtXZ65pqp4x8OajiSacXM4Luflij+zyfKMDCrnGT1JxknAxhavpsV9rD6xGl1rF+0TJ9m02CFrZFHTMkqFHcEAEk7sHhR0rPb+v6/q/zt6/1/X9fhq+AUBu9cZIWtliuUgeLYiK7CNG37RBEwOHA5z0/OtdaZd3Wrarp51xpY7uTOoXSRrF9ltv4bcPz85UnpjAYseWG694FubG3tJdNFxu1Jna4uIhprWezOABtMaZAAA3EZOO3AFSDR1sdfvtVl0PRNGaW6Yi8b/Srq7OPvRqAPLLAZwNxJzlap7r0/wAv6/4Als/U1rrV7Lw9d3E8soFi2m/aYn3Fgwhzu55ySrpjucGrPg3T5tM8JadBcrtumjM9wPSWQmRx/wB9Ma53xB4d1jxtb2o3iwttPkFzaPfQq011Mv3TIgwEiPdfvHPIXGDv+HfEV5qks9jqmi3mm6ja4EwdC0EmejRSjhlOO+COhFC633/r+vkD6W/r+v1OgrDt9BfTLu7k0VNKsEupPNmAsCXkfuWZZFz37d63K4rSLfWvD11rMUur3HiK8vLky2tsy7Es1PRXfJCLyOOuBlVJyKXX+v6/4YDFutU1i0+J52T2MzOttpbyfZXCoziab7vmckBF7/xjpjnuIbTXxq0M8+sWTWKoyyWsenlC7Ho28ynGPTGOT7Y5bVdEm0Ky0S7eO51C4XW1v9TntrdpXZmikUsI0BbauUUAA4UCteTxX9r1nSbXTtM1qRJbhhcySaZPbpEnltgs0qKMbtvAOacdref6L9Wwlvfy/wA1+SR1NFFFIAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAyfFP/ACKGtf8AXhP/AOi2o8Lf8ihov/XhB/6LWjxT/wAihrX/AF4T/wDotqPC3/IoaL/14Qf+i1oA1qKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigCGa0guJoZZU3tCdyAscA+uOhPoeo7damoooAKKKKACiiigAooooAKKKKACsm3/wCRv1L/AK8LT/0ZcVrVk2//ACN+pf8AXhaf+jLigDWooooAKKKKACiiigAooooAKyfDn/IMm/6/7z/0plrWrJ8Of8gyb/r/ALz/ANKZaANaiiigAooooAKKKKACiiigArJ8Of8AIMm/6/7z/wBKZa1qyfDn/IMm/wCv+8/9KZaANaiiigAooooAKKKKACiiigArkvhn/wAk90v/ALa/+jXrra5L4Z/8k90v/tr/AOjXoA62iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoorA8WXS2OnW85guZ2a5jhWOC5mhPznGT5QLHHXGD0oA36K8nu9WvoLnUojBqMbTQgaajXuoZeTy2JEeYvnPAOD6elb2g3VxLq+l21zp+pIzwtK88l9e7VdVXhkkRUOdx4yRx9KFqDO6orE8R3N21vHpWlz+TqV9lUmAybeMY3y4/2QcD1ZlFZ19rcmq6TNZ6Gb6e5ZJFttQgeDaZYyAWOXGQHwCNuDzgYpX0uO2p1lFc1pviW8utQj0t9FvHurfy01CZWhWOBmTcDjzCWB9BkgHn36WqaJTMnxT/yKGtf9eE//AKLajwt/yKGi/wDXhB/6LWjxT/yKGtf9eE//AKLajwt/yKGi/wDXhB/6LWkM1qKKKACiiigAooooAKKKKACiiigAorkbjx4IfFT+HF8N61LqIhNwiobYLJEG271ZpgMZ7HB9q1tL16TUNRmsbjRdS02eKJZR9rERWRSSPlaORwSCORnIyPWhag9DYorIm1+3tv7YmuF8uy0pA00+c5OzewC47KV787sdqq6Tret6jdWckvh9IdLu4POjukvVd4gQCqyRlVwSD/CXAPehag9DoaKwvGOqSaT4WvJreRUvJQLa0JbH76Q7E59mYH6A1nape3tn4Way0651GfWbOJRFcSWEzLPKmOHITBVsEEj1yDnBo/r+v66jsddRWPb+Iraa8trP7NqHnzAhm/s+cRxkDPzOyAL7ZxmtC7S8eNRZTwQvn5jNCZBj2AZf50CRYorlzqWujxWuh/atO5sTd+d9jfs4Tbt833znP4Vs6Vb6nbxTDVNQgvXaUtG0NqYBGh6Lje2ceuaFtf8ArsHW39dy/RUV1cw2VrNdXMixQQoZJHboqgZJrkLH4m6Tda7baTd6brWlyXbFLSfUrIwRXLdghJzk9sgdR3OKFq7BsrnaUUVyXjK8W21bwxHPfSWdnPfSJcMty0AZRbysAzAjjcF79cUAdbRXB+JrzQbXwprFxY+IXF5FZTPAU1qVmDhCVwPM5OcV2OlM76RZNJI0jmCMs7dWO0ZJ96Frfy/W/wDkD6f12/zLdFcyb3UW8RZVbmAgtbtZS7WiuANrieNuoAUlT0+ZgCOMnGg8R6vp83iO+ktkuoI9Xt7SOKS8ZREHWFCE+QjAaTJ6c5oWrt/W6X6g9Dv6KQEEkZGR1HpXE+INcbUPEEOl6d4istKj06VZr6eWRSZHxlYNpYEjB3Me3yjqTg62Dpc7eiuK07xgW1i8fUNe8PjRYE2JKHEUkkoPzMAZGGwdMnqc44wT2gYMoZSCCMgjvR0uAtFchoWtyXV9q2rz3V1Np090bawgggeZVWH5Xf5FJBZ93XsBVbw74xsr7XPEhS8vbu3iu0SCOK0mkEYWFN4AVCQd+7IPftR/lcDuKKr2F4moWMN3HFPEsq7glxC0Ui+zKwBBqxQAUUUUAFFFFABRRRQAUUUUAFZNv/yN+pf9eFp/6MuK1qybf/kb9S/68LT/ANGXFAGtRRRQAUUVzmt6jKdSjhgv/sVnpw+2ancgAgRgErFyCPm5Y9wq9twNAHR0VyWoatqepm0k0OzvUlhlimcl4DHPbsfmBHmc5UEqeCCByBmtHRPEb67PIYNJvIbJN6C7meLa0iOUdNquW4IPOMHB56ZA8zcooooAKyfDn/IMm/6/7z/0plrWrJ8Of8gyb/r/ALz/ANKZaANaiiigAoormNU1dk1Y3J1D7Ho+kAvfy4XE0jDCxZI4ABDHHOWQetAHT0Vyl5qWr3epWVxplhfxpaz7L6F2gKyxMm7AHm/eBKEEe456Vo+H/EDeIYjdQ6Xd29g6LJb3M7R4nB64VWLDHuBmgDaooooAKyfDn/IMm/6/7z/0plrWrJ8Of8gyb/r/ALz/ANKZaANaiiigAoorlp9aZNYk1OS+MOjWx+xRQrt/026ZgDgt2UgKOR827JwOTrb+v66AdTRXIXes6nFqSaxFZX8ekW8MyahDI0B5ToyfvMgqQwPqMcHANbmi6rNq9s1zJpd1YwkhoDcPGTMhAIYBGbb9GwaFqDNOiiigArkvhn/yT3S/+2v/AKNeutrkvhn/AMk90v8A7a/+jXoA62iiigAooooAKKKKACivN/EWo3ePEFtpdlqbXdpuSGWK9vXLuY1cFURGTguBtJ7e9QQapcXmtIbS3v57BIJUl8q/1FkE6uowWEWQwG4bfrnkULWwPQ9PorF8KzG50CK6e2uLZ5mdmhuLiWZlwxHWUBgCADjA61nRa441STVJrtzp10y2WmWKbAbpxlmlBbHXDBeQCq553CjrYOlzq6K4y48QX+nXtxr01pfjw+LRjPE5hZo5VYAMmJM4IyCvqBgZJz02l3t1fWrS3emXGnuJGVYp5I3LL2bKMw5HbORz9aALtFFYup+JINP1FNMt7O71HUWi882tmE3JHnG9i7KqjPAy2T2BwaANqiszQtesfENg13ZM48uRoZoZV2yQyLwyOvZh/wDXGRVjVLx9O0q7vY7aW6e3heVYIRl5CoJ2r7npQ9Fdgld2LdFeb6d8W2vdOjun8C+LgSDvMFgJIwQcHDllyBjrgV2+gazD4h0Kz1e3guIILuMSxx3ChXCnoSASORz1707CuaNFFFIYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVy/jrUItO8O3Mt5cSRWWw+ZFbE+fc8HMaH+EEDlhyFyflxurqKw/FekPq/hvU7W1hja9uLV4I3bAPPbPYZ5pNX0GnZnB63pV5p8vhy41gadFDDA9nHbW0A+zQs2zAUNFL85ICjC8hTjGSK0dB0yRvG1kX0xFtIbWabzG09V2zBkVMObaIqcM/QnPNb+taI+qXDE6VDeTJgQzak6tBB/tRxgNlgRnkKT03Yqhomg6n4e1uW5/sbTryW7Ije+tJRbiOPOQogK4VR7O7HqT0ApP3rv+v6epLXulbxV/ZD+MI7AWt4uqXtqoubuG3nl226sQFUICockkbiBtBJJzgHZ1WSHQdFsdQhs2s7HSpVEkQUfLbEbGICk8KGD+vyGrWqaRf3eoPctq+of2esQA02z2Qs785Pm8PyMcBl6decVUl8Ltq/7jVFig0rfvbTrdiftJHQ3EnBft8g4yOWcVKvay/rX+v+AU97/1sP8ABUck+mXWtTRlJdYumvArDlYiAkQP/bNEOPUmulrktG0LXvDWpx2Nhd2954ZwdkN27C4sx2RHAO9PQNyBgZ4rrap26E69TJ8U/wDIoa1/14T/APotqPC3/IoaL/14Qf8AotaPFP8AyKGtf9eE/wD6Lajwt/yKGi/9eEH/AKLWkM1qKKKACiiigAooooAKKKKACiiigDzDWJNRi+Pdo2mWtrcz/wDCPkFLm5aBdvnHJ3KjnPTjH4122nahqEGk3174ghgtHt3kdlhkLxrEoyCGKqW45yQO9YUvg3W5PiCnitfEFkrR25tFtf7MYr5Bctgt52d3P3unt2rqdW0/+1LA2Zl8uN3Qy/LnegYFk/4EAR9DSXwpev4u438V/T8rHD+LdJ3fB3Vpb37RHdtaT30qx3Dx/vXBYq20jeozt2tkYUcV1PhHToNO8M2CwPcuJbeKRvtF1JOQSg6F2O0ewwPak8X6HeeJPDd3o9pqEViLtDFNLJbGY+WRghRvXB9zn6dxY8O6dqGk6Lb2GoX8F89uixRzRWxhyiqANwLvluDkggc9Kpfa+X6/8Al9Pn+Nv+Ccz8S9NN5pEd3cFTb2d1aGCP1la4jUufopIH+83tW3qOqzaZ4z0e0bLWmqxyw4/wCecsY8xSPqu8H6LT/GGl3WseHXsrNFaZrm2fDMANqTo7HP0U1PLZatLMspu9MLRsTEX092ZMgjg+b1wccYpLRfN/khszfDNikviDxFrxGZLu6FtEx7RQKEwP8AgYk/Stm4sLmadpI9XvLdDjEcSQlV/wC+oyf1rOs9I12xtbK2h1jTxFAwM3/EubdMOrc+dwSSTnB5rfOdp2kA9iRmjog6nDnTrr/hZ6R/21f7v7GY+Zsg3Y84cf6vGPwz710cGjXMOqx30mvanOqRmP7LJ5IhbPchYwc++f5mszTtO1uXx7d6tqNvaQ2cNiLO3aGUu05L7y5BA24wBjn6mupoWkV8/wA3+gP4n8vyQ2SNJU2SIrqcHDDI45Fcv4m0tPE2r6Pp4TMWnXseoXMv9woDsjH+0xIPsoOeoz0GoxXk+nzxafdx2l264jnkh80Rn125Gfz/AD6VxFj4J8aWiRwN8RC1rvzMkejxJJICct+83Ehjz83XnNC3B7HoNcd4z0KVtEmutItb671lW/0NhfSf6PI/yGQBnCjaGPA7cdM12NFDQJnG3dvBbaRO+oaR4hlt4oGNw0mpgh1C/MSPtGORnjFa3hm3sZNNh1izhv4f7QgjlMd5dSSsq7cqNrOwU4P8NZni208U6rHPodjbWLabqMTRTX7SlHtUPDDy+fMYqTgggZ6gdT1cUSW9ukMS4SNAqqPQDAFCejf9eYW2X9dLHCC6ms/FetaqkWoGGS2iitJbq2uXjh5dpm27cqPufKMA7RyByM3R9U0zxF4V1HSLCadDb34kivY7Oa6NwyyLMJpFVBjewPAI46Y4x2t9pFzrzeTqjpFpectZRHJuB2ErcfL6ovBxyxBIrJsfCNyE1WQXMmmXz6lNcWV1bFWZY2CgBlOVZTt5Q+gPBAIS8+36r+v60b7rv+jLPhkahfXWrXN/qE8pkKQBBpUtgqbQcsnmMzNnd1BxxVLwy39kav4ntLDR7iWBdTUg27RBQTbQ5zvdSTnknvnrmt/QYvEEUMq6/d6dcSB8QtZW7x5Ud23MeT6DgeprNjsfEek63rE+nWelXlpqFwtypuL6S3eNhEkZUhYXBHyA5yOtPZ/L/IXT5mDPa6xD8LptFk8P6h9q8plIRoZBzIT0WQk8HsDXeXkTX1nLb29wI958t5EPzIP4sejY6emc+1ZX2zxh/wBALQ//AAczf/ItS+G7TWraK+fWns/NuLp5oorRmdYkIGFLsF3HjrtHWi19GG2xzGiOdH8N6lpmhQRx3txq13b2Uar8seHI8xv9lF5P0A6kVQ062j8Fy63d2SSS22kXkMdwg5eWBrWHzG93yBJ77SO9ddonh2OG31JdTsoJDdX88oEgDgxtIWXP88VU0rwbp0Wua1c3mh6abeW7imst1vGxTbCikgY+X5lJH50K+ney/T/gjdrv1f5nTWN9a6nZQ3tjcR3FtMoeOWNtysPY1YqG1s7axt1t7O3it4E+7HCgRR9AOKmofkIKKKKACiiigAooooAKKKKACsm3/wCRv1L/AK8LT/0ZcVrVk2//ACN+pf8AXhaf+jLigDWooooAK83W30DUvGGoaZb6bd+TBdeffL9lmcXVyQGALsNiRjg4yNxx/CDu9IrnJdFvxeT3N3qWoamjzE29lG6W0MC9g5TDOOx3FuD900LR3B7WKfifXn8MTxas1tKyXlsbVYQNzG5GWhT5cj5i0i5zjOK2vDWlNonhvT9OkYPNDCBK4/ikPLn8WJP41j3Hgi31yIDxAUkjRSLaxsyY4LQn+NMYLSDs5xjsq85ueHbXxNp089lrF5aajYRgC1veUuXHPEq42kjgbgRnrjNC7f1/X/A7A+50NFFFABWT4c/5Bk3/AF/3n/pTLWtWT4c/5Bk3/X/ef+lMtAGtRRRQAV5rosGg6h4guIbDSrwWem3cjLA1rMRNdBiWdpJBsAViSq7hz82Bha9KrmP7E1GFnkvb691uZ3cxRSSJbW0SnO1XVAN4xgEkPyM4FGzuHSxn+LdXudDuLiG3ic3Gt2y29iAucXedmGI4HyurfSJq6zS9Pi0rSbPToP8AVWsKQp9FAA/lXN3XgO31lDNrV1JJeIoWzNoTCmn4IIMAHRgQMsck4xgL8tafhyLxLbJNbeIJ7C7ETbYLy3DI8y+skeMK3+6ce1NbNf15fdd/8EH0f9f1oblFFFIArJ8Of8gyb/r/ALz/ANKZa1qyfDn/ACDJv+v+8/8ASmWgDWooooAZKqPC6yDchUhgB1FedeDI9Ev54r3TNKvRZ2GYtOt3tpV2AfK0rSS4DMeQAGO1fdiB6M6s0bKrlGIIDAZIPrzXMR6FqNvAq3lzca9fOnzS3siwWq9OPJjGPcZVj/tChaO4PYyPFFzL9tvfCKK/m6/JGbdgDgQsNtzz22qhb6yLXfoqoiooAVRgAdhXH3ngKPUc6hd6pc/8JApD2+pRDZ9kI6LFHkgR8nKnO4Hkngjb8P8A9vixaPxCLBrpHKrLZM22VezFWHyk9wCaFtb+vL7ge9/68/vNaiiigArkvhn/AMk90v8A7a/+jXrra5L4Z/8AJPdL/wC2v/o16AOtooooAKKKKACkOdp2gE9gTilpGAZSpGQRgigDgDJd6n48mj0+a1n1C0tm8+6njZo7RXJVY4ACMtlWLsepXbx0XnNC0+OK0msPs63FzZTyRTZtFklHzsVMmLN/mZcNksc5z3rvpNHuLfxDf3tvDIlo+nW9tEloyI+UklZlUNgKMOvPHXisTUPBFxeQSpZaTotlbuRvhYZuLn1LXGwmJj0JAkJ6hgeaXT+u43u/66I0fDVhDH8NVTV7Hyxc2skt/DFaiF33A7vkjVTuxxwA3TvWf4IXTNQaLWbPTboIIxDZRvbyILaA453y48xmwNxUtgAKM4JbpNMi1B9BksRYJockMfkWvlSrOsYC4VlGACBxwQCcdBVJdE1C3jWNpZtXviqlr3U5AIFOeqwR4XIPIAVeON9V9psn7KMXVJ3u9YHgnYxafUFvmODj7EG85iT05lBjx7iuq8RppL2Ef9so09oJR/oohaYXDYOFMSqxk7ttAP3c9qxbvwCJW/tS31a5j8TK29dVYA/9szH93yf9j8cluTvaKurS6dA/iC3sF1GMnLWbM0eeRuXcAVyO3PWl0t/X9frqO+t/6/r9NDA06y0C7Eo8PeILzTEiGbiytpgoiX0aGZWMH/AVQ1Th0zU9F8cN4g0jTX1PRdS0+G3McEqJNAYx8jASsoKkH1zk9PXsb/RtK1Vom1HTLO8aE7ojcQLIUPqNwOPwrO13Q9U1tmtRrhsdKkXbLFa2+24cdx5xYhQfZAfejzX9aP8Az+QeTOW+GU8up+I/G2somyxutSWOAK25WaNdrsD0OeOR+tejSSJFG0kjqiICzMxwAB1JNVdL0ux0XTLfTtOtkt7S3XZHEnQD+p7knk1Jf2NtqmnXNheR+ZbXMTRSpkjcrDBGRyODQ9rLorfcgW931ZzvirUIp/B62+jXELtqzJYWktuwZcSHazKRxhU3tx/drpbW2is7SG1gQJDCixxqOygYA/IVz2m+CdO0ebRo9PJh07SUmMFqcsTLJ1kLk5yAXGMfxn0xXTU9Ft/X9a/eHr/X9aBRRRSAKKKKACiiigAooooAKKKKACiiigAoorJ/si+/6GPVP+/dt/8AGaANaisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoA1qKyf7Ivv+hj1T/v3bf/GaP7Ivv+hj1T/v3bf/ABmgDWorJ/si+/6GPVP+/dt/8Zo/si+/6GPVP+/dt/8AGaANaisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoAPFP/Ioa1/14T/+i2o8Lf8AIoaL/wBeEH/otahuvD1xe2c9pceIdUeCeNo5F2Ww3KwwRkQ56Gi18PXFlZwWlv4h1RIII1jjXZbHaqjAGTDnoKANyisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoA1qKyf7Ivv+hj1T/v3bf/GaP7Ivv+hj1T/v3bf/ABmgDWorJ/si+/6GPVP+/dt/8Zo/si+/6GPVP+/dt/8AGaANaisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoA1qKyf7Ivv+hj1T/v3bf/GaP7Ivv+hj1T/v3bf/ABmgDWorJ/si+/6GPVP+/dt/8Zo/si+/6GPVP+/dt/8AGaANaisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoA1qKyf7Ivv+hj1T/v3bf/GaP7Ivv+hj1T/v3bf/ABmgDWorJ/si+/6GPVP+/dt/8Zo/si+/6GPVP+/dt/8AGaANaisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoA1qKyf7Ivv+hj1T/v3bf/GaP7Ivv+hj1T/v3bf/ABmgDWorJ/si+/6GPVP+/dt/8Zo/si+/6GPVP+/dt/8AGaANaisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoA1qKyf7Ivv+hj1T/v3bf/GaP7Ivv+hj1T/v3bf/ABmgDWorJ/si+/6GPVP+/dt/8Zo/si+/6GPVP+/dt/8AGaANaisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoA1qKyf7Ivv+hj1T/v3bf/GaP7Ivv+hj1T/v3bf/ABmgDWorJ/si+/6GPVP+/dt/8Zo/si+/6GPVP+/dt/8AGaANaisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoA1qKyf7Ivv+hj1T/v3bf/GaP7Ivv+hj1T/v3bf/ABmgDWorJ/si+/6GPVP+/dt/8Zo/si+/6GPVP+/dt/8AGaANaisn+yL7/oY9U/7923/xmj+yL7/oY9U/7923/wAZoA1qybf/AJG/Uv8ArwtP/RlxR/ZF9/0Meqf9+7b/AOM1Cvh64S8ku18Q6oJ5Y0jdtltyqliox5OOC7fnQBuUVk/2Rff9DHqn/fu2/wDjNH9kX3/Qx6p/37tv/jNAGtRWT/ZF9/0Meqf9+7b/AOM0f2Rff9DHqn/fu2/+M0Aa1FZP9kX3/Qx6p/37tv8A4zR/ZF9/0Meqf9+7b/4zQBrUVk/2Rff9DHqn/fu2/wDjNH9kX3/Qx6p/37tv/jNAGtWT4c/5Bk3/AF/3n/pTLR/ZF9/0Meqf9+7b/wCM1DbeHri0iaODxDqiI0jyEbLY/M7F2PMPdmJ/GgDcorJ/si+/6GPVP+/dt/8AGaP7Ivv+hj1T/v3bf/GaANaisn+yL7/oY9U/7923/wAZo/si+/6GPVP+/dt/8ZoA1qKyf7Ivv+hj1T/v3bf/ABmj+yL7/oY9U/7923/xmgDWorJ/si+/6GPVP+/dt/8AGaP7Ivv+hj1T/v3bf/GaANasnw5/yDJv+v8AvP8A0plo/si+/wChj1T/AL923/xmobbw9cWkTRweIdURGkeQjZbH5nYux5h7sxP40AblFZP9kX3/AEMeqf8Afu2/+M0f2Rff9DHqn/fu2/8AjNAGtRWT/ZF9/wBDHqn/AH7tv/jNH9kX3/Qx6p/37tv/AIzQBrUVk/2Rff8AQx6p/wB+7b/4zR/ZF9/0Meqf9+7b/wCM0Aa1FZP9kX3/AEMeqf8Afu2/+M0f2Rff9DHqn/fu2/8AjNAGtXJfDP8A5J7pf/bX/wBGvWv/AGRff9DHqn/fu2/+M1T0zwo2jadFYWGvapDaxZ2Jtt2xkknkxE9SaAOiorJ/si+/6GPVP+/dt/8AGaP7Ivv+hj1T/v3bf/GaANaisn+yL7/oY9U/7923/wAZo/si+/6GPVP+/dt/8ZoA1qKyf7Ivv+hj1T/v3bf/ABmj+yL7/oY9U/7923/xmgDWorJ/si+/6GPVP+/dt/8AGaP7Ivv+hj1T/v3bf/GaANaisn+yL7/oY9U/7923/wAZo/si+/6GPVP+/dt/8ZoA1qKyf7Ivv+hj1T/v3bf/ABmj+yL7/oY9U/7923/xmgDWorJ/si+/6GPVP+/dt/8AGaP7Ivv+hj1T/v3bf/GaANaisn+yL7/oY9U/7923/wAZo/si+/6GPVP+/dt/8ZoA1qKyf7Ivv+hj1T/v3bf/ABmj+yL7/oY9U/7923/xmgDWorJ/si+/6GPVP+/dt/8AGaP7Ivv+hj1T/v3bf/GaANaisn+yL7/oY9U/7923/wAZo/si+/6GPVP+/dt/8ZoA1qKyf7Ivv+hj1T/v3bf/ABmpbXTbq3uElk1u/uUXOYpUgCtx32xg+/B7UAaNFFFABRRRQAUUUUAf/9k=']	['bio_137.jpg']
bio_138	MCQ	The researchers obtained a homozygous mutant rice with increased grains per ear, and crossed the mutant with a homozygous common type rice. All F_1 were common type. Among the F_2 plants obtained by self-pollination of F_1, the number of plants with mutant traits and common type plants was 108 and 326 respectively. The researchers further used SSR technology to detect the DNA sequences of some F_2 plants and determine the chromosomal location of the gene that controls the increase in the number of grains per ear. The results are as shown in the figure<image_1>. The following analysis is correct () Note: SSRs are simple repetitive sequences in DNA. The SSRs on non-homologous chromosomes are different, and the SSRs on homologous chromosomes of different varieties are also different. The common type and mutant are parents respectively, and 1 - 8 are the plants tested, among which plants 1, 3, 5 and 7 are mutant characters; plants 2, 4, 6 and 8 are common type characters.	['A. The inheritance of mutant traits and common traits conforms to the law of separation', 'B. SSR linkage between genes to be tested can improve the accuracy of detection', 'C. The gene that controls the increase in grain number per ear is located on chromosome I', 'D. Among the tested F_2 normal type plants, some plants were heterozygotes']	ABD	bio	遗传与进化_遗传的基本规律	['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bio_139	MCQ	Single-gene recessive polycystic kidney disease is caused by mutations in the P gene. The figure <image_1>shows the results of sequence testing of P genes on homologous chromosomes of a patient and his parents (only one chain is listed for each gene sequence, and other sequences not shown are normal). The patient's father and mother had ① and ② mutation sites respectively, but neither of them had the disease. The patient's brother had ① and ② mutation sites. The following analysis is correct ()	"['A. The site ① of the unmutated P gene is A-T', 'B. Mutations at both ① and ② loci lead to changes in P gene function', ""C. Exchange occurs between ① and ② loci on the patient's homologous chromosomes, allowing it to produce normal gametes"", ""D. Regardless of other mutations, the ① and ② mutation sites of the patient's younger brother's somatic cells will not be located on the same chromosome""]"	BCD	bio	遗传与进化_遗传的基本规律	['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']	['bio_139.jpg']
bio_140	MCQ	There is a homozygous mutant strain A of corn kernels. When A strain A was crossed with a wild type plant, all F_1 grains were normal, and the function of F_1 gametes and the vitality of fertilized eggs were normal. The following cross experiments were carried out using F_1 <image_1>to count the number of normal grains and small grains. Certain genes from female parents are known to be non-functional in corn progeny. The following statement is wrong ()	['A. Some genes from the maternal parent are non-functional, possibly due to methylation', 'B. Normal grains are dominant traits, and grain traits may be controlled by two pairs of alleles', 'C. When F_1 produces gametes, it follows the law of gene separation but not the law of free combination', 'D. F_1 was self-bred, the phenotype and ratio of normal grain: small grain =13:3']	CD	bio	遗传与进化_遗传的基本规律	['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']	['bio_140.jpg']
bio_141	MCQ	The straight and curved wings of Drosophila melanogaster are controlled by alleles A and a on autosome IV. There are two existing ortho-winged male flies A and B, both of which only contain 7 chromosomes. Both are caused by the migration of one of the autosome IV to the end of a non-homologous chromosome, and the transfer of the autosome IV centromere is lost. In order to investigate the transfer of autosome IV, <image_1>a hybridization experiment as shown in the table was carried out. It is known that during meiosis of A and B, the untransplanted autosome IV randomly moves to one pole; the viability of gametes and individuals is normal. Regardless of other mutations and chromosome swaps, the following inferences are correct: ()	['A. ① The genotype of the middle parent female fruit fly must be Aa', 'B. ② The genotype of the parent female fruit fly must be aa', 'C. One chromosome containing the gene A must be transferred to the end of the X chromosome', 'D. The chromosome containing gene A in B must be transferred to the end of the X chromosome']	AC	bio	遗传与进化_遗传的基本规律	['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']	['bio_141.jpg']
bio_142	MCQ	The maximum lactate steady-state refers to the maximum value (threshold) when the lactate production rate and clearance rate reach balance during constant load exercise, and is also the optimal load intensity to improve endurance. As shown in the figure<image_1>, the blood lactate concentration values of multiple tests under constant load are no longer stable when the intensity of constant load exercise is higher than the threshold. Lactic acid produced by muscle cells can be converted into glucose in the liver and reused by cells. The following statement is correct ()	"['A. When lactic acid increases, plasma pH remains stable due to the content of\\(HCO_3^-\\) and other substances.', ""B. At constant intensity of exercise, the subject's blood lactate threshold was approximately 4 mmol/L"", 'C. When the intensity of constant load exercise is above the threshold, the time from exercise to exhaustion is generally prolonged', 'D. A large accumulation of lactic acid can make muscles sore and weak, and its transportation to liver cells requires tissue fluid.']"	ABD	bio	稳态与调节_内环境与稳态	['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bio_143	MCQ	In order to study the reasons why the heavy metal arsenic in soil inhibits the growth of Arabidopsis thaliana, the researchers tested some indicators of Arabidopsis roots treated with high concentrations of arsenate. According to the map <image_1>analysis, the following speculation is correct ()	"['A. Arsenic treatment for 6 hours reduced the content of cytokinin in roots', 'B. The inhibition of root growth by arsenic treatment may be related to the excessive content of auxin', 'C. Enhancing LOG2 protein activity may alleviate arsenic toxicity to roots', ""D. After suppressing root growth, the plant's ability to absorb water and inorganic salts decreases, which affects growth""]"	BCD	bio	稳态与调节_植物生命活动的调节	['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bio_144	MCQ	The population growth rate is equal to the birth rate minus the death rate. The relationship between the growth rates of A and B populations of different species over a period of time and the population density is shown in the figure<image_1>. It is known that the population density gradually increases over time. a is the population density corresponding to the minimum population number required for population continuation; one of the population A and B has intra-specific mutual assistance such as joint resistance to natural enemies. The following statement is correct ()	"['A. There is intraspecific mutual assistance in population B', 'B. From a to c, the number of individuals increased per unit time in population B gradually increased', 'C. From a to c, the number growth curve of population B takes an ""S"" shape', 'D. From a to b, the age structure of the A population is declining']"	AC	bio	生物与环境_种群和群落	['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']	['bio_144.jpg']
bio_145	MCQ_OnlyTxt	The spermatogonia of a diploid organism underwent mitosis once in a medium containing\(^32\)P to obtain two daughter cells. One daughter cell was transferred to a common medium without\(^32\)P for one complete cell division. During nuclear DNA replication, one adenine base of a DNA molecule mutated and transformed into hypoxanthine (I). It is known that hypoxanthine can pair with cytosine (C). Without considering other mutations, the phenomenon that cannot occur in this cell division is ( )	['A. No hypoxanthine on chromosome containing\\(^32\\)P in daughter cells', 'B. Half of the daughter cells contained hypoxanthine but not\\(^32\\)P', 'C. Both secondary spermatocytes contain hypoxanthine', 'D. Among the four sperm cells, 1/4 contained hypoxanthine and\\(^32\\)P']	D	bio	分子与细胞_细胞的生命历程	['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bio_146	MCQ_OnlyTxt	Aphids are one of the most destructive pests, sucking on plant juice and spreading plant viruses. Plants infested by aphids release methyl salicylate (MeSA), which is bound by receptors in neighboring plants and converted into salicylic acid (SA). SA activates the transcription factor NAC2, thereby producing more MeSA to repel aphids 'infection and attract their natural enemies. Based on the above information, the following analysis is correct ()	['A. There is a parasitic relationship between aphids and viruses. Vaccination with the virus when the number of aphids is K/2 has the best control effect.', 'B. MeSA is a chemical message that can be transmitted to organisms of the same species and different species', 'C. After treatment with MeSA, both wild-type and NAC2 knockout mutant increased SA content but different MeSA releases were observed', 'D. Compared with aphids that carry the virus, aphids that do not carry the virus have more difficulty improving the defense response of surrounding plants when attacking 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bio_147	MCQ	The colorless and colored aleurone layer of corn seeds are a pair of relative characteristics. The existing three aleurone layers A, B and C are all colorless and homozygous plants. The researchers crossed these three plants with each other, and the obtained F_1 was then selfed to obtain F_2. The phenotype and proportion of F_2 were counted. The results are shown in the table.<image_1>The following analysis is correct ()	['A. The color and color of the aleurone layer are controlled by at least two pairs of alleles located on non-homologous chromosomes', 'B. The genotypes of F_1 in the three hybrid combinations were the same, and each pair of alleles was heterozygous', 'C. There are 12 related genotypes for plants with colored aleurone layer and 15 related genotypes for plants with colorless aleurone layer', 'D. F_1 of cross combination 1 was crossed with parent A, and the ratio of the progeny colored aleurone layer plant to colorless aleurone layer plant was 1:1']	D	bio	遗传与进化_遗传的基本规律	['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']	['bio_147.jpg']
bio_148	MCQ_OnlyTxt	The sex of a certain fruit fly (2N=8) is determined by the sex index i of the embryo (the ratio of the number of X chromosomes to the number of chromosomes) and is also influenced by the gene R/r located on the X chromosome. When i is 1, the sex-related gene R can be activated, and the embryo develops into a female; if there is no gene R, it develops into a male. When i is 0.5, gene R cannot be activated and the embryo develops into a male. Embryo cannot survive with other sexual indices. The Y chromosome determines the fertility of male fruit flies, but embryos with the Y chromosome number not equal to 1 in male fruit flies 'somatic cells cannot survive. If the probability of the X chromosome symphysis with the X chromosome and the Y chromosome during meiosis is equal, the two chromosomes after the symphysis move to two levels respectively, and the unpaired chromosomes move to one pole randomly. F_1 was obtained by crossing one fruit fly with the genotype X^RX^RY with another fruit fly. All gametes can survive and have equal chances of fertilization. Regardless of chromosome swaps and other mutations, the ratio of male to female in fertile individuals in F_1 may be ()	['A. 3∶4', 'B. 5∶3', 'C. 7∶9', 'D. 7∶11']	ABC	bio	遗传与进化_遗传的基本规律	['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bio_149	MCQ_OnlyTxt	The wing shape of an insect (ZW type) is controlled by two pairs of genes. Researchers conducted the following experiments. Experiment 1: A homozygous normal-winged female was crossed with a homozygous wingless male. It was found that all the males in F_1 had normal wings and all the females had missing wings. F_1 mated randomly. In F_2, normal wings: missing wings: wingless =3:3:2; Experiment 2: Researchers accidentally discovered a gene t on an autosome. When the t gene was homozygous, the male transformed into a sterile female, but the female had no sexual reversal. A pair of winged male and female insects was crossed. F_1 female: male =3:1. The males of F_1 had normal wings, and the females had both normal wings and notched wings. F_1 mated freely to obtain F_2. Regardless of the ZW homologous segment, the following statement is incorrect: ()	['A. The genes that control wing shape are all located on autosomes', 'B. Experiment 1: In F_2, male and female individuals with normal wings mated randomly, and in F_3, 1/2 of the males with normal wings were homozygous', 'C. The parents of the second experiment were normal-winged male fruit flies and normal-winged female fruit flies', 'D. In experiment 2, the ratio of female to male in F_2 was 11:5']	ABC	bio	遗传与进化_遗传的基本规律	['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kd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/B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bio_150	MCQ_OnlyTxt	The sex determination of a diploid plant is XY. It is known that villous and non-villous leaves are a pair of relative traits controlled by gene A/a; wide leaves and narrow leaves are another pair of relative traits controlled by gene B/b. Female plants with narrow leaves and no villi were crossed with male plants with wide leaves and villi. In F_1, the ratio of villi wide leaves to wide leaves without villi was 1:1, and in male plants, the ratio of villi narrow leaves to non-villi narrow leaves to 1:1. F_1 were mated with each other to obtain F_2. In F_2, wide leaves with villi: wide leaves without villi: wide leaves without villi: narrow leaves with villi: narrow leaves without villi =2:3:2:3 (regardless of XY homologous regions). The following statement is wrong ()	['A. Gene A/a is located on the autosome and gene B/b is located on the X chromosome', 'B. In this plant population, there are 3 genotypes with villous and wide leaves', 'C. Based on the experimental results, it can be inferred that the genotypes of the two parents are aaX^bX^b and AaX^BY respectively', 'D. If male and female plants with villi in F_1 were allowed to mate with each other, the proportion of villi and broad-leaf plants in the offspring was 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che_151	MCQ	An acidic leaching solution contains Fe^{3+}, Al^{3+}, Fe^{2+} and Mg^{2+} impurity ions, which can be purified by adjusting the pH (i.e., ion concentration c ≤ 1.0×10^{-5} mol·L^{-1}), and EBT is used as an indicator. It is known that EBT can form red complexes with metal ions. The dissociation equilibrium of EBT is: H_3In(purplish red) \rightleftharpoons H_2In^-(purplish red) \rightleftharpoons HIn^{2-}(blue) \rightleftharpoons In^{3-}(orange). At 25℃, the log value lgc of each metal ion concentration and the distribution coefficient δ of each EBT type change with pH are shown in the figure<image_1>. The following statement is incorrect	['A. Curve b represents lgc (Al^{3+}), curve c represents δ(H_3In^-)', 'B. If appropriate amount of H_2O_2 is added, the purification degree can be further improved', 'C. When the solution changes from red to blue, the four metal ions in the solution are completely purified', 'D. _{sp} The largest is Mg(OH)_2']	A	che	化学反应原理	['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']	['che_151.jpg']
che_152	MCQ	At room temperature, add a saturated solution of AgBr (sufficient AgBr solid) was added dropwise to add Na_2S_2O_3 solution, and the reaction occurred: Ag^+ + S_2O_3^{2-} = [Ag(S_2O_3)]^-and [Ag(S_2O_3)]^- + S_2O_3^{2-} = [Ag(S_2O_3)_2]^{3-}, lgc(M), lgN and lgc The relationship of (S_2O_3^{2-}) is <image_1>shown in the figure (where M represents Ag^+ or Br^-;N stands for\frac{c([Ag(S_2O_3)]^-)}{c(Ag^+)} or\frac{c([Ag(S_2O_3)_2]^{3-})}{c([Ag(S_2O_3)]^-)}). The following statement is true	['A. Line L_2 represents the relationship between\\frac{c(Ag^+)}{c([Ag(S_2O_3)]^-)} and c(S_2O_3^{2-})', 'B. K_{sp}(AgBr) is of the order of magnitude 10^{-12}', 'C. AgBr(s) + S_2O_3^{2-} = [Ag(S_2O_3)]^- + Br^-The equilibrium constant K = 1 \\times 10^{-3.4}', 'D. When lgc(S_2O_3^{2-}) =-4, c(Br^-) > c([Ag(S_2O_3)]^-) > c([Ag(S_2O_3)_2]^{3-}) in solution']	D	che	化学反应原理	['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che_153	MCQ	Weak acid H_2A exists in equilibrium between organic and aqueous phases: H_2A(cyclohexane) \rightleftharpoons H_2A(aq), and the equilibrium constant is K_d. At 25℃, add V mL of water to V mL of 0.1 mol·L^{-1} H_2A cyclohexane solution for extraction, and adjust the pH of the aqueous solution with NaOH(s) or HCl(g). The relationship between the concentration of H_2A, HA^-, A^{2-} in aqueous solution, the concentration of H_2A in cyclohexane $[c_{cyclohexane}(H_2A)]$and the aqueous extraction rate\alpha \left[ \alpha = 1 - \frac{c_{cyclohexane}(H_2A)}{0.1 \text{mol} \cdot \text{L}^{-1}}} \right] with pH is shown in the figure<image_1>. The following statement is correct: () it is known: ①H_2A does not ionize in cyclohexane;② ignore volume changes;③\lg2 = 0.3.	['A. K_d = 0.2', 'B. At pH = 6, 95\\% < \\alpha < 96\\%', 'C. If adjusting the pH of the aqueous solution to = 3, add NaOH solid to adjust', 'D. If the volume of water added is 2V mL, the intersection point N will move from pH = 4.6 to pH = 4.3']	C	che	化学反应原理	['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che_154	MCQ	There is an ionization equilibrium for boric acid (H_3BO_3) in aqueous solution: H_3BO_3 + H_2O \rightleftharpoons [B(OH)_4]^- + H^+ K = 10^{-9.34}. Use 0.01mol/L NaOH solution to titrate 0.01mol/L boric acid solution and 0.01mol/L boric acid and mannitol mixed solution with a volume of 20mL respectively. During the titration, the pH of the boric acid solution and the\frac{\Delta pH}{\Delta V} of the mixed solution change with the volume of NaOH solution added as shown in the figure<image_1>. Known: <image_2>The following statement is wrong:	['A. Adding mannitol is not conducive to accurate titration of boric acid', 'B. Titration from V_1 mL to V_2 mL, the\\Delta pH of the mixed solution is greater than the\\Delta pH of the boric acid solution', 'C. P point: c(Na^+) > c(H_3BO_3) = c([B(OH)_4]^-)', 'D. Point W: c(Na^+) + c(H^+) + c(H_3BO_3) - c(OH^-) = 0.01mol/L']	AD	che	化学反应原理	['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'che_154_2.jpg']
che_155	MCQ	To saturated solution of AgBr (sufficient AgBr solid) was added dropwise with Na_2S_2O_3 solution, Reaction Ag ^++ S_2O_3 ^{2-}\rightleftharpoons [Ag (S_2O_3)]^-and [Ag (S_2O_3)]^-+ S_2O_3 ^{2-}\rightleftharpoons [Ag (S_2O_3)_2]^{3-}, lg [c (M)(mol/L)], lgc (N) and lg [c (S_2O_3 ^{2-})(mol/L)] is shown in the following figure (where M represents Ag ^+ or Br ^-; N represents\frac {c ([Ag (S_2O_3)]^-)}{c ([Ag (S_2O_3)]^-)} or\frac {c ([Ag (S_2O_3)_2]^{3-})}{c ([Ag (S_2O_3)]^-)}): The following statement is incorrect:<image_1>	['A. Line L_1 represents the relationship between\\frac{c(Ag^+)}{c([Ag(S_2O_3)]^-)} and the concentration of S_2O_3^{2-}', 'B. The solubility product constant of AgBr K_{sp}=c(Ag^+)c(Br^-)=10^{-12.2}', 'C. The equilibrium constant K for the reaction AgBr + 2S_2O_3^{2-} \\rightleftharpoons [Ag(S_2O_3)_2]^{3-} + Br^-is 10^{1.2}', 'D. When c(S_2O_3^{2-})=0.001 mol/L, c(Br^-)>c([Ag(S_2O_3)_2]^{3-})>c([Ag(S_2O_3)]^-)']	A	che	化学反应原理	['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WONFLM7nAUDqSewpttcxXduk8JYxvypKlcj1wR09D3HNADL+wttU0+4sb2ITWtwhjljJIDKeCOKo6l4Z0fV9Os9Pv7JZrWzkSW3jLsAjICFPBBOAT1rWqpp+p2WrW7T2FzHcRLI0ReM5G5Thh+BoAg1TQNN1iW3mvIX8+3JMM8Mzwyx5GCA6EMAe4zg1S1Twvplz4Wl0OPTIZrRv8Al3eRkDNnO5mB3E55Jzk1v1SttX0+9uZLe0uo7iSJiknk/OsbDqrMOFPsTmgBNF04aPodhpiuXW0t44A5/i2qBn9Kpap4R0XWdUh1O8tpvtsKeWk8F1LCwXOcZjZcj61t0UAUU0fTo9Jk0pLSNbGSNonhUYDKww2e5Jycnqc1VXwroieHodBFgn9mQgCKEsx2YOQQxO4EHkHORVxdVsH1V9LW6ja+SITPAD8yoTgE+lW3dY0Z3YKqjJYnAAoAzrDQdO06SWWGOV5pU8t5bm4knkKf3d0jMdvtnFUNL8D+HNGuPOsdO2ESGVUeeSSNHP8AEqMxVTyeQAean0vxd4d1u9ez0zW7G7uVBJihnVmIHUgdx7itO3vbe6kmjhlDSQtskQghkPuDzz1B70AY3ifSpvEVsui7GSxmZWu5ieCgOTGB3LYwe2K3kRY41RAFVQAAOwp1FABXEaD/AMlV8V/9e9r/AOgmt7XtGvtWWEWWuXmlmMncbZUO/wCu4GuS8E2FxpvxE8UW11qM+oSrDbE3E4UMcg8fKAOKAPRq53xNf3TRto+lybL6eFnkmAz9mh5Bf03Hoo9eegNRav4b1vUNTe5s/GF/p0DAYtobeJlXHuyk81RvfCmtxT6pe2niaSL7UC7q1qjnAXAXJ7f40ASfCl2k+GOhO7Fma3yWY5JOTXY1wXwetby3+HWltc3bSxyRAxRGML5IyeM9/wAa72gAoooJA60AFFJuHqKNw9RQAtFFFABXJaw/jt9cni0NNEXTljRkkvjKGZjnI+UEcY9uorragvJJYrG4kt03zJGzRpjO5gOB+dAHGn/hZwYKZvCYJ6DdP/8AE10XhwayNMYa8YDf+a282+fLx225AOMetcFpvg/wpqOmxavrfiO4vtQuEEs1y2pNCFYgEhUVgFA9Otdl4L1AaloHmR3Ul5bRzyRW91IctPGp4Ynv3Ge+M0AdFRRRQAVG9vBLLHLJDG8kedjsoJXPXB7VJRQBxvxX/wCSYa5/1yT/ANGLXYr90fSuO+K//JMNc/65J/6MWuxX7o+lAC0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUVV1DU7HSrVrrULuG1gXq8rhR+tZHhvxnpPi2e9XRmluLe0Ko91s2xM5z8qk8kgAE8Y5HPNAHQ0UUUAFFFZWveItM8N2P2vU7kRKx2xoo3PK3ZVUcsfpQBoXNzBZ20lzczJDBGpZ5HOAoHcmuBMuo/Eq4aOBpbHwghw8uCs2pY7L3WL36n8eJLbQtU8c3MepeKYXs9IR99pou7l8dHnI6n/Y6D3rvVVIYwqqqRoMAAYAFAFP8AsbTf7G/sj7FCNP8AL8r7PtGzb6Yr528U+JJ/hR8SPK0a7j1COG08owz7sxIx3LE7D723qD1AbFe8Hxnoa3dtA90yrdS+TBO0TCGV/wC6smNpPB79q8E+NPw611PGF3r1hZzXthe7XZoV3NE+ACpA5xxkH3x2oA9V+GnxXs/HzTWU1p9i1OFd5iDbklXuyntg9j7cnnHotfK/wihk8J+Mm1XXLW4tbaKMQyOwx5JlGUZ16hCO/TNfU6OsiK6MGVhkMDkEUAcR4svjeeN/DPhlv+Pa4eS8uVPSRYh8qH23YJHfFdnJcwQttlmjQ+jOBXE+KLFrX4leE9eYf6N+9sJG7I0gyhP1Ix9TW9rPg3w/4hu1utV0yG6mVdgd85A9KAI9au5NSuo9BsJgpmTfeXCMP3EHoP8AbfoPQbj2GcL4QxxweD7iCIBUj1K7VVB6ASsBWhd/DPwxeXJuHtbiNyipiG7kQYUYAwG7CsnwF4PufBWgapdDT5JNUeWcx2/2rcJI95MY6kAkY56+tAEnxR1m+t4tG8PaYszXWtXJibyGCv5KYMm0kgAncoySOpq74Z8TQW2tDwdd6I+i3kMHm2kIlWWOeEcblZcc5ByCPxqDXtJ1bXbbwv4lj07yNY0uXz5LAyAnY4AkjDHA3cDHTpU40u71jx1a+JjZS21vp1jJDbxz4WSeRzzkc7VAGMnqSeMckA7CSWOFd0siovqxwKzNX1uOw0/zLXy7q7lbybWFX/1kp6AkdAOpPYA1haRLH8QNHu7XxP4d+ySWd35b2skvmLnarKQwA5w4yO1TTfDTwpLaxWy6cYIopDKogmePDEYJyD6UAc14Z086b8aNVjluTcXMukwyzzH+OQu2cDsOwHYAV6RqWnwarYS2V0C1vLgSIDjeuQSp9jjB9ia880f4ZQ6V8TpNWhtpxpcVpGbeRrxmPnBjkEFskYx14rrBrGvta6yy+HGNxaymOxj+0oBdjAwxJwFGTz14Hc8UAc34o8N2Nz458Ipo1nBbX1pdG6uJbeMJstlHKtt/vMVUfU9s1b8e3reHdX8O+IYCV3Xy6fdgdJIJAT83+6ygj03H1qnot749t5Stx4Jt47q6cfadQk1aNwvbPlhclVHRQfxqz8SbVtbm8NeH4RuludTS5lUDO2CIEux9MEoPxoA72iiigAriNB/5Kr4r/wCve1/9BNdvXEaD/wAlV8V/9e9r/wCgmgDt6KKKACiiigArm/FOgw+IbjS7W5uZYrZZXeRYbhonf5DgAr1wecV0lZesaDaa5JZ/bQzR20hkCBiu4lSOSCPWgDnf+FW+H/8An41f/wAGUv8AjR/wq3w//wA/Gr/+DKX/ABrmPEt7p11qh8M+CtKivtabia6MrmCyH95znlh6fz6V2ngjwZH4P0vyZNQutQvZQDPczyM2T6KCTtFAGzoVpcWHh7TbO8cSXVvaxRTOGLbnVAGOTyeQeaK0KKACo7idLa2luJSRHEhdiBngDJqSobpnSznZIvOdY2Kx/wB846fjQB47Pb6D4nuI9cHwr1O6W4xNHMrJGswPIYoHAOfcc16b4Uu5rzQ0abS/7L8t2iSywMxKvABxx0549a4vwva/EObw1YTWWpaBa2ksQeC1ktZGNuh6RZ3fw/dx2xjtXbeGo9Ui0yRNZuYbi/E7+ZJAMIfTA7DGOKANmiiquorevp866dLDFeFD5LzKWRW7EgckUASXdytnZzXLq7LEhcqi7mOBnAHc1494QuJPGHin7a3j7VYLpZjNPoBRoQgHPljLcqOATjnBr0HTZtf0aG7vfF2raS1lGgKvbQtFsOeSxYnisjxRZaXrmteG77SpIJdVjukmimtmBY25zvLEfwfXjNAFv4r/APJMNc/65J/6MWuxX7o+lcb8WBn4X66MkZiTkf8AXRarL8MlKj/itvGnT/oLn/4mgDvKKRRtUDJOBjJpaACiiigAooooAKKKKACiiigAooooAKKKKACiiigAqvfQT3NjPDbXTWk7oVjnRFYxnscMCD9DViigD5l+IHwo8fyXUt9LqEviKEchg5DqOf8Almen4Zrc+D2j+Ib7wzdWVh4ruNEms7phPYHTonZSwBDktzzgjn+7Xv1RiCFZjMIkEpG0uFG4j0zQBxX/AAiPjT/oo1x/4KoKP+ER8af9FGuP/BVBXR694l0nw1Zi41S7SEOcRRj5pJW/uoo5Y/SuXeLxT46TZL5/hvQZByqkC9uFPv8A8sgfz/lQBPeeMJ7MReH9FB8ReIoowk0gAjiRxwXlYcLzk7Rz24q1oHgw2t//AG34gu/7V11uRMy4ith/chT+Ee/U1u6NoWmeHtPWx0myitbdedqDlj6sTyx9ySa0KACsnxPBdXPhXVYLEkXUlpIsRHXcVOK1qKAPM/Cnifwtq/gzRNPuUgur+2aOIafIgaVLhRjIU9Mcnd2r0yqkWl6fBeyXsNjbR3coxJOkSh3Hu2MmrdAHA+PLSLStUsPFDwpJZgfYNVjZcrJbOeGYd9rHP0JqK3mn+HF0sE0slz4QuGH2edyXbTmb+Bj3i9CenQ+p7rULG31PTrixu4xJb3EbRyKe6kYNcf4FnkbTtQ8G64EubrSD9mPmqCLm1I/dOQeuVwD9OaAOwurW01WwaC4jjuLWZeQeQw7EH9c1JbQfZrdIfNklCcBpW3Njtk98dMnn1yea4GN5/hlcrBO8s/g+V8RSuS7aaxPCsepiz0J6d69BjkSWNZI3V0cBlZTkEHoQaAHUUUUAFIyhlKnOCMcHFLRQBDbWsFnD5VvEsUeS21RjJJyT9c1NRRQAUUUUAFVINNt4L2a9w0l1MNrSyHLBB0Ueij0H1PNW6KACiiigAriNB/5Kr4r/AOve1/8AQTXb1xGg/wDJVfFf/Xva/wDoJoA7eiivOfiH4yi0nWNP0VtduNBWZDNJfx2gmHoqfMCADySevA9TQB6NRWR4bgnh0WEz62+smT94t4yIm9T0wE4xWvQAVyXjyy1jWLCz0XR9TGmvfzFJ7kLlliCktt5HPFdbXP8AifS9avn0+50K7s7e7tJWbN3GzoVZCpGFIOeaAMnw34M1bwppaafpOo6JFGOXkbSZWklbuzt9p5J//VgVuaZBrsWrzNqt5aXNuYQIjbWzQhWzzkM75PTnNc8kXxGlmlhTXPDTSRECRRZy5XIyM/P6VWurvxzZXcFpd+KPCUFzOQIopIJFZyTgYBfnnigD0KORJoklidXjdQyupyGB6EHuKKpaHp76T4f03TXcO9paxQM69GKIFyPyooAv1Re/tZb6XS5HaOcx7lUnaZEPBKHvjocdOPUVerlfFMEN+Dbav4eubzT0IeK9sm3ywNj72wYkUg9Cgb3xQBj2XwotYLREm8T+Jmm6yNHqjorMepx710GkW1n4StbXRReT3c1xOxhWWTzJnBOWZieoUZJY+w6kA8RaeAdJ1i5Z9N8f+IggYZtP7QcPH/ssrYZT7EAiu/0HwrpXhwSNZRSPcS8S3VxIZZpAOgLtzj2oA2qKKKAI54IbmB4LiJJYZBteORQysPQg9arabo+l6PE8Wl6bZ2MbnLLawLEGPqQoGau0UAcb8V/+SYa5/wBck/8ARi12K/dH0rjviv8A8kw1z/rkn/oxa7Ffuj6UALRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFYOu+NPD/hwBdR1KJJj923izJK/0Rct+OMVhrq3jXxOP+JVpS+HrBv+XrVBuuGH+zCDhfT5j3yM0AdZq2taboVi17qt9BaWy9XmcKCfQep9hzXJDxJ4k8WDb4Y046fpz9NV1JCpcesUXU+xOBV/S/h/pVpepqWpvNrOqL0ur9vM2f7i/dX8BXWUAcxoXgbTdIvjqt3JNqmtOMPqF62+QeyDoi9cBfWunoooAKKKKACiiigAooooAK4TxuG8O6zpvjSEERWxFpqW0dbZzwx/3WOfxNd3Ve+srfUrC4sruMSW9xG0ciHupGDQA+WKC9tXilSOe3mQq6OAySIRyCOhBBrz8SXHwvuljmaWfwdNIFSQku2mMxwA3cxEnAPbP53vh7d3FjFfeEdQlMl5ojiOGRus1seYn/Lg/SuznhiuYJIJ41khkUo6OMqykYII7gigB0ckc0SSxOrxuAyupyGB6EGnV5wWuvhdeKH8658Gzybd/LvpbE8Z7mInv2/LPokM0dxCk0MiyROAyuhyGB6EGgB9FFFABRRRQAUUUUAFFFFABRRRQBl6zp+pX6xDTtZfTSpO8rAsm/8A766VyHg21u7P4j+KIb2/a+nENsTO0axkjBwMDivQ64jQf+Sq+K/+ve1/9BNAGhq9n40m1N30jV9Jt7EgbY7izeRx65YMB+laVxqGiXgu9JvrzT53SL/S7aSRThCOSyk8A+9atZ91oOj312Lu70mxuLkYxNLbo7jHT5iM0Ac98NdLbSfDMtvGW+wtdzPYqxJxAW+XBPbuPauxoooAKKKzdZ1/SfD1slxq9/DZwyNsV5mwC3XFAHlPiuHwXF4x1G68WahqsGt+aGsI7QSqfLCqIzCVXBYkEEk9cjtTbPxFpt1rev3XiC4jRl8OQ212l0nlk3AVzLGFYDLZPQDniu9b4leBmZWbxHppK8qTJ0+lT2WveGPG00+nWz2Wr28CrLJlBJGrZIHBGM9aALnhC4vLvwbo1xqBJu5bOJ5Sx5YlRyfc9aK2QAoAAAA4AFFAC1i694jj0UJDDZXWo6hKCYbO1XLt7sTwq56k/rW1Xnvij4g2/g3xW9ncaFf3X2uGJori1RcM2WBQliOeBgD1oAytUufiLq16klx8O9He2TGFlv0M4HfbKGG38q6zwnrLCNdJ1LS7/SdQBJWC7m89HHXEUo4cAduCP1rF/wCFqzf9CP4n/wDAdP8A4qum8N6qPFOipqF1p8lt/pBMdvcLiSIoeM+h/wAaAN+iiqupC/Om3A0trdb7YfINyGMYbtu284+lADr++t9M0+4vruQR29vGZJGPYAZNcd4Z1S48XJHqt9qn2KG4O+x0y3mCOIs8NKerMw529ACO9ZfinTfHeoeAPEVrrEujSs9rmBNMjlDMQcsDvJ4IHaqfibTdMufh94bv9AgiivhPafYZIVAkJJAZcjrxnOfQ0AdP8V/+SYa5/wBck/8ARi12K/dH0ri/ivuHwr1zJw3kpk4zzvWuFHinX8D/AIrvWP8Awj6APb6K4lfihoQUA2utE45P9lTc/wDjtL/wtHQf+fTWv/BXN/8AE0AdrRXFf8LR0H/n01r/AMFc3/xNH/C0dB/59Na/8Fc3/wATQB2tFcV/wtHQf+fTWv8AwVzf/E0f8LR0H/n01r/wVzf/ABNAHa0VxX/C0dB/59Na/wDBXN/8TR/wtHQf+fTWv/BXN/8AE0AdrRXFf8LR0H/n01r/AMFc3/xNQXfxY0a3t3ki0vXrh1HEcemygt+LAD9aAO8oryQfHKC9uRa6doLR3IfY0eq3sdmQT0xkNn9K2rWfx54k3m217wzplsed1hG17NF3CsWYIfrj6UAeg1har4y8O6LxfavaxyHO2JX3u2OoCrkk+wFYw+HMd8N3iDxHrerMwy8TXPkQbvVUjAK/Tca3tL8KaBohJ07SLO3ckEukQ3EjuT1z70Ac+3jnV9X+Twr4UvrtW4W91A/ZLcA8bhu+dgD1GAeDigeFPE+uDd4l8TGGJvvWOjKYY8dwZW+dgR/ukZruKKAMXRPCWheHstpunQxTHlp2G6Vj3Jc8k1tUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcH46VvDuq6b41t1Yx2bC31JUGS1q5wWx32HBruo5EmiSWNw8bqGVlOQQehFR3dpBfWc1pdRLLbzoY5I2HDKRgg1x3w+uptO+3+EL6RnudHfbbu/WW1bmNvfA+U/SgDtJoYriCSCaNZIpFKujDIYHqCK86P2v4XX4IEl14MuH+bq0mluT194j/AOO/z9Ipk0MdxC8M0ayROpVkYZDA9QRQBWuNUtbfSzqW9prUIJA0CGQsp7qFyT+FYP8AwsHRv+ffV/8AwVz/APxFYTJd/C+/MkfmXXgy4bLR8tJpbk9R6xH07fz9Dt54bq3juLeRZYZFDo6HIYHoQaAOZ/4WDo3/AD76v/4K5/8A4ivKfir4+vdM1fTda8M6hqNpIymGeC4tZI45AOQdrqAepr6AriPFnw1sPG2v2t7rl5O9haR7YrGH5AzE5ZnfqQeBgYxjrzQBw/gb49y6xdw6brWiTvcOwRbjTozICScfNH1H1BP0r22OQSxJIoYBlDAMpUjPqDyD7Vm6L4c0fw7arb6Tp1vaRgY/doAT9T1P41qUAFFFFABRRRQAVxGg/wDJVfFf/Xva/wDoJrt64jQf+Sq+K/8Ar3tf/QTQB29FFFABRRRQAVU1DS7LVYo4r62jnjjkEirIoI3DocGrdFAGb/wj2i/9AfT/APwGT/CpbXSdPsbhp7Ozgt3ZdjeTGEBGc8gVdooAKKKKACq1/b2VzZyJqEUElttJkE6goB3JzxirNeb+NPAmpeOfEu2TXDDotrFGDYAlkllyxbeqsD029888UAZF74wtdG1YWHgC4vdanDASaVGpntUGedspOYu+MEr/ALNeo6RLdT6bFPe2C2N3KN80CuH2tjn5h1rndJ8L6zoVillpV/o9nbIOI4dLKg8Yyf3nJ45J5NbOj/b7HTn/ALdu4HuTcFfNX5EbcQECgk4ySABnr9aANeiiigA6jBrOttA0ezvDd22l2cNyxJMscKqxJ68gVo0UAcb8V/8AkmGuf9ck/wDRi1ua9e6nY6bE2k2Iu7qWaOHDHCxKxwZG6EqvUgcmsP4r/wDJMNc/65J/6MWn+P8AStZ1bRLOPSES4WK6jlurN5NguolOTGT6H0PB70AJ4b8WT6l4s1PQbi5sL37JBHPHd2KlVYMSCpUs3II9e9dhXBaPomvwfEi51ubTrO30+5sIrfbHPkxbCeMADJ57cV3tABRRRQAUUUUAFFFFABRRRQBWuNPsrpHS4tIJVcYcPGG3D3zXOXnwz8G3mwnQbe3Kcg2bNbHPqfLK5/HNdZRQBw48C6zpx3aF461qDJy0eoBL1CB0Vd4BUeuDmn/2j8QNKGb3R9K1iIcs+nTNC4HoEkyGP4gV2tFAHGR/EvR7eRYdctr/AEOckLi/gKx7j2Egyp/A11lnfWmoW4uLK6huYW4EkMgdT+IqSWKOeNo5Y1kjYEMrjIIPUEVyF58MvD73JvNJW40G+Ix5+kzGAHHQFB8pGeoxzQB2VFcRt8faDyJLLxJarydwFtc4/D5GPp06VZ074i6JcXq6dqhm0TUz0tdTTyS3b5GPysM8DB57UAddRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXCePI5dB1DTvG1nGWOnt5Oooo5ktHOGP1Q4YfT0ru6iubeK7tZbadFkhmQxyIwyGUjBB/CgB0M0dxBHPC4eKRQ6Op4YEZBFPriPAFxLpkmoeD7x2afSXBtmY8yWrcoffHKn6Cu3oAZLFHNE8UqK8bgqysMgg9iK89aK6+GF481uJbnwdO+6SDln0xieWTuYj3HbqO+fRabJGksbRyIrowKsrDIIPYigBtvcQ3dvFcW8qSwyqHjkQ5VlIyCD3FSV548E/wxuXntVln8ISuXmtxl201ieXTuYiTkr2ySO+e/t7iG7torm3lSaCVA8ckbBldSMggjqCKAJKKKKACiiigAooooAK4jQf+Sq+K/8Ar3tf/QTW74gg8RzrD/wj99p9qwJ837ZA0m4dsYIxXJeB49Vi+IfihNauLa4vfJtt0ltGUQjBxgEk0Aej1zGv+J57bXLPw5o8Mc+sXaNKTLnyraIdZHxyecAAYySORRq9740h1N00jRtKubIAbZbi9aNz65UKf51yunaJZ6r8X/FEevWaXO6ytmginy0bJzu+X7rYO3qOD0xQB6Np9rc2sLi61Ca9kdt26SNECcfdUKo+X6lj7mrdef8AwxiutPfxHo3mSyaXp2pNDYNKxYqm0EoCeoBNegUAFFFFABRRRQAUUUUAFYut6Jc3ri80rUH07UUXaJQgdJAM4WRT94An2I555raooA8nstT+JerR3TaRr3hG/t4JTGblN4249VAIHHv+Ndro2g6kLiK/8QauNSu4+YUii8qCIkY3KuTlsdyTjJxjNYkfiiDwQ50vX9NuoYFG2HVLe2MsVyoGF37AWEm0AHIxxnPatrwNdXF74ZjuZrSW0hllka1hmXa6QE/ICO3Hb0xQB0lFFVdR+3jTp/7MFsb7YfJFyWEe7tu284+lADNXW+k0q4j0xlS9dCkUj9IyeNx9cda811HRfG+jT6Sj+PLq6mu7yOHyRaRKGHVz0zgKDXceHj4uM0//AAkiaIsW0eT/AGa8rNuzzu3gcfSqakax8SJMfNb6HahT6faJucfURgf990AV/isMfC/WxnP7pOf+2i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che_156	MCQ	Cu^{2+} and NH_3 can combine to form a variety of complexes. There is the following balance in aqueous solution<image_1>: ammonia gas is added to a certain concentration of copper sulfate solution, and the relationship between the quantity distribution coefficient of the substance containing Cu particles and p(NH_3)[p(NH_3) = -\lgc (NH_3)] in the solution is as shown in the figure<image_2>. The following statement is true	['A. Curve II represents the change in the distribution coefficient of [Cu(NH_3)_2]^{2+}', 'B. When p(NH_3) = 4, c(Cu^{2+}) > c([Cu(NH_3)_3]^{2+}) > c([Cu(NH_3)_2]^{2+})', 'C. Equilibrium constant K = 10^{-12.6} for the reaction Cu^{2+} + 4NH_3 \\rightleftharpoons [Cu(NH_3)_4]^{2+}', 'D. At point M, p(NH_3) = -\\frac{\\lg K_2 + \\lg K_3 + \\lg K_4}{3}']	A	che	化学反应原理	['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'che_156_2.jpg']
che_157	MCQ	At room temperature, the reaction between Ca^{2+} and PO_4^{3-} is 3Ca^{2+} + 2PO_4^{3-} = Ca_3(PO_4)_2 \\downarrow. When F^- is added, the more insoluble Ca_5(PO_4)_3F is formed. In two aqueous solutions with fluorine-to-phosphorus ratios \\left[\\frac{c(F^-)}{c(PO_4^{3-})}\\right] of 1, 10, and 10^{-1}, excess Ca^{2+} is added. The relationship between -lgc(F^-), -lgc(PO_4^{3-}), and -lgc(Ca^{2+}) at equilibrium is shown in <image_1>. Which of the following statements is incorrect( )	['A. Curves a and b both represent the relationship between c(PO_4^{3-}) and c(Ca^{2+}), and the fluorine to phosphorus ratio a>b', 'B. -lg K_{sp}[Ca_5(PO_4)_3F] = 60.6', 'C. K_{sp}(CaF_2) = 10^{-5.25}', 'D. Increasing the fluorine to phosphorus ratio from 10:1 to 20:1 can effectively reduce c(PO_4^{3-})']	CD	che	化学反应原理	['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che_158	MCQ	Oxalic acid is often used in rare earth processing and separation processes. Most of its wastewater containing oxalate ions is treated with calcium ions. Studying the existing forms of calcium oxalate at different pH is of guiding significance for sewage treatment. The following <image_1>is the curve of the solute particle-containing concentration lgc versus pH in a mixed system of sufficient calcium oxalate solid and water, adding HCl or NaOH to adjust the pH. It is known that K_{sp} of calcium oxalate =10^{-8.63}. The following statement is true	['A. K_{a1} of H_2C_2O_4 =10^{-2.77}', 'B. At pH=2.77, the concentration of C_2O_4^{2-} in the solution is equal to 10^{-5.065} mol·L^{-1}', 'C. When using Ca^{2+} to treat oxalate ion wastewater, the pH of the solution should be controlled within the range of about 5 - 11', 'D. After pH=13.81, the molecular concentration of oxalic acid remained unchanged']	CD	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGEAfcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigCCW8tYLiG3luIo55yRFGzgNIQMnaOp4FT15x4psraH4weCLqKCNJ5jdiSRVAZwIuMnvjJr0egAormpPiF4PhleKTxLpaujFWU3K5BHBHWm/8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXMf8LG8Gf9DPpf8A4Er/AI0f8LG8Gf8AQz6X/wCBK/40AdPRXNxfEHwfNMkUfiXS2kdgqqLlckngDrXSDkZFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHm/jG9t4/in4MdpAEtWufPbHEe6PC7j2ya9I6iijtQB5v8AC3RNJvPBKT3WmWU8zXl1mSW3VmP75u5Fdp/wjWg/9ATTf/AVP8K5r4Sf8iHH/wBft1/6Oeu5oAy/+Ea0H/oCab/4Cp/hR/wjWg/9ATTf/AVP8K1KKAMv/hGtB/6Amm/+Aqf4Uf8ACNaD/wBATTf/AAFT/CtSigDL/wCEa0H/AKAmm/8AgKn+FH/CNaD/ANATTf8AwFT/AArUooAy/wDhGtB/6Amm/wDgKn+FH/CNaD/0BNN/8BU/wrUooAy/+Ea0H/oCab/4Cp/hR/wjWg/9ATTf/AVP8K1KKAMv/hGtB/6Amm/+Aqf4Uf8ACNaD/wBATTf/AAFT/CtSigDL/wCEa0H/AKAmm/8AgKn+FH/CNaD/ANATTf8AwFT/AArUooAy/wDhGtB/6Amm/wDgKn+FH/CNaD/0BNN/8BU/wrUooAy/+Ea0H/oCab/4Cp/hR/wjWg/9ATTf/AVP8K1KKAMv/hGtB/6Amm/+Aqf4Uf8ACNaD/wBATTf/AAFT/CtSigDL/wCEa0H/AKAmm/8AgKn+FH/CNaD/ANATTf8AwFT/AArUooAy/wDhGtB/6Amm/wDgKn+FH/CNaD/0BNN/8BU/wrUooAy/+Ea0H/oCab/4Cp/hR/wjWg/9ATTf/AVP8K1KKAMv/hGtB/6Amm/+Aqf4Uf8ACNaD/wBATTf/AAFT/CtSigDL/wCEa0H/AKAmm/8AgKn+FH/CNaD/ANATTf8AwFT/AArUooAy/wDhGtB/6Amm/wDgKn+FH/CNaD/0BNN/8BU/wrUooAy/+Ea0H/oCab/4Cp/hR/wjWg/9ATTf/AVP8K1KKAMv/hGtB/6Amm/+Aqf4Uf8ACNaD/wBATTf/AAFT/CtSigDL/wCEa0H/AKAmm/8AgKn+FH/CNaD/ANATTf8AwFT/AArUooAy/wDhGtB/6Amm/wDgKn+FH/CNaD/0BNN/8BU/wrUooAy/+Ea0H/oCab/4Cp/hR/wjWg/9ATTf/AVP8K1KKAMv/hGtB/6Amm/+Aqf4Uf8ACNaD/wBATTf/AAFT/CtSigDL/wCEa0H/AKAmm/8AgKn+FH/CNaD/ANATTf8AwFT/AArUooA84+J+iaTZ+EFmtdMsoJRe2+Hit1Vh+8HcCvRY/wDVJ/uiuJ+LH/Ilf9vtt/6MFdtH/qk/3RQA6iiigAooooAKKKKACiiigAooooAKKKhvJ/s1lcXAGfKjZ8euBmgDMvPFWjWF3JbXF6qyRECUhSViJ6bmAwv41sBgyhlIIIyCO9eZ/Da0TVvhVfXF7+9l1V7t7lm6vlmXn8AK1fhFqU+qfDHSZrl2eWMSQbmPJCOyr+gFACfCT/kQ4/8Ar9uv/Rz13NeO/D34gaDoPhb+z76S6FxHeXJYR2ruOZWI5AxXrVjeQ6jYwXluWMMyB03qVOD6g8igCxRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcP8AFj/kSv8At9tv/Rgrto/9Un+6K4n4sf8AIlf9vtt/6MFdtH/qk/3RQA6iiigAooooAKKKKACiiigAooooAKbJGssTxuMq4KkeoNOooA8y0S31Xwd4V1Xwwum3t1dLJMNMkhgZo5lkJKlnA2pgsc7iOnGa63wT4dPhTwdp2jM4eS3jJlZehdiWbHtkmugo7UAcJ8JY0bwJGSik/bLrkj/ps9d2BgYHSuG+Ef8AyIcf/X7df+jnruaACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA4f4sf8iV/2+23/owV20f+qT/dFcT8WP8AkSv+322/9GCu2j/1Sf7ooAdRRRQAUUUUAFFFFABRRRQAUUUUAFFUpdY0uCVoptSs45FOGR51BB9wTRDq+mXMqxQajaSyN91EnVifoAaAIZvEOlQa1Bo73sX9oTglIAcsQAST7dDWn2rzzxFBFH8YPCEiRorvFdbmVQCfl716H2oA8J8BanqHgrT01m4ke48Najezx3Qxk2UolZVk/wBwgAGvdI5EljWSNgyMAysDkEHvXi/grxKIPBU2jz+F9T1K2e5uld4Yg0bhpWyP1rd8Iarc+EdQtfDeriePTL5d+kzXPDR55MDn1HagD02iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA4f4sf8AIlf9vtt/6MFdtH/qk/3RXE/Fj/kSv+322/8ARgrto/8AVJ/uigB1FFFABRRRQAUUUUAFFFFABRRRQBl3HhvRLu4e4uNKtJZnOXd4gSx9zS2vhzRbK4S4tdLtYZk+66RAEfjWnRQBwfiG1v5vid4bv4NNupbOyjnWedANql1wO+a7ztRR2oA4b4Sf8iHH/wBft1/6Oeuh8TeHbTxPos2nXYI3fNFKv3onHRgfUGue+En/ACIcf/X7df8Ao567mgDjPBPiK7lln8Na+QuuaeMFuguYv4ZF9feuzrkfG3hm41OKDWNHYQ69px8y2k/56DvG3qDWj4T8TW/inRUvI18q4Q+XdW7fehlHVSKAN2iiigAooooAKKKKACiiigAooooA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che_159	MCQ	When Na_2S_2O_3 solution is added dropwise to a saturated AgBr solution (with excess AgBr solid), the following reactions occur: Ag^+ + S_2O_3^{2-} \\rightleftharpoons [Ag(S_2O_3)]^- and [Ag(S_2O_3)]^- + S_2O_3^{2-} \\rightleftharpoons [Ag(S_2O_3)_2]^{3-}. The relationships between lg[c(M)/(mol/L^{-1})], lg[N], and lg[c(S_2O_3^{2-})/(mol/L^{-1})] are shown in Figure <image_1> (where M represents Ag^+ or Br^-; N represents \\frac{c(Ag^+)}{c([Ag(S_2O_3)]^-)} or \\frac{c(Ag^+)}{c([Ag(S_2O_3)_2]^{3-}}; the hydrolysis of Ag^+ and S_2O_3^{2-} is neglected). Which of the following statements is incorrect? ( )	['A. a = -6.1', 'B. Equilibrium constant K = 10^{-4.6} for the reaction [Ag(S_2O_3)]^{2-} \\rightleftharpoons [Ag(S_2O_3)_2]^{3-}', 'C. At point b, c(Br^-) = c(Ag^+) + c([Ag(S_2O_3)]^-) + c([Ag(S_2O_3)_2]^{3-})', 'D. When c(S_2O_3^{2-}) = 0.01mol·L^{-1}, if c([Ag(S_2O_3)_2]^{3-}) = x mol·L^{-1} in solution, then c(Br^-) = \\frac{10^{-3.8}}{x} mol·L^{-1}']	BD	che	化学反应原理	['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che_160	MCQ	At 298K, three solutions of HR, Al(NO_3)_3 and Ce(NO_3)_3 were titrated with NaOH solution respectively. The relationship between pM[p represents the negative logarithm, M represents\frac{c(HR)}{c(R^-)}, c(Al^{3+}), c(Ce^{3+})] and the change in solution pH is <image_1>shown in the figure. It is known that at room temperature, K_{sp}[Ce(OH)_3] &gt; K_{sp}[Al(OH)_3], and when the ion concentration is less than 10^{-5} mol·L^{-1}, the ion is completely precipitated. The following inference is true:	['A. ① Represents the change relationship of titration Ce(NO_3)_3 solution', 'B. When adjusting pH=5, Al^{3+} in the solution was completely precipitated', 'C. When titrating the HR solution to point X, the solution: c(Na^+) > c(OH^-) > c(H^+)', 'D. After calculation, Al(OH)_3 cannot be completely dissolved in HR 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']	['che_160.jpg']
che_161	MCQ	In solutions containing AgCl(s) at pH = 7, there is an equilibrium relationship within a certain range of c(Cl^-): Ag^+ + Cl^- \rightleftharpoons AgCl;AgCl + Cl^- \rightleftharpoons AgCl_2^-;AgCl_2^- + Cl^- \rightleftharpoons AgCl_3^{2-};AgCl_3^{2-} + Cl^- \rightleftharpoons AgCl_4^{3-}. The equilibrium constants are K_1, K_2, K_3 and K_4 in turn. It is known that the change relationships of lgc(Ag^+), lgc (AgCl^-), lgc(AgCl_2^-), lgc(AgCl_3^{2-}) are as <image_1>shown in the figure. The following statement is incorrect	['A. Line ③ represents the change of lgc(AgCl_3^{2-}) with lgc(Cl^-)', 'B. As c(Cl^-) increases,\\frac{c(AgCl_4^{3-})}{c(Ag^+) \\cdot c^4(Cl^-)} remains unchanged', 'C. The abscissa of point P is 2a-c', 'D. Point M c(Ag^+) + c(H^+) = c(Cl^-) + c(OH^-) + c(AgCl_2^-) + 5c(AgCl_3^{2-})']	CD	che	化学反应原理	['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che_162	MCQ	Titrate 20mL of equal concentrations of ternary acid H_3A with 0.1 mol·L^{-1}NaOH standard solution, and obtain the relationship between pH and V(NaOH), lgX[X=\frac{c(H_2A^-)}{c(H_3A)} or\frac{c(HA^2-)}{c(H_2A^-)} or\frac{c(A^{3-})}{c(HA^2-)}] as shown in Figures 1 <image_1>and 2 respectively<image_2>. The following statement is incorrect	['A. When 20mL of NaOH solution is added, c(H^+) + c(H_3A) = 2c(A^{3-}) + c(HA^2-) + c(OH^-)', 'B. When lg\\frac{c(HA^2-)}{c(H_2A^-)} = 2, c(H^+) ionized by water = 10^{-9.2} mol·L^{-1}', 'C. When 40mL of NaOH solution was added, c(Na^+) > c(HA^2-) > c(OH^-) > c(H^+) > c(H_2A^-)', 'D. When pH=11,\\frac{c(A^{3-})}{c(H_3A)} = 10^{11.32}']	BC	che	化学反应原理	['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y4JKwr/DCnJwq+3U+vFdbRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUV438XvitrXgvXrTSdItoF3QrcSTToW3ZYjaBkcfLyevPagD0PxZ4qi8M2UIjgN5qd5J5NjZIwDTyH+SjqT2qv4P8KyaMtzqmqzLd+INRIkvLkDhfSNO4RRgD1xn2HJ+C7yKXw3cfFDxRJ5l7LDI0S7cLawKxAjiU92x16nPXk577RJNTudMGoX21Li6QSJaZGyAEZC7gMk8jceRnoKANeiuK8GeIda1bxP4o07WPsw/syaKKFbdSFwyls5PJJGK6LXdXXR7DzVjM11K4htbdT800rdAPbuT2AJ7UAadFch8M/EF/4o8D2mram6NdTSS7tihVADkAADsAAK6m6NwLaQ2ojM+PkEhIXPvigCaiuR+Huu6p4g0jULjVzD9qg1Ge12wLtRQhC4GeeuevPNddQAUVxth4jvvGGpX0OgzR2ukWchgk1LAkeeUdRCDlQB3ZgQcjA7109xdQ6RpT3N9dExW0W6WeXAJAHLHaAMn2H0FAFuivP/AAJ4p1jxRrniq31BWs4rWaNLWDau+BWU9TjluhIOcHI6VvaHrsr6ze+HdTdDqdnGsySKNouYG4EgHqCMNjgH60AdFRRRQAUUUUAFQ3VzHZ2slxKHKIMkRxs7fgqgk/gKmoIyMGgDJ8N+ILPxRokOrWAlFtMzqnmrtb5WKnjtyDWFqH/JYNE/7BNz/wChpTPhMMfD61A6C5uv/R8lUfFOtWWg/FLRLy/MwhOmXCfuYHlOS6fwoCe1AHolFY+heJtN8RCc6ebkiHG/zrWSHrnGN6jPTtWxQAUUUUAFFFFABRRRQAUUVxXjTW725vLfwjoEm3Vr9S0868iyt84aQ+56KPX04oAoX5PxF8USaQgY+GdIm/05+Qt7cqciH3VDy3qcD3r0MAKAAMAdAKz9B0Sy8OaLa6Vp8ey3t0CrwMse7NjqSeSfU1o0AFIyhlKsAQeCDS0UAR29vFa28dvBGscMahURBgKB0AHYVJRRQAUUUUAFFFFABRRRQBFb20FpCIreFIowSdqLgZJyT9SST+NS0UUAFFFcR4x1a+1PUYvB2gTGPULtN97dqM/YrY8Fv99uij8eODQBRvi/xH8StpURb/hFtKmBvnxxfXCniEeqKRlvUgD0NeiIixoqIoVVGAAMACqGi6NZeH9HttL0+ERW1ugRQAMn1J9SepPc1oUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFRXFxDaW0tzcSLFDEpd3Y4CqBkk0AV9X1ay0PSrjUtRnWC0t03SO3b2HqSeAO5rg9K8LHx5fDxP4wsAYCpXTNKnXiCInO+Qd3bg4PQfpJpdtP8RtZg1/UImi8OWUhbTLOQEG6ccfaHH93rtH4/X0WgDy742qtn8PLOyt18i0a/t4XSP5VWMEkDHTAKr+Qr09P9Wv0FYHjfwxH4u8JXukMypLIoeCRh9yRTlT9MjB9iat6FqT6nparOjW2oRII7qBsbopMfkQeoPQigDlPBH/JR/H//AF9Wv/omqs/im8g8Y313f+EfEd2tnI1tYG2sw8QQcNKCWHzMcjI/hwO5rpNC8GroOu6jq0er31xLqLh7lJxHtdgMKeFBGB6GunoA8t+BOqG58BQWBsLyIW7SN9pljAil3SMcI2eSO/FepVylp4PsdA8AXHhu0u75LXypV89BvmXeSSRtHJ57Cp/Cmj6jp3gy30y7v7n7SocJPIQ8qIWJQMSCCwUgdxxQBm/DX/jz8R/9jBff+jTW/wCK5LmHwfrctnv+1JYTtDsGW3iNtuB3OcVU8K+Ek8KJdRwaneXUVzM9w6XATiRjlmBVQefTpVvT9BFhrerakb66nGomMm3lfMcO1cfIO2e9AHluheGAPgbb6ppmp6nZ6lFYtdxvFfSKgdSXI8sMEwcEHjvWk3izU7+28Nzah4e1vULP7BBfSnT7UOs9yRkbjuAAUgNjuSOm3npofh/b21lcaVbarfQ6HcSF305SpUAkl41cjcqNnkA+uCMmuuhhjt4I4IY1jijUIiKMBQOAAKAPIPhp4he6+I/i2M6NqkP266Ry0sAAttqNxLz8pPbrW14iJtfjp4PkhADXdndwTtj7yKpdR+DfzrrNI8M2WhavrOrQzSmTVJFmnEjDahUEcccD61k6Xpbaz4+uPFkm4Wdvaix08HI8wE7pJcHsT8oPcAnoQSAdlRRRQAUUUUAFRzyPFCzxxNK4HCKQCfzIFSUUAcl8O9L1TQvDCaXqtosM0U0sgaOUOrB5Gce4I3Y6dqg1EA/F/RMj/mFXP/oaV2lcZqH/ACWDRP8AsE3P/oaUAdmAB0FFFFABRRRQAUUUUAFFFQXt5badZTXl3MkNvCheSRzgKo5JNAGT4s8Sw+F9Fa8aJri6lYQ2lqn3p5m+6g/z0Bqp4L8MzaJZz3+pyC413UmE9/P23do19FUHArH8KWc/i7XB421aF47dUKaLaSAfuoj1mI/vv+g9a9AoAKKKKACiiigAooooAKKKKACiiigAooooAKKKoa1rFloGj3WqahKIra3Qu5J5PoB6kngD1NAGX4x8T/8ACOabGlrELnV71/I0+0yMyynueR8oyCT2/Gk8HeF/+Ec06WS7lF1q98/n392RzLIew9FXOAOw+tZfg/SLzVNSl8Z6/CY7+6TZY2rdLK27DH99vvMffHHIruKACiiigAooooAKKKKACiiigAooooAKKKKACiiigBGYKpZiABySe1eczGT4nawIY9y+DrGX96+cf2lMp4UesSkZJ6E/TIk1y9uvHetTeFtGuXh0e2O3WNQhIyx/5942/vH+IjoOPY93YWNrplhBY2UKQ20CBI40GAoFAEsUUcMSRRIqRoAqqowAB0AFPoooAKTAznAyaWigAooooAKKKKACiiigAooooAOtAGBgUUUAFFFFABRRWNrHizQNAuEt9W1a2tJpE3rHK+CVzjOPTIP5UAbNFcr/AMLK8Gf9DHY/990f8LK8Gf8AQx2P/fdAHVVxmof8lg0T/sE3P/oaVZ/4WV4M/wChjsf++65S+8d+FpPifpN+uuWZtItNuI3lD/KrF0IH1ODQB6rRXK/8LK8Gf9DHY/8AfdH/AAsrwZ/0Mdj/AN90AdSWVSAWAJOBk9aWvKfGPjvwve6t4UktdctJUttWWWcq/CJ5bjJ9skfnXWf8LK8Gf9DHY/8AfdAHVUhIUZJAHvXLf8LK8Gf9DHY/991yvxG8eeGNR8D31rYa5aTXLvCUjjfk4lQn9ATQB6pXnepH/hYvieTRImb/AIRvSZR/aMikgXdwORACOqr1b3wPes/xl8U9HksbbR9A122W81BvKkvg3yWcf8Tk5B3YPygd/wBdjQfF3w+8OaLbaVp+v2KQQLgEvyx6liccknJP1oA7sAKuBwAKAQwBBBB6EVwHij4h+EbrwlrVvb6/ZyTy2M6Ror8sxjYAD8aj8H/EHwnZeCtDtbrX7OK4hsIY5EZ+VYIAQfxoA9Eorlf+FleDP+hjsf8Avuj/AIWV4M/6GOx/77oA6kEMMgg/SlryvwB488L6fod5Fe67aRSNqV1Iqu/JRpCQfoRzXVf8LK8Gf9DHY/8AfdAHVUgZSSAQSOCAelct/wALK8Gf9DHY/wDfdcl4a8deGLXxx4xurjXLVLe6ntmt5GfiQLCAcfQ8UAer0Vyv/CyvBn/Qx2P/AH3R/wALK8Gf9DHY/wDfdAHU7hu25GeuKWvKz488L/8AC1Fv/wC3LT7GNGMPm7/l8zzs7frjmuq/4WV4M/6GOx/77oA6qkLKpAJAJ4Ge9ct/wsrwZ/0Mdj/33XJeJfHXhi68ceDru31y0e3tZ7lriRX4jDQkLn6nigD1ZmCqWYgADJJ7V53Zo3xI8SJqcoJ8LaVOfsSHpe3CnBlPqi8hfU8+orG8YfELQvEt/B4XsfEFva6ZMvmanqAk25i6eShxyzdz2GevSutsvH3gPTrKGztNd06G3gQRxxq2AqgYAoA7AkKOSAKWvKviJ478Mal4U+z2OuWk032u3fZG/O1ZVJP4AZrq/wDhZXgz/oY7H/vugDqqQkAEk4A71y3/AAsrwZ/0Mdj/AN91i+MPiD4TvfBWuWtrr9nLcTWE0caK/LMUIAH40AeidRkUV594V+IXhK08H6JbXGv2cc8NhBHIjPyrCNQQfxrX/wCFleDP+hjsf++6AOqpFZWGVII9RXKt8SvBm0/8VHY9P7//ANauW+Hfjzwvpvg+G2vtctIZxcXDFHfnBmcg/iCDQB6pRXK/8LK8Gf8AQx2P/fdH/CyvBn/Qx2P/AH3QB1IZWJAYEqcHB6UteU+D/Hfhez1jxXJda5aRx3OqmWBmfh08tBke2Qa6z/hZXgz/AKGOx/77oA6qkyM4yM+lct/wsrwZ/wBDHY/991yMfjrwwPi9NqJ1y1+wnQ1gE2/5fM88nb9cc0AesVw3inXNQ1bWD4O8NS+XfOgbUL4dLGJvT/powzgfj7jL8XfFvRLexjsfD+rWc+pXjeUk7N+6tQesjnHYdBySe1WPC3iTwD4X0kWkHiWzmuJGMt1dSSEyXEp+87E85NAHZ6Hoth4c0i20rT4xHbwrtUHqx7sfUk8k+9aVeReIvHHhm5+Jngu+g1u1e0tBe/aJVf5Y90OFz9TxXZ/8LK8Gf9DHY/8AfdAHVUhYKMsQBnHNct/wsrwZ/wBDHY/991y3j/x54X1Dw7BDZa5aTSrqFpIVR+QqzKWP4AE0Aep0Vyo+JXgzH/Ix2P8A33R/wsrwZ/0Mdj/33QB1LMqKWYhVAySTwKWvNPHfj/wrf+A9ctLPXrOW5ms5EjjR+WYjgCtbSviN4Oi0iyjk8Q2SusCBgX5B2igDtaK5X/hZXgz/AKGOx/77pr/ErwYUbHiOx6f36AOrBDDIII9qWvKPhn478MaX8PdLs9Q1y0guoxLvjkf5lzK5GfwIrrf+FleDP+hjsf8AvugDqqK8h8SfG+x8PeIIVtzaaxo08ed9pJiaFweQQeCOmOnf0rtvCnxC8N+Mht0m/DXIQM9tKpSRfwPXHfBIoA6iiiigAooooAKiltbecgzQRyEdC6g4qWigCt/Z1l/z5wf9+xR/Z1l/z5wf9+xVmigCt/Z1l/z5wf8AfsVxuoWVoPi5oqC2hCHSrkldgwTvSu7rjNQ/5LBon/YJuf8A0NKAOq/s6y/584P+/Yo/s6y/584P+/YqzRQBW/s6y/584P8Av2KP7Osv+fOD/v2Ks0UAVv7Osv8Anzg/79isPxXqmleFtFe9ksIZ7h2ENrbJGN9xM33UXjuf0zW/dXUFjaS3V1MkMEKl5JHbCqo6kmuF8L20/jLXV8aanE6WUQMei2sg+5Ges7DP326D0A78GgDH0iaz8HG7OpaNqGueIrwLd6mdPtBKttkHZFyQAAMgAZJ69xXbeGNX8PeLtFTVdKgheBmKMrxKHjYdVYdj0/MVq3c1jpFne6hcFIIQDPcSEdcKBk+vCgfhXNfDjQZtH0jULy4hNvNq9/NqBtiMeQrn5U+oXGenXHagDqf7Osv+fOD/AL9ij+zrL/nzg/79irNFAFb+zrL/AJ84P+/Yo/s6y/584P8Av2Ks1m69rVtoGkTahdHKphUTIBkdjhUGe5JAoAyNY8QeHdF8Q6Vodxao9/qblYo4olOwc/M3oOCPwPoa6D+zrL/nzg/79ivINeNnbeLPBd7c6jZXGoXGpPNfTRSgqp8vCqD2RRwM+56k17OrK6B0YMrDIIOQRQBX/s6y/wCfOD/v2KP7Osv+fOD/AL9irNFAFb+zrL/nzg/79ij+zrL/AJ84P+/YqzQTgE0Ac9rOp6Fos9tay2iT390dtvZ28KtLLjqQOAABkkkgD1rTt7O1mhDyaZHAx/gdEJH5ZFeUeDLjxJ4h1fxX4t0xdPe6N29lbpel22RRgFY1Ckbc5BJycnsO/f8AgPxavjPwxFqhtjbTq7Q3EJ/gkXqB7fWgDd/s6y/584P+/YrkvGmqx6alvouiWVrN4i1LKWsZRcQr3mfg4VfpyRj1rf8AE3iK08MaJNqV3liuEhhX788h4VFHck/49qx/Bfh28tWuPEGv7ZPEGpYaXBJW2i6rAnJAC98dST14oAveGfB2l+GtEh0+KFJ5Bl57iVAXmkPLOfqa1ZbPToIXmltrZI41LOzIAFA5JNXKr31vDd6fc21wcQzRNHIc4wpBB5+lAHLHxPoq6EmuvolwmksQftTW6YEZ4EpXO7Z+Gcc4xzXTrYWDqGW1typGQRGORXhNvq93pulW3hbXLqWXwPc3Bt7XW44zmSJTxEzZ+VSRjdj7qnHHI99iVEiRYwAgUBQOmO1AEP8AZ1l/z5wf9+xR/Z1l/wA+cH/fsVZooArf2dZf8+cH/fsUh0+xUEm0gwP+mY/wq1RQBy2ja/oOu69qej2unSJcacEMxntRGDuzjAPPQZ5A6irOqajpGm6laaaum/a7+6DPHb28KFgi43OxYgBRkDk8k4Ga5nwp/wAln8d/9c7P/wBFVV0eaS4/aH18SvuFvpMccQb+FSUY49skn8aAOy0O+0bXobhreySKa1ma3ubeaJQ8Mg6qcZB6g5BIOetav9nWX/PnB/37FeeeG5Gj+PPjKCMkxSWdrJIAeA4RQP0Jr0ygCt/Z1l/z5wf9+xR/Z1l/z5wf9+xVmigCt/Z1l/z5wf8AfsVzPjLWrHw5Yxw2emwXmtXhMdjZJECZHxksQOdijkmtTxT4mtPCujNfXCtNKzCO2toz89xKeFRR6k/kKyvCHhm8t7ufxJ4idJtfvlAYKPktI+oij9h3Pcj8SAY3wvtdHuYNXkMUt1rKXWzUrq6txHvlxnainlUXoBgfStbXfFWkaJez2sfhzUNTe2UG4bT7JZFhJG4BiSOdpBwM8EetV/AQA8VeOMf9BVf/AEUtdbcyWOiafdXku2GEbppWxksT+pJ4AH0AoAzvDmpaB4q0WHVdKhgktpcjDRAMjDqrDsRWt/Z1l/z5wf8AfsVy/wANvDsvh/w1KbmIw3Go3cl9JAf+WO8jCe2FCg++a7GgDnPE+raJ4T0eXU9Q09ngjxkW9sHPUD6Dr3IrXisrCaFJVs4ArqGGYx3rmvir/wAkx13/AK9//ZhW1d6va6F4ZXUbx9sMUKfVmIACj3JIH40AZ2ua94d8P6rpOmXdsjXmqTiGCOOFTj/ab0UHHvzwDzjf/s6y/wCfOD/v2K8m8RPaJL4W1C81Gzm1S78Q2892Y5kYQoEk2xjB+6gO3Pc5J5NewRyJLGskbq6MAyspyCD3BoAg/s6y/wCfOD/v2KP7Osv+fOD/AL9irNFAFb+zrL/nzg/79ij+zrL/AJ84P+/YqzRQBW/s6y/584P+/Yo/s6y/584P+/YqzRmgDgvEnwr0vxb4hhv9XuJDY28eyGxtwIkz/EzMOSTx0x0FdVo3h3R/D1sLfSNOt7OPAB8pAC2OmT1J9zXJah4s8Q2vxOs/CUf9meTeWzXSXDQSFkUFvlI8wZPy9ePp2qf4ieKdd8I21hd6dHp88V3dR2nl3Eb7lZs4bcG5HHTFAHc0VDai4W2QXckUk+PnaJCin6AkkfnU1ABRRRQAUUUUAFFFFABXGah/yWDRP+wTc/8AoaV2dcZqH/JYNE/7BNz/AOhpQB2dFFFABRRRQB5/rsdx478UP4cVJI/D2mur6nJyv2qXAZYAf7oyGb8OnFd8iLGiogAVRgAdhTsAdBRQBw3iGLxleeIEa00fT7rSbYq8EU955ZklH8bgKc4/hGcA8nnG3d8PS+I7hrqXX7aztBlVggtpDJgAcsWIHJJ6Y4x71uUUAFFFFABVLVNI07WrT7JqdlBeW+4N5U8YdcjocGrtFAHmviL4V6Td674fn0vQtKhsra5Z79BCieZHtwBjHzc9jXo8MUcEMcMKKkUahURRgKAMAAU+igAooooAKOtFFAHDaDoOpeCtS1mDTrD7dpeoXLXluElVGglYDcjBsfJwMEZI9D1rW8I6C/hfw9Il7PHJdzzS3t5JGCE81zubb32joPpXR0UAefeHrS58beIU8W6pFJFpdqSui2cmRkdDcsp7sPu5HA59DXoNAGBgUUAFVNUshqWk3liXMYuYHhLjqu5SM/rVuigDzx/D2r3nw6Hgu70yPzFtktBe+YrQbVIAkAzv3AANjHXjPeu8srYWdjb2qszCGNYwzHJOBjJqeigAooooAKDRRQBxPh/QdVsfiN4j1y5tVSy1RYFixIpZPLTadwB7+2am1Hw9c6f46j8W6XbC5ea1Nne2ylUd1BysiliAWGACCRxjniuwooA5Twr4auLHW9a8R6mEXU9XkXdFG25YYkG1FzgZOACT6/TJ6uiigArN17XbDw3o1xqupTeVbQLk9yx7Ko7k9AK0q5i/8Kyaz4sg1PVbvztOsgr2Vgowizc5lf8AvMOMdhQBm+F9F1DWdYPi/wATW/lXTKV02wc7vsMJ7njiRu56gcew7hyVRiFLEDIUd/alooA47whpGraXr3iS6v7NI4dTvftEDJKGKqF24YdjwOmevtVPW4fGl34lFxBoum3WmWrZtIpr0pl/+ejAKcn0H8P16d7RQBi+HpfEM6XMviC3s7Vi4EEFrIZAFA5JYgZJJ/ICtqiigDmfH+lX+u+DdQ0jTYFkubuMIrO4RF+YEknr0z0BrQGmW+r6BFYa1psMkexBLbzBZU3Lj8DyOK1qKAPOvEvwt0S8l0U6ToGlQrBqUc14BAieZAFbcvA5ySvHtXoFvbw2ltFbW8SRQRKEjjRcKqjgAAdAKlooAKKKKACiiigDzj43vcW3w6uLy1vLq2miljAMEzIGDMAQwB5GPWsbxzpt34EvNF8U6bqupXFzJqEdvewzXDOt0r5yNp4HfAAwM8Ditj46kD4WX3IBM8OP++xW9L4XvtWvtMl13U4bu206UXEUMNt5XmTKPkdzuOccnAAGfyoA47xIt3J+0FoAspoYZzpLkPNGZFHMmcgMp/Wj4tQ6zHo+hnUL2xnh/tm3wsFq0bZ+bnJkbjr2rob7wPq938Qbfxamt2iS20LW8Nu1gzKIzu6nzQSfm68fSp/HfgzUfGcNnbRazDYW9rcJcr/oZlcyLnHO8DHPTH40AdnRUNqtwlsi3csUs4HzvFGUU/RSTj8zU1ABRRRQAUUUUAFFFFABXGah/wAlg0T/ALBNz/6GldnXGah/yWDRP+wTc/8AoaUAdnRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBQ1TRdL1uFYdUsLe8iU7lSeMOAfXBq3b28NrAkFvGsUSDCoowFHoKkooAKKKKACiiigAooooAKKKKACiiigArjdQUn4vaK2OBpNz/6HHRRQB2VFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB//2Q==']	['che_162_1.jpg', 'che_162_2.jpg']
che_163	MCQ	In industry, H_2S is commonly used as a precipitating agent to remove Zn^{2+} and Mn^{2+} from wastewater. By adjusting the pH of the solution, Zn^{2+} and Mn^{2+} can be precipitated sequentially. Throughout the treatment process, the H_2S solution is maintained at saturation, i.e., c(H_2S) = 0.1 mol·L^{-1}. The relationship between the negative logarithm of the concentrations of S^{2-}, HS^-, Zn^{2+}, and Mn^{2+} (pM) and pH is shown in Figure <image_1>. It is known that K_{sp}(MnS) > K_{sp}(ZnS), and precipitation is considered complete when the ion concentration is ≤ 10^{-5} mol·L^{-1}. Which of the following statements is incorrect?	['A. III represents the curve of p(Mn^{2+}) versus pH', 'B. a = 2.6', 'C. K_{a_2}(H_2S) = 10^{-13.7}', 'D. Both c(Zn^{2+}) and c(Mn^{2+}) in the solution are 0.1 mol·L^{-1}, and the minimum pH of the solution when Mn^{2+} is completely precipitated is 7.6']	AC	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAE6AXoDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACijI9aMj1oAKKMj1oyPWgAooyPWjI9aACijI9aMj1oAKKMj1oyPWgAooyPWjI9aACijI9aMj1oAKKMj1oyPWgAooyPWjI9aACijI9aMj1oAKKMj1oyPWgAooyPWjI9aACijI9aMj1oAKKMj1oyPWgAooyPWjI9aACijI9aMj1oAKKMj1oyPWgAooyPWjI9aACijI9aMj1oAKKMj1oyPWgAooooAKKKxvFlvFdeEtWimXcn2SQ4yRyFJHSgDUFzAZEjE0ZdxuRdwyw9QO9cD4u8daj4R8aaXbXMcMuh3RUXE20hrfcSqkn0yBzXGXnhXTIvgro/iW2jaPXba2tp4b0SHzN2VATOemDgCu41rRU8VX8+laguGvNAUMccpJ5mQ31DAH8KAOy1XUoNI0m61G4J8m3jMhC8lsdAPUk4A9zXkU3ivXPFfwx1HUL9lsnXU0sjFakqygOob5gf8AaxWn4K1e88V22m+HtRRxPoUv/Ez3Dh3iOIh75IDf8BFc1pX/ACSbW/8AsZ2/9GpQB6Knwv0EopNxq+SP+gjL/jS/8Ku0D/n41f8A8GMv+NdnH/q0+gp1AHFf8Ku0D/n41f8A8GMv+NH/AAq7QP8An41f/wAGMv8AjXa0UAcV/wAKu0D/AJ+NX/8ABjL/AI0f8Ku0D/n41f8A8GMv+NdrRQBxX/CrtA/5+NX/APBjL/jR/wAKu0D/AJ+NX/8ABjL/AI12tFAHFf8ACrtA/wCfjV//AAYy/wCNH/CrtA/5+NX/APBjL/jXa0UAcV/wq7QP+fjV/wDwYy/40f8ACrtA/wCfjV//AAYy/wCNdrRQBxX/AAq7QP8An41f/wAGMv8AjR/wq7QP+fjV/wDwYy/412tFAHFf8Ku0D/n41f8A8GMv+NH/AAq7QP8An41f/wAGMv8AjXa0UAcV/wAKu0D/AJ+NX/8ABjL/AI0f8Ku0D/n41f8A8GMv+NdrRQBxX/CrtA/5+NX/APBjL/jR/wAKu0D/AJ+NX/8ABjL/AI12tIThScZx2FAHF/8ACrtA/wCfjV//AAYy/wCNH/CrtA/5+NX/APBjL/jWpp/i2DU9Y1HS4NPvftOnFRcBlUBSwJXBzzkCjSPFsGtS6hFa6fe77CYwTh1UYkAB2jnngigDL/4VdoH/AD8av/4MZf8AGj/hV2gf8/Gr/wDgxl/xrZ8O+J7bxLFcS2lrdRxwTPA7TKB86HDDgnoa3KAOK/4VdoH/AD8av/4MZf8AGj/hV2gf8/Gr/wDgxl/xrtaKAOK/4VdoH/Pxq/8A4MZf8aP+FXaB/wA/Gr/+DGX/ABrtaKAOK/4VdoH/AD8av/4MZf8AGj/hV2gf8/Gr/wDgxl/xrtaKAOK/4VdoH/Pxq/8A4MZf8aP+FXaB/wA/Gr/+DGX/ABrtaKAOK/4VdoH/AD8av/4MZf8AGj/hV2gf8/Gr/wDgxl/xrtaKAOK/4VdoH/Pxq/8A4MZf8aP+FXaB/wA/Gr/+DGX/ABrtaKAOK/4VdoH/AD8av/4MZf8AGj/hV2gf8/Gr/wDgxl/xrtaKAOK/4VdoH/Pxq/8A4MZf8awvGfgLS9E8G6rqdjd6sl1bW7SRMdQkIDDpxmvUq5X4k/8AJONf/wCvR6AN/S2Z9IsmZizNAhJJySdoq3VPSP8AkC2P/XvH/wCgirlABWV4mYjwxqaqjyPJbSIiIpYsxUgAAVq0UAcB4C8KWbeC9DTUIr0yWkcbPZXMr+Wk6jk7DwcHkDkDsK6s+H7E64NZzc/bRH5W77TJt2Zzt2Z24z7VqUUAUItHsYJL2W3h8iW9cPcSRMVZ2AwDkcg4FcB4y8KaT4X8DzxaTFNDHNfwSSI9xJIC5kXLYYnk+tenVxfxS/5Ew/8AX3b/APowUAdlH/q0+gp1Nj/1afQU6gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACisjxH4jsfDOlte3jMzE7IYIxl5nPRVHcmofC8uvzaU954hWGK5nkMsVrCv/HvHj5UJ/ibuT6mgDB8If8lL8ff9dbL/ANFNTvh7/wAhbxp/2HJP/RaUzwzHe2fjrxbqFxpl7Ha6g9u1vIYvviOMq305pfBaXmm6j4olvNMvYkvNSe6gJi++hRR+eQeKAHfCz/kA6v8A9hu9/wDRprua4n4b2t7p2mala31hc2skupXNynmpgFHfK8+uO1dtQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFcr8Sf+Sca/8A9ej11Vcr8Sf+Sca//wBej0Ab2kf8gWx/694//QRVyqekf8gWx/694/8A0EVcoAKKKKACiiigAri/il/yJh/6+7f/ANGCu0ri/il/yJh/6+7f/wBGCgDso/8AVp9BTqbH/q0+gp1ABRRRQAUUUUAc1D4pnm8aTeGjpZWWK2F00/njb5ZbaMDGc57U7RfE82r6/qel/wBmmH+znEc0pmDAkjI2jGT+lY9p/wAlz1D/ALAUf/o2l8Hf8j340/6+ov8A0AUAd1RWNqXijS9H1e007UJXt3uwfJldCImb+7v6BvatkHIyOlABRRRQAUUUUAFFFFABWT4i8Raf4Z0p7/UJCFHyxxIMvK56Io7k0/X9fsPDeky6jqMuyJOFUctIx6Ko7k+lcz4c0G/1vVU8V+KIttz10/Tzytmh6E+sh7ntQA7w34fv9V1UeK/FMYF8w/0GwzlLGM/zkPc129FFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXK/En/AJJxr/8A16PXVVyvxJ/5Jxr/AP16PQBvaR/yBbH/AK94/wD0EVcqnpH/ACBbH/r3j/8AQRVygAooooAKKKKACuL+KX/ImH/r7t//AEYK7SuL+KX/ACJh/wCvu3/9GCgDso/9Wn0FOpsf+rT6CnUAFFFFABRRRQBxdtperp8ULrXn04jT5tPWzVvOTeGD7txXPT8c+1O8M6Xqth4t8QX15p5itdSmSSFxMjFQq4+YA8Z9s12VFAFLVdJsNb0+Sx1G2juLaQYZHGfxHofeuI8zWvhu4ExuNY8K5x5nL3NgPfu6D16ivRKQgMpVgCDwQe9AFfT9Rs9VsYr2wuY7i2lG5JI2yCKs1wmoeEtQ8O3sus+C2WNnO+50mRsQXHqU/uP79DW54Y8W6f4nt5BCHtr6A7bqxnG2aBvQj09CODQBv0UUUAFZ2ua5YeHdKm1HUZvLhjHAHLO3ZVHcn0pdb1uw8PaVNqWpTiK3iGSe7HsoHcn0rktB0S/8VapD4p8TxGKNDu0zSm5W3XtJIO8h/SgB3h/Qr7xHqsXirxRDskXnTdNblbRD0dh3kI/Ku7oziigAopMgjORj1pQQehoAKKKMg96ACikyB3FLQAUUUUAFFFBOBk0AFFJuGM5GPWloAKKKKACqeqarY6NZPeahcC3tk+/KwO1frjpVyuS+J/8AyTPX/wDr1P8AMUAaqeKdGe7tbUXg8+7UtbxmNgZVHUrxyKuXuq2enS28d1N5b3D+XENpO9sE4GB1wCfwriPFimw0jwn4hQc6ZcwiQjr5UihGH05U/hXVXH+meKbKMHMdlbvct/vv8kZ/75E1AGzRRRQAVyvxJ/5Jxr//AF6PXVVyvxJ/5Jxr/wD16PQBvaR/yBbH/r3j/wDQRVyqekf8gWx/694//QRVygAooooAKKKKACuL+KX/ACJh/wCvu3/9GCu0ri/il/yJh/6+7f8A9GCgDso/9Wn0FOpsf+rT6CnUAFFFFABRRRQAUUUUAFFFFABXM+JfBttrk8epWcz6drcA/cX8HDf7rj+JfY101FAHF6J4xubbVI/D3iyFLHVn4t5xxBe+6N2b/ZPNdLrGtWGgaVPqWpXCw20C5Zj1PoAO5PpWL8RbfS7jwFrB1UWwjjtpGikn6JLtOwg9c7sdOa+YfCFnq+neMLHWNb07Uf7Pt50nvJ7m2kdVXs7ZHPUHNAH0NpehXnje+TxB4ptngsV507SXJHlqekkn+2fTtXP/AAv1W/0TxHL4d1S6mnttVh+36bLM5Y5BKvHk+m3OPb3r1ePUrKbTk1CK6hezdN6zowKFfUGvKtR02fVPhto+saKrPrWgy/aIYwpDkbjvQjryAD74FAB8ZdUvp4YbSwupre1sbqD7U8LlS8khwqZHYLkn/eWuu16/2eINE8IWLPCt2rz3LIx3Lbp2B6jc2BnrjNcZ8QLSW0+HNlFcI0mr3upQ3tzHEhdskktwOcKMD8K6C82j40aDqaOJLS+0ue3ikHQuCGI/IUAP+JFzPZadY2EOkavPpGS95JpOVeNF6AEcjnk/StT4dx6A3hz7Z4dvry8tLl9zPdztJIjAYKHdyuPT3z3q/qni/SNF1eLTdQknhmlj3xv5Dsj89AQDz7Vj+HbWHw1a+JtfktZrawvLo3kdqsZ3qgQAts7FmDNjsCM4oA6XWtU/suxDonm3MziK2hHWSQ9B9OpPoATXHfDdr5NV8XxX9091PFqWCxPH+rU4UdhWjfaNdeK7nTPEWla9d6an2TEMRtlYgPyWIboxGB+Hua5/wBpWraV4l8WXl9qd3PBDeNvjNsB9qOwHeMDr2wOKAMZLrS9Z8beT4vh8R6NqF1cFbIPcPDbSqDhEG04yf1JxXtVedeINR0r4keGl0zSFnlupJ4mV3t3Q2ZVwWdiRgEAEYzk5rqbnxXptp4qtvDswnW9uYvMjbyj5ZHPG714PFAHO+JxNB8T/AAkyXdyI52nDweYfLO1Bj5fz/OtH4mrL/wAK81meG6uLeSC2eRWgkKHIHcjtWX4vuYk+JPhAljtgefzmCkiPco27j0GfetT4lyL/AMK61uIEtJPavHEijLOxHAAHWgDd0Fi3h7TGYksbSIknv8grlvF2os/jfwzoE0jR2F60skoVivmsqkqhI7d8d629L1W2s/A9tqLl3gtbBXlEaFnGxBuG3rng8VS1l/DHiPw/YX2rKyxOFubTduS4Vuo2Bfm3ewoAyLJxpXxRuvDMZL6Vf6eLoWzsWETgkNtz0BHb1rT8MavND4n1rwpdytK+n7J7SVzlnt3AIBPcq2Vz3GKoeCfC00XiHUfFN9BPbyXSCCzt7iRpJY4R/E5JJ3MecdulM0uFrr46a7eRD9zZ6VBaysP+ejNvA/75oA9BooooAK4/4oSoPh3rNvnM09uUijUZZ2yOABya7CqtxqdjaXltaXF3DFc3JIgiZwGkI64HegDAurSDxL8OZrKCRZPNsvLBXqrhQQPYg4pnw/nutQ0FdUvoJILmcJEY5FIZRGoTv2LBj/wKusooAKKKKACuV+JP/JONf/69Hrqq5X4k/wDJONf/AOvR6AN7SP8AkC2P/XvH/wCgirlU9I/5Atj/ANe8f/oIq5QAUUUUAFFFFABXF/FL/kTD/wBfdv8A+jBXaVxfxS/5Ew/9fdv/AOjBQB2Uf+rT6CnU2P8A1afQU6gAooooAKKKKACiiigAooooAKqanqdno+mz6hfzpBawLukkY8Af40uo6haaVYTX19OkNtCpZ5HOABXDafp138QtTg1zW4Xh0C2fzNO01xjz27TSjv7L/kgC6Xpl3481SDxBr0DRaPbv5mmabIPvntNKO59B2r0F0WRGR1DKwwVIyCKXoMCigDgLnwzqfg26l1LwcvmWDsZLnRGbCE92h/uN7dDXS+G/FOm+J7N5rGQrNEdlxbSjbLA391l6itquU8SeC01K+TW9HuDpfiCEYS7iHEo/uSr0dfryKAOrrO1fR4NXgiV2aKe3lE1vOn3opB0I9R1BHcEisHQPGbS6iNC8R240zXAPlQn91cj+9E3f6da6+gBkIlEKCYqZQPmKjAJ9qfRRQAUUUUAFU5tOjuNRgu5nZvIyYo/4VY8Fvc4q5RQAUUUUAFFFFADJhIYmEJUSY+UsMgGqOkaPBpEEyxkyT3ErT3M7felkPVj+AAA7AAVo0UAFFMlljgheaaRY40BZnY4Cgdya4G417WPHM8lh4Vlax0gEpca0y/M47rAD1P8Atdu1AGjr/jKWPUToPhu2XUtbI+cZ/dWo/vSt2+nU1N4a8GR6VePrGq3Lapr8wxLeSjiMf3I1/gX6VqeHvDemeGNNWy0yDYmd0kjHdJK3dnbqSa1qACiiigAooooAK5X4k/8AJONf/wCvR66quV+JP/JONf8A+vR6AN7SP+QLY/8AXvH/AOgirlU9I/5Atj/17x/+girlABRRRQAUUUUAFcX8Uv8AkTD/ANfdv/6MFdpXF/FL/kTD/wBfdv8A+jBQB2Uf+rT6CnU2P/Vp9BTqACiiigAooooAKKKKACq99fWumWM17ezJDbwqWeRzgAClvLy30+zlu7uZIbeFS8kjnAUDvXA2dtdfErUo9Tv4pLfwrbPus7RwVa+cdJXH9z0Xv1oAWxsrz4i6nDq+rQvb+GrZ99hYOMNdsOk0o/u/3V/E16GAFAAAAHAAoVVRQqgBQMADtS0AFFFFABRRRQBleIPDmmeJtOay1O2EqfeRxw8TdmRhypFclBrmseA5UsfFEj3+ik7bfWQuWjHZZwP/AEL869Cpk0MVxC8M0ayRONrI4yGHoRQAkE8VzAk8EiSxONyOhyGHqDUleez6Hq/gO5e/8LxvfaGx3XOjFvmi9WgJ6f7nT0rrdA8R6Z4lsBd6bcCRQdskbDa8Td1ZTyDQBq0UUUAFFFFABRRRQAUUUUAFZuua9p3h3TmvtSuFiiHCjqzt2VR1JrL8S+MbfQ5U0+zt31HWpx+4sYT8x/2nP8K+5qloPg25l1FfEHiy5TUdZPMUKj/R7If3Y17n1Y8/1AM+PSNY+IM8d34gWXTvDqkNDpKtiS69GnI6D/YH4139vbw2sCQW8SRQxgKiIuAo9AKkooAKKKKACiiigAooooAK5X4k/wDJONf/AOvR66quV+JP/JONf/69HoA3tI/5Atj/ANe8f/oIq5VPSP8AkC2P/XvH/wCgirlABRRRQAUUUUAFcX8Uv+RMP/X3b/8AowV2lcX8Uv8AkTD/ANfdv/6MFAHZR/6tPoKdWbquqpomjvqE1tcTwwpvkEAUsqgcnBIz+HNO0XV49c0uHUYba4ggnUPF54UMykZBwCcfjg0AaFFFFABRRRQAVFc3MFnbS3NzKkUESl3kc4CgdSTSzzxWtvJPPIscUalndzgKB3NeeRRXHxP1AXFwskPhC2kzDCcq2ouD95v+mYPQd6AFt4bj4makt9dpJD4StnzbW7Aq1+4P+scf88x2HevRVVURURQqqMAAYAFJHGkUaxxoqIgCqqjAA9BTqACiiigAooooAKKKKACiiigArkPEHgx5r8674cuRpmuqOXA/dXI/uyr3Hv1FdfRQBynhvxpHqd2dH1i2Ola/EP3lpKflkH9+JujqfzFdXWL4j8L6b4ms1hvoyssZ3QXMR2ywt6q3auatPE2qeDr2LSvGLebYSNstNcRfkb0SYfwN79DQB39FNR0kRXRgyMMhlOQRTqACiiq2oahZ6VYy3t/cR29tENzySNgAUAWSQASTgCuF1XxZqOvX8mheCxG8yHbd6rIN0FoO4X++/t09aqb9Z+JLnyzcaR4Uz9/7lzfj2/uRn8z/AC7nTNLsdGsIrHT7aO3tohhUQYH/ANc0AZnhrwlp/hqF2iMl1fzndc31wd0szepPYew4rfoooAKKKKACiiigAooooAKKKKACuV+JP/JONf8A+vR66quV+JP/ACTjX/8Ar0egDe0j/kC2P/XvH/6CKuVT0j/kC2P/AF7x/wDoIq5QAUUUUAFFFFABXF/FL/kTD/192/8A6MFdpXF/FL/kTD/192//AKMFAGt4u/5EfVv+vKT/ANBo8E/8iPon/XlF/wCgijxWs0vhC/t7e3muJ57Zo444k3EsV4+lHgxJofCGmW1zbTW89vbpFJHMm0hgoz9frQBvUUUUAFMmmjt4XmmkWOJFLM7HAUDuTSySJDE8srqkaAszMcBQOpJrzoyXPxQvikXmW/g63kw0nKtqTg8gekQPfv8AyABRdfE+/wB58y38HW8nyryr6k4PX2iB/OvRIYY4IUhhRUjQBVVRgADsKSCCK2gjggjWOKNQqIowFA6AVJQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVDd2lvf2ktrdwpNBKu145FyrD3FTUUAeeS6drXw8ZrnRo59W8OA7pdOB3T2o7mHP3gP7tdjouvaZ4h0yPUdLu47i2fuDgqfRgeQfY1pV81fHCWGx8SEeGppIXaPdqy2LsFD5GwybeAevvQB7x4m8Wad4YtEe5Lz3c52W1nAN0s7eir/XoK858TLrtnax+MPGWmxX1hbyIU0eK52ra7mwGYbSJW5HfiqXwHe2uReSa1I0niNSvkfbSxmFrtG0pu/hznkV6d41VX0CNGAZWvrUEHoR56UAX7DV7fV9Ah1PRmiuIZYw8ILbV+hwDjH0qhp/igN4SbxDq8MVjbqhkKpKZCACRjoMkkYAHXIriLsS/CXX3uUV38G6nLiVVGfsEzdGx/cP+fevrFyZvCvgGzVg1peavEZCDkOqyFgPcGgDvdR8S3Gl6fYyXNkqX2o3Cw21q0mNpYZw7cgEAEnGfQZ61LZa/OPEp0DUraOO6a1+1QyQOWR0DbSDkAqQceoIP4VlfEm3sdR0Wz0qdX+3Xt0sdg8bbWjmHO/PsATWN4Jm1LSPG13ovimP7TrUtsGtNVBytxbofuAfwkHkj159KAO91rU30rTjPDaSXlwzCOC2iIDSuegyeAOpJPQAmua0bxtqMnixPDfiLQzpd7cQtNaPHOJo5lXkjI6EDP5V2jbQNzYAXnJ7VytnZDX/ABfF4jZcWdhC9vYk/wDLRm+/J9MfKPXk0AL4h8UavY6mNP0Dw6+tToge423ccIhz90Hf1J56V0GmzXdzptvPfWgtLqSMNLbiQP5THqu4cHHqK4vxX8PY7qe88Q6JqN5p2vBfNWVJj5chUcKy9McYrpfCWrT674R0nVbmMRz3drHLIoGBuI5I9j1oATXfEkGiy2lmkL3epXrFbWziIDPjqxP8KjuxrSsmvGgDXqQpMT9yFiwA9MkDP5CvMdN0+68QfGLxhLLqNxZy6fb29rbGLG5Y3XcSMg45Gf8AgVdH8O9a1TVLHVrLV5BPd6VqElkbgLjzQACCffmgDX13VNZtWEGh6ML+cJvdpphDGo7AEg5Y+nbuaqeHPFVx4n8LtqlnpxhvIpXhms5nxiRDhlDfyNbeqQ31xp00WnXUdtdMpCSvHvCn1x3rkfhhc30el6loupQRLeaVeNDLNEMLOW+fefc5yfrQB1ejavaa7pcV/ZsxikyCrjDRsDhkYdmBBBHtWJ8Sf+Sca/8A9ej1j+AZXh8cePNNXP2aLUUuEHYPIm5/zNbHxJ/5Jxr/AP16PQBvaR/yBbH/AK94/wD0EVcqnpH/ACBbH/r3j/8AQRVygAooooAKKKKACuL+KX/ImH/r7t//AEYK7SuL+KX/ACJh/wCvu3/9GCgDb119di02GXQI7Sa4RgXhuSVEiY5AI6HpWPpvxE0571NM12CbQtUbhYb0bUkP+xJ91vzrr4/9Wn0FVdU0nT9asXstTs4Lu2frHMgYfX2PvQBcBBGQcg013WNGd2CooyzMcAD1Nedar4f1nwHpN5qnhbVZZNPs4XnfSb7MybVBJEbfeXgcDpXj+kfE/WvGviG10LxPqaQaHez4uViCwjZgkIX6hScA80AewSzXHxPvmtrV5IfCNvJtmnXKnUGB5VT/AM8wep71qeNPELeFNO0rSdGgiS+1CdbOyTb8kQ7tj0A7fSussre1tbKC3so4o7WNAsSRABFUDgDHbFef/FPTblbvw34lt4Xmj0W9824RBkiJsZbHtgUAbl94d1S30mS4svEN+dUijLq8zK0UjAZwUxgA+3NZFp8S0u/h3b66tsP7TnnWwjtc8G6ZtoX6Z5+grqtS8RaXaeHJNXa8ia0aItG6sD5hI4C+pPpXjUPh6+0Dw74JutRiaLz/ABNFdTxN/wAsvMf5M+mKAPW77R9Yn0+3sbbWJbdnJa7vVAMhOOiA8KCfyFYXhOfXNK8d6n4X1HU5dVso7RLy3uZlAkj3MV2MR16Gul8S+KNN8L2C3F/cRRvK2yGN3C72+p6D1Pasfwnq+gTahOLfWLXUda1A+ddPbtuACjAUeiKOBnryepoA6HWodRubA2+mXAtppWCm4KhjEvcgHqfSuJ09tf8ADHxK03Q59ZuNX0zVLaaU/aVHmW7RjOcgdCSB+NdTP4z8Pw6BPrY1OB7CF2iaVW4Mg42jPesLw/4j8O3mu/2hJq9nc61fhbeG3gkEhhizu2DH4sx9vYUAdtc3EdpazXMpIjiQu5AzwBk8V5Z4Q16Txlr32mLxtd28yymWTQ2tkTYgPCZYZIxjJHvXfp4s0CSPUZF1S3KaacXh3f6n61zHia20nxDrnhzUNFnt59WhvEkE9s4Yi3537iP4ccc9zQB2+o3g0/TLu9Zdwt4XlKjvtBOP0rzh9V1h/hinjiHVZzfLF9uaDI8kx5yYtuP7vGc5zXoDanpd3qVxobXMUl4sO+a2PXy24yfY15h4j8Kmz00+CPDmrX0q38uWsdytHZws2XZ2xuCnnAzyT35oA6zVvEj6VpemeK0djpdyYVvoWORGkmFWRfQhioI7g+tdkCCAQcg9CK4H4mWkOm/B3UbGP7kUEEEfufMQL+uK7PSIpYdGsYp8+alvGr5/vBRn9aALlFFFABTJpo7eF5ppFjiRSzu5wFA6kms/XvEGm+G9Na+1O4EUQO1F6tI3ZVHUn2rkI9F1f4gSpdeJElsNADB4dIVsPcY5DTkdu+2gBZtc1fx5M9n4Ylex0QMUn1grhpfVYAf/AEL8q6zw/wCHdM8M6cLLTLcRpndI5OXlbuzt1JNaMEEVtBHBBEkUMahURFwqgdAAOlSUAYHibwnYeJoYmmL29/bnda3sB2ywt7H09ulcbf6nqVvJa+HvGl21lGZ0a11iCMeTcsjBlVyf9W2QOOhr1Gquo6dZ6tYTWN/bR3FrMu2SKRchhQA270+21TSpbC/RLq3uIykqsvDg1y+teCFbwXYaVpb5udIljubBpT1eNtwUn0PSs/ytb+HJzAtxrPhdf+WWd9zZL/s/30Hp1FdvpWr2GuadFf6bdR3NtKMq6HP4H0PtQBmXlhZ+LtNtZn8+0ubaUSxnGJbaUdQQfrj0IPHBqxa6EF1ZdVvblru9jhMETlAixoSC2AO5wMn2rYooA5WbwbNceGp9Fk8QamyzztK9wXBk2k58sE9FqPTPA8tjf2lxceI9WvYbZty2szgRkgfLkADODggeoFddRQBzA8JXD3N4LjxDqU1hdOzvZsVwAeqB8bgvbA7U3xXot5ewaXFo97eWMlrOhRLU7YygwMP22gdq6migDBu/DKS68Ncsrp7LUWg+zzSIgZZkHI3Ke4PQ1HJ4ShXw3PpFjf3dk88vnSXkL4mZywZmJ98Y+ldFRQBhXmhahNqMN3a+ILy2RIhG8GxHR8fxcjg1YtrSx8NabMymRt7mWWRvnknkPfjqT0AFatFAHMeDNBn0uHUtRvkCajq9293OgOfKU8JHnvtXA+uaZ8Sf+Sca/wD9ej11Vcr8Sf8AknGv/wDXo9AG9pH/ACBbH/r3j/8AQRVyqekf8gWx/wCveP8A9BFXKACiiigAooooAK4v4pf8iYf+vu3/APRgrtK4v4pf8iYf+vu3/wDRgoA7KP8A1afQUrMFUsxAAGST2pqELCpJAAXJJrz7Ub68+Imoy6Lo8z2/hyB9uo6ihw1yR1hiPp/eb8PqAJfXN18Sr6XSdOmkt/C8L7L68jOGvCOsUZ/u/wB49+lbtl8OfBunmc23hywXz02SB4t4K+mGzj8K6CwsLXTLGGysoEgtoVCRxoMBQKsUAcGfA+p+G3abwVqz20Odx0q+YzWx/wBwn5k/A1NbfEFLKdbHxZps2iXLHaJZPntpD/syDj88V21Q3Vpb3tu9vdQRzwuMNHIoZSPcGgDiL/4d6bc+I7XxZ4cngs9QQ7yAoe2uARg5UdCR/Ev168102p6OniPQJ9N1aER+aBzC+djA5V1PYggEfSubm8A3eiTteeCtXk0tidz6dPmazlP+6eU+qmnweP5dKmW18YaVLpEpOBdpmS1c+ocfd+hoA6SLTFvrSJdcs7K7uYht81olYN/tAEfLn0qxaaVp1hIZLPT7W3dhgtDCqEj0yBU9tdQXkCT200c0LjKvGwYH8RUtAFE6LpRtfsp0yzNvvMnleQuzeerYxjJyeaLfRdKs51nttMsoJlztkigVWHbggVeooAxbLw5Z22o6jfPbWu++URypHCFVkGfvf3icnJNaFjpmn6ZGY7CxtrRCclYIljB/ACrVFAEH2K0+1PdfZYftEieW8vljeyf3SepHtRa2NpYoUtLWC3RjkrDGEBPrxU9FAGJq+itrt/Zx3m0abaTLc+UDkzyL93d/sqecdyB2HO3RQSACScAUAFcx4l8YwaLcJpljbtqOtzj9zZQnkf7Tn+Ffc1l6l4r1HxDfS6L4M2M6HZdas67obb1C/wB9/bpW74Z8Jad4XtnFv5lxeznfdX1w2+ad+5ZvT2HAoAy9B8GzPqi+IvFNwuo63j9yn/LCyX+7Evr6sea7KiigAooooAKKKKADrXD6r4RvtG1KXXvBrx291Id13prnFvd++P4H/wBofjXcUUAc74a8X2XiLzLYxyWWqW/FzYXA2yRn+o9xXRVznifwdZ+IhHdRyyWGr2/NtqFvxJGfQ/3l9Qay9J8Y3umahHofjKCOzv2O23v4/wDj2vPcH+Fv9k0AdvRR1GRRQAUUUUAFFFFABRRRQAVyvxJ/5Jxr/wD16PXVVyvxJ/5Jxr//AF6PQBvaR/yBbH/r3j/9BFXKp6R/yBbH/r3j/wDQRVygAooooAKKKKACuL+KZA8FsScAXdv/AOjBXaVw/wAWYUufAc0EmdklzAjYODguAaAKWoajd+P799B0OZ4NDtzs1PUo+PNI6wxH+bdq7vTtOtNJ0+GxsYEgtoVCpGgwAKZpOm2ej6Vb2FhbpBbQoFSNBgCrtABRRRQAUUUUAFRzwQ3MLQzxJLGwwyOoIP4VJRQBw938Pm06d73wdqkuh3RO5rfHmWkvs0Z6fVcU2Lx1f6I623jTR209s4GoWmZbR/fP3k+jfnXdUySKOaNo5UV0YYKsMg/hQBFZ31rqNslzZ3EVxA4yskTBgfyqxXFXvw8t7e5e/wDC+oT6DfE5Ig+aCQ/7cR4/LFQR+NNZ8OOLfxpo7RRA4XVdOBltm93X70f5GgDvKKqafqdjq1qt1p93DcwMMh4nDD9Kt0AFFFYXiXxZp/hm3Q3G+e8mO22soBulnb0Uf16CgDT1HUrPSLCW+v7mO3tohl5JDgCuEI1n4kyYzcaR4TzzjKXOoD09UjP5n+Utn4butZuo/EHjuaFfLbfaaVv/ANHtfQvn77/XgV28N9ZS3D2sFzA80Q+aJHBK/h2oATTtNstIsYrLT7aO2tohhI41wBVqsC11mTV/El3YWThLXTSq3UoAJeUjPlj0AHJPuBXN6n4m1vWPFV3pHhXWtCtjYkRTR3uXlkkxltoH8IyB9c+lAHodFRWyzJbRLcSLJOFAkdVwGbuQO1cT4o8T6i3iWPw94f1fRrK+jjEk/wDaJJL7vuqijvgEn6igDu6KpaRHqMWlwJq08E98B+9kgQqhPsDzipLnULOyIF1dQwk9PMcLn86ALNFY3iDULrTdM/tezKzw2y+ZNAAD5sfcqezAcjsa0rK8g1GxgvLWQSQToJI2HcEZFAE9FFFABVHVtIsNc0+Sx1K2S4t5Bgo46e4PY+9XqKAPO0uNb+HMnlXpn1jwrnEdyBuubEejj+NPfqK7uw1C01SyivLG4jnt5RuSSNsgirDKrqVYAqRggjg1wmo+FtU8MXkms+CthVm33WiytthuB3MZ/gf9D/MA7yisLw34s07xNbubYvBdwnbcWc42ywN3DL/XpW7QAUUUUAFFFFABXK/En/knGv8A/Xo9dVXK/En/AJJxr/8A16PQBvaR/wAgWx/694//AEEVcqnpH/IFsf8Ar3j/APQRVygAooooAKKKKACuL+KX/ImH/r7t/wD0YK7SuL+KX/ImH/r7t/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che_164	MCQ	Under certain conditions, Fe(OH)_3 in the waste residue was leached with oxalic acid-ammonium oxalate. At equilibrium, the morphology distribution of oxalate containing particles in the leaching system (calculated as C_2O_4^{2-}) varied with pH as shown in the figure below<image_1>. The following statement is incorrect because () It is known: ①Fe^{3+} and C_2O_4^{2-} can form three complex ions: Fe(C_2O_4)^{+}, Fe(C_2O_4)_2^-and Fe(C_2O_4)_3^{3-}.② The total concentration of oxalate in the system\[C_2O_4^{2-}\]_{TOT} = 4.54mol/L(calculated as converted to C_2O_4^{2-}).	['A. Curve ③ shows the change of HC_2O_4^-', 'B. K_{a1}(H_2C_2O_4)=10^-a', 'C. Under these conditions, the amount fraction of alkali enhancing Fe[C_2O_4]_3^{3-} will definitely increase', 'D. When pH=c, c(HC_2O_4^-) ≈ 0.68mol/L']	BC	che	化学反应原理	['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JHTkAZFQaFS70q4v9flF+o/sOO1XyVSdkxLk7tyjGRjGDnjnis3wX5mp2WuW8zy3ehm9ePT5LhizPFtG4AnkoGyFOSfyFQ65d65rlxD/AGTpcGpaC0YZgL4W7yPk5RwVJAGMFeDnIPTFWbfWdZsHafV9Jg0yzigENpY21yLh7iZiMBQqjGAuAMfxE9qANrw5PJLpXkzO0klrK9uXbq204B/LFa1Z2h2MthpaJcbftMjNLNt6b2OT+XT8K0aACiiigAooooAKKKKACsW91C6u7qey02aO2S2x9rvZE3CPjO1BkAtjnJ4XjIPStqubt/7KHhbVTfyBbBpbr7YzkgD528znrjrQBRa/05DAz+I9YhNwwjiu5FURSMeBjMfl8/TvW5YX11DeDTNTKNc7S8NxGu1Z0HXj+Fx3HTuO4HK+N7Vj4HMYjjm8MQxxSzLakrcfZ0KsNhbg9AT0OM4Oa6bXC32vR3gwZvtigEYz5ZB349sdaANqiiigAooooAKKKKACiiigAooooAytWgS6v9Ihlk2xrcmYofuzFI22ofcMRIPePPauc8e3EeqaJrOmCZVt7WxlmufmALuI2KR/nhj9B7iun1jT5L6CCS3ZVvLSYXFszdA4BUg+xVnX/gWaw9UuNJ1nSb7TppLPS7+5ieKZL2MCRdylSy5I3deGBIoAseAGim+HXh2PcjgaXbq65B/5ZrwaueGGP9jmDawS2uJraMsclkjkZFJPuADWJo0sei+HbXQtGubTUb23hS2WeBQEjCqAHmIJGcc46nPArptMgt9N023s0nVxCgXczcse5oAvUVH58X/PVP8AvoUoljPR1P40APopu9P7y/nS7hjORj60ALXE/EWQ39vpXhqFj9p1a8QHaeUhjIeRsdxgAfjWt4h8Z6N4cQJc3HnXsnEFjbjzJ5m7BUHP4niqHhbQtSl1WfxT4jCrqtzGIoLRTuWxgznywe7Hqx9eB7gHXKAqhQMADApaKKAOJ+Go+xafreh7CiaVrFzDCrHJMTt5qE/hIfyrtq4rTNunfF7Xrbcx/tTT7e9HoGjJiI+uNp//AFV2tABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHO+Pv+Sd+Jf+wXc/8AopqteEv+RM0L/sH2/wD6LWqvj7/knfiX/sF3P/opqteEv+RM0L/sH2//AKLWgDYooooAKKKKACiiigAooooAKKp6jqllpUCzXs6xK7BEB5LsegA6k0unapZ6rbtNZTrKiuUfHVGHVSOoNAFuiqep6rY6NYve6jdR21uhALyHAyeg9zVTQvE+jeJYpJNJv4rnyjiRVOGQ+4PIoAzPh1/yJ0f/AF/X3/pXNXVVyvw6/wCROj/6/r7/ANK5q6qgDzT4yQ3On+HR4m06RYr2xR4GbOC0Uo2EfgSGHuK6jQtCh0620Jbe4ieKy09bddn/AC0G1RvHscZ/Gsjx/bxa7qvhzwzMvmQXd2bm6TsYolJwR6FiBWZ4EmubPxAPDF6zvc6Eslskjf8ALS3ODC3/AHzgf8BrSle7s+j/ACMK7SSur6r8zU8bQSaDq1j43s1JNmPs2pRr/wAtbRjyfqjYb6ZrtoZo7iCOaFw8Uih0YdGBGQaSeCK5t5IJkDxSKUdT0IPBFcZ4Hnl0W+vfBt45LWH72xduslsx+X6lTx+VZm5011pOnPK15NGYnGXeSOVos4HVtpGePWsTwXPZ6xFdaxb6b5UBuHisrmaRpJJoR1cFiSqlt2AOwFVPGl1PrWoW3gzTpGSS8Xzb+ZGwYbYHnnsW6D8a7G0tILGzhtLaNYoIUCRoowFUDAAoAmooooAKKzda17TPD1kbvU7pII+ig8s59FHUn6Vy41Xxh4q40a1XQNOb/l+vo99ww9Ui6D/gX5UAdhf6lY6Xbm41C8gtYR1eaQIPzNcu/wATNDmYppMOo6wwON1haO6A88FyAO1Saf8ADjQba5F7qST63qHe61WQzkH/AGVPyr7YHFdYiJGoVEVVAwAowBQBx6eLvEdwx8jwNqATGVee6iTP4ZJpR4m8WIrNJ4KlbA4Ed9Hk/nXY0UAcX/wn1xagHVvCWu2eQCTHCLgL9ShNU7fxP4f1O9uo9Nv7W9tr0FbvSpT5UwcjBKK+Mkjqvrznk16BWVrHhrRNfh8vVtKtLsYwGliBZfo3Ud+hoAwbux02/thBeHXb6AMM6dJGdr4OQGJUBhkDq3PfNbVlZ3l5qn9qalGsPlKUtLYNuMYPVmP949MDoPWuf/4Q/XfDi7/CevTNbp00vVWM8OP7qSffT25I9atab47iF6mmeItPm0TUXOFE5DQyn/YlHB/HBoA6+igHIyOlFABRRRQAUUUUAFFFZWu+ItL8N2X2nUrkRhjtjjUbpJG7BVHLH6UAatYGueM9E8Pzpa3d0Zb5/uWVshlnb/gC8/nisMJ4u8ZDc80nhrRX6LFzezL/AL3SLPtzXQ6B4T0TwzCyaXYRxSPzLO2XllPqznLHnnrQBhjW/Gmt86VoUGlW7dJ9TkzJjPURr7diabL4I1jWI9uv+K7uaNjlreziSGPPscE13FFAHGRfC7wyI1S6jvr4BAn+l3sr8f8AfQqaH4Y+CoFxH4cssf7Slv5mutooA4+b4V+B5/8AWeHLT/gO5f5Gli+F3gyD/U6Ksf8AuXEo/k1dfRQBxsvwu8Ly9Le7j/3LyUf+zUf8Kx0DyzH52q+Weqf2hLg/hmuyooAxdF8JaD4eZn0vS4LeV/vSgbpG+rHJ/WtqiigAooooA4vxMTYfEDwnqe4JHM82nyYHLmRdyA+wKfrXaVxvxLjZPDEWpRIDNp15BdKx/gAcBj/3yTXYRyLLEkiHKuAwPsaAHUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBzvj7/knfiX/ALBdz/6KarXhL/kTNC/7B9v/AOi1qr4+/wCSd+Jf+wXc/wDopqteEv8AkTNC/wCwfb/+i1oA2KKKKACiiigAooooAKKKKAPPtUle8+Nmi2Up3W9rp01wiHp5hIAb6gfzpujzNafHTxDYQ/Lb3Wlw3kqZ4MqkJux/un9K19f0K6XxbpXijToTcTWkb29xbqQGkib+7kgbgQOpFQ6Noeox+I9e8WXdsFvryJILOzLjMcSDgMw43M3JwSB60AdPdaba3txbTXMSym3LNGrjKhiMbseoGQPqa4/SdIgk+Kuqavp0Sw2sNottcNGMLLMTnH1UYyferOq6h40uPCtr9h0SKHVrji5T7UuLde+085Yjp6U7wzL4mjngsbvw/a6bp0aktIt15ru3+JPJJoAm+HX/ACJ0f/X9ff8ApXNXVV5j4K8E6fqOlrq8t9qsc51C7by4b10iyt1KB8g4xxz6816Pe3cVhYXF5O4SKCNpHYnAAAyTQByOlf8AE3+KOsX/AA0OlWyWMZ9Hb53H/oNZ/iy+Xw18SNC1oLtgu4zY3rj+6WHlsfox/Wtf4b2ksfhRNRuUZbrVZnvpAw5Ac5UfguKueJdAsPECyWVzPtnmtZI40+uPm/A4q4JNu/ZmVVySXL3X5nRVxvj+wu4LW28U6TF5mqaKxm8oHH2iD/lpFn3HIODgjgVc8B6xLq3hmNLvjULCRrK8U9Vlj4P5jB/GumIyMHpUGpx3w708nQz4iu54rrU9bxdzzRElVUj5I1zzhRgfXNdjXCeGs+EvFt34Vk+XTrzde6UT0TJzJCPoTkexru6ACuQ13xhMNRbQfDNqupa0f9YWOILQf3pWH/oI5NU9R1zUfF+ozaJ4Xna3sYX8u/1hRkJjrHD/AHn7E9BXT6D4f07w5py2WnQbEzud2OXkbuzN1JPqaAMfQ/A8FneDVtbuX1jW2wWupx8kXtEnRB19/eusoooAKKKKACiiigAooooAKp6npVhrNk9nqNrFc279UkXI/wDrGrlFAHAPYeIPAJ87STPrfh1c+ZpznN1ar6xMf9Yo5+Q88cHmuu0XXNO8Qael9plys0LcHHDIe6sOoI9DWjXHa54TurXUH8QeFHjtNW4M1u/EF6B/C4HQ+jDmgDsaKwPDHiq28RwzxGGSy1O0by7ywn/1kDf1U9Qw4IrfoAKKK5XxV4nuLK5h0LQ4lutfvFzGh+5bp0MsnoB2Hc0AP8T+LG0u4j0jSLb+0fEFyuYbRT8sa9PMlP8ACg/XHFR+H/Bos73+2dduRqmvOPmuXHyQj+7Ev8IHr1NW/C3hW28N20rmV7vU7pvMvL6XmSd/6AdAOwroKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDJ8Uaemq+FdVsXztmtZF46/dOKreCdQOp+CtHu3G13tUDrnOCBgj9K364v4bn7Np2r6OWZm03VJ4cnuGbeMe2GoA7SiiigAooooAKKKKACiiigAooooAKKKKAOd8ff8k78S/9gu5/9FNVrwl/yJmhf9g+3/8ARa1V8ff8k78S/wDYLuf/AEU1WvCX/ImaF/2D7f8A9FrQBsUUUUAFFFFABRRRQAUUUUAFFFFABRRRQByvw6/5E6P/AK/r7/0rmqr8SbiSfRbPw7bMRda7dpZDHVYvvStj0CKQf96rXw6/5E6P/r+vv/SuaqOnD/hIfihf6kfns9Bg+w2/obiTDSsD6hdq/jQB2kEMdtbxwQqEijUIijsAMAVmXFvK3imznEbGJbeRWfsCSK16y57ydPElpaK+IJIHdlwOSMY5rWle7t2f5GGI5eVc3dfmczOT4W+KENxjbpviWMQyHsl5GPk/77TI9ytd1XPeNtEfX/C11awHZeRYuLSTOCkyHcpz9Rj6E1Z8L64niHw3Z6mBseSPEyHgxyDh1Ppgg1kblHxxolxq2jJdaf8ALqunSC6s29XXqv0YZH41zMXiO++JkUWm6GZrHTPLX+1b77rqxHMEf+12Ldq0NX12+8W303h7wtLst1OzUNWXlYR3SM/xOfXoKxdHx8NfE11awoR4TurhInZmJNnclFw5J/hfoSehA6d2otptdCZTUWk+p6XpmmWejabBp+nwJBawLtSNBwB/jVukBDAEEEHkEUtIoKKKKACiiigAooooAKKKKACiiigAooooA5bxR4Wk1G5i1rRphZ6/ariKfHyzJ18qQd1P6VY8K+KYvEME8E8LWerWbeXe2Un3om9R6qeoNdDXEfEDTreztR4stLyLTtY01cx3DHC3Cd4ZB/Ep7dwencEA2vFfiSPw1pHnrCbm/ncQWVop+a4mb7qj27k9hVfwh4ak0a3mv9SkW512/PmXtwORntGnoi9AK5nwJfjx7r03i2+RYmsk+y2WnuwZrUkfPIw7M3Qcfd7816XQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXF6OTp/xV8Q2JKql/Z29/CgHUqTHI357a7SuJ8Rk6d8TPCOoogCXi3OmzyHPQp5kY9M7kP60AdtRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHO+Pv+Sd+Jf+wXc/8AopqteEv+RM0L/sH2/wD6LWqvj7/knfiX/sF3P/opqteEv+RM0L/sH2//AKLWgDYooooAKKKKACiiigAooooAKKKKACiiigDz7QtbTw98K7nUmG54ru+ESDq8hu5gqj3JIroPBWiyaF4Xtre4O68lzcXT/wB6Vzub+ePwrz7waj+K7+10vY39laFf3dzdkj5ZbhrmVo09wFIY/UV7FQAVnymy/ty3DhvtnlP5Z5xt4zV8kAEk4A6k153qniqfU/FcUPhC1XVri3jeGa4zi2gY4+8/QkegzWlO13d20ZjWvZWV9V+Z22r6zp2g6fJfapdxW1snV5DjJ7ADqSfQc14/pSXus+LJ9HmbUdC8N60731tBIgjluyMb0DA5jB+9t6kHNegaT4IX+0E1jxJdHV9WXmMyDEFv7Rx9B9TzWn4q8Nw+JtJ+zGVre7hcTWl0n3oJR91h/UdxWZsaOm6ZZaPp8Njp9tHb20K7UjjGABVJ9O0rVU1exlj85Lhgl1G44yUGMfhis7wl4nm1MzaRrMa2viCx+W5gHCyr2lj9Vb9Ola+nW00Go6pLIm1JplaM56gIB/Orjbllr/V0ZVL88LLr92jOX8Oalc+F9ZTwhrcxaNwTpN7IeJ0H/LJj/fX9RXdVleIvD9l4m0iTT71WCkh4pUOHhkH3XU9iDWB4e8SXunakvhjxS6rqIGLS9xtjvkHcej+oqDU7SiiigAooooAKKKKACiiigAooooAKKKxvEfiWw8NWSTXZeSeZvLtrWFd0tw/91F7/AF7UAT67run+HNKl1HUZvLhj4CqMvIx6Ko7sTwBXL6XoOo+Kb+HxD4si8mCL57DR85WD0eX+9Jjt0H8pdE8M3+q6lF4j8WbWvlO6z09Tuisgens0nqe3au0YZUj2oA4jUvC0jC38Q+EZlttXhQjbLxFex55jlH8m6itjwx4stvEcU0LwyWOq2rbLvT5z+8hb/wBmU9mHBrT0mGS30uCKVdrqDkenJrJ8SeEbfXZYr+2nk0/WLYf6PfQcMP8AZb+8vsaqfxMzpX9nG6tojo6K4rTfGdxpl9Fo3jGBNPvnO23vFP8Ao130+638Lf7J967XrUmgUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFcb8TraRvCB1OBC9xo91DqUQzgfumy2fbYXrsqhvLWK+sp7SdQ8U0bRup6EEYIoAW2uIru1iuYHDxTIJEYHgqRkGpa474c3cq6BLol2xN5o07Wb7urIOY2/FSK7GgAooooAKKKKACiiigAooooAKKKKAOd8ff8AJO/Ev/YLuf8A0U1WvCX/ACJmhf8AYPt//Ra1V8ff8k78S/8AYLuf/RTVa8Jf8iZoX/YPt/8A0WtAGxRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHJfDeGKPwiXjjRWl1C+eQquC7fapRk+pwAPoBUuteOtM0y7/s+zWXVNVP3bKyXew/3j0UfU1yPhPw/r/iDRJIbnWfsGgLfXgjgsQVnuB9pl3eZIfujdkYXqO9eiaN4f0rw/afZtLsordP4io+Zz6s3Un60Acr/wjGu+LyJPFt41ppp5GjWEpUOP+m0g5b/dGBW5DbQ6Vr2nabp8S2tiltJtt4RtQYI7DiugrPlubddct7doM3DxOyy4HygYyK0p7vS+jMK60WttV+ZoUUUVmbnD/E2ygh0H/hIIHe31nTSDZXEON5ZiB5ZH8St3FM8G+Mpb7Vr3R/EIFhrYZStq7ZRxsXJjPcZ5x1Gal8Z/8TXxL4a8PjDJJcm9uFOf9XEMjn/eK1pajoOh+KPt9nd2R8yKZSZ1O2RX2jDIw5BxVx2f9dTKduaPr+jOkrL1/wAP6d4l0t7DUYd8Z5SRTh4mHR0bqrD1rl1vPFXgoiPUIZvEeiLwt3bIPtkA/wBtOkgH94c+1dJovinRPEMW/S9RhnI+9HnbIv8AvIcEfiKg1OatfEOq+DZ003xaxudOJ2W2touARxhZwPut/tdD/PuopY54klidXjcblZTkEeoNJcW8N1A8FxEksTjDI65BHuK8u0Sz1q0v9bfwW0UNtp981tJpF/KzwzYAJaN8ZiPP3eVoA9Vorj9P+IemvcCx123n0DU+9vf4CMf9iUfK4/I+1ddHIkqB43V1PQqcigB1FFFABRRRQAUVk614m0bw9bmbVNQhtx2UnLsfRVGST7AVzB1DxV40YR6ZbXHh3RG+9fXIAu51/wCmcfOwH+83OO1AGp4h8ZR6ddjSNItzqmuyD5LSI8Rj+9I3RF4+tN8OeEHs9QfXtduBqGvzLgzEfu7Zf+ecS/wj36mtTQPDWmeGrMwadBtZzmWdzukmb+87dSa16ACkY4Qn2rHvNfFp4q0zQ/s5Y3sMsvnb8bNmOMY5zmtg4CnPTFAFLRpHl0m3kkdncg5Zjknk1eqrpskMunwvBH5cRB2r6cmrVXU+NmdH+HHW+iKmpaZZavYS2OoW0dzayrteOQZBFccuj+JvBef+EflOtaMvP9m3kp8+AekUp+8B/db2ANd5RUGhz+heMtI16Q28crW1+nElldDy5kP+6ev1FdBWNrnhXRfESD+0bJJJF+5MuUkT6OORXPnRvGfhok6HqkOuWI6WWrMUmX2SZRz6DcOPWgDuaK4uH4kafbSLb+ItP1DQLkkDF5CTEx/2ZVypHucV1NjqlhqcKzWN7b3MbchopAwP5UAW6KKzfEGrf2F4d1HVvJ877HbvP5W7bv2jOM4OPyoA0qKr2N0L3T7a7CbBPEsm3OcbgDj9asUAFFFFABRRRQAUUUUAFFFFAHC623/CKeOrTX/u6ZqoWyvj2jl/5ZSH0zypP0ruqpavpVprmk3Om38QktrhCjr3+o9COoNcR4B8Yg3t54Q1i6aTUtMuJLWC7kXaL1E7/wC+ARkfQ880AeiUUUUAFFFFABRRRQAUUUUAFFFFAHO+Pv8AknfiX/sF3P8A6KarXhL/AJEzQv8AsH2//otaq+Pv+Sd+Jf8AsF3P/opqteEv+RM0L/sH2/8A6LWgDYooooAKKKKACiiigAooooAKKKKACiuR8d+IrrSI9I0zTZFj1HWb6O0ilIB8pCRvkAPUgfzqBNTuvDvj2w0Ce7uLux1O3d4ZLhgzxyp1GcDII59sUAZ2mWPxF0C1l0/T7Hw7PaLc3EsUk9zKHKySvJyAuAfnxVz7X8Uf+gV4X/8AAub/AOJruqKAOF+1/FH/AKBXhf8A8C5v/iapyRfE6TVYb86b4ZDxRtGF+1TYIP8AwGvRSQqlmIAAySe1cPf+ObtfDN94m0+0ik0m23CDzWIe7wdu5fRd3TPXFNSa2JlBS3E+1/FH/oFeF/8AwLm/+Jo+1/FH/oFeF/8AwLm/+JrsNNmuLjTLWa6REnkiVpFQ8AkZIFJquow6RpF5qVwcQ2sDzP8ARQSf5UijybSLn4g6t421bWLfT9AkmsVGmsHuJfKVh87bCFyTyAfpXQWy/E61ubuddM8ME3Lh2BupuMADj5fatj4b6fNZeBrGe6A+26hu1C5YfxSTHef0IH4Vi+DfElouq6/d6jrpFvcaibbT4Lm43ARx5XcuegZyw/4DjtTTaTSJcU2m+hc+1/FH/oFeF/8AwLm/+JrA1nwv4z12Xz7vw54VW6HS5gvJ4pR/wJVBr1mikUeOafoHxl0uU/Z9W0iS3/hhuZ3l2j03FM1oaBpPxN0KTUpFs/Dc8moXTXUhe5lGGIAwML04r0XVxftpskemMiXchCJI4yI8nBfHfA5xXn8h8S+DvHfh6zfXbnW9P1mSSGaG4RQ8TKu4upGMAdSPQH2oAt30XxF1O3NvfeH/AAjcwnqktxKw/Va5VvAfxCtXMmhJpOit2W11Kcxj/gDKRXttFAHllha/Ge0ULPd+HbsDp5jMD+YStgXfxSAGdK8Lk+v2qb/4mu7ooA4Ce4+Kske2LT/DETf3hcyn+a1zmo6F8Z9TfEur6PDAeGitpmj3DnjcEz3r2KigDyTR/CfjLRZ/tVv4c8LS3mcm6ub2eWUn/eZa6H7X8Uf+gV4X/wDAub/4mu6ooA4X7X8Uf+gV4X/8C5v/AImj7X8Uf+gV4X/8C5v/AImu6ooA8vutN+Jd14l0/W2sPDSzWUMsSRi6m2sHxkn5fatU3XxRII/srwvz/wBPc3/xNbfi3W59J0qVNPRZNSlidoEJ4UKpJdvYfzwKqfD/AFWe8+HOl6nql0ZJWtzJNPIeuCck0AZNm3xPs7SO3XTPDDKgwCbubPX/AHan+1/FH/oFeF//AALm/wDiauSeMriTSotXsdIuLiwmuIoYNoJlmDuFLqo6KBk5bHSuupttu7FGKikkcL9r+KP/AECvC/8A4Fzf/E0fa/ij/wBArwv/AOBc3/xNd1RSGcL9r+KP/QK8L/8AgXN/8TR9r+KP/QK8L/8AgXN/8TXdUUAcFLN8TZ42jl0bwpJG3VXuZiD+G2uYvfAviq8laaPw14Xsp26zWN9cQN/46BXslFAHisPhf4x2UubLW9OSEdIprp5QOc9WTNX9Q0j4varoV5pV9L4clju4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che_165	MCQ	Ethylenediamine (H_2NCH_2CH_2NH_2) has properties similar to NH_3. At 25℃, HCl gas was poured into 0.01mol·L^{-1} ethylenediamine solution. The relationship between the pH of the obtained solution (ignoring the change in solution volume) and the logarithmic value (lgc) of the concentration of N-containing particles in the system and the ratio of the amount of reactants t[t=\left[ t = \frac{n(HCl)}{n(H_2NCH_2CH_2NH_2)} \right] is as shown in the figure<image_1>. The following statement is true	['A. K_{b1} = 10^{-7.9}', 'B. Point M: pH = 8.8', 'C. Among the points P_0, P_1, P_2, P_3 and P_4, the point with the greatest degree of water ionization is P_4', 'D. P_0 point: 2c(H_2NCH_2CH_2NH_3^2+) + c(H_2NCH_2CH_2NH_3^+) + c(H_2NCH_2CH_2NH_2) = c(Cl^-) + c(OH^-)']	BC	che	化学反应原理	['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che_166	MCQ	Add Na_2S_2O_3 solution dropwise to the saturated AgBr solution (sufficient AgBr solid), and the reaction occurs Ag^+ + S_2O_3^{2-} \rightleftharpoons [Ag(S_2O_3)]^-and [Ag(S_2O_3)]^- + S_2O_3^{2-} \rightleftharpoons [Ag(S_2O_3)_2]^{3-}. The relationship between pM, pN and lg[c(S_2O_3^{2-})/mol·L^{-1}] is <image_1>shown in the figure. where M represents Ag^+ or Br^-;N represents\frac{c(Ag^+)}{c([Ag(S_2O_3)]^-)} or\frac{c(Ag^+)}{c([Ag(S_2O_3)_2]^{3-}}. The following statement is incorrect	['A. L_2 represents the relationship between\\frac{c(Ag^+)}{c([Ag_2(S_3O_3)]^-)} and lgc(S_2O_3^{2-})', 'B. K_{sp} = c(Ag^+)·c(Br^-) = 10^{-12.2}', 'C. The value of the equilibrium constant K for the reaction AgBr + 2S_2O_3^{2-} \\rightleftharpoons [Ag(S_2O_3)_2]^{3-} + Br^-is 10^{-1.2}', 'D. When c(S_2O_3^{2-}) = 0.001mol·L^{-1}, c(Br^-) > c([Ag(S_2O_3)]^-) > c([Ag(S_2O_3)_2]^{3-})']	CD	che	化学反应原理	['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che_167	MCQ	At a certain temperature, CO_2 was continuously poured into the mixed solution with c(Ce^{3+}) and c(Ca^{2+}) at 0.01mol/L, and the partial pressure of CO_2 was always kept fixed. The lg c-pH relationship in the system was as <image_1>shown in the figure. where c represents the concentration of Ce^{3+}, Ca^{2+}, H_2CO_3, HCO_3^-, CO_3^{2-}. It is known that K_{sp} of Ce(OH)_3 = 1×10^{-20}. The following statement is true	['A. ③ represents the relationship curve between lgc (CO_3^{2-}) and pH', 'B. When the pH gradually increased, Ce_2(CO_3)_3 precipitated preferentially in the solution', 'C. \\frac{c^2(HCO_3^-)}{c(H_2CO_3) path c(CO_3^{2-})} = 10^{-4}', 'D. 2Ce^{3+}(aq) + 3CaCO_3(s) = Ce_2(CO_3)_3(s) + 3Ca^{2+}(aq) K = 10^{10.3}']	BD	che	化学反应原理	['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che_168	MCQ	H_2CO_3 in natural water maintains a balance with CO_2 in the air. It is known that K_{sp}(CaCO_3) = 2.8×10^{-9} and the Ca^{2+} concentration is less than 10^{-5} mol·L^{-1}, it can be considered that the precipitation has been completed. The relationship between lgc(X)(X is H_2CO_3, HCO_3^-, CO_3^{2-} or Ca^{2+} and pH in a karst cave water is <image_1>shown in the figure. The following statement is true	['A. Curve ① represents the change of HCO_3^-', 'B. K_{a2}(H_2CO_3) = 10^{-8.3}', 'C. The coordinates of point c are (10.3,-1)', 'D. At pH = 7, Ca^{2+} has completely precipitated']	AC	che	化学反应原理	['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che_169	MCQ	"There is an equilibrium relationship in the Cd^{2+}-CN^-solution system at room temperature:
Cd^{2+} + CN^- \rightleftharpoons [Cd(CN)]^+;
[Cd(CN)]^+ CN^- \rightleftharpoons [Cd(CN)_2];
[Cd(CN)_2] + CN^- \rightharpoons [Cd(CN)_3];
[Cd(CN)_3] + CN^- \rightharpoons [Cd(CN)_4]^{2-}, the equilibrium constants are K_1, K_2, K_3, and K_4 in order. The relationship between the component distribution fraction δ, average coordination number n and lg(CN^-) of Cd-containing species is shown in the figure<image_1>. It is known that c_0(HCN) = 1mol·L^{-1}, K_a(HCN) = 1×10^{-10};lgK_1 = 5.5, lgK_2 = 10.6, lgK_3 = 15.2, and lgK_4 = 18.8. The following statement is true"	['A. As lgc(CN^-) increases, the degree of ionization of water decreases', 'B. At pH = 6, n is approximately 3', 'C. At point a, c(OH^-) + c(CN^-) + 2c([Cd(CN)_4]^{2-}) = c(H^+) + c(Cd^{2+}) + c([Cd(CN)]^+)', 'D. lgK of the equilibrium constant of [Cd(CN)_4]^{2-} \\rightleftharpoons Cd^{2+} + 4CN^-= -50.1']	BD	che	化学反应原理	['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ODjbQB3lcB8TydRj0Dw0mS2rajGJVHeGP53/AJCu4sryDULGC8tpBJBPGssbjoysMg/ka4Zf+J38bJD96DQdOC4P8M0xzkf8AGOxoA79VCqFHQDApaKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK474q/8AJMNf/wCvcf8AoS12Ncd8Vf8AkmGv/wDXuP8A0JaAOg0D/kXtO/69o/8A0EVoZA71n6D/AMi7p2Ov2aP/ANBFcJ4n+GtjfaNf61qWoXn9vxQtOl+t06rbsoLAIo4CDHpnqetAHplFcx8PNQ1PVfAWj3usf8fs0G52/vrk7WPuVwfxrp6ACiikJCgkkADkk0AZWp+JNN0m+gsrmSQ3MyNKscUTOwRfvMQB0GRWnDNHcQpNC6vHIoZGU5DA9CK8o8bak+uW6eJ/CltdT3WhSMVvUC+TOg/1kfLAuuB1AI9K9A8Jaxaa/wCFdO1SxiWG3uIgwiUYCHoV/Ag0AbVFFFABRRRQBw/xf/5Jhq//AGy/9GLXY2f/AB42/wD1zX+Vcb8YAG+F+sA9CIh/5EWtLwt4N0rw7tvLE3ZmmgVW866eQYODwGOB0oA6eiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOA8L/wDEo+KXivRz8sd6sWpQL/vDbIf++gK7+uA8V/8AEo+JvhPWQdsV2JdMnYd9w3Rg/wDAga7+gAooooAK5bUPEd2vxE0rw1YxwvG9pLeX7OpJSMHbHtOepfOc9q6knAzXNeFNU03xP9q8RWdh5TtK9ml0wGbiKNjhgf7pJb8qAOlrz+/H9vfGXTrT71toVk10/cedL8qg+4XmvQCQBk9K4D4Zj+05/Efiduf7U1F1hb1hi+RP5GgDv6KKKACori3iu7aW2uI1khlQxyIwyGUjBBHpipaKAOB+GNxLp9lqnhK9lZrnQLpoY2c5Z7Zvmib/AL5OMdgBSfC//iYQ694jbJ/tbU5XiY9fJQ7EH4YNYPxTvJ/BWur4ptFcRalp82m3Hl8Ym2loX9znIz2Arv8AwVpH9heC9I04qFeG2QSAf3yMsfzJoA3qKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAz9a0a117S5dOvDMIJSC3kytG3Bz1Ug9q8t+IPwz0DSPAer6hatqJngh3J5l9K653AcgnBr2KuO+Kv/JMNf/69x/6EtAHQaB/yLunf9e0f/oIrmtZ1rS/El3caB/adtDp8TbNQlNwqGT1hXnPP8R7DjqTjpNDUP4b09GGVa1QEf8BFYx+GfgtmLHw5YEk5J8ugDe0y+sL613abNFNbRN5QeLlMjspHBx0475HartVNM0ux0ewjsdOto7a1jzsijGFGTk/qat0AFYPjeO6m8Da5HYrI101lKIlj+8W2nge9b1FAHmcOtaboXwWsY7FklnmsFgt7eHBeWdxgqFHU7ic/jXSfDrQbjw14D0rS7zAuY4y0oH8LMS2Pwzj8K2odF0u2vXvYNNtI7p87pkhUOc9cnGavUAFFIzqgyzBR6k4pQcjI6UAFFFJuG7bkZ9KAOI+L/wDyTDV/+2X/AKMWuxs/+PG3/wCua/yrjvi//wAkw1f/ALZf+jFrsbP/AI8bf/rmv8qAJ6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA4j4r2kk3gae+tx/pOmTRX0R7gxsCT/3zmuvsLuPUNOtryFt0U8SyIfUEZFN1Kyj1LS7uxmUNHcQvEwPcMCP61ynwpvpLnwHa2lw2brTpJLGYf3TGxAH/fO2gDtaKKKAMvxDqNhp2kSHUbxrSG4ItllTO8PJ8q7cA85NO0DRLPw3oNno9gpFtaxhFLdW7lj7kkk+5rD8ZaXDqF/o2oX2oQW+laLcG/u45DgsyqfLOewBz9azoPi3oj3ELXFhq1nps77IdTubUpbSZ6Hd2B9SKAN7x1q/9heB9Y1ANtkjtmWM5/jb5V/Uin+CtI/sLwZpOnFcPDbL5n++Rlv1JrnfiTINUl8MeHom3DU9SSSQA5DQxDe39K78AAADoKAFooooAKKKKAPK/jiLjUtD0rw/YR+Zf3t000a4zlYY2Zse/IxXd+E9bj8ReFdN1VMD7RArOoOdr9GH4EEfhXMR/wDE7+Ns7fft9A0xY8MPuzzndkf8AGDSfD//AIkfiLxL4SbiO1uftlmvbyZfmwPoc/nQB6DRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXHfFX/kmGv/8AXuP/AEJa7GuO+Kv/ACTDX/8Ar3H/AKEtAHQaB/yL2nf9e0f/AKCK0aztA/5F7Tv+vaP/ANBFaNACMu5CuSuRjI6iuCb4aHcSfG3ipc9v7Q/+tXfV88/H/UJZfE2m2FhDJJNb2xknaLcSN7fKDj/cJ/GgD6GooooAKKKKAPOLZ18ZfFHWrK/jSfSNDgjiW1k5R55BneV6HABAznHUVZ8C6jNbeLPFHhOSRpLbTZY5rPecskUi7in+6pOB7Gq/hi3k0b4v+K7a4RguqwQ3ttIfusqDYw+oLflUfg1Em+IfjnxK7qtgJI7RJ2O1cxIPN69gQOelAHoV9e2+nWM15dSCOCFC7sewFeWWUuqXHxv0q71JpIzdaXNLFZt0t0zhVI/vEDLe5x2rqfEltqniuy0m88L6jpM9ikpnb7SWkinK8J9zrtYE49QPSuFuovGw+M2krc3GhHUf7Oco0ccvleVu+YEE53enagDtPi//AMkw1f8A7Zf+jFrp7LU7D7Hbr9tt8+Wox5o9K5f4vjd8LtXDcgiIH/v4tOs/hX4INtBIfD1vv2K2d79cf71AHb0UiqFUKBgAYApaACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK8/8JkaN8SPFuiMRHDctHqdunrvGJD/30BXd3VzBZWst1cyrFBCheSRzgKoGSSa8I1h38beOtC12/t5rLwvqMraZE8czRy3Scsu8D+Bm6D257UAe2Ra5pM939lh1OzkuP+eSzKW/LOa0K467+Fvg650z7FHoltalR+7uLddk0bdmD9SR75ritT8dar4O8J+IPD+r3Lya7p8IFheEfNdRSHYkn+8pPPuO9AGdpmjan43+LniS21NJItItruN7yLflZljGIIjjseXI/rivbL3TLLUdMl026to5LOWPy2hK/LtxjHtXN/DXw9N4e8G2y3pd9TvSby9kkJLtK/J3Z7gYH4GuvoA8U8G6fc6f8YT4e1G/W5g0Cyk/sze2X2SFSM+6qcH2x2r2uvBHtZ5hq/xOsw0lzZa47oV6zWKYiZfyB6+hr3Syu4b+xgvLdw8M8ayRsOhUjINAE9FFFABSEgAknAFLXL/EXWDoXw+1q+RnWX7MYoihwwkk+RSPoWB/CgDI+FgOo2Ot+Jn+Y6zqc00Tt97yEOyNT9NpwPek8X/8SL4heGPEa8Q3LNpV23s/zR/+PA11HhTRxoHhPStKAQNa2yRuUGAXA+Y/icn8az/iHoza74G1O1hB+0xx/aLcjqJI/mXH5Y/GgDqKKxvCesp4h8K6bqikZuIFZwOzYww/A5rZoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAri/ipPEfhnr6eam77PjG4Z+8tdpXlXxO8AeF7bwZr2tQ6VGmo7DN5wkfO8sMnGcdz2oA9E0D/kXtO/69o//AEEVo1naB/yL2nf9e0f/AKCK0aACuftPCNjBr2ravOzXVxqLR7hKoxGqKVVV9uTXQUUAFFFFABRRRQBSv9I0/VDGb20jmeIkxuRhkJ4O1hyMjjinxaZYwad/Z0NnBHZbCn2dIwse09RtHGDk/nVqigCrpum2Wj6fDYadbR21pCNscUYwqjOf5kmhtNsX1FNRe0ga9jQxpcGMeYqnqobqB7VaooA4f4v/APJMNX/7Zf8Aoxa7Gz/48bf/AK5r/KuO+L//ACTDV/8Atl/6MWuxs/8Ajxt/+ua/yoAnooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiis/XNWt9B0O91W6OIbWFpW98DgfUnj8aAOK8Yyv4w8WWnge1ZhYxBbvWZEOP3Y5SH6scE+1W/ihpm34fyT6fCqzaPJFeWwXAEflMMkDpwu7ipPhno9xa6DLrWpA/2trUpvbknqob7iewC447ZNdbqNnFqOm3VlOu6K4iaJ1z1DDBoANOvItR021vYG3RXESyo3qGGR/OvE/jNf2svjvQIxpwuxpCi+1Bk5KwGRRtOO3GefUe9d78LL928BxWl24+06TLLZTg/wABjYgD/vnbWN4LsbfxufFviO6hP2bWWawtww5+zou3P4n9RQB6dDLHPDHNE6vG6hkZTkEEZBFZnijVP7E8K6rqe5Va1tJJE3dNwU7R+eKwPhZqE114LjsLts3ukTSadP8AWI4H/ju2q/xbcz+E7XRVJDazqVtY7h1UM+4n34X9aAL/AID0GO0+GWl6VdRErPZ5uI3zkmUFnB/FjVD4X3M1rpuo+F7tybrQrprdd3VoD80TfiOPwru40WKJI1ACqAAB2FcBq/8AxTfxb0vVB8tprsBsbg9vOTmMn3I+WgD0GiiigArz/wCIR/tXxJ4O8NA/Ldagb2cHlWit13lSO4JI/KvQK8/0T/idfGLxBqfPk6RZRabEeoZ3PmOfqOBQB6BQQCCD0NFFAHn/AMN86TqHiTwq2QNNvjNbjsIJfnUD8c16BXn+uf8AEh+LmhaqPlt9Xt306cnoHX54/wAT0r0CgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuO+Kv8AyTDX/wDr3H/oS12Ncd8Vf+SYa/8A9e4/9CWgDoNA/wCRe07/AK9o/wD0EVo1naB/yL2nf9e0f/oIrRoAKKKKACiiigAooooAKKKKACiiigDhvi+QPhhq5PQCL/0YtdDofiDRtVhit9P1Wyu5khVnjgnV2UYAyQDXPfGAA/C/VweQRF/6MWt/QfDmiaPDHcabpNlZzSQqryQQqjMMA4JA9aANqiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK898fE+IfEeg+C4jmK4k+36gB/wA+8Z4U+zNx+FehEgAk9BXn3w9B1/W/EHjOT5o724NpYMf+faI7QR6bmyT7igD0BVCqFAwAMAUtFFAHiHibW4/Bmq+OdFJZH1qGOfTokzueWUGNyMZ5zz+FereE9FTw74U0zSUAH2a3VXwMZfGWP4kk15d8R/7Mm+NnguO7MbAEeYADkHf8m7tjd/XNe1UAef6KP7E+MOvab0g1izi1GLPADofLcD1J4JpfER/tT4u+FdMUnbp1tcalMp6EECNPx3Zo+IA/srxN4P8AEiji21D7FOT0EU67CxPbBA/OjwwTqvxV8X6scSRWSW+mW8g6Lhd8qfg5GaAO/rj/AIm6VLqXgm6mtci909lvrZgMkPGd3HvjI/GuwproskbI4BVhgg9xQBQ0HVYtc0Cw1SHGy6gSUDOcZHI/DpWjXAfDJ20v+3PCcpO7R71vIB/54SfOnPfqa7+gCC9u4rCwuLydgkMEbSOx7KBkn9K434T2kq+DP7VuVK3Ws3U2oygj/no3y49toU/jS/Fa9li8FPptqf8AS9Xnj0+EepkbB/8AHQ1dhYWUWnadbWMC7YbeJYkHoqgAfyoAsUUUUAcV8VLGW48EzX9qP9L0qWO/gPoYzk/+O5rqtLv4tU0m0v4DmK5hSVD7MM1LdW0d5ZzW0yh4pkaN1IyCCMEVxfwouZF8Kz6NOzNPo15NYOxPUK2Vx7YIH4UAdPceI9EtL42Nzq9jDdggGCSdVcE9PlJzzmr808VvE0s8qRRqMs7sAB9Sa4PwvGj/ABX8cl0VsCyxkZx+7aspJ/8AhOfjHqGl3wZ9G8Pwqy2p+5LOcfM474ycA+n1oA9BtvEmh3iSvbaxYTLCu+Qx3CkIvqcHgcVqVgeKPCOmeKNBuNNuLeJXaMiGYJ80L44YYweDjjPPSn3/AIhh0zULHR44ZLzU7hN4ghIysY4MjEnCrnj3PTNAF+31jTbrUZtPt76CW7gUNLDG4ZkB6ZA6VYkuYIpooZJUWWUkRoTy2OTgV5V4SvYR8X/Fty9g+nCGxhMsLgZXaOT8uQQRzxXReAL19b0i78XXiky3sshhBHMVuhIVB+RJ9SaAOuvtSsdMh86/vILWLpvmkCD8zUdtrWl3sKzWuo2k0bEqGjmVgSASRwfQH8jXnPwtz4yn1Pxnq6NNcyXbwWUcp3JbwrjhB0B5wT3x7nPZ6t4Ssb/WtL1iGKKC/sZw/mquDJGQVZDjrweM+nuaANi21CyvWZbW7gnZPvCKQMR9cUt1f2dlt+1XUEG77vmyBc/TNeO+K9M1bRPiFqvi3wxGDJpsNu99Yp8ouYnD7zx1I2g/r257DVdc0nxl8PYNTsyk9tPd2YZHUEoftMQZGHr2NAHYwajZXUpit7qGVwofajgnaSRn6ZBGfY1ZrkfH9vLbeF5da05Qmo6SPtUDDjKry6H1UrnI9h6Vv6JqkOt6HZapB/qrqFZVHpkZxQA3UNf0fSZli1HVLO0kZdwSedUJHrgnpxV6GaK5gjngkSSKRQyOhyrA9CD3Fc58Qo0b4feIGZFLCwlwSOR8pqv4Z0Sw1TwV4elu4nd102BQVlZeNg9CKAOuoqvZWNvp9sLe2UrECSAWLdfc81YoAK474q/8kw1//r3H/oS11V5e2un2r3N7cxW1umN0szhFXJwMk8da8/8AiX4p8P3vw41u2tdb06eeSDCRx3KMzHcOgB5oA7bQP+Re07/r2j/9BFWri8tbQxi5uIoTK4SPzHC7mPQDPU+1VdA/5F7Tv+vaP/0EV558UrK3Txb4HvFjxcPq8aM+TyuV4+nH8/WgD1SiiigAooooAKKKKACiqt9qdhpcSy395b2sbNtDTSBAT6ZNS29zBd26XFtNHNDINySRsGVh6gjrQBLRTJporeF5ppFjiQbmdzgKPUmqWm69pGsFxpmqWd6Y/vi3nWTb9cGgDl/i/wD8kw1f/tl/6MWuxs/+PG3/AOua/wAq474v/wDJMNX/AO2X/oxa7Gz/AOPG3/65r/KgCeiiigAooooAKKKKACiiigArib7XtduPiW/hjTbiytrdNKW+Ms9s0rFjKU28OvHQ121efQ/8nA3P/YtL/wClFAGx4l8XHQ7zTdGtLcX2uaidsEAbYoA+9I55KqOT36Uty3jGwsJbwPpeoSxoXNnHE8JY46LIWbn6rz7da41Wx+0xILvdzpIFpnp2zj/x/wDWvWqAM7QdQk1Xw9p2ozKqSXNtHK6rwAzKCQPxrmZPE2rx/Fq18OObX+zZrJ7lSinzMjIwSTjqM8DvVbxNqbXvxC0HwckjwWU0Ml3dCN9hmVQQsYI5xkEkdxWKNJtdE+PVilkHSBtIlcRFyyocnO3J4B9PXPrQB3qa42o+JJ9J04oUsQrX07DIUt92NefvEck9hjueMy78W3eoeKrjw14cghlurRFe9vLjPk22SMLgcs5GeMj68EVj/Bidr7wrqmpybvPvdVuJpN3XPy4H4VnfBoxnW/HQkz9v/tdvOz/d3Pt/XfQB1Wq6n4o8Px2s1wthqNrLdQwzSwxtC0CvIFLbSzbhz6jHXmsXXfiHqHg3xrY6Z4hSzfSL1MreW6OrREnA3gkjGR/XtivR5ESRCkiqyHqGGQa4zXdFsfEPjKXS9RhWW2uNGZWUjp+94I9COoNAG34l1G9sPDV3qmlPbM9vA1wBMhZZFVScAgjGfXmqV3qmsaLo0esX5trqCNQ93HbxMhjjwMuuSc7eSR3HTBHPm6a1feCtL1vwH4knLwNYTnR7+Q8TJsOIyfUdAPw9K9fmgjuvD728y7o5LUow9QV5oAivZL6/0+C60TULWJHXzBJLAZldSMjGGXFc54c8Ua5r3w7s9aSwtp72cS+aqymFUCsygjIb0HFU/g5fTX3wssxMSxgaWBSTztVjj8gcfhVr4PAH4W6QCMj99/6NegDN17xJrNt8KYvNtli1XU4oLGxKzmRppJVA3E4G1sbjz3Fd14f0eDw/4esNJtx+6tIViB/vEDkn3JyfxrjWVfFPxeihUA6b4Vg3kAcNdSj5R6EKgz7GvRKACmuSqMQMkAkD1p1eZ/GrxLqWg+FobfSZZILq7kJNwmR5aIMn5uxJ2gZ65NAHnOleH9Q1rwv438XXsQXV477zIeM+UYX3uFOTkdv+A96+hdI1CPVtGstQiOY7qBJl+jAH+tYHgbw6ul/DjT9JuUJeW2LXCv1LyZZgfxYiqPwnuJF8ISaRO2bjR7yaxfPorZX9CKAL3xL0o6z8OtbtUDGVLczx7Rk74/nAH1K4/Gsr4NpJP4GbWbj/AI+dZvri/mA6Bmcrge2EH51r/ErUxpPw5126ywY2rQpt67pPkX9WFYnwZa4tPCFz4fvAoutEv5rN8fxDO8Nz2O84+lAHotFFFAHn2vf8U78VtE1n7tpq8LabcseFEg+aI/UnIr0GuT+JGiy614KvVtQRfWmLu1ZRllkjO4bfc4I/Gtbw1rcPiDwzp+rxEbbmBZGAOdrY+Yfgcj8KAOV1n/ie/GDQ9MHzW+jWsmozDt5jfJGD7jk16BXAfDcHVtQ8S+Kn5GpXxht29YIfkUj6nP5V39ABRRRQAV5/p2dE+M+q2pBEOt2Md2jHgeZEdjKPU4Oa9Arz/wCJIOl33hrxSo40zUBHOx+6sE3yOT9OKAH+Ff8Akq/jr6WX/otqwWJ+H3xg1DVdSLpoXiGNVW7I+SGcY+Vz2HBwT6+xI6Kx0vXNJ8feINWh01Lux1X7MI3W5VCgRCCSD9f0rtpYYp4jHNGkkbdVdQQfwNAGTN4p0hIgba9gvJ34ht7aRXklbsFAP6ngckkAE1wNxqP/AAjfx0kv9ekW3sdU0xIbSeRj5cbqV3R7jwOQx/EetelWWkabppY2On2tqW5YwxKmfyFS3djaahD5N5aw3EWc7JkDjP0NAHksV3Zaz8T/ABnb2V5FI17o6QwMjA+Y2wg7T3x7V03wmK3Xwq0yA5UrHJA4PUEOwNdrDZWtu7PDbQxuwALIgBIAwP0rG0rQ5NA1e8NiFbTL+UzvFkAwSkfMV9VbHTsfUHgA4P4aahF4El1Lwb4iuBZzRXTz2U1xhI7iFsYKMTjORnGe/scejDxBZXF5FaadLHezM3z+Q4ZYk7s5HT2HUn8SLt5p9nqEXlXtpBcx/wB2aMOPyNOtLG0sIRDaW0NvEOiRIFH5CgDm9Iu7aT4ieI7dZ42lFtaZQMCf+Wmf5j864HxR4Y1HwV4igm0GMnw3rOo2v221AylrMJ42DqP4QcY9O392vYY7Czim86O0gSX++sYDfnUzoki7XUMvXBGaAOf8dyxw/D7X3kcKv9nzLk+pQgD8yK5fRJ9b8NfCTSJ7YWUbWtgksiXe7MhIyIxgjDHIHOeTjFdZ4g0efxF5emTqqaTvWS5yctcbTkRgdlyASe+Md6PEFlLqNnLpR0eG8s5oCoeSRQqP0GVPOB1yMn2oAqeOJHm+GOtyyR+W76bIzJnO0lOmaueCf+RF0D/sHwf+gCsfX9J1r/hCH8M6fZfbjJp32U3clwqYbbtyQeT610Phqwm0vwvpVhcgCe2tIopApyNyqAcH8KANSiiigCtf6fZ6pZvaX9rDc2z43RTIGU4ORkGvO/iT4M8M6f8ADvWrqz0HToLiKAFJY7dVZTuHQgV6bXHfFX/kmGv/APXuP/QloA6DQP8AkXtO/wCvaP8A9BFcB8Vpol8ReBlaRQw1hGIJ5xkc13+gf8i9p3/XtH/6CKszWFncSeZNaQSP/eeME/rQBYBBGR0opFVUUKqhVAwABgCloAKKKKACiiigDzjQJm8QfGHxJcXRDxaLBFaWsTDIQyDczj0JxjPpineBro2HxC8ZeG0OLOCWK8t4uojMigyAeg3EHFJpkQ8J/FXXpb944LDXIY54LmVwq+ZGNrR5PfBLfQcdDTPBqofE3jPxtOSmmXDrHbyspO+KFMPIuOqEjgjOcUAdtrWh2uv28NrfgyWiSiSW3P3ZsA4VvVckHHcgV59qnhe00n4veFpfDVpFYSSQztqCWybYzCoABZRwMk4B9celdPqfxH8Oad4Qh8Si8Etnc5FqNpVpmBIwARkYIOTjisDw54/8HSamHXWF1DxBqkiRMIreUAc4WNNygKi5PXGeSeTQBp/GAhfhfq5JwAIif+/i1PZ/EzwV9mt4/wDhJLDfsVceZ3xUPxf5+GGr/wDbL/0YtdTZWFmLO3YWkGfLU58sen0oAvKwZQykEEZBHeloooAKKKKACiiigAooooAK8+hOP2gbn/sWl/8ASivQaytR8MaDq92LrUtHsbu4CBBLPArsFBJAyR0yT+dAGV4t8FReI7qx1O0vX03WtPbda3saBsA9VZT95fbPc1Ja2njG4gFvqN/pUA6PcWUTmRh/sh+FPv8AN9K6VEWNFRFCqowABwBS0AcP4o8AyahdaTqugXq6drGlArBLIpdJEPVH7nvzz1PrUVt4M8QT+OrLxRqesWJlgtTbvBbWrBSCTkDc2R16n8hXe0UAcL4GsG8L61rvh2fKxzXbahYsTxJE+Nyj3Vhg/wC8DUmqeCL2DxRL4n8LajFp+o3CBLu3uIi9vdAdCwBBU8dR/U57Ce0guWiaaJXaJ98bEco3qD24JH0JqagDn4tO1zUSi63c2SWykFrayViJSOfmduduf4QPqSMinHRtQPi5dZF7bCBbU232fyDuxv3Z3buvbpW9RQBzXjfwXp/jfQn0+8xHMp329wFy0T+vuPUd6s+I9QOieFbh0+e68nybeNRkySkbUUDuScVuVA9nbyXcd08SvNGMIzc7PXHofcUAYPgvw7/wingey0lypmiiLTMOhkbLN+px+Fcp4E12Dw18CrfWLjBS1incKTje3muFUe5OB+Nehanoul6zGkep6fbXiRnKLcRBwp9RmuB1mxs9b8aaR4J021hg0XScalqMMKBY85zFFgccsdxBHI5oA3vhxoVxovhKKTUMnVNRka/vmYYJlk5II7YGBj1BrrqKKACvFNa8SXvjvXIfDyCL+yLvWlhiABDSwW43TEn0LbcYx0r0vxh4nTwtpEVyLU3l1cXCW1taq+0yuxxjOD2yenauW8O2Nre/FfU5bS1it7HQrNLOCGNAEWWU75GUDgHscdc0AekABVAAwAMCuA0P/iS/F/X9NI2w6taRahEO29fkcD3PBr0CvP8Ax6P7J8WeEfEY4SK9NjcN28uYYyT6AgfnQAvxN/4mEvhjw8oD/wBpavEZov78EWXf8BhaSy/4knxr1O3IIh1/TorpGbgGWE7Cq+vykMaW6/4m3xvsITkxaLpUlwCOnmytswf+AjNHxOU6X/YHiyMYOjX6+e3pby/u5OO/VaAO/opFYOoZTkEZBpaAEIDAgjIPBrxeTW38B6T4z8MKSssTefpCZwWS4O0BO52ua9prxT4uXOm2/wARPC95PZPcHTgLq/ZDwlv5ihSR3w2T/ngA9S8J6Kvh7wppmlKBm2t1VyB1fGWP4kmtmmxuksayRsGRgGVgcgg96dQAUUVXvb+z023NxfXcFrACB5k8gRcntk8UAWKxvFmiJ4i8KalpTBc3EDKhbOFfqp49CAav2OpWGqQtNp97bXcSttL28qyKD6ZBPPIpl1rGl2NxHbXepWdvPLxHFNOqM/bgE5NAGJ8PNbfXvA2m3cxb7SkfkXG7GfMQ7Wz9SM/jXUV514elj8M/FHWdAaRRa6yv9p2YB6SdJV+pxu+grvb2/s9NtzcX11BbQggeZNIEXJ6DJoAsUUZGM9qjguIbqBZ7eaOWFxlZI2DKw9iOtAElFUo9Z0uW/awj1Kze8X71us6mQfVc5qwtzA4ys0bDJGQwPIOD+tAEtFGcDPaoZby2hjMktxEiAgbmcAZJwP1IFAE1FFRXFzBaW73FzNHDDGMvJIwVVHqSeBQBLRVKw1jS9VMg07UrO88vG/7POsm3PTO0nHQ1doAKKKKACiiigArjvir/AMkw1/8A69x/6EtdjXHfFX/kmGv/APXuP/QloA6DQP8AkXtO/wCvaP8A9BFaNZ2gf8i9p3/XtH/6CK0aACiiigAooooAKKKKAGSRRyjEiKw9GGadtXZt2jbjGMcUtFAEX2eDy1j8mPYv3V2jA+lC28CMGWGMEdCFFS0UAcP8X/8AkmGr/wDbL/0YtdjZ/wDHjb/9c1/lXHfF/wD5Jhq//bL/ANGLXY2f/Hjb/wDXNf5UAT0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAZ2u6xbaBod5qt22IbWIyN746Ae5OBXN/DTR7m10OfW9TX/iba3Kby4z1RT/q0+gXt2zWf4rJ8Y+N9P8IxHdp9kVv9VI6EA/u4j9TyR6V6KAAAAMAUAFHQZorntS1bTNV1O68ILdzrfT2btK1t1gQ8ZLdFY54oAzRqXhrxQ0viFopJY/Ds0wiuJDiIsF+d1GcMBjAJHXpUXwps5Y/B/wDalypW61i5l1CUH/bb5ce20LWd46sbfw/8PLHwjoy+U2ozxadAO+GOXY/gDk+9ehWVpFYWFvaQLtigjWNF9ABgUAT1ynxJ0ltY+H+rW8QJnjh+0Q7fvB4zvGPf5cfjXV1zvjvXF8O+CtV1E4MiQFIlIzukb5VGO/JFAHJ/CG7l8Rtr/i+ePy31O4ihVMdFhjC5HsSx/Lqa7rxLo8fiDwzqWkyBSLu3eMFhkKxHyn8Dg/hXnv7P+rrf/D1rAlRLp9y8ZUddrfOCfxLD8K9WoA5P4a6w+s+AtMmnLfaoI/s1wHOW8yM7Dn3OM/jXWV594Y/4p74meI/D7fLb6jt1a0B7lvllH/fQHFeg0AISACTwBXmnhHTbfxlceLddvk8y01WVrC39DbxjbuHcZOT9RW/8R9al0bwdcraEnUL5lsrNVOGMsnyjB7EDJ/Ctjw1osXh7w3p+kwgbbaFUJAxub+JvqTk/jQBzPw11G5t7S88Jao5OpaG/kqzf8trc/wCrcfhx+Aru689+IEEvh7VtN8dWMbMbE/Z9SjQcy2jHk47lT8w/+tXfW88V1bxXEEiyQyoHR1OQykZBFAElef8AxhGfCFmD0OqWv/odegV5/wDGD/kULP8A7Ctr/wCh0AS/E7xNL4O8FGXTFWO/vJUtrdgowjN1bHsAfxxWx4b8I6Zouipbtbx3NzNGDeXMybnuXP3mcnJOSTwTxmuf+L/hu88ReCFfTozLeafMl2kSjJkCg5A98HP4V0Phrxjo/iHRILyG9gjk2DzoJJArwuB8ysDgjBoA4nxb4Fj8OWF/4j0FY7ebTrlNTt03YC7VxLGPRSoBx68Vk/ErxRaeKfhxY6nFod2sU9zD9mvZFiZUO8bhkMWXOCOQM4rqfibdy698M9eTSY5J4oljPmx8iVVcF9vqAByenUdq8j8T63aaZ4YfT9NmSbQNZlhvrRI2BNlMrqZYmHYdx/8AroA9p8T6lJqXjLRPB0JYQXETX2pbe8CcKh/2WfAYdxx0NZfxA1W4vvFvh7wFYzvaw6jma+eL5WMC5PlqQcjdsYH8PcUyOaJvj5ZXyTI9rf8Ah9ktpVOVlZZckKehIAzUHxHs59C8f+G/HawyTWNmDa32xSxiRtwD8dvnP5D1oA74+FdCOkf2V/ZVoLIDAiEQAHuPfvnrmuI8U+BbSL4XJocgjMsFxHFa3RXc8QedQGzxztbmu8j8R6LNYC+j1Wza2K7hIJlxj86xfFepRTeEY7qYG1SS9tSonIU7ftCYJHbIGcHkd6AMX4e+Kr6O8m8FeKm267YjEMrfdvIR0ZT3OPxx75xqeDdPs11DxdGLaLY+rOrDaMEGGMkH2yT+dN+IPgv/AISiwg1DS5Rba9p582xulOORzsPqD+n55ofCLUr7V9L1281O2+zXz6oy3EWCNrrFGp4PTkUAXvB+rSW3ifXvB9xI7/2ayT2buSSbeQAhc99hO3Ppj0rtWVXUqwBU9Qa8wtvtEnx38QXllEZjZaLHC8edqtKzBlBPbgfzrr9E1fVZtdv9I1e2tUmt4YriOa1Ziro5cYIbkEFD9cigDD8MIkfxa8aKihVENlwBgf6s13tcH4c/5K541/642X/os13lABRRRQAUUUUAFeVfE3x/4VuvBWvaNBrMD6gYzEIArZLhhkZxjse9eq1wvxT06xX4b6/cCzgE3kbvMEY3Z3DnNAHU6B/yL2nf9e0f/oIrRrO0D/kXtO/69o//AEEVo0AFFFFABRRRQAUUUUAFFFFABRRRQBw3xgIX4X6wT0AiP/kRaveEvHWh+J2Fjpks7zwwB3Elu6DAwOpGOpql8X/+SYav/wBsv/Ri12FkqrZW5Cgfu16D2oAsUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVk+JtftvDPh281a6OUt4yVXu7HhVHuTgVqswVSzEADkk15rbl/iV4wS8KH/hF9FmJgO75b25B+/6FFwce/rkgAG18O9AudK0SXUdUGdZ1aQ3d4xHKk/dT6KOMfWuxo4FcXbeL9U13xKLHQNJLaXazFL7UbwNGhwcMkQ6swOeenFAGld+MdOg8V2vhuBZbvUZgWmW3XcLZMZ3SH+Htx15HqMzeHPCmn+GVvGtTLNc3kzTXFzO26SRieMn0HQCrOleHtK0We9n0+zSGa9mM9xJyWkc+pPOOvHQZqbV9UttF0i71O8fZb20TSOfYDoPc9KAOLuD/wAJF8ZLeAfNa+HbMyv3H2ibgA/RBmvQa4n4Z6Zcw6Fca3qCFdQ1u4a+lU9UVvuJ+C4/Ou2oAK858Vt/wlXxA0nwzH89lpo/tPUP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che_170	MCQ	It is known that the ionization constants of H_2R, K_{a1} = 2×10^{-8}, and K_{a2} = 3×10^{-17}. At room temperature, when the poorly soluble substance BaR just no longer dissolves in different concentrations of hydrochloric acid (sufficient amount), the relationship between lgc(Ba^{2+}) and pH in the mixture was measured as <image_1>shown in the figure. The following statement is incorrect:	['A. K_{sp}(BaR) is approximately 6×10^{-22}', 'B. M point: c(Cl^-) > c(H^+) > c(R^{2-})', 'C. Point N: c(HR^-) is approximately 2×10^{-7} mol·L^{-1}', 'D. Any point on the straight line satisfies: c(H^+) + 2c(Ba^{2+}) = c(Cl^-) + c(OH^-) + 2c(R^{2-})']	AD	che	化学反应原理	['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']	['che_170.jpg']
che_171	MCQ	At room temperature, CaCO3 (s) or ZnCO3 (s) suspension is placed in CO2 gas phase with fixed partial pressure. The pM ~ pH relationship in the system is shown in the figure <image_1>. It is known that pM=-lgc(M), M is the concentration of H2CO3, HCO3 ^-, CO3 ^{2-}, Ca^{2+}, Zn^{2+} in the solution, K_{sp}(CaCO3)>K_{sp}(ZnCO3). The following statement is true	['A. L_1 represents Pc(CO_3^{2-})-pH curve', 'B. Point b can be reached by adding ZnCO_3 solid to the ZnCO_3 suspension corresponding to point a', 'C. \\frac{c^2(HCO_3^-)}{c(H_2CO_3)c(CO_3^{2-})} = 1\\times10^{3.9}', 'D. CaCO_3(s) + Zn^{2+}(aq) \\rightleftharpoons ZnCO_3(s) + Ca^{2+}(aq) K = 1.0×10^{2.2}']	CD	che	化学反应原理	['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']	['che_171.jpg']
che_172	MCQ	The mutual conversion of binary weak acids that are isomers of each other under the action of catalysts can be expressed as H_2A \rightleftharpoons H_2B K = 10(conversion is not considered without catalyst). At room temperature, in the presence of a catalyst, adjusting the pH of 0.1 mol·L^{-1} H_2A solution (the catalyst itself has no influence on the pH), and the equilibrium distribution coefficients δ of H_2B, HB^-, and B^{2-} change as shown in the figure<image_1>. For example, the distribution coefficient of H_2B is δ(H_2B) = \frac{c(H_2B)}{c(H_2A) + c(H_2B) + c(HA^-)+ c (HB ^-) + c(A^{2-}) + c(B^{2-})}. The following statement is true	['A. In the absence of catalyst, NaHB solution appears basic', 'B. In the presence of catalyst and pH=3.6, c(HA^-)> c(HB^-) > c(B^{2-}) = c(H_2B)', 'C. pK_{a1}(H_2B) ≈ 3.0，pK_{a1}(H_2A) < 3.0', 'D. After adding catalyst to Na_2A solution, the basicity of the solution becomes stronger']	BC	che	化学反应原理	['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']	['che_172.jpg']
che_173	MCQ	Glycine (NH_2CH_2COO^-) can undergo the following reactions in aqueous solution:\n\n\\[ \\text{NH}_2\\text{CH}_2\\text{COO}^- \\rightleftharpoons \\text{NH}_3^+\\text{CH}_2\\text{COO}^- \\rightleftharpoons \\text{NH}_3\\text{CH}_2\\text{COOH} \\]\n\nAt room temperature, HCl gas is bubbled into or NaOH solid is added to a 0.1 mol\L^{-1} glycine solution. The HCl or NaOH equivalent \\[ \\left( \\frac{n(\\text{HCl or NaOH})}{n(\\text{glycine})} \\right) \\] and the distribution coefficient \delta(X) \\[ \\left[ \\frac{n(X)}{n_{\\text{total}}(\\text{nitrogen-containing species})} \\times 100\\% \\right] \\] of the three nitrogen-containing species in the solution as a function of pH are shown in Figure <image_1>. It is known that the pH at which the total positive and negative charges of an amino acid are equal is called the isoelectric point (pI) of the amino acid, and the pI of glycine is 6. Which of the following statements is incorrect?( )	['A. m=11.6', 'B. Point a: $c(\\text{NH}_3^+\\text{CH}_2\\text{COO}^-) < c(\\text{NH}_2\\text{CH}_2\\text{COO}^-) + c(\\text{Cl}^-)$', 'C. Point b NaOH equivalent < 0.5', 'D. Point c: $c(\\text{NH}_2\\text{CH}_2\\text{COO}^-) > c(\\text{OH}^-) > c(\\text{NH}_3\\text{CH}_2\\text{COOH}) > c(\\text{H}^+)$']	CD	che	化学反应原理	['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che_174	MCQ_OnlyTxt	The following equilibria exist in aqueous solution:\n\n\\[ \\text{Fe}^{3+} + \\text{H}_2\\text{O} \\rightleftharpoons [\\text{Fe(OH)}]^{2+} + \\text{H}^+ \\quad K_1 = 10^{-3.1} \\]\n\n\\[ [\\text{Fe(OH)}]^{2+} + \\text{H}_2\\text{O} \\rightleftharpoons [\\text{Fe(OH)}_2]^+ + \\text{H}^+ \\quad K_2 = 10^{-3.3} \\]\n\n\\[ [\\text{Fe(OH)}_2]^+ + \\text{H}_2\\text{O} \\rightleftharpoons \\text{Fe(OH)}_3 + \\text{H}^+ \\quad K_3 \\]\n\n\\[ 2\\text{Fe}^{3+} + 2\\text{H}_2\\text{O} \\rightleftharpoons [\\text{Fe(OH)}]^{4+} + 2\\text{H}^+ \\quad K_4 = 10^{-2.9} \\]\n\n\\[ K_{sp}[\\text{Fe(OH)}_3] = 10^{-38.6} \\]\n\nWhich of the following statements is incorrect?	['A. Reaction $[\\text{Fe(OH)}_2]^+ + \\text{H}_2\\text{O} \\rightleftharpoons \\text{Fe(OH)}_3 + \\text{H}^+$Equilibrium constant $K_3 = 10^{3.2}$', 'B. When pH = 3.1,$c(\\text{Fe}^{3+}) = c\\left\\{[\\text{Fe(OH)}]^{2+}\\right\\}$', 'C. When $c(\\text{Fe}^{3+}) = c\\left\\{[\\text{Fe(OH)}_2]^{2+}\\right\\}$,$c\\left\\{[\\text{Fe(OH)}_2]^+\\right\\} < 10^{-5}$', 'D. As pH increases, the value of $\\frac{c\\left\\{[\\text{Fe(OH)}_2]^+\\right\\}}{c\\left\\{[\\text{Fe(OH)}]_2^{4+}\\right\\}}$decreases']	AD	che	化学反应原理	['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che_175	MCQ	At room temperature, when Hg(NO_3)_2 is used to measure c(Cl^-) in NaCl solution, the relationship between the distribution coefficient of Hg-containing particles and lgc(Cl^-) is shown in the figure<image_1>. The complex of Hg^{2+} and Cl^-has the following balance: The <image_2>following statement is correct:	['A. When lgc(Cl^-) =+1, it mainly exists in the form of Hg^{2+}', 'B. When lgc(Cl^-) <-3, Hg^{2+} hardly reacts with Cl^-', 'C. At point Q: Equilibrium constant K = 10 for the reaction HgCl + Cl^- \\rightleftharpoons HgCl_4^{2-}', 'D. The equilibrium constant of the reaction HgCl^+ + Cl^- \\rightleftharpoons HgCl_2 is greater than that of the reaction HgCl_2 + Cl^- \\rightleftharpoons HgCl']	CD	che	化学反应原理	['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'che_175_2.jpg']
che_176	MCQ	At room temperature, the pH of barium oxalate (represented by BaR^2+) was adjusted with hydrochloric acid, and the relationship between-lgc(X)[X is R^{2-},\frac{c^2(H^+)}{c(H_2R)} or\frac{c^2(HR^-)}{c(H_2R)}] in the solution and-lgc(Ba^{2+}) was measured as <image_1>shown in the figure. The following statement is incorrect	['A. Curve L_2 represents the curve of-lgc(Ba^{2+}) and-lgc\\left[\\frac{c^2(H^+)}{c(H_2R)}\\right]', 'B. K_{sp}(BaR) = 10^{-6.8}', 'C. Point a In solution: c(Ba^{2+}) = c(Cl^-) + c(OH^-) + c(R^{2-})', 'D. Point b In solution: \\lg c(R^{2-}) = \\frac{\\lg K_{a1}(H_2R) + \\lg K_{a2}(H_2R)}{2}']	AC	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAE0APwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoorI1vQF1toC2p6lZeVu/48rkxb84+9jrjHH1NAGbLPcR/FG1g+1TfZZNImkMBb5A6yxANj1wSM1PP420a3SKZ3na2muDaxTxQPIskwJUooUEk5U9sHHWqT2dxbfEDT5vIupbKDSJbVrp/mBcvGRub1IQkmuLsHW2tLOC+0TXP7HstTk1C2aG3WVFxIzK3mK5JTkt93PPU9wD1W61eys51glm/fFDJ5aqWZVH8RAHA9zxWNb6+mveJk0/T7jNlBaR3s0sZ5k8z/VqD2GAWP4epqhoS3dprniJNR0y5nuL673QzeXuilttoCLu6KF+bIODyeuaTRNO/sj4o68SmyLULK2ltwBhQIwY2Vfp8vH+0KAIPEWr6j4M8U2urX9/cT+GLoeRMhQH7HKfut8q5KnGOTwT9BXT6JDqDCa+v55R9pYPFaMQRbpjgEgZLHqeSATgZxk5N1Y/8JlcXtjq1hcw6TEhjjilUr9oZgQZPov8ACDznnHAqD4fz65a2M2ia3Z3Q+wSNFaX0iAC5gBwhOOjYA69frmgDS8WalJ4ds015ZHNtBJGl3DnIaJmClgOzKWzx1AIOeMdCrBlDA5BGRXKfElXuPAt/Ywp5lzfbLWGMdWd3AGP1P4V1EEZit44zyUQL+QoA5q18WR3HxJv/AAwsiN9nsI7jA6q5Y7h/3y0Z/GupryPSfBOoWvxvvtdfUkeUxC4khCkKYpDJGF3eqiNT05PHvXrlABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUANkjSaJ4pFDI4Ksp7g1ztj4I0zTyiRXOpNaINqWcl47Qqv93aTyPY8V0lFABVe4sre6khllTMsDb4pBwynvg+h6Ed6sUUARS3MEBAlmjjJ6B3AzUucjIry3xdZXFl4in1zxP4e07VtADpHHPG5M1lH03MhADDccnHIz3xXp0i77d1Vtm5SAw7cdaAK5jsrjUElaRJLiAHYm/OwngnHrjjPpn1ObleQeHtReXVdC8M6j5VpdafdPLDqS52akEDKRG3djuO/J7Hrnj18nAyaAOatv8AkpGo/wDYLtv/AEbNXS144fjB4XtPijeK73Bt5IIrH7SqDy1kSSQknnO35xzjse3NexgggEdDQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAc5caXrmqw3mnarPYHTp3Zd0CMJHgP8BByASOCwP0A61pTW2oT6jLG00A0qS1MexVImEpPXdnG3b7ZzWjRQBx9t4QuDpmh6XePbPDo88csNzGCJH8vO0bcfKTxnk559eOvIBBB6GlooA+cdR+BT3PjzUbPT9UjS3SFb1FljJPzs4CZB9UPPoele8eHtVh1XS1aOI280B8i4tnPzQSL1U/oQe4IPeqFt/yUjUf+wXbf+jZqTXbO40nUB4k0yIyMqhNQtkHNxEP4gO8ic49RkemADpqxvFeryaB4W1LVojHvtIGlVZASHIGQvBHU8fjWlZ3dvf2cN3ayrLbzIHjdTwykZBrifiRfWU7aH4dubiFI9Qv42uVlcKvkRnzH3HtnaB75oA63RJdQuNItrjU1hS6ljV3jhUhYyQDtySc49eK0KyrTXtP1G/ksdOuobmSKLzJGicMseThQSO5549qj8Lapc6voa3d4IhP580TeUpVTskZAQCT2X1oA2aKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoqG7u4bG0lubh9kUalmPXiszwtr/APwkuhpqf2R7XdLLH5Ttll2OV59+Onb3oA2aKwrrXp/7auNK061hnuLaBJ5/On8oBWLBQuFYk/KfQdOavaJq0OuaNa6nbo6RXCb1VxyPY0AZNt/yUjUf+wXbf+jZq6Wuatv+Skaj/wBgu2/9GzV0tAHJD/ij9ZCgEaDqEvB7Wdwx6eyOT9A3sRjppLK1nffLbQyMf4mjBNF5Z2+oWc1pdRLLBMhSRGGQwNYGg3c+lX3/AAjepzPLIil7C6kOTcwjsx7yLwD6jB7nAB0MVtDbhvs8EUZPXYoXP1xWZ4Z0u50fSDaXTRM/nzS5jJIw8jPjkDpuxWxRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHM+IP7YfV7T7NpH2+wgHm7RcLHumB+XcG6heo98HtWT8M7+WPwhM+oQJZQpe3G2R5lIYtM+R7YPHvXeVQk0TS5tObTpNPt2snfzGgMY2Ft2/OPXdz9aAOF8V6JL4o8WXaaVcnTNV0uyQi6UspuRIWIibBGY/kOe+TxjHPW+D786n4T066NklkTHsNvGPljKkrhfbjj2rRudLsbyZJri2jeVEKK+MMFOMrn0OBkdDirEUUcEKQwxrHEihURBgKB0AHYUAcVevrqfEi9/saDT5f+JXb+Z9rldMfvJsY2qa6+wa9ayiOopAl3g+Ytu5ZBzxgkA9Mdqw7b/kpGo/9gu2/wDRs1dLQAVl67oy6zYCNZjb3ULiW1uVGWhlHRgO47EdCCQetalFAGN4e1l9Ut5YLyNYNUtG8q7gB+63Zl9VYcg/1BrZrnvEOm3MdxFr2kx7tStV2vCOPtUOctGffqVPY+xNa2l6lbavp0N9aPvhlXIPcHuCOxByCPUUAW6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOatv+Skaj/wBgu2/9GzV0tc1bf8lI1H/sF23/AKNmrpaACiiigArk79W8JavJq0S/8Sa8fN/GOlvIeBOB/dPAb8G7GuspksUc8TxSorxupVlYZBB6g0AOVgyhlOQRkEUtcrpMz+GtVj8PXTs1jMCdMnc5wByYGPqByvqoP9011VABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBkeILWe4s9y61LpNvGC8s8WwN7cuCAvc8enNVPA13qN94Rs7nVLmO6uH34uE2jzU3HYxC8AlcHFW9Y1K2t54bC80y8ure6Vt0kVqZolx2cDJGe3GOOtYXh2yl8G+GL+VdNu5Ypb957fT7dQ8kMbuAFAzjA5YjPAJ9KAGa54lXTPGL6dqt5cWFlNZbrGSMYWabJ3ruwSXAC7V75PBOK6Tw7LqU3h2wk1dAmoNCDOuAPm9wOh9feub17R4tW16/g8Q2E93pM1mi2RijaQRSZbfwuSr/cIbHQdRznc8I22o2fhTT7bVZJJLyOPa7SkF8ZO3cRnLbcZ96AKMc8cPxKvVkbaZdMt1T3PmTV0IvrctMoZiYRl/kbj9OfwrCtv+Sk6j/wBgu2/9GzV0tV7pNpdyn/alr9lS53SeU7bVPlPnP0xkVL9ri+1/ZsSeZt3f6ttuP97GKnoovHsJKfV/h/wSmupW7W0lwFn2RttYeS+7PsMZPXtT2vo18j93OfPxtxCxx/vcfL174qzRRePYLT7/AIf8EwPE0mlXOiajHqjS29vax+c1yY2XyivKujYwWBwRjPNcj8Pfi7pPiu5i0S4kkTVVUhZHQKlztz8y88EgZKnpzjOK7jxJocPiTw5f6NPI0cd3EYy69VPUH8wK8V8J/BLXfDfiKXVhqNs9zp2JLNFRtk7HPDEgYGMjjOCfalvsNO257/RWdomrwa3pqXcKtG2Sk0MnDwyDhkYdiDWjSKCiiigAooooAKKaHQuUDDeBkrnkCnUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBzVt/yUjUf+wXbf+jZq6Wuatv+Skaj/wBgu2/9GzV0tABRRRQAUUUUAFVYQwv7km5DqQmIR1j68/j/AEq1VWLYNSuQIGVtiFpT0f72APp/WqjsyJbx9f0Zga1BJ4e1JvElkjNbOAup26D7yDgTKP7yjr6r9BXSwTxXMEc8EiyRSKGR1OQwPQipCARg9K5K1z4Q1hbCRsaFfSf6I54FpMx5iPojHlfQkr/dqSzraKKKA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che_177	MCQ	Na_{2}SO_{3} solution was dropped drop by drop into chlorine water with a certain concentration at room temperature. No gas escaped, and the pH of the solution changed as <image_1>shown in the figure. The following relationship is wrong:	['A. Point a: c(H^{+})>c(Cl^{-})>c(ClO^{-})', 'B. Point b: c(Cl^{-})=2c(SO_{4}^{2-})=0.01mol·L^{-1}', 'C. Point c: c(Na^{+})=2c(HSO_{3}^{-})+2c(S_{3}^{2-})+2c(SO_{4}^{2-})', 'D. Point d: c(Na^{+})=c(Cl^{-})+2c (SO_{3}^{2-})+c(HSO_{3}^{-})+2c (SO_{4}^{2-})+c(OH^{-})']	C	che	化学反应原理	['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che_178	MCQ	"At room temperature, the relationship between the quantity fraction of each sulfur-containing particulate matter in H_2S aqueous solution and pH is as follows <image_1>(for example, δ(H_2S)=\frac{c(H_2S)}{c(H_2S)+c(HS^-)+c(S^{2-})}. It is known that K_{sp}(FeS)=6.3×10^{-18}, K_{sp}[Fe(OH)_2]=4.9×10^{-17}.

The following statement is correct ()"	['A. Solubility: FeS is greater than Fe(OH)_2', 'B. Using phenolphthalein as indicator (pH range of color change is 8.2 - 10.0), the concentration of H_2S in aqueous solution can be titrated with NaOH standard solution', 'C. Neglecting the second hydrolysis step of S^{2-}, the hydrolysis rate of S^{2-} in 0.1 mol/L Na_2S solution is about 62%', 'D. 0.010mol/L FeCl_2 solution was added with an equal volume of 0.20mol/L Na_2S solution, and the precipitate formed at the beginning of the reaction was FeS']	C	che	化学反应原理	['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che_179	MCQ	During the wastewater treatment process, H_2S saturation is always maintained, that is, c(H_2S)=0.1mol/L. Ni^{2+} and Cd^{2+} are separated by adjusting the pH to form sulfides. The relationship between pH and-lgc in the system is shown in the figure below<image_1>. c is the concentration of HS^-, S^{2-}, Ni^{2+} and Cd^{2+}, in mol/L. It is known that K_{sp}(NiS)&gt;K_{sp}(CdS), the following statement is incorrect ()	['A. ③ is the relationship curve between pH and-lgc(S^{2-})', 'B. K_a(H_2S)=10^{-7.1}', 'C. c(H^+)>c(HS^-)> c(S^{2-})>c(OH^-) in 0.1mol/L H_2S solution', 'D. At this temperature, K=10^{-7.6} for the reaction NiS(s)+Cd^{2 +}(aq)']	C	che	化学反应原理	['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']	['che_179.jpg']
che_180	MCQ	At a certain temperature, the relationship between the distribution fractions δ of H_2SO_3, HSO_3^-, SO_3^{2-} in H_2SO_3 aqueous solution and pH is as shown in the figure<image_1>. For example, δ(SO_3^{2-})=\frac{c(SO_3^{2-})}{c(H_2SO_3)+c(HSO_3^-)+c(SO_3^{2-})}. SO_2 gas was poured into 0.5L ammonia water with a concentration of 0.10mol/L. It is known that at this temperature K_b(NH_3·H_2O)=2×10^{-5}, lg2 ≈0.3, K_w=1×10^{-14}, the following statement is correct ()	['A. When 0.05mol SO_2 is introduced, c(NH_3·H_2O)+c(OH^-)=c(HSO_3^-)+c(H_2SO_3)+c(H^+)', 'B. When\\frac{c(SO_3^{2-})}{c(HSO_3^-)}=1,\\frac{c(NH_4^+)}{c(NH_3·H_2O)}=2×10^{-4}', 'C. When pH=7.0, c(NH_4^+)<c(SO_3^{2-})+c(HSO_3^-)', 'D. The pH of the solution at point P is 8.4']	D	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEQAcsDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKK5D4gTXNvZ6LLbXc8GdYtI3WJtokVpACrdyPal8SahPP4w8P+HEd47a8E1zdNG5RmSMDagI5ALMM47DHc0AddRXlGo+LL/R4tf0C3uJDcQ6ra2NlO53tGlxtPJOSSo34J9q6O3upNB+IdpoUc00lhqGnvMiSytKyTRsoJ3MScMrcjPUZ7mgDtKKyNc1w6O1lFHp9xfXF5KYooYGRTkKXJJdlGMKe9UJfE2rwxl28GauwHZJrZj+QloA6aivP1+KKi/WxuPDGr2dy5xGl40EHmH/Z3yDd+Fbo8RawRkeD9UI/6+bX/wCO0AdHRXO/8JDrP/Qnap/4EWv/AMdo/wCEh1n/AKE7VP8AwItf/jtAHRUVzv8AwkOs/wDQnap/4EWv/wAdo/4SHWf+hO1T/wACLX/47QB0VFc7/wAJDrP/AEJ2qf8AgRa//HaP+Eh1n/oTtU/8CLX/AOO0AdFRXO/8JDrP/Qnap/4EWv8A8do/4SHWf+hO1T/wItf/AI7QB0VFc7/wkOs/9Cdqn/gRa/8Ax2j/AISHWf8AoTtU/wDAi1/+O0AdFRXO/wDCQ6z/ANCdqn/gRa//AB2j/hIdZ/6E7VP/AAItf/jtAHRUVzv/AAkOs/8AQnap/wCBFr/8do/4SHWf+hO1T/wItf8A47QB0VFc7/wkOs/9Cdqn/gRa/wDx2j/hIdZ/6E7VP/Ai1/8AjtAHRUVzv/CQ6z/0J2qf+BFr/wDHaP8AhIdZ/wChO1T/AMCLX/47QB0VFc7/AMJDrP8A0J2qf+BFr/8AHaP+Eh1n/oTtU/8AAi1/+O0AdFRXO/8ACQ6z/wBCdqn/AIEWv/x2j/hIdZ/6E7VP/Ai1/wDjtAHRUVzv/CQ6z/0J2qf+BFr/APHaP+Eh1n/oTtU/8CLX/wCO0AdFRXO/8JDrP/Qnap/4EWv/AMdo/wCEh1n/AKE7VP8AwItf/jtAHRUVzv8AwkOs/wDQnap/4EWv/wAdo/4SHWf+hO1T/wACLX/47QB0VFc7/wAJDrP/AEJ2qf8AgRa//HaP+Eh1n/oTtU/8CLX/AOO0AdFRXO/8JDrP/Qnap/4EWv8A8do/4SHWf+hO1T/wItf/AI7QB0VFc7/wkOs/9Cdqn/gRa/8Ax2j/AISHWf8AoTtU/wDAi1/+O0AdFRXO/wDCQ6z/ANCdqn/gRa//AB2j/hIdZ/6E7VP/AAItf/jtAHRUVzv/AAkOs/8AQnap/wCBFr/8do/4SHWf+hO1T/wItf8A47QB0VFc7/wkOs/9Cdqn/gRa/wDx2j/hIdZ/6E7VP/Ai1/8AjtAHRUVzv/CQ6z/0J2qf+BFr/wDHaztU8fSaJCJdT8PXlohOFMt5aLuPoMy8mgDs6K4Oy+JFzqODa+CfEbofuyeTGEb3DF8Ee9dHoPiD+23vYpNOurC4s5FjlhuChOWUMD8rEdCO9AGzRRRQAUUUUAFFFFAHK+OdP1HU7LS4tOsXumh1K3uZNsiLtSNwx+8wyfTFS69o1zPrejeIbKJpLrTvMSS23KplikUBgCTjcCFIyQOvNdLRQB5/deBLnUtP1q8lMcOr39/DfwBjkQGHb5aMR1OFOSMgbjjOMnXstHvL/wAYp4j1C2NqLayNpbWzurMGZsu5KkjnCgc565xXU0UAc54h/wCRj8Lf9fsv/pPLXR1zniH/AJGPwt/1+y/+k8tdHQBBd2Vrf2z215bxXEDjDRyoGUj3BrmX8Pan4eJn8MXBktV5bSbqQmMj/pk55jPscrz0FdbRQBk6H4htNcjkWNZILuA7bi0nXbLC3ow9PQjIPYmtasLXvDq6nLFqFlP9i1i3GILtRnI67HH8SHuPxGDTvD+vnVBNZ3sH2TVrTC3NqTnHo6H+JD2P4dRQBt0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFNeRIwC7qoJwNxxzVI63pn9sDSPt0J1Ajd9nDZcDGckduOaAL9FZUGuw3I1DyrS/Jsc7w1q6eaeeI9wG/wC729R600a3K2jjUE0bUixfb9lMarN164LAY/GgDXorMudXktp7KMaXfyi5IDPEilYMkD5/m4xntnoafHrEMmsy6X5F2s0abzI1u4iYcdHxtJ56Z9fSgDQorP07XdK1YTmwv7e48g4l8twfLPP3vTofyq+CCMggj2oAWiiigAooooAKKKKACiiigAooooAKKKKACiiigAqhq+tafodn9p1C4WJCQqLgszseiqo5Y+wFU9f8QppPk2ltA15qt1kW1nGcFvVmP8KDux/U8VBovht4LsavrU63+tMCPNxiO3B6pCp+6OxPU9/SgCqF8S+JV3M7+H9OboqhWvJB7k5WPPpyfpWnpfhXRtIlae2ska7b791OTLM/1dst+tbNFABXNeHv+Rq8V/8AX1B/6ISulrmvD3/I1eK/+vqD/wBEJQB0tFFFABRRRQAUUUUAFFFFABRRRQBzniH/AJGPwt/1+y/+k8tdHXOeIf8AkY/C3/X7L/6Ty10dABRRRQAVgeJNDmvjDqmlusGtWWWt5Dwsq/xRSeqN+hwR0rfooAzNB1qHXdMW7iRopFYxzwSffhlXhkb3B/Pg96065DXUPhjWh4nt1b7DPti1aNRkBeiz49Vzhj/d/wB2uuVldAykMpGQQeCKAFooooAKKKKACiiigAooooAKQkAZJAqhLqsDXF1Y2UsFxqUEPmm28zBGfu7jztyaq/2KdX06zXxHHBcXMMhlaOBnWHdn5QVJ+bAx94dRnAoAtJq8MuszaZFDcNLCm6SXyWESkgELv6FiCDgZqtDaazqGkTwardRWVzK/yPppyY0443ODknnnA68etbNFAGFrFlpenaKl/f2X29dIhaaNp8SSLtGSwLdW+Uc9aZH4ngbwYfFQsJ1tTafbfLO3zDEF3Z64zt5xmpfGX/Ika9/2D5//AEW1cZHBqX/ChQ/26DyP+Eaz5f2fnb9m6bt3XHfFAHXReLLafTdGuo7aYyawFa0t8qGKlN+WOcABeTzVq111Jb3ULW7tZrJrGNJZJJyuxkbdhlYHp8hznFcjaaBY+JPh94RspL6ex1KLT4bixuoG2vG6xKCR6jDcjuKyNVufFVx4b8WeFNVEFxqsGlieC/tUx9qgJYbWXHDfK4x7nHqQDvIfE/2vSG1az0u8uLDG+N0ADzJ/fRCckEcjoSOgORU7679o0W21PRbOTV4bjBQW8kaHaQfmy7KOCMY65PSmeFru1m8F6TdRSIbb7DE24HgAIM/TFc18Hba7tPAKPdufKuLuaa1U8bYWbj8zub6NQB3DW0F5aPHc2iFLiPbNDIoYEEcq3Y9cVnzeHol0mHT9Lu7nSkgcvG1qVOM5ypDhgV5PH0xjFbFFAGdK+rprECRQWsumMmJZGkKzI/PIGCGB+UdR3pbDWbPUbq8toTIs9o+yaOWNkI5OCMjlTgkEcGtCoL2zg1CzmtLlN8EylHXJGQfcc0AT0Vjvb6lpcenW+lol1aRt5dwLu4YzbSRhg5zuI5yD17Gr1vqVld3VzbW91FJPbMFmiVgWjJGRkduKALVFFFABRRRQAUUUUAFFFFABWP4h11dDsUaOE3N9cP5NnaocNNIeg9gOpPYAmtG9vbfTrGe9u5Vit4EMkjt0VQMk1zvhqyuNTvX8U6pE0dzcJssrdxza255AI/vtwzenA7UAXPDugPpgmv8AUJRdazeYN1cY4HpGg7IvYd+p5NbtFFABRRRQAVzXh7/kavFf/X1B/wCiErpa5rw9/wAjV4r/AOvqD/0QlAHS0UUUAFFFFABRWdDrEEl5LZSI8F2m4pFLgGVQfvIejDp05GecGuP0bxRql54gitm1S3uZHcLcaaulzRNbDufMZiOP9oYPbGRQB6DWHruunS7/AEnT4/LSbUpmiSWbOxNq7ufUngAZGeeeK3K43x7b2+qPpGi6jFs0y9nYzXmcGF0XMaq38LMc8+xHU0APn8a/YdF1e7urYPPp94LJBG2FuZW2hNpPTlwD1xg9cVoWevTJ4nOgaikYuXtBdwSxZCyKG2uuD3UlfqD2rz2603U28Fz2hk+32/h3WYJ7e4jjwbqBGV3zjhmXcwJHUqe+a6ny/wC2/irYahaMJLLTdMkEk6HKmSVl2pn12qW/EetAGr4h/wCRj8Lf9fsv/pPLXR1zPifzf7b8NeRsM322TZvztz5Emc49s1uSG+8yDyhb7OPO3E599v8A9eqUb9SHO3QtUVXX7Z9tbcIPsuPlIJ359+3rTIzqHlz+aLbf/wAsdpbH/Av06UcvmHP5Mt0VTY6l9jXatr9qz8wJbZj27+lPlN758XlCDyf+Wu4nd+FHL5i9p5MmmijuIXhmRXjkUq6MMhgeoIrmPCskmkXt14VupGc2aiWwkc8y2pOAPcofkP8AwE966JPtn2x94g+y4+Qgnfn37etcz4ntNSSyTX0iiOo6QzTxLbgkyw4xJGc9cjkD1UUcvmPn8mddRWbbXd3faPa3lm1pI06iTdlthQjII7+lWZTe/ao/KEH2fA8wsTu98dqOXzF7TyZZoqun2z7XJvEP2bHyFSd+eOvb1qOM6l9ml81bXz/+We0tt/HvRy+Y+fyZcoqnKdR+zReULXz/APlpuLbfw71I5vPtabBB9lx85Ynfnnp29KOXzDn8mWKxJr241y3hbw9qNssK3JS5uChf5V+8qdiSRjPQc9SKkWXVLvUImglsTpgLFnXLtJwRt9BzyTz0xU1pb3dppnkRQWMLx/LDHCCsSr6Yxx36UcvmL2nky5Da29u8rwwxxvM2+RkUAu2MZPqcAVLVOU6j5MPlC183/lruLY/4DUjfa/tibBD9l2/OSTvzz07Y6UcvmPn8mWKKqxG+8+bzRb+Tz5W0nd7ZpqnUvsbbha/as/KAW2Y9+/rRy+YvaeTJL6xt9Ss5bS6QyQSqVkTcQGB4IOO3tVNfDulron9jC2I07Z5f2fzG27MY29fu47dKsyHUNkHli23f8ttxbHb7v69ae32z7au0Q/ZcfMSTvz7dvSjl8x8/kygfDGjm0tbX7JiK0BFtiRwYRgD5GzleBjg9PrVnT9IstMMrW0TCSXHmSySNJI+OmXYknHbnipYjfeZP5wt9n/LHYTn/AIF+nSmZ1L7H921+1bumW2Y/nmjl8xe08mUn8K6M5cG0IickvbrK6wuScnMYOw5PXI5pnifSo9Q8PXFtHp9reSrERBb3D7EzjGc4OCOxx+VaTm+/0fyxb9vP3E+2dv69aq3mm/b9Rhe6tbSa2hzsZt3mLkc+2DxxRy+Y+fyYzwrcreeEtIuEE4V7OIj7Q26T7o+8e59+9a9VIVvUWZClsqKMW4TPTtu9O3SkJ1L7EMC1+1buRltmP50cvmL2nky5RVWQ326Dyhb4/wCW24n2+7+vWlBvPtpyIPsmODk784/LrRy+Y+fyZZqld6csouJ7TyrbUZITEt4IlZ1HUZz1APOKfGb/AGT+YLfd/wAsdpbH/Av06U1jqX2Ndq2v2rd8wJbZj2756UcvmL2nkyvbal9kNhp2r3VsNVuUbaIgVSUr97bn2IOM569cZrUqldQXE09qwhtJFjYMxlBLIfVPfGaqWU+o2cyQavdWDCWRkgdMo8vVlG08Z2g5x6E0cvmPn1tZmxRVSM6h5M3mC28z/lltLY/4F/8AWpHOpfY02C1+1Z+cMW2Y56d/Sjl8xe002ZcoqtKb37RF5Qt/J48zcTu/ClX7X9sfcIfsuPkIJ35469vWjl8x8+trMsUVTjOo/ZpfMFr5+f3e0tt/HvWb4h1i70Pw/wDbWSCS53LGIlyfMdjtVU9ySOtPk8xe00vZmbq7L4k8SDR3IGkaXtudRZuFkk+9HEfYD52/4D6mulg1TT7mQRwXttK/91JVJ/Q1S8N6N/YeipbyP5t3KzT3c3/PWZzl2+meB7AV5VY6ZNrHw21XTNM0uSbU5dYuBb3CoEEBE5PmeYemAO3PbFQaHttFRWySR2sSSvvkVAGb+8ccmpaACiiigArmvD3/ACNXiv8A6+oP/RCV0tc14e/5GrxX/wBfUH/ohKAOlooooAKKKKAPP9b8Um6uLmCax0t7K0nZCs+pCG73Kcb40x8p6lfmBIIPGa6i0Op6fPHbz7r6zcgJcgASxdMCQfxf7w/EcE1TufC8f9qDU7aa3a5Rt2by2SYr3+V+HX25OPSpdH8RvqM3kNBbzMrlHmsLpJ4kP+0eGB/4D+NAG/SEBhggEehpaKAEAAGAAB6UBQowoAHtS0UAc54h/wCRj8Lf9fsv/pPLXRkgAk9BXOeIf+Rj8Lf9fsv/AKTy10dAFO11XT74zC0vbecwkrKIpQ2wjscHinWWp2GpLI1jeW9yI22uYZA+1vQ46GuH8DXU0Gp+L1i0+e4B1yU7o2jAHypx8zA1Y+FxLaVrjFChOuXhKnGR8/Q44oA7W4uYLSBp7maOGJfvPIwVR+JqG21XT7y4aC2vbeaZBuaOOUMyj1IByOtY3jbRtT1jSLc6PPDHqFndR3cCTgmOVk/gbHY5/MD61haR4sTUL6+GoaNPpPiqx06Rmt5QCssYOdyOPvqGA+m49etAHaXGsabaSvFcX9tFJGAzq8qgqD0JyeBVuOSOaJZI3V43GVZTkEHuK434Vqs3w90++lk8+6v99zdTNyZJGc5z9MBfoKrfDqSS31fxdoySb7DT9SP2Udo1cFjGPZTxigDS8Kk6Pqmp+F5MLHbN9qsOetvISdv/AAFww+hWurrlPGIOmT6Z4mjO3+zpvLu8fxW0pCv9drbH/wCAmurBBAI5BoAKKKKACsq9vHm1WPRlsrl4Z7d3nukLRpEvQAOOrknoDkAZ9KuXl5BaCJJriKGS4fyoPMP35CCQAO54Jx7VDo1nc2GlQW97eveXQBMs7jG5icnA7DJwB2GKAJ7CwtdLsILGyhSC2gQJHGg4UVYoooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAqrf6bZ6nDHFeQLMkcqzJnqrqcqwPYg1aooAztLvru7kvYrywe1e3nMasTuSZMAq6nvweR2IIrRrP1TT5b5rOSG9mtZLW4WbKcrIvIZGXuCCfocHtU2n6jaarZJeWUwmgckK4BHIJBGDyCCCPwoAtUUUUAFcnL/AMVB48SHBNhoSiV/7r3Ugwo/4AhJ+sg9K39X1ODRtHu9SuDiK2iaVh3OBnA9z0rmrS6Pgn4fz6xqse68c/a7wA4zPKwGM9gCyrnsBQB2LZ2nbjOOM1z3g7w7c+GdNubO4uornzbuW5V0QpjzGLFcEnoSeani1DV1v9PjmtbSWzulO+4gmP7ptpYDBHzA4+9kfSoLLxFLrmq6haaPHC1tp8pt57qVjgzAAlFUdcZ5JIwexoA6B3WNGd2CooyWJwAKz9M17TtYluIrKcvLbkCWN42jdc9DtYA4POD0OOKoaT4nhv5tU0/UIltdQ0wA3cO7ehQjKuhwNykewIORiqFle/2lfahqui+RNqs0EcUcVxvjjSFGJG9ghIY72OMHsOxNAHYUVXsTeNZRHUEgS7x+8WByyA+xIBP5CrFABXNeHv8AkavFf/X1B/6ISulrmvD3/I1eK/8Ar6g/9EJQB0tFFFABRRVe9nltrR5obWS6kXGIYyoZuecbiB0569qAOFuvCuoy6bqFilu5gku5Ly7zc/NqRLZWIMDlE2YU5xyAOmSYvDyWkuv2a6N4FvdBNuxFzdzwpbqUwfl+UnzcnHXp17Vb/te6XUrySyv5rSWe43Lp93pkkjvhEBIAIbGRjPK1chuNY1XX7GHV4m0mCFjNFFHLu+2uM4BI6AD5tnU9eimgDsKKKjnnitoHnnlSKKNSzu7AKoHUknpQBJRVGLWLGWxlvvOMdrECzTSo0abQM7gWABHuOKTTtYsdUMi2sreZHgvHLG0bqDnB2sAcHBwcYOOKAMvxD/yMfhb/AK/Zf/SeWuiOcHBAPbNc74h/5GPwt/1+y/8ApPLXR0Ac/wCHvDk2gzavKL5JzqN0922Ydux2AGB83I4Hv71Dofhm90Cwv7e21KN3vL2S7MrQY8syHLADdz7Z6d89K6aqOr2t7e6c8FhepZzuQPOaIyYHcABl5PrnigDBsYdX1yyRpr9IbjTtSk8m6iiytyihk+Zc8Z3EHB6qcY4xoW+gSPr6a1qVzFcXUVs1tCIYPLRUZgWJBZiSdo749uauaPZ3tjZ+TfXkNyynCeTb+SiKAAAF3N/OtCgDm9N8M3OgQy2eh38Nvp7ytKlvPbmTyCxyVjIdcLnJwQcZP0p1tokPhrw/cR2N4YHeR7m7vZYxI8jtks5AwMk47YxxiuiqpqEN9NFGLC7itpFcFmlg81WXByuNy47c57UAZehz/wDCUeCYJNQa2n+3WzJN5H3GByD1zjjqOxyKj8EXk03h1bK8kMl7pkj2Nwx6s0Zwrf8AAl2t/wACrW0rTYdJsBawEld7yMT3Z2LsfbljWFHnSPiNIhbFtrdr5irn/l4hwG/ExlP++KAOqoorP1r7Y+lT2+m3MNvqEyFLd5jwG9cd8DJ/CgCtaNFrOpS3NzpjxNpty8VpNNkF/lAd1HpklQec4JHWtmmRKyRIjOXZVALnqx9afQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFZSeZp+txWltpqLYXSyTSXEQxtnyCd4/2gTz6itWqOsWU+o6RdWtrdyWdxIhEVxGeY37H3Geo7igC9RUFpcR3MG6OeKYoTG7RnIDqcMPqCCMVPQByvinOqaxovh5MNFPN9svF/6YQkMAfrJ5Y9xn3rV8SXOnWmgXL6tEkmntshnV8bdruEyfYbsn6Vl+Hs6n4o17WnX93HKNNtWx/BF/rCPrIWH/AAAeldNLFHMmyWNZEyDtYZGQcj9QDQB5tY6ReeCPFWkWmh6rJeaBqcrxtps7+Y1sNpbzI267BjBB9R1J4ufDSJ9EbX9BvwIryHU5rhdxx50MmCsg9R1Htiu0s9J03T5ZJbLT7S2kl5keGFUL/Ugc0t9pen6oipqFha3aIcqtxCsgB9RkUAcboqfbfifr/iKMqulwWUViJycJLIpLOQe4XIBPr9K7e2ube7gWe1mjmib7rxsGU/iKjuVsrex2Ti3itlKhRJgIDkbRzx1xj8KwvBUM1tBrEE8NurpqcpMttny5twV9wB6Y3bSPVTQB09FFFABXNeHv+Rq8V/8AX1B/6ISulrmvD3/I1eK/+vqD/wBEJQB0tFFFABVLWDKNHu/JVGYxkYecwjHc7wCVwMnIFXaCARg8igDy7Tb3VZ9WdrqweSASNNHsuW3TyeSqjAkjUMyqudpKg7iwBxxp6ZLqGo3dl9sv7i402NVWKcweVItyQGXzRgZAGACAAS2CD1re1rVrKxv7PTlt0nu764QugIHloCAZWPbGAB3JwBW0sNubdYFRPKUAKo6ADpj6YFAE1cF44N3qXi7wv4eieJLS4ea7nEqllk8oKVUgEbhlskd8Cu9rM1fQ7bV2tJneSC6s5PNt7mHAeMkYIGQQQRwQRg0Aea+KvEGqX+m3mhalFAHsddsba7mt1KxyW8jq6tgk7f4QRk/WulvWeL4y6Qtt/wAtdInFyB/cWRChP/AicfU1unwrpsum39ldK9z/AGg/mXU0hAeRhgKcgADaFXGAMYFTadoMFhfy6hJPNd38sSwm4n27hGvIUBQABkknjkn6YAKPiH/kY/C3/X7L/wCk8tdHXOeIf+Rj8Lf9fsv/AKTy10dABRRRQAUUUUAFFFFABXL+Og9rpFtrcS5l0i6S7JH/ADyB2zf+Q2f8q6ioby1ivrKe0nXdDPG0bj1UjBoAlUhlDA5BGRWLCdO1nxFJcKJnudGZ7bLf6sPIiMxHqwXAz2yR3qp4LvZX8GQRzBpLrTg9lMF6tJCShP47c/jWvoxuJNKt7i9tY7a8nRZbiKMcK5AyD6kcDPtQBfooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDFtH0/S9fl0qC2lilvlk1Av1R2yqvjng8qSMd8+tWtd1SPRNAv9UlXclrA8pXON2BnH40msSajDDby6ZbxzyC4jWVH6+SWAcg5HIHP4Vk+M83aaRo4CsNQ1CJZUPeKPMr/hhAPx96AL3hPTH0jwtp1lKczrCHnPrK3zOfxYmtmiigAooooAjnghuYWhniSWJvvI6hgfwNOjijhjWOJFRFGFVRgAfSnUUAFFFFABXNeHv+Rq8V/9fUH/AKISulrmvD3/ACNXiv8A6+oP/RCUAdLRRRQAVn655Y0W5aVbxo0UOy2RYTNgg4Xb82eO1aFFAHH3cHhvUfDP2q2sIdStmuImkTy/Nkd1YLhg3zFwCRhuR0qGz0rQL2+sl0W3bRru3nE80SQNayvGAcgqQN6FioPUfjW0bCx1NotY0uRPMdgxeNiEuQp4DY64I4bqPcEg6N9YpeCJxhbiBxJDJjlT3/AjIPsaALdFFFABRRRQBzniH/kY/C3/AF+y/wDpPLXR1zPidnTXPDLxR+ZIL2Tamcbv3Enftxz+Fbsk1yskIS13q+PMbzANn+NUotkuaWn6Ms0VXWW4N40ZtsQAcS7xyfpTY57to5mez2Mn+rXzAd/+FHKxc68/uZaoqo1xeC0WQWWZicGLzRwPXNPkmuVniWO13xt99/MA2fh3o5WHtF5/cyxRUCS3Bu3ja32wgZWXeDuPpjt3/Ko457toJWez2SL9xPMB3/j2o5WHOvP7n/X+Zboqo892trHItnumJ+aLzQNo+venyS3C3MaJbbomHzSbwNv4d6OVh7Ref3P+v8jjvJu4fFOuaLZ3cdm17Na6jC2cFl3BZwvuRF+G/Peu5rg/EEkC/FTwvJNComjS5RGJ/gZAN3t82Fx1+f2NdjHcXjW0jvZbJV+7H5oO78e1HIxe0j/Sf9f59C3RVSS4vFt43Sy3yt9+PzQNv496keW4F2ka226Ej5pd4G0/TvRysftF5/c/6/yJ6KrxzXLXEiPbbIlHySbwd34dqYlxeNavI1ltmB+WLzQdw+vajlYe0Xn9z/r/ADLdFVJJ7tYYmSz3u33080DZ+PepGlnF2ka2+YSMtLvHynnjH5fnRysPaLz+5/1/kT0VWjmuWnlV7XZGudj+YDv/AA7U0T3Zs2kNnicHAi80cj1zRysPaLz+5luiqsk90qQFLTcz/wCsHmAeX/jT2luBeLGLfMBGTLvHB9MUcrDnX9Jk9FVoprlnmElrsVf9W3mA7/8ACm/aLz7H5n2L9/nHleaOnrmjkYe0Xn9zLdFVnmul8jZabt+PN/eAeX0/Pv8AlS+dc/bBF9l/cY/13mD09KOVhzr+kyxRVZJrpjPvtNuzPl/vAfM/w/8Ar003F59jEn2L9/nHleaOnrmjkf8ATD2i8/uZboqtJNcq0AS13h/9YfMA8v8AxpRLcfbTEbbEGOJt4549KOVhzr+kyxRVVJ7pknLWm1k/1Y8wHzP8KQ3F4LRZBZZmLYMXmjgeuaOR/wBMXtF5/cy3RVaWa5WWFY7XejY3t5gGz8O9OWW4N20Zt8QAZEu8cn0xRysfOr2/Rk9FVI57toZmez2uv3E8wHf+Pah7i8Foki2W6YnDReaBtH170cj/AKaF7RWvr9zH39s15p9zbJM8LTRNGsqHDISCMj3HWuS0wjUvG9iFvo75NG0opJOjZDzSvsJ4zz+4bI7ZrrJJrlZ4kjtd8bfffzANv4d647wLbWUHiHxXLpsLCCbUDuYv0ZRhgB6eYZT6UcrtcftI3t8tmd1RVSO4vGt5Xey2yqfkj80Hd+Pah7i8W1jkSy3Ssfmj80Db+Pejkf8ATQvaK19fuZboqvJNcLcxoltviYfNJvA2/h3oSW4a5kRrbbEo+WTeDu/DtRysfOr2/RliiqiXF4bWSRrLbMp+WLzQdw+vaiW4vFt43jst8rffj80Db+Pejkf9NC9orX1+5luioHluFu0jS33QkfNLvA2/h3pI5rlp5Ve12Rr9x/MB3/h2o5WPnV7foyxXNeHv+Rq8V/8AX1B/6IStpbi8No0jWWJgcCLzRyPXNYXhlnfxL4paRNjm5gLLnOD5CcZocWhxmnt+R1FFFFSUFMlljgjMksixoMAsxwOTgfrT6hu7O2v7WS1vLeK4t5Bh4pUDK3fkHigDjry5tTDp9nNZ6k6JfTSB7NJADzMMBkIOfarNlLb22sRXEEHiFY/LMRimWaRGLEfM28nGMdRjqaqw+HtUtdNgOi6jNFFDdyyC1kVXIG91/ds4OPlJ4OQeMbetdBo8V6xFxNq891GVKtBLbpGUbjrtAII9PegDYoorO1e+ltYY7e02tfXJKQKwyB6uwyPlUcn8B1IoA0aK8oh1/UdO+FVqBfTyajfavJpyXUjZcb7p0LZ7EKDj04rpIruTRPiRZ6LHJI1hqOnPIsbuX2SxMAWBJz8ytz7gH1oA0PEP/Ix+Fv8Ar9l/9J5a6Ouc8Q/8jH4W/wCv2X/0nlro6ACiiigAooooAKKKKACiiigDhfF7nUH1GG20txqdgkT2V5jl5AGmCDj7uYgDz/FXX6ZfxappVpfwnMVzCkq/RgD/AFqnZNrQeT7akTK99IEC4+S2wdh+pwM/U1m+DP8AiXtqvh1gR/Zt0Wgz3glzIh/Al1/4BVPZER3f9dDqaKKKksKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigCrqV7Hpul3d9N/q7aF5W+ign+lch4CaexEWmtpzqJbUXlzd4ODcSHe6H/v4Mf7prR8bs13Y2OhxN+81W8jgcZ/5YqfMl/AohX/gQHetG4j1Z9Ttmt5I4bOC5/eK3/LaExkeh5DkY6cA1S2ZEt4/10f3GvRRRUlhRRRQAUUUUAFFFFABXNeHv+Rq8V/8AX1B/6ISulrmvD3/I1eK/+vqD/wBEJQB0tFFFABUVzcwWcDT3M0cMSkAvIwVRk4HJ9yBUtVtRF02nz/Ykge625iWckIW7ZwCcUAczrnieVZ7FtPS4OnLcx/aryK3eUOM4EcaqMtk9WHygcZJOK1YPFejzXUVsZ5YJpm2RpdW0sG9vQb1GT7VSm1qe8svsjWwsNYjliP2a5O5D+8X5lYffX3HIyMgHipJme8vbK11/TY0VZxLbyxP5sLyAHAbKgqe47ZA5zxQB0dY+q+G7DV7yO7uHvY544zGr217LB8pOcHYwzzWxRQB5xp/w6mj8CS6W8zpqQvWvIHmuXlRHSdpIyASduRgMQMnJJya6G00S6u/GK+ItQjWH7PZfZLa3D7iCzbnckcc4UD2z0rpqKAOc8Q/8jH4W/wCv2X/0nlro65zxD/yMfhb/AK/Zf/SeWujoAKKKKACiiigAooooAKr311DZWM9zcTpBDGhZ5X6IPU1YrG16Wwnm0/Rr+1a5XUZiAgyAvljzNx9gVX8xQA/T9Lk0zStJsEvWkFoFSSSQ/NOAhHPuTg/hWXrf/Eo8Y6PrIz5F4Dpl1joNx3QsfowZf+2n5794tuZrLzmZWE2YgO7bG4P4Zqt4i0hdd8P3umlzG00f7uQdUccqw+jAH8Kp7IiPxS/roalFZHhjV21zw9a3kqeXc4MVzF/zzmQlZF/Bga16ksKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiqmp6hBpOlXeoXLbYLaJpXPsozQBg22dX+Id3cFQ1to1sLaJu3ny4eT8Qixj/gZrR1PSBq9jqNndXUiwzMjRtCfnhK7SCPcMM1B4N0+ex8OxSXqbL+9dry7HpLIdxH4ZC/hWnarbi8vTEzGUuvnA9Adoxj8MVUdmRLePr+jJLC+ttT0+3vrOUS21xGskbgEblIyDg8irFZGiToJL/TYtNNjDYTiKIKMJKrKr7l4A6sQRzyK16ksKKKKACiiigAooooAK5rw9/yNXiv/AK+oP/RCV0tc14e/5GrxX/19Qf8AohKAOlooooAKKKKAK93ZQ3ioJBh42DxyL95G9Qf856GpJ4I7mExSrlTg+4IOQR6EHnNSUUAFFFFABRRRQBzniH/kY/C3/X7L/wCk8tdHXOeIf+Rj8Lf9fsv/AKTy10dABRRRQAUUUUAFFFFABWdA+pPrt4s0UaaakUYt24LPIdxc9eABtH51Zvb220+zkurudIIExukfoMnA/Uiq+i6dLpelx2s95JeTBneSeQYLszFjx2GTgDsMUATXcipNaBoPNLzbQ2P9WdrHd+mPxq1UFwbgS23kKChkxKT2Taefz21PVPZER3f9dDlLXGgeOp7QkLZa4puIfQXKACRf+BIFb6q1dXWJ4q0mbVtFYWZCajauLmykP8Mycr+B5U+zGrWg6vFrui22owq0fmr88TfeiccMje4IIP0qSzRooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK5XxVnV9V0nw2mGjuJRd3o9LeIggH/efYvuN1dSSFBJOAOSa5bwiDqtzqPieTkX8nlWef4bWMkJ/30dz/RhQB1XSqttIr3d4gg8so6gvj/WfKDn+n4VaqvA1wbi5EygRBh5JHcbRnP45qlsyJbr+ujIJU1Ea7byxzRnTTA6TRNgMJMqUYHGTxuBGfSr9Z+s6XFrGnG1llkixJHKskX3kZHDqR+KiptN1G11bTob6yl822mXcj4Iz26HkH2NSWWqKKKACiiigAooooAK5rw9/yNXiv/r6g/8ARCV0tc14e/5GrxX/ANfUH/ohKAOlooooAKKKKACiiigArI1y81mFY4NDsILm5cFjJdSmOGMD1IBJJzwAOxyR316wfE/ivTPDFtF9svLWG5uSUt0uJQgY9ySeijuf6kCgDHtPiAD4Tv8AVL/Tmt7+wuzYTWYkyGuNwVVVscgll5xwCeuK2LLXpR4lbQNRjjS6a1F3DJFnZIm7ay4PdSV+uc8VxGtQ6ZqPgdLjQb5NU/szVodSvprf5vOcSB5TxxwCTjsABW6U/tn4r2F9aMJLPTdMk8yZDlS8rLtTI77VLfl60AaviH/kY/C3/X7L/wCk8tdHXOeIf+Rj8Lf9fsv/AKTy10dABRRRQAUUUUAFFFMlmjhQNJIiAkKC5wCxOAPqSQKAMq9lh1DWU0W40954FhW7eZsiNXWQeWvucqW9to9a2KoaNFqMOlxLq08c98SzSNEMIMsSFXjoAQMnk4q/QBWukLzWpE/lbZclc/6z5WG39c/hVmql59n8+y8/dv8AP/dY/vbG6/hmrdU9kRH4pf10CuSB/wCEX8XkH5dJ1uTIPAWC8x/KQD/vpfVq62qGs6Tba5pNxp10D5cy4DLwyMOVZT2YEAg+oqSy/RXPeGNXubgT6Pq2F1jT8LNxgTxn7ky+zY59GBFdDQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRVHV9WtdE0ya/vHKxRjhVGWdjwqqO7E4AHqaAMXxjcyXUNv4bspGW81YmN3TrDbj/AFsntwdo92FdHbW0Nnaw21vGscMKCONFGAqgYAH4Vg+GdLuhLc67qyAarf4zHnItoR9yIfTJLerE+1dHQAVWt4yt1dsbjzAzghM/6v5Rx+PX8as1Ttfs/wBtvfJ3eb5i+dnpnaMY/DFVHZmc94+v6MuVlWcz2+t3Olx6Z5FmsQuIriMfJI7M3mA8cNnB99xNatZ+sWt9dW0P9nXgtp4p45CWGVdA3zow9CufxxUmhoUVFb3MF3bpPbTRzQuMrJGwZWHsRUtABRRRQAUUUUAFc14e/wCRq8V/9fUH/ohK6Wua8Pf8jV4r/wCvqD/0QlAHS0UUUAFFFFABRRRQAVHJbwzEGWJHI6blzUlFADI4YolKxxqinqFGKVI0jGERVHoBinUUAc54h/5GPwt/1+y/+k8tdHXOeIf+Rj8Lf9fsv/pPLXR0AFFFFABRRRQAVhIbLxLeuJrOfytJvQYpJMqksqqQSB3CknkjGRkdKm1CaXUxNp+kapDb3cEsYumVQ7xIfmIAPAYjpnpnOK18YoAKKKKAK11JsmtR5Hm75du7H+r+Vju/TH41ZqC4FwZbfyCoQSfvc902np+O2p6p7IiO7CiiipLMHxFoc1+YNS0yVLfWbLJt5WztdT96KTHJRsD6EAjpU+geIINct5B5b219bt5d3Zy/fgf0PqD1DDgitesPW/Di6lcR6jY3Lafq8C7YruNc5X+5IvR09j06gg0AblFc/wCH/En2+RtL1REs9dt1zPbZO1x08yIn7yH16joea6CgAooooAKKKKACiiigAooooAKKKKACiiigAoorB1fxTb2F1/Z1jC+pauwytnARlfRpG6Rr7n8AaANHVNVstFsJL2/nWGBO55LHsqgcknsByawdM0291/Uote1yFoIofm0/TXwfI/6aydjIR0HRQcdcmptL8O3M1+mseIp47vUV/wBRDGD5FoD2QHq3q55PsOK6WgAooooAKrW8m+6u1+z+XsdR5mP9Z8oOfw6fhVmoIBcC4ufOKmIsPJA6gbRnP45qlsyJbr+uhPRRRUlmJam10LVLfRrWwnjt7zzrhZly0aybtzKf7udxI7cGtuoL2CS5sp4YZ3t5ZI2VJkALRkjhhnjIqtply4hisb67t5dVigR7lYTjOeNwXqASDQBoUUUUAFFFFABXNeHv+Rq8V/8AX1B/6ISulrmvD3/I1eK/+vqD/wBEJQB0tFFFABRRRQAUUUUAFFFFABRUc88NrbyT3EqRQxqWeR2wqgdSTVXTtYsdV8wWkzM8eN8ckbRuoPQ7WAODg4OMHHFAGV4h/wCRj8Lf9fsv/pPLXR1zniH/AJGPwt/1+y/+k8tdHQAUUVXvb60021e6vbmK3t0GWklcKo/E0AWKzNQu79jbR6RDbzlrgR3EsknywIOWOByW7AepyeKUzalNrCxR28A0rydzXBlJeRj0CqOgHck9xip9M0uy0exSy0+3WC3TJCL6nkknqSfU0APtLG1sRKLWCOLzpGmk2Lje7HJY+pNWKKKACiiigCrdorzWhafyys2VXP8ArDtYbf1z+FWqqXjW4nsxOrM5mxER2fY3J/DdVuqlsiI/FL+ugUUUVJYUUUUAZms6Bp2vQJHewkvEd0M8bFJYW9UcYKn6Gscf8JV4fG35fENivQkrFdqP0ST/AMdP1rq6KAOfsfGei3lytpLctY3x/wCXS+QwS59AG+9/wEkV0AIIyOlVb7TbHVLZra/tILmBvvRzIGU/gawR4JtrPB0XU9S0kLyIrafdCD/1zcMo/ACgDqKK5dY/GunsT5+k6vEOgdHtZD+I3qT+A/Cj/hLL60XOq+F9Vtxnl7YJdL+UbF//AB2gDqKK5238d+Gp22SapHaSf3L5Gtm/ASBc/hW1a39nepvtLuCdP70UgYfpQBYoopGYKCWIAHUmgBaKwb7xn4esG8t9UhmnzjyLXM8v/fEYJ/Sqn/CRa5qWBo/hudI2HFzqcgt1HvsG6T8CFoA6msPVfFmk6VcfZGna51AjK2Voplmb/gK9B7nA96pL4a1jU/m1/wAQTMmebXTQbaIj0LAl2/76H0rZ0rQ9L0O2+z6ZYwWsROSIkA3H1J7n3NAGGYPE3iMf6TIdA09v+WUDB7tx6M/3Y/8AgOT7itzSdE07Q7X7Pp1qkKE7nbks59WY8sfck1oUUAFFFFABRRRQAVVto0W7vGWfzGd1LJn/AFfyjj+v41aqpatbm8vRCjCUOvnE9Cdoxj8MVUdmZz+KPr+jLdFFFSaBVC+sEMzalbW0D6pFA8UEkhKjnnaxH8OQKv0UAVNMup7zToJ7u0ezuXTMlu7Bih7jI4I96t1n3WjWd3qtpqbq6XlqGVJI3KllPVGx95c4OD3ANRWmrTLFdPrFqmmrDN5aSyXCmOVSflZW4IzkDBA59aANWigHIyOlFABXNeHv+Rq8V/8AX1B/6ISulrmvD3/I1eK/+vqD/wBEJQB0tFFFABRRRQAUUUUAFFFFAHEfFKSYeG7GBf8Aj3uNVtIbo+kRlXOfbIA/GkvXeH4yaStt/wAt9InFyB/cWRChP/AiR+Jrq9W0u01rTJ9PvY99vMMMAcEEHIIPYggEfSqum6BFY6hLqU9zNeahJEsBuJwoYRryFAUAAZJJ45J9hgApeImC+IvCxYgAXsvJ/wCveWtK71/SrC9tbK5v4Y7q7OIIt2Wk+gHb3p+q6JpmuwJBqthBeRI29UmQMA2MZ5+tZf8AwgHhLIP/AAjum5HQ/Z1/woA0E1G7uNRurRbF7eCNCEvJXUq78Y2oDkjnqcdMUyz0v/QI4dYu01WZZfO82aFFCsOm1QOMdup96p/8IF4T/wChe07/AMB1/wAKP+EC8J/9C9p3/gOv+FAG7JIqwuVdQQpxzWR4R1GbUvCOlXt5MJLme2R5HOBuYjk4FQ/8IF4T/wChe07/AMB1/wAKQeAfCYGB4e04D0Fuv+FAHQ70/vr+dG9P76/nXP8A/CBeE/8AoXtO/wDAdf8ACj/hAvCf/Qvad/4Dr/hQB0G9P76/nWF4x1KfTPCl9eWU4juI1Uo4wcfMB0NM/wCEC8J/9C9p3/gOv+FYev6Z4A8P7UvPDlvNIyeY0Vrp5mZE7uwUHavXk+h9KAOzuJyslqEjWQPLhm/uDax3fmAPxqzvT++v51ymmeFfA+sabBqGn6NpdxaTrvjkSBcMPy/SsXVx8N9Dvza32hW6qjBJrhNOLQwscYDyBcAnIptiSs2z0Xen99fzo3p/fX8654eBPCTKGHh/TiDyCIF/wpf+EC8J/wDQvad/4Dr/AIUhk/i7UZtN8H6xe2k4juYLSSSJxg7WCkg4PFEfivQY7WJrjXdNRygLb7pBzj61XPgHwkwIPh7TiD2Nuv8AhTP+Fd+Df+hZ0r/wFT/CgCdvHPhNeviXSfwvIz/Wo2+IHhBBk+JdLx7XKn+tM/4V14N/6FjSv/AVP8KP+FdeDf8AoWNK/wDAVP8ACgCu/wAUPBEfXxJY/gxP8hWTZfE/Q7vxheRw6yLjTFsojGIYHf8Ae733dFz02+1b3/CuvBv/AELGlf8AgKn+FOX4feEFOV8N6YPpbL/hQAh8c6ORmKLVJv8Arnplx/MoBUf/AAmySNtg8P69L7/ZAgP/AH2wqf8A4QLwn/0L2nf+A6/4Uf8ACBeE/wDoXtO/8B1/woAq3Ot6veRlIPBzujDkX93DGD9QpesObwnf6m2ZPDnhXTSf+WyM8si/TYIz/wCPV03/AAgXhP8A6F7Tv/Adf8KP+EC8J/8AQvad/wCA6/4UAcH4P8EaleG7vJ/GmsQpBf3NsILWcqmI5WQffL8cdP1PWtW6+Fvn3RuD4q1K7JOfK1QrdRf98fKK6YeAfCQ6eHdOHfi3X/Cl/wCEC8J/9C9p3/gOv+FAGfZaL4h0aDytPvPDzJ/cGmtBn8VkI/Sp/wC0fGsP39H0O4HrHqMiZ/AxGrP/AAgXhP8A6F7Tv/Adf8KP+EC8J/8AQvad/wCA6/4UAQr4h8Qxg/afCjH/AK9b+KT/AND2VkeGvHN7P4dtp7/Q9ZuZmL7pooomDYdgOA/YDHTtW7/wgXhP/oXtO/8AAdf8KQeAfCSjA8O6cB7W6/4UARL45s/+Wuka5D/vae5/9BzT28eaDGMzPfwD1m064QfmUxT/APhAvCf/AEL2nf8AgOv+FH/CBeEz/wAy9p3/AIDr/hQBBH8SfBsjFP8AhIbKNgcFZX8sj8GxUEvjDT9Q8T6DZ6NrVndRTyTC5jgmRyVETFc45HIq23w98Ht97w1pZ+tsv+FC/DzwehyvhrS1PqLZR/SgDo96f31/Ojen99fzrn/+EC8J/wDQvad/4Dr/AIVg658N4Lu7jGj2uh6dbInztLpqztI2fqAAB/M0Ad9vT++v51Xt5y1zdK0aoquAr/3xtHP58fhXD+DPB2i6h4civNT0nSbqSaR2imisliDxbiEbbzjIAb8a53VdO0FNS1+CHTtPttR0xlFlpf2OJvtysilWOVLNucsvyEYxzTTE1do9G8MalPf22oPdTh2i1G5hQnAwiyMFHHoAK3N6f31/Ouch8B+FTCjP4b01HYAsogXg9+1P/wCEC8J/9C9p3/gOv+FIZ0G9P76/nRvT++v51z//AAgXhP8A6F7Tv/Adf8KP+EC8J/8AQvad/wCA6/4UAP1/Up7PVPDsVvOEjutRMM44O5PIlbHt8yqfwrXuoLS9tnt7qOGeBxh45AGVh7g1iHwD4SOM+HdOOOn+jr/hS/8ACBeE/wDoXtO/8B1/woAuTadKktgNN1I2Vra4RrVY0aOSMY+XkZXgYBB/A0+C51T+17iO4trMacFzBNHcEyMeOGQqAO/IY9BVD/hAvCf/AEL2nf8AgOv+FH/CBeE/+he07/wHX/CgDQ07Ubu7t3e7017KRZAojeZH3Dj5gVPTr78Vl+HSD4q8VkHP+lQf+iEqT/hAvCf/AEL2nf8AgOv+Fael6LpmiRSRaZY29pHI251hQKGPTJxQBfooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAqhqd3Dp0D3Ah825lxHFEg+eZ+dqj9eegGSeAav1z+t+D9P17UIr27uNRjmiTy0+zXjxBQTk8KRye59h6UATeE9CXw34atNL3IzxhmlKDC+YzFm2jsMk4Hpiqviy0TVNGuPD1siGfUVKPwCIkY/NI3649Wx7kW7Xw3a2WnQWVtdX8aQ3AuC/wBpZpJCDnDscllPQj0rPvvAWlX+p3GoS3erJPcEGTydQkjU46ABSAAKAOlgiSC3jhj+5GoRfoBipKhtLWKxs4LSBSsMMaxoCckADA5PWpqACiiigAooooAKKKKACiiigAorKv8AxLomlzywX2qWsE0UYlkjeQBlQkAEj6kVjeK/FU9h4dsNW0G4sriK7u4LdZJEMiFZH27htYdKAOupGdUXc7BV9ScCuW8Za9qnh+20Z7NrRnvNSt7GUzQswAkbBZcOMY9DmjxPObvUNF0KSPzIbu6X7W4XCgKjyKvPq0ecc8KQetAHUM6IVDMoLHCgnqcZwPyNOrhX1OHUr+Ey3wibS9QlVhNPEGO1HQMAVHJ3D9a6Xw/LJd6Yl/I8ubrEgR5RIFGMDaQBwQAfxoA1aKKKACiiigAooooAKx/FBuz4euYLFXNzc7bZGUZMfmMEL/8AAQxb8K2KKAM95rPQrGythFIkG5LWFIYWcLxhQdoO1eOp4FefeI9In1S41qa9hvY/EFtPv0O5tInIVNg2BXA2jLFg4Yjrk8YNeo0UAQ2nn/YoPtW37R5a+bt6bsc4/GpqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA89v7mxtfjbA988UaHQGCvLgKD5w7npxmub1Sw+xfD4IY3htbjxIt1bRDKstuZ87gByoxlvYGvSW8OFvGi+I/tfzCzNl5Hl8FCwfOc9cj8u1bmB6UAeb/EKxtLeDw1NBPcSY1yzlO+7klURh8l8MxGAO/auo157eLUfDs+6NUfUi7PkAH/RZxkn6YrocA9qZJDFK0bSRo7RtuQsMlTgjI9DgkfjQBw/h+Ql9YZLxERtTnIH2hFyM9cFT/Oui8MXlvPottBFcRyzQQoJVVwxQkcZx61r+Wn90UoUL0AFAC0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH//Z']	['che_180.jpg']
che_181	MCQ	Calcium oxalate solid is dissolved in hydrochloric acid with different initial concentrations of\[c_0(HCl)\], and the relationship of\lg c-\lg c_0(HCl)\] of some components at equilibrium is as shown in the figure<image_1>. Oxalic acid\(K_{a1}=10^{-1.3}, K_{a2}=10^{-4.3}\) is known. The following statement is wrong ()	['A. \\(\\lg c_0(HCl)=-1.2\\), the pH of the solution =1.3', 'B. For any\\(c_0(HCl)\\):\\(c(Ca^{2+})=c(HC_2O_4^-)+c(H_2C_2O_4)+c(C_2O_4^{2-})\\)', 'C. The equilibrium constant of\\(CaC_2O_4(s)+2H ^+(aq)=Ca^{2+}(aq)+H_2C_2O_4(aq)\\) is\\(10^{-3.0}\\)', 'D. \\(\\lg c_0(HCl)=-4.1\\),\\(2c(Ca^{2+})+c(H^+)=c(OH^-)+2c (HC_2O_4 ^-)+c(Cl^-)\\)']	D	che	化学反应原理	['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che_182	MCQ	In aqueous solutions, CN^-can form complex ions with a variety of metal ions. When the three metal ions X, Y, and Z form complex ions with CN^-respectively, the relationship between\lg \frac{c(metal ion)}{c(complex ion)} and-\lg c(CN^-) is as shown in the figure<image_1>. The following statement is correct ( )	['A. When 99% of X and Y are converted into complex ions, the equilibrium concentration of CN^-in the two solutions: X>Y', 'B. Add a small amount of soluble X salt to the mixture of X and Z at point Q, and reach equilibrium\\frac{c(X)}{c(X complex ion)}>\\frac{c(Z)}{c(Z complex ion)}', 'C. When complex ions of equal amounts of substances are prepared from Y and Z respectively, the amount of substances consuming CN^-: Y<Z', 'D. If the concentration relationship of relevant ions is as shown at point P, the dissociation rate of Y ligand ions is less than the formation rate']	B	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAFVAfIDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiuA0iW5T4063Zve3U1uulRSJFLISqFn52joOlPhm/4Sr4ia5pl40p03R4Io0hSRkDTSDcXOCMkDbj0ye9AHeUVxvw51251bS9Tsr6Uy3Wk6hLYmRjlpEXBVj74OP+A5ro/7c0kf8xSy/wDAhP8AGgC/RVD+3NI/6Ctj/wCBCf40f25pH/QVsf8AwIT/ABoAv0VQ/tzSP+grY/8AgQn+NH9uaR/0FbH/AMCE/wAaAL9FUP7c0j/oK2P/AIEJ/jR/bmkf9BWx/wDAhP8AGgC/RVD+3NI/6Ctj/wCBCf40f25pH/QVsf8AwIT/ABoAv0VQ/tzSP+grY/8AgQn+NH9uaR/0FbH/AMCE/wAaAL9FUP7c0j/oK2P/AIEJ/jR/bmkf9BWx/wDAhP8AGgC/RVD+3NI/6Ctj/wCBCf40f25pH/QVsf8AwIT/ABoAv0VQ/tzSP+grY/8AgQn+NH9uaR/0FbH/AMCE/wAaAL9AAHQVQ/tzSP8AoK2P/gQn+NH9uaR/0FbH/wACE/xoAv0VQ/tzSP8AoK2P/gQn+NH9uaR/0FbH/wACE/xoAv0VQ/tzSP8AoK2P/gQn+NH9uaR/0FbH/wACE/xoAv0VQ/tzSP8AoK2P/gQn+NH9uaR/0FbH/wACE/xoAv0YGc4qh/bmkf8AQVsf/AhP8aP7c0j/AKCtj/4EJ/jQBfoqh/bmkf8AQVsf/AhP8aP7c0j/AKCtj/4EJ/jQBfoqh/bmkf8AQVsf/AhP8aP7c0j/AKCtj/4EJ/jQBfoqh/bmkf8AQVsf/AhP8aP7c0j/AKCtj/4EJ/jQBfoqh/bmkf8AQVsf/AhP8aP7c0j/AKCtj/4EJ/jQBfoqh/bmkf8AQVsf/AhP8aP7c0j/AKCtj/4EJ/jQBfoqh/bmkf8AQVsf/AhP8aP7c0j/AKCtj/4EJ/jQBfoqh/bmkf8AQVsf/AhP8aP7c0j/AKCtj/4EJ/jQBfoqh/bmkf8AQVsf/AhP8aP7c0j/AKCtj/4EJ/jQBfoqh/bmkf8AQVsf/AhP8asW15a3is1rcwzqpwTFIGA/KgCeiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA8702ZR8cdXmKSiGXS4oElMbBGkV8lQ2MZxViFB4V+ImuaheLIunaxBFLHMsbOomjG1kOAcErggd8Gu8ooA4z4b6Fc6TpGo3t7E0V1q2oS3zRuMNGjYCK3vgZ9t2Kx/hr4Q8N6h8PNIu7zQdNuLiSNy8stqjMx3t1JHNel1xvwp/wCSY6H/ANcn/wDRjUAL/wAIJ4Z/4SH/AJFnTfs32b/nzTZu3fTGcVJq3gTwv/ZF39n8M6X53lHZ5dmm7PtgV0v2uL7f9j583y/M6cYzinXVylnay3Eudkalmx1wK0u+aOnYw5Y8k1zd/kc9Z+BPCv2G383wzpXmeUu7dZpnOOc8VSg8CeG/+Elu93hnTfsv2ePZmyTZuyc44xnpXYwyrNDHKmdrqGGfQjNQpfRPqMtiN3nRxrI3HGCSB/KhN+9oOSjaGvX79Gc3q/gTwx/Y959n8M6Z53kts8uzTdnHGMDrVmDwJ4T+zx7/AAzpO7YM5s0znH0reurmOztJbmXPlxIXbA5wKkRxJGrjowBFK75bWKSXtG7622+88vtfB/h4/F+/s30DT/sY0iOVITaps3eZgsBjGe2a3vEXgTw3/YN19j8Mab9owuzybJN33hnGBnpmlgmV/jLdRjO6PQ0DfjNmuqv76LTrGS7n3eXHjdtGTyQP604NqomlroRUUXSkm7LXXtv+Rj/8IJ4R/wChZ0j/AMA4/wDCs+08CeGf7Y1DzPDOmeTiPy91km3pzjiuxqvFdxTXc9sufMh27sjjkZFTFuz0/q5c0m43dtfv0ZyeveBPDf8AZTfZPDGm+bvTHlWSbsbhnoPStP8A4QTwj/0LOkf+Acf+FbF9exafbG4m3bAwX5Rk8nFWabb5Erd/0FFL2jd9bLT7zjNO8CeGv7S1TzvDOm+V5y+Tvskxt2DO3jpnPSsf4i+DvDdn4MuZ7Pw/psMyzQAPFaorAGVQeQPTNehW97Fc3FzBHu327hHyO5APH4Gub+JTiPwNeE95YF/OVRTk3zart+QqaSg0nff83+RbTwJ4SMak+GdI6D/lzj/wrO0nwJ4a+0an9o8M6bt+1nyvMskxs2r93I6Zz0rsY/8AVp9BUFrexXclyke7NvKYnyP4gAePzFKLfK9CppOcW3/wdDldZ8CeGtlj9m8M6bn7ZF5nl2Sfcz82cDp61p/8IJ4R/wChZ0j/AMA4/wDCte8vYrIQmXd++mWFcDPzMcCrNDb5VoEUueTT7HHaX4E8M777z/DOmY+0v5e+zT7vGMZHSm6t4E8N+fp32fwzpu37Svm+XZJjbg5zgdK6u2u47ozCPP7mQxtkdxSXV7FaPbrLuzPII0wO5qrvnvbX/gGbjH2VubTv8zH/AOEE8I/9CzpH/gHH/hXHfDzwh4cvbXxCbvQdOmaHXryGPzbVGKIrDCjI4A9K9SriPhqwa38UMOh8R3x/8eFZG/Ul1TwJ4a+0ab5HhjTdv2oebsskxs2t97A6ZxWl/wAIJ4R/6FnSP/AOP/Cti5vIrWS3STdmeXykwO+CefyNWKuTfKtCIJKUmn/wNDjNB8CeG/7LH2vwzpvm+bL/AK2yTdje2Oo6YxRf+BPDX9s6T5XhnTfI3y+dtsk242HG7j16Z711VjexahbfaId2wsy/MMHKkg/qKJ72K3u7W2fd5lyWCYHHyjcc/hVtv2jdtddPv/IyUY+xiubT3de+qt95kf8ACCeEf+hZ0j/wDj/wrN0LwJ4a/spPtXhnTfO3PnzbJN2Nxx1HpXZVXsryK/thcQ7thJA3DB4OKhN8rVu36mrS9onfWz0+7+vmeda14Q8NxfEbw1ax6DpqW80NyZIltUCuQoxkY5xXVSeBPCXlPjwzpOcHGLOP/Cs/Xf8AkqHhT/rjd/8AoArsmIVSx6AZqEaM4/Q/Anhn+xLT7V4Z0zz/ACxv82zTdn3yM0lz4E8Nf29YbPDOm/Z/Kl8zbZJtz8u3PGPXFdXZXcd/ZxXUOfLlXcuRg4pJLyKK+gtG3eZMrMuBxhcZ/mK1u+du2uv9fI5+WPsorm093XvqrfeYN14E8KfZJtnhnSd+xtu2zTOcduKr6N4E8Mf2LZfafDOmef5KeZ5lmm7djnOR1rrJJBFE8jfdRSxx7VHaXMd7Zw3UWfLlQOuRzgjNTd8lrdTRpe0Tvrbb7jkm8CeGv+Enjx4Z037L9jbP+hJs371x2xnGareNPBfhe18C+Ibi38PaXFPFply8ciWiBkYRMQQccEGuzN7ENSWx+bzjCZhxxtBA/mayPHf/ACTzxL/2Crr/ANFNRNt2uugU0lzWd9TJ8MeCfC8/hXSZZ/DmlvM9nEzu9ohZiVBJJxT18CeG/wDhJXz4Z037L9mGP9CTZu3fTGcVu+FmD+EtGYdDYw/+gCrovYjqLWXzeaI/M6cYziiLeugppNRu+v3nN6v4E8Mf2PefZ/DOl+d5LbPLs03bscYwOtT2vgTwp9kh8zwzpW/y13brNM5x34roLu5SztJbmXPlxIXbHXAqSKQSxJIv3XUMM+hou+S1h2XtL31tscengTw1/wAJJLnwzpv2X7ImP9CTZv3tntjOMUuu+BPDP9hXn2Twzpn2jyj5flWSbs+2BmupF5EdQayG7zViEp442kkf0NU/EHiHTPDGkvqWrXAgtkIXJGSzHoAPXiq5mpRdtrEcilTlFPe/y/4YoReBPCflJu8M6TnaM5s4/wDCsjwLY2mm+KvGNpY20NtbpdwbIoUCqv7odAK3vDHimz8V2k13Y215FBG+xXuYDH5oxncueorB8DR3MXi7xst1Os0n2+Ihwu35THwMewwKyN0d1RRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFc94i1++0+7tdP0exhv8AUZlaUxS3AiVYxxnJ7kkAD6+ldDXL+J/AOheK5PtN7DJHqCJshvIJWSSLHQgg4/OgDa0ibUbjTY5dVtIrS8YnfDFL5iqM8fN345rm/hT/AMkx0P8A65P/AOjGq38P7rUbrwbaHVJjPdRSSwGc/wDLURyMiv8AiFFcd8O/Cd5f+AdKuo/Fuu2aSI5EFvJEI0+duBmMn9aAPTvsS/2n9u3nd5XlbccYznNPvbVb2ymtmYqsqFSw7ZriP+EU1P8Atv7F/wAJv4j8vyPNz5kOc7sf886fqXhHUrLTLm5j8b+Iy8UZYBpIcEj/ALZ1pafNHvpYwvT5Jdtb/qdvBEILeKEEkRoFBPfAxVeOwWPVpr8OS0sSxlccAAk5/WuVtfBmoz2kMzeOPEgaSNWIEkOMkZ/551Ui8LapJr1zYHxt4i8uKBJAwkhySSR/zz9qEpe9b5jk6doX76fc/wBDur21W9sZ7VmKrMhQsOoyKljTy4kQHIUAZrhtT8I6nZaXdXUfjfxGXiiZ1DSQ4JA7/u6nh8FajJDG58ceJMsoJxJD6f8AXOp15fIpOPtGutvw1C3hEfxnvJASTLoaEj0xNj+ldRqlguqabNZu5RZcZZRkjBB/pXltt4Yv5Pive2B8W66Gi0lHFyJIvNIMn3SdmNueelbuueFtU0zR7i8h8beImkjC4DyQ4OWA7R+9VBS51bfS36E1HTVKTl8Ot/1PQaqw2Sw31zdByWn25XHAwMVzH/CD6h/0PHiX/v7D/wDG6pW3hTU5tUvbVvG/iMJBs2kSQ5ORnn93UxvZ2Km43jzd9PWz/S52epWC6lZm2dygLK2QPQ5q3Xn+s+FtU07TmuIvG3iJnDquGkhxyQP+edX/APhB9Q/6HjxL/wB/Yf8A43TfNyK+2v6BFw9o0t7K/wCNv1OmtbBbW7vLhXLG5kDkEfdwoH9K5z4lxiTwNeAnGJYG/KVDWbY+FdUur/UYH8beIgttKqIRJDkgqDz+796yPH/hS+0/whc3DeLteulEsKmKeSIqcyqOcRg8ZzRJS5td9PyFTcOR8u2v5u/4nqsf+rT6Cq1lYLZSXbq5b7TMZiCOhIAx+lcwngjUDGp/4TjxIOB/y1h/+N1R03wrql5NfpJ428RAW1yYV2yQ8gKp5/d9eaI83K7bDm4c8b79PuO1v7Bb9bcM5TyZ0nGB1KnOKt15/qvhXVLFbQx+NvETeddRwtukh4DHBI/d9a0P+EH1D/oePEv/AH9h/wDjdD5uVX2CLhzytvpc6azslszcFXLedKZTkdCe1Je2C3slq7OV+zyiUYHUjtXGad4U1O8a7D+N/EY8m4aJdskPIHr+7pupeFtUs5bFI/G3iIi4uBE26SHgH0/d1Vp8/mZt0vZX+z/wf8z0CuI+Gi7LfxQvp4jvh/48Km/4QfUP+h48S/8Af2H/AON1yXgHwre31vr7p4s1218vXLuJhBJEPMIYZdsofmPfGB7Vkb9T1S8sVvJbR2cqbeYSgAdTgjH61argNQ8K6paT2CJ428REXFwIm3SQ8Dax4/d9eKv/APCD6h/0PHiX/v7D/wDG6uXNyq+xEHHmlbfr9x0um2C6bZi2Ry4Du+SP7zFv60XNgtzf2V2XIa1ZyqgcNuXbz+dcVo3hbVNR04XEvjbxErGSRMLJDjCuVH/LP2ovPCuqW+q6bar428RFLppA5MkORtQsMfu/aran7Rrrrf8AUyTpexi7e77tvvVvxsegVV06xXTrNbZHLhSTkj1Oa5n/AIQfUP8AoePEv/f2H/43VDSPCuqahpyXEvjbxErMzDCyQ44JH/POoXNyvtp+pq3H2iT3s/0v+hc13/kqHhT/AK43f/oArsmXchX1GK8m1jwnexfEHw5bHxbrsjzRXJWd5It8eFHC/u8c98g11D+CdQWNmHjjxJkAn/Ww/wDxuoNGdTp1kunafBaI5dYl2hj1NJLYrLqVtelyGgR1C44O7H+FcXpHhPU9Q0m2u5fG/iNXlTcQskOB/wCQ6S48K6pFrNlZr438RGOeORmJkhyCu3GP3fvWtp87763/AFOe9L2UX9nS33q36HeTRiaGSMnAdSufqKisLRbGwt7RWLLDGEDHqcDFclceC9RitpZF8ceJCUQsMyQ9h/1zqDS/CWp32lWl3J438Rq80SuwWSHAJGeP3dT73J5XNG4e0S62/A7E2CnV11Ded6wGDZjjBYNn9KyvHf8AyTzxL/2Crr/0U1c+fCuqDxAmn/8ACbeIvKa1aYt5kO7IcLj/AFfTmqvjDwdfWvgnXrh/GPiC4WLTrhzDLJCUkAjY7WxGDg9Dg0T5tLhTcHzcvfX1Oz8LJ5fhHRlBzixh/wDQBVwWCjVWv953NEItuOMZzmvNPBunW+u6Ta21h8RNZe6gs4XntraeEiEFcBf9WemCMZyO9Ur/AMOfEKbxlJpWleLb2DTo41k+1XkySO4PXCqgxzkY/Whc2tglyWXN8j1TWXs00e6F/dx2ls0ZV5pHCqgIxnJ4qh4a8U6H4iSeDRb4Xi2W2OSRUYKTjjBIw3TqOK5XxH8PJbzw5dJqPi3XbyOOPzTFM0JRmXkceX61d0z4f3Fvp0C23jDX7eMop8uJoFUcegio97k8gvH2lutvwC+8M+MNT8WzX/8AwkMGmaapVIo7OHdLLGp3AOW6ckg46iut1fSrfWdNlsrlEZHHBZA209iM9xXHL4U1Q67JYf8ACb+IvLW2WYN5kOclmH/PPpxS6x4U1PT9IuruLxv4jZ4YyyhpIcE+/wC7qkp88V10t+hDlT9nJvbW/wCp3iII41QdFGK4/wAJf8jp41/6/IP/AEUKSPwTqDxqx8ceJMkA/wCsh/8AjdVPh9ZSad4k8YWst9c3rpdw5nuSpkb90Ou0AfpWRstjvqKKKBhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVg3fhOzu9Xm1E3mpRSTqqyxQ3bJG4Hqo/pit6qOpa1pukLGdQvYbfzCQgduWx1wOpA7ntQBat7eK1t47eCNY4o1CoijAUDtXI/Cn/kmOh/8AXJ//AEY1dfFNHcQpNDIkkTgMrochge4I61yHwp/5Jjof/XJ//RjUAdb9oi+1fZt487Zv2+2cZpZ5o7eB5pW2xoNzMewqv9ib+2ft28bfI8rbjnOc5p+o2rXunXFsrBWlQqGPbNXaN1rp1MuafLJ211t+hPG6yxrIhyrAMD6g1Gt1C129qrgzIodl9Aeh/SltojBaQwk5MaKpI74GKqxWDR65cX5cFZYUjCY5BBJz+tCUdbv0Byn7tl6/cW55o7eB5pWCxopZmPYCnqwdQynIIyDVbUbVr3Tbm1VgrTRsgY9BkVPEnlwohOSqgZpWXLfqVeXPa2ljkIZEb4yXKKcsmhoGHp++JrrLq6hs7Z7i4cJEmNzHtziuPtoTH8ab2QkES6IhA9MS4/pXT6zYNqmkz2aOEaUDDEZAwQf6U4qLmk3poTOU1Tk4r3tbfoX6iS4iknlhRwZIsb19M9Klqnb2TQ6leXRcFZ9mFxyMDFJJWdypOSasvX7n+pNc3MNpCZZ3CRggZPqeBU1UdXsG1Kwa2RwhLq2SPQg1eoaXKn1BOXO01pp+t/0IYrmGaaaKNwzwsFkH90kZ/ka5n4ksqeBrwscZkhH4mVa3rKwa1vr+4ZwwuZFcAD7uFA/pXP8AxMjMngW7AOMTQN+UqGnJRT02FBzcbyWuv56fgdZH/q0+gqOC5huGmWJwxhfy3A7NgHH6ipI/9Wn0FU9PsGspr52cMLm4MwwPugqBj9KSSs7jk5KSSWnUsXFzDbCMzOF8yQRpnux6Cpqo6nYNfrahXCeTcxznI6hTnFXqGlZW3CLlzNNadCKG4inMgicN5blH9mHaknuYbdollcKZXCJnu3pUNhZNZtdFnDedO0owOgPam6hYNey2bq4X7POJTkdQO1VaHNa+hHNU9ne3vf8AB/yL1cR8NSGg8UEdD4kvsf8AfQrt64f4ZrstvE6+niO+H/jwrM2OzmuYYGiWVwplfYgPdsE4/Q1LVK/sWvJrF1cKLecSkEdRtIx+tXappWViIuTk01p0Iba5hu4fNgcOm4rkeoOD+ookuYYp4YJHAkmJEa/3sDJ/Sq+kWDabYC2dw5EjvkD+8xb+tF3YNc6np92HAW1aQlSOW3KV/rVWhztX01/4BClU9nF297S6+av92peqK2uYbuESwOHjJIBHtxUtUtJsW07T1tncOVZjkD1JNSkuVvqW3LnSS01/S36nM67/AMlQ8Kf9cbv/ANAFdkSACT0Fcbrv/JUPCn/XG7/9AFdi67kZfUEVJYy3uIrq3SeBw8TjKsO4oe5hS5it2cCWUMyL6gYz/MVX0q0OnaZbWTyK7xJtJHeuT8Xa/qmm+KdOt9H8OX2q3i20jAoAkADkAbpDwCNpyD6itLQ5mr6a/wDAMeap7OLtrpf8L/cdu7rGjOxwqjJPtVa11SwvZFjtruGWQxiTYrgsFPcjqKqS2d1rfhZrTUA1ld3drsnFvLzE7LztYeh71meD/AWieDrZTY2qm+eMLPduxeSQ9+SeB7DAqNLGl3zW6FDxL4j8WJ4h/sDw1oEEkphE39oXs+2FVzg4UcnBI/wq949tTefC7X4r4KZF0uWV/LJC+YiFxjvjco/Ctw2DHXU1DeNi2zQbMc5LBs/pWb47/wCSeeJf+wVdf+impySVrCg5O/Muv4EPgXRNJ0nwrpsmm6fbWzT2kTyvHGA0hKgksep59a6AXMJuzahx5wTeV/2c4zWd4VTZ4Q0ZSc4sof8A0AVZWwYa21/vG1oBFtxznOc0JR1uKTmrWXqWp5o7eB5pW2xopZmPYCnI6yIrqcqwBB9qr6jate6bc2qsFaaNkDHtkVNbxmG2iiJyUQLn1wKLLlv1HeXPa2lvxEFzCbs2wcecEEhX/ZJIB/MGi5uIrS3knncJFGNzMewqutiw1uS/3ja1usO3HOQxOf1pdWsm1HSrmzVwjTRlQxHAqrQ5kr6aX/UhyqcknbXW36FsEMoI6HkVx3hL/kdPGv8A1+Qf+ihXQ3GoiLTLx9PVNQurOM5toZV3M4XIT2J9/WuK+Gdzqt3r3i641myisrx7qAvbo+/y/wB3wCe/GP1rM2R6NRRRQAUUUUAFFFFABRRRQAUVgXGuTxePbHQRGht7jT5rpnP3gyOigfT5jW/QAUUUUAFFFFABRRRQAVwXh2V9R+LHi2W4+YWMNvZwK3O1WXe2PqSM/Su9rk5dF1DSPGV9r2l2yXcWo26RXEBlEbLImdrgnggg4Pfp1oAyvhTeSvZ+ItMZi0Om6zPDbnssZwwUfQlvzFY3w88XX2n+AtKtYvCGvXiRo4FxbpEY3+duRlwf0ruPBnhs+GdGlgldXvLu5kvLp0+6ZXPOPYAKPwrP+FP/ACTHQ/8Ark//AKMagCp/wsDVf7V8j/hCfEOzyd3l+XDvznr/AKzpTr7x/qkNjPKngjxFGyoSHkjh2r7n950rtsQfas4j+0bMZwN23P54zSziIwOJwhiI+cOBtx75q7q60M7Pllr3OMt/HmpvbRO3gbxGxZASyxw4PHUfvOlV4/iDqravPAfBXiAxrErCIRQ71JJ5P7zGK72MII1Ee0JgbdvTHbFRqtt9rdlEX2naA5AG/b2z3x1oTWugNP3dTir7x/qkFhPKngjxFGyRkh5I4dqnHU/vOlTR+O9SaJGPgXxISVByI4cH/wAiV2M4iMEgnCGEqd4cDbjvnPanrt2jbjbjjHTFL7JVnzXPIoPGWoH4qXd0fCOuM40lIharHF5qjzM7j8+MZ461v6r8QdVtdMmmi8FeIIXUDEk0UOwcjriSrsIT/hclztC7v7DTdjr/AK49fwrrLpbdrZxdiIwcbhKAV6988dacWuZOxM03BpPXU5L/AITrUf8AoRPEv/fuH/45VWD4gaq9/dRN4J8QsibdqLHDuXI7/vK72okEAnlMYj8448wqBuPpmktmVJO6scLqfxB1W3sjJH4K8QQtuUb5YodvJ9pKuf8ACdaj/wBCJ4l/79w//HK625W3aEi6EZiyMiQAjPbrU1DtyoST5279v1OAtPiDqst3exv4K8QOsUgVVSKHcg2g4b95171jePfGV/deEbmF/B+vWitLDmW4jiCD94vHEhOT0Hua9SiW3E0xhEYkLDzdoGSccbvfGK5n4k7f+EGvN2MeZDjPr5q4ok1cUU+XV9/zKyeOdREaj/hBPEp4H/LOH/45VWx+IOqzS3gfwV4gkEc5RRHFDlBgHDfvOvP613sf+rT6Co4Ftw03kCMMXzLsA5bA6474xQrWY5J8y1OG1D4g6rAtuY/BXiCLfcIh8yKH5gTyoxJ1Parn/Cdaj/0IniX/AL9w/wDxyutuFt2Ef2gRkCRSnmAH5+2M9/SpqHayBJ8z1OCsviBqszXIfwT4hk2TMo8uKH5R6H951pt98QdVhktQngrxBGJJgrCSKHLD0X951rrYNX0b7Y9pb31n9qZyWhSRd5bvkDnNPvr/AEq2uIYr+5tY5id8KTMobPqoPf6U7rmuTyy5LX1Ob/4TrUf+hE8S/wDfuH/45XJeAvF99aW+v7PCOu3fna5dzMYEiIjLMMo2XHzDvjj3r2CuI+GuPI8UYxj/AISS+xj/AHhUGpBe/EHVYZbRU8E+IIxJMEYSRQ5cYJwv7zrx+lW/+E61H/oRPEv/AH7h/wDjlddMLctF5wjLB8xbwMhsHpnvjNS1T2REU+Z6nAaZ8QdVubISSeCvEEzb3G+KKHbgMQBzJ1HQ+9Fz8QdVj1CyiXwV4gRZWcMjxQ7nwpI2/vO3U+1dzbC3WHFqIxFuPEYAGc89PfNY3ibxT4e8LpBc63dRRSkt9nXyy8rHGDsUAnvj8eaba5m7dyVGXs0r66f8Ey/+E61H/oRPEv8A37h/+OVU034g6rcWSySeCvEErFmG+KOHb195K6rQtZj8RaHDqdvb3Vok4bZHdxbJFwSASvvjI56Gub8M+DdRtdTh1fVPFV1qEsW7ZbWwENqpOQf3Y4PU8nmkvhZTT5k79/0OS8RePZoPiB4cup/CevxSRRXAS2MMbSS7gBlQrngd8108/jfWbrS5Yz4I8S2s8kTASRLC3lkjhgS4zjr0q3rv/JUPCn/XG7/9AFdkcYOcY75qSzxnwbJLpMseuT+F/GWq6rNEVa8nkiZSp6hV8wADgdu1dTN8QNVTU7WEeCfECo6OWjaKHe2MYI/edBnn6iu5thAtugthGIQPkEYAXHtihxbm5iLiPzwG8skDcBxnHf0zV3XM9O5laXItddDjpvHmpJBIw8C+JFIUkFo4cDjv+8qGw8f6pPp9vLJ4I8Qyu8asXjjh2sSOozJ0run2lG342Y+bPTFNtxCLeMW4QQhRsEYG3HbGO1LTlKs+e9+hwh+IOq/2wtv/AMIV4g8s25fyvKh3k7gN3+sxjnFUfF/jO/uvBWvW7+C/ENusunXCNNLHDsjBjYbmxITgdTgV6OVt/tgYiP7T5ZAOBv2Z598ZxWL47/5J54l/7BV1/wCimolbQIJq931OZ8O+N9Ri8NaXGPBXiGYJaRKJY44drgKBkZkzg1OPiDqp1doP+EK8QeWIQ3leVDvBz1/1mMV1Phfb/wAIno23GPsMPT/cFaAFv9rLAR/admCcDftz+eKE1qEk9LM4q+8f6pDYTyp4I8RRskZYPJHDtU46n950qWHx5qTwRsfA3iRiVBJWOHB47fvK666mtETyruSELKCNkpGHGOeD14ritYvPG2tavPo3h+zi0bTIcK2rXGHLjA/1KD+Z4o05Qs+e9yNfiNqB1ySy/wCEN14lbdZPICQ+YMsRuI8z7vauN8XeJfiLrbTougatomhIpLNbIjXEg/2mLDaD7Zx716P4U8DaP4Wu5rlJpr7WZ1zcX13IXmkB+vQZFdPciBraQXIjMBHziQArj3zTTXMroTT5XZ9zzbwxqEXhTTfsuk/DvxLGshDyyFYWaVv7zEy5Jq/8Pb6TUvEnjC6lsbmxd7uHNvchRIn7oddpI/Wu+XG0bcY7YrjvCX/I6eNf+vyD/wBFCoNEdlRRRQAUUUUAFFFZusahdWcKxadaC61CbIhjdtqDHVnbsoyPc9BQBpUVwcvhXxzfSedceO1tGPPkWWnLsX2yzZYfgK0NOXxZoUqrrF7a61p54a5igME8PuUyVZfXBBHXBoAgvf8Aksmkf9gW5/8ARsVdnXF3pz8Y9IP/AFBbn/0bFXaUAFFFFABRRRQAUUUUAFFFef8AjrxbDp2tWOitr50LzEMz3htvMBOcLHkjaufmJJPYetAHoFcb8Kf+SY6H/wBcn/8ARjV0OhwTQaRAtxqZ1OQgt9rKqvmAnIwF4xjFc78KnQfDLRAWUHyn7/8ATRqAOk+yS/299s48r7P5fXnO7NSapbyXelXVvFjzJIyq5OBk0z+0R/bH2L5Nvk+bv3d84xT9QvlstPuLlSjmJCwUt1xWvvc0e+ljntT5J9tb/qS2kbQ2UET43JGqnHqBVOGymTxFdXpC+TJbpGvPOQST/OrdtcpPawzFlBkRWIz0yM1Vi1MSa3cWBCBYoUkD7uTkkY/Shc3vW+f3jkoWhfvp9z/Ql1W3ku9Ju7aLHmSxMi5OBkirMKFII0bqqgH8qr6jfLZadc3SlHMUbOFLdcCpop0khRyyjcoOM1OvJ5XLXL7R97L7tTjbWJk+NV/I2NsmiRlfwlxXS6/ZTajolzaW4UyyBdu44HDA/wBK5q2ulk+M96hKgR6IgBz1zLn+tdPrGpjTNJnvECSNGBhS2M5IH9aqHN7SNt9LfoRVVP2M1L4bO/43NCqFraSxatfXLY8uYJsweeBg1d8xP76/nVO31FZtSu7U7AsGzDbuuRmpjezt/WqLqcvNHm76fc/0uM1yymv9MaCDbvLo3zHAwGBNaNZ+ramNOsDcKEchlXaWx1OKveYn99fzofNyLtr+goqPtZW3sr/jb9Shp9nNbajqU0gGy4lV48HsEA5/EVg/E1DJ4Fuwvaa3P5TIa37LUhdXt/AQii2kVAQ33sqD/Wuf+Jk6p4GuyGUkzQL19ZUFOfNza76fkKmoezfLtd/m7/iddH/q0+gqhpdlNaT6i8oXFxdGVMHPy7VH9DV2ORPLX516DvVPT9TF7LfIwRfs1wYQQ33gADn9aUebldthz5eeN99bfcJq9nNerZiEL+5u4pmycfKpya0az9S1IWK2pUI/nXMcJy3QMcZq95if31/OiXNyq+wRUfaStvpc8s8X+Hr/AMOax/wn+lwh7qznc3sC8/aLRsbv+BL1/wD1VtWkEnjTVdM8UxxBdPtpB9gWQbWZD9+Ug+pwFHoM/wAVaut3Vzq3hrW7O0tfPuGEtrGiSKuSVwGJYgAc1R8N3lz4Z8GaBp+q2yWk0CR2kxknQqNq43hlJGOO+Kv3/aef/AM/3fsd/d/4J2lcP8M1K2vidT1HiO+H/jwrp9M17Stailk02/guo4n8t2icEBsZxn8a8w8Bp4tvNe1t7S/06x0SPxFdS3ClDJNM28FkHQBcYG736GsTo6noPim/sdMj0++1G/trO3t7kSO88gXI2sML6nkcCrPh/wASaZ4p0xtQ0e48+2EjRCQoVBYex5xzVbxHaaTqEmlxanp9rfKbsBBOAwjO1ucd+nQ1tx+RDGscfloijCquAAPQCrlflVzOHLzytv1+44Pw74Y8Zw6tFd6t4iig0+CeR49Ns4RtkDMT87nk9c45rqtS0oX2s6TdtDFItm8pYuASu5MDH44qbSdSGo2AuHCRnzHTaGz91iv9KLvUhb6lYWoCMLpnBbd93apb+lX7/tHffX8nczvSdGLXw+7b71b9DQrP0WzlsdMSCYDeGYnByOWJq95if31/OqWlakNQsFuG2ISzDaG9CRUK/I+2n6mkuX2ivvZ/pf8AQ5vXf+SoeFP+uN3/AOgCuxkBaNlHUgivGviD8TNE8O/E3Ry6z3baZHKt0sAHyeYowAScEgc4/WvVtL1ux1rRoNVsJ1ktp4/MjJ4OPQjsahGj2HaLaS2OjWtrNjzIkCtg5GaS5s5ZdcsbtQPKhjlV+ecttx/I07S9QXUNLt7ttiNKm4qGzikn1IRataWY2FZ0kYtu6bcf41teftJd9b/jc50qfsYr7Pu2+9W/QtXKNLazRr95kKj6kVBpFtJZ6PZ202PMihVGwcjIGKmnuEit5JAykopbGeuBUOm3632mW122xGmiVyobpkZxUe9yeVzRqPtV3t+GhE1lMfEiX2F8kWjQnnncXU9PoKoeO/8AknniX/sFXX/opqvvqiJrS2LGMRm2acyFumGAx+tcr8U9em0/wJqMNjps2o/brOeJpIWGyCMxndIx9ACSOOcdRRPm0v2Cly3ly99fU6HwuyW/g3RjM6oPsUAyxwMlBiud8UXXiyHxUIPDOjxyvPaBDf3TYgg+brgcs3tWJ4W8BTa/pOkan4v1qTUEjgie10+FjHbwgKNpIHLNjHNejrqSnWmsMJtWAS793vjFEebWwT5Pd5u+nqcZYfDPy1uNV1rUp9b8RSRMsc87bYoSQRiNBwBz1/lXfW0bRWsMbfeRFU49QKh1G+Wy065ulKOYo2cKW64FSwXCTW8UpZQXQNjPTIo97k8rguX2r72/AqrZyjxDLekDyWtViHPO4Mx/kRS61aS3+i3drDjzZYyq5OBmhdSB1qSw+Tatus2/dzksRj9KXVdRXTtLubxdjtChYKWxmrTnzx76W/Qzap+yn21v+pcjUrEinqABXH+Ev+R08a/9fkH/AKKFdckyPGrb1GQD1rkPCJB8aeNCCCPtkHT/AK5CsWdC2OzooooGFFFFABWDB4gl/wCEvudGu7XyYvLU2lwDkTNjLofRgCCB3GT2Nb1YVzp41OXV7bzPJkLRtFMFy0ThBhh7igCxo0dzHd6yLm8kuc326LeABEhijIQAdhz9ck9TWrXH2OjeIvtWoqvipwVuFDH7BEdx8qPn8sD8KvaKniGDX7y31DUIr7TUgQpK1uIpBMScqAvBXbgk9cke9AGde/8AJZNI/wCwLc/+jYq7OuMvf+SyaR/2Bbn/ANGxV2dABRWZqfiPRNGYJqWrWVo56JNMqt+ROas2Gp2GqQedp97b3cXQvBKHA/I0AWqKKKACiiigDndatvGEuoFtE1HR4LPYPku7WSR93c5VwMfhUup6n4ZunvNJ1S8093jj/wBItrh1yEI6kHtW7VSbS9PuLpbqawtZLhcYleFS4x05IzQBhfDzTZtJ8F2dnL5gRHlMCyZ3LCZGMYOf9kjjt0rkfh14A8L6r4B0m+vtJjmuZkdpJDI43Hew7NjtXq1cb8Kf+SY6H/1yf/0Y1ADv+FXeC/M3f2HFuxj/AF0nT/vqlf4XeC2QhtDiwRz++k/+Kre8mb/hIvO2t5H2bbu7bt1SavFLNpF3HCpaVomCgdSavl1SvuZc75ZO21/mc6Phf4MCgDQ4sAf89pP/AIqkHwu8FCQsNDj3EYP76T/4qupskdLG3SQEOsShgfXFUoILhfE13OyN9na3jVWzwWBOf6UKO+uwObXLpv8AhoYj/C7wWyFW0OPBHP76T/4qlHwv8GAYGhxf9/pP/iq6HV4pZtHvIoFLSvCwQL1JxVmAFbeJW4YIAfrilb3b3K5vf5bdNzy2P4feFf8AhaM1h/ZEf2X+yFm8vzXxv80rn72eldNJ8LfBToVfQ49p6/vpB/7NVe0R1+NeoMwO1tEjKn1/e10niOC4udAuobVWaZgu0KeT8wpxjeajfexM5uNOUrXtfTvb/Mxf+FYeDP8AoBxf9/ZP/iqaPhd4LDsw0OLJ6/vpP/iq7Cs60hmTWdQldWETiPyyehwOcUoq6epUpWaVt392jMB/hd4KdcNoceP+u0g/9mp3/CsPBn/QDi/7+yf/ABVbevwT3GlNHbKzSeYhwp5wGGa06GvdTuJSvNxttbX7zj1+F3gpWYjQ48scn99J/wDFVz3jv4e+FNP8I3Vza6RHFMjxbWErnGZFB6t6Gu+02CeLU9VklVhHJMrREngjYAcfjmsL4nKzeBLvaCSJ7cn6eclOUbStfsEJtxva2/5/qCfDHwaY1J0OLoP+Wsn/AMVQnwu8FKW26HHycn99J1/76rrYyNijIztHFefy+J9fsPEGqaXpHhW+1CVrvf8AaZnENuqFV6MfvdDwKSWjdxyk1JK3/ANN/hd4KYDdokXBBH76Qc/99VHD8PPAdzJLHBplrK8RAkWO5dihPYgNxWj4x0NvEWj22ns1zHG93E0zW0uxwgPzc+mKteHfCui+FLWS30ayW2WUhpGyWaQjoWJ5J5NDWiYKV5NWPNbnwM1z4hlstI8B2Ntp8M4El/fXshEy8ZMaK2enrxXXXPwn8EXKosuioFVg2FnkG72Pzciuk0qGaF74zKyh7l2TPdeMU3VoJ5p9OMKswjulaTB6Lg9arkXPy3I9o1T5+X5fMwo/hX4IiBEegQIDzhZJB/7NXK+A/AHhfUYvERutJjl+z67eW8WZHG2NWAVeG7V61XD/AAyBFp4nB6jxHe5/76FZmxYb4XeCmKltDj4OR++k6/8AfVO/4Vh4M/6AcX/f2T/4qtzVYJ5rjTWhVisd0Hkwei7WGT+JFaVU1ZJ3IjK8mrbficenwu8FIuF0OPGf+e0h/wDZqG+F3gourHQ49y5x++k/+Krd0CCe30oR3KssnmynDHnBdiP0xRfwTya1pMsasYonlMpB4AKEDP41XIudxvtfX+u5mqj9lGfLvbTtdr8jE/4Vh4M/6AcX/f2T/wCKpqfC7wUi4XQ48f8AXaQ/+zV2FZuhQT2+lJHcKyyB3JDdfvHFSl7rdzRytNRt31+48G8d/BmCb4gWFnoNxHaQ6ojuIpNzLCY1G7BySc9cetdPr/gTw/4J8L6TDBo9tqd9LcRWZa4llUzSOcbhtPGOT9BXY67/AMlQ8Kf9cbv/ANAFZXipJfEnxR0TQre4lhj0q1k1Od4gpIkb5IxhgRkc9ujVJZkN4Y8OaL4n0bQ9X8NWDR6pvS3ntLmY7XUZwys2cEd668/C7wUXVjoce4A4/fSf/FU/w34QitZbLWNTmurvVoYDFGbllxbg9QiqABn15PvWpqkktvqlvepFLNFa207SpCNzE4UqAO5ODitOX3mr9zH2j9nGVt7aetvyMo/C/wAGEEHQ4sf9dpP/AIqsjXfBHg7Q9BlvrTwnLqbxEIlvaSyO7knaB97169aqTjx34+RyofwtoRUkIRuvbgY6Hsmf0967LwdoNv4c8L2enwRPEQvmSiRyzGRuWJJ75qbaXNOZc3LY8w0v4Nya/qKalr9vFotoB8ml2ErM5X/ppISefpXSeLvhx4S07wNrtza6NHHNb6bcSRP5shKssTEHlvUCu2aCf/hKI7ja32cWTIWzxv3qQPrgGqXjv/knniX/ALBV1/6KaiStbUUJc19LWZgeH/ht4QuPDelzy6LG0klpE7t5snJKAk/eq/8A8Ku8FeZu/sOLdjH+uk6f99VseEwV8H6MG6/Yof8A0AVKsE48SvOVb7ObUKGzxu3U4xvfUUptW03Zhv8AC7wWyFW0OLBHP76T/wCKoHwv8GAADQ4sf9dpP/iq6LWIpZtGvIoFLSvCwQDqTjip7VWSzgVwQwjUEH1xSt7t7j5vf5bdNzlf+FXeCvMLf2HHuxj/AF0nT/vqh/hd4LdCraHHtI5/fSD/ANmreSCceJZZyrfZzaIgbPG4OxI/Iil16Ga40K9ht1ZpniIQL1JqlD3kr72IdR8kpcu19O9v8zCHww8GY/5AcX/f6T/4qs/4f6ZZ6P4l8YWNhAILaO7h2Rgk4zED35ru4gREgPUKM1yHhL/kdPGv/X5B/wCihWZsjsqKKKACiiigAqnALZNSvFjnDXLhJJYtwJQY2qcdgdp/I1crgvEWqadp/ia6339xp3nwQLPqNkIyYXRpWVJC6sBu6AEc9O4yAdnbQPBc3ruV2zzCRMHnHlovP4qatV5dFv1BGu9Vn1jU0hvglvbXGyKXDWqSBSIlQbi0nfoMdOTXS+F9DaO6g1ry5bFZ7JVNkl08qFmYtubd3A24Ix1brQBBe/8AJZNI/wCwLc/+jYq6fUre6urXyLW4+zFzh5l++q99vGM/XpXMXv8AyWTSP+wLc/8Ao2Kp9Uiv4fGianaT3EkVrZIs1kCSsiO77mVf742KeOoGKAIbXwB4GF9PCdIsr2+QB7h7v/SJSW/icvnk4qzF8P8AQNPuxfaJZrpF8vSWzyisPRkHysvsR+VXbO/0mbV5L21u7NkubWN/OjkXEgy2DnvxWvFcQTkiKaOQjrsYHFADofM8lPOCCXaN4QkrnvjPan0UUAFFMlkWGF5XztRSxwMnArn9D8baR4h1BrKxW9EyoZD51o8a4BA6sMZ5oAlsfFlnqHi298OxW90lzaW63EkksWxCGOAFzyfrjH1p2peI1tNVXSrKxn1HUPJNxJDCyr5UecAsWIGSeAOp9hzXN6b/AMl21z/sDQf+hmjwpub4r+N2mP7wC0WMH/nn5ZI/8eLUAdjo+r2mu6XFqFi5aGTIwwwysDhlYdiCCD9K5z4U/wDJMdD/AOuT/wDoxqzPhM0hXxaB/wAeo1+fyfY7Uz+HT9az/hzfeLovAGkpp+iabPaCN/Lllv2RmG9uq7Dj86APS/tq/wBp/Ydh3+V5u7tjOMU+9ulsrKa5ZSyxIWIHU4rkfO8bf2h9t/4R7SvM8rysf2o2MZz/AM8utOu7nxve2kttJ4e0oJKpViuptnB9P3VX7t126mX7zll31t+h18Eont4pgCBIgYA9sjNQR36SarNYBGDxRLIW7EEkY/SuahvfHMEEcK+HdJKxqFBOptnAGP8AnnUCP42j1OW/Hh7S/NljWNgdUbbgEkf8svehcut/kD9p7tvn93+Z2F7dLZWM906lliQuQOpwKljcSRo4GAwBrjry48b3tnNayeHtKCSoUYrqbZAPp+6qVL/xzHGqDw7pOFAAzqbf/G6WnL5le9z+VvxIbeYSfGe8jAIMWhoCfXM2f611Op36aXp015IjOsWMqvU5IH9a8yhuPFsfxVurhdE0030ukJuhOoNsCCXAYN5fXPbH410Oov421Owls5vD2lrHJjJTVGB4IPeL2px5edX20v8AqTP2ns5cvxa2/Q7eq0N6s19c2oQhoNuSehyM1zf9peOv+hc0j/wZt/8AG64/xD8RtV8G6rIt9pGnPqV2EK2UF+8kjDouFEXf3NKNrO5Uua65fn6Wf62PUtRv002zNw6M6hlXC9eTirdedajcePvEnhoxwaFp+ny3CK8byXrF4TwRuRo+o9DWd4W0P4jaDfXOoai0Ws3lwgRjcamViUA5G1BFwfxofLyruC5ud320t+N/0N7XviVb6TrNxoljomp6rq0RAFvaxfLyoIJc8Ac+9O+Jjvc/DW6LebbSTGAEAjfGWkT9Rmktm8aWt3d3Mfh3SjJdOHfOpnqAAMfuvasTx9d+L7jwhdJfaHpsMAkhYvFqDOwIkUjjyx3xQ+W+mwR5uXXfU6zwn4K07wr9ouLe4vLq9uwpuLm7naR5COnWtuyvkvZLtFRlNtMYWz3IAOR+dc4mpeOvLXHh3SMYH/MTb/43Ve0k8bWcly8fh7SybiUzPu1RuCQBx+66cULls77hLn5lbbqdXfXyWC25dGbzp0gGOxY4zVuuJvZPG18IBL4e0seTMky7dUbllORn910qz/aXjr/oXNI/8Gbf/G6Hy8qtuEefmd9uh0lnereG4CoV8mUxHPcjvTb2/SyktkZGY3EoiGOxPeuVtZvG1oZzH4e0o+dKZW3ao3BPp+66Ul3J42vHt3k8PaWDBKJV26o3JHr+66VXuc/kR+99n/e/4P8AkdtXEfDRt9v4ob18R3x/8eFWv7S8df8AQuaR/wCDNv8A43XJeAbzxdDB4hWy0TTZgdduzL5l+ybZNw3KPkOQPXjPpWZseoXl8lnLaoyMxuJhEpHY4Jyfyq1XFXUvja7ktnk8PaWDby+am3VG5OCOf3XTmrH9peOv+hc0j/wZt/8AG6p8tlbciPNzO+3Q6LTr9NSsxcIjIpd0w3X5WK/0ouL9La+s7VkYtdM4Ujou1d3P5VylhJ42061FvD4e0tkDs+X1RicsxY9IvU0TyeNri9tLp/D2lh7UsUA1RsHcu05/dehqvc5321t+hmva+zj/ADaX+9X/AAudtVXT75NRs1uURkViRhuvBxXOf2l46/6FzSP/AAZt/wDG6rWMvjbT7VbeLw9pbICSC+qMTyc/88qlcvK+5o+bnVttf0t+o7Xv+SoeFP8Arjd/+gCte18M6Tpuu3OtQif+0blMTO1w7GRV6AgnGB+leWa94i8bX3xO0zTrTw/Z2uq2kMohllmZ7dw6Akhtq52jsO9afh3wr460rV59a1W3ttY1aVWjE82qNGkaH+FY1jwP19sVJbNH/hJfGXjaZ7bw1px0PTVYpLqmoKC7EHB8pB1+p4+nSt7wx4asfB9+bdbi9vtR1QGW6vbmYs0pTHUdP4uKgsZvG2n2MNpF4e0po4l2qX1Rsn6/uqJZfG0t/b3jeHtLEkCuqgao2CGxnP7r2FX7nM+2v/AMv3nIu+l/wv8AqdlLIIYXkIyEUsQPaorG7W+sILtFKrNGHCnqARmuYlvvHMsTxt4d0kB1KnGpt3/7Z1HZ3HjexsoLWLw9pRjhQIpbU2yQBjn91S93l8yvf5/K34nUG/Qasun7G3tAZ93bAYLj9ayvHf8AyTzxL/2Crr/0U1ZJk8bHVF1D/hHtL81YTDj+1G27SwP/ADy68VzXjrxpq9t4W1rT9Tg8OWzz2U8JjGsbpvmQr8sewFjz0oly6WCHPrzd9PQ9E8LOH8I6MwGM2MP/AKAKuC/Q6q1hsbeIvN3dsZxivDtJ+Nl3Y6Tp+mabocGqTQ28cYjtZ5Wc4UDkeV/LNdBpvjHx9qWpfb4vhvPC7xCI/arzyVAznOGQNTXLrcUufTl+Z6re3S2VjPdOpZYULkDqcCpIZBNBHKBgOoYA+4rzHV4/i5rNjLbxW/h7T4plKsFdpJACPU8fpXOnwL8Vb3Catr8s8AAHlWmoi2GPTiIj07UtOXzHaXP5fqew3GuWNnqMlndTxQFIBMZJZAowSRjn6Vgat8U/BukRSF9dtZ5lGRDbMZWJ9PlBx+NcNZ/C65t7jz7nwhYajJtAzfa3LKOvXHl4rohoWtxafLZWvgjw7aRSrtJt73aQPb91T9267CfPyvvrb9BT8XIrz5dC8J+ItUbsy2vlx/8AfROf0p/w1vr7Utd8XXeo6a+m3Ul3CWtXkDmP90MZI9q1kv8AxyiKg8OaRhRgf8TNv/jdUPAEl9L4m8YPqVvDb3Zu4d8UMpkVf3Q6MQM/lUGh3tFFFABRRRQAVwWsaBo9vd6jbyILeyuEt5r140LSSsZZSDkAknft+gBrva56HxD4efxNd2yapF/aKRiKWFjgKEJPUjH/AC09aAONsxBNrlxqyamsF4NRWEzSFlhkAs4+qNjqQeeDz1rtfCdyBoVlZXF3ZSX8UX7yO2uBKBg9j1I5HaotZ17wwlm0161tfxxTrE6Qw/amjcnbyihiOmOnbFR+HtW8KajqcsGjW8UN/DEJGVtOe2k8snGRvRSRkY4oAp3v/JZNI/7Atz/6NireUK3ie7RgCGsYsqR1G+TP86wb3/ksmkf9gW5/9GxVu6hrKabq1rb3EPl200Mkj3ruqxx7MfKec5Oc+nFAFBfCfhv+2ZE/4R/Stv2dTj7HHjO5vapofCGkWniC01Sy0+0s2t4ZExbRCLcWK9doGRgHr603UPFGg6bm++1/apGaK3MdkDcP8z4X5EycZPXHsMnAp9p4w0q71G3sNmoW9xcZEK3mnT24kIGSA0iAE45xmgDeooooAKKKKAObtvCklv43uvE39pM0lzbrbPb+SAuxTkYOc596nvfDhk11tZ0+9ayvZYPs858sOsqA5UkHHzKScH3Nbm5d23cN2M4zzihnVBlmCj1JxQBnaFolr4f0qPT7TcUVmd3c5aR2OWZj6kmuf+FP/JMdD/65P/6MauxVlcZVgR6g1x3wp/5Jjof/AFyf/wBGNQB0O+f/AISLZl/I+zZx/Du3fzxUmrtKmj3bQFhKImK7eufapvtcX237Jk+d5fmYxxjOKdc3EdpbSXEpIjjUsxAzxWl3zR07fMw5VyTXN3+X/DDbIubC3Mmd5iXdnrnHNUYHuD4mu0YyfZxbRlQfu7snOPfpWlFIs0KSp911DD6GqdzrWnWc80V3dxW/kxiWR5mCIFOedx47UJv3tP8AgDlFWh72z+/RjtYaVNGvGgLCUQsU2dc44xVmAsbeItndsGc+uKoR67Y3egSaxp1xHd2ojd0kjOVfbkdfqKwfDp8dX2qR3+uvpljpxU4sLcGSRs9C0h6Y9qm/u2sUkvaN36bfeYupeI9M8N/F3ULzWr6O0tv7FjWNpD94+ZnCjuevSuo1jVZNT8CTanoMjNJPAslqxRgSSRjI6j3rFlstO1P40SC7tILl7TRVZPOjDeWxmPK56HB612l5dwabZPcz5WGMDO0Zxk46fjVRb507diaiXspJuy117f8ADHM+GND8VwaidT8S+IkupGjKCwtIQkEeSDnJ5Y8egrXtLZG8S6hcyW6mRUjSOVkG4LjkBvTNbFQR3cUt1NboT5kON4x6jIqYvR6f1cqaTcbu2v36P/hyl4ge4j0pmti4l8xPudcbhmtSq95eQ2FuZ5yQgIXgZ5JwKsU23yJW7/oEUvaN36LT7/z/AEMzTXnbU9VEpfy1mURbumNgzj8c1hfE4sPAl1tznz7fOPTzkzXUQXkNxPcQxkl7dgkmR0JAP8jXNfEpwnga8Ld5YB+JlWnJvm27fkTTSUGk77/m/wAtjq4/9Wn0FZukPcPcaoJy5VbsiPd/d2r09s5rSj/1afQVDbXkN29wkRJMEhifIxhsA/1FKLfK9CppOcXf/g6FPWnnRLH7OXBN7EH2f3M859q1Kr3V5DZiIzEjzZViXAz8zHAqxQ2+VKwRS55O/bTscza+JtPs7/UbO+vStxHcEiMozFUP3eg6dajl8VaZqmrWdhpWorNcxXCm4hjDbkQj+IY4HTrVfxT4r0/wtpN9fWkZm1S6uBbW9uBlp58AAAeg6n/69N8F+H4/CGmrNqkpn1zV5/MvbkjJaVuQoPZV6D8apN897fL5GbjH2VubTv8AP+kdpXD/AAyybTxNnr/wkV7n/voV3FcR8NWDW/ihh0PiO+P/AI8KyN+p0uqvOtxpghLhWugJNv8Ad2t19s4rSqC4u4rV4ElJBnk8tMDOWwT/AENRarqdpoulXWpX0oitbaMyyOewA/U+1XJ+6tCIJKUnf/gaFfQHuJNKDXJcy+bKPn643tj9MUag8661pKxlxCzy+bjpjYcZ/GvL/wDho3w15Vyf7N1EOg/cqQv736nPy/rXMXXxATxjOn9v6xfQ2Jbcmi6DBI0kncCSXADeuASOPWn7T33K29/xJVK1OML7W19GvzPYfF3iu+0OS3sNH0K61XVbtSYUUbYUAOCXft9P5Vz/AIV8Ha1qs1pr3i/Wrua6glMkGnwsY4IGBPJ7ufc/rT4PHnifUIlj0L4faqUVQqy6lKtuMY6/Pye3rmks7n4n6/bieGTQNIgckD5XuJFwcew7e9SvhZbtzrXv+hq67/yVDwp/1xu//QBXU31/aWMDPdXUNuNpIMsgT+deP6x4M1698daBZ674y1C4kuYrjEtmi2xiCqMhdgHXoa6q2+Dfgy2YzXdndajKOTJe3ckhP1AIB/EVJbHWXxQ8J6fotoNQ8QW73XljeiEyOT9ADVC5+KSXmq2r6F4f8QalEqSBljtDGjk4wctj0Pauz0PRfD1vZRXGkaPY2sUi5Uw2qRkj3wM9q0nuoYbuC0ORJMrMgA4wuM/zFaNvnbt3MEoqlFc2mmvfa33nnk/iL4nanBIbDwfYaXGVPz3175jDjsFAOfwpumeHPiJq2m20mpeNYtPVo1PlWVkGfp0LsRz+Br0uR1ijaRvuqCx+gqO1uY7y0iuYSTHKgdSRjg1OvKaac+/Q81Pwvt7rXktNZ1vXtVtmtWlbz7tlQvuAxhcDoTxU/iT4ceEND8B+IJ7HQrVJ4tMuXSV13srCJiCCc4I9a9BN5CNQFjk+eYjKBjjaCB1+prH8d/8AJPPEv/YKuv8A0U1EumlhQ6631+7yJPB0McPg3RxHGse6ziYhVAydg5qwr3H/AAkzoS/2f7KCB/Du3fzpvhdg/hLRmHQ2MP8A6AKvC8hN+bLJ84R+YRjjbnHWnFvXQU0mo3dtfvItYaVNGvGgLCUQsU29c44xU9qWNnAXzuMa5z1zilubiO0tZbiUkRxKXYgZ4FPjkWWJJF+64DD6Gi75LWHZe0vfpt+pno8//CSyoS/2cWiED+HdvbP44xS6886aDetbFxMIiUKfez7VaF3Eb9rME+csYlIxxtJI6/UGi8u4rGzlupyRFEu5iBk4qk3zxdu3z/4czcV7Oa5u+vb/AIYkiyYkz12jNch4S/5HTxr/ANfkH/ooV2KsGUMOhGRXHeEv+R08a/8AX5B/6KFZG62OyooooGFFFFABXBeIUkYagYYzJNHHcyRoDjcyvbEDP1Fd7XBXsniFNcuvL8J3txaHz0WaO7tlLhzEQQrSAj/Vnr6igDCkm1iK5Bt/CsNtLLcnLw3cQYt9qOOdvUHjnNdz4Rt7c6RDeiN/tbIYJnlk8xxsd/lLd8EtXNXlpeuvmR6J4psZWmEhmWW1uQh37+F85jjdzwK3/CVsY1mePWp7yLndbTWiwNE5OSSoUMCeetAFO9/5LJpH/YFuf/RsVVPFus3/APakLWdlIsOnO8kjzopjvFCjfEgznPYHGM8Vbvf+SyaR/wBgW5/9GxVq6/by3N9p8cCxNN+9aMTZ2bgoILY5xnFAHCJqjrbQyXvkx32py2M8Jjt9sMA+0owiZwOqjruwSVNdv4Y09FsvPnu5766iurlDPOxJ3CQo20dFHyYAH9TWPqGia0ttqDyaXa3qzz2swtbSUfPtnEkmfN2qMgE9eSTV3wy95prf2evhbVbO1mnkmaa5u7eVYyxLEYWUtjPoO9AHW0UUUAFFMljEsTxlmUOpXcpwRnuD2NYOi+EoNDv2u49X1y7ZkKeXfahJPGMkHIVjjPHX60Ac5o0KwfHLXY0Zyp0iF8M5bBL84z06Uz4itfNqVs134Yu9Y8P20Rkl+y3GxlkJ+/sHLYUEYyPvGrOnw3SfGbVdQaxvFsZ9Nito7g27hDIrZIzj079Pet288TTWmrz6c3h/V5wqKYriCAPFKT/DuzhSP9rAoAl8IPo0vhaxm8PrjTJVLxDJJGSdwOecg5B+lcD8PPiDoGk+AtKsLuS6E8KOrhLWRhnex4IGD1rvvCWiNoHh6KycKshklndEPyo0js5Uew3Y/CvOvhf4o1+bw/oekab4WuHsIMrdalcSLHHt3sSYx/F1/wDrUAdEfiN4XGq/bzdXv+p8rZ9hl9c5zikuvih4S1XSp4re9unSZGQSR2cjD+VaPinw5beLtXg0vUbm7Wwjh854IJjGsxzjD46itKPSrDwn4XnttEtY7SGCNnRE5+b1OeprW0uaPfSxz3p8k9NNb/qeaaP8Yr661q0gl0g6doduNkz3EMrzzAKQCoVcLzg456davazrHw98Ra5HqWsJd3gijCRQyWU21TnkkYw34jivU7ORpbG3kc5Z41Yn3IqlDeTP4kurNm/cx28bquOhJOf5Ukpe9+P3jk4JQuuun3P9DkZfHvg8aNLplobm1geMxqsenSBUyPQKKuRfFDwxHEiedenaoGfsMv8A8TXVatPJa6ReXERxJHCzKfQgVYgYvbxs3VlBP5UteTyuWnH2jXWy+7U8kt/Hvh+L4qXeq+ddm3m0lIh/okmQwk9MZxjvW9q/xD8L6ppc9l9qvYvNA+f7BK2MEHpgelWbWV3+NeoIx+VNEjC/jLmul8Q3k1hoV1c27bZUC7TjPVgP61UFL2kUt9LfoZ1XTVGbkvds7/jc57/haXhj/nre/wDgFL/8TVSD4i+GINQurr7Tenz9vy/YJfl2jHXHNd/WfaXUsusX9u7ZjiEewY6ZGTUxvZ2/rVGlRx5o83fT7n+lzj9U+IfhfUrE232q9jyytu+wSnoc+lXP+Fp+GP8Ante/+AUv/wATXQ69dzWWltNA21w6DOM8FgDWnQ+bkXbX9BRcfaySWtlf8bfqef2fxE8MWl5fXH2q9b7VIH2/YJRtwoXHTnpWN49+IPh7VvCNzaW8135plhcbrSRR8siseSPavRtPvJZtR1WOVx5dvMqp2wCgJ/U1ynxR17S4PBl1AdStBM0sP7vzVLECVM8Z9Kc1Lm130/IVJwcHyrS7/N3/ABLKfFLwwI1Hm3vQf8uUv/xNVLD4h+GLKW9f7Vev9pnM2PsEo25AGOnPSnzfF/wfCgS1vLnUpQMeXY2skpP44C/rWVZfEjxRqkt2ui+BdTu188iN7yRLYRjAwpzkZ69+4pRvZ2Kko80brX/gGlqPxE8MX62w+1XqeRcJP/x4SndtOcdKuf8AC0/DH/Pa9/8AAKX/AOJrEvrz4qTpbPL/AGDo0c86QhVLTyAscc/w/r2q9/wgPiW+/wCQv8QNWYf3LBFth+a8/rQ+blV9gjyc8rb6XPO28XadY/EG78T6ogubaORhpkUvmRLBu6ucocuQPw5rbb4w6Lq+u2Et7fW9hp9mxlKxl5nmfoAflUKBz61t6L8JfCdzcXk2p21xqc0Vw0YkvLl3JAx15rpW0DRfDdxpv9j6Pp9m0tysbvFbIHI5/ixn9atKftLX1/4Bk5U/Y3t7v/B/zOav/jhokCbrHR9avwR8pjtCqn8W7V514b+Kmu6emrwaTokEYutUuLszXqyuIzIwOwqgHIxzz3r6RlkWGF5XyERSzYBJwPYV4h4M1Lxf4h/t218LRw2Gm3Os3VxJrF0uWUOwO1Iz/EBg8+vasTo6mbe+Ktf1aNJ9W8aGyWFvNSHTNFkZg2COGYA55I6muQaK58WahKmreIdfs9NHBN9FJPJMex2IAqjp1Jx719EaZpM3hOz0+yXU7y/kur7NxcXb72cshJx6DKjiuommjt4JJpWCxxqWZj2A5NVJNJNkRlFyklut/uPlfwV4U0HR/FEWo67qX2qztmLRwR6fM3mntuBXAHfHNeyHxv4OS+sbi1M9stqzny4tNkUPuUr2UYxnNSeDJNQ8dWU2t6tdyHSZJpI7GziYxiSNWI8yQqQWJOQF6YGec1Wsr+40P4yx+GLK4lOk3NkbprZ3LiFwD93OSoPXHSnG6k7Pv+Qp8soJyXVfmrfibH/C0vC//PW9/wDAKX/4mqmmfETwvp1itt9qvZNrMd32CUdTn0967+s7Q7qW90tJ523SFmBOMdGIoV+R9tP1CTj7SKe9n+l/0PM9X+IWgT/EDw7fJJdeRbxXIkJtJAcsoAwMZNdQ/wAUfDDIy+dejIx/x5S//E07Xf8AkqHhT/rjd/8AoArsZCVjYjqATUI0exwemfEbwvp2mwWf2m9k8pdu/wCwSjP4YpJviJ4Xm1S1vftV6PISRNn2CX5t2O+OMYrr9DuZbzRLS5nbdLJGGY4xk0lzdSx69YWytiKWKVnGOpXbj+Zra0/aSV9db/jc506fsYO3u+7b71b9DmZvid4Ymgki8+9G9SufsMvGR9Kh074keGLDTra0+03r+TGse77DKM4GM4xXcXLtHaTOpwyoxH1xVfR7iS70WyuJm3SSwo7HHUkVHvcnlc0bj7VLrb8NDjD8Q/DB1pdR+1Xvy25g8v7BL3YNnOPaqXi/4keHL7wVr1nBLdmafTriJA1nIo3NGwGSRgcmu7a7mHiaOz3fuDZtKVx/EHUZ/ImqPjv/AJJ54l/7BV1/6KaifNpfsFJxbly99fU5nw78SfDdl4Z0u1kmvPMitIkbFnIRkKM9qmHxD8LjWG1D7Ve/NCItn2CX1znOK6jwmxfwfozHr9ih/wDQBUq3cx8SPabv3IthIFx/FuxTipa2FUcLR5l1Vjlr/wCJHhe+0+4tftF6nnRlN32GU4yMZxipYPid4Yht44vPvTsULn7DLzgfSuq1eeS10e8uIjiSOFmU+hAqxau0lpDIxyzRqT9SKXvcnlcacfatdbfgcKvxE8LrrD6h9qvfmgWHZ9gl4wxOc496NT+IvhfUdMuLP7Tex+chTf8AYJTj8MV1yXUp8Ry2hb9ytokgXH8Rdgf0ApdcupbLQ7y5gbbLHEWU4zg1aU+eOuulv0M26fsptrTW/wCpzSfFHwwiKvnXpwMf8eUv/wATVX4e6pa6z4j8YX9mXMEt3DtLoUPEQHQ813sRLRIx6lQTXHeEv+R08a/9fkH/AKKFYs6FsdnRRRQMKKKKACs3xBqg0bw/fah/FBCzIOu5+ijHfJwMVpVx32pNY8UHS9fha18iQyWNo/Md2F6SbujEddn8PXnggA1YvElvbWNnJqjLbvJZfappv+WMYAG75+nU1Ztbx5/EF9bG3jWOG3gkinVsmUOZM59ACn61zNvLqqWul2UXhu2ms0t2jjV7xQsibQOVKHHHbmrXhGIw63qkQso7KJba2CQxXfnoo3z5AOBtGf4e1AEd7/yWTSP+wLc/+jYqt3114ml8UXVnpZ0kW0FrBKv2pJC+XaUHlT/0zqpe/wDJZNI/7Atz/wCjYqh17xSnhzXNWnkhtmvDBaRwRvcMvmxb5PmJ2kKQXf16D8ADotCudWuI7tNWFkJ4ZvLU2u7aRtByd3Peq4k1W28XW8M+oJNZXVvIRbi3CeW6EfMGyScg4IJxxXAPrD3l1fXNvpVxKwR7uf7NrzqqgYHTywAemB7V1fhWwu11u6lvdJkt2tlMKzSaq10csFYgKVGMgjnPagDs6KKKACiiorqY29pNOsbymNGcRoPmbAzge5oAlorzm98R+NPDeq6Xca7BpU2lajdJatFab/MtXc4Xk8MM4ya3LnXb7UvFl14f0eWC3axtlnuriaIyfM5OyMLkdgST9BjnNAHVVxvwp/5Jjof/AFyf/wBGNWp4R8Rr4m0Z7loxFdW872t1EpyElQ8gexBBHsRWX8Kf+SY6H/1yf/0Y1AHW+bD9q8ncvn7N23vtzSzyRRQPJMyrEoyxboBVX7HJ/bf23cvl+R5WO+d2ak1O2e80y5toyoeWMqC3QE1do3WplzT5ZO2utvMsRsjxq0ZBQgFSOmKjWa3a7eFWT7QqhmUfeCnp/WsmXxHoeiWcUWoazYQPFGqMGnXOQMdOvauQb4oeFIPEV1dWt/LqJkgSJYrC3klbIJPYY7+tCUddQcp+7Zb7+Wh6PPJFFBJJOyrEqkuW6Ad809SGUFcFSMjHpXmmo+O9d12wntND8B6xKs8ZQTXrLbKMjrj5s9uOPwp8X/C2tRREEfh7RYgAMsWnkA/DKk/l1pacvmV73Ntoa8Lo3xkuVUjcuhpux2/fGupvryzsrSSe+miit0xveUgKOe+fevHoPA+u33xMubXWvGF6076Uszz6egt2ZfM2+X34Byc/yror34M+HZ7KQkXV9fHG2bULt5OcjOfw46UJJySFJtQbtd6m3qXxP8FaUWW48R2LuvVLd/OOfT5M1ix/F3TtQkYeH/D2u6u/GXt7MhPbLHoPrXW6d4R8O6UB9h0SwgI6MsC7h+JGauW1lJDql7csV2ThNoHUYGDmhJWd2OTaasv6scNc+KPH91AXh8IWGnQkjEmqXoOM9Mqn4d6e+gfEzVT/AKb4vsNLibrHp1kGIHsz5P612ms2Mmo6c1vEyK5dWy5OOCDWhQ0uVPqJOXO01pp+p5nB8KNO1CeX+2PFOvavNGwEqPeFEzjOCAM9/XvUHjL4e+ENA8HXdxY6HaxziSELNJulcZkUcM5J74616HY2Mlrf6jO7KVuZVdAOoAUDn8qwPibGZPAt2BjiaBufaZDTkleyYQlJxu1rr+eh01nZ2trCgt7aGEBQMRoF7e1PgmglaYQsjNG+2Tb2bA4PvjFSR/6tPoKo6bYyWc2oPIyEXFyZk2noCqjn34pJKzuOTkpRSWnUtXE0EIjM7IoeRUTd3Y9APepqz9VsZL5bQRso8m6jmbd3VTkge9c74o8dtpOpHQ9F0m61bXWQOIEUrFGrdGdzwB16enahpcqaCLlztNaHWwywymTyWU7HKvt7N3zXn2s/EDUL/VpdE8JaQbm8hnNvLfXyGO3gl9OeWb2FWfCPhHxFDq7a/wCJtaZrt2d106yYrbR7hzu/vH+WO9dbqNg93LYtEUUQXAlfPGRznHvzTSi5WvoTJzULpa/8ExfCPhbUdElutQ1nXrrVdSvAomLHbCgGcBEHTqapfDTb9n8Ubcbf+EjvsY9Nwrt64f4ZqVtfE6nqPEd8P/HhUGp2c00ETRCZlDO+2Pd3bB6e+Aaz/E+nz6t4U1fTrZgs91ZywxknGGZCB+pqbUbKS7nsHjZQLe4Erbu42sOPfmrdxG81vJHHM8LspAkQAlfcZBH51TSsrERcnJprQ4HwR4q0jTfAun2Db11GxgEEumxRlrjzFyCAg5IJB+bp71Z8I6LcW+vX/iTX1SDWNYbZBalgxt4UGRHkfxY5bFVdJ8A+I9Ejcab4ykgMszSzLPYx3Ack9c/Kc4x64rpotDuo9Q0+7nv3u5YGczSSgLnKFQFVRgDJ/wDrmmlHmab01Jcp8iaWun5q/wBxu1FbTQTwh7dlaMkgFeme9S1Q0eyk0/Tkt5WVnVmOV6ckmkkuVvqU3LnSS01/Q5vXf+SoeFP+uN3/AOgCuyJABJ6d643Xf+SoeFP+uN3/AOgCuxdS0bKOpBFSWxltLDPbpLbsrQsMoV6Ee1DzQLcxROyiZwxQHqQMZx+Yqvo9nJp+kW1pKys8SbWK9D9KbcWUkus2V4rKI4I5FYHqS23GPyrS0edq+mv/AADHmn7OLtrpdfdf7i67KqMzkBQMkn0psEkU1vHJAytEygoV6EdsUXEZltpY1IBdCoz7ioNKtXsdJtLWQqXhiVGK9CQMcVNly36l3lz2tpYlM0H2wQbk+0GMuF/i25xn6ZxWL47/AOSeeJf+wVdf+imrQNjIfEKahuTyltWh25O7cXDZ+nFZ/jv/AJJ54l/7BV1/6KaiSStYIOTvzK2pa8LkHwnoxXGPsMPT/cFaAmg+1mEMn2gJuK99uf5VneFEKeENGU9RZQ9P9wVOtjINee/3J5RtxFjnOc5/KnFLW7FJyVrLqXJ5IooJJJ2VYlUly3QDvmnIysishBUgEEelVtTtnvdLurWMqHliZFLdASO9TW8ZhtoomIJRApx7ClZct+o7y57W0sAlgN20IZftAQMV77ckA/TOaLmWGC2kluGVYVGXLdAPeqy2Ug16S+3L5TWywgd8hmP5c0axZyaho91aRMqyTRlVLdAfeqSjzJX00Icp8knbVXt59vvLoIKgjoelcd4S/wCR08a/9fkH/ooV2EalI1U9QAK4/wAJf8jp41/6/IP/AEUKzNkdlRRRQAUUUUAFUNX0m11my+zXIIZWEkUq8PE46Op7Ef8A1u9X6zdY02e/gSSyvDZ30JLQTbdy89VZf4lOBkfQjBFAFGy025uNOgsrxpI2tVe2mkQlTICBhkYdMj05ByM5Gak0nRrbRtYu0sLCK0sTaW6p5SBVLB5i3A74ZSSeua5dvFnjm1v5tNPhrSNTu4AGkNnqojKqRwTGyllz71r6bb+LNalSTxALLTLFTu+w2bGSSU9g8h4C+ygE+uOKAIb3/ksmkf8AYFuf/RsVP8SeFn1q/uplllhleO3jgP26aFGKMzNlY3GTgjBIz6dKZe/8lj0j/sC3P/o2Kup1Cwi1G0a3laSPPKyRNteNuzKexFAHHt4Z8UCyuLOPU7Q288TRsk7yzYyMZDMd2fqTXQaVb63Bf3Ml+2ntBO/mHyA4ZWCKoHPGPl/WuOvNW8e6TriaHZ6p4b1e5dDJFHdI8FyyDuwVtvT0Faum6b4x1p8+JtT023slOHstJRgZcfwvIzEgeoXGaAO1R1kRXRgysMgg5BFLTURY41RFCooAVQMAD0p1ADJS6wu0ah5ApKqTjJ7DNYGi6l4nub501nQrWwtBGWE0d4JTuyMDGPTPPtXRVDeWkN/Zy2lym+GZSjrkjIPUcUAcvcTWfiPU7e8nnhj0bS5jMjyOALiZRjd7IvPPc+wBOf4Ziaz+K/jKOYYa6S2uYif4o9mw4+hH61pw/DTwfbyxSRaJAGiYOnzMQCDkcZrb1DQ9O1OeOe6tw00alFkVijbT1XIIOD6UAcb8KLaUW3iXUWBEF9rc8kHoyDC7h9SCP+A15b4V8EX+u+G7Oa08C2UokDf8TK81aWNZfmPzCON8jHTp2r6PtbWCytY7a2iSKCNdqIgwFFcl8Kf+SY6H/wBcn/8ARjUAeWj4IX1/qos7u80/Tf3Xm4sfPk4zjGZHP8q3z8B/D2labPdXWo6leyQxlwpl8tSR645/WvYPLg+1eZtTz9m3P8W3P8qWdIpIHScKYmGGDdCPervG60MmpuMlfXW3kcBafBvwBPZW8smgB3eNWJN3Pkkj/fqtB8J/AZ1+5sR4dRUigSQMLucHJJH9/wBq9KjVFjVYwAgACgdMdqjWK3F28qqn2hlAZh94r2z7daE466A4y92z9fPQ4HU/hP4GstLurlNCJeKJnAN7cYJA/wCulWIfhB4Ekhjc6GcsoJ/0249P9+u4nSKSCRJwpiZSHDdCO+aeoAUBcbQOMelK65bdSrPnvfSx43b/AA18IS/FO90dtHP2GHSknWP7VN98yYJzvz04xnFbmufCzwPpmj3F5FoO54wuA17cY5YD/np71rwqg+MlyVA3HQ03Y6/649a6y6it57Z47pUaE43B+nXv+NOLipptaaEzjN05JOz1s+3b7jjP+FO+A/8AoBt/4G3H/wAXVG2+FPgebVL21bQsJAE2kXtxk5Gf+elej1EkcCzyuioJWx5hHU+maUWrO5Uk21Z9f0Z53rPwr8D6dpzXEWg7mDquGvbjHJA/56Vof8Kd8B/9ANv/AANuP/i67O5it5oSlyqNHkHD9M9qmobXKlbUEpc7bemn6nm1j8K/A91f6jA+g4W2lVFIvbjkFQef3nvWV49+GPg7R/CVxe2OjmO4WWFVY3czYDSKp4LkdCa9YiigSWZolQSOwMpXqTjjP4Vx/wAV762sPAF3Jck4aaFUUKSWYOGAHv8AKacmr3SFBSUbN3ev56ESfB7wIUUnQ2yQP+X24/8Ai64zW9A+HPh5p4Ljwxd3d89y0FlZ2lxcs821VJ534H3h/hXQbvHPj0IsQk8KaCQMuw3Xk6/T+DP+c9K9BsNPtLOJUixLJHw0z4MjNgAliB94gDNJNWd0OSk5Raeh4TD8I5Lu8stT1bT49FsprqKJdLtrqSSQqx/5aSMxwcf3a27bwp4Cfxx/wi934MuLO9aIzJLLqMuyVB3Qh/m+nsa9iuIreUR/aFRgsism/s46Ee9cN8TtMk1W309NH3DxPbSG50948bkC437s8bTwOepIobXKrBFS5m29DA0rwF4O1LxHqOlL4RkMVlLte7GozCMZ6Ljfkt3xWrqXwr8D2ctiiaDkT3AibN7ccA/9tK2fhpqmn6r4Qhms4nhuVcrfxytmUXI++XJ5JJ5/wrqp4reRojOqEo4aPd2b296acea7WhMoz5LJ69/mcZ/wp3wH/wBANv8AwNuP/i65PwH8NPCGr2+vPe6SZDb63dW0WLqZdsaMAq8OM49TzXstcR8NQBB4oA6f8JJfY/77FQamdqPwq8D2k9giaDkXFwImze3HA2seP3ntV/8A4U74D/6Abf8Agbcf/F12k0UEjRGZULI+6Pd2bB6e+M1LVNqysRFSUm29DzbRvhX4H1HThcS6DtYySJhb24xhXIH/AC09qLz4V+B7fVdNtV0HKXTSByb24yNqFhj957V6HbRQQw7LZUWPcThOmScn9c0SxW7zwvKqGVCfKLdQSMHH4VV487dtNf8AgGajP2UVza6XffVX+84z/hTvgP8A6Abf+Btx/wDF1Q0f4VeB9Q05LiTQdrFmGFvbjHBI/wCelekVFbRQQwhLZUWME4CdM96lNcrXU0alzp301/Q8j1f4Y+D7fx94e06LSStrdRXDTR/apjuKqCvJfI/A10z/AAf8CLGzDQzkAn/j9uP/AIurGu/8lQ8Kf9cbv/0AV2RAIIPTvUls850j4U+BtQ0m2u5NC2vKm4hb24wP/IlJcfCrwPFrNlZjQfknjkZib24yNu3H/LT3r0O3jhit0jt1RYVGECdAPah4oGuYpHVDOoYRk/eAOM4/StLx527aamPLP2cVfXS7+6/3nDXHwh8CRW0sg0M5RCwze3HYf79QaX8J/A19pVpdSaFh5oldgL24wCRn/npXobhWRg4BUjBz0xTYI4oreOOAKsKqAgToB2xU3XLa2pdpc976WPOj8K/A48QJYf2D+7a1abP224zkOB/z096reLvhT4L07wXrt9a6OY7m20+4mif7XOdrrGxBwXweQOtemGK3+2CUqn2gRlQ38WzOSPpnFYvjv/knniX/ALBV1/6KaiTTtYIKSvd31OT8O/CjwTfeGtLu7jRS001rFI7fbJxlioJOA9PX4V+Bzrz2P9g/uxbiXP224znOP+eldn4XAHhPRwuMfYYen+4K0BFb/azKFT7QU2lv4tuf5U4ta3QpKTtZ9TgdT+E/gay0u6uU0Il4omcA3txgkD/rpU1v8IfAk1tFI2hkF0DHF7cdx/v13U6RSQSJOFMTKQ4boR3zTkCqiqgAQABcdMUrrlt1HaXPe+ljzlfhV4HOuyWP9g/u1tlmB+23GclmH/PT2pdY+FPgfT9IuruPQtzwxlgGvbjB/wDIlehCKD7W0oVPtBQKW/i25OPwzmi5jhmt5I7lUaFhhw/Qj3qrx5k7aaEOM+SSvrrZ9u33HEx/B/wI8asdDOSAf+P24/8Ai6i+Hej2Og+IfF+nabB5FpDdw7I97PjMQPViT+td+AAoA6dq47wl/wAjp41/6/IP/RQrM2R2VFFFABRRRQAUUUUAcReanY+DNfurvVNMYWt0S8Wq29qZCuTlopdoLcNkg4xg44xV3wXrKa22r3FlHKNJF0BZySxsm/KgybQ3O3dnB9zXUkBgQwBB6g0KqqoVQAB0AFAHG3v/ACWTSP8AsC3P/o2KuzrAuNDuJfHtjrokQW9vp81qyH7xZ3RgfphTW/QBy+vXd/oGpjV4tJm1SxdQkyWygz25H8aqcblI4IBz0PNVfDGty6/4o1C9s9MvrPS/s0aO93D5RmnDHlVPXCYBPsB2FdlRQAUUUUAFIzKilmICgZJPYUjusaM7sFRQSzMcAD1NZFtr3hzxD52nWes6bfvJEwkgtrxHfZ0JwrZA56+9AFKy+IPhjUNYTSrfUwbuQkRB4nRZf9xiArfgTWnrfiHSvDtvFPqt2tvHK+xCVLFjjPQAmuc8Y6TBreqeHtIto0Fxa3kd87IAPs8MZ/TcflA78+ho8W6D4puNZi1rw9qdmrW1uYxY3duHSXJyw3dVJwORjpQB1OlarZ61p8d9p8vm20hIR9pXODg8EDuK5r4U/wDJMdD/AOuT/wDoxq1vB+ujxH4ZtdSNr9llYvHNb/8APORGKsPzBrgfh5feNovAWlJpuh6RPZhH8qWa/dHYb26qEOOc96APSfss3/CQ/atv7n7N5e7I+9uzjFS6tBJdaRdwQrukkiKqM4ya5D+3vH/2/wCx/wDCOaJ5vl+Z/wAhJ8Yzj/nnTrrW/iBZ2stxL4c0Ty41LNjU3JwP+2dac0uaLtrpYw5Yck1fR3v+p2VnG0VjbxuMOkaqw9CBVKCznTxLdXjJiCS3jRWyOSCcjHXvXOw6v8QpoY5U8OaHtdQwzqb9CM/886hTxB4+fUZbEeHNF86ONZG/4mT4wSQP+WftQnL3rL1HKMGoXez0+5nX6vBJdaPeW8K7pJIWVRnGSRVmBSlvGrDBVQD+VcVda38QLO0luZfDmieXEhdsam5OB/2zqRNV+IckauPDmh4YAj/iZv8A/G6V3y26FJR9o3fW3+Yy1idPjXqDsMK+iRlTnriXFdJ4is57/Qbq2tk3zOF2rkDOGB6n6V5tDqnjV/ilc7dC0n+0I9JRXiN+/l+WZchg2zOcnGMV0N/4g8fabZSXc/hzRfKjxu26k5PJA/55+9OEpKaaWuhFSMHSlGT913v+NzvKzrS1mi1i/uHXEcoj2HI5wMGud/tL4if9C5of/gzf/wCN1XTX/H0lzcQDw7oge3ALk6m+ORn/AJ51MW0nb+tS5qLcbvrp9z/Q6jXrSa90tobdN8hdDjIHAYE9at399baZYT315KIbaBDJJI3RVHU147H8WvGGry3drovhqxmEDeU2oLcO9vG5OOpVc/QVtaBafFLTLe8TVrfStZkupN7G4viioMY2qoiwB7U23yJdNf0BRj7RtPWy/W36lW013xb4u1PUP+EQtP7N0m6mDHWL+MgkBQv7uM9emRn9K2fGOkT6X8LJLGfULjUpopoGe5uSC7nzlJP+FSWuu+PZpri2h8NaIptWEbD+0nAGQCMfu/Q1i+PNS8b/APCI3I1DQtIhtmkiDPFqDuwJkXHBjHfFEnLm130FBQULR21/PX8T1WP/AFSfQVnaTaTW1xqbTJtE12ZI+QcrtUZ/Q1zqal8Q/LXHhzQ8YH/MTf8A+N1Da6/4/u3uEi8OaLm3lMT51Jx8wAPH7v3FEW1FpDnGLnFt6rb7jp9cs7i9hs1tx80d3FIxyPlUHk89celVdD8NyaRqmoajcapcX9xe7d7TogKBfuqu0DCjJ49ST3rCu9f8f2QhMvhzRP30ywrt1Jz8zHA/5Z9Ksf2l8RP+hc0P/wAGb/8Axuht8qT2CMYqcmnrpcj8P+B7jSPF2ra8mq3URv7gtLahUMUq9mxjIPXnrXSataTXU+ntCm4Q3KyPyBhRnmuYtte8f3ZmEfhzRP3MhjbOpP1H/bOkutf8f2j26y+HNFzPII0xqTnk+v7uqTkp3S1IkoSpWb07/M7uuH+GQK2vicHqPEd6P/HhUv8AaXxE/wChc0P/AMGb/wDxuuT8B6h41WDxA1hoekzK+uXbTebfumyUsNyjCHKjse/pWRt1PTtUtZrm4014k3LDdCSTkDC7WGfzIrRrhLnXvH9pJbpJ4c0TNxL5SY1J+uCef3fsasf2l8RP+hc0P/wZv/8AG6uTfKkyIKKlJp69fuOg0G0mstLENwmyTzZGxkHguSOnsaL+0mm1nSriNMxW7ymQ5HGUIH15rl7HX/H+oW32iHw5omzcy/NqTg5UkH/ln6iifX/H9vd2ts/hzRPMuSwjxqT4+Vdxz+79Ktyn7Ru2uv8AwTJQp+xjG/urlt8mrffod3WboVrNZaUkE6bZAzEjIPViR0rnv7S+In/QuaH/AODN/wD43Vey17x/f2wuIfDmibCSBu1JweDj/nnUJvla6afqatR9om3rZ/pf9Cxrv/JUPCn/AFxu/wD0AV2MgLRuB1IIFeS6vfeNm+IHh15tD0hbxYrnyI1v3KONo3bm8vjH0NdQ2qfENVLHw5oeAM/8hN//AI3UGjOk0O2ls9EtLaddsscYVlyDg/hSXNrNJr1hcqmYYopVdsjgttxx+BrlrLXfH9/ZxXUPhzRPLlXcu7UnBx/37pJNe8fxX0Fo3hzRPNmVmTGpPjC4zn937iteafO3bXX/AIJz8lP2UY30XLb5NW+87a5RpLSZFGWZGAHviq2jW8tpotlbzLtlihRHXOcEDmuYk1b4hRRPI3hzQ9qKWONTfoP+2dR2mufEC9s4bqLw5onlyoHXdqbg4Iz/AM86m75LdLmjjH2id9bfhodM1pMfE8d5s/cCzaItkfeLqcY69AapeO/+SeeJf+wVdf8AopqxDr/j8akth/wjmiecYTMP+Jk+NoIH/PPrk1neL9Q8dv4K15LzQNGitW064E0keouzKnltuIHljJAzxmibbtfsFOMVzcr66+p2nhNSng/RlYYP2KH/ANAFSraTDxI92U/cG2EYbI+9uzjFcb4e1Px6fDWl/ZvD+ivB9kiEbPqLqzLtGCR5fBq0Nf8AH51A2P8AwjmiecI/MP8AxMnxjOP+edEXJXsKcYNRu+uh12rwSXWj3kEK7pJIWVRnGSRVi1Ro7SGNxhljUEe4FcXda38QLO0luZfDmieXEhdsam5OB/2zqSLVviFLEki+HND2uoYZ1N+h/wC2dF3yW6D5Y+0vfW34HSJazDxJLdlP3DWiRhsj7wdiRj6EUuu2s17od5bQLulkiKquQMn8a5Qa94/OoNZDw5onnLEJT/xMnxtJI/55+xpb3XfH9hZTXc3hzRPLiXc23UnJx/37qlKfPF210t+hm4U/ZzV9He/6nbxArEinqFANch4S/wCR08a/9fkH/ooU1dU+IbKGHhzQ8EZ/5Cb/APxuqnw9k1CbxJ4wfVbaC3vDdw+ZFBKZEX90MYYgZ49qyZutjv6KKKBhRRRQAUUUUAFYXjCa9i8OTppsiRX0zxwwSO2FR2cAFj6etbtUtRg07U7Gew1AQTW8ylJYpGGCKAPP9Y1rxZ4b8Na5Dq+q6fd3wsWuLW4tY/LeL5gpyvtuGD6jmt7w9fy2XiRfD8l1LcxyaTFfo0z7nRt5RwT6H5SPQhvwpRfDXwDYaXcW7WEBgZhLK8lwxbC843Zzt46dDW7onhWw0bVb3VYJ7q4nvESMNcSl/KiXJVEz0XJJoA36KKKACiiigBGVXUqyhlIwQRkEVlNotrp9vcTaHpemW+omNlicwiNcn+8VXOM4OPataigDzrTdD+I9mzq9/wCGl+0Sh7q6SOZp2HcjPGQOAOgrpLxfF41mb7C+jNpbqojM/mCaJu5wBhx7ZH1roaKAKGjaVDoulxWULFgpZ3cjl3ZizMfqSTXOfCn/AJJjof8A1yf/ANGNXZVxvwp/5Jjof/XJ/wD0Y1AHWfZYvtv2vafO2eXnP8Oc9KW5t47q2kt5QTHIpVgDjiqWyb/hI9+1/I+zYzzt3bv54qXWFlfR7tYA5lMTBQnXOO1aWfNFX7fIw5lyTfLtf5/8OWoo1hiSJBhUUKB7Coks4UvpLxVPnyII2OewyRx+NLZB1sLcSAhxEoYN1zgdaowJcDxPduyyfZzbRhSc7d2TnHbPShJ+9r/wRykrQ93d/dozQubeO7tpbeYExyKVYA4yDUiKERUXoowKpawsr6NerAHMphYIE6k44xVqAEW8QbO7YM59cVNvdvcpNe0at03+85CGJE+Mt06j5pNDQt+E2K6u9s4dQtJLW4UtFJjcAcdDn+leXeIPFtv4U+Lt7NPbXd5PcaTHDa2ttGXeV/MzgdgPerclr8QNct31XU5l0q1QAw6PaDzJZASB+8f1A5wPSqgm5pX7akVJJUpNxutdO+/5mvr/AMRoLLUpdD0DT7jWtdT5Wt4QRHCfWR+iipfB2heJrfUbzW/E+qxPdXiBfsFqmIYQOnJ5Ldv8a62K3gheSSKGNHlO6RlUAuemT6mqVmkw1rUWdXETCPyyc4PHOKmKunqXN2cVa9392jJ5dMs5bL7J5CpBu3bIxtGc57e9W6y/ECTyaSy2yyNJ5icR5zjcM9K1KbXuJ37/AKCi17Rq3Ra/f+X6kEFnDbz3E0akPcMHkOc5IAH8hXM/EpFfwNeBu0sB/ESrWzpiTrqerNKsgjaZTEWzgjYM49s5rD+JwY+BLrbnPn2+cennJTkmpb9vyFTknBtK2/5v89zro/8AVp9BUVvZw2rzvEpBnkMsmTnLYA/oKlj/ANWn0FZukJOlxqhmWQK14xj355XavT2zmlFPlepU2lOKt/wNC7dWcN4IhMpPlSrKmDjDKcip6y9bSd0sfIWQkXsRfZnhM85x2rUoa91O4Rac5K3bXuQ29rFamUxAjzZDI+TnLGkuLOG6eFpVJMMgkTBxhhVTSUmR77zlcA3TlN+eV4xj2purpO8+mmFZCFulMmzPC4PX2qrPntf5/Izcl7K/Lp2+f9M1K4j4aqFt/FCjoPEd8P8Ax4V29cN8Msi08TZ6/wDCRXuc/wC8KyN+p2VxaQ3LwPKpJgk8xMHGGwR/U1PWZqqTvc6YYVkKrdgybM4C7W6+2cVp1cl7q1Ig05SVv+DoQWdnDY2/kQKVj3M2Cc8kkn9TRNZwz3VvcSKTJbljGc9Nwwf0ql4fSePSQtysiy+bKcSZzje2OvtijUEnbW9IaNZDCry+aVztA8s4z+NW4v2jV++v9dzJSj7GMuXT3dO2q/L9DUqC0tIbK3EEClYwSQCc9Tmp6zNASePSUW4WRZd75Emc/eOOtQl7rd+36mra9olbo9fu/P8AQ5/Xf+SoeFP+uN3/AOgCuyYBlKnoRiuN13/kqHhT/rjd/wDoArsZM+U+Ou04qDRkdpaxWVrHbQKVijG1QTnApJLSGS8humU+bCrKhz0DYz/IVV0FJo9Cs0uFdZhGN4kzuB98026Sc+INPdFkMKxTCQjO0H5cZ/WtbPnav31/ruc/MvZRfLp7unbVfkaMiLJG0bcqwIP0NMtbaOztYraEERRKEUE5wB0ougxtJgmSxjbGOucVV0VZU0OxWcOJhAgcP94HHOc96mz5L36mja9olbpv92hYNnCb8Xu0+eIjEDnjaSD0+oFY3jv/AJJ54l/7BV1/6KarjJP/AMJVHJtk+z/YmBPO3fvXHtnGap+O/wDknniX/sFXX/opqJq1tegU2nzWVtfv8y14XUJ4S0ZR0FjD/wCgCr4s4RfG8CnzjH5ZOf4c56VneEwR4P0bdnP2KHr/ALgqRUn/AOEndysn2f7KADzt3bvyzRFPXUU2ko3V9fuL9zbx3dtLbzAmORSrAHGQafGixRrGvCqAo+gqnrCyvot6sAcymFggTqTjjFWLQMLOAOCGEa5z1zii3uXuO69o1bpv+ggtIRfNeBT5zRiInP8ACCSOPqTS3drFfWktrOpaKVdrAHGRVJEn/wCEmlcrJ9nNmgB527t7Z9s4xTtfSaTQb1LdXaYxEII87ifbFUk+eKv2+X/DGbkvZzfLtfTv/wAOaCqFUKOgGBXHeEv+R08a/wDX5B/6KFdfFkQpnOdozmuQ8Jf8jp41/wCvyD/0UKyN1sdlRRRQMKKKKACiiigArj7j4Z+Gb7Vb7Ub6ya4mupPMOZ5FC8AEABsdQT0712FFAHFT/CjwfLBJGmlmNmUgOLiUlT6/ers408uJEznaoGadRQAUUUUAFFFFABTJRIYXETBZCp2swyAe2aJVZ4nVH2OykBsZ2n1rnNO03V9DkuNQ1jxPNqFnFA7NE1oqbcc7vl5OADx70Ac9NpV1o3j/AENdO8SX11c3TSNqVpdXIcNCF++E/h+bAAHr7Gr6Xb+KPiDrGkSzTx6do9vEuyGVo988nzbiVIJ2qBgdPmzWZr1loPinU9D1Tw4sLawl/FO11bx7WEIP7zzDgcFeOe5q9ZKnhn4leILm/fyrLV4IbiGZh8peNdrpn1xtIHfmgC98Pdfuda0i/tr6QyXulX0tjLIesgXBVz7kEA+4Nct8O/iJ4R0jwFpVhqGu2tvdwo6yRPuyp3sfT3rofhlo1xp+larqV1G0c2r6lNeqjjDLGcBAR6kAt/wKpfhT/wAkx0P/AK5P/wCjGoAZ/wALa8D/AGjyv+Egtcbd2/5sfTp1pZfiz4Gjidx4htXKjO1d2T9OK6v7En9pfbdzb/K8rb2xnNOvLVb2zmtnYqsqFSR1Gar3bozvPlemvQ5NPiv4GZFY+I7RSQDg7sj9KYvxb8Dm5eL+37YKqhhId2057DjrXTX2oaf4d0f7TqN3HbWdugVpZTgccD8a84/t7xL4z1qabwXZPp+nTRrFJrOoJgFQTzFH1PXqf0oXLqN82lvmb978X/A1nZyzjXoJyi5EUKsWY+gGK4I/FuTxbqKCHxBZeFtHilDF5R5t1OAc4xjCg/5z0r12Xw/Be6Pa2eqMt9c28WwXcsS79+3aXH90n2rWjQRxqgOQoApaWHd81uh5NH8RPBzfFObU21m1+yrpCwJcEHBk83JA4znFdLcfFvwPBA0i+ILaUr/Am7J/SnQQiP4zXcgJJk0NCR6Ymx/Sup1Owj1PT5bOV2RJMZZeowQf6U1y8yvsTJz5Hy762/Q5n/ha3gX/AKGWz/8AHv8ACo0+LXgdppEPiC1ULjDHdhvpxXa1Whskhvbm6DMWn27gegwMcUlazuVLmurHJz/FvwPDFvXxBbSnIG1N2f5VJ/wtbwL/ANDLZ/8Aj3+FdPqNimo2ht5HZVLK2V68HNWqbtZdwXNzO+xxUfxb8DySSofEFsgQgBm3YbjORxXP+O/iR4P1HwjdWtlrttPO7xbUTdkgSKSenYAmvS7WxS1urudWYtcuHYHoCFA4/Kuc+JcYk8DXgJIxLA35SoaHa+go83LrvqQp8VfAwjUHxJZ5AH97/CmxfFvwPI0gPiC2TY+0Ft3ze446V2cf+rT6Cq9nYpZSXTo7MbmYzNnsSAMD8qFazuOXNdW2OUm+LfgeIJt8QW0m5wp27vlz3PHQVJ/wtbwL/wBDLZ/+Pf4V099YpfrAHdl8mdJht7lTkD6VaodrIFzczvscVF8WvA8hfPiC1TaxUbt3ze446US/FvwPG0YHiC2fe20ld3y+546V1lpZJZm4KMzedKZTnsT2pLyxS9ktnd2U28olXHcjsafu83kTefJtqcx/wtbwL/0Mtn/49/hXJ+BPiJ4S06HxD9t1y2gNzrt3cxB8/NG7Aqw46GvXa4j4aLtt/FCjt4jvh/48Kg0HS/FrwPG0YHiC1fe20ld3y8dTx0qT/ha3gX/oZbP/AMe/wrp7uyS8ktXdmU28olXHc4Iwfzq1TdrKxK5ru+xxUHxb8DzRb28QW0RyRtfdng4z0ok+LfgdJoox4gtmDk5YbsJgZ54rq9OsU060FvG7Mu9ny3X5mLH+dFxYpc31ndMzB7UuVA6Hcu05qvd5n21/4BF58i010v8Aqcx/wtbwL/0Mtn/49/hUcHxa8DzRB28QWsZJPyvuz/Ku1qrp9imn2i28bMygk5bryc1OlvMt83MrbHl+sfETwjP8QfDl9Frtq1rbRXImlG7CFlAGeO9dQfit4FAJ/wCEksz/AN9f4Umu/wDJUPCn/XG7/wDQBXZMu5Sp7jFIo4uD4teB5oUkbxBaxlhnY+7I+vFDfFrwOs8cY8QWpDAkuN2Fx68d66zT7NNPsIbSNmZIl2gt1NJLYpLqNveFmDwI6qo6HdjOfyq/d5n21M7z5Fprpf8AU5dviv4GVCR4jtDgZwN3P6U2H4s+BpYUkPiG1jLKCUbdlfY8V2MsYlheMkgOpUke9RWNqtjYwWiMWSGMIC3UgDFLTl8yve5vI5L/AIW34H+0iL/hILbaULeZ823rjHTrWT4w+Jfgy/8ABOvWdr4gtJbi4064iijXdl3aNgAOO5NegmxQ6quob28xYDBt7YLBs/Xisnx3/wAk88S/9gq6/wDRTUO2lgjza3Od8P8AxQ8FW/hvS4J/ENpHNFaRI6NuyrBACOlXB8W/A/2kxf8ACQW23bu8z5tv06da6DwsgTwjoyg5xYw/+gCrgsUGqNf728wxeVt7YzmhW1uKXNpY5WX4s+BooXdfENrIVBIVd2T7DinL8V/AzIrHxHaDIzg7sj9K6u9tVvbKa1diqyoUJXqARUkMYhhjiBJCKFBPsKWlvMfvc3kcaPi14HNwYv8AhILXAQN5nzbTz06daJ/i14GhgeRfEFrIVGQibsn6cV1YskGqPf7m8xoRCV7YBJz+tLqFkmo6fPZyMypMhUleoqvd5l2JbnyvTXW36HLD4reBiAf+Eksx7fN/hVP4farY614k8YX+m3KXNrLdw7JU6NiICu9RdiKo6AYrjfCX/I6eNf8Ar8g/9FCoNDs6KKKACiiigAooooAKKKKACiiigAooooAKKKKACjrRTJZBFE8jAkIpYhRk8egoAVY0TOxFXPoMUrIrjDKGHuM1xyeNdRt/Emn6bq3hqaxtNSkMVnd/aVkLOAW2ugHyEgHuela2v6/caVLb22n6VNql7KC5gikVCkY4LknjqQMd/wAKANyuN+FP/JMdD/65P/6Mauk0i7u77TY7i+09rCdyc27yByoBwMkcc9a8m8FfES30/wAC6Roeiafca1rqxMDawDCRZdsGR+iigD1Ka8NvrriacR2kdoZXLkBVw3LE9uK4bWfiZdayl5ZeBdOl1J4VIm1NgUtofox+8fQDr71v+FoPEMgvYfGF7Z3FxeJuXT7eL93BHyCu4/eznn+Zro4oLHRdN8uCGK2s4FyEjTCqB7CtG7taGKVoy97v8jJ8P6ReT+FILTxRdQa1PKRNI0tuoTkhlG3GDtPQ49PSrltLKPEt1ahiLaO2jZIwMKpJOcfkK1I5FliSRDlXUMD7Golu4XvJLRW/fIgdlx0B6fyoi7c2n/ACSvy+91+/R/8ADkOsSyQaNeywsVkSFmVh1BxVmAlreJmOSUBP5UXE8dtbyTyttjjUsx9AKerB0DLyCMipv7trFJfvG79Nvv1OItHdvjZqCsSVXRIwo9P3tdH4kuJ7Xw/dTWzskyhdrL1HzAVhQyI/xkuUU5ZNDQMPTMxNdXd3cNjavc3D7IkxubHTJx/Wqg7TTtfbTv8A8OTUjelJc1t9e3/DE9ZtnPM+tahE7sYoxHsU9Bkc1pVDHcxSXEsCNmSLG8emelTF6PQqau4621+/R/8AD/Io+ILia20lpLd2STzEGV64LDNalQ3V1DZwGadtsYIGcdycCpqbfuJW7/oCX7xu/Radt/z/AEMvTZ5pdT1WOR2ZIplWMHoo2A8fjWH8TmZfAl2VOMz24/DzkrqobqGeaeKNsvAwWQY6EjP8jXM/El1TwNeFjjMkI/EyrRJ3le3b8hU42g1zX31+b/LY6qP/AFafQVm6RPNPcaoszswjvGSPPZdqnA/M1pR/6tPoKjguobl5libcYZPLfjo2AcfqKIv3XoOavOLvb9dCjrc80CWJhdlL3sSPjupPIrUqG4uobURGZtvmSLEnHVj0FTUN+6lYIq05O/bTsZ2kzTTPfCV2YJdOiZ7KMYFM1eeaCfTRC7KJLpUfHdcHg1eguYrgyCJs+U5RvZh2onuobZoVlbaZXEacdWqub372+XyM3H91bm+fz/pE1cN8MiTaeJiep8RXuf8AvoV3NcR8NSGg8UEdD4jvj/48KyN+p0mqzzQ3OmLE7Ksl2EkA7rtY4P4gVp1DPdQ27wrK20zP5ae7YJx+hqark9FoRBWlJ3v+mhl+H55rnShJcOzyebKMt1wHYD9KNQnmj1vSIo3YRSvKJFHRsRkjP41etbqG8g86Bt0e4rnHcEg/qKJbqGG4ggkbEk5YRjHXAyf0qnL943y99O3/AAxko/uYx5v5de+q/Pb5k1ZmgzzXOkxyTuzyF3BLdeGOK06htbqG8gE0DboySAcehxUp+61b+tTVr94nfo9Pu/L9Tktd/wCSoeFP+uN3/wCgCuxkJETkdQpxXHa7/wAlQ8Kf9cbv/wBAFdkSFUk9AM1BozP0Gaa40KzmndnleMFmbqTTbqeZPEGnwq7CGSKYuo6Ejbj+Zq9a3MV5bR3EDbopBlT6ike6hjuorZmxLKrMi+oXGf5itb++3bvp2/4Y5+X91Fc3bXvqvz/UW6ZktJmUkMI2II9cVW0WWWfQ7GaZi0rwIzsepJHNXHdY42djhVBJPtTLeeO6to7iFt0UihlPqDU39y1jRr94nfpt+pQaeb/hKY7fe3kGyZynbdvUZ/Imqfjv/knniX/sFXX/AKKato3UIvRabv35jMoXH8IIGfzIrF8d/wDJPPEv/YKuv/RTUTd7aWCmrc2t9fu8ix4TJbwfoxY5P2KH/wBAFSLPMfE725dvIFqHC9t27rTfC7BvCWjEdPsMP/oArQF1Cbw2gb98E8wrj+HOM0Re+gpq6jrbX7yDWJZINGvZYWKyJCzKw6g4qe0Zns4Gcks0akk9zinXE8dtbyTyttjjUsx9AKcjrJGrqcqwBB9qL+5aw7fvL36bfqZyTzHxNLbl28gWaOF7bi7An8gKdr881toN7NA7JKkRKsvUGrYuoTeNaBv3yxiQrj+EkgH8waW6uYrO1kuJ22xRruY+gqk/fi7dvn/w5m4/u5rm3vr2/wCGHREmFCepUZrkPCX/ACOnjX/r8g/9FCuxUhlBHQjIrjvCX/I6eNf+vyD/ANFCsjdbHZUUUUDCiiigAooooAKKKKACiiigAooooAKKKKAGSyeVC8mx32KW2oMs2OwHrXO6D4vbXdRazPhrxDpu2Mv5+oWYijOCBgEMeeensa6Wobu3+12c9sZZYhNG0fmQttdMjGVPYjsaAOE8ZtrWk+KNB1rzbe80pbxLU2jRYeJpSEEgbPJGcdOATWn4q+H2m+KL1NTN1e2WrQx7Le7tp2QxY6YHTvV7T/CiWj2zXur6pqwtTutxfyRsI2/vfIi7j7tnHbFJe+FPtesy6imu6zbLMqrLawXCiFgPYqSpPqpBoAZ4D1DUdS8I20uqsJL2KSW3llAwJTHIybx9Qua4L4a+DtUk8D2F7p3iu801LoNI8MFnbkZ3kcsUJPTua9btbWCytY7a2jWOGNdqIvQCuT+FP/JMdD/65P8A+jGoAr/8IP4j+3fav+E+1Ld5ezd9jt84zn+5jFOuvBPiO5tZYG8f6myupUhrO3wfrhK6n7XL/b32PI8r7P5mMc53Yp+q3ElppV1cRECSOMsuRkZFaWlzRXUx5ocknbRXv+pysXgzxJFCkY+IGqAIoUAWdvgY/wCAVCngXxEmoS3Y8fakHeNULCzt9xAJ6/Jjv6V21pI01lBK/wB541Y49SKpw3sz+IrqyJHkx26SKMc5JIPP4UJS963zCUoJQut3p9xzF14J8R3NpLA3j/U2WRSpDWdvg59cJmpE8HeJERVHxA1QAADiztv/AIiup1W4ktNJu7iIgSRRM65GRkCrMLF4I3bqygn8qmz5b9Ck4+0a62PJYfCmur8UrmAeM9QFw+krIboWsG8r5uNhG3bjvnGa6G/8C+Ir6yktn8fak6vjKvZ2+Dg57ID2qW1lZ/jVfxtjbHokYX8Zc10uv3s2naJc3duVEsYXbuGRywH9aqCk5pLfQmpKCpSlJaK9/wBTnv8AhEPEv/RQNV/8A7b/AOIqCLwP4jju55x4+1INLtyRZ2+Tgd/kxXdVQtbuWXVr62Yjy4QmzA55GTUxTadipuKcb99PuZyd74G8RXlsYX8fakylgcPZ2+ODnsgqx/wiHiX/AKKDqv8A4B23/wARXRa5ezWGmNPAQHDovIzwWANaNNp8qfTX9AUo+0aW9l+tv1OEt/A3iKC4uZV8fakDO4Zitnb5OABzlPbtWH488K69B4RuZbjxrqN3EskRMMlrAoP7xcHKqDwefwr0bT7ya51HU4ZCNlvKqR4HYoD/ADNYPxNcp4Fuyvea3H5zIKJKSlZ76fkKnKDg3HbX83f8SFPCPiUxr/xcDVRwP+XO2/8AiKhtfA3iK2e4ZfH2pKZpTIdtnb8nAGTlOvHau5j/ANWn0FUNLvJrufUUlIIgujEmBj5dqn+poim4toc5RUop79PuOVu/A3iK6EIfx9qTeVKso3WdvwQeownWrH/CIeJf+ig6r/4B23/xFdFq95NZpZGEgebdxQtkZ+Vjg1o0NPlTewRlFzklvpc4W28D+I7czFfH2pL5shkO2zt+SfXKdaS68DeIrl4Gbx9qTeVIJBus7fgj0wnX611mmXct016JSD5Vw0a4GOBim6peTWk1gsRGJ7lY3yM8Gq5Z89upm50/Zc1tP+D/AJnO/wDCIeJf+ig6r/4B23/xFcn4D8M67cQeIBb+M9QtBFrl3E4jtoG811YZkO5Tgn0HFev1w/wzYta+J2PU+I74/wDjwrI36jLnwN4iuJLdm8fakxhk8wbrO34OCMjCdee9WP8AhEPEv/RQdV/8A7b/AOIro9TvJbWfTkiIxPciJ8jPy7WP9BWhVyTsrkQcXKSW/X7jhLLwN4is7byU8fakq7mbCWdvjkk90PrRN4G8RTXdtOfH2pFoCxUmzt8jIxx8mPzrqtDvJr/TBPOQX82ReBjhXIH6Ci+vJoNX0u2Qjy7lpBJkc/KhIx+NU4z9o111/wCCZqdP2MZW918tvm1Y53/hEPEv/RQdV/8AAO2/+IqvZeBvEdnbCFPH2pKoJOEs7fHJz3Q13dZ+i3kt9piTzkFyzA4GOjEVKT5W+n/DmjcfaJPez/S/6Hmer+Gtdj+IHh23fxpqMk0sVyY7g20AaLCjIACYOfeuobwf4lZSP+FgaryMf8edt/8AEUuu/wDJUPCn/XG7/wDQBXYyErGzDqATUGjOHs/A/iOzs4rdPH2pqsa4ASzt8D6ZQmkk8D+I5L2C5Pj7Ui0SsoY2dvkbsdPkx2rrNFu5b7RrW6mIMsiBmwMDNJc3ksWuWNopHlTRys4xzlduP5mteWXO111/4Jz89P2UZW0drfO1jmpPBviSSJ0PxA1QhlIwbO3/APiKjtPBPiO1tIbdPH+pqsaBQFs7fAx6ZTNdpcu0VrNIv3lQsPqBVfSLmS80ezuZiDJLCrtgYGSM1NnyX6GjlH2iXW34HInwN4iOord/8J9qW8RGLd9jt92CQcfcxjj0rO8X+FvEFv4K16ebxzqVzFHp1w7wPa24WRRGxKkhMgEccc813bXkw8SJY5Hkm0aYjHO4Oo6/Q1Q8d/8AJPPEv/YKuv8A0U1Ek1a4U5RfNy9/xOa8PeEvEL+G9LeLx3qcMbWkTLEtpbkICoIAJTPHvVoeBvEQ1A3f/CfalvMfl7vsdvuxnP8Acxj8K6PwoxfwhozHqbKH/wBAFTreTHxE9lkeSLYSAY5zux1oipO9hTlBKN++hy914J8R3NrLA3j/AFNlkQqQ1nb4OfXCZqSPwb4kjiRB8QNUAVQMCzt8f+gV1Oq3ElppN3cRECSKJnXIyMgVPbSNLawyN950Vj9SKLPkv0HePtLdbHEjwP4jGoNd/wDCfalvaIR7vsdvuwCTj7mMc+lLe+B/Ed5Zy27+PtTZZF2lXs7fB+uEBrqlvJT4hlsiR5K2qygY53FmHX6AUut3ctjot3dQECWKMsuRkZqlGfPFddLGbnT9nN20V7/qc0vg/wASqoH/AAsDVeBj/jztv/iKqfD20ubHxJ4wt7vUJb+dLuHdcSoqs/7odQoArvY2LRIx6kA1x/hL/kdPGv8A1+Qf+ihWRutjsqKKKBhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRUMt1bwwyTSTRrHGpd2LDCgdSaACe8traSGOeeON532RKzYLtjOB6nAqO91Ky01Ea9u4bdXOFMjhcn2rzTX47i+8aeCtcuzKn2jUmS1t2JAih8pzkj++xwSfQKO3Ovoch1j4reKWu1WSPTYILO3RxkKHXe5A98rn6UAd4jrIiujBkYZDKcgiuP8AhT/yTHQ/+uT/APoxqpfCu/llsNd0mRmaPStWmtoCe0XDKufYlvoMCqPhG78Z+GfC1jo0ngO5uGtVZTKmp2yhssTnBf3oA9IzB9qx8n2jZ6Ddtz/LNLOYhA5n2eVj59/THvXCf234y/tj7d/wr662+R5W3+1LXPXOfv0/UNf8Y3unXFqvw+u1MqFAx1S14z/wOrsrrUyvLllprrbzO6j2eWvl42YG3b0x2xUam2+1uF8v7TtG/AG7b2z7da4228R+MYLWGE/D27JjRVz/AGpa84GP79VotZ8ZR63cX/8Awr+6KywpEE/tS1yMEnP3/ehJa6g3L3bL18tDvZzEIJDPs8nad+/pjvmnrt2jbjbjjHpXCajr3jG9025tV+H12pmjZAx1S14yP9+povEvjCOFEPw8uztUDP8Aatr/APFUtOXcq757W0sSQ7P+FyXO3bu/sNN2Ov8Arj1/Cusujbi2c3fl+Rxu8wAr175968ygm8aQ+PbvxGfAdyYp7FbQQ/2na5BDbs531pazrPjLVNJnsk+H91G0oGGOqWpAwQf7/tTilzq700Jm5ezk0rvXTv8A8Oeg1Ehg+0ShNnnceZgDPtmuR/4Sjxh/0Tu7/wDBra//ABVU7fW/GUOpXd0fh/dET7ML/alrxgY/v0o2s7sqTd1Zf1Y7m5NuISbry/KyM+YBjOeOtTV59q2teMtSsDbL8P7pCXVsnVLU9Dn+/V7/AISjxh/0Tu7/APBra/8AxVDtyrUE3ztW001+862I25mm8ny/MDDzdoGc44z74xXM/Enb/wAINebsY8yHGfXzVxWVZa14ytb2/uD8P7phdSK4A1S1+XCgf3/aqXiy88aeI/D0umReArmFnkife2p2pA2Orf3/AGpySvoxQcuXVWev5/qemR/6tPoKjgNuWm8jy92/97sA+9gdffGK5FfE/jBVA/4V5d8DH/IVtf8A4qqWn614yspr52+H9032m4MwA1S1+UFQMff9qStZ3Y5N8ysv+Ad3cG3Aj+0eXjzF2bwPv9se9TV59qWteMr9bUL8P7pPJuY5znVLU5CnOPv1e/4Sjxh/0Tu7/wDBra//ABVDtyrUIt8zutDroTATJ5GzO879gH3u+feknNuGi8/y928eXvA+97e9cNYa34ys2ui3w+um86dpRjVLXgHt9+m6hrXjK9ls3X4f3S/Z5xKQdUtecdvv1Vo8++hF5+zvy69vmeg1xHw1x5HijHT/AISS+xj/AHxUn/CUeMP+id3f/g1tf/iqwPCk/jTw7BqscngO5mN7qc98pXU7UbRIQQp+fqMVmbHpsxtw8PneXu3/ALveBndg9PfGalrz+/1vxleTWTr8P7pfs04lIOqWvzDaRj7/AL1d/wCEo8Yf9E7u/wDwa2v/AMVVO1lZkRb5ndHW2xtzD/ovl+VuP+rAxnPPT3zRKbcXEAl8vziT5W4DdnHOPwrhNJ1rxlptgLZvh/dORI77hqlqPvMW/v8AvRd614yudT0+7Hw/ulFqzkqdUtfm3KV/v+9VaPO1fTXX+u5Cc/ZxfLrpp21V/uPQaitjbmEG28vysnHlgYz36VyP/CUeMP8Aond3/wCDW1/+KqlpWt+MtOsFtm+H905VmO4apajqSf79Srcr1LbfOtNNdfuLuu/8lQ8Kf9cbv/0AV2Rxg56d68x1C68aXvizR9ZXwFcqlhHMjRnU7XL7xjg7+MVtv4n8YMjL/wAK8u+Rj/kK2v8A8VUlnX2xgNuhttnk4+TywNuPbFDm3+0xB/L8/DeXkDdjjOP0rhdK1zxlp2l29o3w+unMSbSw1S1Gf/H6SfW/GUurWl6Ph/dBYEkQr/alrk7sf7ftWlo8z101/r5mN5+zi+XXTTttf7jvn27G342YO7PTFNtzCbeM2+zydo2bPu47Y9q4yfxJ4xmt5Ih8PLsF0K5/tW14yP8AfqHTde8Y2GmWto3w+u3MMSxlhqlqM4GP79Tpy76l3fPa2ltztybf7YAfL+0+WccDdsyM/hnFYvjv/knniX/sFXX/AKKaueOteMjrqah/wr+62rbNBs/tS1zksGz9/wBqZ4g1bxlrXhrVdKTwBdRPe2c1ssjapakKXQrkjf2zRK2lmEG9bq2p13hfb/wiejbcY+ww9P8AcFaANv8AayB5f2nZzwN23P8AKuE0bWvGWl6JY6e/w/upGtoEiLjVLUBioAz9/wBqF1rxkNba/wD+Ff3W1oBFs/tS1znOc/foVtbsUnLSyO9nMQgkM+zydp37+mO+acm3y12Y2YG3HTFcLqOveMb7Tbm1X4fXamaNkDHVLXjI/wB+pYPEnjGG3iiPw8uyUQLn+1bXnA/36NOXfUd3z2tpbc7IG3+1sB5f2jYM8DdtycfhnNFyYBbSG52eRj5/MA24981wi634yXWpL/8A4V/dbWt1h2f2pa5yGJz9/wB6XVdc8ZajpVzZr8PrpGmQoGOqWpA/8fqko8y100IbnySfLrrZd+33nfLjaNvTtiuO8Jf8jp41/wCvyD/0UKYnibxgkar/AMK8uzgAf8hW1/8Aiqf4Js9ZXV/Eep6xpD6YdQuIpIoXuI5ThU2nlCR1FZmyOyooooAKKKKACiiigAooooAKKKKACiiigAooooAbLGs0TxOMo6lWHsa5iH4deGII7qOKwdVuoTBL+/k+ZCQSOvHQV1NFAHmXiH4X2c+seHn0+G8e2ivC14Xv5SVj2EAjLZBzjpzW4uj3nh/xrf6zY2cl5Z6laxpLHG43xzR5Cnk8hlOM9iBXY0UAcV4btIPAmhEam5bUdWv5Lh4oFLs80nREHfCqM9uCa6bS9YtNXjma2Zg8EhimikXa8T9cMO3BBrkNZd5vjX4bt5CTDFptzMi9t5IGfypNEkeL42eJ7aM4gk061ldR0LjIB+uCaAO/ooooAKKKKACiiigDHPifSh4mj8PCdjqTxNMIwhxtXqc9K2K891L/AJL1of8A2BZ//Q69CoAKKKKACiiigArM1zX7Dw/aJPetKTI+yKKCJpJJGxnCouSeATWnUEtvbG5S9ljTzoY3RZW6orbSwz6Hav5UAZfhzxZpHiqGeTTJ3Z7d/LmhljMckTejKeRW3XHeFdOFz4r1/wAUpGYrfUDHBbgjBlSNdplI9GPQ9wAe9djQAUUUUAFFFFAEVzcw2dtJcXDiOKNSzsewFYOkeN9G1nWX0mE3UF8I/NWG7tnhMif3l3AZFdC6LIpV1DKexGRXnl9qM9v8XtIGtaQIYJIJbbTLyKYOrSEbmDDAIJAwB/PsAei0UUUAFFFFABRRTXdY42kdgqKCWJ6ACgDK8R+JdL8K6X/aGrXHlQb1jXau5mYnAAA61r14P8SvEejeI/B97qP9p2b3HnxR2NmJlMkcQkG5yOoZsZx2XAPOa9ytLy2v7WO6tJ457eQbkkjbcrD1BoAmooooAKKKKACsvXfEGneHLFbvUZHSNnCKI4y7MevAHPatSuT8WeG9c1a+tNS0LXv7Ou7ON1jjkgWSOQtjO7PIzgDIoA2tE1yz8QaeL6x87yCxQGWJoySOvB5rSrnPBWvXuv6CZdTtlttRtp3tbqNfu+YhwSvseDXR0AFFFFABRRRQAVlya/YrqjabCZLm7jAMscCF/JB6bz0XPp1o8S6k+jeFtX1ONd0lnZzToD3ZUJH6ivNdF1XWvA3gLStduY7O8sbyVZ9RKhvPzKeZdxOGI4GMDAHtQB69RSA5APrS0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBga94fk1DU9L1iykjj1HTnbyzKDskjcYdGxyAeDkdCBS6D4ffTdR1PVrySOXUdSdTKYwdkaIMIi55IGScnqSa3qKACiiigAooooAKKKKAOTvPDOo3HxFsvEyTWogtbR7QQnduZWOS2cYB9q6yiigAooooAKKKKACuc8W6Xr+r20Fto19ZWsW/dcC5iZ/NA6JwR8vr69Omc9HRQBzmgaf4ot71pdd1WxuLdY9kUFlbmJQc9TkknjpXR0UUAFFFFABRRRQBU1RNQk02ZdLlgivSv7p7hC6A+4BBrIh0bUdQ1LTr/XZLMyaeWeGK0DbTIy7S5Lc8AnA9+proqKACiiigAooooAKQgEEEZB6g0tFAHJeNvBFv4p8MzaXaJaWczyRuJvJHAVgSOOecV1ccccMaxxIqIvAVRgD8KdRQAUUUUAFFFFABWFqEPij+2BJpl5pg05owrQ3MLl1fJywKnnjHB9K3aKAM/RtKTSLEwCRppZJGmmmYYMkjHLNjt9PQCtCiigAooooAKKKKAIL2zg1CwuLK5QSW9xE0UqH+JWBBH5GuQi8GX8nh2z8NX13bzaVayIfNAPnSxo25UYdB0AJz0HQZ47aigAHAxRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXCSveQ/Gm0tzqF1JaS6TJL9md/3aMJMZCjA6Y5PPHWtXRvDWsabqi3V34sv9RgAYG2mijVTkccgZ4rFu7uE/GywYFyiaU8DOEbaJDJkLuxjOKAOq1HxBa2Gow6akM93qE0TTra2ygv5akAuSxCgZIHJGScDNR+HvFWleJ4ZZNMe4cRMUk821kjCsDgruZQCQeuCa43xh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che_183	OPEN	"At room temperature, CN^- in the solution forms complex ions [Zn(CN)_4]^{2-}, [Ag(CN)_2]^-, and [Fe(CN)_6]^{4-} with three metal ions respectively. At equilibrium, the relationship between \(\lg \frac{c(\text{metal ion})}{c(\text{complex ion})}\) and \(-\lg c(\text{CN}^-)\) is shown in Figure <image_1>, where I represents the relationship between \(\lg \frac{c(\text{Zn}^{2+})}{c([\text{Zn(CN)}_4]^{2-})}\) and \(-\lg c(\text{CN}^-)\). When the mixed solution of the relevant ions corresponding to II and III is at point Q, and a small amount of Zn(NO_3)_2 powder is added to it, upon reaching equilibrium, the magnitudes of \(\frac{c(\text{Ag}^+)}{c([\text{Ag(CN)}_2]^-)}\) and \(\frac{c(\text{Fe}^{2+})}{c([\text{Fe(CN)}_6]^{3-})}\): the former ( ) the latter (fill in "">"", ""<"", or ""="")."		<	che	化学反应原理	['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che_184	MCQ	During the extraction and purification of natural gas, sour gas (H_2S and CO_2) is often produced, and H_2S and CO_2 are synergistically converted to reduce carbon emissions and obtain high value-added chemicals. Please answer: At T℃, H_2S(g)+CO_2(g)=COS(g)+H_2O(g) K=6.7×10^-6 At T℃, H_2S(g)+CO_2(g)=COS(g)+H_2O(g) K = 6.7×10^-6 Under the same conditions, the relationship between H_2S conversion and reaction time is shown in the figure <image_1>. The correct statement is ().	['A. Molecular sieves have a catalytic effect, accelerating the reaction rate', 'B. Molecular sieves can selectively adsorb products and promote the forward reaction', 'C. Without molecular sieve, the equilibrium conversion of H_2S increases with increasing the feed ratio of H_2S to CO_2', 'D. When molecular sieves are present, the reaction rate will increase as the temperature increases']	AB	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEHAXcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiml0V1QsoZs7QTycUAOooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvF/HOu+KYvi1otxpmmXkumaaWTakZ/0jIHnlR1bClRwDgjivaK5nWv8AkevC/wDu3f8A6LWgDpVYMoYdCMiloooAKKKKACiiigAooooAKKKKACiqtzqVhZAm6vbaADr5sqr/ADNY83jzwnASG8Raa5HURXCyH8lzQB0VFcg/xP8ACStgahcSH/plYXDj8wmKT/hZ3hj/AJ7ah/4K7n/43QB2FFcf/wALO8Mf89tQ/wDBXc//ABuj/hZ3hj/ntqH/AIK7n/43QB2FFcf/AMLO8Mf89tQ/8Fdz/wDG6P8AhZ3hj/ntqH/gruf/AI3QB2FFcf8A8LO8Mf8APbUP/BXc/wDxuj/hZ3hj/ntqH/gruf8A43QB2FFcf/ws7wx/z21D/wAFdz/8bo/4Wd4Y/wCe2of+Cu5/+N0AdhRXH/8ACzvDH/PbUP8AwV3P/wAbo/4Wd4Y/57ah/wCCu5/+N0AdhRXH/wDCzvDH/PbUP/BXc/8Axuj/AIWd4Y/57ah/4K7n/wCN0AdhRXH/APCzvDH/AD21D/wV3P8A8bo/4Wd4Y/57ah/4K7n/AON0AdhRXH/8LO8Mf89tQ/8ABXc//G6P+FneGP8AntqH/gruf/jdAHYUVx//AAs7wx/z21D/AMFdz/8AG6P+FneGP+e2of8Agruf/jdAHYUVx/8Aws7wx/z21D/wV3P/AMbrpdM1K21fTob6zMhglBKGSJo24OOVYAjp3FAFuiiigAooooAKKKKACiiigCneana2E0Ed0zRLMSqysp8sN6M3RSe2cZ6da5bxT4svtL1cWVrfaBp6pGshbWJ2jM+c8R4wDjGM5PPb11/EesyacIbSCwtrya5VjsurpbeLaMZyzA569ADWZojXUtl9osbOJ4IJGil0551lWMgA/uJehHP3TgdvlxigDpdKvW1LSbS9eEwtPEshjJJ25HuAcfgPpVyoracXNtHMI5Iw652SoVZfYg9DUtABXM61/wAj14X/AN27/wDRa101czrX/I9eF/8Adu//AEWtAHTUUUUAFFFFABRRRQAVBe31rp1pJd3tzFb28Yy8srhVUe5NVtb1qz8P6VNqN8zCKPACIu55GPCoo7sTwBXP6Z4evNdvItc8VIDIjeZZaXnMVoOxcdHl9SeB2oAB4k13xDHnwxpSw2jHA1LVA0aMPVIvvsPc7R9akbwXcaig/t7xJqt6f4oraT7JCfbbHgkf7zGus6DAooA56y8C+FdPA8jQbAsOkk0Qlf8A76fJ/WtqOztYgBHbQoB0CoBU9FAAAAMCiiigAooooAKKKKACiiigAqKW6t4GCzTxRsRkB3AJ/OpaztWujbwBLeGOa+lBWCN+mf7zeijqT+HUigCG28R2F1qt7ZRyx7bQIHmMi7S7DO0c8kDBPb5hV63v7O7mlht7qGaSHHmLG4YpnpnHTNcX4VjvF8LWMgiv2kni8+WSNbXDyP8AMzDcc8kk81u+Hrm+ufBmn3ahJ7+e2Ri8uEBYjq20dB7UAaC6vFJrsukxRSSSwwLNLIMbI9xIVSc/eOCcAdOvUVPp14NR023vFjaMTRh9jYymR0OO46VhaT9p0vUH0tbKGW6mjN5dXZuCPMcttyfk9sAdAFA7VU8Jtrck8t0FtF0m4uLgNbGVi8DpKy5jO3lWwTtPQ5IODgAHQT63a287wvDfl0OCY9PndT34ZUIP4Gqj+LdJj1C0sHN6lzdvsiSSxmTPuSyAAe/uK0BcXuObAf8Af4f4Vzvhp9RPhaz1GKxS61O7tI5ZLi4nCmVioPJAJC+gAwPSgDa1rXbXQ47drjLNPKEUAgBR1Z2J4CqMkk+w6kVTm8ZaRHcwxJNvV5CjykbEjAUHflsZUllUFc5J9jjP8TT3FtNcvG3lzS6TKxHD7GVkAC5GMfMc8c8Z6Csq5txDd2ej2azmxurp9LmV/KOYoreR1RCRkAbR19W7nNAHYnxFpYt0nNwwie5NqrGJxmTngcdOOD0PrVmx1O01Lz/skpk8iTypMoV2tgHHIGeCK5Ce6uNS0Lw/eJPL5txq6Mv2pVfy+HG3CbQRwcd+anRJoRfXE8dzdsNUEMosZpYCFcRrvCK/OCQTk9MntigDp7DUI9Q+0+Wjr9nuHgbdjkr1I9uauVy3hTSrWC61O7Xz2mS+uIlaS4kfCkgnhmI7DnrxXU0AFFFFABRRRQAUUUUAFFFFAGP4g0CHX7VYZjAypysdzbJPEW9WRhn8ip96htHv9EsY7Y6JbtbwjA/svaqgeoibG36AsfrUPiLUrjTZ5LmHUFgSGONpEkjLpjzMHOOVyDgschRziqKXkl9ql0J7q7Jt762kiRQI4FRjtCgjmTgkknK5xj7tAHXQTLcQRzKrqrqGAkQowz6qeQfY1y0vxK8LQ3jWrXtyXE3kblsJ2Qvu24DhNp54yDiusBDDggiub1m3S81vQtFiVY7WFzfTRIMDZFgRrjsPMZD/AMANAF298UaTp97Ja3Fw4eIIZ2SJ3SAMcL5jAEJn3I9elUdZ/wCR58L/AO7d/wDota5i22/8Ir8SzeY3/wBoXm/d12eQmz8NuKWWLXJofh6lpdQ22q/2e/myXcJlG7yI9+VDA5znvQB6ZRVLSotRh09E1W5t7m8BO+S3hMSEZ4wpY/zq7QAUUUUAFBIAyTgCiuU8a3ctzFZ+GbG4aG91hzGzp96K2UZlkHocEKPdhQBW0ZP+Ew8QHxFOH/sqwdotJiY/LK4yHuCO/wDdT0AJ712lQ2lpBYWcFpbRiOCBBHGi9FUDAFTUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFMaNSWYKN5Xbuxzj0p9FAHLWHheDT/C9rb/ANjaVc6lDbqr+aihZHA5y+0nr3xWloVlc6R4W0+xeKN7m3t0jZEfC7gMEA46fhWvRQBg/wBmatbw3l/b3FpJrNwB/r4yYQi7tkS4IIGT945OSTjoBc0DT5tM0S2tbl43uFDPM0SkIXZizYB5xkmtKigCpqDX6WrPp0dvLOoJEU7lFf23AHH5GotBsJNK8P6dp8rq8lrbRwuy9CVUAke3FaFFAGRqmmPql1ChjSKBSBNMRl5EyG8tfQFlXJPYEY5yKN94duJNT02e0uCixajNeTScbk3wSRgKCCDyy9feulooA56LwnANC0rS57qaRbCVZzIp8tpXAbPT7oJYnj6VpW2mpptrcJpw2ySyGU+e7OCxABySc9AB7VfooAxvDdlf2djctqUcEdzcXUs7RwSF1QMeBuIGePatmiigAooooAKKKKACiiigAooooA4bxP4bszdXt3Y2lwuqXNuyia1/1kjudmHyQGUA9GOABxiqMnhXRrjWbmPUrS3uJIPscMdvPbArGhlOWiPZGLMNvYqR0xXba1qUuk2Iu47Ce8RXUTLBy6R/xOF6tj0HPpSyTtqmlJc6Rc2jiUB4ppYzJGfQ4BB6+9AEunaZY6RZi0060htbZSWEUKhVBPXgUqadbR6pNqQQ/apokhZyxOEUsQAO3LE1S8MXt3qHh+2nv2je7BeKV4l2qzI7IWA7Z25xWvQBj3nhjS767nuJoWzchBcokhVJ9n3d6jhsdPccHIqjrPHjnwv/ALt3/wCi1rpq5nWv+R68L/7t3/6LWgDpqKKKACiiigArj/CZGu67q3il0/du5sNPY/8APCNsOw/35Ax+irV7xvqN1YeG5IdP/wCQjfyLY2ntJIdu7/gIy3/Aa19K0+HSdJtNOtxiG1hWFPooxQBbooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDhtUuvDcGsXw1bU9Y0uQSZ3y31xbwS/KOYyGCEcYwOeDx3OKknguw1NPsviu5FjcbvNjj1qVfLlOW8z7/APFyD77T3Jr0TUpbGTZpt7b/AGlbtHHktFvRwoyQc8fh3/A1Q0DUdM8u2sra4ljlntUu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che_185	OPEN	"SiHCl_3 is a raw material for manufacturing polysilicon and can be obtained by coupled hydrogenation of Si and SiCl_4. The related reactions are as follows:
Ⅰ.SiCl_4(g)+H_2(g)=SiHCl_3(g)+HCl(g)  ΔH_1=52kJ·mol^-1
Ⅱ.Si(s)+3HCl(g)=SiHCl_3(g)+H_2(g)  ΔH_2=-236kJ·mol^-1
Ⅲ.Si(s)+SiCl_4(g)+2H_2(g)=2SiH_2Cl_2(g)  ΔH_3=16kJ·mol^-1
When 2.0molH_2 and 1.0molSiCl_4 were introduced into a constant pressure system with a pressure of p_0, when equilibrium was reached, the mass fraction of the gas component varied with temperature as shown in the figure <image_1>(ignoring the adsorption amount of the gas component on the silicon surface). It is known that: K_p^* is an equilibrium constant expressed in terms of partial pressure of gas, partial pressure = quantity fraction of material × total pressure.
At 750K, the equilibrium conversion rate of SiCl_4 is f, and the amount of silicon consuming material is___mol. (List calculation formulas)"		\frac{(1-f)(x+y+z)}{x}-1 \text{or} \frac{(1-f)(y+z)}{x}-f	che	化学反应原理	['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che_186	MCQ	The following figure <image_1>shows the pM-pH relationship diagram of Fe(OH)_{3}, Al(OH)_{3} and Cu(OH)_{2} when they reach precipitation and dissolution equilibrium in water. pM = -lgc(M^{n+});c(M^{n+})≤10^{-5}mol/L can be considered to have completely precipitated. The following statement is incorrect:	['A. From point a, K_{sp}[Fe(OH)_{3}]=10^{-38.5}', 'B. At pH=3, 0.1 mol·L^{-1}Al^{3+} has not yet begun to precipitate', 'C. In a mixed solution of Al^{3+} and Cu^{2+}, when c(Cu^{2+})= 0.2 mol·L^{-1}, they will not precipitate at the same time', 'D. Al^{3+} and Fe^{3+} at a concentration of 0.01 mol·L^{-1} can be separated by step-by-step precipitation']	C	che	化学反应原理	['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']	['che_186.jpg']
che_187	MCQ	An experimental team studied the reaction between FeCl_{3} solution and Na_{2}SO_{3} solution and conducted the following experimental explorations: <image_1>Review of information: <image_2>The following statement is incorrect:	['A. When preparing FeCl_{3} solution, FeCl_{3} is first dissolved in concentrated hydrochloric acid and then diluted to the specified concentration to inhibit the hydrolysis of Fe^{3+}', 'B. The phenomenon observed at the beginning of mixing in the above experiments did not involve redox reactions. The reason why the red color in Experiment II was lighter than that in I may be that the initial concentration of Fe^{3+} was smaller', 'C. It turned red immediately in 1-30 minutes and then became lighter, proving that the rate of forming red complexes was faster and the rate of forming orange complexes was slower', 'D. HCl solution was first added dropwise to the yellow-green solution, and then BaCl_{2} solution was added dropwise. A white precipitate appeared, which proved that the redox reaction between FeCl_{3} solution and Na_{2}SO_{3} solution occurred']	D	che	化学反应原理	['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'che_187_2.jpg']
che_188	MCQ	Tetramethylammonium hydroxide $[(CH_3)_4NOH]$is often used as a cleaning agent in the electronic industry. Using tetramethylammonium chloride $[(CH_3)_4NCl]$as raw material,$[(CH_3)_4NOH]$is synthesized by electrodialysis. Its working principle is as <image_1>shown in the figure (a, b are graphite electrodes, c, d, and e are ion exchange membranes). The following statement is correct ()	['A. Current direction is M→a, b→N', 'B. Gases are generated at both poles a and b, and the volume ratio is 1:2 at the same temperature and pressure.', 'C. c is a cation exchange membrane, d and e are both anion exchange membranes', 'D. When $1 mol e^-$passes through the line, the difference in the mass change of electrolyte in the two chambers $(\\Delta m_a - \\Delta m_b)$is $42 g$']	D	che	化学反应原理	['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che_189	MCQ	"Add HCl gas to a saturated solution of \(CaC_2O_4\) (with sufficient \(CaC_2O_4\) solid) to adjust the pH of the system and promote the dissolution of \(CaC_2O_4\). The total reaction is \(CaC_2O_4 + 2H^+ \rightleftharpoons H_2C_2O_4 + Ca^{2+}\). At equilibrium, the relationship between \(\lg\left[\frac{c(\text{Ca}^{2+})}{(\text{mol}\cdot\text{L}^{-1})}\right]\), the distribution coefficient \(\delta(M)\) and pH is shown in Figure<image_1> (where M represents \(H_2C_2O_4\), \(HC_2O_4^-\) or \(C_2O_4^{2-}\)). For example, \(\delta(C_2O_4^{2-}) = \frac{c(C_2O_4^{2-})}{c_{\text{total}}}\), and \(c_{\text{total}} = c(H_2C_2O_4) + c(HC_2O_4^-) + c(C_2O_4^{2-})\). It is known that \(K_{sp}(\text{CaC}_2\text{O}_4) = 10^{-8.83}\).

Which of the following statements is correct ( )"	['A. Curve I represents the relationship between\\lg\\left[\\frac{c(\\text{Ca}^{2+})}{(\\text{mol}\\cdot\\text{L}^{-1})}\\right] - pH', 'B. At pH = 3, c(Cl^-) > 2c(H_2C_2O_4) + c(HC_2O_4^-) in solution', 'C. Equilibrium constant K = 10^{3.09} for the total reaction CaC_2O_4 + 2H^+ \\rightleftharpoons H_2C_2O_4 + Ca^{2+}', 'D. At pH = 5, the distribution coefficient relationship between C_2O_4^{2-} and HC_2O_4^-is\\frac{δ(C_2O_4^{2-})}{δ(HC_2O_4^-)}>10']	B	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAG2AikDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoJwCT2orGsdZvbvVprObQr21gQsFu5WQxvg8Ywc8/SgC1pes2WsC4NlIzi3lMMm5ChDjqMEA0uratbaNZfarlZnXcFVIImkdiewVeTXP8Agj/j88T/APYXl/kK0PEOhw6/HbNHrF5p9xb7pIJrOcLg4wSR0Yex4oA09Nv49TsY7uKG4iSTOEuIjG457qeRVuub0NLzX/CMMer3Ey3G5keezlaBpNjEBwVIIDAA4HrWP4i8OR2CaabfV9eUzX0cL/8AE2uDlSGyPv8AtQB3lFc7/wAIbZ/9BTX/APwcXH/xdH/CG2f/AEFNf/8ABxcf/F0AdFRXO/8ACG2f/QU1/wD8HFx/8XR/whtn/wBBTX//AAcXH/xdAHRUVzv/AAhtn/0FNf8A/Bxcf/F0f8IbZ/8AQU1//wAHFx/8XQB0VFc7/wAIbZ/9BTX/APwcXH/xdH/CG2f/AEFNf/8ABxcf/F0AdFRXO/8ACG2f/QU1/wD8HFx/8XR/whtn/wBBTX//AAcXH/xdAHRUVzv/AAhtn/0FNf8A/Bxcf/F0f8IbZ/8AQU1//wAHFx/8XQB0VFc7/wAIbZ/9BTX/APwcXH/xdH/CG2f/AEFNf/8ABxcf/F0AdFRXO/8ACG2f/QU1/wD8HFx/8XR/whtn/wBBTX//AAcXH/xdAHRUVzv/AAhtn/0FNf8A/Bxcf/F0f8IbZ/8AQU1//wAHFx/8XQB0VFc7/wAIbZ/9BTX/APwcXH/xdH/CG2f/AEFNf/8ABxcf/F0AdFRXO/8ACG2f/QU1/wD8HFx/8XR/whtn/wBBTX//AAcXH/xdAHRUVzv/AAhtn/0FNf8A/Bxcf/F0f8IbZ/8AQU1//wAHFx/8XQB0VFc7/wAIbZ/9BTX/APwcXH/xdH/CG2f/AEFNf/8ABxcf/F0AdFRXO/8ACG2f/QU1/wD8HFx/8XR/whtn/wBBTX//AAcXH/xdAHRUVzv/AAhtn/0FNf8A/Bxcf/F0f8IbZ/8AQU1//wAHFx/8XQB0VFc7/wAIbZ/9BTX/APwcXH/xdH/CG2f/AEFNf/8ABxcf/F0AdFRXO/8ACG2f/QU1/wD8HFx/8XR/whtn/wBBTX//AAcXH/xdAHRUVzv/AAhtn/0FNf8A/Bxcf/F0f8IbZ/8AQU1//wAHFx/8XQB0VFc7/wAIbZ/9BTX/APwcXH/xdH/CG2f/AEFNf/8ABxcf/F0AdFRXO/8ACG2f/QU1/wD8HFx/8XR/whtn/wBBTX//AAcXH/xdAHRUVzv/AAhtn/0FNf8A/Bxcf/F0f8IbZ/8AQU1//wAHFx/8XQB0VFc7/wAIbZ/9BTX/APwcXH/xdH/CG2f/AEFNf/8ABxcf/F0AdFRXI3+haHpce++8Qazbqenma1cAn6Dfk1keRZXfGkr4uv8A0kGqXEUZ/wCBO4FAHotFedf8Ih4iu+UvrrT1P/PXW7udh+AdR+tSxfDbUGbN1468Rn1FteSRj/x5noA9AorkYvAECLh/EvimX3bV5R/6DinTeBrRIJGGt+JchSR/xOrj0/3qAOsrPvtasdNvbKzuZHSa9k8qACNiGbGcZxgdO9c94K0ZTo+m6rNqWr3FyUJYXGozSIx5HKMxB/KneM/+Q54S/wCwoP8A0BqAOuJCgknAHJJrNstf0/UJ44YJTmVS8LMuBMoOCVPcVD4qWabwprEFoSbtrKXy1U/NkqcY/GuOiDTf8K1Wzz+7j3yAdkEADZ/4Fj8aAPSqKKKACiiigAooooAKKKKACiiigAoIyMHpRRQBSsdI07TWuGsrOKBrht8xRcb29T71Xfw1oskVrE+mwFLUEQLt/wBWDycVq0UANRFjQIihVUYAAwAK5H4i/bRountpwBvE1GF4lPR2AY7fxxj8a7Cua8ZSJFBpEkjqiDVIcsxwBw3egDY0jU4NY0m21C3J8udA2D1U91PoQcgj1FXa5eyI0DxXLZZxpurs1xbHPEdxjMiD2YfOPff611FABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFQXN7a2a7rq5hgX1lkCj9aAJ6Kp2mr6ZqDFbLUbS5YdoZ1c/oauUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFV76/tNMs5Ly+uI7e3jGWkkbAH/1/aueE+teJv+PbzdI0s/8ALZ1xcTD2U/cHuefYUAaOqeJdO0qZbVmkub5x+7srVPMmf/gI6D3bA96oi28Ta0N13cJolq3/ACwtiJbgj/akPyr9FB/3q1tK0XT9FhaOxtwhc5kkJ3PIfVmPJP1rQoAx7DwvpGnyecloJbg9Z7hjLIf+BNk1sUUUAFFFFABUdx/x7S/7h/lUlR3H/HtL/uH+VAGL4L/5E7TP+uR/9CNaN7pGn6lNbzXtnFPJbtvhZ1yUb1HoaxfAN7Fd+E7SONZQYFKN5kTICcnoSOR7iunoAgFlbC9a8EKfaWjERkxyUBzj6ZqO20uxs5mmt7SKKRgQWVcHk5NW6KACiiigAooooAKKKKACiiigAooooAKKKKACiiigArlPGbWV3HpVlM1vNu1KEPA5DZGG6qa6uuS8WaZYpd6RfLaxC6bU4QZgvzHhu9AFPX/AkwsGPhe8axkjdZo7ORi1uJFOQUHWI/7uFPcGtnwt4qtPElo6r+51C3Pl3dq/DROODx3GehroK8/8QaELDxbBqNpN9ik1BtkV0BkRXIHyhx3SQDBHqB3IoA9AorI0HWjqsMsN1D9l1O1by7u2znY3ZlP8SN1B9PcEVr0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFYmp+JILO6+wWcMl/qRGRbQfw+7t0UfWqd7qV9r19LpehymC3ibZeakBnYe8cXq/qei/WtnS9IstGtfs9lCI1Jy7E5aRv7zMeSfc0AZH9ja3q43azq8lpC3/AC56Wxj/AAab75/4Dtq1beDvDlo29NGs3lPWaeMSyH6u+WP4mtuigDJvfC+g6gm260exk9G8hQy+4YDIPuDWcdH1nQ/n0O/kvbZeun6hKXOPSOY/MPo24fSunooAydI8QWmrtJAFktr6H/XWk42yR++O49xkVrVk61oNvq4jmDtbX8PNvdxcPGf6j1B4NV9E1ueW7k0fV0SDV4F3YXhLmPp5kft6jqp/CgDeooooAKKKKACiiigAooooAKKKKACiiigAooooAKy9Z1y30eONSjz3cx229rFy8re3oPUngVFruu/2WIbW0g+2apdHbbWoOM+ruf4UHc/gMk0mi6D9gle/vp/tmrTj99csMBR/cQfwoOw/PJoArWGgT3l9Hq3iJkuLxDutrVeYLT/dH8T+rnn0wK6OiigAooooAKKKKACiiigAqO4/49pf9w/yqSo7j/j2l/3D/KgDF8F/8idpn/XI/wDoRrerjvA3iPRZtD03S49Ws31DYy/ZlmUyZBJI25zwATUN1q19qes+KIYLmW2TRLdPJEbYDyshky3qMADH1oA7eiudtNfub/4fpr9tb77qTT/tKQgZ3PsyBj61hWOvyw3/AITki1CS7XWoitxG77griPduA/hwcjFAHf0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFc74u/wBXo3/YUh/k1dFXO+Lv9Xo3/YUh/k1AHRVR1jS4Na0m40+4LKky4DqcMjDlWU9iCAR7ir1FAHCxG/v7UanEijxNo7G2vIl4Fyo5x9GGGX0Jx6112l6lb6vpsN9atmKVc4PVT3B9weKxNdVtE1m38RRA+QwFtqCjvGT8r/VSfyJqNmHhjxGs6nGjaxIAxH3be6PRvZZOn+9j+9QB1dFFFABRRRQAUUUUAFFFFABRRRQAVzOsXt1rOpP4f0mRoggB1C9X/lgp6Rr/ANNGH/fI57irniPV5tPt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']	['che_189.jpg']
che_190	OPEN	"The scientific research team designed a device that uses methane (CH_{4}) fuel cells (alkaline solution as electrolyte solution) to simulate industrial electroplating, copper refining and seawater desalination as follows<image_1>. Electrodialysis is a common method for desalination of seawater. The content of main ions in seawater in a certain place is as follows<image_2>. Now ""electrodialysis"" is used for desalination. The technical principle is shown in the figure (both ends are inert electrodes, and the positive membrane only allows cations to pass through, and the negative membrane only allows anions to pass through). The outlet for producing fresh water is_______(optional filling in ""e"",""f"", and ""j"")."		ej	che	化学反应原理	['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']	['che_190_1.jpg', 'che_190_2.jpg']
che_191	MCQ	At room temperature, adjust the pH of the GaCl_{3} solution, and measure the change of the concentration fraction of Ga-containing particles with pH as shown in the figure: It is <image_1>known: K_{sp}[Fe(OH)_{3}]=10^{-39}, the following statement is incorrect ()	['A. Ga^{3+}+OH^{-} \\rightleftharpoons Ga(OH)^{2+} has an equilibrium constant of the order of magnitude of 10^{12}', 'B. At pH=3, c[Ga(OH)^{2+}]>c[Ga(OH)_{2}^{+}]', 'C. When NaOH solution is added to GaCl_{3} solution, a precipitate will be formed first and then dissolved', 'D. At room temperature, GaCl_{3} and FeCl_{3} were separated from the mixed solution of GaCl_{3} and FeCl_{3}. The pH of the solution was adjusted to 10. After filtration, sufficient dilute hydrochloric acid was added to the filtrate and filter residue respectively']	A	che	化学反应原理	['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che_192	MCQ	At room temperature, when adjusting the pH of a mixed system containing excess calcium oxalate solid and water, the logarithmic concentration curves (lg c(M)) of various species (where M represents H_{2}C_{2}O_{4}, HC_{2}O_{4}^{-}, C_{2}O_{4}^{2-}, and Ca^{2+}) as a function of pH are shown in Figure <image_1>. Given that K_{sp}(CaC_{2}O_{4}) = 10^{-8.62}, which of the following statements is incorrect? ( )	['A. The ionization constant K_{a1} of H_{2}C_{2}O_{4} is of the order of magnitude 10^{-5}', 'B. At pH=7, c(HC_{2}O_{4}^{-})+2c (C_{2}O_{4}^{2-})=2c(Ca^{2+})', 'C. The dotted line ④ represents Ca^{2+}. At pH=12, c(Ca^{2+}) in the solution is <10^{-4.31} mol/L', 'D. At point A, c(H^{+})>c(HC_{2}O_{4}^{-})>c(C_{2}O_{4}^{2-})>c(OH^{-})']	B	che	化学反应原理	['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che_193	OPEN	Formic acid can be mixed with other organic acids as a cleaning agent, and studying the quantitative relationships of particles in mixed acids is meaningful.\n\nAt 25°C, the distribution of acid molecules in aqueous solutions of the same concentration of formic acid, propionic acid (C_3H_6COOH), and a certain carboxylic acid R_1COOH is given by:\n\n\\[ \\alpha(\\text{RCOOH}) = \\frac{c(\\text{RCOOH})}{c(\\text{RCOOH}) + c(\\text{RCOO}^-)} \\]\n\nThe variation of this distribution with pH is shown in the figure below <image_1>.\n\nWhen equimolar and equal volumes of HCOOH and R_1COONa are thoroughly mixed, the following reaction occurs:\n\n\\[ \\text{HCOOH} + \\text{R}_1\\text{COO}^- \\rightleftharpoons \\text{R}_1\\text{COOH} + \\text{HCOO}^- \\]\n\nCalculate the conversion rate of HCOOH at equilibrium ( ).		90.1%	che	化学反应原理	['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KACiiigAooooA4XxT4t0KDxBHoeraklpbQIs9wHVv3xP3UGAeOMn8B3OOB0zX7G6+FHje0067V7oSXU+xAQRCzAbunTBr3VoYnOWjRj6lQa53QPB9tpGj6lps7Lcw3880kgKY+WTqtAHHfEALD8BbYwcOltZmEr13fJgj3r1RNxRdww2OfrXIR+CZZLHTdJvr5Z9J06ZZYo9nzybD8iuehA/XArsaAK2of8g26/64v/ACNeN/Dfwjr2peBdPurPxnqGnwOG220UalU5PTNeyah/yDbr/ri/8jXG/B3/AJJjpX0f/wBCNAHbwI0VvHG8hkdVCs56sQOtSUUUAFcx460TVNb8OzwaXqhs5VXfsaNWSbbyFbPODjFdPXPHwrvurx31nU3trpi0lqZRsGeoBxkD2BoAk8G6vPrvg7StTuoBBPcW6s6AYGemR7HGR7GtDV9Ri0jRr3UZjiO2heVsDPQZqtqmgW+paZb6ek09nDA8bJ9lfyyAhGF47cYxU+saTBren/Ybpm8hpY5HVT98I4bafYlQD7UAZfh3QUTwZFp+pwrI95G0t6jDG55DucH88fhXD634Ch8OeI9Dbw9cTWthfXqRXViXLR8ZYOoJ4xivTdY0xNY0qewe4uLcSgfvbeQo6kHOQR9Kwbzw9e2VrbTWl7eX9/FKiiW4dSUjz82BgAZHU9a1o39ouV2fczq25HdXXY6yuB8ceHdQtL+Lxl4Yi3axZLi4tV6XsPdCO7AdO/44rvqKyNDH8M+JNP8AFmhW+rabJuilGHRvvxOOqMOxH/1+lbFeZ+ItLvfAeuzeL9BgebTbht2r6fGOo7zIPUd69A0rVbLW9Lt9S0+dZ7W4TfHIp6j/AB7YoAuVx3iWPxS/iG1m0zSLK/0+3j3os935X74/xEbTnA6fWuxooA8r+FN3rbav4sW7062htm1u5e5kW43GKbCZQDHK9Pm/Sun8ca1FD4agjtlguY9VvIdO85lEkUQlbaZGGcEAZ/HFdBa6Rp9kt4ttaxxreytNcBf+WjsMMx9ziq9t4a0az0NtFg06BdNbObYrlTk5PX35oA4bQdCuvh341s9K0+WS70HVkYLHJ80ttIgznd/cP8zXN6lomqeNPFWu+JLIxafNo88trbyLgh2gPSUdSW689Bj0r2Oz0awsZ/PggPnBdgkkkZ2C+gLE4rEubTTZ/Gklg+nL/pNoLiaVHZfMOSuGAIB4HetaSbvZX0ZnUaVru2pp+FtVm1zwtpmp3EQimubdZHReikjmsXxv4Om1nyNZ0SYWfiOw+a1uBwJB3jf1U9Oa69ESKNY41CoowqqMACnVkaHL+CfGMXivTpFngNlq9m3k39i/DQyDrj/ZPY105ICknGO+a4Xxr4XvV1CPxb4ZAj120XEsQ4W9iHVGHc46Gt3wt4msPGOgrfWvGcxXFu/3oZB95GFAHMfEfw9pt54b/tfSI4Ytct5Y3064tcB3lLgBRjrnOOfrXoBuIUmjgkmjWaQEqhYAtjrgd6ytJ8JaDobh9N06OAqSVwzMEJ67QSQv4VcuNIsLrVLXU57ZHvbVWWCU5ygbqB9cUAc58SLm6PhyPSrCN5bzVJ1tkRACdnLSHHpsVvzFdG0Vm1nbWt9HbncgVYpQpBIHIAPpVPxFLa6bbprktqs9zZKyQknBUSFQ2PyFP1TQdJ8TW1o2qWSTiIiWElirRsR1BBBFaOL9mpW0u9fuM1Je0avrbY8u1jRL7wX48utd8FWwksorZZtU06LO1hu52jpuxlse1eq6Br2n+JdGg1TTJxLbzLn3U91YdiDwRVqx0+002DyLOBYo85IHUn1JPJPua891zQdQ8DazP4p8KwNNYTnfqmkp0f1ljHZvUd6zND0uiszQPEGneJtIi1LTJ1mgkH4oe6sOxFadABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBW1D/kG3X/AFxf+Rrjfg7/AMkx0r6P/wChGuy1D/kG3X/XF/5GuN+Dv/JMdK+j/wDoRoA7uiiigAooooAKKKKACsvXdVfSLKKdIhIXnSLBOMbjjNalU9RvrTT7dJbw4jaRUHy7vmJwP1rSl8aur+Xcir8D1t5lyiiisyxGUMpVgCCMEHvXl19ZXnwr1ebV9KjefwneSb76xQZNm56yxj+76j/61epU2SNJomjkRXRxhlYZBHoaAIbC/tdTsYb2ymSa3mUOkiHIINWK8suoLz4Taq9/Zxy3Xgy6fNzboCz6c5P31HdPUdv5+mWV7bajZQ3lnOk9vMoeORDkMDQBPRRRQAVSOpWg1ldNJ/0sw+cBt/gzjr9R+lXapGwszrK35UfbRD5QO7+DOen1J5q4cuvN2/EifNpy9y7RRRUFhXm/ivRb7wlr0njfw1Czq4A1jTo+lzGP+WgH99eT+fqc+kUhAYEEZB6g0AUdF1mx1/SbfU9OmWa2nXcrDt7H0Iq/Xlt/FL8K/EjatbIz+EtSl/02FRn7DKT/AKwD+4e/+c+nwzR3EKTQyLJFIoZHU5DA9CDQBX1K5s7Swkmv9n2Zcb967hyeOPrVlGVo1ZMbSARj0qrqmnW+q6fJZ3RYQvjcVbBGDkc/hVqNFjjVF+6oAH0FW+XkXe/y6ELm532HUUUVBZ51rnhLU/DerzeJ/BKqJZDuv9JJxFdjuV/uv/n2PS+FfGGm+LLJpLRmiuojtuLSUbZYW7gj+tdBXF+K/AY1S8XXNBuzpPiKEZjukHyTf7Mq/wAQ9/50AdpRXD+GfHzXN+NA8UWg0jxAgx5bH9zc/wC1E3cH0/nXcUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAGfrKalNYGHSpEhuJGC+e43CJe7Y7n0FcZp134j8OfEPT9A1HVW1jTtVt5pY5ZYwskDxjJzjqpyB+NdzqOo2mk2Mt7ezpDBGMs7HH4fWub0m90q51o6zeajZNqF0otbW3SdXaKMnO0AHlieWPsOwoAp6dqmpeLrzX5NPv3s4dPma1sxGAQ8qjlnz1G7jFbPgjxKvi7whYaz5YilmUrNGP4JFJVh9MjI9iK5v4dbdAh8V2l8wiaz1Ka5kLcfu3+cN9Md6sfBvTbnTvhtYm6Ro5bt5LrYwwVV2yv5jB/GgDtNQ/5Bt1/wBcX/ka434O/wDJMdK+j/8AoRrstQ/5Bt1/1xf+Rrxv4b6T46ufAuny6R4i0+1smDeXDLaF2Xk9TmgD22io4FkW3jWZw8oUB2AwC2OTUlABRRRQAUUUUAFU9RsLXUbdIrsExrIsg+bHzA5FXKy9e0p9XsooI5VjKTxy5IzwrZxWlL41rbz7EVfgel/I1KKKKzLCiiigBssUc0TxSorxuCrKwyGB6givLru1vvhPqD6jp0ct14PnkzdWi5ZrBifvoP7nqO1ep02SNJY2jkRXRwVZWGQQeoIoAgsL+11SwhvrGdJ7adA8ciHIYGrNeXXmm6h8LdQl1XRYpbvwtO++805cs1oT1kj/ANn1Fei6XqllrWmwahp9wk9rMu5HQ9f/AK9AFysptIZvFK6x5/yC1+z+VjvuJzn8f0rVrIY6n/wliABv7L+yc9MebuP49MVtR5ve5XbRmVXl0ur6o16KKKxNQooooAgvLO31CzmtLuFJreZCkkbjIZT1Brzjw9dXHw68Sx+EtTld9CvWJ0e7kOfKPeBj/KvTqxvFPhqy8V6HNpl6CN3zRSrw0Tj7rKexBoAm8QadPquiz2dtMIpX24ckgcEHtWhChjgjRjkqoBPrxXmGl+Mda0+0uvCmrgr4ns1X7NIVyt9DnG9PVsZyPb616fCXaCMyDDlQWHvjmtnzeyWul369DJcvtX3sv1H0UUViahRRRQBi+JfCuleK9P8AsmpQbivMUycSRN6q3Y1R8Had4l0hbrTtbvYb+zhKiyu8kTOvORIOmRxz3rqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigCjqmjaZrdstvqlhb3sCtuEc8YdQfXBqjp/g3wzpV7He6foOnWt1HnZNDbqrLkYOCBxwSK3KKAM6+0HStSuBPe6fbzygAbnTO4DkA/3hnscitEAAAAYAoooArah/yDbr/ri/8AI1xvwd/5JjpX0f8A9CNdlqH/ACDbr/ri/wDI1xvwd/5JjpX0f/0I0Ad3RRRQAUUUUAFFFFABWVr76jHYxHTN3nefGG2qD8m75uvtWrWbreqnR7OO4EPm75ki27sY3HGela0E3UXKrvsZ1rezd3ZdzSooorI0CiiigAooooARlV1KsAykYII4NeY6no+pfDbVJ9f8N273fh+dt+paQnJi9ZYR2x3H/wBYj0+ggEYPIoAz9F1vT/EOlQ6lplys9tMMqy9R7Edj7VE2sFfFC6P5PBtftHm5/wBojGPwri9Y8M6t4N1ebxH4Mg+0W0zb9Q0UHCy+rxeje3eug8M+OfDviudVsJiuoCMmS2nj2TRYPKsPr6GtKdtbq+n9Mid9LO2v9I6miiisywooooAKKKKAON+JOh6dqvhlrm6WSO7s2ElndQHbLBISACD6dMjvj2FZXh/x3e6PdW+heOEFrduALXUsYguh2yeit7V3upSWUVhI+oGMWoxv8wZXrx+tQ6po2ma/pbWOo2kN1aSL9x1yMdiPQ+4rR29mtNbvX7iFfneultvvL6sGUMpBBGQR3pa8yOi+L/h+xfw7I3iDQgcnTLl8XEI/6ZP/ABD2P69a6Pw78Q/D/iN/s0Vy1nqC8SWN6vlTIe4wev1BNZlnVUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAZ+sazaaJaJPdlyZZFhhijGXlkY4CqO5P5VHpuu2+o3txYtFLa39sqvLbT7d4VujDaSCpwRkHqK5Hxc7yfFTwRbv/qA9xKAehcRnFLqLtF8ctFEWR52lTrNjuFOVz+OaAO41D/kG3X/AFxf+Rrjfg7/AMkx0r6P/wChGuy1D/kG3X/XF/5GuN+Dv/JMdK+j/wDoRoA7uiiuL8Wa5qOm+OPB+n2lwY7XUJp1uU2g7wqqRyRkdT0oA7SiiigAooooAKp6ldWVpbo9/t8oyKq7k3fMTx+tXKp6lpkGq26QXG/YkiyDacHKnIq6fLzrm2Iqc3K+XcuUUUVBYUVx3w71S91Sy19765edoNcu7eIv/DGrDao9hXY0AFFFFABRRRQAVx3iT4c6P4g1MarHJPp2rKmEu7N9jZznJH8XXvXY1kNpMx8WJq3nDyRaeR5ffO4nP6/pVwSd7u2n9IibatZX1OPF/wDELwl8t9p8fijT0/5b2Z8u5UepQ/e/DJrT0j4q+EtVm+yy6j/Zt6DhrXUVMDqfT5uM/jW54s1G40jwfrOpWhUXFrZTTRFhkBlQkZH1FVLfSdM8XeF9MuNd020vZJ7SKVzLECQzICcHqOT2qCzoY5EljWSN1dGGQynII+tOrz1/hHpNm5k8Parq2huTkLaXTGP8UPX8TR/YXxJ0v/jx8U2GpIOi39ptY/imKAPQqK89/wCEg+JFhxeeErG9Ufx2d5gn8GFH/CytStuNR8D67bkdTGiyj/x00Adrq2mQ6xpstlOzLHJjJXqMHP8ASrcaCKJI16KoUfhXl2v/ABR0m/0We0W21qwuH24aaxkQDBBPNatt8X/BKwxxz60InCgHzYnBzj6Vq/4S97q9Pu1+f6Ga/iPTotfv0/rud9WD4h8GaD4oQf2pp8cko+5Onyyp9GHNZqfFTwPJ93xJZ/juH9KwNE+KGkzeOfE0N74htf7IjFt/ZxYgKcx/vMHGT83rWRoWf+EU8a+GufDfiJNRtF6WWrAkgegkHP50v/CzL7RPl8X+FNS0xR1u7ZftFv8AXcvT+db3/CxvB3/QxWH/AH8pjfErwWvXxHY/99k/0oAsaP488K6/tGm69YzO3SIyhJP++Gw36V0XWvKtb1n4NawWbUpdHlkPWRImRz/wJQCaqeGvDXg3XrmZfBninW7Y2u1pI7a7cRAEnA2t16GgD2CigDAAooAKKKKACiiigAoopMgEDIyelAC0UUUAFFFFABRRRQAUUUUAYPiTw8dZfTr21kSHUtMuPPtpHHynjDI2OcMCRkdKj07w/OfFFx4j1RoTetAtrBDAxZIYwSSdxAJYk9cDjiuiooAhvI2msp4kGWeNlA9yK8l8GeJNa8HeGLbQrvwTr1xPallaW3jRkbk9Du5FewUUAeff8LL1L/oQfEv/AH5T/wCKrl/EXiPWtZ8V+GtWh8D+IEi0mWV5UeFdzhwoG3B9u9e0k4GT0ri7/wCIkGmX9uLzRNUi0q4mEEeqMi+UWJwDt3bgpPQkDNAFL/hZepf9CD4l/wC/Kf8AxVH/AAsvUv8AoQfEv/flP/iq9BooA8+/4WXqX/Qg+Jf+/Kf/ABVH/Cy9S/6EHxL/AN+U/wDiq9BooA8+/wCFl6l/0IPiX/vyn/xVH/Cy9S/6EHxL/wB+U/8Aiq9BooA8+/4WXqX/AEIPiX/vyn/xVH/Cy9S/6EHxL/35T/4qvQa4n4iarep4b1ey0mYw3ENhLcXFwvWFApIUf7TEfgMn0oA5Dwd4o1nw3batFceB/EEpvdUuL5DHCvyrIQQDk9Riuk/4WXqX/Qg+Jf8Avyn/AMVXU+EpZJ/BmhSyuzyPp9uzMxyWJjUkmtigDz7/AIWXqX/Qg+Jf+/Kf/FUf8LL1L/oQfEv/AH5T/wCKr0GigDz7/hZepf8AQg+Jf+/Kf/FUf8LL1L/oQfEv/flP/iq9BooA8+/4WXqX/Qg+Jf8Avyn/AMVSH4magqlm8BeJABySYU4/8er0Kub8cjWZPDM0Gh6cb65mYI8QnWL93/F8zEYJHH40AcNr/wARbvxJ4a1bR7HwdrjT3lnLCpCxsFLKVycMTjJFXtF8e6rpmhafYSeA/EbyW1tHCzLCmCVUAkfN7Va+Gj+GZLrUE0/w8+ha5bKI720mGXVScghv4lJHX2+lei0Aeff8LL1L/oQfEv8A35T/AOKo/wCFl6l/0IPiX/vyn/xVeg0UAeff8LL1L/oQfEv/AH5T/wCKo/4WXqX/AEIPiX/vyn/xVeg0UAeeN8R79vvfD7xGfrAn/wAVUT+PriQYf4ceIGB7G2jP/s1ekUUAeWyeK4Jf9Z8K9Yb/AHrKI/1rmNMl+y+L/EGq3Xwx1Oax1D7P9ltzYxnydke1uCcDJ54r1bxj4nHhrToPIiWfUb2YW9nCxwrSHux7KByfarOgRZgM0usnUrr7szpIPLVu4VBwuPzoA8+/tzTP+iQ6l/4Lof8AGnr4hsE+78JdUH00+H/GvWKKAPL4/F8cX+r+F2sp/u2UQ/rVuP4iXsIxF8PPESf7tvGP/Zq9FooA8+/4WXqX/Qg+Jf8Avyn/AMVR/wALL1L/AKEHxL/35T/4qvQaKAPPv+Fl6l/0IPiX/vyn/wAVR/wsvUv+hB8S/wDflP8A4qu/diiMwRnIGQq4yfYZrC0HxdYeIry9tbGC7D2UhiuDLFsEb/3evJ+maAOd/wCFl6l/0IPiX/vyn/xVH/Cy9S/6EHxL/wB+U/8Aiq6C28YWN14mm8PJa3o1GBBJKjRAKiHo27OCPpXQ0Aeff8LL1L/oQfEv/flP/iq5jx/4wutc8IXkM3g3xHYPEvmw3jIqCBx/ESGyB2r2isbxN4btvFWknTL24uI7R2BlSBgpkA/hJxnH0oA+U9F+MHjjRNqx61JdRL/yyvFEwP4n5vyNeteE/jbr2sukN14LurknrLpwbB/4C3/xVd9o/wAMvB2h7TZ6HbGRekkw8xvzbNdVFDFAgSKNI0HRUUAUARWNy15aRzvbTWzOMmKYAMv1xViiigAooooAKKKKACiiigAooooAK8/+J9xqlpp9tef2dbX2hWlxHcXsRciUqpBBHbAOD+Fd+4YowU7WI4JGcGuWOg69qmnSaZr+pWc1pIcSm2gKPKmfunJwM9yKAOltp0urWG4jzslQOufQjIqWmoixRrGihUUBVUdABTqACiiigAooooAO1eVeK/D/AIt07wj4mlOu6fJaTW9xNMhsz5joVPy7t3XbwK9VpGVXUqwDKRggjINAHM/DyK/i8B6MNQuYp2a0haIxx7NsRjXap55I9e9dPSKoVQqgAAYAHaloAKKKKACiiigArJ13XV0KO2kk0/ULuOaTy2NlbmYx8feZV5x9BWtRQBymmaWb/wAczeK/s81tH/Zy2ESTJseX95vZyvUdFAzz1rq6KKACiiigAooooAKKKKAPOPH1gr+O/B19fRrJpaXDwSBxlFkZfkLZ456VJBpa6f8AGwPpESQWkukb9RiiXam/eRGxA4DHH5Ka726tLa+tntru3iuIJBh45UDKw9waZZadZabE0dlaQ26MdzCJAu44xk46nAFAFmiiigAooooAK43xxretaPe6DFpUtuq316LaRZUznKk5z26V2Vef/E3z/tnhP7L5fn/2uuzzM7c7G64oASw1zxFonxGtPDmu3UN/aarbyTWk8cPlmN0GWQjuMfzFZngC61CDxD40FnpyXSnViWZpxHg7BxjBrrF0G9v/ABXb+IdSWFJLC2eGytkYsFZ8b3ZsdwAAPTNVfBfhnVvD+q67cXz2jxandm6Hks2U4AxyPagDE8PS3M3xx1x7q2FvL/ZMP7sSb+N/rgV6bXF2HhrWLf4k3/iWVrM2t1apbeUrtvUKc56YrtKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKzNT0DTNZmt5b+3857Z98JLsPLb+8MHg+9adFACAbQAM8epzS0UUAFFFFABRRRQAUUUUAFFFFAH//2Q==']	['che_193.jpg']
che_194	MCQ	When $0.1000 mol \cdot L^{-1} NaOH$solution titrated $20.00 mL of 0.1000 mol \cdot L^{-1} H_3PO_4$solution, the relationship between $V(NaOH)$,$\lg \left[ c / (mol \cdot L^{-1}) \right]$and pHis as shown in the figure<image_1>. The following statement is wrong ()	['A. $\\frac{K_{a1}}{K_{a2}}} = 10^{-5.08}$for $H_3PO_4$', 'B. Degree of ionization of water: d > c > b > a', 'C. ③ The relationship between $\\lg \\left[ c / (mol \\cdot L^{-1}) \\right]$of $H_3PO_4$and pH', 'D. At point c, there is $c(Na^+) > 3c(H_3PO_4) + 3c(HPO_4^{2-})$in the solution']	D	che	化学反应原理	['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']	['che_194.jpg']
che_195	MCQ	"At room temperature, the relationship between the quantity fractions of three sulfur-containing particles in the ""$H_2S-HS^-$-$S^{2-}$"" aqueous solution system and the pH of the solution is <image_1>shown in the figure. It is known that: $K_{sp} = 6.3 \times 10^{-36}$for $CuS$,$K_{sp} = 1.6 \times 10^{-52}$for $H_2S$, and $K_{sp} = 6.3 \times 10^{-18}$for $FeS$. The following statement is wrong ()"	['A. The $CuS$precipitate and the $HgS$precipitate can be separated by dropwise adding a saturated $H_2S$solution (approximately $0.1 mol\\cdot L^{-1}$) to a solution containing $Cu^{2+}$and $Hg^{2+}$at $0.1 mol\\cdot L ^{-1}$', 'B. Size relationship of sulfur-containing particles in a solution of $0.05 mol \\cdot L^{-1}$:$c(S^{2-}) > c(HS^-) > c(H_2S)$', 'C. If the initial concentration of $H_2S$is $0.1 mol \\cdot L^{-1}$, then the corresponding solution at point A contains: $c(H^+) < c(HS^-) + 2c(S^{2-}) + c(OH^-)$', 'D. The concentration of $FeCl_2$in hydrochloric acid solution with pH = 2 is $1 mol \\cdot L^{-1}$. When $H_2S$gas is introduced into it until the concentration of $H_2S$reaches $0.1 mol \\cdot L^{-1}$,$FeS$precipitates appear (ignore the coordination of $Fe^{2+}$and $Cl^-$)']	B	che	化学反应原理	['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che_196	MCQ	"""Using the principle of equilibrium shift, analyze the possible products of \(Mg^{2+}\) in \(Na_2CO_3\) systems with different pH at room temperature. Known: i. The curves in Figure 1<image_1> represent the relationship between the mole fraction of each carbon-containing particle in the \(Na_2CO_3\) system and pH.

ii. Figure 2<image_2> shows the \(K_{sp}[Mg(OH)_2]\) and \(K_{sp}[MgCO_3]\) curves; [Note: Initial \(c(Na_2CO_3) = 0.1\ \text{mol} \cdot \text{L}^{-1}\), and \(c(CO_3^{2-})\) at different pH is obtained from Figure 1]. The following statement is incorrect ( )"""	['A. From Figure 1, when $Na_2CO_3$solution is titrated with hydrochloric acid to neutrality,$c(CO_3^{2-}) : c(H_2CO_3) = 10^{-2.62}$', 'B. At room temperature, the magnitude of $K_p(MgCO_3)$is of the order of $10^{-6}$', 'C. From Figure 2, the initial state pH = 9,$\\lg \\left[ c(Mg^{2+}) \\right] =-2 $, and after equilibrium, there is $c(H_2CO_3) + c(HCO_3^-) + c(CO_3^{2-}) = 0.1 mol \\cdot L^{-1}$', 'D. From Figure 1 and Figure 2, the initial state pH = 8,$\\lg \\left[ c(Mg^{2+}) \\right] =-1 $, and the reaction $Mg^{2+} + 2HCO_3^- = MgCO_3 \\downstream + CO_2 \\uparrow + H_2O$occurs']	C	che	化学反应原理	['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'che_196_2.jpg']
che_197	MCQ	"Catalytic hydrogenation of carbon dioxide to ethylene is a hot research field for comprehensive utilization of CO_2. The thermochemical equation of this reaction is
\[ 2\text{CO}_2(g) + 6\text{H}_2(g) \rightleftharpoons \text{C}_2\text{H}_4(g) + 4\text{H}_2\text{O}(g) \quad \Delta H = m\text{kJ} \cdot \text{mol}^{-1} \]
Theoretical calculations show that the initial composition of the raw material n(CO_2):n(H_2)=1:3, and when the system pressure is 0.1MPa and the reaction reaches equilibrium, the quantity fractions of the four components change with temperature as <image_1>shown in the figure. The following statement is incorrect:"	['A. m <0', 'B. When the reaction reaches equilibrium at 500K, if the pressure is increased (the volume of the container is reduced), n(C_2H_4) will increase', 'C. The coordinates of point X are (440, 39), then the equilibrium constant of the reaction at 440K, K_p=\\frac{3}{4}(expressed in partial pressure, partial pressure = total pressure × mass fraction of the substance)', 'D. The actual reaction is often accompanied by side reactions to produce C_3H_6, etc. Under certain temperature and pressure conditions, using suitable catalysts cannot improve the selectivity of ethylene\\left[\\frac{2n(C_2H_4)}{n_{\\text{total conversion}}(CO_2)} \\times 100\\%\\right]']	CD	che	化学反应原理	['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']	['che_197.jpg']
che_198	MCQ	At room temperature, the closed instrument contains $20 mL of 0.1 mol \cdot L^{-1} NaClO$solution. Now $0.1 mol \cdot L^{-1} NaHSO_3$solution is slowly injected into it. As its volume increases, the pH of the solution changes as shown in the figure below <image_1>(the ionization equilibrium constant of HClO is $4.0 \times 10^{-8}$,$\lg5 = 0.7$ ). The following analysis is wrong ()	['A. The pH at point A is 10.2', 'B. In point B, there is $c(Na^+) + c(H^+) = 2c(SO_4^{2-}) + c(OH^-)+ c(Cl^-) + c(ClO^-)$', 'C. Water ionization degree $A > B > D > C$', 'D. Neutral point between BC']	D	che	化学反应原理	['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che_199	MCQ	At 25℃, titrate $20 mL of 0.2 mol \cdot L^{-1}$of ammonia and MOH base solution with $0.2 mol \cdot L^{-1}$of hydrochloric acid respectively (Alkaline: $NH_3 \cdot H_2O$is greater than MOH), the relationship between the pH of the solution [$pOH = - \lg c(OH^-)$] and $\lg \frac{c(NH_4^+)}{c(NH_3 \cdot H_2O)}$or $\lg \frac{c(M^+)}{c(MOH)}$is shown in the following figure<image_1>. The following statement is correct ( )	['A. Curve II corresponds to the curve for titration of $NH_3 \\cdot H_2O$', 'B. Point a corresponds to pH = 12', 'C. The volume of hydrochloric acid added to the solution at points b and e is $10 mL$', 'D. The solution satisfies: $c(M^+) = c(Cl^-)$']	D	che	化学反应原理	['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']	['che_199.jpg']
che_200	MCQ	HCl gas was introduced into a saturated solution of CaC_2O_4 containing excess solid CaC_2O_4, and the pH of the system was adjusted to promote the dissolution of CaC_2O_4. The overall reaction is CaC_2O_4 + 2H^+ \\rightleftharpoons Ca^{2+} + H_2C_2O_4. At equilibrium, the relationships between lg[c(Ca^{2+})], the distribution coefficient $\\delta$(M), and pH are shown in Figure <image_1> (where M represents H_2C_2O_4, HC_2O_4^-, or C_2O_4^{2-}). For example, $\\delta(C_2O_4^{2-}) = \\frac{c(C_2O_4^{2-})}{c_{\\text{total}}}}$, where $c_{\\text{total}} = c(H_2C_2O_4) + c(HC_2O_4^-) + c(C_2O_4^{2-})$. It is known that $K_{sp}(\\text{CaC}_2\\text{O}_4) = 10^{-8.63}$. Which of the following statements is correct? ( )	['A. Curve I represents the change of lg[c(Ca^{2+})]-pH', 'B. At pH = 3,$c(\\text{Cl}^-) > c(\\text{HC}_2\\text{O}_4^-) + 2c(\\text{H}_2\\text{C}_2\\text{O}_4)$', 'C. Equilibrium constant for the total reaction CaC_2O_4 + 2H^+ \\rightleftharpoons Ca^{2+} + H_2C_2O_4 $K = 10^{-3.09}$', 'D. At pH=5, the distribution coefficient relationship between C_2O_4^{2-} and HC_2O_4^-is $\\frac{\\delta(C_2O_4^{2-})}{\\delta(HC_2O_4^-)} > 10$']	B	che	化学反应原理	['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che_201	MCQ	At room temperature, the variation of the mole fraction $\delta$ of various sulfur-containing species in an aqueous $H_2S$ solution with pH is shown in Figure <image_1> [for example, $\delta(H_2S) = \frac{c(H_2S)}{c(H_2S) + c(HS^-) + c(S^{2-})}$]. Given: at room temperature, $K_{sp}(\text{FeS}) = 6.3 \times 10^{-18}$, $K_{sp}[\text{Fe(OH)}_2] = 4.9 \times 10^{-17}$, and the hydrolysis rate of $S^{2-}$ in a 0.1 $\text{mol} \cdot \text{L}^{-1}$ $\text{Na}_2\text{S}$ solution is 62\%. Which of the following statements is incorrect ( )	['A. Solubility at room temperature: FeS is less than Fe(OH)_2', 'B. Using phenolphthalein as indicator (pH range of color change is 8.2 - 10.0), the concentration of H_2S aqueous solution can be accurately titrated with NaOH standard solution', 'C. There is a relationship in the mixed solution of Na_2S and NaHS with the quantity and concentration of the same substances: $c(\\text{HS}^-) + 3c(\\text{H}_2\\text{S}) + 2c(\\text{H}^+) = 2c(\\text{OH}^-) + c(\\text{S}^{2-})$', 'D. 0.01 Add an equal volume of 0.20 \\text{mol}\\cdot\\text {L}^{-1}\\text{FeCl}_2 solution to the solution, and the precipitate initially formed are FeS and Fe(OH)_2']	B	che	化学反应原理	['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che_202	MCQ	H_2Se is a binary weak acid. At room temperature, by adjusting the pH of the 0.1 \text{mol/L} H_2Se solution (the solution volume remains unchanged), the relationship between\lg X [X = \frac{c(H_2Se)}{c(HSe^-)} \text{or} \frac{c(Se^{2-})}{c(HSe^-)}] in the solution with pH is as <image_1>shown in the figure. The following statement is incorrect ()	['A. X in the ordinate corresponding to straight line ① is\\frac{c(H_2Se)}{c(HSe^-)}', 'B. In the solution corresponding to point m: $c(\\text{H}^+) = c(\\text{HSe}^-) + 2c(\\text{Se}^{2-}) + c(\\text{OH}^-)$', 'C. 0.1\\text{mol/L} \\text{NaHSe} In solution: $c(\\text{Na}^+) > c(\\text{HSe}^-) > c(\\text{H}_2\\text{Se}) > c(\\text{Se}^{2-})$', 'D. The ratio of the order of magnitude of the ionization constant $K_{a1}$and $K_{a2}$of H_2Se is $10^7$']	B	che	化学反应原理	['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che_203	MCQ	At room temperature, the distribution coefficient \(\delta\) of sulfur-containing species in \(\text{H}_2\text{S}\) solution [e.g., \(\delta(\text{HS}^-) = \frac{c(\text{HS}^-)}{c(\text{H}_2\text{S}) + c(\text{HS}^-) + c(\text{S}^{2-})}\)] has a relationship with pH as shown in Figure 1<image_1>; for metal sulfides \(\text{M}_2\text{S}\) and \(\text{NS}\) in a saturated \(\text{H}_2\text{S}\) solution (\(0.1\ \text{mol} \cdot \text{L}^{-1}\)) at precipitation-dissolution equilibrium, the relationship between \(-\lg c\) (where \(c\) is the concentration of metal ions) and pH is shown in Figure 2<image_2>.Which of the following statements is correct?	['A. $\\frac{K_{a1}}{K_{a2}}} = 10^{-5.93}$', 'B. Straight line ① represents the relationship between-lgc of N^{2+} and pH in saturated H_2S solution', 'C. pK_{sp} of metal sulfide M_2S = 49.21', 'D. Mixed solutions of M^{+} and N^{2+} with concentrations of 0.01 \\text{mol} \\cdot \\text{L}^{-1} cannot be separated by dropwise addition of saturated H_2S solution']	C	che	化学反应原理	['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'che_203_2.jpg']
che_204	MCQ	At room temperature, the precipitation and dissolution equilibrium curves of AgIO_3 and Pb(IO_3)_2 are shown in the figure<image_1>. In the ordinate, M represents ^Ag + or Pb^{2+}, and the solubility of the substance is expressed in terms of the quantity and concentration of the substance. The following statement is correct ()	['A. AgIO_3 precipitate was formed at point a, but no Pb(IO_3)_2 precipitate was formed', 'B. The points representing the solubility of Pb(IO_3)_2 in pure water are between line segments bc', 'C. When AgNO_3 solution was added dropwise to AgIO_3 suspension and Pb(NO_3)_2 solution was added dropwise to Pb(IO_3)_2 suspension, respectively, the solubility of AgIO_3 and Pb(IO_3)_2 were both 10^{-5.09} \\text{mol} \\cdot \\text{L}^{-1}', 'D. When c(IO_3^-) = 0.1 \\text{mol} \\cdot \\text{L}^{-1},\\frac{c(\\text{Pb}^{2+})}{c(\\text{Ag}^+)} = 10^{-4.09}']	D	che	化学反应原理	['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che_205	OPEN	"The acidic high-concentration arsenic-containing wastewater used in industry mainly exists in the form of arsenite (H_3AsO_3). The process flow for extracting As_2O_3 is as follows: <image_1>

Known:
I. As_2S_3 reacts with excess S^{2-}: As_2S_3(s) + 3S^{2-}(aq) 2AsS_3^{3-}(aq);
II. Arsenite is more soluble than the corresponding arsenate.

Answer the following questions:
It is known that the $K_{sp} of FeAsO_4 = 5.7 \times 10^{-21}$, and the allowable emission standard for arsenic-containing pollutants is no more than 0.5mg·L^{-1}. If the concentration of Fe^{3+} in low-concentration arsenic-containing wastewater (assuming that arsenic exists in the form of Na_3AsO_4) is 1.0 \times 10^{-4} mol·L^{-1}, then the concentration of Na_3AsO_4 in low-concentration arsenic-containing wastewater is ()"		$1.1856 \times 10^{-11}mg·L^{-1}	che	常见无机物及其应用	['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che_206	OPEN	"Benzyl alcohol and benzaldehyde are important chemical raw materials. They can be prepared by the disproportionation reaction of benzaldehyde in aqueous sodium hydroxide solution. A research team prepared benzyl alcohol and benzoic acid in the laboratory and measured the purity of benzoic acid.

I. The principle of the preparation reaction <image_1>and the processing steps of the reaction solution after the reaction <image_2>are as follows:
The properties of related substances are shown in the table<image_3>:
It is known that benzaldehyde is easily oxidized in the air to form white benzoic acid. Please answer the following questions based on the above information (the <image_4>holding instrument is omitted in the picture below):

The following statement about the preparation and purification process is correct ().
A. Step I: Ether can be used as the extractant B. Step II: Use anhydrous MgSO_4 as desiccant
C. Step V: The specific operations include dissolving in hot water, adding activated carbon for decoloring, cooling and crystallizing D. Step V: Wash the product with cold water
E. Step V: The product can be heated and dried with alcohol lamp or boiling water bath"		ABD	che	化学实验基础	['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0iuq6CgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA5/xl/wAgO2/7Cum/+lsNdBXP+Mv+QHbf9hXTf/S2GugoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArn/GX/IDtv8AsK6b/wClsNdBXP8AjL/kB23/AGFdN/8AS2GgDoKKKKAPP/in/wAyV/2Ndj/7PXoFef8AxT/5kr/sa7H/ANnr0CgApiSxyM6pIrNGdrhTkqcZwfQ4IP41V1TUDYWpaKBrm6f5YLdDhpG9M9h6k8AVwmmy22h6TfahNquqJq9zeMt1ax20IlnuyARHGGjYsACNvzEBec4zQB6RRWR4dt9XttFT+27w3V/IWkfCoBEDyIwVAB2jjOOT+Vcpdmxl8eyR3mn316ttaQ3Rhnu1dLZjI/77Y0m0YCj7ozx0oA75J4pJZIklRpIsCRFYEpkZGR24qSuB0z+09N1i5lPkpqGuedf7HszIyRxBVSNm81edrLwB1LfWuw0g6mdKtzrH2YagVzMLYERg56DJJ4GKAM3x3/yTzxL/ANgq6/8ARTV0Fc/47/5J54l/7BV1/wCimroKAILm0iuzF5wLLFIJAnYsOmfXB5+oFcrNoGov4I8Q6YsS/ar2a8aBd4wRI7FcnoOCK7GigDndU0nVLy40N1mtXSzvVnlHllDtEbqcHccn5q149PiW+lvZf3tw6+WrMP8AVx/3V9Aep9T9ABbooAwpLC60Dwylj4esors20ZWK3uLjytw9A+0jP1GPcVa8P2U+l+GdNsbgK09taxxSCM5BZVAOCfetOigDHXTZ77VodTvgqC1VvslsDnYzDBdz0LY4AHABPJzxT0Ww1aXxLqWs6ta29qWiSztooZ/OzGjMxkLbVxuLDjHGK6SigAooooAK5/x3/wAk88S/9gq6/wDRTV0Fc/47/wCSeeJf+wVdf+imoAPAn/JPPDX/AGCrX/0Uta+o3i6fpl3eshdbeF5SoOCQqk4/SsjwJ/yTzw1/2CrX/wBFLUHjptQGgyi0T/RxDO15IXACxiCTAx1OWK9PSgDVXWrZrWzkIdZryHzoYdpZiMAnO0HpuGT71XsvElvPFYreW13YXd47RR29xA4O8AkjOMYwpIJxxjoeK5i90Ky07w5YMVe4uplTJQkXN3IQpWFGHKISi7sEYVOe5q9pM7weJoG1fU4rXVZLQx3FgxIimkyuJLcuc4wCGCnn5dwBFAHZ1jWHiK0u7vUreZ4bZrK6Nv8AvJhl/kVt2OMfex+FM8QanfWF3o9tY/Z1N/dm3eSeMuEHlu+QAy85THXvWXcWet+GdJ1/VYdS0+Z3Mt+UewcDcIwNufO6fIPzoA25vEelRaJJrEV3HdWaHYHtiJd77toVcdWLYGPWjStfg1P7Uj21zY3Npjz7e7Cq6AjIbKsylSAeQT0PcUs9hH4g8Ox2+oZHnxRuzQkoUcYYMnXBDAEdeneuF+I+mNoXw71iRNQvLq61GW3t7q8uSnmGIuF2/IqqAASOAOpz1oA2W+K3hUOzrcXklij+W+ox2UrWqNnGDIFx179PeuzR0ljWSNgyMAysDkEHvVexsLWw02CwtYY0tYYhEkar8oUDGMVaoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOf8Zf8gO2/wCwrpv/AKWw10Fc/wCMv+QHbf8AYV03/wBLYa6CgDl7qxuY/iBFqn2a7ls49NdAwlLp5zOoAWMnCnaOTgDnk8VX1XSL2TQtZvJoi+o3zRYhi+fy40YbUGOpGWY+7HsK7CigDF0fSr601PVNS1K6gnnumRIxbwsipCmdowWYlvmYk+/FZKq91DceJR4daS9nlS3FtcoVla2VyoO1uFb5mfkDjAOOo7CigDmbrT3lvbry9EtRNp5S6064A2JI5VgUO05yOR3HzA44xW9YXL3mn29zJby2zzRq7QSjDxkjO1vcdKsUUAFFFFAHP+If+Q54T/7Csn/pFdV0Fc/4h/5DnhP/ALCsn/pFdV0FABUbTxJMkTyossmSiFgC2OuB3xXLalcW914mUbZrPVdNIEMrH91NFKrctjG5RsYlTggp6c1hWsEM15Z6fqbTz6iB5ulvLeXKNKUTa8zqHxCHJYL7HoelAHpVRxzwzNIsUqO0bbHCsCVbrg+h5FczoM89l4bvtUlttUNy7yO1jd3BlMTJ8mxGYn5PlzuzznPHQcrot5d2upWl69s5jmMX2qJNRlZJZboby5jKbTgDAXjr1PWgD1So5p4bePzJ5UiTIXc7BRknAGT6kgV5W1hY6pb6jYWekW819qczOiiJFSxhR1iblgBxtJOzOWY43Dmuk8f6lAtlBo8LJ9sea2nVSMqircxKCwHYk8fQ0AdlJJHDE0srqkaDLMxwAPUmlBBAIOQehFeaeIZ9f1HS/Ed7NapDbwaQ9rLbNetsWUqzOygIQ/ylACcdx612ukSasREl3Z2MNmLdNjQ3TyPu9CpjUAY96ANeiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOf8Zf8gO2/wCwrpv/AKWw10Fc/wCMv+QHbf8AYV03/wBLYa6CgAqJbmB4WmWaNolzucMCox1yfbBqO7tprlUEN9PaEHJMKoS3sd6tXn2j218vgjVdl7qhQTX+di2u1v3smTyu7nv+lAHpCOksayRsrowyrKcgj1Bpr3EMc0cTzRrLLny0ZgC+OuB3xXP+ENNnt9E0q5bVb2eJtPhVbWRYhEnyg5G1A2e3JNYuoa1BJ46v53gkc6LpjtaOY90ZlY/vCADuJG1V4H9/mgDu/Nj84w+Ynmhd2zcN2OmcelPrgNO1i7vPEsOpCzDzy+Hopm3Hyo8lyx65YDt0Ndjot/Jqmh2GoSxLE9zbpMY0fcF3KDgHAz19KAL1FFFABRRRQAUUUUAFFFFABRRRQAVz/jL/AJAdt/2FdN/9LYa6Cuf8Zf8AIDtv+wrpv/pbDQB0FFFFAHn/AMU/+ZK/7Gux/wDZ69Arz/4p/wDMlf8AY12P/s9egUAUr2W/yYrG2i3kf6+4fEa/gPmYj0+UH+8K5fwdpcuoW39vajqNxc6s8s8HnlIwsaLKybY1KnYpCjOOT3Jrtax4PCnh+3jKJo1kQWZy0kKuxZiWJLNknknvQBX0O9vZdU8QwXFxLdJZ3SRwIVRSFMKORwBnJY9a5htERPGF/c3qzyalLZw35a0OHV0mYJGh9NuEPYgtnGTXeWOl2GliYWFnBarM/mSCFAoZsAZwPYCniythqBv/ACh9qMQhMmTnYCTj06k0AcLDoU1t4i0q2munW/urO/uJp42zsmeSFvlz2U4AHcDnqa7DQLrULzRLeXVbX7NfDck0Y6FlYruX/ZbGR7EUsOhaVb61NrENhBHqM0YikuFTDMuc4P6c9eB6CtGgDn/Hf/JPPEv/AGCrr/0U1dBXP+O/+SeeJf8AsFXX/opq6CgAopG3FDsIDY4JGQD9Ky2j1tELPqemKoGSTYvgf+RqANWiuU0HWtf1XWpD9mtJdAVCEv8Ay2gaZ/WNCzbk/wBo7c9Rkddm+1lLLVLLTha3E892kjp5WzChNuc7mH94UAaVFYV7quqi+SwsbGx+0yRGULd3ToQoIBOEjYHBI43CtTTzeGxi/tA25uwMSm2z5e7/AGc8j8aALNFcVqPi68tfEWpaes1jFHatGE8wR7mDIGOd9xH3J6Cl0vxbeXniOx05pbKWK4WVnMYj3LtXIxsnk/UD60AdpRRRQAVz/jv/AJJ54l/7BV1/6Kaugrn/AB3/AMk88S/9gq6/9FNQAeBP+SeeGv8AsFWv/opateI7SXVNKfSo0Yre/uZn7JEfvkn1K5AHqR2zVXwJ/wAk88Nf9gq1/wDRS10FAHFaj4X+wfYlsYGvFbVI3SOXJW1g2ndGpwdseRnHTkDsKspoKy+Ooby40ezW3hsCI5FUOqy+YCCMqMNjPIrrKKAOdvIE1zXzbT6Y7Q6WomhuLiNhG87qQNvI3hVJz2yw7iqwtjqdlp0N74Zhjt9RikivogoD2x2nncMfKcEcYPIrq6KAMzRZ7qSCe3u7M27WkxgRhnZMgAKuuecYIBz0IIyetL4g0O08SaDeaPfAm3uoyjFeqnqGHuDg/hWlRQB5/bWHxOstOXSor7w9OkYEUWpyiXzhGONzRY2l8f7WPWu8t0ljt4kml82VUAeTbt3nHJx2z6VJRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAc/4y/wCQHbf9hXTf/S2Gugrn/GX/ACA7b/sK6b/6Ww10FABRXn3iHxNqNlr1/DHqqWtzbvCNP0owox1IMAWOSNx5LL8hG3bk5q3rHiXXNQ8Vv4X8LR2kdxaxLNqF/eKXS3DfdRUBG5z15OMUAdtRWD4ei8UW01zb+ILnTryBQpt7u1jaJ39Q8ZyB9QfwreoAKKKKACiiigDn/EP/ACHPCf8A2FZP/SK6roK5/wAQ/wDIc8J/9hWT/wBIrqugoA5W8vdQuPH9vpscdqIrewe7jZpCSXZhGCy44wC+ADznqK5+yuYnj8QLf61oy3Ru5YZjdxnzZFjPyc+cu0D+EKBjr1JJ9E+yW32z7Z9ni+1eX5XnbBv2Zztz1xnnFMt9PtbWKeOCEIlxI8soBPzM33j+NAHJeGzqEHw8bU9W1qe/W408XCrJGg8lTHkqCBufnuxJ6d+a5a00q9sr+3t3ayW4hn05GEVsY3VjCwGGLHHIOeDn2r1SLTbOHT4LCOBVtYFRY4snAC42j3xgdabcaRp91eQ3k1pE1xDIJEkxg7gCATjrgE4znFAHDHw1ZweMY7OHw9o8oTSGKRXDZV2Eq4ZmMZJOepwTW/4xMp8L25mREl+22W9UYsoP2iPIBIGR74Fb/wBitv7Q+3+UPtQi8nzMnOzOcenWi8sbbUIBBdRCSMSJIFJI+ZWDKePQgGgDmvGz6b/wh+ugXaJILKf92lyV+baxOVB5OTV3Sp9Dg1CCOHUw+o3VsuIHv3k3Kg5KxliBjPUAGugxjpRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBz/jL/kB23/YV03/ANLYa6Cuf8Zf8gO2/wCwrpv/AKWw10FAFW9lkt4nnN1bW9vGhaR50JCgdSTuAArhNC0G21XwzqLRWFvMJprlorm60tUkuA7MwdN0mdvzYUtjOAeld5d6faX5j+1wLOsZ3KknKZByCV6EgjIJHHarNAHIeFryW9+y2lnrdu0GlwC1vbCSwaO4VwoALEyfJ044IPOCeCK+o28Vp4j1OCFNsa+HWwP+2jkk+pJ5zXWJpdjHqsuqJbIt9NEsMkwGGdFJIB9cZNPNham+a9MKm5aEQM57pknbjp1JoA47TdE1C+trO4trj7JHN4dgtUuNqvtkOT9w9Rgg9vrXSeHntF0mOxs5RJHp5NkTuBIMfy846HgH8aqnwL4QJyfCuhkn/qHxf/E1q2Gm2OlWotdOsraztwSRFbxLGgJ6nCgCgC1RRRQAUUUUAFFFFABRRRQAUUUUAFc/4y/5Adt/2FdN/wDS2Gugrn/GX/IDtv8AsK6b/wClsNAHQUUUUAef/FP/AJkr/sa7H/2evQK8/wDin/zJX/Y12P8A7PXoFABRRRQAUUUUAFFFFAHP+O/+SeeJf+wVdf8Aopq6Cuf8d/8AJPPEv/YKuv8A0U1dBQBHMJmUCB40bPJdCwx9ARXJeO7S5udAt4Lia3eKTUbNWUQsuczp3312Nc14osta1KfTbOytLWSy+2wzz3DzlHhWNw/3Np3Z244I6jjvQBp3NvrL+T9m1GzhCyK0m6yZ96Dqo/eDBPrzj0rnfGHl/wBvWkr20NyLXSr64MU6b0JXyiuR9RXaVhX2ktcT6jPLA873lv8AYkVHC+XFg5JJ6ZLHOAeAvBxQBz8Wi6fP4otM2GmCZ9KaYxjTF8oAuvJO/O7PA46Z5rb8GrDc+DrKdLO0sjdx+dJHYReQm5jyQAc5980WegX1u1xfG+iTUpokhQeUZIYY1ztTGVZhkklsqST2GBU/h611DTfDy2M1jawzWmYoUhnYxyKPutlgWXPoc496AOUv9UuLDVPEH2SFEFpINzeYd0xEKNliblCTzj7p4A602y1a71HVdDt7pR5Wohw7LMyvGPKL/IyXLEHgDJUfga6C80/xBcWd7DFFZRNdI4Yi7GCSu0E/6Pk8YHXPFRR6Z4nh0+yije2E1oiBcXqhX2rjaSbUkKe+MH3oA6i1to7O1itojIY4lCL5kjSNgerMST9SalqK3M7W0RuUjScqPMWJyyhu4BIBI98CpaACuf8AHf8AyTzxL/2Crr/0U1dBXP8Ajv8A5J54l/7BV1/6KagA8Cf8k88Nf9gq1/8ARS10Fc/4E/5J54a/7BVr/wCilroKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA5/xl/wAgO2/7Cum/+lsNdBXP+Mv+QHbf9hXTf/S2GugoAK888LzJpnxZ8YabdkR3GofZ7213cebGE2tt9cGvQ6xfEPhLQ/FMUKazYJcGBt0Mgdo5Iz/supDD8+1AGqLq3N0bUTxm4VBIYt43hScBsdcZ71LWHoHg/QvDMlxLpViIp7g/vp5JHllf2LuS2PbOK3KACiiigAooooA5/wAQ/wDIc8J/9hWT/wBIrqugrn/EP/Ic8J/9hWT/ANIrqugoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOf8Zf8gO2/7Cum/wDpbDXQVz/jL/kB23/YV03/ANLYa6CgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuf8AGX/IDtv+wrpv/pbDXQVz/jL/AJAdt/2FdN/9LYaAOgooooA8/wDin/zJX/Y12P8A7PXoFef/ABT/AOZK/wCxrsf/AGevQKACiiigAooooAKKKKAOf8d/8k88S/8AYKuv/RTV0Fc/47/5J54l/wCwVdf+imroKACiiigAooooAKKKKACiiigAooooAK5/x3/yTzxL/wBgq6/9FNXQVz/jv/knniX/ALBV1/6KagA8Cf8AJPPDX/YKtf8A0UtdBXP+BP8Aknnhr/sFWv8A6KWugoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDn/ABl/yA7b/sK6b/6Ww10Fc/4y/wCQHbf9hXTf/S2GugoAKKKKACiiigAooooAKKKKAOf8Q/8AIc8J/wDYVk/9Irqugrn/ABD/AMhzwn/2FZP/AEiuq6CgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA5/xl/yA7b/ALCum/8ApbDXQVz/AIy/5Adt/wBhXTf/AEthroKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK5/xl/wAgO2/7Cum/+lsNdBXP+Mv+QHbf9hXTf/S2GgDoKKKKAPN/jFfW+mad4Tv7yTy7W18S2c0z7SdqKJCxwOTgA9Ksf8Lt+Hn/AEMP/klcf/G6Pin/AMyV/wBjXY/+z16BQB5//wALt+Hn/Qw/+SVx/wDG6P8Ahdvw8/6GH/ySuP8A43XoFFAHn/8Awu34ef8AQw/+SVx/8bo/4Xb8PP8AoYf/ACSuP/jdegUUAef/APC7fh5/0MP/AJJXH/xuj/hdvw8/6GH/AMkrj/43XoFFAHk/iz4v+BNT8G65YWeu+ZdXWn3EMKfZJxudo2CjJTAySOtbH/C7fh5/0MP/AJJXH/xuug8d/wDJPPEv/YKuv/RTV0FAHn//AAu34ef9DD/5JXH/AMbo/wCF2/Dz/oYf/JK4/wDjdegUUAef/wDC7fh5/wBDD/5JXH/xuj/hdvw8/wChh/8AJK4/+N16BRQB5/8A8Lt+Hn/Qw/8Aklcf/G6P+F2/Dz/oYf8AySuP/jdegUUAef8A/C7fh5/0MP8A5JXH/wAbo/4Xb8PP+hh/8krj/wCN16BRQB5//wALt+Hn/Qw/+SVx/wDG6P8Ahdvw8/6GH/ySuP8A43XoFFAHn/8Awu34ef8AQw/+SVx/8brH8WfF/wACan4N1yws9d8y6utPuIYU+yTjc7RsFGSmBkkda9Yrn/Hf/JPPEv8A2Crr/wBFNQBw/hP4v+BNM8G6HYXmu+XdWun28MyfZJztdY1DDITBwQelbH/C7fh5/wBDD/5JXH/xuug8Cf8AJPPDX/YKtf8A0UtdBQB5/wD8Lt+Hn/Qw/wDklcf/ABuj/hdvw8/6GH/ySuP/AI3XoFFAHn//AAu34ef9DD/5JXH/AMbo/wCF2/Dz/oYf/JK4/wDjdegUUAef/wDC7fh5/wBDD/5JXH/xuj/hdvw8/wChh/8AJK4/+N16BRQB5/8A8Lt+Hn/Qw/8Aklcf/G6P+F2/Dz/oYf8AySuP/jdegUUAef8A/C7fh5/0MP8A5JXH/wAbo/4Xb8PP+hh/8krj/wCN16BRQB5//wALt+Hn/Qw/+SVx/wDG6P8Ahdvw8/6GH/ySuP8A43XoFFAHn/8Awu34ef8AQw/+SVx/8bo/4Xb8PP8AoYf/ACSuP/jdegUUAef/APC7fh5/0MP/AJJXH/xuj/hdvw8/6GH/AMkrj/43XoFFAHn/APwu34ef9DD/AOSVx/8AG6P+F2/Dz/oYf/JK4/8AjdegUUAef/8AC7fh5/0MP/klcf8Axuj/AIXb8PP+hh/8krj/AON16BRQB5//AMLt+Hn/AEMP/klcf/G6P+F2/Dz/AKGH/wAkrj/43XoFFAHk/iX4v+BNQ0qCG113zJF1CymI+yTjCR3UUjnlOyqx98cc1sf8Lt+Hn/Qw/wDklcf/ABuug8Zf8gO2/wCwrpv/AKWw10FAHn//AAu34ef9DD/5JXH/AMbo/wCF2/Dz/oYf/JK4/wDjdegUUAef/wDC7fh5/wBDD/5JXH/xuj/hdvw8/wChh/8AJK4/+N16BRQB5/8A8Lt+Hn/Qw/8Aklcf/G6P+F2/Dz/oYf8AySuP/jdegUUAef8A/C7fh5/0MP8A5JXH/wAbo/4Xb8PP+hh/8krj/wCN16BRQB5PrPxf8CXeq+HpoNd3x2moPNOfsk42IbWeMHlOfmdRx6+ma2P+F2/Dz/oYf/JK4/8AjddB4h/5DnhP/sKyf+kV1XQUAef/APC7fh5/0MP/AJJXH/xuj/hdvw8/6GH/AMkrj/43XoFFAHn/APwu34ef9DD/AOSVx/8AG6P+F2/Dz/oYf/JK4/8AjdegUUAef/8AC7fh5/0MP/klcf8Axuj/AIXb8PP+hh/8krj/AON16BRQB5//AMLt+Hn/AEMP/klcf/G6P+F2/Dz/AKGH/wAkrj/43XoFFAHn/wDwu34ef9DD/wCSVx/8bo/4Xb8PP+hh/wDJK4/+N16BRQB5/wD8Lt+Hn/Qw/wDklcf/ABuj/hdvw8/6GH/ySuP/AI3XoFFAHn//AAu34ef9DD/5JXH/AMbo/wCF2/Dz/oYf/JK4/wDjdegUUAef/wDC7fh5/wBDD/5JXH/xuj/hdvw8/wChh/8AJK4/+N16BRQB5/8A8Lt+Hn/Qw/8Aklcf/G6P+F2/Dz/oYf8AySuP/jdegUUAef8A/C7fh5/0MP8A5JXH/wAbo/4Xb8PP+hh/8krj/wCN16BRQB5//wALt+Hn/Qw/+SVx/wDG6P8Ahdvw8/6GH/ySuP8A43XoFFAHn/8Awu34ef8AQw/+SVx/8bo/4Xb8PP8AoYf/ACSuP/jdegUUAef/APC7fh5/0MP/AJJXH/xuj/hdvw8/6GH/AMkrj/43XoFFAHk/iX4v+BNQ0qCG113zJF1CymI+yTjCR3UUjnlOyqx98cc1sf8AC7fh5/0MP/klcf8Axuug8Zf8gO2/7Cum/wDpbDXQUAef/wDC7fh5/wBDD/5JXH/xuj/hdvw8/wChh/8AJK4/+N16BRQB5/8A8Lt+Hn/Qw/8Aklcf/G6P+F2/Dz/oYf8AySuP/jdegUUAef8A/C7fh5/0MP8A5JXH/wAbo/4Xb8PP+hh/8krj/wCN16BRQB5//wALt+Hn/Qw/+SVx/wDG6P8Ahdvw8/6GH/ySuP8A43XoFFAHn/8Awu34ef8AQw/+SVx/8bo/4Xb8PP8AoYf/ACSuP/jdegUUAef/APC7fh5/0MP/AJJXH/xuj/hdvw8/6GH/AMkrj/43XoFFAHn/APwu34ef9DD/AOSVx/8AG6P+F2/Dz/oYf/JK4/8AjdegUUAef/8AC7fh5/0MP/klcf8Axuj/AIXb8PP+hh/8krj/AON16BRQB5//AMLt+Hn/AEMP/klcf/G6z9X+KXg3xHHp+k6TrP2i+n1XT/Li+yzJu23cTHlkAHAJ5NeoVz/jL/kB23/YV03/ANLYaAOgooooA8/+Kf8AzJX/AGNdj/7PXoFef/FP/mSv+xrsf/Z69AoAhmvLa3YLPcQxMRkB3Ck/nXOjxvY/8Ind64wiBtxMTbC4Us3lsy8H325HHety7j1B5FNnc2sKY+bzrZpCT7EOuK8o+1Xc+ry2QNsPDi2t2rOI5tlwhlj86XZ5udoZ2w27oGx2oA9UtNa02+u3s7e/tpbuONZZII5VZ0U9CQKqr4hE2pX1la6XfXL2UixzPGYlXcyBxjc4J4Ydqn06HU0meS71CzubV0XyUt7RoyvvuMjbgfoKwNLlA8WeKQLm7jxdQgiCDeP9RH1OxuaALz+LkTRZ9X/sfUjZQJI7yAwZAQkNx5meCproIZVngjmUMFkUMAwwQCM815u8n/FqNWH2q+/1F78v2b5T88nU+X/WvRbP/jyg/wCua/yoAxfHf/JPPEv/AGCrr/0U1dBXP+O/+SeeJf8AsFXX/opq6CgAooooAKKKKACiiigAooooAKKKKACuf8d/8k88S/8AYKuv/RTV0Fc/47/5J54l/wCwVdf+imoAPAn/ACTzw1/2CrX/ANFLXQVz/gT/AJJ54a/7BVr/AOilroKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA5/wAZf8gO2/7Cum/+lsNdBXP+Mv8AkB23/YV03/0throKACiiigAooooAKKKKACiiigDn/EP/ACHPCf8A2FZP/SK6roK5/wAQ/wDIc8J/9hWT/wBIrqugoAry31nDIY5bqCNx1VpACPwrK0TxTY6zZy3XmQwRC4kiiLzqfNVGKhx6A4OKp+J9Wle8tfDunOUutQYxzXC5zbR7CxI4xvKqQoJGOvQcwyTSaf4n8O6dZ2V3BZR2dwq2ySIFYKIwuRvwcAnr60AdHYarp+qrM2n3tvdCCQxSmGQNscdVOOhqLXtU/sTQb7VDCZxaQtKYw20sAM4z2qS3lub+xkMltc6bKWZFDtEzgA8MNpZeeuD+IrgvFrajLD4lshqt1c6dZ6NJ9oSVIgGmkB2rlUB4RSev8QoA9HSQNEjthdwBxnue1PrkNEsoNWnFvq8n2m60WRVitnGFXjMcxH8bFejHgEEAAgku8ZfZjqnhkXkBntzfuHi8gzbv3EuPkAJPOO1AG3JquzxHBpHkEmW1e583d02sq4x77v0rRyM4yMjtXnc0Xhz/AIT20A0P9z/Zs2U/seTlvMjwdvl5PfnFaXhyHTh471xtPsRap9htVx9ka3P3ps8FQfTn2oA3J/EljaX1/aXQmgezgW4ZmjJWSNiQChGc8gjHXPbkVAPFEX9qNbNpuqC38kSLdCwnKls4KEbMg9D3HXpWY9pcsbzT9UurK7SzUzpPdoCscbPmIyA8MyBGPbOASc81jLBLD4euzcyXlloLZNpfDebqKQks11L3COzHK4wB1ABOADvLHV7HUdJXVLaYtZsrOJHRk4GcnDAEdDWdo/iqDV7dglndJfpAtw9k0TK4RiQvzOFXJwe/rWZ4huYtR+HUkljq0V1GqRpLPYupWbBUMAVOFBz27ccVzkU89lqU1xHLqkLNLqCtm5aUy+WUSNApdgXAIUEg8nvQB2MHjGCdLaVdL1AQ3F59iSU+TtEgYqf+WmcAq3IB6cZrYuNVtLW+ispXf7TLG0qRpEzkqpAJ+UHoWH51wPh6K/udat7C90u9ih0d7crbW7wiGKRoeXfdIWYAsxG0knOTk9Oh1LH/AAn9k5uTbpBpVw8kuVG0GSLruBAHB/KgDTj1tm1SW1fT7xYFjWSO6EDlGJOCpG3IYde4x37VPDrFpKLtn8+3jtWAkluoHgQ5GcqzgBh2yK8ym1K3/wCEN1bTluWJmubllP2izVGDTMwYgsGxjB6fSvSLZXttOubuC9uNWSVTNAhMWCNvCRlVUYPbJPXrQBS0zxlo+pXd3At/Yx+Vcm3hJu0JuCFBYqPQHcO/3SasN4m0+G+uobmaGC3ghEwu2mXymXnIJzwwxyPQg59Oa8I3+tWUkmkXGjXHmJax3EoZoRtnlMjuWYSE7SwwMAkelS3M1/a6Hb6ZaXc8uuX9/LH55mIEEg3OzAEH92oUYTGCCB1OaAO2iljniSWJ1kjdQyupyGB6EHuKz7/VzZa1pWnfZmk+3mUeaGAEexd3I755puo6jcaV4fNzNGs1/wCWqLDF0lnIwFXPYt+Q5rn47PULLU/Btvqt817fr9p8+cgDLGEkgYA4HQd8DmgDtaK5zT9flg8TS+GtUH+lmI3FlcgYW6hBwc+jqcAjoeCMZwOjoAKx9V1waZqmnWJjiJvRKRJLN5apsAPoc5z+lbFcT40lnGu6NJp08i3dn5ktx5ezENswG+R2cELwpCjHJ9gaANa88S/Y7jT4vLs5/tl0ltiG83Mu4E7sbeQMV0FcFcXcGoz6VK+o6xMIVGrRwzQQLviQEZOApX746kZ549Oz0y/TVNLtNQijkjjuYlmRJQAyhhkZAJ559aAMnxl/yA7b/sK6b/6Ww10Fc/4y/wCQHbf9hXTf/S2GugoAp6rff2Zo97f+UZfs0DzeWDgttUnGfwqa1n+02kM5XYZI1fbnOMjOM1jeM4oD4Q1iaWGN3Sxm2MyBiCUOMZ965PxDp1vbtqarBCph8PxqQsYByZTn/wBAH5UAel1n32p/Y9S0608rf9tkdN+7GzahfPTnpisa5tLa3+Iei+RbxRZsLvOxAv8AFD6VkatG+s+ItHik8ORWsD3FwjPqUcb+d+6fJ8tSdyn/AGmU+1AHTSeJrC31u80+6ngt0tbeOdp5Z1VfnZhjnpjb+orUuLu2tIRNc3EUMRIXfI4Vck4AyfU15rqD3jTa5N9geWyuYYvsc9rFhHjtn3uCuTjdubaejBT7Z2/EWs2+t+Fba+0uSG5i/ta1SJxJ8khW4QZ3AHjPsaAOsttRsbyaWG1vLeeWHHmpFKGKZ6ZAPGaq2+sC48R32kfZ3U2kEU3nbhtcSFxjHXI2GuTXUG0zVvFWqanbOsdtJbNcLZ3LnZH5Qy/AUtjqRjpnGehuWul2l7481TdJdlEs7KZCl5MhJDTEZIYEj2PHtQB0Ov6sNC0WfUTEJREUGwvtzucL1wcYzmql/wCIvsOnXV2Tp0ggieXYt9y20E4Hye1QeOtknhO6tg8n2icottHCoaSWUMGVVB4ydvU8AZJ4BrBl1Ca+0Ce11HV9VS5kYabceTDbPGLmRQCi/ICwBbseOckYOADurC6+26dbXZj8vz4lk2Zzt3AHGfxqrqetQ6bfabZmGWe4v5jFGkQBKgKWZzkjCgAZPuKg0HUYp7G4tYLe5B0txZt5gTMjIin5cMR3A6jmsu7e40S4n8RalbR3FzK0drBFHKcwo7hVjUYwSWILNnnHoooA6G0vvtN5e2zRiN7aRV+9kspUEN046kd/ump7hp1gY20ccko+6kjlFP1IBx+Vcdr0utf8JZYx6RFZw6n9jlmJkuGaK4iRkHlOuwEcvlXB+U54IJFdTDNqbWsDTWdtHcMmZY1uWZUb0DbPm+uBQBXku9aijaSSw0xEUFmZtQcAAdST5NUvC/iW58R/apG0iW1s42At7zzN0V0O7JuCtj0JXB7GqHiSO9vfEXhyzmij+zSyzNLALlvLnCxkhXBTBGcHGOorofM1j+0LdRaWAsSrec/2lzIp/h2r5eCPXJFAGhXP+Mv+QHbf9hXTf/S2Gugrn/GX/IDtv+wrpv8A6Ww0AdBRRRQB5/8AFP8A5kr/ALGux/8AZ69Arz/4p/8AMlf9jXY/+z16BQBnanp8+qK1rJcGCxYYkEJIklHdd38K+uOT6jvhT6BcjxVp6289zFZxaXPb+bFFEFiy0W1QChXoDgEHpXXUUAc94e8Lv4cmeO21i9m03YBFYzhCsTdyrBQQD2UYUc4GOBvJDFG8jxxorSHc5VQCxxjJ9TgAfhT6KAMTwnDNB4dijuIJIZPOnOyRcHBlcg49wQfxrboooA5/x3/yTzxL/wBgq6/9FNXQVz/jv/knniX/ALBV1/6KaugoAKKz9a1GfS9MkubXTbnUbjISK2t8BnYnAyTwq+rHoMmsPwl4pu9T8LX+ra7FbW0llc3MUy224oqxMQeTyTgdeM+goA6yivPJfGPiK08KW3jG5t9O/seUpLJYLE4uIrdzgP5u/azAFWK7B3Ge9ac/iLVdS8W6hoej3Om2Q0+1juHlvoHmM/mZI2qsibVGOWyeT0GOQDsKKwfBmvy+J/C1nqs8CQyy7lYRklGKsV3ITztOMj2Nb1ABRRRQAUUUUAFc/wCO/wDknniX/sFXX/opq6Cuf8d/8k88S/8AYKuv/RTUAHgT/knnhr/sFWv/AKKWugrn/An/ACTzw1/2CrX/ANFLXQUAFFcb8QPFmr+GdJnm0fR/tUkMBuJbq5O23hQHGDggu57KMdckjvb8aeIr3w94In1myS3a6TydqzKzJ87qpyAQf4j3oA6eisvTIddjlZtU1HTrmIr8qWtg8DA+pLTPke2B9as6iNQa0K6Y1qlyzACS5VmRFzydqkFjjtlfqKALdFcromu6sfGGoeG9X+xTyQWsd5FdWcTRKUYldrozuQ2QSDu5HpXVUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBz/jL/kB23/YV03/ANLYa6Cuf8Zf8gO2/wCwrpv/AKWw10FABRWHrC+KDJO+kXGkQQxxZjW7t5JmlfnIJV0CDoP4u546Vgp8QJbzwXoep2dii6prUy2ltbyuTGkpJDMxHJRdrHsSABxmgDuqK5K21/VtO8WR+H9bNlcNd2j3Nnd2kLwglCN8bIzvzggghvwqv4K1fxR4n0LT9bub7R4be4LF7aPTpd4UOVwJDPjPHXb+FAHa0VHOJmt5Ft5EjmKkRvIhdVbsSoIJHtkfWuI1/WPFmhXmj2i6lod5daleLbx266ZLGdnWR8/aDwqgnp6UAd3RRRQBz/iH/kOeE/8AsKyf+kV1XQVz/iH/AJDnhP8A7Csn/pFdV0FAHP63a3A1TRJLCzWQxXUsrj7iDMLjLMAcZJHODUF1ZeILjxFp2piy0wJaQzRlDfSZbzNmD/qe239a6eigDNgm1oxXRubKxSQEC2WG6aQNx/GSi459M8VzXiTTbrTfBGoadZafearfamHWaeBUGZpON7gsCFHA4ztUDsM129FAHNa74cvbq6s9W0S9jsNZtkEReVC8U8WcmORQQSM8gg5B6da6JEbZGZtjyqOWVcDOOSAScfnT6KAOfntbo/ECyu1hY2i6ZPG8uOA5kjKjPqQD+Vb+BknAyeppaKAOQ0zw7JFfeJ5r20kaO5uxJaiWYzB1EKAHBJ6OGwD07YrnX8M3jfDqxtm8L6aLsQWquynNxkMm4lfK64zn5vXmvUaKAMTXNKS80dNHtraNLe4lRZFVAESMMHfI6cgEfVq5rSvDBsvFcP8AxKBaxiW+l+0W6hB5buhjG5eQeD8vpXoFFAHKWOgLL4i8QNcLfJbyy2zROt3NHv2xjOGVgSAeP0rRVRb65d6lPFOTIiWsCpCznapJJOBxlmPXAwoNbVFAHFaxp2v6iJBHYD+x5XDXGmNcqs8453AMAUVScZXd82T8y8g7en3s+sadcQR6fqWhug8pHnjhDIcdUAZ1IH0IraooA46z0x9L8U6jc3UWo6iHtrZYppMuZZFMhPAAjUj5ecKBntVa50/XNO8QP4tXTEvC8Zik0yCTMsUfH7xCSEaUhQGXjIAAY4+buqKAKsKxXq2t9LbSRyhNyJMMNHuHOQCQGxx69R61gXh1G98eaTH/AGVcR2lgs8z3rMpifcmxVXBzuyeQQMY711NFAFeWxtZr23vJIEa5twywyEcoGxux9cCsHT/DJtvH2reI/NuFW7to7fynlDKxXqwUfdGABzznd079NRQAVzusacJ5HhNtLcwyuJWs7ePy1nYcZmlPBXgfLwcDGGHFdFRQBwOsaZrFvp2oqthLfazryfZWuLUr5FkmCApLEMEUFjkAlmJ4GQK7m2gS1tYbeMYSJAij2AwKlooA5/xl/wAgO2/7Cum/+lsNdBXP+Mv+QHbf9hXTf/S2GugoAx9ctJtVEGnIn+jl1muWbhWVTkJn/aYDPooPqK5u/wBO17UrDxLeX2mx21zcW6WdpbwT+fvVGY784XAYv0IBAHOK7yigDn5dO1F/GWmX8nlSWsFpcRu6Js2szRFRgsSc7T09KqXek3F5d6nrJ0K1Op26vBpyzSA+fHtGd+DtG45UZ5A69SK6uigDMZdTkupYAI4LN7UeXKhHmQzdCMdGGMEH2PXPGM3h++vPCVhZta2OnXwu4Lq5W1ULHuSUO7AAEZYLnnPJ5PeusooAxtP0V7LVNYvJrj7Ul+YyI3QAgIm0gkYBz9PzqjoX2268Ya5fz6ZdWMHk29tH9p2ZlKGRiy7WYFcOvOfUdq6eigDL1e3ZwsscjwvtMZlgg8yYKeyHkJkgZJBH061z40qexFvqkukzNaaWjNY6Tauskxdh80rksA0mCRjcerHcxPHaUUAYPhGxurLQjJfwmG8u7ia7niJDFDI5YKSOCQpA49KWezn1vU7OeaNodOspPPjjkGHuJQCFJX+FVzkA8lscDHO7RQBy+mi+1PxtdalcaZdWNrZ2hs4jclczOzhmZdrEbcKvJ9TxxXUUUUActetf3vjzR4xpN1HbWKzTSXrFDCwZNgUENndnsQK6miigArn/ABl/yA7b/sK6b/6Ww10Fc/4y/wCQHbf9hXTf/S2GgDoKKKKAPP8A4p/8yV/2Ndj/AOz16BXn/wAU/wDmSv8Asa7H/wBnr0CgAoqlf6vY6Wu69n8lP77I23v3xjsaoXPi3R7W3uJZbkoYF3+XKvktKMZzH5m3ePcZGeOtAG5RWXpviPRdXaFLDU7WeWWLzlhSUeZs45K9R1HUcVqUAFFFFAHP+O/+SeeJf+wVdf8Aopq6Cuf8d/8AJPPEv/YKuv8A0U1dBQBWv9RsdKtGu9RvLeztlIDTXEqxoCeBlmIFea+C77Ttc8H+JtEsdUsZb+7u9RMUCXCM5V2ba+0HO05HPTmvU6KAPIbvWLXXPhHa+FIJN/iKaCDT5NNH/HxDIrKHZ06qqhSSxGMd+ab4g0/w/rvjDVNP8dX0Gm29jbRw6V5kiWxljZPnlWU4LkNkbMlR3U5r2CigDlPh1cajc+D4DqABWOSSK0l8nyTNbq2InKAALlQOgHGD3rq6KKACiiigAooooAK5/wAd/wDJPPEv/YKuv/RTV0Fc/wCO/wDknniX/sFXX/opqADwJ/yTzw1/2CrX/wBFLWhqcOsS+X/ZV9Y2uM+Z9qs3n3emNsqY7+v4Vn+BP+SeeGv+wVa/+ilroKAOB+KOrWVj8OdV0/UdVsE1Key+SIyLE0xyMlI2YtjOeMn61sS674TvvCyTX99pV7pDNHBM7sk9ur8EBzyq84+9gA49RXTUUAebaJFpJ+JNtL4KW0XRxZSLqr6btFoz5HlD5PkMgyx45CnntXS3Hirw3faDJdy6o8WmvcNZvdK0tuI5AcEGQbTGMjG7IGcc810lFAHm/hX7HD8RbweF7sahotzZ+bqF15v2oLcghUUXBJZjtydhZsdQBmvSKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA5/wAZf8gO2/7Cum/+lsNdBXP+Mv8AkB23/YV03/0throKAPO/HXjG1/tNfB9trVlpdzcR7r++ubhYhawHqELEZlYHgDoOT2qHXxpdjovhLVPD80FzoWhagnnS2biZYodjRs5K5zt3ZY/U16VRQB5/JfWPiH4jabq2mXCXum6Pp9y1zd2p86LfJtAjDLkM20ElRk9PWsXXh4Ru49NbwCmkHxEb2F4G0dUWRE3DzDL5fIj2Eht/HIHWvWqKAKEWtafPrlzo0dxu1C2iWaWHYw2o3CnOMHp2NcnoJHif4iarr5+ax0cHTLAgnDSdZ3H44TPsa7uigAooooA5/wAQ/wDIc8J/9hWT/wBIrqugrn/EP/Ic8J/9hWT/ANIrqugoAKKqTanZ2+pW2nzTiO6uVZoEYEeZt+8AehIBzjrjmsy58Z+H7W6tIH1S1P2pzGrpMhVGAJw3OVyAeTxx9KAN6iqtlqVhqQkNje210Im2uYJVfacZwcHg4qCTxBosUjRyavYI6khla5QEH0IzQBo0VlxeJdDnv4LCHV7GW7nDGKGOdWZ9oycAGrt3eRWUQklWZlJ2gQwvKc/RATQBPRWHfeLtH0uze8v5Lu1to8b5p7GdEXJwMkpjrWzHLHLCs0bh42UMrJyGB5BGOtAD6Kw38XaQk7W++8a4Vd5hWwnMmOuQoTJq3ea1aWVtFM29/NkhjCIPnHmsFUlTggZPf0NAGjRUFpe219E0tpPHNGrtGzRtkBlOGH1BBFT0AFFFVLvUoLJ1SVLliwyPJtZJfzKKcUAW6KxJvFujWtzaW93cTWst3KIbcXNrLEJHP8ILKBmtl3EcbO2cKMnAJP5CgB1FZD+J9JRpV+0SO0RAlWO3kYx84ywC/KAepPAwc1X/AOE08PDUnsX1W0Rlh84SmdPLZc4OGB4I9Dj2zQBv0VFbXMF5bRXNrNHNBKoeOSNgyup6EEdRUtABRRRQAUUUUAFFFFAHP+Mv+QHbf9hXTf8A0throK5/xl/yA7b/ALCum/8ApbDXQUAFFVdQ1CDTbR7ifcQqlticuwAydo6kgAnA54pkOrWdxbwzwPJNDNGssckULurKwyCCB6UAXaKoRaxZTamNNV5RdmEziN4HT5AQM5IA6kVDN4j0qCaSKS4fdHcpaPiFyFlfbtXIGOdy/nQBq0VlXXiLT7SC6kZ3drW4S2lijQlw7lQo2987lPHatWgAoqjquqwaPbRXFwkrJJPHABGuTudgq/hkir1ABRRWZd65b2erJpjQ3D3D2sl0ojQEFEIDAc5z8w475oA06KpWerWWoaTHqlnN59nIm9XiRmJH+6BnPbGM5qgvi7SHmkhje8kljYLJGlhOzJkgfMAnA5HJ6UAblFULvWLWzurW3cl3uJmhBTBCMELndzx8o/UVZtLu3v7SK7tJkmt5lDxyRnKsD0INAE1FFFABXP8AjL/kB23/AGFdN/8AS2Gugrn/ABl/yA7b/sK6b/6Ww0AdBRRRQB5/8U/+ZK/7Gux/9nr0CvP/AIp/8yV/2Ndj/wCz16BQB5t8R4Gv9SSx8y5bdaGRIYp3UEqsxJ2qcE8AVW0O7kubSye2utQvdPW7uA7wXNzICgRAg3x7jgNnjp1rqdRtJZ/GyzwG7SSLTgoktkhJAaQ5GZAeu0dPTmsC8W403wl4imvdR1W1Dz3QQfZo2MhIwpYrGQMkgAggenNAG94MuvtNxrmJ7iSKO9CRpNLM5jAiTK5lAI+bdxXVVjaHpVxY21oz6peyxpbqn2aVIQgOBz8sYbI+vfmtmgAooooA5/x3/wAk88S/9gq6/wDRTV0Fc/47/wCSeeJf+wVdf+imroKACiiigAooooAKKKKACiiigAooooAK5/x3/wAk88S/9gq6/wDRTV0Fc/47/wCSeeJf+wVdf+imoAPAn/JPPDX/AGCrX/0UtdBXP+BP+SeeGv8AsFWv/opa6CgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOf8Zf8gO2/7Cum/wDpbDXQVz/jL/kB23/YV03/ANLYa6CgAooooAKKKKACiiigAooooA5/xD/yHPCf/YVk/wDSK6roK5/xD/yHPCf/AGFZP/SK6roKAOY1Bb2XWvsd7bxzWskivYzxkLMnyP5qg54OBgMMcSY7ZrGsZ7nS7m505JJ/7OhjC3U0MxZNLVVAijjJBLsANzk565PBrVnsry5+IoLzX4sU0ttpCgRpI0ighWA+8VXnnIHTFY+kWpitdajTTtakjhv7pYnt78xoFDZ4UzL3zzjn3oA6Tw9HcWWgG4nFvqF3K7SPcWIUfaxuwsnJA3FduecDoOMCszxtqN0/gfW0bRL+NTZyZdngwPlPJxIT+lT/AA90PT9K8Jafc2tkkF1e2sU11Jg75JCgyWJ755+uaPiJqENp4M1K3kjuWku4GghENu8gaRuFUlQduSQMnAoAvyaxqMNkrweGtSnkCrhBNbLn8TLWtNdQ2tm91dOsEMaGSRpCAEAGTk9OKfECIUBGCFFc5420691TSrS3trR722F5FJe2kUiI88K5JUFyF+8FyCRkAigChplpJ421CHX9UhZNHgffpVjIMeZ6XEqnuf4FPQc9Tx2tc+PEOpgADwZrgA6DzrL/AOSKj0u81u98UTTXGgz6fpv2RUEl1PCZGkDk4Cxu4xg9SRQB55Nf6rb61Jr0mo3AkmuzYROIY9oKzbQo+TGdhxz3zWlrr2lpDYvbQ36u2oPbIDICyAXKyOdqhvlVl2rjJG8cc1oG0nPgqfZp2ovJ/aDSAI5IZftm7Ij3ZIxz933qlcy2MEEl7qGoR6fPPqcdxbjUCLdRa/aBKSpbqWAyR14UEDFAHoOhEHR7fy4rSODH7gWk5ljMf8JDFV5I5PHXua0awNPsNI1Hw/cxaLqEgsryWSZbmwuMbXZssY2XgfNnjkdQe9L4Vj8QW1ndWniGWO5lguGS2vFCqbiHAKsyjgNyQenSgDerO1zWrPw/pMuoXrN5aYVUQZeVzwqKO7E8AVo1yfiOz1BvFWj6kulXGqWFlHKywW0kSslwcBZCJXQEBdwGDkE9KAH+HtCuZr7/AISXxBGp1iZNsMGdyWER/wCWaf7R/ibueOgrb1l2TQ9QdHZHW2kKspIIO08gjoazf+Eh1T/oTNc/7/WX/wAkVStpdXn0TxNNqelPp8cnmvbRyTJJIyeUB8wjLKDlT0Y9aAOD0ryrTxPY3AvbpHv7hCmbyQm4VZpA4ALfOOASOeo9a2pbu5t9GsPtMuqwX0l9CrSST3qhgZgSu3bs5TIwD0rSk0q/j07w9bwvqiwxXMACGK22RKFPOEXIx78etPsrd9R8dXywa5qm+1sI43ka2iQozO5xhocdADnH44oA7qioraJ4LaOKSeS4dFCmWUKGc+p2gDP0AFS0AFFFFABRRRQAUUUUAc/4y/5Adt/2FdN/9LYa6Cuf8Zf8gO2/7Cum/wDpbDXQUAc14lRX8QeFVdQw+3ycEZ/5d5axb7UtQg0LxBPb6rfWz2E00VrHDaRmKNVA2jJiPAz61u+IVZvEHhchSQt9ISQOg+zy0258LTXGk6zYjVJYhqMssnyxKVj34HQjJ6eooARc/wDCxYNzFj/YzZJ7/vVrkL+WEa/qUR1PZKfE1mRZbo/nG2D5sEb/AMjjiunsr2K++JFwIEuMWOmeRcNJA8aq7SBgAWADZAJyMisrVCILK3mmjmWTUtfiu1/dMVWJHXBZgML+7jDfMR1oAyBq1jLpV7qkmt3660DJKEjsVKvJGJVhz+5ORtUkc9ie3Ho9m19caBZSJcRi7eCNnkni3AkqCcqpXn6Yrk72OaPVo/EUljefZW1GIKkNpJJKIEhkUOY0Uvgu54xnBGcV0VprF5qGjTXNrY3C3DTSRW6Xdu8GQCQrsrgMFxzyMnsM0Acf4lvta1OLUrF7i0aCz1HT4IZ4bdoz9oMqM2cu2QoKfma6rRxLrsttrlxdSIIw6R2MEjKkb/dfzOm9wQRg8L2BPzVia7Bb6LpWjaEn2q4vrrVLeZpRbOwmk85ZJXZwNq8BjgngDjgVpXWla1pHiX+0tAS3uLK/kH9oWM8pjCPjHnxsAcHAAZcc4HegA8RXN3F4v0CCBLyaCSG6aWC2mEe/ATBOWUHBPr3rJW5tNR8YaLfrBqFsgkvdMf7RcnPmKFfgq7cfu2HXtXRXVtdXviM3VmYkksbRoY3mUshkkZWIIBB4VF5/2/bFcnfeGNY1nwmdBjkgi1RrqW9uNRiLrDbys7NsjPDMTuKE9hnPOAQDf8KyWtzo+o6rp9pNaRTSyrAWunlWRIyVWRUY7U3YJwBz1Oa4XQrvUYNX0+5ury4lfXnQuhhjAnTYfMUfKAMlR3HFdl4f1i5nhm0abQrrSP7OsNjwvHmJmHyjypOjqAOo9eeaoRpJY+GvCdw+namFtHgknxul2KIWBPlhiR1/u0AZF5Lp8N7oCqt0YLmBTK91ccCGOKVQZdqnaWDEFhn5UPIxmvUrEymwgM8UEUmwbkt5C8a8dFYquR+ArzW0fTNFGhf2zqlpY3kU5e9i1CVYSIxDIiIoY4ZQX6gkElj7V6FodvY2uiWkGmSCSwSMCBw+4FO2D3GOntQBoUUUUAFc/wCMv+QHbf8AYV03/wBLYa6Cuf8AGX/IDtv+wrpv/pbDQB0FFFFAHn/xT/5kr/sa7H/2evQK8/8Ain/zJX/Y12P/ALPXoFABRRRQAUUUUAFFFFAHP+O/+SeeJf8AsFXX/opq6Cuf8d/8k88S/wDYKuv/AEU1dBQAUUUUAFFFFABRRRQAUUUUAFFFFABXP+O/+SeeJf8AsFXX/opq6Cuf8d/8k88S/wDYKuv/AEU1AB4E/wCSeeGv+wVa/wDopa6Cuf8AAn/JPPDX/YKtf/RS10FABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAc/wCMv+QHbf8AYV03/wBLYa6Cuf8AGX/IDtv+wrpv/pbDXQUAFFFFABRRRQAUUUUAFFFFAHP+If8AkOeE/wDsKyf+kV1XQVz/AIh/5DnhP/sKyf8ApFdV0FABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBz/jL/kB23/YV03/ANLYa6Cuf8Zf8gO2/wCwrpv/AKWw10FABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFc/4y/wCQHbf9hXTf/S2Gugrn/GX/ACA7b/sK6b/6Ww0AdBRRRQB538W54bW38H3FxLHDBF4osnkkkYKqKA5JJPAAHOa6T/hO/B//AENeh/8Agxh/+Krm/i3BDdW/g+3uIo5oJfFFkkkcihldSHBBB4II4xXSf8IJ4P8A+hU0P/wXQ/8AxNAB/wAJ34P/AOhr0P8A8GMP/wAVR/wnfg//AKGvQ/8AwYw//FUf8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQAf8ACd+D/wDoa9D/APBjD/8AFUf8J34P/wChr0P/AMGMP/xVH/CCeD/+hU0P/wAF0P8A8TR/wgng/wD6FTQ//BdD/wDE0AH/AAnfg/8A6GvQ/wDwYw//ABVH/Cd+D/8Aoa9D/wDBjD/8VR/wgng//oVND/8ABdD/APE0f8IJ4P8A+hU0P/wXQ/8AxNAGH408aeFbrwL4ht7fxLo008umXKRxx38TM7GJgAAGySTxitz/AITvwf8A9DXof/gxh/8Aiqw/Gngvwra+BfENxb+GtGhni0y5eOSOwiVkYRMQQQuQQec1uf8ACCeD/wDoVND/APBdD/8AE0AH/Cd+D/8Aoa9D/wDBjD/8VR/wnfg//oa9D/8ABjD/APFUf8IJ4P8A+hU0P/wXQ/8AxNH/AAgng/8A6FTQ/wDwXQ//ABNAB/wnfg//AKGvQ/8AwYw//FUf8J34P/6GvQ//AAYw/wDxVH/CCeD/APoVND/8F0P/AMTR/wAIJ4P/AOhU0P8A8F0P/wATQAf8J34P/wChr0P/AMGMP/xVH/Cd+D/+hr0P/wAGMP8A8VR/wgng/wD6FTQ//BdD/wDE0f8ACCeD/wDoVND/APBdD/8AE0AH/Cd+D/8Aoa9D/wDBjD/8VR/wnfg//oa9D/8ABjD/APFUf8IJ4P8A+hU0P/wXQ/8AxNH/AAgng/8A6FTQ/wDwXQ//ABNAB/wnfg//AKGvQ/8AwYw//FUf8J34P/6GvQ//AAYw/wDxVH/CCeD/APoVND/8F0P/AMTR/wAIJ4P/AOhU0P8A8F0P/wATQAf8J34P/wChr0P/AMGMP/xVYfjTxp4VuvAviG3t/EujTTy6ZcpHHHfxMzsYmAAAbJJPGK3P+EE8H/8AQqaH/wCC6H/4msPxp4L8K2vgXxDcW/hrRoZ4tMuXjkjsIlZGETEEELkEHnNAB4L8aeFbXwL4et7jxLo0M8WmWySRyX8SsjCJQQQWyCDxitz/AITvwf8A9DXof/gxh/8Aiqw/BfgvwrdeBfD1xceGtGmnl0y2eSSSwiZnYxKSSSuSSec1uf8ACCeD/wDoVND/APBdD/8AE0AH/Cd+D/8Aoa9D/wDBjD/8VR/wnfg//oa9D/8ABjD/APFUf8IJ4P8A+hU0P/wXQ/8AxNH/AAgng/8A6FTQ/wDwXQ//ABNAB/wnfg//AKGvQ/8AwYw//FUf8J34P/6GvQ//AAYw/wDxVH/CCeD/APoVND/8F0P/AMTR/wAIJ4P/AOhU0P8A8F0P/wATQAf8J34P/wChr0P/AMGMP/xVH/Cd+D/+hr0P/wAGMP8A8VR/wgng/wD6FTQ//BdD/wDE0f8ACCeD/wDoVND/APBdD/8AE0AH/Cd+D/8Aoa9D/wDBjD/8VR/wnfg//oa9D/8ABjD/APFUf8IJ4P8A+hU0P/wXQ/8AxNH/AAgng/8A6FTQ/wDwXQ//ABNAB/wnfg//AKGvQ/8AwYw//FUf8J34P/6GvQ//AAYw/wDxVH/CCeD/APoVND/8F0P/AMTR/wAIJ4P/AOhU0P8A8F0P/wATQAf8J34P/wChr0P/AMGMP/xVH/Cd+D/+hr0P/wAGMP8A8VR/wgng/wD6FTQ//BdD/wDE0f8ACCeD/wDoVND/APBdD/8AE0AH/Cd+D/8Aoa9D/wDBjD/8VR/wnfg//oa9D/8ABjD/APFUf8IJ4P8A+hU0P/wXQ/8AxNH/AAgng/8A6FTQ/wDwXQ//ABNAB/wnfg//AKGvQ/8AwYw//FUf8J34P/6GvQ//AAYw/wDxVH/CCeD/APoVND/8F0P/AMTR/wAIJ4P/AOhU0P8A8F0P/wATQAf8J34P/wChr0P/AMGMP/xVH/Cd+D/+hr0P/wAGMP8A8VR/wgng/wD6FTQ//BdD/wDE0f8ACCeD/wDoVND/APBdD/8AE0AH/Cd+D/8Aoa9D/wDBjD/8VR/wnfg//oa9D/8ABjD/APFUf8IJ4P8A+hU0P/wXQ/8AxNH/AAgng/8A6FTQ/wDwXQ//ABNAB/wnfg//AKGvQ/8AwYw//FUf8J34P/6GvQ//AAYw/wDxVH/CCeD/APoVND/8F0P/AMTR/wAIJ4P/AOhU0P8A8F0P/wATQBh+LPGnhW50e3SDxLo0rjU7ByqX8TEKt3CzHhugUEk9gCa3P+E78H/9DXof/gxh/wDiqw/FngvwrbaPbvB4a0aJzqdghZLCJSVa7hVhwvQqSCO4JFbn/CCeD/8AoVND/wDBdD/8TQAf8J34P/6GvQ//AAYw/wDxVH/Cd+D/APoa9D/8GMP/AMVR/wAIJ4P/AOhU0P8A8F0P/wATR/wgng//AKFTQ/8AwXQ//E0AH/Cd+D/+hr0P/wAGMP8A8VR/wnfg/wD6GvQ//BjD/wDFUf8ACCeD/wDoVND/APBdD/8AE0f8IJ4P/wChU0P/AMF0P/xNAB/wnfg//oa9D/8ABjD/APFUf8J34P8A+hr0P/wYw/8AxVH/AAgng/8A6FTQ/wDwXQ//ABNH/CCeD/8AoVND/wDBdD/8TQAf8J34P/6GvQ//AAYw/wDxVH/Cd+D/APoa9D/8GMP/AMVR/wAIJ4P/AOhU0P8A8F0P/wATR/wgng//AKFTQ/8AwXQ//E0AYeu+NPCs2seGHi8S6M6Q6m7yst/EQi/ZLhct83A3Moye5A71uf8ACd+D/wDoa9D/APBjD/8AFVh674L8Kw6x4YSLw1oyJNqbpKq2EQDr9kuGw3y8jcqnB7gHtW5/wgng/wD6FTQ//BdD/wDE0AH/AAnfg/8A6GvQ/wDwYw//ABVH/Cd+D/8Aoa9D/wDBjD/8VR/wgng//oVND/8ABdD/APE0f8IJ4P8A+hU0P/wXQ/8AxNAB/wAJ34P/AOhr0P8A8GMP/wAVR/wnfg//AKGvQ/8AwYw//FUf8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQAf8ACd+D/wDoa9D/APBjD/8AFUf8J34P/wChr0P/AMGMP/xVH/CCeD/+hU0P/wAF0P8A8TR/wgng/wD6FTQ//BdD/wDE0AH/AAnfg/8A6GvQ/wDwYw//ABVH/Cd+D/8Aoa9D/wDBjD/8VR/wgng//oVND/8ABdD/APE0f8IJ4P8A+hU0P/wXQ/8AxNAB/wAJ34P/AOhr0P8A8GMP/wAVR/wnfg//AKGvQ/8AwYw//FUf8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQAf8ACd+D/wDoa9D/APBjD/8AFUf8J34P/wChr0P/AMGMP/xVH/CCeD/+hU0P/wAF0P8A8TR/wgng/wD6FTQ//BdD/wDE0AH/AAnfg/8A6GvQ/wDwYw//ABVH/Cd+D/8Aoa9D/wDBjD/8VR/wgng//oVND/8ABdD/APE0f8IJ4P8A+hU0P/wXQ/8AxNAB/wAJ34P/AOhr0P8A8GMP/wAVR/wnfg//AKGvQ/8AwYw//FUf8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQAf8ACd+D/wDoa9D/APBjD/8AFUf8J34P/wChr0P/AMGMP/xVH/CCeD/+hU0P/wAF0P8A8TR/wgng/wD6FTQ//BdD/wDE0AH/AAnfg/8A6GvQ/wDwYw//ABVH/Cd+D/8Aoa9D/wDBjD/8VR/wgng//oVND/8ABdD/APE0f8IJ4P8A+hU0P/wXQ/8AxNAB/wAJ34P/AOhr0P8A8GMP/wAVR/wnfg//AKGvQ/8AwYw//FUf8IJ4P/6FTQ//AAXQ/wDxNH/CCeD/APoVND/8F0P/AMTQAf8ACd+D/wDoa9D/APBjD/8AFUf8J34P/wChr0P/AMGMP/xVH/CCeD/+hU0P/wAF0P8A8TR/wgng/wD6FTQ//BdD/wDE0AH/AAnfg/8A6GvQ/wDwYw//ABVH/Cd+D/8Aoa9D/wDBjD/8VR/wgng//oVND/8ABdD/APE0f8IJ4P8A+hU0P/wXQ/8AxNAGH4s8aeFbnR7dIPEujSuNTsHKpfxMQq3cLMeG6BQST2AJrc/4Tvwf/wBDXof/AIMYf/iqw/FngvwrbaPbvB4a0aJzqdghZLCJSVa7hVhwvQqSCO4JFbn/AAgng/8A6FTQ/wDwXQ//ABNAB/wnfg//AKGvQ/8AwYw//FUf8J34P/6GvQ//AAYw/wDxVH/CCeD/APoVND/8F0P/AMTR/wAIJ4P/AOhU0P8A8F0P/wATQAf8J34P/wChr0P/AMGMP/xVH/Cd+D/+hr0P/wAGMP8A8VR/wgng/wD6FTQ//BdD/wDE0f8ACCeD/wDoVND/APBdD/8AE0AH/Cd+D/8Aoa9D/wDBjD/8VR/wnfg//oa9D/8ABjD/APFUf8IJ4P8A+hU0P/wXQ/8AxNH/AAgng/8A6FTQ/wDwXQ//ABNAB/wnfg//AKGvQ/8AwYw//FUf8J34P/6GvQ//AAYw/wDxVH/CCeD/APoVND/8F0P/AMTR/wAIJ4P/AOhU0P8A8F0P/wATQAf8J34P/wChr0P/AMGMP/xVH/Cd+D/+hr0P/wAGMP8A8VR/wgng/wD6FTQ//BdD/wDE0f8ACCeD/wDoVND/APBdD/8AE0AH/Cd+D/8Aoa9D/wDBjD/8VR/wnfg//oa9D/8ABjD/APFUf8IJ4P8A+hU0P/wXQ/8AxNH/AAgng/8A6FTQ/wDwXQ//ABNAB/wnfg//AKGvQ/8AwYw//FUf8J34P/6GvQ//AAYw/wDxVH/CCeD/APoVND/8F0P/AMTR/wAIJ4P/AOhU0P8A8F0P/wATQAf8J34P/wChr0P/AMGMP/xVH/Cd+D/+hr0P/wAGMP8A8VR/wgng/wD6FTQ//BdD/wDE0f8ACCeD/wDoVND/APBdD/8AE0AH/Cd+D/8Aoa9D/wDBjD/8VWP4k8WeG9T0+zs7DxBpV3dSarp2yGC9jkdsXkJOFBycAE/hWx/wgng//oVND/8ABdD/APE1j+JPCfhvTNPs7yw8P6VaXUeq6dsmgso43XN5CDhgMjIJH40AdxRRRQB5/wDFP/mSv+xrsf8A2evQK8/+Kf8AzJX/AGNdj/7PXoFABRWbqOpQWMyJNqmn2e5chbkgFvcZccV5w2rtF4SuvDa6np/267t72WIrPHgfvTtXf5uFJDqR6AH0oA9ZorA0XVUvtUuLeLX9LvkhgTNrap+8iJ/iZvMbIPpgfWs202XXifxFHe3OqOkNzEIUgmuAsamFCQBGcdST+NAHY0V5vJMp+HWpaj9s1kX8cN2Y5hcXQ2lGcKeu3gAflzXoNnu+w2+5mdvLXLMeScdTQBjeO/8AknniX/sFXX/opq6Cuf8AHf8AyTzxL/2Crr/0U1dBQAUUUUAFFFFABRRRQAUUUUAFFFFABXP+O/8AknniX/sFXX/opq6Cuf8AHf8AyTzxL/2Crr/0U1AB4E/5J54a/wCwVa/+ilroK5/wJ/yTzw1/2CrX/wBFLV3XdLuNYsBZwancaejuPPktgBI8eDlFY/cJ4+YcjHGOtAGnRXDfCu3j/wCFaWlsNyxeZcx/K5DAec44YHIPvnNZusaHpOj+O/CVp4YsYLHU/OeS7+yIEL2YXDmYj7wLbcFsknvmgD0uiuK8eaH4Vj8P6zrOs6fbyTtblVuZV3yo2NqLETkod2MBccnPUmtzwkmoxeENITV2dtRFpGLgyHLb9ozk+vrQBs1T1TVbLRrB77UJxDboyqW2ljliFAAAJJJIGAK8z+KskniXSde0+F2GmaHZtcXbKcCW6K5jj+iD5z7la1NaYXc/w80hzmK4nW5kU9GEMG9Qf+BFT+FAHolFec/F/R5r3whqN9LqVytpawIyWMXyI8vmD55COWABGF6AjPPa/wCOpZJ18NaJ5pjtNV1BILvaxUyRKjOY8js20A+oOO9AHb0V5frvk+BfGcLaBawWVteaReSzWkKBIWkhUOj7FwN3JBPcVn6notppnwht/Fluq/8ACRwwQ6gdVX/XyyMVLBpOrKQxXaTjHGOKAPQNQ8X2OnX89u9reyw2pRbu7ijBiti2Cockg9CCdoOAQTipPEHi7RvDAt11K5YT3J229tDG0ssx/wBlFBJ+vSq914UtNWnkvHvL2CG9Eb3lnC6iG5KgY3ZUsOAAdrLkAZzWD4ViS/8Aiv4y1C6Ae5svs9nbbhzFEU3Hb6ZNAHS+H/F+k+JHuIbN54ru1ANxa3cDQzRA9CVYDj3HFLrHiex0uO0KSwXD3N1HbBFnUY3HlvoBk/hW3tXcW2jcRgnHJFc3qW++8X6fFHbyTQaWjXMgj28SuCkY5I6KZD+K0Aad74h0XTrc3F5qtlDCGC73nUDJOB39asXWp6fYhDeX1tbiQZTzpVTd9MnmqVnrx1FbeWy027mtpZXiefMarFtJUkguGI3KRwDWjdXMFlay3Vy6xwxKWZz2FAGC3jbRx4gj0tL6xaM2zTyXP2tAqHcFVevJPzH22+9aMHiPRLm/isLfV7Ga7lVmSGOdWZgOpABrA8HX1xfvrGrz6ddi7ub1oWjYxjyUi+VE5b0yx92NdBp2spqOoajZraXEMli6JI0uzDFlDDbtY9iOuOtADb3xDp2nF/tZuo1RgjP9jmKZJAA3BcHJIHB71FL4o0yGSOKQXyyy58uM6fPufAydo2ZOB6Vl+OJLz/hGyrW8ADXlqq4nJJPnpjjZS6099/wl/hnNvbht9zgCdsH90f8AYoA6HTb9NU0+G8jguoFlGfKuoGhkX2ZWAIq3VLTX1N4JDqkFpDL5jbBazNIpT+HJZV59eMVdoA5/xl/yA7b/ALCum/8ApbDXQVz/AIy/5Adt/wBhXTf/AEthroKACiiigAooooAKKKKACiiigDn/ABD/AMhzwn/2FZP/AEiuq6Cuf8Q/8hzwn/2FZP8A0iuq6CgAorjvElzfW+quLH7TPq81lOun29s6hYgACZZA5CklyijOccYHJrn70+ILPStXtri0u7SG989ULNCS8s86qhDKxwQrMeoA/CgD1Giufs/EcC6dqEsmn38FtpZ8qV5NkhO0AtgI7E7QQT+mTWHcXmqafp6f2dqk2oWpuHeFkdWuJvMTdDAhdWDD5sl26KM9jQB3lFedecbKNY9K1/U1j1K+MRu1WC4htrkth0ZRH8uSDjHylickZ57+4hkmtzGl1LA/H72MKWH4MCP0oAmorlp/7Tj8WWelDXL3yJ7Oa4ZjFBuDI8agA+XjGHPb0ra020bTxLby6pdX0ru0wN0Y96qT0ARV+UHpx+NAF+isGK91HTLi7j1We3e285pLaf7rLbhQzmQDj5T8oI68Z9+a0nWk0q/1HXdSneNL6ZZLq3kyGsYCAsEjKeikA7m6Atz904APQ6KrzX0ENqtyS8kLY2tBG0u4HoQEBJHvXE+MfE2n3Fkkdv8AaWnsNQspp43t5YiqtKP7yjOQG4oA76ismDV5r7VUhsLVZtOVWM98ZNqhuyxjB3n1PAHTJORWtQAUUVynj6aO30rTppiFhj1O3aRmjMgCgnJKjkjFAHV0V554tlt5fC16sFt87KoUpos8R+8OjkYH1rudQvYdM06a8nWQwQJvk8tSxCjqcDk4HPHPFAFqiuDuLzVNP09P7O1SbULU3DvCyOrXE3mJuhgQurBh82S7dFGexqt5xso1j0rX9TWPUr4xG7VYLiG2uS2HRlEfy5IOMfKWJyRnkA9FoqC4glmt/LjupYH4/exKpb8mBH6Vzsg1JPFtvpQ1y98iSykuC3lwbtyuigZ8vGMMe1AHU0VQ0y1NgkltLqlzfTM5l3XTR71DHoAiqNuc44qtrEGl2Vtc6rqV5d29vEu+VxfTRooHoqsB+AHJoA2KK43wlp+r3Ooza9eXN/Z2M6bLTSZp2lxHnIklLkkOeu0EbRwcnNdlQBz/AIy/5Adt/wBhXTf/AEthroK5/wAZf8gO2/7Cum/+lsNdBQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXP+Mv+QHbf9hXTf/S2Gugrn/GX/IDtv+wrpv8A6Ww0AdBRRRQB5/8AFP8A5kr/ALGux/8AZ69Arz/4p/8AMlf9jXY/+z16BQBQ1TVI9Nh+WF7m7cEQW0Qy8h/oOmWPA7151/ZptfFUd3PNcHWLvT7m6muYrSV9kqvDsVFC7mRQAuO4z3avUhHGsjSKih2wGYDk46ZNVX02CTWIdUbf9ohgeBOfl2sVJ49coKAMnw54qXWnayu7C8sNVhjDzQTW8gTB6MrlQCp7A4bqCAQamsdEurbWdZvmv2RL6dJI0iVflCxqnO5TzlT0rcooA4rSNFl1jwBcaf8A2lPELr7XDu2IwXdLIM42gn8x+FdlDH5UEcec7FC59cCq2l6bBpFgtnbtI0as75kbJJZix/UmrlAHP+O/+SeeJf8AsFXX/opq6Cuf8d/8k88S/wDYKuv/AEU1dBQAUUVXs76z1CFprK6guYlcoXhkDqGBwRkdweooAsUVl2viTQr7UG0+01rTri9UsGtorpHkBX73yg547+lLqXiPQ9GnSDVNa06xmddyx3V0kTMOmQGIyKANOikBDKGUggjII70tABRRRQAUUUUAFc/47/5J54l/7BV1/wCimroK5/x3/wAk88S/9gq6/wDRTUAHgT/knnhr/sFWv/opa1dRk1GK2DaZa2tzPuGUubloFx67lRzn2x+NZXgT/knnhr/sFWv/AKKWugoA4zwbpHiXw74afSri10kyRCaS3mjvZHDyO7OFZTEu1RuwSCTx0qt4W0PxRolxcXd/p2jXmpX8oe+1D+1JQzLnhUQ2+FVRwF3fjXeUUAcLrOgeJdS8Zw6nNaaRf6XYYbTrSa/lh2S45lkAhcMw5C84Xr1Oa6OR/Eciaa0cGlQOZ/8AT42mklAi5/1TbVy3T7ygda16KAOH8RfDfT7/AMP6zaaS11bXl+srgNqd0sBmfks8YcqQT1G0/SqPiDSV8MxeCr7dI8emX6QXEktxJKVWZDGTuck7dxXA6AelejVDdWtve27293BFPA/3opUDK3OeQeDQBzXjzSdd8Q+H7vRdLt9OMV3EFa4urx42QhgeEWJsjj+8OtM1rQNZ1/SbCaRLGw1nTLtLq0Edw88LFRja7FEIDAkHCnHXnpXXUUAciPDN9reuSap4iSzhVbGWxgs7SZplCyY8xzIyIckAADbwB1OeMxPCHiG48LWvhC+uNPOkQMkb30cjmeeCNgVQxFAqsQApbee5xXoNFACAAAAcAVxet+FtbtvFLeJ/Cd1ZR3txEsF9Z34bybhV+625eVcDjof8e1ooA5rRY/GP2i8u9cl0oKYwlrYWW4qp/vvKwBz2wBjHvVq1M+l+bEmlX13JJIZJrlGhAlcgZIDSAgDgAY4AArbooA5DQJtY0Xw6beTw1qEtws88gjSe25Dysw5MuOjCulms4r14JbhXIiIdYWI2h+xIHUjtyQDz1watUUAczo+la5Ytqe26soI7jUJ540ktmlbazcEkSKOfTFT6Bpuo2Wra7c6g0L/a7iN4niTYGURIp+UsxHII5Nb9FAGJd2c2tana+bGYtOspRNhxhp5V+7x2RTzzySBjgZLNWtZ5vFXh6eOF2iga4MrgcIDHgZPuTW9RQAUUUUAc/wCMv+QHbf8AYV03/wBLYa6Cuf8AGX/IDtv+wrpv/pbDXQUAFFZupeItD0aVItV1nT7GR13Il1dJEWHTIDEZFaKsroGVgysMgg5BFAC0VUtdU06+ubm2s7+1uJ7Vts8UMyu0Tc8MAcqeD19KrL4k0J9U/stda05tR3FPsgukMu4dRsznPtigDUooooAKKKKAOf8AEP8AyHPCf/YVk/8ASK6roK5/xD/yHPCf/YVk/wDSK6roKAOJ160tbTxU9/cAStJpF40hlUMAiGIqoB4wOTj1J9axLWK20979buJFuodLguWm+yxQrbyMr5BZEXOWwAvJr0K60e0vdRhvbhWd4YmiVC3yEMyscjvyi0+TTLee8S6uN07xtuiWQ5SI+oXpn3OSMnBAoAxPCNwLjwidS8hpZLySa6ktwV3Bmdj5ZyQAyjCkEjBBFc6upXkngS21OysUtFvp1UtvCPHHNKsaxxkBtuF2gtjjbwDwR3Vtoun2d1fXNtb+VJfNuuNrttdsY3bc4BI6kAE96qy+F9Kk8O2+giBk06AxbIt27iNgyqS2cjKjOe1AHL31trmj6no2naDa6XpwuN8YheZ57dhGm4Fk2KQ3H3g2fXOBjs5tJsr4RvqNlZ3c6ptLvACPfAbOBntmqy+GNHi1Sz1G3sYLa4td+wwRKgbcu07sDnitegDi7rQNGHxB02IaTYCNtNuWKfZkwSJIcHGOvJ/OujttB0exvPtlppNhb3ezZ58VsiPt9NwGce1Q2/huxtvEUutrJdvdSQ+SEluXeONSQW2KxIXJC5xxwOOta9AHG6Sk/ifVNcn1DZCLK5+w26W8vmKuwBy53KASWYZBGAUHXANQ3tpJqGsi20rW5pNSUiG+kntoCYbcHcVZfKB+foo6HJbkCuxtrK1sjMba3jh8+QzS+WoG9z1Y+pOBzVU6JZnxCuuBXW9FsbVirYV0LBhuHcgg49MmgBtvaaR4W0aRbW2t7CwgVpGSGMKo7k4HUmuQvNPmi0WDUL+LZe6prlpcTRt1jTzFWOM/7qAA++a76WCKfZ5qB9jB1DdAw6HHtWZqfhyy1bUbG9upLvdZSiZIkuXWJ2H3S0edpweQcZyPwoAxNO1yHwvqo8Na1MtvCxzpN3K2Emj7RFjwHT7uD1GCOc1par4lm0zxVoujDSbieHUzIDeofkhZVLYPHUgHuPxrclghmKGWJJDG29Nyg7W9R6H3prWkDXiXbRhp0Qojkk7QeuB0GcDJ9hQBNXL+LoV1CJdPu98tm2HawtiTPekHhD02R5xuJOPUqOvUVXurT7UmwzzRIeHELbC49Nw+YfVSD70AcZpqak+r2emPqEzmzV7jVZIpm8uPcD5dsp9gc5+9hQT96tTwhPPL4KivpvtF41yZbhUkk3syO7Miguem0gDJxV6+8L6Ze6OdLRZ7O2Lbj9imaBzk5bLKQTu53Z659ea04LS3trKOzhiVLeOMRJGvAVQMAflQB54upXkngS21OysUtFvp1UtvCPHHNKsaxxkBtuF2gtjjbwDwRYvrbXNH1PRtO0G10vThcb4xC8zz27CNNwLJsUhuPvBs+ucDHUS+F9Kk8O2+giBk06AxbIt27iNgyqS2cjKjOe1OXwxo8WqWeo29jBbXFrv2GCJUDbl2ndgc8UAWZtIsb7y5NRsbO7uFQKZHtwfy3ZIGe2a5mbQNGHxCs4hpNh5Z0uZin2ZME+bHzjHXmu0rItPDllZ+ILjWkku3uZovJ2zXLyRxrnJ2KxIXJAyBxwOnNAE9poWj2F4byz0qxt7opsM0NuiOV9NwGce1c7JB/wAJZ41uILo50nQZI8WxPE90VDhnHdUBXA7sc9q7KsrUPDHh/Vrn7TqWhaZe3GAvm3NpHI2B0GWBNAGozKilmICgZJPYVn6Dq0OuaFZ6lBLFKlxGG3RHK57j8DkVQ/4QTwf/ANCpof8A4Lof/ia27a1t7K2jtrWCKCCMbUiiQKqj0AHAoAxPGX/IDtv+wrpv/pbDXQVz/jL/AJAdt/2FdN/9LYa6CgAoqvd3kVlGJJVmYE7QIYHlOfogJrGl8XWset22niz1ArNBJMZfsU4K7Coxt8vJzu69se9AHQ0VRsdVt9Qmlihju1MQBZp7SWFTnPQuoBPHOOlRxasJPEdzpHkkGC1juDLu4O9nXGPbZ196ANKisO18UWWoajp1vZK88N9DPMk+CoAiZVPDAE5LcH2rUvL+z06Dzr26htos43zSBBn0yaALFFYOheLtK1vToLkXlnDNLF5xt/tSM6ITgE+nbtxnFSW3ifTpPNW7ngs3S5+zJ5s64mY42lDn5gcgeucjtQBtUUVmQ6x5via60b7Mw+z2sdx5+4YbezLtx142GgDTooooAKKKKACiiigArn/GX/IDtv8AsK6b/wClsNdBXP8AjL/kB23/AGFdN/8AS2GgDoKKKKAPP/in/wAyV/2Ndj/7PXoFef8AxT/5kr/sa7H/ANnr0CgAooooAKKKKACiiigDn/Hf/JPPEv8A2Crr/wBFNXQVz/jv/knniX/sFXX/AKKaugoAz9a0eDXdMk0+6luY7eUjzRbymNpFByULDnaehxjIJrlvhbbQW/hrUrWGJEt49XvI0jUYVVEpAAHpiuwv0vpLRl064t7e5yNslxA0yAd8qroT/wB9VzvhbwzrPhyK7gk1mxuYLiaa5wunPG6yyNuzkzMCoJ6Yz70AZHjK3tL7W/C/hnSII0vrS9jvv3ChRZW0fUnH3Q3Cgd/wroPFl5o+heH9Tvr61hc3cfkNEsYMl45BVI8dXJzgDnjPasrw/wCD/EXh97uaPxBpV1d3s3nXd3caRIZpj2BIuAAAOAAMAdqn1XwlrGoeL4ddTWrApax7bO0u9NaZLdiBukBWZMufUjgcCgC/4F0q80PwNo2m37E3VvbKsgJztPXbn2zj8K6Gq1gl9HaKuo3FvcXOTukt4GhQjthWdyP++qs0AFFFFABRRRQAVz/jv/knniX/ALBV1/6Kaugrn/Hf/JPPEv8A2Crr/wBFNQAeBP8Aknnhr/sFWv8A6KWugrn/AAJ/yTzw1/2CrX/0UtdBQAUU2OSOaNZInV42GVZTkEexpIZoriJZYJUljb7rowYH6EUAPooqB720iLCS6hQq6xsGkAwzdFPucjA96AJ6KKj8+ESvEZU8xFDsm4ZVTnBI7Dg8+1AElFMimiuIUmhkSSJxuV0YEMPUEdafQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAc/wCMv+QHbf8AYV03/wBLYa6Cuf8AGX/IDtv+wrpv/pbDXQUAYPie90fQdE1HU9Qt4SJ4vJkURgyXRwQkWOrk5IA9zXM6Y+p+Dvhhomj4DeILpBa2kDHdskck88/djUkn2WtTWfCWran4tttbj1mx8mzTFnZXenNMkDnrICsyZf0JHA6etbD6DBq1lFF4mtNJ1eaJiyM1gAi59EdnwfU55oA4jwJo1t4f8Y+MtOimKxxW9mZbl2+ZnMbl5GJ7kksTXJQ31x/wh2j+H7y0jh8NR6imzxQiOEdVk3q4QruRmYhfMPy5JIJFek2Hw00Kw1zWr9LKxWHUYVhjghs0j+zLsKPsYdN2ecAfjUI8CanL4bi8MXniCGfQowsRQWBW5eFTlUMvmFegALCMEgdic0AdyCCMg5BopFUIoVRhQMAegpaACiiigDn/ABD/AMhzwn/2FZP/AEiuq6Cuf8Q/8hzwn/2FZP8A0iuq6CgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA5/xl/yA7b/sK6b/AOlsNdBXP+Mv+QHbf9hXTf8A0throKAOf8WXEVlo93ez6hJDHb27y/Z18n98VGcfOjemOK5pbC1m1WxuJL9EuGtX2ESWxjAYoWViLfAbhcZx3x3rsPEelTa34fvNNgmjge5j8vzHQsApI3cAjtnvUd5bapDPFexXm9YI2VrWG34lBxg4aQDIx2wefwoA53wde6e9+6R6skE7T3KJpsclvtuNj7WmISFG3ZH5etUxpOqXvizUXupxHq8dhE8T2kp2IGmuAqEkAugUjII5K+uK3PBdnq8GnCe7aOCC4nubg2klqyzAyTMyktvIXg/d25568Vajt7uPxxqV3HbFon0+2jR3JVGYSSkjdg8gEH8RQBzL6VpGm+KNCtIP7XFtBptyoCS3e7CmHG0A5/BeOntW5qkMn/CvntdBstQmNxCIYop2cTxq52szeewYFQScE54q5c6fqk3ifT9UENmIra2nhZDcNuJcxkEfJ/sH86sm21bUbAx3V0NLuBMTv06RZt0YPAJli4JHXA+hoAwtM1LWdR0TUrK206W1eGaW2tp38oLEiMVAwrsS6gemM456mh7q8l1DQ9L8PzyMLe1jup7i5uC4eAsq7HBBLMwDkHIIKehNP0C2l0aLUEXTb25vHv7h4DKzHKM/DGR+FB745PXBqrpllq/hDU55pdNbVLfVZg8sljy9m5PCbXb5oRkkEYwSxK4PABt+K7m/NhHpejymLU79/LimAz5CDG+U/wC6On+0VHeqcEEzeOdUhS5dZv7ItVE5UE7vMm+YjGOvbpXSi3iSeS5SIee6hSxPJA6DPYcnp61zmif2heeM9Y1C60q4sIFt4LSMzsp85laRiy7Scrh15+vAINAFvw34iOsSX2n3kIt9W02QRXcI+6cjKyIe6MOR3HIPSt6q8djaxX018kCLdToqSSgfMyrnaD9Nx/OrFABRRRQAUUUUAFc/4y/5Adt/2FdN/wDS2Gugrn/GX/IDtv8AsK6b/wClsNAHQUUUUAef/FP/AJkr/sa7H/2evQK8/wDin/zJX/Y12P8A7PXoFAHH+MtZn0lohaarcw3LvF/o6QI6iNn2lslCc/j+FZzeILttFiePUb6eK5aOC7vZBBD9ikZU+SMMEyW3jDfPirHiWCO68b2kM/nCAWPmOYbeSZshzt4RTjkg5PpXP2NrdjSrqKK6kFxb6jtOoNZtHHZoEiUy+U5zvI+XknALNwM5AO60vVL2XXZtO8qGSzhhGZPP3TQSDA2yqefmB3BvY9cg1v1ynh+GTV9cuNduhayfZg1lZ3dvE0RnTI8wsC7Bl3jC/Qkda6ugAooooA5/x3/yTzxL/wBgq6/9FNXQVz/jv/knniX/ALBV1/6KaugoAKKKKACiiigAooooAKKKKACiiigArn/Hf/JPPEv/AGCrr/0U1dBXP+O/+SeeJf8AsFXX/opqADwJ/wAk88Nf9gq1/wDRS1L4r1G80vw7e3dnBDK6Qv8A6yUoQcYXGFOSSQMcVF4E/wCSeeGv+wVa/wDopas+I7WO50sPPcRw29tMl1L5vCuIzvCk9hkDnB6dKAOQi1e+8PaL/wAIxHpbxyWltbWy3Nj5l1saQMC7IsYPAQt3ySPXNbMNxP4ej0ay0jRrmTRtyWsgMe14c9JcH5iM/eyO+c8HPNyazcf2Pq9zewXuk311qFncOXYxj7M0sca7ZAQQNqncDtIJOQK23udN/wCEw8Pw6VrEtwsjTmaJNTkmVgIiRuUuRjNAFvxvNa/8ItrMg1WSG4htJXiWC8MLI4U4+4QTz2OaydVtfD2l6Jpn9mxabbPNqVk85h2K0hEqnc5HLHrya3/GW660KXRrf5rvU/8ARkVeoRiBI59lUkk/QdSKZ4wUJpmloowF1SzA/wC/q0Aa1rrNhqEd0dNuob57VzHKlvIrFXxnaecA/WuV0aaa3l8UXV/H9q1N7ow/6LCTtQQoyx7jwFG48kqCSTxmu2lEhjIiZVfsXXI/LIrlvFFncaf4T1+4gnt4XmheaZ44nVmbYBuzv4OFH5UAZ+h2t7N4R0rUtVvTa6bY2Mc6WllKymTYgIaWQYJHH3Bgeparus6lNpvjTw1dpdSnT9UWSxkh8zMe8r5kbgdM/Ky575FMuPh9o81ky22jeGIrhl+WaTREkwfUjcM/nVbxxGwu/BNim3zv7ZhYCFNq7UjcsQueBjtk4oA7uiiigAooooAKKKKACiiigAooooAKKKKACiiigDn/ABl/yA7b/sK6b/6Ww10Fc/4y/wCQHbf9hXTf/S2GugoAKKKKACiiigAooooAKKKKAOf8Q/8AIc8J/wDYVk/9Irqugrn/ABD/AMhzwn/2FZP/AEiuq6CgDgfFPi3UtM1xLLTorqRRKscxKQ7Rkw4CZIPSU9e+O2aYNT1jWLOG20y+1AySxrfRyvaw+dGhkICsRMiMPlIxtPGM5PNRapYfb/F2tmSWaHyTCbd4rGW4AkxC5LBBjH7pRjcCcnpxWfZy2dp4S03VJG1GS8FrBbbIrDMeGfAwzwuBy+cZz260Ad34a1C+1W0lvbqWMxGRoo4ha+U6MjMjZIlkDAkcYxW3XN+FgmnaLJYx/bLqW23yuW05rQSM5Z8IGVVPJPf6mrmg+J9N8RrcCyeRLm1fy7m1uIzHNA3oyn+YyD2NAGxVLVbiW30+4aKGV28pyGjKjaQOvJFXa5vxhb3R02W5jutVNskLrJY6ciF5iRwckb+PRCCaAMmbV9UbwVpLpDdwXDyWCfaJZ1zMHaPcRtLHBywO4A9eK6fRtUl1RLxpbZIfs91JbrslL79nBPKjHORj2rl08INqGiaTbFRpktjBHJHOoUytdiMAMTzlVI5B+8R6Dm5o8GsWPimezAhuNLZ5Lie4ilAaKd1TMbR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che_207	OPEN	"Chemical reactions are accompanied by energy changes, and chemical energy can be transformed into various forms of energy such as heat energy, electricity, and light energy. Answer the following questions:
The <image_1>experimental steps for measuring the reaction heat of the neutralization reaction using the device shown in the figure are as follows:
I. Use a measuring cylinder to measure 50mL of 0.50mol·L^{-1} hydrochloric acid and pour it into the inner cylinder, and measure the temperature of the hydrochloric acid;
II. Use another measuring cylinder to measure 50mL of 0.55 mol·L^{-1} NaOH solution and measure its temperature with the same thermometer;
III. Pour NaOH solution into the inner cylinder, mix it well with hydrochloric acid, and measure the maximum temperature of the mixture.
Assuming that the densities of hydrochloric acid and NaOH solutions are both 1g·cm^{-3}, the specific heat capacity of the solution formed after the neutralization reaction c=4.18J·g^{-1}·℃^{-1}. In order to calculate the reaction heat of the neutralization reaction, a student's experimental record is as follows <image_2>. Then the heat of reaction of 1mol of water is generated\Delta H =() kJ·mol^{-1}(retain three significant digits)."		-51.8	che	化学反应原理	['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che_208	OPEN	"Green energy is an important direction for future energy development, and hydrogen energy is a significant green energy source.

Catalytic hydrogen production is one of the methods for large-scale hydrogen production at present: \( \text{CO}(g) + \text{H}_2\text{O}(g) \rightleftharpoons \text{CO}_2(g) + \text{H}_2(g) \) \( \Delta H = -41.2 \, \text{kJ} \cdot \text{mol}^{-1} \). At \( T_1^{\circ}\text{C} \), 0.10 mol of CO and 0.40 mol of \( \text{H}_2\text{O} \) are charged into a 5 L container. After the reaction reaches equilibrium, the mole fraction of CO, \( x(\text{CO}) \), is 0.12.

The relationships \( v_{\text{forward}} \sim x(\text{CO}) \) and \( v_{\text{reverse}} \sim x(\text{H}_2) \) calculated from the above experimental data at \( T_1^{\circ}\text{C} \) can be represented in the figure <image_1>. When the temperature is raised to a certain value, the reaction reaches equilibrium again, and the corresponding points are ( ) (fill in the letters)."""		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che_209	OPEN	"Industrial tail gas denitrification is an important measure to reduce air pollution. Answer the following questions:
Oxidative denitrification: The oxidative denitrification process takes place a reaction of $4NO(g) + 4NH_3(g) + O_2(g) \xrightarrow{\text{catalyst}} 4N_2(g) + 6H_2O(g) \quad \Delta H &lt; 0$. At different temperatures, the relationship between denitrification efficiency and temperature over the same time is shown in Figure 2<image_1>. Analyze the reason why the denitrification efficiency at 420℃ is lower than that at 390℃ may be ()"		At 420℃, the catalyst has poor activity, low catalytic efficiency, slow reaction rate, and low denitrification efficiency	che	化学反应原理	['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che_210	OPEN	"Ethylene oxide (<image_1>EO) is a commonly used reagent in organic synthesis. EO is flammable and explosive at room temperature, and its explosion limit is 3~100%. In recent years, EO has been prepared by ethylene oxidation using a mixed gas of ethylene, oxygen and nitrogen. Some of the reactions involved are:
Main reaction: $C_2H_4(g) + \frac{1}{2}O_2(g) = EO(g) \quad \Delta H = -107 \text{kJ} \cdot \text{mol}^{-1}$
Secondary reaction: $C_2H_4(g) + 3O_2(g) = 2CO_2(g) + 2H_2O(g) \quad \Delta H = -1323 \text{kJ} \cdot \text{mol}^{-1}$
The reaction mechanism using Ag as catalyst is as follows:
Reaction I: $Ag(s) + O_2(g) = Ag^+O_2^-(s)$Slow
Reaction II: $C_2H_4(g) + Ag^+O_2^-(s) \rightarrow EO(g) + Ag^+(s)$fast
Reaction III: $C_2H_4(g) + 6Ag^+O_2^-(s) \rightarrow 2CO_2(g) + 6Ag(s) + 2H_2O(g)$fast
Addition of 1,2-dichloroethane will cause a reaction = 2Cl (g) + 2Ag^+O_2^-(s) = 2AgCl(s) + O_2(g)$. Under certain conditions, after a certain reaction time, the relationship between EO yield and selectivity and the concentration of 1,2-dichloroethane is as shown in the figure<image_2>. The reason why 1,2-dichloroethane can increase EO production first and then decrease is ()"		When the concentration of 1,2-dichloroethane is low, the side reactions are suppressed and the selectivity of the main reaction is increased. When the concentration of 1,2-dichloroethane is high, the catalyst will be deactivated and the catalytic effect will be reduced.	che	化学反应原理	['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', 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'che_210_2.jpg']
che_211	MCQ	At a certain temperature, a certain amount of X(g) is filled into a closed container, and the following reactions occur: X(g) \rightleftharpoons Y(g) (\Delta H_1 &lt; 0), Y(g) \rightleftharpoons Z(g) (\Delta H_2 &lt; 0). The relationship between the measured gas concentrations and the reaction time is shown in the figure<image_1>. The following schematic diagram of the reaction process conforms to the meaning of the question ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	B	che	化学反应原理	['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che_212	MCQ	The structure of a food sweetener is as shown in the figure<image_1>. It is known that W, X, Y, and Z are short-period main group elements, and their atomic numbers increase in turn. The sum of the number of electrons in the outermost layer is 18. W and X are adjacent to each other on the periodic table, the 2p orbital of the ground state W atom is half-filled, and Z and X are of the same family. The following statement is correct ()	['A. Boiling point: H_2X < H_2Z', 'B. Atomic radius: X < W < Y', 'C. First ionization energy: X < Z < W', 'D. The spatial structures of WX_3^-and ZX_3^{2-} are both planar triangles']	B	che	物质结构与性质	['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che_213	MCQ	X, Y, Z, and Q are main group elements with increasing atomic numbers. X has the smallest atomic radius, Y and Z have the same number of valence electrons, Q element appears purple in the flame reaction, and the structure of a certain compound formed by the four elements is as <image_1>shown in the figure. The following statement is incorrect ()	['A. First ionization energy: Z > Y > X > Q', 'B. Boiling point of the simplest hydride: Y > Z', 'C. Ion radius: Z > Q > Y > X', 'D. ZY_2 and ZY_3 have the same VSEPR model']	A	che	物质结构与性质	['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che_214	MCQ	The dual-cathode microbial fuel cell can perform nitrification and denitrification. The device is as shown in the figure<image_1>. The following statement is wrong ()	"['A. Migration direction of H^+: anaerobic anode → anoxic cathode, anaerobic anode → aerobic cathode', 'B. When the device is in operation, the pH of the solution near the ""oxygen-deficient cathode"" electrode increases', 'C. The reaction formula of the ""aerobic cathode"" electrode is: NH_4^+ - 6e^- + 2H_2O = NO_2^- + 8H^+', 'D. If 1mol of NH_4 is completely converted to NO_3^-during the discharge process, theoretical O_2(STP) is consumed in the ""aerobic cathode"" zone of 44.8L']"	CD	che	化学反应原理	['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che_215	MCQ	At 25℃, use NaOH solution to titrate three weak acid solutions HA, CuSO_4, and FeSO_4 respectively. The relationship between-lg(M) and pH is <image_1>shown in the figure. The following statements are correct: () is known: M means\frac{c(HA)}{c(A^-)}, c(Cu^{2+}), c(Fe^{2 +});K_{sp}[Cu(OH)_2] &lt; K_{sp}[Fe(OH)_2]	['A. ② Represents the change relationship of titrated HA solution', 'B. Point a corresponds to pH=3', 'C. Point b corresponds to-lg(M)=3', 'D. Fe(OH)_2 solid is difficult to dissolve in HA solution']	C	che	化学反应原理	['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che_216	MCQ	At room temperature, 10mL of a mixed solution of NaOH and Na_2A with a concentration of 0.20 mol·L ^{-1} was titrated with H_2SO_4 standard solution with a concentration of 0.10 mol·L ^{-1}. The distribution fraction of A-containing particles in the solution varied with pH and the titration curve were as shown in the figure <image_1>(ignoring the volume change after the solution was mixed). The following statement is incorrect	['A. HA^- \\rightleftharpoons H^+ + A^{2-} \\text{of} K \\approx 10^{-1.4}', 'B. \\text{Point a: } c(SO_4^{2-}) < c(A^{2-})', 'C. V_1 <15\\text{mL}', 'D. \\text{Point c: } c(H^+) + c(Na^+) = 4c(SO_4^{2-}) + c(OH^-)']	D	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEFAYgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKRgWQqGKkjGR1FeUWWqeII/DeheIf7burm4l1VbSa1dU8uWJp2jIwFB3AYOc9ulAHo1hr1hqVze29q8ry2L+XcKYWXY2M45HJwQeKdo+t2GvWr3OnyvLCkjRFmjZPmU4YcgdCMVyHhZNQfxR4zNncW0af2muRLCznPkp3DCrPwr3f8IjNvILf2ld7iBgE+c1AHbUVjeIPEdp4ebTPtRwL++jsk9mcHB/MVs0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFACMSFJUZIHA9a5XwZ4WOiaLbQ6hBEbyCaWUFJWdAXZjuUHABw2M4z19a6uqmp6jb6RptxqF2XW3t4zJIUQuQoGScAE0AR2mi6fYTXU1rb+VLdtundXbMjdMnnr707TNIsNHgaDT7dbeJnLlFJxuPJOPU96ntbmO7s4bqPPlyoJFyMHBGRVPRNdsPENpLdadIZIIp3ty+MAshwceo96AOF+KvhG/8T3/AIfe31FLRLa6xGChbdK3IJ5GANn616VHu8td4AfA3AHIzWL4j/1ujf8AYRj/APQWrcoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKrW99DdXV5bx7vMtJFjkyMDJRXGPXhhVmgAooooAKKKKACiiigAooooAKKKKACiiigArE8Zf8iRr3/YPn/9FtW3UF3Z21/bPbXcEc8Egw8cihlYehB60AcrdzagPCeiW9npdxf280EYult3RW8sIPl+dl+8eCfTPrmqXwtu55tP1yOTTZrRE1e6dd5QjJkOUAUnleh7ema7m2toLO2jt7aJIYYxtSNBhVHoB2pLaztrNZFtoI4VkkaVxGoXc7HLMcdyepoA5HxB4hjeXSf+Jbqg2agjc2bjPyt045NdFYawmoTmJbK+gIXduuLdo1+mT3rO8YQS3MGlQwXUlrK2oR7Zo1Ush2tzhgQfxFPZvFFgU/d2GrRD75Um2lx7A7lY/itAHQUVgjxbYQzmDUorrS5AM5vYtkZ+kozGfpurahniuIllhkSSNhlXRgQfxFAElFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBgWzm08b31uy4jvbSO4jP950JR/wBDFW/WF4mgmjgttXtEd7jTZPOMcYy0sRGJEA7nbyB/eVa2La4hu7WK5t5BJDKgdHXoykZBoAlooooAKKKKACiiigAooooAKKKKACiiigAqhrWqLoujXepSW8s8dtE0rpFjcVUZOMkDoKv1h+MyF8Ea8SQP+JfP1/65mgCa41po9Jtb210+5vJbpVaK2h2hjkZ5LEKAB3Jpvh3xBF4htLiVbW4tJ7Wdra4trgAPHIADjgkEYIII6g1RXxFpvh/wXpl7fXUMaPbRJFvkCh2KDABPH49qXwpe6TNZX89hqUF/M8xuLyeBtyeYw6BhxgKoAHXAGetAFa8vpr25t0l2/wCja6sKFRjKiMkZ9/mrrq8wgvddk03Srw6LDtvdWN5EWvMFlfeUBGzj5COfau80+71aecrfaXDaxbch0uvMJPpjaKANIgMCCAQexrDl8JaWC76eJdLnc7jJYP5WW9Sn3G/FTW7RQBz+3xNprDDWur24HIb/AEef8+UY/wDfFS2vinT5Z47a7EunXjttW3vU8tmb0U/df/gJNbdQ3VpbX1u1vd28U8L/AHo5UDKfwNAE1Fc8fD13pgL+H9QaBd242d2TLAR3C87o/wADgf3TUtp4jX7Wlhq1s+m3rsVjWRt0U5/6ZydG+hw3tQBuUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVzEbf8IlfmJ+NCupMxv2s5WPKn0jYnIP8JOOhGOnqOaGK5gkgnjWSKRSro4yGB4II9KAJAcjIormAb3wmdu2a+0MdCuXmsx6Y6vGPX7y+46dDa3Vve20dzazRzQSDckkbBlYexFAE1FFFABRRRQAUUUUAFFFFABRRRQAU140lXbIiup7MMinVR1nU00bR7vUpIJZo7WJpXSLG7aoycZIHQetAFlraBkVGhjKL0UqMCue1opqVyPDNgqosoD6g8Xy+VAf4eP4nxtHtk9hmhrXjyOO1s4NHj8+/vWiiXIykDSYwGOQC2Mnbntk4HNa3hY2kUF5YxCUX9tNi+M7BpJJWUHzCR1DDGMcADGBjAAHeIEWM6IiKFVdQjAA6AbWrdrD8R/63Rv+wjH/AOgtW5QAUUUUAFFFFABUF7ZWuo2klreQRzwSDDI4yDU9FAHMxzXXhe5it7uaS50aVhHDcyHdJaseFSQ90J4DHkHAOetdNUN3aQX1nNaXUSy28yGOSNxkMpGCDWT4ZuJ1trjSryUSXWmy+QXzzJHgGNz7lSAT/eDUAblFFGcUAFFUr/UobF7aJvnuLqTy4IgeXOCT9AACSarXOvQ2viOw0SS3m869jkkjlGPLwgBYdc55HagDWorB1DxVa2E+oIIJZ002JZr2SPGIVIJ6ZyTtG7A7Y9QK24Zo7iCOeFw8Uih0ZTkMCMgigB9FZGk6/Bqv9qfuZbb+zbprabz9o5CK5YYJGMOKr6d4stNQk04rDNFb6mrNZTOABLtGcYzkErlgD1APTpQBv0Vmaxq02lrD9n0q91GWViBHahMqAOSS7KAOg696z7TxYk9hcX11pl3YwW1x9nuPPKExn5fm+RmG0bsE54wc9DgA6OigHIyKKACiiigAooooAKKKKACiiigAooooAKKKKACsC58Py21zJfaDcLZXLktLA65t5z3LKPusf7y4PrnpW/RQBh2viSNblLLV4G0y9d9kaynMcx/6ZydGz6HDe1blQ3Nrb3tu9vdQRzwuMNHIoZT9Qawxoeo6RtOhX263BJNjfM0iY9Ek5dPx3D0AoA6KisGDxRbxzR22sW8uk3Tnaq3OPLc/7Mo+U+wyD7VughgCCCD0IoAWiiigAooooAKKo6lrGn6REJL66jh3HCKeXc+iqOWPsBWWb3XdYDLp9qNLtiRi6vU3SsPVYu31cg/7NAGtqOq2OkwCa+uUhVmCIDyzseiqo5Yn0HNcf4sn1nWPB+sz7W0jTVsZ22yAG4nwhwCORGp/Fuf4a6bTvD1lp9w123mXd8/3ru6bfJ9F7IPZQB7VpyRRzJslRXX+6wyKAPO7zTobTQ/Al3ZwIlhaXkEs5jACqHjK7z/wJhk+9a/hyB5fHXizVoyGs5TbW0bqch3iRt+PoWC/UEdq60QxCHyREgixjZtGMfSljjSJAkaKiLwFUYAoA4fX/Esjy6V/xINZXZfo3zQL83ytwPm610uma2+o3DQtpGpWgC7vMuYlVT7ZDHmoPEf+t0b/ALCMf/oLVuUAFFFFABRRRQAUUUUAFeaePfHulfD/AMXWF1OjzS3tqY7qCEfP5atmN+cDgmQfj7V6XXnvxF+GGj+Ob2xvLu6uLO8TFuJIVDB0yWCkH0JPPv3poTaS1O00fV7PXtItdU0+XzbW5QPG2Mce47HtXOeL72wTXtJsLyWON54Z2j+1Pi3ONg5X+N+flAI6tz0o0Hy/Atha+H75dmmw/u7PUP4GBJIWX+4/PX7rdsHiutaOKbY7Ij7TuRiAcH1FIZ5f4Iv5NR1bwbNcXH2hB4fnRZGbcftAeEOCf72315610euOo+KHhRSwz9mveM+0ddFeaRb3X2Z0VYZ7SQyW8iL9xiCDx3BBII7/AFwatNbQvIsjwxtIOjlBkfjQB51cqdL/AOFi290P316nn2ynrMrwCNQo7/OCuPXHqK6rwvc21lpem+HprqP+1bTToWmt93zqAoXOPTPFbjwRSOjvEjOnKsyglfp6VF9gg/tH7eVzP5ZiDYHCkgkdMnkDrQBxmkwNqNp8QbO2cGebUJo0wejG1hUfr/KszT421DR/hxp8AK3Nk0c1zGeGhWGFo5Nw7fOQv1Nelx28MJJihjjLdSq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che_217	MCQ	"At 25℃, the precipitation dissolution equilibrium curves are shown in <image_1>. An experimental team used standard AgNO₃ solution to titrate water samples containing Cl⁻ and water samples containing Br⁻ respectively, with K₂CrO₄ as the indicator. It is known that:
① Ag₂CrO₄ is a brick - red precipitate;
② The solubility of AgCl is greater than that of AgBr under the same conditions;
③ At 25℃, pKₐ₁(H₂CrO₄) = 0.7, pKₐ₂(H₂CrO₄) = 6.5.
④ pAg = -\lg\left[\frac{c(\text{Ag}^+)}{(\text{mol} \cdot \text{L}^{-1})}\right] \quad \text{pX} = -\lg\left[\frac{c(\text{X}^{n-})}{(\text{mol} \cdot \text{L}^{-1})}\right] (\text{X represents Cl}^-, \text{Br}^- \text{or CrO}_4^{2-})

Which of the following statements is wrong?"	['A. Curve ② is the equilibrium curve of AgCl precipitation dissolution', 'B. The equilibrium constant K=10^{-5.2} for the reaction Ag_2CrO_4 + = 2Ag^+ + HCrO_4^-', 'C. When titration Br^-reaches the end point,\\frac{c(Br^-)}{c(CrO_4^{2-})}=10^{-6.5}', 'D. When titrating Cl^-, theoretically, the indicator concentration in the mixture should not exceed 10^{-3} \\text{mol} \\cdot \\text{L}^{-1}']	C	che	化学反应原理	['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']	['che_217.jpg']
che_218	MCQ	At room temperature, titrate 25.00mL of 0.25mol\cdot L^{-1} CaCl_2 solution with 0.5mol\cdot L ^{-1} NaHCO_3 solution. The relationship between the volume of NaHCO_3 solution consumed and the pH of the mixture is <image_1>shown in the figure. White precipitate was formed during the titration process, but no bubbles were formed throughout the process. The following statement is wrong ()	['A. a \\rightarrow b No white precipitate formed during the process', 'B. The degree of ionization of water gradually decreases during the b \\rightarrow c process', 'C. Point b: c(H_2CO_3) < c(CO_3^{2-})', 'D. 2c(Ca^{2+}) > c(HCO_3^-) + 2c(CO_3^{2-}) in the mixed solution at point d']	C	che	化学反应原理	['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che_219	MCQ	<image_1>Mg^{2+} exists in different forms in Na_2CO_3 solutions at different pH at a constant temperature. The two curves in Figure 1 are the precipitation and dissolution equilibrium curves of MgCO_3 and Mg(OH)_2 respectively, pM = -\lgc (Mg^{2+}). Figure 2 shows the relationship between the amount fraction of substances containing carbon particles in Na_2CO_3 solution and pH. If c(Na_2CO_3) = 0.1mol/L initially, the following statement is incorrect ()	['A. Curve I is the equilibrium curve of Mg(OH)_2 precipitation and dissolution', 'B. The K_{a1} of H_2CO_3 is of the order of magnitude of 10^{-7}', 'C. pH=8, pM=1, reaction occurs: Mg^{2+} + 2HCO_3^- = MgCO_3 \\downstream + CO_2 \\uparrow + H_2O', 'D. pH=9, pM=2, after equilibrium, c(H_2CO_3) + c(HCO_3^-) + c(CO_3^{2-}) = 0.1mol/L']	D	che	化学反应原理	['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']	['che_219.jpg']
che_220	MCQ	At room temperature, NaOH solution was added dropwise to the mixture of Co(NO_3)_2, Pb(NO_3)_2 and HR, and the relationship between pM and pH was <image_1>shown in the figure. It is known that pM = -\lg c(M), where M stands for Co^{2+} + Pb^{2+} or\frac{c(R^-)}{c(HR)}. Under these conditions, K_{sp}[Co(OH)_2] &gt; K_{sp}[Pb(OH)_2]. The following statement is correct ()	['A. Y represents Pb^{2+}, Z represents\\frac{c(R^-)}{c(HR)}', 'B. At room temperature, K_{sp}[Co(OH)_2] = 1 \\times 10^{-20}', 'C. Pb(OH)_2 was first generated by dropwise adding dilute NaOH solution to a solution containing Co^{2+} and Pb^{2+}', 'D. The equilibrium constant K of Co(OH)_2 + 2HR\\rightleftharpoons Co^{2+} + 2R^- + 2H_2O is 1000 at room temperature']	D	che	化学反应原理	['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']	['che_220.jpg']
che_221	MCQ	"Ethylenediamine (H_2NCH_2CH_2NH_2) has properties similar to NH_3 and is a binary weak base. At 25℃, HCl gas was poured into 0.01 mol/L ethylenediamine solution. The relationship between the pH of the obtained solution (ignoring the change in solution volume) and the logarithmic value (lgc) of the concentration of N-containing particles in the system and the ratio t of the amount of reactants is shown in the following figure<image_1>.
\[ t = \frac{n(\text{HCl})}{n(\text{H}_2\text{NCH}_2\text{CH}_2\text{NH}_2)} \]
It is known that the two-step ionization of ethylenediamine is H_2NCH_2CH_2NH_2 + H_2O \rightleftharpoons H_3NCH_2CH_2NH_3^+ + OH^- K_{b1}
H_3NCH_2CH_2NH_3^+ + H_2O \rightleftharpoons (H_3NCH_2CH_2NH_3)^{2+} + OH^- K_{b2}
The following statement is correct ()"	['A. Curve ③ represents the change of\\lg c(H_2NCH_2CH_2NH_2) with pH', 'B. K_{b2} of H_2NCH_2CH_2NH_2 = 1.0 \\times 10^{-9.8}', 'C. Solution shown at point Q: c(H_3NCH_2CH_2NH_3^+) + c(H_2NCH_2CH_2NH_2) + c(OH^-) = c(H^+)', 'D. Solution shown at point N: 3c(H_2NCH_2CH_2NH_3^+) > c(Cl^-)']	D	che	化学反应原理	['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']	['che_221.jpg']
che_222	MCQ	At room temperature, c(CO_3^{2-}) + c(HCO_3^-) + c (H_2CO_3) = 0.1mol \cdot L^{-1} is satisfied in a certain Na_2CO_3 solution system at room temperature. The equilibrium movement principle is used to analyze the possible products of Ni^{2+} in Na_2CO_3 systems with different pH values. The <image_1>curve in Figure 1 shows the relationship between the quantity fraction of each carbon-containing particle in the Na_2CO_3 system and pH, and Figure 2 <image_2>shows the precipitation and dissolution equilibrium curve. The following statement is wrong ()	['A. \\lg K_{a2}(H_2CO_3) = -10.25', 'B. At point M, c(CO_3^{2-}) < c(OH^-) exists in solution', 'C. In a mixed liquid system, the initial state is pH = 9,\\lg \\left[ c(Ni^{2+}) \\right] =-5. When the system reaches equilibrium, there is c(CO_3^{2-}) + c(HCO_3^-) + c (H_2CO_3) = 0.1mol \\cdot L^{-1}', 'D. 0.1mol \\cdot L^{-1} NaHCO_3 solution to precipitate Ni^{2+} is better than 0.1mol \\cdot L^{-1} Na_2CO_3 solution to prepare NiCO_3']	B	che	化学反应原理	['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']	['che_222_1.jpg', 'che_222_2.jpg']
che_223	MCQ	<image_1>At 25 ° C, the pH of 0.1 mol·L^{-1} ammonia water was adjusted with HCl gas. The relationship between the logarithmic value of the concentration of particles in the system (\lg c) and pH is shown in Figure 1, and the relationship between the ratio of the amount of reactants\left[ t = \frac{n(\text{HCl})}{n(\text{NH}_3 \cdot \text{H}_2\text{O})} = 1.0 \right] and pH is shown in Figure 2. If we ignore the change in solution volume after introducing gas, the following statements are correct: ()	['A. Solution shown in P_1: c(Cl^-) = 0.05mol \\cdot L^{-1}', 'B. Solution shown in P_2: c(NH_3 \\cdot H_2O) < c(OH^-) + c(Cl^-)', 'C. P_3 solution: c(NH_4^+) + c(NH_3 \\cdot H_2O) = c(Cl^-) + c(H^+)', 'D. At 25℃, the ionization equilibrium constant of NH_3 \\cdot H_2O is 10^{-9.23}']	B	che	化学反应原理	['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che_224	MCQ	At 25℃, HCl gas was continuously injected into 1L of 0.100 mol·L^{-1} CH_3COONa solution (ignoring the change in solution volume), and the relationship between c(CH_3COOH), c(CH_3COO^-) and pH in the solution was as <image_1>shown in the figure. The following statement is incorrect ( )	['A. At this temperature, K_a of CH_3COOH = 10^{-4.75}', 'B. In the solution represented by point W: c(Na^+) = c(Cl^-) > c(CH_3COO^-) > c(OH^-)', 'C. Continuously inject 0.1 mol of HCl gas into the original solution: c(H^+) = c(CH_3COO^-) + c(OH^-)', 'D. In solution with pH = 3.5: c(Na^+) + c(H^+) - c(OH^-) - c(Cl^-) + c(CH_3COOH) = 0.100 mol·L^{-1}']	B	che	化学反应原理	['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che_225	OPEN	"The unique cage structure of C_{60} makes it and its derivatives exhibit special properties. The synthesis process of a metal fullerene complex is shown in the figure<image_1>. It is known that olefins, C_{60}, etc. are called ""π ligands"" because they can provide π electrons to form a coordination bond with the central atom. Compare the coordination ability of two π ligands with Pt: C_{2}H_{4}() C_{60}(fill in ""&gt;"",""&lt;"" or ""="")."		<	che	物质结构与性质	['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che_226	OPEN	The study of mechanisms is conducive to understanding the nature of chemical reactions from a microscopic level. A CeO_2-catalyzed hydrogenation of CO_2 to CH_3OH is as follows. <image_1>(□ represents oxygen vacancy) The unit cell of CeO_2 is shown in the figure<image_2>. Each Ce atom has () O atoms closest to it and at equal distance.		\frac{4 \times M}{N_A \times a^3 \times 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xPEmlWJBVFZSMySEZdhnIwAAR3oAj0Dw3FrPgyzvNRuruTVdQtkuZL9J2SWN3UMPLIOEC5ACgY45B5qx8OPEV34l8JrcahtN9a3EtncOowJGjON2O2Rj8c0aRa+JtE8NQ6KltZ3dxaRfZ7e9acqjKBhGdMZBAxkAnOOozxBYeB77QvDllZaHr01rfW++SWSSISQ3Ujnc5kQ88noQQQPXuAdpVHWlZ9C1FEUszW0gAAySdprDtPE2p2V7b6d4j0aW3lmYRx31kDPbSMeBnA3R5/2hj3qh4Uv7zxzHfa1Lf3FvpX2t4dOgtW8vfGh2mR2HJJbPGcDFAG94Oikh8FaJFKjJIljCrIwwVOwcEVt1z1tNd+Ho7w6vfS36TXYWx2xgysrIMR7VABIKsc9MZJxzhg8c6INLu76WSeI2k/2aa2eFvPWbsgQZJJ6jGQRzmgDpK898HT/8JvfeINU1UtNb2uoyafZ2pYiOJIwMttHBZi2dxyRjAxWrZ/8ACT+Ib2C8uC2g6SjB1tAFa6uMHI8w8iNT/dGT6kdmaN4f1HwnqusnTYYr3TNSuTerEZfLkgmYAOORhlOAc8EdMHrQBW8L6lc6d481rwdNPNcWtvbx31jJM5d442OGjLHkgMflzzjjtXc1xdv4S1Y32r67/acdhruoMixvFGJooIYxhYiGxuz1Yjbz0xjmT/hKNZ0EInijRnMPRtS0tWmh+rx/fQfgw96AOworhLfxHJ4w8aXOj6RqJh0jT7WOa6uLbG+4eUZRVY/dULySOc8cVtLaXuj6wb6bV5X0OKylMsdywJikDIQ27GSNofrnH40AdDRWJp/iqw1DWDpPl3VtemD7RHFcwlPNizjcv49QcEZ6Vt0AFFFFABXnng5zqHxR8b3l4c3dm9vZ26MOYoNrNwfRjz+FdrqmqRaTai4lt7ydSwXbaWzzv9dqAnHvXCaldadca6Nd0yHxTpeptGIppYdCndLhB0Do0ZBx2IwfegDp/E93D4ds7nXoIIzfyiGzVn4Vi0m1N3I4BkJ6jvyKoWVx4xnv9QsJEWK2e1D2mpT26AxTZAKNGsh3DByDxjGDmsm9utJ1jRL7TdZtPFV8b2Py5Jjos6FAORsCx4XB56E565o8OahbaGzS3knjDV5wnlRS3mjXGYo+CVAEY64GSck4FAHT6L4QsNKvP7Snkl1HWGTY+o3h3S47qvZF5PyqB+NdBXM/8JvY/wDQJ8Rf+CW5/wDiKP8AhN7H/oE+Iv8AwS3P/wARQB01UdW0fT9d097DU7WO5tnwSjjoR0IPUEdiOax/+E3sf+gT4i/8Etz/APEUf8JvY/8AQJ8Rf+CW5/8AiKAORubC5tfip4T0HUdRudRsIIbm9tWuyCzSgYVWI++UXkE8/NmvSbyxtLmS2ubiFWks3M0L45Q7SDj6gkVxPiLUNG8RLaSSaf4otb6yk820vbfRrgSQt0OMxkEEcEEEGn2WvIk0c2qf8JRqDRZManQJ4kU9NxVY+T9TgZ6UALpHiLxTqh0PVINPafTdQKtcReXGgt4XGVdX8wlivGRjnJwB0rWv/Cc2vajcNr2pyXOlFh5OlwgxQlR/z1IOZDnsSF9q4/Q7bS9CvVEL+MpdJilM1vpcujzmGF87hj93kgHkAnggHqK7H/hN7H/oE+Iv/BLc/wDxFAHQ29tBZ20dtbQxwQRKFjiiUKqKOgAHAFS1zP8Awm9j/wBAnxF/4Jbn/wCIo/4Tex/6BPiL/wAEtz/8RQBsato2na7YPY6paRXVu3OyQZwexB6gj1HNeb/ECx1LQ/C1tpUms3V5pep6za2kjXHMsFs5O9Wl6sCQoy3OCQSc12H/AAm9j/0CfEX/AIJbn/4iqGta/ofiDR7nStS0PxDNaXC7ZE/sa6HfIIOzgggEH2oA6i80mxv9Hl0qe3Q2UkXkmIDAC4wAPTHb0xXHan4i8SXtxrCeGrUyvpdwtukTxIVuHAVnDsXBXO7AwPfvxUsdSNvbx2d3e+ML2yQBfLk0GZXdR/C8ixgn0OME9+9U76HTp/EM+q6fJ4z0tLsKL21tNHnEdxtG0HmM7TgAZHNAHqNu8kltFJLEYpGQF4yQdhI5GR6VJXLx+M9PiiSOPR/EKogCqo0W5wAOg+5Wla+ILe8025vkstTjjgzujmsJY5W4z8qFQzfgDQBg+JNJm1WzuooopJIoUMj3F+5KFl5xHEfk3cffK4XggNzijpcc9/pNlpvhLUL+10/arzX0ixMsYJyyISn7yQnOTkqMk5J4qzNq/h25bN14e8QXXIOLnR7uUZHThlIrSHjawUADSPEIA4AGiXPH/jlAE3iHTG1Dbb2dla/bZ12vfz26P5CDvyPmbrhenc8dcKUWEHiLUbHTtItdUvBBbxpGIk8qJ/3m5pGA2x8FSRjceMA9rt14l0e8YtcaN4lkGMbDpN3tP/AduP0rmZfFWp6g8ml6boGueG9GTg3EeizNcy+vloqFUB/vEk+3oAblzc3jxr4S0N7NdXdR/ad9ZweVFZIRy2AT+9YcKM+5wK6/SdKs9E0q202whENrboEjQenv6k9Sa5XRdc0LQNPWy07QvEMUWS7k6NdM0jnq7sUyzHuTWh/wm9j/ANAnxF/4Jbn/AOIoA6aiuZ/4Tex/6BPiL/wS3P8A8RXkVz8cNZ8J+Lb/AEvUbN9S0+ObdCbiFrW5SNgGUEMo5AIHK84znnNAH0HXnnjWOTSPiB4Y8WTox0q0Se2u5QNwtw64WQ+i54J7V0Xhzxjp/ifQG1iyttQSBVLFJrVg5x1CgZD+nyk1F/wm9j/0CfEX/gluf/iKALsXiXS9S/c6Pf2+oTMP+XSVZBHweXIOFHHfrXmnhSXR9Tg0PT9Q1DU18S6XemR9NRESRJtx8x2Ij3FGDFmJbkHqTXdxeMdMgXbDomvRqTnCaHcgZ/BKUeM9OEjSDRtfEjDBYaJc5I+uygDora0trNHS1t4oVkkaVxGgUM7HLMcdSSck1NXM/wDCb2P/AECfEX/gluf/AIij/hN7H/oE+Iv/AAS3P/xFAHTUVzP/AAm9j/0CfEX/AIJbn/4ij/hN7H/oE+Iv/BLc/wDxFAGf8VNJvtV8GFtOt2ubmyuobxYEGWlEbZKj3xn8q07Px14d1C0SWz1OCed1+WzjcG43f3fL+8D65HHemf8ACb2P/QJ8Rf8Agluf/iKjXxhpizNMuia8JWGGcaHcbiPc7KAON1i70aXxN4p0LxXf3lgNSaFrdBFGwuoPLUBUYxsxZZA/APVsjnNej6XpVpHHZX72Z/tBLOO3M9yFa4CAZ2M46nJJOOM5rMbxnpzsjNo3iBmQ5UnRLklT7fJxTv8AhN7H/oE+Iv8AwS3P/wARQB01Fcz/AMJvY/8AQJ8Rf+CW5/8AiKP+E3sf+gT4i/8ABLc//EUAdNWb4h0v+2vD2paaGVJLq1lgSQjOwujLkf8AfVZf/Cb2P/QJ8Rf+CW5/+Io/4Tex/wCgT4i/8Etz/wDEUAYngTxZpWm+EtP0XW7u20nVdMhW0ntLuQRPlBtDKGxuDABgRnOah8Wa7DYeKtD1HVLm603RZLeeKK68lCIpyVwXDo20MgYA4B6jgE1vP4x0ySRJH0TX2kT7jHQ7klfodnFK/jTT5UKSaN4gdT1VtEuSD/45QBL4HstNsPDUcOjyXMmmmV5LeScj51Y7iUAAwmScDA9ehFdHXM/8JvY/9AnxF/4Jbn/4irul+JLbVro28Vjq0DBS26706aBPpudQM+1AGzRWFf8Aiu10+9ktZNO1qV48Avb6XPLGcjPDKpB69jVb/hN7H/oE+Iv/AAS3P/xFAHTUVzP/AAm9j/0CfEX/AIJbn/4ij/hN7H/oE+Iv/BLc/wDxFAHTUVzP/Cb2P/QJ8Rf+CW5/+Io/4Tex/wCgT4i/8Etz/wDEUAdNRXM/8JvY/wDQJ8Rf+CW5/wDiK8il+OOseFfFN9pWpWb6lp8U58p54WtrpIzyoYMBkgEDkAnHXmgD6DrF8T+GrXxRpaWlxJLBLDMlzbXMJAeCZOVdc9x/U0nhfxRZeLdJTUrCC8ihboLq3aMn6E8N9QSKrP41skdlOleICQcZGjXJH57KAJrTTNecRRatrNvNDGQT9ktTC82P77F2wO5CgZ+nByY/BGoWut3sll4juINFvrhrm507yVYl3OXCyHlVY5Jx6nFXv+E3sf8AoE+Iv/BLc/8AxFH/AAm9j/0CfEX/AIJbn/4igDpqK5n/AITex/6BPiL/AMEtz/8AEUf8JvY/9AnxF/4Jbn/4igDpqK5n/hN7H/oE+Iv/AAS3P/xFH/Cb2P8A0CfEX/gluf8A4igDd1CwttU064sLyJZba4jaKVG6MpGDXPaT4e1/RrGPSrfxBFLp0QCQyXFpuuY4xwF3hwpIHQlT7g1J/wAJvY/9AnxF/wCCW5/+Io/4Tex/6BPiL/wS3P8A8RQBU1bwXevrcOseHtdl0m88gW1yXiFws8YJKlgx5YZPPvXU2Vr9jsorczSTFFw0shyznux9yeawf+E3sf8AoE+Iv/BLc/8AxFH/AAm9j/0CfEX/AIJbn/4igDpqK5n/AITex/6BPiL/AMEtz/8AEUf8JvY/9AnxF/4Jbn/4igDpqK5n/hN7H/oE+Iv/AAS3P/xFH/Cb2P8A0CfEX/gluf8A4igCCz8J3+gajeS+HdTgt7C8lM8ljd2xljjkP3mjKupXPcHI+lLr3gyXWbC0ePWJ7fWrO4+0wagqA7XI2ldh4CEcbfYZyc5m/wCE3sf+gT4i/wDBLc//ABFH/Cb2P/QJ8Rf+CW5/+IoA0tC06+0+zYanqj6leyNuknMSxr0wFVBwAP1OTWpXM/8ACb2P/QJ8Rf8Agluf/iKP+E3sf+gT4i/8Etz/APEUAdNRWLY+J7W/S5aOw1eL7PEZWFxps0RYDsu5Rub2GTVP/hN7H/oE+Iv/AAS3P/xFAGhrTsypFuvvLwS8dnEd8vou/oo69wenI74OmaDrBNzDbs2haPcMpWzVlaaF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']	['che_226_1.jpg', 'che_226_2.jpg']
che_227	OPEN	"Supramolecule refers to an aggregate with specific structure and function formed by multiple molecules combined together. The molecules within a supermolecule are bonded through non-covalent bonds. Crown ethers are the general term for macrocyclic polyethers. They can interact with cations and have a selective effect on cations depending on the size of the ring. The following figure <image_1>shows three common crown ether structures. It is known that K^+ has a strong binding ability to crown ether, making potassium salt well soluble in this liquid crown ether.
The partial ionization energies of Mn and Fe are shown in the following table<image_2>. Comparing the I_2 and I_3 of the two elements, we can see that it is more difficult for gaseous Mn^{+1} to lose another electron than gaseous Fe^{2+} to lose another electron. Please analyze the reason from the perspective of atomic structure ()"		The loss of another electron in gaseous Mn^{+1} requires the destruction of the semi-filled state, which is relatively stable and requires more 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'che_227_2.jpg']
che_228	OPEN	Vanadyl basic ammonium carbonate crystal\{[VO(NH_3)_5][CO_3]_4(OH)_9\}\cdot10H_2O, with a relative molecular mass of 1065\} is purple-red and difficult to dissolve in water and ethanol. Its preparation and thermal analysis experiments are as follows. Answer the following questions: I. The process for preparing vanadyl basic ammonium carbonate crystals is as follows: <image_1>among them, the VOCl_2 prepared in step i is easily oxidized by O_2, and some devices in step ii and step iii are shown in the figure<image_2>. The advantage of using the suction filtration method in step iii is_____.		Faster filtration rates and less water content in the 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che_229	OPEN	"Adipic acid is an important raw material for synthetic medicines, pesticides, adhesives and spices. The preparation principle is as follows: <image_1><image_2>I. Add 9.0 g of potassium permanganate, 5mL of 1% NaOH solution and 50mL of distilled water into a three-necked flask, and heat to 40℃ with stirring. II. Add 2mL of cyclohexanol, control the temperature at about 50℃, and fully react for a period of time. III. Dip a drop of the reacted mixture with a glass rod and point it on the filter paper. If a ""purple ring"" appears, add NahSO_3 solid until it becomes colorless. IV. Filter the mixture, wash the filter residue with water 3 times, combine the filtrate and washing solution, and add concentrated hydrochloric acid to make the solution highly acidic. Heat and concentrate the reaction solution to about 10mL, cool, add a small amount of activated carbon, boil for decoloring, and filter while hot. The filtrate is cooled, crystallized, filtered, washed and dried to obtain a crude product. V. Accurately weigh the above-mentioned crude m_2 adipic acid product into a conical flask, add a small amount of water to dissolve, drop the indicator, and titrate with 0.1mol/L NaOH solution until complete neutrality. Repeat the above operation three times, and consume an average of VmL of NaOH solution. Reason for filtering while hot______."		Filter off activated carbon to reduce the loss of adipic acid (prevent adipic acid from being separated out when cold)	che	化学实验基础	['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'che_229_2.jpg']
che_230	OPEN	"The group believed that a Cu(OH)_2 precipitate was formed in the experiment, and if ammonia water was directly added to the Cu(OH)_2 solid, the copper-ammonia complex could also be obtained. So 0.1g of Cu (OH)_2 solid was taken into a test tube, and 5mL of 2mol·L^{-1} ammonia water was added dropwise. It was found that the solid was almost insoluble. Theoretical analysis Cu(OH)_2(s)+4NH_3·H_2O (aq)[Cu(NH_3)_4]^{2+}(aq)+4H_2O (l)+2OH ^-(aq) \quad K=1.6\times10^{-7} The group believed that the small extent of this reaction was the reason for the unsatisfactory preparation of copper-ammonia complexes.
The conjecture a: Combined with the principle of equilibrium movement, increasing c(NH_3·H_2O) can obviously promote the formation of copper-ammonia complex ions. Conjecture b: Compared with experiment i, the introduction of NH_4^+ can significantly promote the formation of copper-ammonia complex ions.
Experimental verification In order to verify whether conjectures a and b are true, experiment iv-vi was designed and completed to calculate the maximum mass of Cu(OH)_2 dissolved and record the data<image_1>. Experimental conclusion ③ The experimental result is that m_2 is slightly greater than m_1, and m_1-m_3___(fill in ""greater than"" or ""less than"") m_2-m_1, which can prove that conjecture b is true and conjecture a is not true."		greater 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che_231	OPEN	Thin-plate chromatography is widely used in biochemical experiments. The surface of the thin plate is coated with silica gel, and its cross-section is shown in Figure 1<image_1>. Take the liquid in Device A and place it on the thin plate M. When the mixture of ethyl acetate and n-hexane drives the sample to climb on the thin plate (Figure 2<image_2>), the climbing heights are different due to the different adsorption forces on the surface of the silica gel layer for benzoin and diphenyl ketone (Figure 3<image_3>). Answer the following questions: The product is characterized by infrared spectroscopy. By comparing the infrared spectra of benzoin, it can be preliminarily inferred that the spectrum change of benzoin into diphenyl ketone is_______.		" The O-H absorption peak disappears (or answer ""hydroxyl/-OH absorption peak disappears"")"	che	化学实验基础	['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', 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'che_231_2.jpg', 'che_231_3.jpg']
che_232	OPEN	Preparation of anhydrous CrCl_3. CrCl_3·6H_2O reacts with SOCl_2 vapor to prepare CrCl_3. The device is as shown in the figure <image_1>(clamping and some heating devices are omitted). SOCl_2 has a boiling point of 76 ° C and is easily reactive when exposed to water. During the experiment, the connecting pipe needs to be heated intermittently, and the purpose is_____.		Prevent CrCl_3 from cooling and solidification and clogging the connecting 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che_233	OPEN	"Exploring the Reaction between FeCl_3 Solution and Fe
The group of students conducted the <image_1>experiment shown in the figure and observed that the red color of the solution faded after tube c was fully allowed to stand. Student B believed that part of the KSCN in test tube c also reacted. He took the solutions in tubes b and d, designed the following experiments<image_2>, and compared the colors of the solutions in the two sets of experiments. In the above table, V_1 =()."		1.05	che	化学实验基础	['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Fpej6HNcQ6VPrN9JKbm4WTSpkUg/eWItHtUAdB3xzjOa6DUp4JPhxc6r4akl05GtGvIDaWyBmOwkAoVPJ47Z96AK1zqciwwm52xxXd1Iluls8wYsoIIAiQkg7GfPvWDYWy6HbwxtJcNdSahJJaPOl8kQlldioZdoDfewcnnmtK40rOneAdOZUYq2H85C4yLV8kjI7+/WmeIbSysNZ0KzVLZbx9ShZFhspELKCSxD5K8DrQB02tz6jaQW081ta3WniNv7RhYfcAUtvTPUZGMEdweMGuHu9UaTU7u5mUrcaPYgRHGIpbycsrN1yyoVI6EABj2rpfiDFeSpocNvd3SW9zqlvBcwRRqUkj3bjuONwHygcEDnBpJm0zTfFOqxTWqyRpp1rHBaxRhmfLTrtRfocfTrxQBn+Db2dNV07QrW7tri1srOU3W60ZZVdX8tQWZ25LLIcjj5eOox6LXm3hK4uvC+rS2niWyuRqGpui215EhnjaNVwkLMo+Vl+YnIwSSc16TQAVxmn/wDJX9a/7BVt/wChyV2dcZp//JX9a/7BVt/6HJQB2dccf+Syj/sAf+167GuOP/JZR/2AP/a9AHY0UUUAFFFFAFTVf+QRef8AXB//AEE1k+A/+SfeHv8AsHQf+gCtbVf+QRef9cH/APQTWT4D/wCSfeHv+wdB/wCgCgDdn/1En+6a5T4W/wDJM9C/69//AGY11c/+ok/3TXKfC3/kmehf9e//ALMaAOvqnbarYXl5cWdreQzXFvjzo43DGPPQNjoeOhrzz4l+C/G/iOOQ6H4lMdpjI0/Hk7vbzF5b6HiuZ+F3hPxnpen3+mf2q+gXUc3mSRS6ck3nAjAdZCfmHGMDp+NAHutFcT/wjnjr/oe4v/BRH/8AFUf8I546/wCh7i/8FEf/AMVQB2uBnOOaWuJ/4Rzx1/0PcX/goj/+Ko/4Rzx1/wBD3F/4KI//AIqgDtqK4n/hHPHX/Q9xf+CiP/4qj/hHPHX/AEPcX/goj/8AiqAO2orif+Ec8df9D3F/4KI//iqP+Ec8df8AQ9xf+CiP/wCKoA7aiuJ/4Rzx1/0PcX/goj/+Ko/4Rzx1/wBD3F/4KI//AIqgDtqQ9DXFf8I545/6HuL/AMFEf/xVdoARGAzbmA5OMZoA4/4Xf8iNB/183P8A6OeuyPSuN+F3/IjQf9fNz/6OeuyPSgDjPhr/AMgbVv8AsM3n/o012dcZ8Nf+QNq3/YZvP/Rpp914f8aS3c0lv41jhgZ2aOI6XG2xSeFzu5wOM0AdhRXE/wDCOeOv+h7i/wDBRH/8VR/wjnjr/oe4v/BRH/8AFUAdtRXE/wDCOeOv+h7i/wDBRH/8VR/wjnjr/oe4v/BRH/8AFUAdtSAAdABXFf8ACOeOv+h7i/8ABRH/APFUf8I546/6HuL/AMFEf/xVAHbUVxP/AAjnjr/oe4v/AAUR/wDxVH/COeOv+h7i/wDBRH/8VQB21FcT/wAI546/6HuL/wAFEf8A8VR/wjnjr/oe4v8AwUR//FUAdtRXE/8ACOeOv+h7i/8ABRH/APFUf8I546/6HuL/AMFEf/xVAHbUVxP/AAjnjr/oe4v/AAUR/wDxVH/COeOv+h7i/wDBRH/8VQB21RXNzDZ2stzcOI4YlLu56Ko6k1x3/COeOv8Aoe4v/BRH/wDFVXv9E8aWlhcT3HjmNoY4yzqNGjYsMdAN3JPTFAHb2l7a6hapdWdxFcQSDKSxOGVh7EVy/wAU/wDkmOvf9e3/ALMK8a8B/DL4iRaj/aFtqEnh63L7/wB6eXHvCOPwbFeu/EWK4g+EusxXVz9pnW0AebYE3ncOcDgUAdpD/qY/90Vg+PP+SfeIv+wbcf8Aotq3of8AUx/7orB8ef8AJPvEX/YNuP8A0W1AGrpX/IHsv+uCf+girlZcEVxP4ZhitLkW1w9qojmKB/LbaMHaeuPSud/4Rzx1/wBD3F/4KI//AIqgDtcDOcDNLXE/8I546/6HuL/wUR//ABVH/COeOv8Aoe4v/BRH/wDFUAdtRXE/8I546/6HuL/wUR//ABVH/COeOv8Aoe4v/BRH/wDFUAdqQGBBAIPUGjA9K4r/AIRzx1/0PcX/AIKI/wD4qj/hHPHX/Q9xf+CiP/4qgDtsUgUBQoAAHYVxX/COeOv+h7i/8FEf/wAVR/wjnjr/AKHuL/wUR/8AxVAHa4GQcDI6UFVJBKgkdCR0riv+Ec8df9D3F/4KI/8A4qj/AIRzx1/0PcX/AIKI/wD4qgDtqbsTfv2jdjGcc1xf/COeOv8Aoe4v/BRH/wDFUf8ACOeOv+h7i/8ABRH/APFUAdtiqdpq2n39xcW9reQyz2z7Jolcbo29GHUVyv8Awjnjr/oe4v8AwUR//FV5FrngDx14h+Idxd6beSO0W2J9YMX2NGZRg4CnLY6ZGc4oA+k64zT/APkr+tf9gq2/9DkrU8JaVrmkaStvr2uf2tcjGJPJCbR6Z6t9TWXp/wDyV/Wv+wVbf+hyUAdnXHH/AJLKP+wB/wC167GuOP8AyWUf9gD/ANr0AdjRRRQAUUUUAVNV/wCQRef9cH/9BNZPgP8A5J94e/7B0H/oArW1X/kEXn/XB/8A0E15t4Ih8Q3vhXR4dP8AHGnIRZRFbUWCSPEu0cH95k46ZwKAPUJ/9RJ/umuU+Fv/ACTPQv8Ar3/9mNVNQsvFVhblr3x5p0CsCAZdMRN3sMyVb+Fn/JMtB5z/AKP/AOzGgDr6KKKACiiigAooooAKKKKACiiigAooooAKQ9DS0h6GgDjvhd/yI0H/AF83P/o567I9K8g8BJrdzoSW+neMtPs83NxssXsklkX962f4wT69K6m60/xbZQ+bd+O9PgizjfLpaKM+mTJQA/4a/wDIG1b/ALDN5/6NNdkzqgyzBR6k4rhvhQXPhi+Mlwly51W73TooCyHzD8wAJwD1rtLm0tr2Ew3UEU8RIJSVAy5HTg0AYuh+IxqLar9re2gW01B7OIh8bwAuCc9yWxV+TX9HhWRpdVskWIkSFrhRtI6554xXm8uj6eukeeljbA3XitFjYRLnYtwEwOOnyGrV4oHwo8a8c/aNR/8AQ2oA9OVg6hlIZSMgg8GsS316ZNdXSNTshazT+Y1nIkvmRzouM84BVgCDtI9cE4rYt+LaL/cH8q828TQ3WveJZ9b01pCvhVf3Kp0nnLK0yD1/drs+rn0oA9NrK8QarLo+nJcQ26TyyXMFuqPJsGZJFjBJwcAbs9DVvTdRtdW0231CylEttcRiSNx3BFY/jFrFtOsba9vJrQ3GoW6wSQx7381XEigDB7p6ECgCxLeeIo4nf+ytM+VSf+QjJ/8AGal8M6rLrnhnTtVmhSGS7gWYxo24LkZxmudaa9/4SfU9IufEl8lvFaQyxnyYCxLmQNnEXT5B+tbHhWO1i8L2+mWFzO6WUf2QTyQmNiVGNwDDn1B5FAFTV/FN5YeKDo9tp6zgWaXJkJkJGXZcYRG/u1Q1LxrqthDBIdJjxJcwwEt5ygb3Vc5aIDv61ja1ZGXxxcWk5+3XMVhC/wBouo4T8rPINoUW74wVJzx1rCeeF9DTVotOtwEu0jUeVAGDCYJuBFqB156/4UAe1XE8drbS3EzhIokLux6AAZJrkNP+Idk3hZdW1QRxTm2e7NrbtvYRg8DPADkEfKT6+hq5qujSp4fu7G71jULiG8l/fSvCJZFQ9URUTABxjkHAJrk9JnufEOlwJevq2pRTSyRT2gs0SDyopztGSqLuO1QeTxuGOmADs9K8Rm91XWILlIra3sWgCO7bWPmRhsNngHJxWjqmrW+mLEs8gjefcsLP91nCkhc+pwceuK850ax0a41zxOB4MF5tuEEVuYbfC7YlBUEvgfNnOM4ro/HRCeEH1CdpIGhjVreyaONybjpGOQedxA4NADIfiAp8LvqJsJZryLT4bt44hiNpJeEiDcncTjjHQj1ro9J1GW+e9huESOe2mCGNTkqpVWXPr97GenBryrw1dRWPhi2vbpr+S10q0g1C7siI1DERkxyKQBuX5T1YncijAxXYGS7vfiHbNYK2nzrYrNe+YBIlxCWYIhAIwwIYhs8ZI5oA7iuQ+Kf/ACTHXv8Ar2/9mFdfXH/FP/kmOv8A/Xt/7MKAOth/1Mf+6KwfHn/JPvEX/YNuP/RbVi6fa+KL+P8A0Lx9ptxsA3CLTEfb6ZxJWR43t/Edj4T1ePUfG+nsHsZibZtPSN5l2HKqfMzz0yAaAPRtK/5A9l/1wT/0EVcqnpP/ACB7L/rgn/oIq5QAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFcZp/8AyV/Wv+wVbf8AocldnXl2rveJ8WdS+x+IrPRWOmW+57mFZBJ8z8Dcy4xQB6jXHH/kso/7AH/tej+xvGnl+Z/wmtnsxnd/ZC4x6/6ysTw092/xZlN3r1prL/2JxNbQrGqDzx8pCs3Pf8aAPTKKKKACiiigCpqv/IIvP+uD/wDoJrznwPBcaZpWgS6b4HtpFlsbfzNVjmhjchkXeSMbjjn64r0jUI2l026jQZZ4mUD3INeW/DzXtG0vT9FguvFuozXMlrFCNOlizFG5AG0FY+MEY5b60AdV4qW8vb5LWTwVBrNkgBW6mniAjJ+9hXGePbrTvhbx8MtB/wCvf/2Y1V8ceIdFt5Bp914ovtHuYl8xhaRZ3gjjcSjDH5Vc+GETxfDTQFcEE2obn0JJH6GgDraKKKACiiigAooooAKKKKACiiigAooooAKQ9DS0h6GgDyDwRDcWOkWd/pngm21O4M9wzagJoopEbznXGWG7p398V3Hi1r6YQ2kfhCLXrVhvbzbiJFRxwPlccnHeuA8E6vpXh2KP+1fFWoW80d3cq+meXuhB81152xkjnn736V3fjTXtIsYYrG+8Q3ejzyfvVktYizlRkYzsYY/woApfCqNYfDV/GkCwKmq3YEKYxH+8PyjHHHSus1WW7jsHWxi33Un7uIn7qE/xN7Dr74x3rkv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'che_233_2.jpg']
che_234	OPEN	"N, N-dimethylformamide (DMF) is a common organic solvent that is easily decomposed at high temperatures. A reaction for CO ˇ hydrocoupling dimethylamine to prepare DMF is as follows:
I: <image_1>
II:<image_2>
At 300℃, add 1mol of DMA and 1mol of CO ˇ, and 2.22 mol of H ˇ into a 2L constant-volume closed container. The relationship between the amount of nitrogen-containing species and time is shown in Figure 2<image_3>. If the total equilibrium pressure is $p_0$ kPa, the equilibrium constant of the reaction is $K_p = () \text{kPa}^{-1}$. ($K_p$is the equilibrium constant where the equilibrium partial pressure replaces the equilibrium concentration, and the equilibrium partial pressure = total pressure × the quantity fraction of the gaseous substance)."		\frac{1}{19.8p_0}	che	化学反应原理	['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'che_234_2.jpg', 'che_234_3.jpg']
che_235	OPEN	"Under the action of the catalyst, NH_3 can reduce SO_2 in the flue gas to S_1, turning waste into treasure. The reaction is as follows:
Reaction: 2NH_3(g) = N_2(g) + 3H_2(g) \quad \Delta H_1 = +92 \text{kJ·mol}^{-1}
Reaction II: 3H_2(g) + SO_2(g) = 2H_2O(g) + H_2S(g) \quad \Delta H_2 = -207.4 \text{kJ·mol}^{-1}
Reaction III: 4H_2S(g) + 2SO_2(g) = 3S_1(g) + 4H_2O(g) \quad \Delta H_3 = +95.6 \text{kJ·mol}^{-1}
There is another reaction V between NH_3 and SO_2: 2NH_3(g) + SO_2(g) = H_2S(g) + N_2(g) + 2H_2O(g). The curves of\lg K_p of reactions IV and V versus temperature are as shown in the figure<image_1>.
\lg K_p =() at 1273K for Reaction III."		2.4	che	化学反应原理	['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']	['che_235.jpg']
che_236	OPEN	"Isobutane (i-C H) is an important chemical raw material and one of the important monomers in synthetic rubber. It is commonly prepared by isomerization of normal butene and catalytic dehydrogenation of isobutane (i-C H).
 Isobutane (i-C H) catalyzed dehydrogenation reaction a can be expressed as i-C H (g) i-C H (g) + H ˇ (g) $\Delta H_1$
The side reaction can be expressed as i-C H (g) CH ˇ =CHCH (g) + CH (g) $\Delta H_2$
At different temperatures, 1mol of isobutane and 1.9 mol of Ar were filled into a closed container with constant pressure. The relevant data measured during equilibrium are as shown in the figure <image_1>. (Yield = amount of raw material used to produce a certain product/amount of raw material input × 100%)
At 600℃ and pressure p, when the reaction reaches equilibrium, the partial pressure of isobutane is ()."		\frac{p}{5}	che	化学反应原理	['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']	['che_236.jpg']
che_237	OPEN	"Catalytic hydrogenation to methanol is a key technology to reduce carbon emissions and provides solutions for future fuel and material manufacturing. Under the action of catalysts, the following reactions mainly occur:
I. $ \ce{CO2(g) + 3H2(g) <=> CH3OH(g) + H2O(g)} $  $\Delta H_1 = -49.4 \text{kJ/mol}$
II. $ \ce{CO2(g) + H2(g) <=> CO(g) + H2O(g)} $  $\Delta H_2 = +41 \text{kJ/mol}$
III. $ \ce{CO(g) + 2H2(g) <=> CH3OH(g)} $  $\Delta H_3$
The above reaction occurs by filling 3 mol of H ˇ and 1 mol of CO ˇ into a closed container with constant temperature and constant volume. At equilibrium, the CO ˇ conversion rate $α(\ce{CO2})$, CH OH selectivity $S_M$, and CO selectivity $S_{CO}$change with temperature T as <image_1>shown in the figure: The reason for the change trend of curve c is ()"		With the increase of temperature, the equilibrium of Reaction II shifted forward, and Reactions I and III shifted backward, both resulting in an increase in CO selectivity.	che	化学反应原理	['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']	['che_237.jpg']
che_238	OPEN	Hydrogen energy is an ideal green energy source. Some scientists predict that hydrogen energy may become humanity's primary energy source in the future. Chinese scientists have developed the following three hydrogen production methods.\n\nI. Catalytic reforming of toluene to produce hydrogen. The main reactions include:\n\na. Toluene steam reforming: ①$ \\ce{C6H5(g) + 7H2O(g) <=> 7CO(g) + 11H2(g)} $  $\\Delta H = +869.1 \\text{kJ/mol}$\n\nb. Toluene carbon dioxide reforming: ②$ \\ce{C6H5(g) + 7CO2(g) <=> 14CO(g) + 4H2(g)} $  $\\Delta H = +907.0 \\text{kJ/mol}$\n\nc. Water-gas shift reaction: ③$ \\ce{CO2(g) + H2O(g) <=> CO(g) + H2(g)} $  $\\Delta H = -41.2 \\text{kJ/mol}$\n\nd. Methanation reaction: ④$ \\ce{CO2(g) + 4H2(g) <=> CH4(g) + 2H2O(g)} $  $\\Delta H = -165.0 \\text{kJ/mol}$\n\n⑤$ \\ce{CH4(g) + H2O(g) <=> CO(g) + 3H2(g)} $  $\\Delta H = +206.1 \\text{kJ/mol}$\n\nAt a certain pressure, the H₂ content at the reactor outlet varies with temperature and feed ratio $\\left[ \\frac{n(\\ce{H2O})}{n(\\ce{toluene})} \\right]$, as shown in the figure: <image_1>\n\nExplain the variation of H₂ content with the feed ratio $\\left[ \\frac{n(\\ce{H2O})}{n(\\ce{toluene})} \\right]$ and the reasons: ( ).		At a certain temperature, the H ˇ content at the outlet first increases and then decreases with the increase of the feed ratio. When the feed ratio is less than 7:1, the balance moves towards the generation of H ˇ with the increase of water vapor, and the H ˇ content at the outlet increases; when the feed ratio is greater than 8:1, the water vapor is excessive, diluting the H ˇ content	che	化学反应原理	['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che_239	OPEN	"The catalytic hydrogenation of CO ˇ into CH OH can not only respond to the country's ""double carbon"" goal, but also alleviate energy shortages. The following reactions mainly occur in this process:

I. $ \ce{CO2(g) + H2(g) <=> CO(g) + H2O(g)} $  $\Delta H_1$

II. $ \ce{CO(g) + 2H2(g) <=> CH3OH(g)} $  $\Delta H_2$

III. $ \ce{CO2(g) + 3H2(g) <=> CH3OH(g) + H2O(g)} $  $\Delta H_3 < 0$

At 3MPa, continue to pass through the reaction tube filled with 0.5 g of catalyst at an inlet flow rate of 4.5 mmol·min ³, n(CO ˇ)=1:3 (only the above reactions I and II occur). The conversion rate of CO ˇ [α(CO ˇ)], selectivity of CH OH [S(CH OH)] and spatio-temporal yield of CH OH [Y(CH OH)] were measured over the same time as a function of temperature (T). The relationship is as follows:<image_1>

Known: a.S(CH OH)=n(CO ˇ converted to CH OH)/n(CO ˇ consumed)×100%

b.Y(CH OH)= yield of CH OH × inlet flow rate of CO ˇ/mass of catalyst (mmol·h ³·g ³)

Under certain conditions, the inlet flow rate was changed to 0.04 mmol·min ³ (this flow rate can be approximately regarded as the equilibrium conversion rate), and the outlet flow rate was measured to be 0.038 mmol·min ³, and α(CO ˇ) was 50%. At this time, the equilibrium constant of Reaction I $K_p=$()"		\frac{4}{23}	che	化学反应原理	['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che_240	OPEN	Professor Zheng Gengfeng's team at Fudan University synthesized a CeO₂@PdO@FeO₂ hollow multilayer nanosphere catalyst and utilized it for the photocatalytic oxidation of CH₄ by O₂ to produce ethanol. The relevant reactions are as follows:\n\nReaction I: $ \\ce{2CH4(g) + O2(g) <=> C2H5OH(g) + H2O(g)} $  $\\Delta H_1 = -327.3 \\text{kJ/mol}$\n\nReaction II: $ \\ce{2CH4(g) + O2(g) <=> 2CH3OH(g)} $  $\\Delta H_2 = -252.4 \\text{kJ/mol}$\n\nReaction III: $ \\ce{2CH3OH(g) <=> C2H5OH(g) + H2O(g)} $  $\\Delta H_3$\n\nUnder conditions of 450°C and 101 kPa, CH₄ and O₂ were introduced into an isothermal closed container at a ratio of $ \\frac{n(\\ce{CH4})}{n(\\ce{O2})} = 2 $. In the presence of the catalyst, Reactions I and II occurred. After the same reaction time (without reaching equilibrium), the selectivity S of ethanol and the conversion rate of CH₄ were measured as shown in Table <image_1>. It is known that the selectivity of product A, $S(A) = \\frac{n(\\text{carbon in product A})}{n(\\text{reacted CH}_4)} \\times 100\\%$. At a certain temperature, 2 mol of CH₄ and 1 mol of O₂ were added to a constant-volume container with a volume of 2 L, and Reactions I and II proceeded in the presence of the catalyst. At equilibrium, the volume fraction of CH₃OH was $ \\frac{1}{4} $, and the conversion rate of CH₄ was 80%. The equilibrium constant K for Reaction I at this temperature is ( ) (retain three significant figures).		18.9	che	化学反应原理	['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che_241	OPEN_OnlyTxt	The coal-to-methanol industry is of great significance to national energy security and the development of the chemical industry. Its main process consists of coal gasification and methanol synthesis:\n\nI. The main reactions of coal gasification:\n\nReaction 1: $ \\ce{C(s) + H2O(g) <=> CO(g) + H2(g)} $  $\\Delta H_1 = +131.3 \\text{kJ·mol}^{-1}$\n\nReaction 2: $ \\ce{CO(g) + H2O(g) <=> CO2(g) + H2(g)} $  $\\Delta H_2 = -41.1 \\text{kJ·mol}^{-1}$\n\nWhen Reactions 1 and 2 are carried out in a constant-temperature and constant-volume container, which of the following statements are correct ( ) (fill in the serial numbers).\n\nA. When the density of the mixed gas remains constant, it indicates that the reaction system has reached equilibrium.\n\nB. At equilibrium, the volume fraction of H₂ may be greater than $ \\frac{2}{3} $.\n\nC. At equilibrium, introducing inert gas into the container will not change the volume fraction of CO in the equilibrium system.\n\nD. At equilibrium, reducing the container volume will decrease $ \\frac{c^2(\\ce{CO})}{c(\\ce{CO2})} $ in the equilibrium system.		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che_242	OPEN	"Compound H is a synthetic drug intermediate. An artificial synthetic route for synthesizing Compound H is <image_1>shown in the figure. Known:
I. When two hydroxyl groups are connected to the same carbon atom, it is unstable and prone to reaction:<image_2>
II. <image_3>
The name of the oxygen-containing functional group of E is ()."		ketone 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'che_242_2.jpg', 'che_242_3.jpg']
che_243	OPEN	"The new drug repaglinide (viii) has a hypoglycemic effect, and its synthesis route is as follows<image_1>. known<image_2>
Regarding the related substances and transformations in the above synthetic route, the following statement is correct ()(fill in the letters).
A. In the conversion from compound iv to v, there is the cleavage of the C=O bond and the formation of the C=N bond.
B. During the conversion of compound vii to viii, the small organic compound formed can form hydrogen bonds with water molecules
C. Compound vi has 2 chiral carbon atoms
D. All C and O atoms in compound iv can be used as coordinating atoms"		AB	che	有机化学基础	['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ADFUvEd7bWF5ok93PHDEL1gXkYAf6iWrPhuaO40fzoZFkie5uGR0OQwMz4IPcUAa1FFFABXIaD/yMDf9fGof+jIq653WNC7sFVRkknAArkPC7w3uqXFzbXEMscVzebgjgnEjoUOPQhTzQB2FFFFABWPcf8jhp/8A143P/ocNXdQ1Oz0uDzrydY1PCjks59FUcsfYAmsM6zZy+K9LaaQWsj2U6+TcMqupZ4tgIzwWCkgHng9waAOnooooAKRlVhhgCPcUtVr3ULPTofOvbmK3jzgNI4UE+gz3oAs0VHBPDcwJNBKksTjKujBlYeoIqSgAooooAKKKKACiiigAooooAKO1FHagDE8If8ipYf7h/wDQjW3WJ4Q/5FSw/wBw/wDoRqPxhrV34f0MX9osLuLiGErMpIxJIqZ4I6bs/hQBv1U1TTbXWNLudOvohLbXMZjkQ9wf5H3rG1PXr2y8WaBpEX2Z4dSE3muVO5PLTdx83fp7e9dJQBw66XJqttYaTqmoyXemGd4xE0QWSXyGOBK+cMMoDwq57967gDAwK5ew/wCPrS/+vy+/9DkrqKACiiigDnvE3/H/AOHP+wmf/Seer3hwlvDOlEkkm0iJJ/3BVHxN/wAf/hz/ALCZ/wDSeervhv8A5FfSv+vOL/0AUAalFFFAENxHG0ZdkUuinaxHK8dqzfCf/InaJ/14Qf8AoArVm/1En+6ayvCf/InaJ/14Qf8AoAoA2KKKKAKWr6TZ65pVxpt/F5ttOu116EdwQexBwQexFZUnhiS+FrDq2py31paypLHE0aoZGQ5UyEfewcHgAZHIroqKACiiigAooooAKKKKACiiigAooooAKKKKACsPxn/yJes/9ekn/oJrcrD8Z/8AIl6z/wBekn/oJoA2x90fSlpB90fSue1jXLzT/Fmg6VELf7PqXn+Y7qdyeWobjnHOcUAdFWF4s0y1v9Ga5uDKkunH7bbzQkB45EBIIzxyMgg8EE1DpuvXd5421jRXFv8AZrGGCVHRTubzN3B5xxt/WtHxF/yLOq/9ecv/AKAaAMq10t73xNFPq90Lu506ES2wjh8qJDJuUtt3MS+FIyTgA8AV09ZNp/yMt7/152//AKFLWtQAUUUUAch4iJXxASCQfskPT/r5Suvrj/Ef/IwH/r0h/wDSlK7CgAooooAwvFUcY0V5AiiRri2BYDkgTpgZ/GtwdBWL4r/5ALf9fNv/AOjkrbHQUAFFFFAGVreg2+tLau8kkF1Zy+dbXMWN8T4IPXgggkEHgioIvDzPqseq6hem6v4Initm8oJHAGxuKrk8nAySenHFblFAHJReBki8GXnhkanOba6Mu6UxrvAkYswHbqx7V0tlbtaWMNu8plMSBN5XG7HtViigAooooAKKKKAGyNsjZ9pbaM7V6n6VlaT4l07W7W7msHkke0kaGeAoVkjdeqlT3rWJwCTXms2nXNksni7w2onvIbm5jvrSMjF7AJ3yOP8AlovVT+FAHoGm6hFqmnw3sCSLDModPMXaSp6HHas668U2drrj6Obe9kvFg+0FYoC4MecbgR78Y615v4h1pIvC9rDFe3NrdJ4c+0wK05hUNgYKBeWk+XGM4A+prVj1GC8+Iltc/wBtrZ+Z4bQm4Vo/mYy5/jBHvQB11x410eHSrfUlkmmtZ5xbK0URJWUtt2MpwVOeMEfWrc/iG1t9bs9IkhuRd3kbSRAR5XauN2W6DG4Z+teSpI4+H0cMjgBfE8fl6gBj7aPODGcA5HUnpx8vpXa3pFp8UPDouNSacmwvcebsG3JhI+6B1wevpQB3dFUNI1eDWrSS5tlkWNJnh+cYJKnGfoe1SaneHT9Ku70JvNvC8uzON20E4z+FAFiaaK3heaeRI4kBZ3dgAoHUknpWJ/a19qx2aLAEtzj/AE+5UhCP+macF/rwvPBPSo7HTYtSu5ZdWuxqF1aPtaAIVt4WKhxhD944ZfmYk+mOldEBgYFAHI2+uX+n3slnM8mpFMkxSRrDd7QcF1XhZU75XBHTk8V0lhqVnqcLS2c6yhW2OOjI3dWU8qfYgGk1DTLPVIPJu4FkXqrdGQ+qsOVPuOa5u80G/tbtLiJ5rraVVLmFlju4h0wxPyzL3wwz/vGgDr6yb3XoYblrKzie+v1IDQQY/d56GRuiDvzyewNZ1tBrGsS3dlqGoJFb2r+RIbJTFJcEorZ3ZJQYYDC8553DpW/Z2Nrp9uILSCOGIfwouOfU+p96AMNdN1+O7fVhdWbXkiLG9nsIi8sEkKH+9u+Y/NjB/u1oWGu293cCzuI5LK/wT9muMBmA6lD0ce4J98VqVVvtOtNTtzBeQJKnUZ6qfUHqD7jmgC1VLUNVs9LRDdS4eQ4iiUFpJD1wqjlj9Kzv7N122H2ay1WJrUgBZbqIyTQgdcEEB+OhbkdTu6Vd0/RbTTpHnUPNdycyXM7b5G9s9h/sjAHYUAZs9prGvrG8rDSrZHSaKIqJJmdTuUv/AAqMgfKMn3HSpl1yfTCItfhW3UDi+iybduf4ieYz/vcf7RrdpGVXUqyhlIwQR1oAAQyhlIIPIIpaxBocunTebolyLaNnDSWcgLQMO+0dYz/u8Z6qa26AM6HX9IuUuXg1O0kW1JE5SUEREdd3p+NOTXNKk03+0k1G1axzj7QJV8vOcfezjrXHeGmvVPjQW8Nu8f8Aa8+TJIVOfJj7BTWB4YLtdfDaC4z9gOnTuin7huAoxntkLuI/HFAHqdrq2n3sU0ttewSpCcSlXH7s4z83pxzzWadautVJj0GBXiIH/EwnBEA/3B1k/DC/7XasLWbZJvizo0MUKSxz6dP/AGhEygqY1ZTEWHT7+cfjXdABQAAAB0AoAy7HQre2uReXMj3t/wA/6TcYJQHqEA4QfQc981FPoPkzvd6PcfYLliWdAu6GZj3dPX/aXB9zW1RQBiwa95E6WmsQfYLhiESQtugmY9Aj+v8Astg+gNSXmvQxXLWVjC9/fKQGhhPEWecyN0QY555PYGtKeCG6heGeJJYnGGR1BBHuDTLSztbCAQWlvFBEOQkSBR+QoAyV0OfUmEuvTrcDtZRZFuv1B5kPu3Hooq5qGiWeobZCGguY12xXMB2SRj0B7j2OQe4rRooAwvt+p6O2zU4TeWmcC9tozuUf9NIxz/wJcj2UVDq3iIpa28unXFoLa5A2Xrv5isTn5Y41O6R+OnH49K6OqcWk6dBeveQ2NvHcv96VYwGPrzQBzNhoV/fy/apXntN6kNdTkNeOCei/wwr7KM/Q10UWh6ZDYS2S2ULW82TKrrv80nqWJyWPuea0KKAML+z9T0dt2lzG7tM5NldP8yj/AKZyHkfRsj3UVVs/EN/r15qEWjQW6Q2Ev2eWW6JO+YAFkUL0AyAWyeegPWunrjdCsL3wpqGuQtYz3dnfXj39vLb7SQzgbo2BIwQRwehB6igC1pniS+8R6ex0u0it7mK4ktbxrh9y20sZAYADBfrkfdGOpHStOx0K3tbj7ZcSSXt/gj7TcYLKD1CAcIPZQPfNZ/gvQrnRbDUJb3at3qV/NfyxqciIyEYTPcgAAn1zXS0AYs+gm3me60a4+w3DEs8e3dBKT3dPX/aXB9c0sGvCK4S01eD7BcuwSNmbdDMx7I/r/snB9jWzUc9vDdQtDcRJLE4wyOoYEe4NAElFIqqihVACqMADsKWgAoorC8Qanc2k9tZ288dsJo5Zpbl03mOOPaW2r3Y7uCeBjoelAF/UdWs9LVPtMv72TIihRS8kpHUKo5P9KybqfXLi2a9dpNMt4wGWCGEXE7c/xjkY9VXJ44btWnpuj2enlpow81zLzJczNvkfPqew9hgDsBWjQBzNh4rjFusmpGEQcr/aFuS1uSDgh+8TeobgdMk10oYMoZSCDyCKyb/QLe6nN3bO9nekEGaEDEnGMSKeHH1GR2IrnjBq/h22vbm3iSFbaE3Dxod1pcBR8wRCd0DnHQZXv8xoA7WWWOCJ5ZpFjjQFmdzgKB1JPasQ6ve6sdmiQAQHH/EwuVIjIP8AzzXgv9eF56npTodCe7kjutbuBeyqSUgC7beP0wn8RH95sn0xW4AAMAYFAHNWkOp+F7RLYRtqenRjAaJQLiPnnK9HHOeMH2asrx1e2ev+FI7SyntJzcXsC7JZ0jyY5UZkIcg7sDG3Gcnmu6rl/GehadqWg3MVxax/6XLbwzOg2uymZB1HPGePSgDG1XSrLS/HXhfULXTrHT4IvPWY74YWcum1QBkFiD1x+Ga6q716KO5aysIXv75SFeGE/LFkZzI/ROOcdT2BriLa+vrDXtF8I66Xnube88yyvSOLu3EMo5P/AD0XIDfUHvXo9pZ21jAsFpBHDEvRI1AFAHMQaNr9i9rem4tbtoZZpWslXywPMLEhJD1I3fxDBx/DW7p2tWmpO0Cl4bxFDSWk67JUHTJHcZ/iGQexrRqjqWk2eqxBLqI715jlRikkZ9VccqfoaAL1UdR1az0wILiQ+bJkRQxqXklI6hVHJ/p3qgbPxEmbWPUrZoCwIu5IszovddowrH0bjHdTV3TtGtNNZ5Yw8tzIcyXMzb5H+rdh6AYA7AUAZF1Yazr0lrduYdMFpJ59rC6+a5fYy/vcEADDkbVPvu7VatNaSwMVhqtqumuNscTg5t5OwCPxg9trYPpmt2o5oIrmFoZ4klicYZHUEEe4NAElYV/4mghM0dii3ckGRPIZAkFvgc+ZIeBj0GT7VHLod3ZRvFpU6SWUgYSWF2zFAD/ccZZB7cjsAKdYeGIkEMmotHcyRD93BHGI7aHnPyR9Mj+8cn0IzigDKsxrOrXP2mGd3yu37XKjR26AjnyYc7nP+25x3GRxWhZjUfDFnBZywtqGmQIkUc0Cfvo0AwN6D74GOq8/7Peuk6UUAVbXUbK9svtltdRSW+CTIrDAx1z6Y7+lMsNZ0zVGdbDULW6aMAuIZlcqD0Jwa474gWsUFzoPlwJHbX2sQRagyjAlQbiqv6gtjr9Kk8eRmLW/CElkuLuTVBbuE4LWzRv5oOOwAB+oFAHRXOvJ9pey0yBtQvEbZIsZxHCcf8tH6L245bnpUPl+JLULctPaXpPMtoqeUF/65uSef97r6rWxbWtvZwLBbQxwxL91I1CgfgKmoAztO1q01J2hQvDdxqGltZl2Sxg9yvcZzyMg9ia0ao6lpFnqsQW5iO9OY5o2KSRn1Vxyp+lJp1vqNs0sV5dpdQggwyFNsmO4fHB+oA+ncgF+iiigAooooAKKK5vUL24vdcm0v7YbG0iWJXeIfvZmk3YUN/APlPIGeeCMUAaF/rlvZzm0hSS8v8Ai1twCwB6Fj0Qe7EdOM1kald63YRrf3l/DajJxCluZLaMdf3smNw/3xtUdwe/Q2Gm2emW4gs4FiTqSOSx9WJ5Y+55q0QCMGgDFsfEcE8kVvep9juZsCHcwaKfIyDFIOG47cH2rarnr/wALxFZW00xQeaQZLSaPzLaXHrH/AAk/3lxzyc4rMibXdJhhgt/3KSz/AGVYb5jOI2IJDxyAhnTr8r89srigDq72/tNNtzcXk6QxZCgsepPQAdyewHJrDvYtR8U2U1mIm07TJ1aN5Jl/fyqePlTog92yf9kVoWWhQW9z9tu5Hvb8gf6RPg7PZF6IPp17k1q0AYI1S/0g7NZgEtsM4v7ZCVA/6aJyU+oyvGTisHxFFZ6/438LlEsdQtIEnlkjaeJt6yIArKhbLAYzkD6ZrvOtcR4s8K22p3emwaeRp95G811bXEChfLmAXDEDqD0I7igCLQLK30f4la4Irezs4Ly2gEMEcsSt+7D7mManIB3cHHbnFbGo6m2vWV1p2iRC5WeJ4nvWOII8gqcN/GRzwvHGCRWJ4e1RfE+vTWGtWKxalZ2fkX9q4ypYSKQw9UbqPbiu9SNIkVI1VUUYCqMACgDmkg1nRb+a/nxq0MsMccggjEcse0scqucOPnPGc4H8RrdsNSs9TgMtnOsqqxRwOGRh1VgeVPseatVmX+h217cLdxtJaXyfdubc7XPs3Zx7MCPxoA06y7/XLe0nNpBHJeX+AfstuAWUHoWPRB7sR04zVX7Dr92BbXuowQ26gq8tkhWWf88+X74yfQrWpYabaaZbiCzgWJOpxyWPqxPJPueaAMGXSdbnvP7Wlewa52CP7CykxeWG3AeZ135AO7bj/Z71p2Gu291cCzuI5LK/wT9luMBmA6lCOHHupPXnFatVb7TrTUrcwXkCSp1Geqn1B6g+45FAFh3SKNpJGCooyzMcAD1Nc1f+K1eAPppiW3YhV1C4B8piegiUfNM3oF4Pr2p13oeqmH7FHc2t9Z8GM6ihd4SO5xxL7BsHPJJrQsNBtrOc3czvd3pGDcT4JUY6IOiD2UD3zQBgQaPqusW8iyz3NtBM6yPPd4aeQowZNsY+SJcgcYJI6gHmtYazd6TiPXYFWIA/8TCAEw4H98cmP8cr/tdq3qQgMCCAQexoArz6hZWtn9suLuCK2wD5zyAJz05PHNFpqNlf2xubO7guIASDJFIGUEdeR6VxUtrFb/FvTbHyEi09NNluLaIDCeeXUOwHTcFx9Mn1NLNaxTfGCazWFJbK40ZZr6FhlDIs2I2I6bsbh9B7UAdA2uT6mTHoEKzoRzfS5Fuv+7jmQ/7vH+0KGl1vSSXnA1W16s0KBJ4/XC9HH0weP4jW4qqihVACjgAdqWgCrYalZ6nAZrOdZUVijY4KMOqsDyCPQ81arMv9Dtry4W7ieS0vk+7c252sR6MOjj2YEfjVnT1vUtVTUJIZZ1ODJCpVXHY7STg+2TQBaooooAKKKKAKep6hFpdg93NDczIuAUtoWlc5OOFUEmueTx1pcYITSNeUHsNGnH/stdbRQByR8c6U2N2j68cDAzo0/A/75pp8baQTk6LrpPr/AGLP/wDEV19FAHIt440pwA2ja8QOmdGn4/8AHKhvPF2h39tJb3Oia88ciFGH9j3AJU9shciu0ooA8nvfG9j4G8N3VxpOl6zMv2s3EiahZXEakO3IEjDC44xnOfqc1taf46svG3gjVri0sb+1IsZSwuICEPyn7r/db+ftXZ6hpdjq0KQ6haRXMSOJBHKu5dw6Eg8GqviNVTwrqqqAALOUADt8hoAg0P8A5DHiH/r8j/8ASeKtysfR4JYtU1ySSNlSW6Ro2I4YCCMZH4gj8K2KACiiq93f2tgiPdXEcIdwibjyzHoAO59hQBS0n/kI63/1+r/6IirVrK0n/kI63/1+r/6IirVoAKKKKACijNFABRRRQAVV1G+j02wlu5Yp5UjAJS3iaVzk44VQSevarVFAHAW2t+GrNL1LfQvEcYvWL3G3Tbv94x6seOp9aRNZ8LR6TFpS+Hdd+xRMGiiOk3J8sjkFTtypHbHSvQKKAOHsfFGg6a8sltoniASzY8yV9KuXd8dMsyknH1q9/wAJ9p3/AECvEH/gnuP/AImuqooA5X/hPtO/6BXiD/wT3H/xNH/Cfad/0CvEH/gnuP8A4muqooA5X/hPtO/6BXiD/wAE9x/8TR/wn2nf9ArxB/4J7j/4muqooA5X/hPtO/6BXiD/AME9x/8AE0f8J9p3/QK8Qf8AgnuP/ia6qigDlf8AhPtO/wCgV4g/8E9x/wDE0f8ACfad/wBArxB/4J7j/wCJrqqKAOV/4T7Tv+gV4g/8E9x/8TR/wn2nf9ArxB/4J7j/AOJrqqKAOV/4T7Tv+gV4g/8ABPcf/E0f8J9p3/QK8Qf+Ce4/+JrqqKAOV/4T7Tv+gV4g/wDBPcf/ABNH/Cfad/0CvEH/AIJ7j/4muqooA5X/AIT7Tv8AoFeIP/BPcf8AxNH/AAn2nf8AQK8Qf+Ce4/8Aia6qigDlf+E+07/oFeIP/BPcf/E0f8J9p3/QK8Qf+Ce4/wDia6qigDyiX4129j4wk0W80XUWgcK0Ekdq6TYI6NCwB9eR19K6TxPcLdPaXCLIqyaVfMFkQowysfVTyD7Gumt9J0+1vri+gs4Uu7kgzThBvfHTLdSB6Vg+K4nm1K2iiQvI+nXyqoHJJWPAFAHURf6lP90U+mRAiJAeuBT6ACsnxR/yKer/APXlN/6Aa1qwfEt/aSaDrdkk6Pcx2EryRqclAUOM+me2etAG6v3R9KWkX7o+lLQAVVv9PttSgEF0rtGHVwFkZPmU5ByCOhAP4VaooAqz6daXU1rNPAskto++B25ZG2lSQfoSKtUZooAKKKKACiiigAooooAKKKKACiiigCve2NrqVnJaXkCT28ow8bjIIqraaFYWd2t0kcklwqeWks8rysi+ilicA98dcVpUUAFFFFABRRRQAVS1XU4tIsjdTQXUyBguy1gaZ+f9lQTirtFAHK/8J9p3/QK8Qf8AgnuP/iaT/hPtO/6BXiD/AME9x/8AE11dFAHlGmfGu3l8U3WhX2iahvjlKxS21s7OV7b4iN6nBHrXSXDB/FdywBAaawPIwf8Alp2rprHSdP0153srOGB53MkzogDSMepY9SfrXPTxSS+Lr3y0LbJbFmwOgHmZNAHXUUUUAFY+vf6zSv8Ar/T/ANBatiuf1O/tL9tOa0nSZY9SWNmQ5AYK2RnocUAdBRRRQAVUn062uL2C8kVzPBkRkSMAM9eAcH8at0UAVhYWi6i2oLAgu3iETSgfMyA5APrg5/OrNHWigAooooAKKKKACiiigAooooAKKKKAKWoaVZaoIvtcO9oX3xSKxV426ZVhgj8KLDSrPTWme2iIkmbdLK7F3kPQbmYknA6c8VdooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACmyRpNE8UqK8bgqysMgg9jTqKAMH+y7/SCG0aYS22SWsblyVHtG/JT6HK9gBVzT9btb+U2zLJa3yrue0nG2RR6jsw91JHvWlVPUNLs9UhEV3CH2ncjglXQ+qsOVPuDQBjav4klhEkdoi2yBvL+2XaNtL5xtjjHzSt9MD3PSqdjol/f3RvJGntQ+4NdXJD3brjGEH3YFPooye+DW9Y6FZ2NwbomW5uyNv2i5fe4X0BP3R7DGe/NadAGD/wi8FoBLo88thdhcGQMZFlPrKrH5z7k7vcUja9e2CPFqOk3D3CrlGs8PHPgZO0sRsPB4bHsWrfqC+dI7Gd3YKojbJPQcUAYdl410zU/CDeJNPSe6tUQvJDHsEsePvKwLAAj0z9M1PJq9/esbfStPdJsEST3g2xQt6cH94R6KccH5hXndzot9pPgu11zw9CZo73S4oNVsV43nygvnKOzqeCO4z3FevjoKAMI+FrW5DS6jcXN3eMB/pJkKGI/wDTILjy/wAOT3Jo8/WNGY/aVbVLLcAJYkAuIh/tKOHHuuD/ALJ61vUUAVrHULTUrYXFnOk0ROMqehHUEdQR6HmrNYWs2EFtNBqlspgvPtEETyRHb5iNKqlXHRhgnGenbFbtABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABVHUtJtdViVbhWDxnMU0blJIz6qw5H9e9XqKAMH7Vq+jsRextqVlu4uIExNGv8AtoOH+qc9Pl71oJq9jLpp1CCb7Rb9jApkJOcY2qCc57Y4q9WTd+HrK6uWuY2ntJ3G2WS1lMRkX0bHX69R2IoAwb7WdR1OZrSOOeAlebG0cG5IJ4MsmdsIxk4BLehyMVesfCiPDs1IRfZ9xYWFuCIeR/y0J5mb1LcH+7nmt2x0+0022W3s4EhiH8KDGT6n1Pueas0AYP8AZmoaOQ2jzefagktY3Lk49o5OSv0OR2G2qd/4807STZnU7O+s4ridbZppo1CQSkEhXO7OMA/MoK+9dVXMeL7eyvp9Dsb5I5bea9ZZI5OQVNvMpz7ZYD6kUAX7/wARQadqtvYS2l2/nwSXAniVWQKhUNxu3E5deApzmoc6xrR+UPpNicgk4NzKOxHURj82/wB01y/h7TtY0Xx7Z6Neb7nTLPT7n7BescsY2eDETn+8u3Ge4xXo1AGCfDENool0e4lsbtVx5m4yLKfW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'che_243_2.jpg']
che_244	OPEN	"Compound E is a photoinitiator widely used in photo-cured products. Compound A can be used as raw material and synthesized according to the following route:<image_1>
Regarding this synthetic route, the correct statement is ().
A. Compound A is soluble in water because it can form hydrogen bonds with water
B. During the conversion of Compound C to Compound D, chiral carbon atoms are formed
C. The hybridization methods of C and O atoms in Compound D and Compound E are identical
D. During the reaction, carbon-halogen bonds and C-O bonds are broken and formed"		AD	che	有机化学基础	['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che_245	OPEN	"The conversion and comprehensive utilization of carbon dioxide are important ways to achieve the strategies of ""carbon peak"" and ""carbon neutrality"". Chinese scholars have achieved the synthesis of atopic acid, an important pharmaceutical intermediate, taking electrocatalytic reaction as the key step and using CO_2 as raw material. The synthetic route is as follows: <image_1>Among the statements about reaction ④ and ④, the incorrect ones are ().
a. All carbon atoms in the atopic acid molecule adopt sp^2 hybridization, and all atoms in the molecule must be coplanar
b. Compounds D, E and atopic acid all contain chiral carbon atoms
c. Compound E can form intramolecular and intermolecular hydrogen bonds
d. In reaction ④, electrolysis is carried out using Mg as anode and Pt as cathode, and the reaction between CO_2 and D takes place on the cathode."		ab	che	有机化学基础	['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che_246	OPEN	Compound L is a synthetic intermediate for drugs used to treat congestive heart failure. One of its synthetic routes is shown in the figure: <image_1>There are () aromatic isomers with the same functional group as J.		16	che	有机化学基础	['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che_247	OPEN	"The two synthetic routes for the antitumor drug Xiangye Munin J are as follows: It is <image_1>known that <image_2><image_3><image_4>there are () isomers that meet the following condition D (regardless of stereoisomerism).
① contains only one ring structure <image_5>② The ring contains three substituents, one of which is-NH_2"		24	che	有机化学基础	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAFNA1EDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKyrjxJpFs86y3qYtztndQWSE+jsBhfxIo8T3NxZ+FdWubUkXEVpK8ZHUMFJBrO8A21ungHSAiqyzWqySE872YZYn1JJNAHSRyJLGskbq6MAVZTkEeop1cL8LZJf7F1W1LFra01W4gtSe0QIIA9gSa7qgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAMTxD4hGjPZWkEH2nUdQlMVrAW2gkDLMxwcKByeDVTUvEF94cns31mO2fT7qVYGuLcMpgkb7u5STlSeN2Rj0rM8aQSWXizwx4ikVjYWEk0V04GREsi4Dn0APU9qj+Ibw+I9HtdA0uaO5vby5hcLCwby4lYM0hx0UAde+eKQzvaKQDCgegpaYgooqtqGoWulafPfX0yw20C75JG6AUAWaK5ybxW9ppqareaRdwaacM8zFS8SH+N0ByB06ZI7iugiljnhSaJ1eORQyspyGB5BFAD6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAMrUtXubC4WKHRNQvlK7vMtvK2j2+Z1Ofwqn/AMJLff8AQqa1/wCS/wD8droaKAOafxeLWSD+0tE1PT7eWVYftNwIjGjNwu7a5IBPGcY5rparajp9tqunXFjeRiS3nQo6nuD/AFrC8K39zE1x4e1SRn1HT8BZX63MB+5L9ex9wfWgDpqKMiigCtqFzBZabc3Vzj7PDE0kmRn5QMn9K4bwzAz28ej2F9eaYJ7NL57WNEkW0WQn5I3YZUnk4IOOcVs+NnN3bWGhRsA+qXSxyDP/ACwT55T9Nq7f+BUngpTeJqWvMB/xMbk+QR/zwj+SP8CAW/4FQM3tK0qz0XTorGxiEUEecDOSSTkknuSeSauUUUCCsHxb4j/4RvSY544RPeXM6WtrCTgPK5wMn06n8K3q5H4h6Pc6notpeWQDXWlXkd+kbMFEgTOVyeBwT+VAIXWp9f8AD2jTa0b9dQ+zL5tzaGFUQxj7/lkcggZI3FuldJp99BqenW19bNuguIlljOMZVhkVzPiPVX1rwrdadpVncy32oQm3EckDoIQ4wzOSMAAEn3xxmug0PTF0bQrHTVcuLWBItxGN20AZoGX6KKKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFISAMk4A7mudvPGmmRXX2PT1n1a96eRYJ5m0/wC0/wBxfxIoA6Oiuf0fxQt7fNpmp2b6XqoG4W0zhhIv96Nxw/vjkeldBQAUUUUAc746u5rPwZqT27uk7xiGNkOGDOwQYPY/NUPg7c0+uN8ohjvzBCAoGAiIG6dfm3UeNZA8OjWR5F1qkAYf7KEyn/0XS+AN0nhKG7cYa7nnuT775Wb+RFA+h09FFFAgrh/ixbzz+CWkijaSK3uoZ7hFGd0St83HfHB/Cu4rE8WapLpXh+aS2CNeTstvbI4yGlc7VyO45yfYGgEM8S31l/wg+p3ckiPaSWMhBByHDIcAfXI/OovANnd6f4E0a1vgwuEtl3K3VQeQD9AQPwqn4c07R9Rkunj02MQWF4YYCWYxtIgG91jPyphywGPSuvoGFFFFAgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACufi8Ry6lqN7aaLZx3Qsn8q4nmm8uMSd0UhWJI4zxgetaF/rWn6fdW1pc3Krc3ThIYVBZ2J74HOPU9BXJfC5G07TdW0a7GzULPUJTMG6uGOVf3BHf2oGdNofiCDWjdQ+U9vfWcnlXVrIRujbqOR1UjkHvWvXmum6lZ2fxI8Ra7POIdLmMFgtwQfLeZV5yw4AGNuTxk4r0lWV1DKwZSMgg8GgGLRRWXrPiHTdBiVr2f8AevxFBGpeWU+ioOTQI1KK5BrjxhqX+mwfYdHgU5t7S7HmSXGeglIOI/ouSD16Yq3p/i6I3iabrds+k6m33UmOYpv+ucnRvpwfagLHSUUUUAFcZ4/vn06LTDZKkOo6hdpp6XgQGSGNzltp7H5a7OsHxZ4dPiPS4oYphBeWs6XVrKRkLInTI9DyDQCMjxZpMeg+FLnVtHeW3v8ATo/OSXzWYygfeEmT84Iz1781v2niCxk0Gy1S8ure0juLdJj50gULuUHv9aydZstd8S6KdGuLSGwjuVCXlws+/CdxGMck9MtjGe9X7Xwb4dtJ1uI9ItWnUKBJJGHYYAAwTnHA7UhnAa94t0/VfEV81hcs85tV0zTHCNskkmYCR1bGPlBXv/Ca9S02xi03TLWxgGIreJY0HsBiotU0aw1jTmsb23V4DggDgow6MpHII7EVz9rq194WuotN8QzGewkYJaasw6nsk391uwbofY0AdfRSAggEHINLTEFcp47uFl0+00XftOpziOUg42wIN8p/75XH/Aq3dS1rTNHi8zUb+3tlxkebIAT9B1P4V5d4h1mXxF4jMcNpfxWN9FHpljeTQGKMeY4advnwclFAHHOKBo7nwOJZ9DfVJ94bUpmuUjY8RxHiNQOw2BfxJrpqZDElvBHDGoVI1CqB2A6U+gQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBla/r1t4fso5p0eWWaVYLe3j5eaRuirVO71jWtPgiuLrR4GieWONvs90XaIMwUswKDIGcnH/16xfiGr2mp+GNbkVjp+nX267YDIjVhgOfYH+ddfJqliII5BcRyrMQIxGd5kJ6YA6/4c0DMnSfEd1qXijV9FfT4ohpnleZMLgtv8xSy4G0enPP50aD4jutY1rV9PlsIoBpsqxPItwX3ll3DA2jjFYOhRNc/E/xoIr+W3IFlkRbDu/dHruU9Pb1p/gl0g8VeNBLdeZsvIi0khUHHlDk4AH6UgOm17xBBoUVsGie4u7uUQ21tHjdK5+vQDqT2FV7nWNY082rXmlQGKe4jgL29yX8rewXLAoOOe3/165/xnKlp4q8J+IpHD6TbSyxTTqdyR+Yu1XJHbPeu0k1GzXyR5ySGZgsaodxY+oA7DrnsKYGPoniS71bW9Y019PhgOmOsbyC4Lb2ZdwwNg4xTvDXiO51+61WKWwjtl0+6e0ZlnLl3XByBtHGDXP8AhiFrnx140MOoTW+LqDIh8s5/dd9ympPh7NFby+LjNdKwj1qYtLIyjjavJxgCkB0ut+IItInsrKOFrnUL5yltbIcFsDLMT2UDkn+dVZvEdzpWo2NrrdnDbx30vkwXFvMZEEhGQjZVSCex5H0rE8REWfxG8Na9KwOltDLaNcA5SN3GUJPYN0z0pfiTF/bMOi6JZOHvZ9RilAQ5McaZLSH0A9fegDasPEd1e+LdR0JrCKMWMaSPOLgncHHy4XaOeOeaXRvEV1qniHVtLk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'che_247_2.jpg', 'che_247_3.jpg', 'che_247_4.jpg', 'che_247_5.jpg']
che_248	OPEN	"Tetrahydropalmatine has strong sedative and analgesic effects with few side effects. The synthetic route of its intermediate G is as shown in the figure<image_1>. It is known that <image_2>aromatic compounds N and C are isomers of each other. There are () structures of N that meet the following conditions;
① There are 3 methyl groups directly connected to the benzene ring
② Silver mirror reaction can occur, and 1mol N can produce up to 4mol Ag"		22	che	有机化学基础	['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'che_248_2.jpg']
che_249	OPEN	"Methylcartest can be used to treat ulcerative colitis. One route for synthesizing methylcartest is shown in the following figure: <image_1><image_2>There are () isomers of H that meet the following conditions (regardless of stereoisomerism).
① It can react with NaHCO_3 solution;
② There are 3 substituents on the benzene ring, and 2-NH_2 are meta to each other."		15	che	有机化学基础	['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ofegDz3TLu98FfD2/1LWdOMt7fs95JJE4bfNN91GBwykEqnGRxmu18Laff6f4csoNVvpr298pTO8pBw5GSAcZwOnPpVfXvDcms3ujSG7xZ6fcrcPauuRMyghSWzn5Sd3OckfjXRUAM8qM9Y0/75FZniPQIPEmg3Gj3E80FvcAK7QbQ2AQcDII7ela1FAGFd+F7e51HTtSS8ubfULJDELiHYDLGeqOCpBXIB6DB6YrdoooAKKKKACuT+JFjdap4IvdPsrSW6uJ3i2xRrnIWVWOew4BrrKKAOI0fSrjwp4lnFhYSS6Fqg84+Wnz2cwxkEHkow5H90g8Yrt6KKACiiigAooooAKKKKACiiigD//Z']	['che_249_1.jpg', 'che_249_2.jpg']
che_250	OPEN	"Flufentranone is a semibazone insecticide that can effectively control a variety of pests. The following figure shows one of its synthetic routes: <image_1><image_2>Compound D is known to contain multiple isomers, among which there are () isomers of aromatic compounds that meet the following conditions.
① It can cause FeCl_3 solution to develop color
② A brick red precipitate occurred when it reacted with freshly prepared Cu(OH)_2 solution
③ There are at most 3 substituents on the benzene ring
④ has 1-CF_3 group"		23	che	有机化学基础	['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'che_250_2.jpg']
che_251	OPEN	Resveratrol (Compound I) has antitumor, antioxidant and anti-inflammatory effects. The following <image_1>is the route used by a research group to synthesize Compound I. The name of substance C is ().		5-\text{Methyl}-1,3-\text{Hydroquinone}	che	有机化学基础	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAE1A1EDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooARmCqWYgADJJ7VkDxVohiE325fIZgqzlG8piTgBXxtPPHBrE+Ksl1H8ONVa0MgO1BKY+oiLjf07bc59s10Sw6bLoEcREB04wLtxgIExxj2xQAQa7pt1qF1YQ3G+7tQDPEEbMYPIzx3xx607TNZ0/WUmfT7kTrDIYpCqkBXHVTkdR6Vx2k/b/8AhaPjD7CLY/ubHd55b+4+MY/Gp/hdv/sXWfN2+Z/bd5u29M+ZzigDuaKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiio7iRoraWRVLMqFgo7kDpQAyW8tYJY4prmGOSQ4RHcAt9AetO+1W4IHnxZPQbxzXD/DW1tta8EQaxqMUN5fao0kt1LKgck72GznoqgAAdsVn69psOieNvBFtY2JuxCt2sceVDbQnAy2Bx7+lAHpInhMnliWMyf3Qwz+VSVwGi7p/i/qk8+m/Y5v7IgO1ijMcyyZbKk9en4V39ABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFADZI0ljaORVdGBDKwyCPQ1yVvpmjaR4rstFtdPkWKW2lu0U3MhhiKMgwsRJUffyMDjHFdfXK3n/ACVHSf8AsFXX/oyGgDWt/DumWmp3epQQSJeXgCzy+fJmQAYGRuxxnj07Vkal4c0TS9AvLW2EVr9rd5FWe6kCSTkE55bOT1454z2rq6KAKOiySy6Hp8k8UkUzW0ZeOVtzqxUZDHuRV6iigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA5GbQbPw3KZrHVNR0+0vbtQ1pbiNo/NkbGRvUlQSecHHtV+48JWk+saXqQu7uKTTQ4gRGTb84wxbKkknuc03xf/wAeemf9hS0/9GrXQ0AYf/CNRp4jutdTUL0XU9sLYrmPYqAkrgbM5BYnJP1zTfCt3dXFnexXslw89teSwnzwu5V4ZRleG+Vl598dq2bi3hu7aS3uIklhlUo8bjKsp6gjuKLa1t7OBYLaFIYl6Ii4A7mgCWiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKxNX8T2emXK2MSS32puMpZWo3SfVuyL7sQKANskAZJwK8/vfE2kDx/aan9rDadaWc9ncXqoxgimd4yqNIBtB+U9+OM4yK1RoGqeIf3niW5EVocEaVZuRH/ANtZODJ9Bhfr1rW1LSZZNHFjpM8WnGPHlqLdXiIH8DIf4T7YPvQBpo6SorxsrowyGU5BFOry+N7/AML3gjQR6JLJJxBKxk0u6P8AsP1t2PpgD2auw0vxXb3d0mn6jA+mamwytvOQVl94nHyuPpz6gUAdBRRRQAUUUUAFFNkcRxs5DEKM4UZP5Vz9n420XULeG4tmu3t5ZRCs32OUJvLbMFtuB83HNAHRUUVjat4o0vRXIvpZEAeOMskTON7khV+UHk4/UetAGzRWVe+ItP06/sbG5aZLi/JFughY7yBkjIGAQOeavw3UM8k0cbhmibY49DgN/JhQBNWFrWv3Wm6naafY6RNqNxcRSTbY5kj2KhQHJYju4rdrnrr/AJKDpf8A2Dbv/wBGQUAQ/wDCQeI/+hMuv/A6D/4qj/hIPEf/AEJl1/4HQf8AxVdPRQBzH/CQeI/+hMuv/A6D/wCKo/4SDxH/ANCZdf8AgdB/8VXT0UAcx/wkHiP/AKEy6/8AA6D/AOKo/wCEg8R/9CZdf+B0H/xVc7Za4Tr3i611XxRJYw6fOi2xeSNfLUxhicFfm5PfNdF8P9Y1LXvBllqGqoBcyb8SBNnmoGIV9vbIwcUAH/CQeI/+hMuv/A6D/wCKo/4SDxH/ANCZdf8AgdB/8VXT0UAcx/wkHiP/AKEy6/8AA6D/AOKqfSPEV3fa1JpV/os+nTrb/aFMk0cgZd23+EnHNdBXNn/kpQ/7BB/9HCgDpKK5zw/qWpapP4itbuWFZLK/NtA8MeNq+VG4JBJycuaxNX8Vaz/wjlxeaSIJNV07UEsbqyKfJO5kVcKScruDqwPOM4oA76iuRi8UHXtH0jUdHuvs6z3a291FJEC8Z53IQfusCP8APFaq+JtJn1AabFen7TJI8MbCJtjSIMsobG0sO4z2PoaANmiuG0Dxdff8JFd+H9fKJNJLKNMvETYtyiMVZSMkB1IzjuKJvFOpWdvpdgJYbjVtWv57WB3j2pFHGzAuVB+bCqOMjJPagDuaK5HUNa1DwvrWjwaldLe2GqXAsxKYhG8MxBK/d4KtgjpkeprqLu5jsrKe6lJEcMbSNj0AyaAJqK4a013Wo/G9hpGo3cMUM2l/bpozGoKyb9pQN6DP14qu3ja40vU/GM2oXSXGnaJHA8KRRgNIZEJwW7nOAOnXmgD0GiuYjTxVNogvxfWq6hJF5gsvs4MSkjOzdncT23ZxntUmjanf3HjHxDp1zMkltaLbNbqsYUoHVyQT36CgDo6KKKACiiigAoqG6u7extnuLqeOCBBl5JGCqo9ya5r+3NX8R/J4ct/stkw51W8jIB/65RHBb6tgfWgA8dalY6fZaWby7gt92p2xHmyBcgSAk89gOTXVKyuoZSCpGQQetc/beE7Syt7qaPbe6rPGVa91EecWJHQjjCZ/hXArkIJr/wAMXi28QXRpXc7bK5kMmnXJ/wCmMvWFj/dIA/2TQB6hRWBpXiu1vboaffQyabqm3P2W5wN/vG4+WQe4P1ArfoAKKKpavqKaRo19qUo3R2kDzMB3CqT/AEoAu0V51e61qkWm+FrMXLxaj4jnVrmdTnyU2b3WPPC4GFH4nrzXSt4Z8m5tJbPUtRjjjkY3EUl7LIJlKMvVmJBBYHIx0+mADoKK8o0HXYx4C1oXl/rUl8JbxUmH2qQpsdwmJACBgAdD9a7bwI8s3gbRbieeeeee0jllkmlaRmZlBJyxP5UAdDRXC+HJZfGs+s319dXkVtbX8lla21tcvCEWPALkoQWYkk88DjFVLDV9Ums/FGntdySaj4cnL21yes0ZTeiyDo3GVP4HrzQB6LRVDRtUi1vQ7HVLcERXcCTIG6gMAcH86860XVt2sx6Vr9/qel+JxdhsTXL/AGa8jEmcRjOzBXgAAH680AeqUVwvh+4l8a6nr9xeXN3FZWGoSafbW9vcPDgxgbnYoQWJJ4z0xVvwbq95Pq/iLQbyZrg6RdIkM78u8ToGUMe5HIz3470AdfUVzOLa1lnYEiNC5A74Galqpqv/ACCL3/rg/wD6CaAOcs/Feu39lBeW/g+7aCeNZY2N7AMqwyDjd6Gp/wDhIPEf/QmXX/gdB/8AFVf8Jf8AInaJ/wBeEH/oArYoA5j/AISDxH/0Jl1/4HQf/FUf8JB4j/6Ey6/8DoP/AIqunrl9d8T32l+J9K0S002C5k1JZWikkujGF8sAtuwjdjxjNAC/8JB4j/6Ey6/8DoP/AIqj/hIPEf8A0Jl1/wCB0H/xVLZ+LSviOPw/rNg2n6hOjSWrCUSQ3AX7wR8A5HXBAOK6agDmP+Eg8R/9CZdf+B0H/wAVR/wkHiP/AKEy6/8AA6D/AOKrp6KAOZtfFGoHW7LTdS8PXFgbzf5Ur3EUgyq7iMKSeldNXM67/wAjp4W/37n/ANFGumoAKKydQ8R6bpWq2OnX0rQS3zFLd3Q+W7gZ27ugPoD1qzPqcUGoRWJimeaWNpU2JkFVwDz/AMCX86ALtFcxF490OTTf7SZ7mOwEpha6e3cRowbadxxwM8ZPFad5r1paXq2apPcXBh88x28RcrHnAY/Ug4HU4OBxQBqUVV03ULfVdPhvrVmaCUZQspU9ccg8j8atHoaAOdbx74SRmVvEmlhlOCDcrwfzpP8AhP8Awh/0Mul/+BK/41V+HltA/gXTWaGNmIfJKg/xtXT/AGS2/wCfeL/vgUAYX/Cf+EP+hl0v/wACV/xo/wCE/wDCH/Qy6X/4Er/jW79ktv8An3i/74FH2S2/594v++BQBhf8J/4Q/wChl0v/AMCV/wAaP+E/8If9DLpf/gSv+NXNb1DSfD2ly6lqMSx2kWPMkWHdtyQBkAZ6kU1NS01ry2tnsZopLlikRktCqsQpbGcYHCk8+lAFX/hP/CH/AEMul/8AgSv+NH/Cf+EP+hl0v/wJX/Gt37Jbf8+8X/fAo+yW3/PvF/3wKAML/hP/AAh/0Mul/wDgSv8AjR/wn/hD/oZdL/8AAlf8a3fslt/z7xf98Co7i0tvs0v+jxfcP8A9KAJLW6t761iurWZJreVQ8ckbZVlPQg9xU1c18Pf+Se6B/wBeMX/oIrpaACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK4A6hcad4pvhbFV+2eIoLaYlQS0ZskbH5gV39ebX/wDyNTf9jTb/APpCtAHpNFFFAEc8EN1A8FxEksMgKvHIoZWB7EHrXKeIdJsdJ0DS7SygEUEWr2RjTcWCZuE4XOcDnoOBXX1zvjL/AJBmn/8AYWsf/ShKAOiooooAKKK5uZPG3nyeRP4fEO47A8MxbbnjOG64oA6M9DXm3w0ttUl8LaZJHdwDT0v7tpoPJO9l3ygfNkg/MVOMDp1456B4fHMiFGn8OFSMEeTP/wDFVW0/SPFulW/2fT08L20OS3lxW8yrk9TjdQBkaHrOraybTWG1e1tRHqEsN3avMzZTeyiIx4wrAAENnsSeOkXi1fO8EWmox5SXUtZtboNIpztaVRHkeyBBj2rS/wCEV1/+05dS+w+Eft0ylZJxaS72BGDk7u44qzfaN4s1OGOG9j8L3EUbBkSS3mIUjoQN3UUAVPEaXqePvBP2u4t5VN1cbRFCUx+4f1Y5rsbPR7CwuZ7i2tYY5Jm3MyxqCPlAwMDp8oP1rl7jRPFd1cW9xcR+F5Zrb/UyPbzlo/8AdO7ir2zx3/z8eHP+/M//AMVQB1Fc9df8lB0v/sG3f/oyCuQ8dQfEmTSbcaZLYtfC4UxHTUkRx1zuLts2467var/huPxTH4s0oeK5rCW8/s252m0UjjfBnd2J+gAoA9BoorKvfEFpaX/9nxxz3d8EEjW9sm5kQnAZjwqg4OMkZwcZoA1aO1UNM1e21UXAtxKr28nlTJLGyMjbQ2MH2Yc9Krr4jsm8StoAS4+3rD9oI8s7fLzgNu6YyMetAHMaPp+q6f4g8VXd14dnuLfU7hHgUSwHcqxhSGBfjJH5Vo/Dvw7f+GvDstrfmNHmu5biO1iculqjHIjUnqB/WtbS/Ednq+o31jbJcCexcR3HmR7QjEZAz34OeK1icAnGaAForI0nxLpus3l9ZW0jre2LBbi2lQpImRkHB6gjoRxVnTdUi1RJmhinQQytE3mpt+ZTggeuD3oAvVzZ/wCSlD/sEH/0cK6SuTvb2DT/AB+91csyxR6RliqM5/1wHRQSaALHhmyvrPVPEU13ZvBFeX/2iBmdDuTyo0/hJwcoetc3YaZf3H9uaha2j3EV/r8FzDsdADDC8YZ/mI6+W2PXjsa6WTxn4fljaN5rlkYYYGxn5H/fFCeNPD8Uaxxy3CoowqrYTgAeg+SgDL1Dwdcw+M7LXNHcRW1xcI+qWhICsVB2yqP7/Y+oNZaaL4jbXNNvJ9HO601eedzFcRpEYnR1VkQHr8wLEjdknr26r/hN9B/573X/AIAz/wDxFH/Cb6D/AM97r/wBn/8AiKAKNz4Y/wCEh8P3dhqFvNZTi9lubS4DKXicyMySKVY8jPQ+4rKXwlrn9leGtRnMU2uaNdzTSorALcLIzB9p6AkEEZx6HFdH/wAJvoP/AD3uv/AGf/4ij/hN9B/573X/AIAz/wDxFAFDWdJvvFOr6IbmxlstP0y7F+/nOjPLKgIRVCM3AJJJOOgxVu4vLnXpW0n7Dc2WyWGW4MpQ7oCWbjDH7xjKEdQGp58b6Fg4uLkHtmxn/wDiKyNF8S2VjNdS6hqpunnYNuh0i4iPfrndkAYAAxjnrmgCa90K4vfidb6pcaStxpkemm18yTy2AkMm7O0nOMd8VjzeBrnVLvxtZPY/2fYaxHbi0lTy9qtGp5Kqcj5sHpyK6r/hN9B/573X/gDP/wDEUf8ACb6D/wA97r/wBn/+IoATSr/X/wCzYba80Nor5EEbzCeNrckcbhht+O+Nue3vTNIsL638b+IL6e0dLS7jtlhlLqQxjVg3AOR94dRUn/Cb6D/z3uv/AABn/wDiKx/EvxP0rQdJOowQ3F4kTqJYzBLEQhOMgsm3IJHBI+tAHc0VzvhDxrpHjbTjeaUbjahxIk0LKUPpn7p/AmuioAKKKKAOG8YNCniOC5urZLuLT9IvL+K3m5jMsbRbWI6ZAJAPbNdtC/mQo+MblBwK4Xxx/wAhS8/7FrUP5xV3Fr/x6Q/7g/lQBLUVzawXttJb3UMc0EilXjkUMrD0INS0UAclfeD9NtPD+p2582ew8gyW9pO29LV1UkGIn5l7cZ4xxitbwrNLceENGmmkeSWSyhZ3c5ZiUGST3NWdZ/5AWof9e0n/AKCap+D/APkStD/68IP/AEAUAbVUNb00axoOoaYzbRd28kG703KRn9av1gX2vata3ssFv4U1G7iQ4WeK4t1V/cBpAfzFAGQvh6XxB4X0SOWY2OuaK0bJKU3BJkXawI43Iwz0IyCDmt+2i12Xa19NZRmPJEdruIlOCBuLDIGTnAGeBz2Od/wkuuf9CTqv/gVa/wDx2j/hJdc/6EnVf/Aq1/8AjtAEGj+FtS0vwhqOiNdWskl09wyShWAXzmZjkd8bvxpsJ1Hwd4c0PT5JrOSOBreyZjG/7wEhN2eiYHPOQTxxVn/hJdc/6EnVf/Aq1/8AjtUbzUdYvrhJJvCGueUuMwC8tBG5DbgSPMznIHQ/XNAF+08PX+g6hqM+hy2rWuoTm5ktbncoilIAZ1ZckhsAlSOvQiq0miHQPDusLE5vdZ1dpGdwm3zZnG1QBztRRj6AEmrH/CS65/0JOq/+BVr/APHaP+El1z/oSdV/8CrX/wCO0AM0231HwzFoOh24t57GNFtDwRKVSIky5zgDcANuO455xVe+8J6prOmWOlavcWE8FtLFN9sWNhPlGB+UHIUnGC2ehPHNVZbjV5daGqN4U8RCUBR5S39qI8DtgSdM8n1rV/4SXXP+hJ1X/wACrX/47QAtv4dvdD1bUrzQ5bYwalKJ57W53KqTYwzqyg/ewMgjqOopltolz4dsdUv7a6tpNSvZmury5uI28vhcBVUHIUAADknqeelO/wCEl1z/AKEnVf8AwKtf/jtUNW1DWNXtkgl8I69CqSCTMF7aoSR0z+86d/wFAHWaZcT3elWlzdW5t7iWFHkhJz5bEAlfwNGq/wDIIvf+uD/+gmudttf1u2to4B4M1lwihd8l5asx9yfN5NcPpfxL8ValqGtaVN4WuL20haWIXcBRTFgHh23GNiO+1h06UAem+Ev+RO0T/rwg/wDQBWxWN4TOPBuiE/8APhB/6AKrxeLrW6R7ixsL+809CQ19bxho+Dg7Rne4BB5RWHpQB0Nef+K7q3t/it4LaaeKJVivcl3CgZjAHX1rt7a8S802K+gR3jmiEqLwGIIyBzxmuettf0jWdJvta/sWaWKzZ0kM0Ee8mMkPjLc7cH8uM0AYfiGSPxV8QvDFtpDrcJpM73d7dRHdHEMYEe4cFmPb05r0aszw/qNrq+i21/Y2r29pOgeFXRVJU8g4BOM1fnnitbeSeeRY4YlLu7nAVQMkk9hQBJRXNnxrYx2yX89pfQ6TJt2ajJGBCQ3CkjO9VOR8xUDnrXSA5GRQBzOu/wDI6eFv9+5/9FGumrmdd/5HTwt/v3P/AKKNWbrxTb2l1JbtpusSNGxUvFp8rqfoQMEUAUfGGh2PiO703S79MxTLPhgcMjBRhlPZgeQayfC+paqvi+Hw/rqs+oabZT7bwD5buFniCSf73ykMPUe9as3iHSri6huptA1eS4hz5UraTKWTPXB28VJJ4o0+Z98miayzBCm46XLnacZH3ehwPyoA83SC9l+Ceruup28NmlzdPLA8eGmQTMTGHzwWxgYHfFdXd6bc63Pp+s+HdSfRfEEWlwO1ncDdFLCxYrHKvXghxuHIyatxz+FYWVo/B12pVt4I0N+G9fu9as3mr6FqEwmvPDOpzyhdgkk0iQsF54ztzjk8e9AGj4K1iXXfDEF7cWaWk5kkjlijOU3q5Vip7qSCQfeugPQ1zEHiqwtoEgg0TWYoo1CoiaVKFUDsAF4rkl+MQt/Gk/h260LUZyWBhe2tnEoVgD88TcjAPUdRzigDrPh1/wAiHpn+6/8A6Mauorlvhw27wDpbAEZVzyMfxtXU0AFFFFAHE/Fz/kl2t/7kf/oxK6KFNRjvYZLy5tHtBGRhIShEhKheSxzxuHbrT9c0LT/EemSadqkTzWkmN8ayvHuwcjJUg9QKii8N6fFdW9xuvZHt23Ria+mkUHBGdrMQeCeooA1qKKKACo7j/j2l/wBw/wAqkqO4/wCPaX/cP8qAOe+Hv/JPdA/68Yv/AEEV0tc18Pf+Se6B/wBeMX/oIrpaACiiigAooooAKKKKACiiigAooooAKKKKACikyM4yM+lLQAUUVi63rk9hLFY6dp819qU6loowCsSAfxSSYwo/MnsDQBf1LVLLR7GS81C5jt4E6u56nsB6k9gOTXBW2oWQ1i5v/EGn32m2VzqUd9YXVwu2PcsCxDzMH92TtYgPjgjvxXTab4ZY3qarrtwNR1NeY/lxDa56iJO3+8csfUdK6CSNJo2jkRXRhgqwyCKAFR1kQOjBlYZBByCKWuVfwze6Gxn8K3KwRjJbS7gk2znr8p6xH6ZH+zWbrHiX+0YI9Lng1zTtT8weZY2cWZLhcchJcbQmcZcEY77SaAN3VPFdrZXTafYQSanqgXP2S2wdnvI5+WMe7H6A1y2peIL/AFawS1jtBql5a6hBdXI0td0NvHHIrmPzGIDyYUjC857Cr+leDJ7izWDU1i07TeT/AGRYOdr57zS8NIfUDA9c12dra29lbR21rBHDBGNqRxqFVR6ACgCHS9UstZsI72wnWaCToRwQe4IPII7g8irlczqmg3dnfya14cMcV83NzaOcQ3oH97+64HRx9DkdNfR9Vj1ix+0JBPburGOWC4Ta8bjqD2P1GQexoAv0UUUAFFFFABRRRQAUUUUAFc9df8lB0v8A7Bt3/wCjIK6Gueuv+Sg6X/2Dbv8A9GQUAdDXBeEJBZ+P/GNpfMI725uYriASHBlg2YUr6gHIOOhrvao6ho2masEGo6fa3ew5Tz4lfb9MjigB6XliHmZJoVIcJI+QAWx0J7nGK4i4S6uPjRL9gvY7dv7AjJZovMDDz27ZFdNr2kWs2hG1hsYCwAitx5AZYC5C7wuMfLnP4VbttA0m0minh021W4jQRrOIV8wKBgDdjPSgDk/AYli8U+NVuZ0llW+i3yBdgP7le2Tiu6M0Y2ZkT5/u/N976etYuqaJpttouqvZ6XbJPPbSKxgtxvkJU8cDJ5rlZtP1F4rYLbXHmTaXZQ2jGJv3EqSZk3cfJj5DzjO32oAdq2gXc2rap4k8P7V13T73ATOFu4vJi3Qv9ex7Gt3wTrNvqnhttTIa2S5vJz5c/wArIxkOVOe4ORW9aabY2LyPaWdvA8p3SNFGFLn1OOtYPi9NOj0r7PNpctybkui+TZSTiLd96QhFPOOncnjIyTQB1Fc2f+SlD/sEH/0cK3bLb9gt9iyqnlLtWUEOBj+LPOfWsL/mpQ/7BB/9HCgDpMD0prsI0ZyDhRk4GTTqbJIsUTSOcKoLE+woA5S28WagviGx0zVdBexj1IP9im89ZCWVdxWRQPkO0E9T6VLqfi8ad4c1fUfsavdaSSLq0MuCMDIIbByCpBHH5EGszS/FGma74qgneDUPOTdBZQvp8qLGD9+RnZQASBjrwB6sRXP+K4Zprj4jtBHI6S6fbW6qikmSbYx2gDqcMv50Adprfie60XStKvG06KV765htjGJyBG0nQ528gfQV0FxcxWdlLdXbpFFDGZJXJ+VQBknPpXnXi2ygXQfDU1tJeTMNStJGUzSSBUByzFSTgDuccV0niG4sfEulav4YtLsLf3NnKiFkYITjHDYw2CRkAkjNADU8U383h8+IINFL6bsM6IZsTvD13hMY5HzBd2ce/FaY1yG607TLzTdlzHqMkYhbOAUI3M34KGOPUYrntO11bXwDDZT2lwurW9oLNtP8smVpVXZ8o7oTyG6YOc1H4R0iXw7pNjb3zSOdD04h1jBZTLIS7gepVQAP980AauoeL4bDxtp2gPAfKu0ZTc4+VZsZSPPqVDH/AL59a6fA9K8p197TUPA000UkqeIVmGqREQuWW5U5VAduDhQI/TAr0jRtQOq6LZX5ieFriFZGjdSrISOVIPPB4oAvYHpVDVNG07WoI4NStY7qCOQSiKTlCw6ZXo3Xocir9FAEcMEVtEsUESRRqMKiKAAPYCpKKCQBknigAoqpqOqWWk2L3l/cxwW6dXY9fQD1J7Acmud26z4tIL/aNH0M4IUHZd3S+h/55Kfb5j/s0AY/iTVdHvvFz2M2oLDbvpVzp090FJigllaParP90NhWOCR0969ChCrBGqsGUKAGHeqtrpGnWWmLptvZQR2QXb5IQbSD1yO+e+etYLeHNQ0EmbwtcqsAHOk3TEwHn/lm3LRH2GV9u9AHV1Wv9Qs9Ls3u765itrdBlpJWCgfnXPnxjA9tdW0pi0jWIYy32fVDsT/eDDh091P1xXN2FlqHiC9jvbQtqEys2NZ1KIrBB/162/G7/fP/AH03SgDa1DxjBNpF9JNaTWlhNbtHaS3Hyy3cjAgCOHG8j3IB9sc1peB7uC68F6SsMgZ4LWOCZOjRyKoDKw6ggjoam0jwvZaXcG9laW+1Nl2yX10d0hHovZF/2VAFV9X8P3CXza1oEiW2qYHnRvxDeKOiyAdD6OOR7jigDo6KyND8QW+tJLH5b2t/bnbc2c3EkTf1U9mHB7Vr0AFFFFAEVyJ2t3FtJHHNj5GkQuoPuAQT+Yrj/CHjW41y5vtG1SGGy1u1Z9gVW8q4jDFRKgJyRkYIz2/LtHZURnYgKoySewrz248O/wDCSeGbTUdJm+y69p8801jcMpUgmRjscHnYwIyD65oA6HRdekbRW1DXbuwgBuZYEKKYl+SRkH3mOSdufxqPX/GVnpmlWNzp7Q6jPqNylrZJFKCkkjHGSwzhRySfauNivLy28M+GJtU0qW3upNSunmnWB5TYOXl5CAHJOcAkEc5waybHSdQm0Wy1G1s76W50HxDPdSwTQMjywPIdxUEAM23BwP8A61AHe63r2teELOPVdZlsbzTPNSO6NtbtE9uGO0OMu25QSMjg8/hUkPiDVZfiRL4f32JsEsBfBxC3mEF9oXO/HvnH4VneO508YeFj4d0UtcXOptGrOEO23jDqzPJn7pAGNpwST0qoumWs/wAXmimWY2sWiR26Sq7opkWT7u5SMnHOM0Abuj69q19461vRLhrL7JpqQurRwuHfzFJAJLkDGPTn2rrK898J28Nl8TvFawpKtvLFaiF3LMHKqdwDNnOCfXivQqACqOoxxxaLeJGioogfAUYH3TV6qmq/8gi9/wCuD/8AoJoAwLO3ubv4VW9tZki5l0ZUiwcfMYcD9ag+Huqaevw+0uMzxQNZWywXMcjBGhkQYYMD0OQetbPhL/kTtE/68IP/AEAVcfSNNkvRevp9q10Ok5hUv/31jNAD4bq0KxRRyRoWjDJEflYLjj5eorzTw7BczeA/EU0OrNFALrUSYljRh/rJO5Gef610l/ot3c+KojCQ9qbxby4MsBHlgQGPYrk4bdxwBxlsnkCulTStOjhkhSwtlik5dFiUK31GOaAMTwDPEvw/8OgyIC9jEqgsOTsHAqr8RYpNZ8A69p2lyLPerB80ETgvwQSuBzkgHjvVzWrCOC98PLZWJWKHUPMcQQnbGpikXJ2jgZZRUekfZrjxTc3EWl3VmYoWgR5LNolkG8EsXP3snoOwyf4uAClr2r6ZdfCq7lhkSWK705oIIk5Z5HTaqBeu7cQMdvwrZ8Lo+m+HNH0m/uIzqUFjEssZkBfKqAT6kZ71oJpOnR3hvEsLZbk9ZliUOfxxmsK8+zXHjGzT+y7wPbSmb7Wtq2x5DGU5kxjaFPPPXA7UAP13/kdPC3+/c/8Aoo101czrv/I6eFv9+5/9FGumoAKKKKACiiigAqrBp1naSzTW9rDFLMxeWRUAZz6k9TVqg9DQB57oniGLwx8JrHUXhaeTJighU4MkjylVXPbk8n0zXQ+X4phhgna70+4dpI/PgW3ZQqFhu2NuJyFz1HOO1cnaeHrjxJ8H9OtbOREvYJRdW/mfdaSOVmCn2PTPvXaWWrajdxRI+iXVpcfKJfPZDGn97DKx3d8YHpnFAD/E97d6Z4X1PULFolubS1knTzULKSilsEAg84x1rmdZ8Ua1YeAdK1mC4sGvrlrYSq0DFP3rKOBvyMbvU5q9rWsDX/DWqabp1ncS3N7ps/2QEoomBBTIJbgAlc5xwwrn9Y8HPJ4C0i2sPDcS6vC9q0uxIVdfLZS5LZ5zg9Cc0AemRBxEokYM+BuYDAJ+lc5451fUtC8Pf2hpslssi3EMTC4iLqRJIqZ4ZcY3Z/CtZNVibVhphhmSc232jLAbduduOvXNcv4safxd4HaPS9NnuWlvUVoXKKQIbgb85bGP3bY554oAni8S39h4wtdC1GaxvIrm1kuBcW0ZiMATGfMUswwc8HI6UzVviVoNrYb9Mu4dRvZWSO3t4n/1ju+xctjAGevt9RVMeHbkePNM1bSNGOk2cEMq3+DGn2vK4RNiMQSDzk4qnF4O1K8+HFjYfZBZ6vp179tgjlZdrusrOFJUngg4z2JoA29a1nWvCenRaxqk9peWCyIl6kMBjaFXYLvQ7juAJGQeSOc9q6uZg9pIynIKEg/hXI+KLTUfGGgDQV024s47qSMXk87IBDGrBmC4J3MduBjjnOe1bI1mL7c2kG0uoWMEjwySKNkixkK2MHIwWHUDOcjNAFT4e/8AJPdA/wCvGL/0EV0tc18Pf+Se6B/14xf+giuloAKKKKACiiigAooooAKKKKACiiigArl/iJrN3oHgTVNRsG2XUcYWN8Z2FmC7vwzn8K6iqupada6tptxp99CJra4QxyIe4NAHGeIfDlhpfgO81OwUW+q2Vk11HqK/69pETdln6sGxgg9Qa6fRboa/4U0+8vbdP9Os45ZYWGV+dASMHtzWdL4Rmu9LXRr7WJ7jSFVUMJjCyyIuMI8gPK8YOACR1PXNi4/tKHxBawWl7H9lYMJLYQjbDEEIVs9d2/AxkAjIxwTQBw3h+8m8H7bTVCJvC2qzzRwSSDK2UvmMPLfPHltjj0OfWu58FW8Nv4N0pYIkjDW6OwUYySOSfepIvDNs/hufQ9RcX1pPvD70C5DsWI49CTg9uKu6LpcWiaJZaXA7vFaQrCjP1IUYGfegC9RRRQAUUUUAFFFFABXH+LfFd94U1XT5pbeO40Wbd9raONvNtlGB5nXDKCwyMZArsKxdRhM/iGwWS0kmtjbzxyts3IN2zAb64NAEd1rMkGpQzC7tf7IaxlvHk8sltqbOQ27GCHz07e9ZtjrfiDV/Df8AwkNlFZxwSxme2sZo2LyRDkZkDYVmHI+UgZHWsqw8EX1jqmpaIZTJ4ZuNOuIbMk5e2MpUPFn+6MZX2yO1X9Dm1bRPBMOjT6TczapZQfZIhEoMU20bUcP0CkYJzgjnj1AOk8P63a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che_252	OPEN	"<image_1>X undergoes a series of reactions to give Y(molecular formula is C_7H_8O_2). There are () isomers of Y that meet the following conditions.
i. It can make FeCl_3 solution appear purple: ii. The NMR spectrum has 4 groups of peaks and the peak area ratio is 3:2:2:1."		3	che	有机化学基础	['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che_253	MCQ_OnlyTxt	Among the following methods, what can increase $\frac{c(H^+)}{c(CH_3COOH)}$in 0.01mol/L CH_3COOH solution is ()	['A. reduce the temperature', 'B. Add a small amount of CH_3COONa solid', 'C. Pour in a small amount of HCl gas', 'D. Add a small amount of glacial acetic 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che_254	MCQ_OnlyTxt	The following chemical reactions that do not match the equation are	['A. Test for Fe^{3+}: Fe^{3+}+SCN^-→Fe(SCN)^{2+}', 'B. Condensation polymerization: \\ce{n HO-C(CH2)3OH ->[Catalyst] HO-C(CH2) 3O-}^{n}H^+(n-1)H_2O', 'C. Alkaline zinc-manganese dry battery: Zn+2MnO_2+2H_2O= 2MnO (OH)+Zn^{2+}+2OH ^-', 'D. Electrolytic treatment of acidic chromium-containing wastewater: Cr_2O_7^{2-}+6Fe ^2 +}+14H ^+=2Cr^{3+}+6Fe ^3 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che_255	MCQ	The sea mud bacterial battery developed by our country's scientific researchers can not only be used as an underwater power source for submarine instruments, but also promote the decomposition of organic pollutants (expressed in CH_2O). Its working principle is as shown in the figure<image_1>. The seabed sediment/seawater interface can function as a proton exchange membrane. The following theoretical analysis is correct ()	['A. a is the negative electrode of the battery', 'B. The electrode reaction at the b-pole is H S^- + 2e^- = S + H^+', 'C. If 1mol of S is generated in the b-pole region, H^+ in the a-pole region increases by 2mol', 'D. When the external circuit passes through 1mol e^-, at least 1mol of CO_2 is generated']	D	che	化学反应原理	['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che_256	MCQ	The reaction between NaClO solution containing a small amount of NaOH and FeSO_4 solution was analyzed. It is known that: ① Figure 1 <image_1>shows the change in pH when FeSO_4 solution is added drop by drop to a NaClO solution containing a small amount of NaOH;② Figure 2 <image_2>shows the relationship between the quantity fraction of substances containing chlorine particles in NaClO solution and pH [Note: The pH of saturated NaClO solution is about 11;K_sp[Fe(OH)_3]=2.8×10^-39]. Regarding the above experiments, the following analysis is correct:	['A. The pH of the solution at point A is about 13, mainly due to ClO^- + H_2O HClO + OH^-', 'B. The reason for the significant decrease in pH in the AB section is 5ClO^- + 2Fe^2+ + 5H_2O = Cl^- + 2Fe(OH)_3↓ +4HClO', 'C. The main reason why the pH drops faster in the CD segment than in the BC segment is HClO + 2Fe^2+ + 5H_2O = 2Fe(OH)_3↓ + Cl^- + 5H^+', 'D. The reason why Cl_2 was generated in the solution when the reaction lasted for 400s was: ClO^- + Cl^- + 2H^+ = Cl_2↑ + H_2O']	C	che	化学反应原理	['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'che_256_2.jpg']
che_257	MCQ	The following figure <image_1>shows the pM-pH relationship diagram of Fe(OH)_3, Al(OH)_3 and Cu(OH)_2 at the equilibrium of precipitation and dissolution in water. [pM= -lgc(M^n+);c(M^n+)≤10^-5mol/L can be considered to have completely precipitated M^n+]. The following statement is incorrect ()	['A. From point a, K_sp[Fe(OH)_3] = 10^-38.5 can be obtained', 'B. At pH=3, 0.1 mol·L^-1 Al^3 + has not yet begun to precipitate', 'C. Al^3+ and Fe^3+ at concentrations of 0.01 mol·L^-1 can be separated by step-by-step precipitation', 'D. In a mixed solution of Al^3+ and Cu^2+, when c(Cu^2+) = 0.2 mol·L^-1, they will not precipitate at the same time.']	D	che	化学反应原理	['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']	['che_257.jpg']
che_258	MCQ	<image_1>L is a polymer compound with good heat resistance, water resistance and high-frequency electrical insulation. It is made up of three monomers, each monomer containing a functional group in its molecule. The following related statements are correct ()	['A. The reaction to prepare L is an addition polymerization reaction', 'B. The monomers of L are<image_2>, <image_3>and HCHO', 'C. The ratio of the amounts of the three monomers participating in the reaction is 1:1:1', 'D. Three monomers can form polymer compounds with network structures']	D	che	有机化学基础	['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che_259	MCQ	<image_1>To synthesize polymer P, all the reactants were added to a closed reaction vessel at one time. The conversion route was as follows. The polymerization process consisted of three stages, which occurred in turn. The following statement is incorrect ()	['A. In the first stage, there are breaks of the C-O bond and the C-N bond', 'B. Under this condition, the aggregation rate of Figure 1 <image_2> with <image_3> may be much greater than the aggregation rate of Figure 1 with $O=C=O$.', 'C. Polymer P contains three functional groups', 'D. Add amol $CO_2$to produce a maximum of $\\frac{a}{z}$mol polymer 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che_260	OPEN_OnlyTxt	"Catalytic oxidative coupling of methane to ethylene is an important research topic to improve the added value of methane. The reactions involved are as follows:
Reaction I. $4CH_4(g) + O_2(g) \rightleftharpoons 2C_2H_6(g) + 2H_2O(g) \quad \Delta H_1 = -354kJ \cdot mol^{-1}$
Reaction II. $2CH_4(g) + O_2(g) \rightleftharpoons C_2H_4(g) + 2H_2O(g) \quad \Delta H_2 = -282kJ \cdot mol^{-1}$
It is known that: ① The selectivity of $C_2H_4(g)$= $\frac{n(C_2H_4)}{n(C_2H_6) + n(C_2H_4)} \times 100\%$;②$K_p$: calculated by using the equilibrium partial pressure instead of the equilibrium concentration; partial pressure = total pressure * fraction of the substance.
A rigid container was filled with 4mol of $CH_4(g)$and 2mol of $O_2(g)$. Reactions I and II occurred under the conditions of an initial pressure of $p_0 kPa$and a temperature of T K. After reaching equilibrium, the total pressure of the reaction system was measured to be 0.95 $p_0 kPa$, and the partial pressure of $CH_4(g)$was $p_0/15 kPa$. The equilibrium constant expressed by the partial pressure of Reaction I is $K_p = ( )kPa^{-1}$(expressed in an algebraic expression containing $p_0$),"		\frac{(0.1p_0)^2 \cdot (0.5p_0)^2}{\left(\frac{1}{15}p_0\right)^4 \cdot \left(\frac{1}{12}p_0\right)} \text{or} \frac{6075}{4p_0};	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dA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che_261	OPEN_OnlyTxt	"At a certain temperature, a closed container with a constant pressure of pMPa is filled with equal amounts of NO,$NO_2$and $NH_3$, and a reaction occurs:
$NO(g) + NO_2(g) + 2NH_3(g) \rightleftharpoons 2N_2(g) + 3H_2O(g)$。After tmin, the reaction reaches equilibrium, and the volume fraction of $N_2$is a. At this temperature, the equilibrium constant of this reaction is $K_p =$()(expressed as a formula containing p and a, without simplification)."		\frac{(ap \text{MPa})^2 \times \left(\frac{3a}{2} p \text{MPa}\right)^3}{\left(\frac{1-2a}{3} p \text{MPa}\right) \times \left(\frac{1-2a}{3} p \text{MPa}\right) \times \left(\frac{2-7a}{6} p \text{MPa}\right)^2}	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+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che_262	OPEN	The catalytic reforming of CO_2 to produce CH_4 is of great significance and involves the following reactions:\n\nReaction I: $CO_2(g) + H_2(g) \\rightleftharpoons CO(g) + H_2O(g) \\quad \\Delta H_1 = +41.2 \\text{kJ/mol}$\n\nReaction II: $2CO(g) + 2H_2(g) \\rightleftharpoons CO_2(g) + CH_4(g) \\quad \\Delta H_2 = -247.1 \\text{kJ/mol}$\n\nReaction III: $CO_2(g) + 4H_2(g) \\rightleftharpoons CH_4(g) + 2H_2O(g) \\quad \\Delta H_3$\n\nIn multiple equal-volume constant-volume sealed containers, 1 mol of CO_2(g) and 4 mol of H_2(g) are introduced, and only Reaction III occurs. At different temperatures, after the same reaction time, the relationship between lg$k_{\\text{forward}}$ (forward rate constant), lg$k_{\\text{reverse}}$ (reverse rate constant), and the conversion rate of H_2 with temperature is shown in Figure <image_1>. The rate equations for this reaction are:\n\n$v_{\\text{forward}} = k_{\\text{forward}} \\cdot c(CO_2) \\cdot c^2(H_2)$,\n\n$v_{\\text{reverse}} = k_{\\text{reverse}} \\cdot c(CH_4) \\cdot c^2(H_2O)$,\n\nwhere $k_{\\text{forward}}$ and $k_{\\text{reverse}}$ are rate constants that depend only on temperature.\n\nWhen the reaction reaches equilibrium at temperature T_2, the total gas pressure is p kPa. The equilibrium constant $K_p = $ ( ) (fill in the expression, no need to simplify).		\frac{\frac{3}{44} \times \left(\frac{3}{22}\right)^2}{\frac{7}{44} \times \left(\frac{7}{11}\right)^4} p^{-2} \left(\text{kPa}\right)^{-2}	che	化学反应原理	['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che_263	OPEN	"Reducing the content of carbon dioxide in the air is of great significance in environmental protection. It is known that carbon dioxide and hydrogen react as follows under certain conditions:
Reaction I (main reaction): $CO_2(g) + 4H_2(g) \rightleftharpoons CH_4(g) + 2H_2O(g) \quad \Delta H_1 = -164.7 \text{ kJ} \cdot \text{mol}^{-1}$
Reaction II (side reaction): $CO_2(g) + H_2(g) \rightleftharpoons CO(g) + H_2O(g) \quad \Delta H_2 = +41.2 \text{ kJ} \cdot \text{mol}^{-1}$
If CO_2 and H_2 are introduced in a constant-volume closed container with a volume of V L according to a ratio of 1:2 to only carry out reaction I (the initial feeding amount is the same), at different temperatures, the total pressure of the reaction system changes with time as <image_1>shown in the figure. The equilibrium constant K_p expressed in partial pressure under the conditions of experiment b is ()(list the calculation formulas)."		\frac{\left(\frac{0.25}{2.75} \times 165\right)^2 \times \left(\frac{0.125}{2.75} \times 165\right)^4}{\left(\frac{1.5}{2.75} \times 165\right)^4 \times \left(\frac{0.875}{2.75} \times 165\right)}	che	化学反应原理	['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che_264	MCQ	<image_1>Propylene ($CH_2=CHCH_3$) is an important chemical raw material. The hydration of propylene to isopropanol ($CH_3CH(OH)CH_3$) and the electrolysis of propylene are both important chemical technologies. CH_2=CHCH_3(g) + H_2O(g) \rightleftharpoons CH_3CH(OH)CH_3(g) \quad \Delta H = -51.5 \text{kJ/mol}$ . At 510K and 6.0MPa, a certain amount of $CH_2=CHCH_3$and $H_2O(g)$were filled into a closed container to synthesize $CH_3CH(OH)CH_3$. The following description can show that this reaction has reached an equilibrium state ().	['A. $v(CH_2=CHCH_3) = v(H_2O)$', 'B. The conversions of $CH_2=CHCH_3$and $H_2O(g)$are equal', 'C. The density of the mixture remains constant', 'D. The volume fraction of $CH_3CH(OH)CH_3$remains unchanged']	CD	che	化学反应原理	['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60n/AAnrWv8AyFPDWt2Q/vfZ/NH5oTQB2NFcvb/ETwrOwRtWit5D/wAs7lWib/x4Ct+11Gxvhm0vLecH/nlKG/kaALNFRzzw20DzzypFEgyzuwCqPUk1V03WdN1iNpNOvre6VDhjDIGx9cUAXqKKKACiiigAooooAKKKKACiiigAooooARlDKVYAqRggjg1zeoeAfDeoTG4GnraXX/PxZMYHH4riulooA43/AIRvxRpfOj+J2njHSDU4RIMegcYP40f8JL4o0zjV/Cr3EY6z6XMJeP8AcbDflXZUUAcpafEfwvcTi3uNR/s66PWDUY2t3H/fYA/WungnhuYllgljljbo8bBgfxFMu7G0v4DBeWsFzC3WOaMOp/A1y83wz8LmZp7Gzm0q4P8Ay10y5ktiPwQgfpQBrSeLPD0Wsf2S+s2S6hnb9nMw3Z9Pr7da2a+O7n4YeNV8WvYnT7qW4NwSL3kq3OfM3/r619fWkckNlBFK2+RI1Vm9SByaAJqKKKAOP+Gv/IrTf9hG7/8ARzV2Fcf8Nf8AkVpv+wjd/wDo5q7CgAooooAjnnitoHmmdUjQFmZjwBXC2Wrrp3iCfX9XS7ig1UeXbnaTHbwR4w0n90sWzntxmtnxJp2qy3lvqNg63cNuuJdMl4SbnO4H++O2eKraAIrrUIb4X9xdm5SfzI5+BCQUBj2fw46EUASf8JPrLG+lg8OC4tLeRgk8d/GBIgUMGwfUHNdFYzy3NjBPPAbeWRAzRFw2wntkcGudbVtE0+21uzOoWFsUdlWEzohX9ygwFzXRWMsc+n28sUiyRtGpV0OQRjsaALFFc94u8Ur4S0tb+TT57qIyJGTGyqFLHAzk5/IGt9pFSIyOQqKu4k9AKAHVx+k/8lQ8Q/8AXnbf+zUWHizxBqOpwpB4NuBpU0mF1CS+iUeXn7/l/e6dqNJ/5Kh4h/687b/2agDsKKKKACiiigAooooA4/4h3Us2k2nh20crea7crZgr1SH70z/QICP+BCurtreK0tYraBAkMKCNFHQKBgCuQ0wf278S9T1I/NbaLCNPt/Tznw8p+oG1fzrtKACiiigAri9a8Q3+s6pJ4b8KuPtKcX+pEZjsl9B/ekPYduppfEOs32r6s3hXw9LsudoOoXq8i0jPYf8ATQjoO3Wui0PRLLw/pUWn2EWyJOSTyzserMe5PrQBD4f8Oaf4bsfs9kjM7ndNcSHdJM3dmbua16KKACqKy3R1K6jdCLVYlMbberc55q9WZML+5vLu2SRreAxL5cyoCQxznr1q47MznvH1/R7nFfAz/kmFr/18z/8Aow1SnH2j9pC0ax5FvpTC+K9sg7QfxKVv+HvAN14Z0UaTpviW9jtA7OAYIiwLHJw2K2vD3hTTfDYuHtFkkurpt9xdTtuklPuf6VBoblFFFABRRRQAUUUUAFFFFAFa40+yu1K3NpBMD1Dxg5/OsG6+HfhS6JY6NBC5/jt8wt+akV09FAHjfxR+HeoJ4LmHhu+1m5VZFabT3u2lRoxnJVTkkg479M1wvwc8NeObPXLnUNLtorONYij/ANpxyLFKT2wuDn37V9PUUAcaNd8cWPF94QtbxR1l03UV/RJFU/rS/wDCxLO3/wCQpomvaZ6tcWDMv/fUe4V2NFAHOWfj3wrfELDrlmHPRJH8tvybBrehure4AMM8cgP9xwarXmjaXqAIvNOtLjPUywqx/MisKb4ceF3JaCwayc/xWczxH/x00AdXRXHf8IRe2v8AyDPFmsW6jokrrMv47hmj7F4+suYdW0jUQOi3Ns0J/NSf5UAdjRXHf8JB4ws+L3weLkDrJp98jfkr7TQfiRplr/yFtL1zSgOr3enSbP8AvpAwoA7Giuf07x14U1YgWXiHTZXPSM3Cq/8A3ySD+lZ/xD8eW/gTw4upeR9qmnfy4Iw2FY4zkn0FAHYUV5f8L/i3/wAJ5fXGnXtglpexp5qGJiUde/XkGvUKACiiigAooooAKKKKACiiigAooooA4/4a/wDIrTf9hG7/APRzV2Fcf8Nf+RWm/wCwjd/+jmrsKACiiigArGm0uO216HU7ZEEkv7uePpvz/GP9oYGfUfSp77XtO065+y3E/wDpOwSLCilnYEkDAHXlTXHahf6t/wAJZpWsX+l6kLJPMis7K1AZtxXmSbnuBwvbGTQB2z6Ppkjs76daM7HLM0Ckk+p4q1DDFbxLFDGkcajCoigAfQCucm8b2NnEZtR0/VbGFfvSz2bhF+rDIArooJ4rmCOeCRZIpFDI6nIYHoRQBxHxe/5EKX/r7t//AEYK7C+sYtT0uaxnLiGeMxuY22tgjnB7VjeNfDFz4t0T+zIdRjsozIkjO1sZSSpyMfOuK0tQsdRvNEa1t9V+xXxAxeQQAhTn+4xPHtn8aAODfStS+HOu6K2m6reX2gahex2E1leSeY0DPkK6MeQARyK0YNY03Svifr39oahbWm+zttvnyqm773TJrb0/w5em7trzXtYbVZ7UlrdVtlgijfGN+wEktgkZJ4ycAVj2umWGo/FDXvttnb3Oyzttvmxhsfe6ZoA7OzvrTUbZbmyuYriBiQJInDKccHkVPUNraW9lAILWCOCFckJGoVRn2FTUAFFR3E8VrbS3EzhIokLux7ADJNVdH1ez13SbbU7CTzLa4Teje1AF6qOsajHpGjXmoykBLaFpDn2FXq47x+zXsOk+H4yd2qXqJJjtEnzv+GBj8aALngLTpdP8JWrXIP2u7LXdwT1LyHcc/TOPwrpaRVVEVFACqMADsKWgCpqeoQaTpd1qF022C2jaRyPQDNeHx/tAXOt3/wDZGm6VHZzXsq21pdTS5EbOwUO647ZzivWvG2oWFj4VvV1CNp0uUNuluh+aZ24Cr7mvMPBXwCj0vV9P1rWNRMhgZbhbFI8BZAcgM+eQDjsM4oA9Y8N+HbXw1pS2duzSyuxkuLiTl55D952PqTWxRRQAUUUUAFU4pbptWnidMWyxqUbHVuc81cqnFNdNq08Tpi2WNSjY6sc55q47Mzm9Y+v6PcuUUUVBoFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAGZqHh3RNWz/aOkWN0T3mt1c/mRmuQ1/wCDHhHWdPkt7a0bTpCcpJbyNtU+uwnb/KvQqKAPJvDHwXl8ITte6P4mmiv2Uozvao6lfTBPH1rqNnxAsuRLompKOxV4GP48iuxooA47/hKfElnxqHg66bHV7KdJVH4HBpy/EjRIzi/h1HTj3N3ZOqj8QCK6+msiuMMoYehGaAMew8XeHdTA+x63YSk9FE6hvyJzWyrBlDKQQehFZN/4W0DUyTfaLYXBP8UkCk/nisZvhn4ejJbTjqOlyH+Owv5Y/wBNxX9KAOworjP+ET8TWX/IL8dXxQdI9StIrnP1YBW/WnCb4h2PMlp4f1VB/wA8ZZbZz/30GFAHXySRxLukdUXpljgU7rXy18bL/wAWX2vWjanpt1p1msIEUCzCWPfk7m3LwT0r1/4IvrL/AA5g/tkzEiZxbednd5PGOvOM7se2KAPRqKKKAOP+Gv8AyK03/YRu/wD0c1dhXH/DX/kVpv8AsI3f/o5q7CgAooooA57XtdutB1G3nbRp7nS2jIury2AeSA5G3KD5iuN2SM4o1fVJJ7LSr/RIYdT8y6BjVbgRqymOTJDYP5V0NYbaBHaapFfaeojQzeZNbA4RmIKlwOzYY/X60AUJtZj1SJtF13S7vSZLsbF8/bJDL32rIhIyfQ4PtXTwQxW0EcEMaxxRqFRFGAoHQCo76yg1GzktblA8UgwR6ehHuKWzjmis4o53Dyou0uP4sd6AJ6KKKACuP0n/AJKh4h/687b/ANmrsK4/Sf8AkqHiH/rztv8A2agDsKKKKAOT8barYW8djpN9fW9pFfy4meeVY18peWGSe/A/GuX+FerWOn+IPEHg21vYLq0t5TeadJDKJFML/eUEHHykj8z6V2GkWerN4p1HUtUs4Y4nRYbQpPvKxjk5GByTz+ArF8ZeHNcu/Gnh/wARaBbWxuNP3pcNLPs82Jv4MYP+1+dAHfVxlv8A8Tf4rXcv3odEsVhHtNN8x/8AHAv512CO3kCSZRGduWG7IX8a4/4bBrvQbzXpARJrV9NeDPUR7tsY/wC+FH50AdnTZJEhieWR1SNAWZmOAAOpNOriPFU0viXWYvB9m7LAyibVZUP3Ic8R59W/lQBH4fjk8Z6//wAJXdow0q1ZotGgcY3jo1wR6t0X25713dRwQRWtvHbwRrHFEoREUYCgDAAqSgAooooAKKKKACqcU1y2rXETxkWyxqUfbwWOc81cqnFNctq08Lx4tljUo+OrHOeauOzM5vWPr+jLlFFFQaBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAISF6kD60AgjIII9q8w+Id6p1uNNd0bWJPD1vGG+1WL4UOerMFO7AFdr4XtdHi8MWqaFM0mmyqZIpfMLltxyTuPOe3tjFAG3SEgDJOK4P4eGRNd8ZW73E8yQaqUj86QuVXYvAJ7VFFcf8JZ8TNX0q8Z20zR4I1ECuVV5XAJZsHnAIxQB6CSAMkgCgOpBIYce9eaeH797y18aeF79jdLospFvJKdzeU6sUBPUldpGevSsn4caql74DsNE0vybjWLmEvdzS/OIEJI3Pnkn0WgD2EMrdCD9DS1j+HPDOn+GNNjs7JXYhQHmlcvJIfUk/wAqPFXiC38LeGb7Wbkbkto8hM/fYnCr+JIFAGuSB1IFLXnnhXU9NvJrKbxBqXna7fKJooJVdIU7hIgQFYgdxk13t3cLaWU9ywysMbSEewGaAJcjOMjPpQWUHBYA+5ryrRLafxR8Or/xTcXVwusTrNc2k6Ssv2fZkxqozjHAyMc5OareIGn+IHw08OajbsbbVb2RVWaIlW3hXyMjsWT9aAPX6QsoOCwB+tcr4B8UL4j8F2+oXLBLq2DQXqnjZKnDZ+vB/GuG0iW41n43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che_265	OPEN	"Ethephon is widely used to increase crop production and storage. A method for preparing ethephon is shown in the figure<image_1>. Data: The mechanism of the rearrangement process is as shown in the figure<image_2>. The purity of ethephon can be determined using the following method.

Known:
i. Ethephon can release ethylene and produce phosphate in solutions with pH &gt; 3;
ii. The relationship between the quantity fraction of phosphorus particle-containing substances in the phosphoric acid system and the pH of the solution is shown in the figure<image_3>;
iii. Thymol blue is yellow at 2.8 &lt; pH &lt; 8.0 and blue at pH &gt; 9.6.

Step I: Take a g of ethephon sample in a conical flask, add water to dissolve it.
Step II: Add a few drops of thymol blue as indicator and the solution turns yellow. Titrate with bmol·L^{-1}NaOH solution until the solution turns just blue, consuming V_1mL. Both impurities and ethephon react with NaOH, where ethephon reacts:<image_4>
Step III: Heat until no gas is emitted, and the solution gradually turns yellow; cool to room temperature.
Step IV: Titrate with bmol·L^{-1}NaOH solution until the solution turns just blue, consuming V_2mL.
The purity of ethephon in the sample is_____(expressed in terms of mass fraction, M_{ethephon} = 144.5 g·mol^{-1})."		\frac{14.45bV_{2}\%}{a}	che	有机化学基础	['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8SP8Akm/iH/rxk/lW+91b2diJ7qeOCFVG6SVwqj6k1gfEj/km/iH/AK8ZP5Vo68AfCOpAjI+wy/8AoBoAntdd0i+lWK01SynkYZVIrhWJ+gBqeW/todQgsXci4nVnjXacELjPOMdxxXiGng+I9B8BeGba0+xX8UcOoLfz4UGKP7wiIyWY/wB3jpk17Df2tzL4i0q6jhLQQJMJH3AbdwGOM5PSgCzfazpmmMq3+oWtszDKiaVVJ/AmrNvcwXcCT200c0LjKyRsGUj2IrgfhU51Wy1vXL0eZqN1qc0cjvyyIhASMegA7e9V9HlvtP8Ail4r0TR/JSCW0ivoo5QfKinbAbgdN3U49KAPS6K5bZ48/wCe3h3/AL9Tf/FUbPHn/Pbw7/36m/8AiqAOoYkKSFLEDoO9cBeeNNH1OKW/vNI1ZLTQNSZJ7gKhWGZAVJIVyxUB+oBFdNpK+Jhdt/bEmktbbDgWiSB92Rj7xIx1rgvC+jXfiDSvHelxX6WlvdeIbyKZxDvfaQm4KdwAyOOQcUAepW9xDd20VzbyLJDKgeN1OQykZBFS1nw2D6XoMWn6V5atbW6w2/n5KjaMDdjk9Kxtnjz/AJ7eHf8Av1N/8VQB1NFcts8ef89vDv8A36m/+Kq9pS+Jxdn+15NJa22nAtEkD7u33iRjrQBFc+J9+uzaJpNm1/fW6q90fMEcVuG+6GbB5PYAH8Kgn8V3Vtb6q1xok8U+mW4uZUaVdsqHeSY2HX7h64/Cuf8AhwfsHinxrpd98mptqrXY3nmSB/8AVsPUDn6Zrp/Fk9u3hjxBCrKbhNNmLgDlVKNjJ/OgCv8A8JfJ/wAIJ/wlX9mN5H2f7V5HnDf5W3Oc4xnHb9a2dF1F9W0e11B7c24uYllWMvuIVgCMkd+a80FjqX/CiBN/bL/Z/wCww3keQmNvlfd3Yz+NdTZ65Povg3Qp002S6tVsrbz5EkAKBgqjav8AGcnpxx+VAD5PGd7/AMJPf6DbaBNc3NnCs7tHcIAyNnGN2OeOlXdF8UR+KvDo1LQkHmGQwvHdgqYHH3g4Hceg65HPeuH1aPXZfiX4r/4Ry5ih1FdHt2jEke7ectwM8A+hIPNbXgnTdJ1T4cR2WiXd7Yea7G9bcjXKz5/eLJuUjcSMHgcYxigDrNA1C51TRobu7t1gmZnVlRsqdrFQyn+6wG4exFYniP8A5H3wf/10uv8A0VXRaXYvp1hHaveTXbJn97MEDEdhhFVQB04Fc74j/wCR98H/APXS6/8ARVAHXVDPd29qAbieKIHp5jhc/nU1cF8Opv7eOta/fKJbuTUJraMuM+TDGcKgHYdSfUnmgDtpL60it3uJLqFIUGWkaQBV+p6VMGBAIIIPINcL460Oy07wH4tntokRbuBp3jCjaJAoG4e5wPxGa6saZZXkEElxbRyOIlGWHbFAGhRSKoRQqjAAwBXJtqnjoMdvhnSiM8H+1D/8boA62iuR/tTx3/0LGlf+DQ//ABuj+1PHf/QsaV/4ND/8boA66iuR/tTx3/0LGlf+DQ//ABuj+1PHf/QsaV/4ND/8boA66iuR/tTx3/0LGlf+DQ//ABuj+1PHf/QsaV/4ND/8boA66iuR/tTx3/0LGlf+DQ//ABumS6n45MTh/DOlBCp3H+1mGB9fL4oA7GmSSxwoXlkVEHVmOBXhvgPxb8TrzVLi3i0tdV0lJWCXF4/lhVycbZsDf9dpPevXfEieb4Q1UTxpk2Mu5PvAHYfzoA0oru2nbbDcRSH0Rwf5Uj3ttHex2bTILmVGdIs/MyjGTj05H514Zo6W+taP4H0fRLM2mv2yw3st60Yg/wBHBw+GODJnpgZHrXsd7b3DeJdMuUgZ4IYZ1kkBXCltmOCc/wAJ6CgDQuL21swDc3MMAbgGSQLn86lR1kQOjBlPIIOQa89+Ge3xFaar4k1NFuL66vpoVMgz5MKHCxqOwHJ9881X0S7v9F+InijwzpEMUtstrHqFlbSyFIoXbaHQEA7VJYtgDt70AemUVyP2/wAf/wDQC0L/AMGMn/xuj7f4/wD+gFoX/gxk/wDjdAHWk4UnBOOwrzZNQ8JxJNevPqcdvp+uSXU87QN5cVyQVZWIXhRu6/Tmus0a58UzXpXWdM0y2tthIe2u3kbdxgYKDjr3rgtA0nU/EGieNNHtXtILa81y7imuJdzOinbnagGCcdMkUAesxyJLGskbq6OAyspyCD0Ip1YU9tq2i6DYWPh+1tbxraNID9snMXyKuAchTk8Cs77f4/8A+gFoX/gxk/8AjdAHXUVyP2/x/wD9ALQv/BjJ/wDG6syzeJpvCesNd2dpbakLaX7ItpO0oLbDtJJUYO6gCePxXa3c88em2l5qKW8himmtkXy1cdVDMRuI77c1WuvHelWml22pPFeG2ubo2iEQEMJd5TaVOCDlT1FUfhI0DfDDRPII4iYSevmb23Z985rP+KKRLoGmLZGJXOvWpYj5gJC3OQD9MjigDqda8U2mgnTxe291m/mS3gCIGzK2cIeeDwfb3rZMhEJk8tidu7Zxu+n1rzfx/HqiXvg43tzZyx/8JDbYEMDIc4buXbj8K7V9fgi1uHS5ba6jacssM7IPLkZV3FQc5zjPUAHBwaAMZfiNox0+51CSC/isbW4a2uLhrYlYpFOCGxkgA98YrS17xDJpWjf2rZ2X9oWiQm5leOYKBEADlf7xIOQO+OvSvInutSh8KeILZ2jh8P3viO8ttRu40LzW0bSY3AHjaehPYHoa9ak0OY6Rpdlo99bxWNrGgVZoTMJQoGw5V16Yz70Ab0biSNXAIDAHBHNFEassSK7b3AAZsYyfXFFADqKKKACuS8V6Bqesa/4dvbJbbydLujcSCWUqXBXbgAKfWutooA5Cw8N6l4f8V3V5oxtjo2onzbqykcqYp+8keAR83cccitbxV4ctfFfh260e7ZkSYArIv3o3ByrD6ECtmigDk7m08WXvh1tIkNhFcyxfZ5dRSVjhSMGRY9o+YjtuwD3rc0PRrTw/odnpNim22tYxGmep9SfcnJP1rQooAKKKKAMjxL4ft/FGiT6Tdzzw20+PM8kqGIBBAyQe4FaVtCbe2jhMrSlFC73xk/XAAqWuS8POx8f+MlLEqr2eAT0/cCgDraKKKACiiigAooooAKKKKACiiigAooooAKjjhiiZ2jjRC7bnKqBuPqfU1JRQAUUUUAcv8SP+Sb+If+vGT+Va+pWU2paDPZQTpA9xAYvMePeFDDBOMj19ayPiR/yTfxD/ANeMn8q6WH/Ux/7ooA4o/Dzf4O0vRm1PZfaSUaw1KGDa8RX1BY5yOCMgGuxs0uo7VEvJ4p5wPmkjjMat/wABJOPzqeigDl7fwvdaLqV/deH76G2hv5fPntLmAyRrKRgumGUqTxkcj6Vd0Hw5Ho91f6hNO13qeoOHubll25CjCqq/wqB0HJ9Sa26KACiiigBGAZSpzgjHBxWTp+k6N4bkl+yqtq2oXBdw87HzpmGSfmJyxC/XiteuW8Y/8f3hb/sMp/6KloA6miiigAooooAzNS8O6Tq9zDc3tjHJcwjEc4ysiD0DLggfjTv7C0z+zprD7HH9lmz5sfP7zIwdx6tkcc1o0UAZn/CO6T/Y/wDZH2GP+zsbfs2Ts2+mM9PbpVK78P3IFnBpV3bWdjagFLZ7ZpRuH3T98cDsMYB57DHQUUAZsHh/S7fVZNVjs411CRdslwCd7j0JzyPanWuiaZY6hc39rZxQ3Vyd08kYwZD6t2JrQooAK5HxH/yPvg//AK6XX/oquurkfEf/ACPvg/8A66XX/oqgDrq5K28M6noGrX114furX7HfzG4nsrtGwkp+8yOvIz3BB9sV1tFAHOa7oF/rfhXUtMlvYhdX0RiaTYRHED/dXOfXqefyFb1qkkdrEkpUyKgVivTIHapaKACiiigApshdY2MahnA4UnGfxqvfvfJbg6fDbyzbuVnlMa4+oVufwqnaTa+10gvLHTo7c53tFdu7DjsDGAefegDmU+JaDw7N4gn0O7TTLe4aCeRJEdoyr7CxXIJGfSul1HWHt4dLuLNYpoL25iiLsTwj9CPWvGIIr3/hAjLdzSS+FjrNyurW9uoEqxeccPu5O0NgsBzj8a9qfTrLVNP0428xW1geO4tzARtYKPl6g8Y9KAKt54mRNf8A7C061a+1FIhNOocJHboful25wT2ABP4VFN4nuraa+t7jRpkntbNrsYlUxzAHkI/qO+QMZHrXN+DG/s/4n+NbG+Oy8vJobq338edBtIBX1Cniuw1+4tzpWpW+9DcrYyvtHJVSpGT6ZP549qAJtA1T+3PD2m6t5Xk/bbWO48vdu2b1DYz3xmtBlDKVYAgjBB71z3gH/knfhv8A7Blt/wCi1roqAEAAGAMCqGuWlzf6He2VoYhNcQvEGlJCruBGeOuM9K0KKAPP18AXv/CI6LZJeW9trmibfsV/ECQQOCrDg7WHBGf8K7iy+1/ZI/t4h+04+fyCdhPqM81YooA5Kw8N6j4Zv9QfQGtJbC/mNy1ndMyeTK33mRlB+U9dpHHY1c8O+GjpV/qWrXs63OrakytcSou1FVRhUQHJCgepyetdDRQAUUUUAIw3KQCVJGMjqKxtF0DT/DbXItZ5R9uuGnkWaUNvlbkkZ7nHQelbVcn4y/5CnhP/ALDCf+ipKAOsooooAKKKKAOdXwVpcF7Pc2El7p/2hzJPFZ3LRxyMerFRwCfUYNTap4S0jV7K1s7qKbyLaUTRJHO6YkByGJByTkk5PetyigDG1fwvpuuGyN/9okNlKs0BW4dNsi9H4Iyee9V/7P1ibxEJriOyNhGpjgkEzmZFI5ONuNxOOc8D8c9DRQBhaZ4R0fSbG/sraCRra/d5LmKaZpBIz/eJ3E9e9XNF0Sz0DT0sLDzxbRgCNJZmk2D0BYkge1aNFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXI+Hf+Sg+M/8ArpZ/+iBXXZx1qjaaXZ2mpX+owKftF+Y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che_266	OPEN	"The synthetic route of Olaparib J, a polyadenylate ribose polymerase inhibitor, is as follows: <image_1>known: i. <image_2>ii. <image_3>The following statement is correct is______.
a. An isomer of A can undergo both silver mirror reaction and color reaction in FeCl_3 solution
b. H can react with NaHCO_3 solution
c. The process from H→I may produce a by-product containing seven six-membered rings in the molecule
d. The process I→J utilizes the basicity of 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'che_266_2.jpg', 'che_266_3.jpg']
che_267	OPEN	"Cyproprotricid is a broad-spectrum insecticide. The following partial conditions of the synthetic route are omitted): <image_1>Known: <image_2>The following statement about E is correct is______(fill in the serial number).
a. Contains 3 oxygen-containing functional groups
b. is cis-structure
c. 1 mol of E can react with up to 2 mol of NaOH
d. It can discolor acidic KMnO_4 solution"		ad	che	有机化学基础	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEyAz8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKa77EZiCcDOB1oAdRWInizSX8MN4jWWX+zFQyGXymztBIJ24z2ParcmtWcb2seZGnulLwwqhLlQMkkdgMjk4HIHU0AaFFU7HVLXUJLiKFyJ7dgs0Lja8ZIyMg9iOh6GrlABRRVK41W1t72Oyy0t26GQQxLuYKONx7AZ4yaALtFU7DU7TUlm+zS7ngkMU0bDDxuOzA8jgg+4INXKACiiigAooooAKKKKACiiigAqjLq9lFevZ+Y0lzGgeSKGNpGRTnBbaDjODjPXBq9XF+CPMt9b8W2182L5tUacburQMi+UR/s4BHsQaAOrsb+11K1FzZzLLESV3DsQcEEdQQQQQelWa4fwm8sGqeMtSijkl0177fbJEMmR0iAlKDvlhj3INb2geKtI8SxO2n3P76M4mtpVMc0R9GQ8j+VAG1XNXmtXNz42h8N2cnkBLM3t1OFBYKW2Iq5yMk5JJB4HvVnxH4q0/wANQR+f5lxeTnZbWVuu+advRV/qeBVOTR7x/ENj4ptYFivGsvst5ZTPyUJDgBhkblbPscnkUAOt9aubLxt/wjl5KbhLizN3azsoVhtYK6NjAPUEEAdxXTVzkWi3U3iSXxHdRxi6itDa2dsJMhQTuYu2OpIUcZAA75qHQfGcOoXx0jVrV9J1xBk2k7cSj+9E/Rx9OfagDqaKq3upWOnQmW+vLe2jHV5pAgH4muXl+JmhSytDpEV/rc4ONmm2rSD/AL7OFx75oA7KoDe2ouham5hFwRkRbxux9Otcze+INaPgfW9TfSH0y/treV7eF5UlY4TKsQvA5zx7VBBptjL8KEVsBX0wXDXGfn8wx7jLu67t3zZ9aAO0orE8HX15qXgzRr3UARdz2cUkuRglio5x79fxrboAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKoatq9totolzdCQxtKkI8tcnc7BV/MkCkfWLePWYtKZJRcyQNcD5fl2KQCSc9iw/OgDQorEPinThZDUD539nF9gvdn7r723PXO3P8WMd845rbByMigAooooAKKzH1y2+1XNtbxzXUtrgXAgUN5RIyAckZOOcDJ5HqKtWF/banYw3tnKJbeZdyOO4/ofagCzRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFNk/1bfSnU10SRGR1DIwwVYZBFAHkUC3J/Z3ncXMXk/wBnz/J5XONzd939K6LSVe2+KEk11xFeaLAlm7dGKMS6A+vIOPTmuwGj6YLE2Q060FoTkwCFdhP+7jFSSafZS2yW0lpA0EeNkZjBVcdMDtQBycALfFjUtRicLYW2kJBdyZ+XzfMLqD7qmSfQMK6yx1Cz1OzS7sbqG5t3GVlicMp/EU+C1t7WAQW8EcUQz8iKAOevArzjx94ItNP8PavrWg3d1o8yQtNcQWchSG5C8kMoIwT0yuD9aAOtbxlpLeIotDtHlvb1jiYWsZkS3HPMjDhemMdfasrRUktPil4lF5lTeW9tJZlv440Uhgv0Y8j3HrWL4d8L6xrOi2sUkcXhjQXRXFhprf6RcZA5kl6gHrgc88mvRZdOs54IoZ7eOZIgNnmjeRgYzk8596AOX0GN5fiT4mvbfIsfJtreRgPlkuFDFsepVSoP5dq7Ko4IIbaFYbeJIokGFRFCgfQCpKACiiigAooooAKKKKACiiigAqpd6ZY37K13ZwTMoIVpEBIB6jPp7VbooAydZ0CHVtJWwiubnT/KZXglsZPKaJh0xjgj2IxXlPjy08QaLpc99qOl/wBoX1rH/oPiLTCYp48H/lui9sZ6ZX6Zr2ymSxJNE8Uiho3UqykcEHqKAOV8GeGrGztYtdkvJdW1S+hV31K4HzshAIVR0RfYV1tcX8OZXs9O1Dw3cMTNol21ugY/MYG+eI/Tacf8BrtKACsnX/Dml+JLD7LqdsJFU7o5AdskTdmRhyp+la1c5481WXRvBOqXdsSLoxeTb7eplchEx75YUAeT+D/D2qajDcXtv4YsNZzeTLbazr12ZDJGrlVJT5iSMHnA/rXoi+D/ABJfqo1TxdNaw4/49dGt1tkX2DnLfyrpfD2lponh3TtMjAC2tukRx3IAyfxOTWlQBiaF4T0jw6bhrCGUzXIAnmnneV5cZxuLE+p/OkHhTT1sjpwe4GlnINh5n7rBOdvTdt/2c47YxxWtcXltaBTc3EMIb7vmOFz+dQf2zpf/AEErP/v+v+NAFxVVFCqAFAwAO1LVL+2dL/6CVn/3/X/Gj+2dL/6CVn/3/X/GgC7RVL+2dL/6CVn/AN/1/wAaP7Z0v/oJWf8A3/X/ABoAu0VS/tnS/wDoJWf/AH/X/Gj+2dL/AOglZ/8Af9f8aALtFUv7Z0v/AKCVn/3/AF/xo/tnS/8AoJWf/f8AX/GgC7RVL+2dL/6CVn/3/X/Gj+2dL/6CVn/3/X/GgC7RVL+2dL/6CVn/AN/1/wAato6SIrxsrIwyGU5BFADqKKKACiiigAooooAKKKKAOW+IEUk/huOKISlzf2hzEm5lAnQlsYPQAn8KztR0u5n8Ym3W+u5ftGh3UC3EiLiN3ePbgqoGeCce1d1RQBwBM0nwq/4R/wCxSjVTp/8AZv2UoeJNnl7s9Nmfm3dMVujxHpWg3lh4f1K8aG6NugjnnQrHMQMEBz8u7jOM966KqmpaXY6xZPZajaQ3Vs/3o5VDA/8A1/egCW5u7eytnubqeOCCMbnkkYKqj1JNczpnjeLW9S/4l1jK2ixgiXVrgiGIt0URhuXye/A+tcF4n8Ky+H/Ffh+ys47nxBY3ZmW10fULljDbui5DZJ5UA9GBwAcc4rs7HwNNqM8N94uvF1GWIgw6fCClnb46YT+Mj1b8qAJfDit4dv8AxJDqKOguNRkvoJQhYTRuq4Ax1YFSNvXp6irvgjTLrTPD7i7RopLm7nuhC3WJZJGZVPvgjPvmuk6UUAFFFFABRRRQAUUUUAFFFFAATgZNVoNQs7qQx293BK4G7akgY49eK574ivcR+C7poCwj82EXJXqLfzF838Nm7PtmoPF6rHJ4WNhhbkarCsIi7wkHzRx/D5YJPbgUAdjRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUV5tb2mueI/Gnie2j8Valp9tp9xFHDDbpGQA0YY/eUnqa1P+EJ1z/ofdb/79wf8AxFAHa0VxX/CE65/0Put/9+4P/iKP+EJ1z/ofdb/79wf/ABFAHa0VxX/CE65/0Put/wDfuD/4ij/hCdc/6H3W/wDv3B/8RQB2tFcV/wAITrn/AEPut/8AfuD/AOIo/wCEJ1z/AKH3W/8Av3B/8RQB2tFcV/whOuf9D7rf/fuD/wCIo/4QnXP+h91v/v3B/wDEUAdrRXFf8ITrn/Q+65/37g/+Io/4QnXP+h91z/v3B/8AEUAdrRXm+oWGu+Gdf8OM3izU7+G91EW00FwkQUqY3b+FQeqivSKACiiigAooooAKKKKACiiigAooooAKKKKACub+IP8AyT3X/wDrxl/9BNdJXE/ErXdPtvC2oaMZjLql/bPDbWcCmSWRiDg7Vyce/SgDp9E/5AGnf9esX/oIq/XO+DvEOl63odtFZXStcW0KRXFu4KSxMoAIZDyOa6KgAooqK5hWe3kicuFYYJRypH0I5FAEtFea6Nrmo2OjSaBr91LJcz2DXOm6hvKtcJs3FCw/5aJn1yRz61eur59P+I+kW7T372j6RLI0MRllDOHjAYquc8E8n1oA7yiuL8J6gbnxP4ueW5uvstvcQiJLpnURKYVZsK/3Rkk9P0rso5EljWSN1dGGVZTkEfWgDO8RX9xpfh3UdQtREZrW3knVZVJVtqlsHBHXFYEXivULb/hG5L6O0nj1sogW3VkeFmTfnBZtyjoTxjrW54otri98KataWsLTXFxaSxRopAyzIQOSQOprjk8K3ip4UfTNJ/s3ULFoRfXYaNAYguJIztJL7j7e+aAOysvEui6jqDWFnqVvcXSbt0cbbiNpAb8ia1a5Hw9pN9aadrsVwZdNe51S4uY51MZbynYEMOoBwO449K2PDovl0hRf3ElxJ5j+XLKoV3i3HYWAAGduOw+goA1qKKpzavptvdG1mv7aO4CeYYnlUMF9cZzj3oAuUVHBcQ3UCz280c0TjKvGwZT9CKkoA4jVCvh/4n6bqRO211u3NhMegWZMvGx+o3r+VS3fiLxZHeTx23h7THt1kZYpZNWVS6g8MV2nGRziuh1nQtM8Q2Is9Ws47q3DiQI+eGHQgjnuaw1+GHgpenh60P8Avbj/ADNAFFvEnjLHOmeG4v8ArpqxP8kqHWbs+I/E3hLRxLbSSQynU79baXeieUuFGe4MjDGfStlfhx4MTp4a04/WEH+dael+GdD0OV5dK0iyspHXazwQqhI64JAoA1aKKKAOC+INhaan4j8GWl9bRXFvJqEgeKVQysPJY4IP0FbH/CvfB3/QsaV/4Cr/AIVn+M/+Rv8ABH/YRk/9EtXa0Ac1/wAK98Hf9CxpX/gKv+FH/CvfB3/QsaV/4Cr/AIV0tFAHNf8ACvfB3/QsaV/4Cr/hR/wr3wd/0LGlf+Aq/wCFdLRQBwR0X4cC6vLYeHrBpbIgXIXTGYRZGRuITA45+laVp4I8C39rHdWmgaNPbyDckkdujKw9iKr+GCB498bkkAC4tc5/64LTPhuuYPEE1uCNNm1id7P+6U+XcV/2SwbFAGj/AMK98Hf9CxpX/gKv+FH/AAr3wd/0LGlf+Aq/4V0tFAHNf8K98Hf9CxpX/gKv+FH/AAr3wd/0LGlf+Aq/4V0tFAHEeIfAXhK38N6pND4c0xJY7SVkdbZQVIQkEcVreA/+RA0D/rwh/wDQRVzxN/yKmsf9eU3/AKAap+A/+RA0D/rwh/8AQRQBt3V1DZWk11cSCOCFDJI56KoGSfyrHh1zULnS7bU4NILW1wyFY2mxKsbEfOVxjgHJXOce/FXdf0sa54e1HSmkMYvLeSDeP4dykZ/WqWhXOrR6VaWd9pLxXcKLHLIJUMLY4LKQd2COQCB6e9AFePxY76V4hvjYAf2NLLGyednzfLUMSDt4yDW3pd6dR0m0vmjEX2iFZdgbdtDAHGcD1rih4XvZdG8YpLZTi51Ce4e0UXO0OHjCrkBsDkc5rTEd/pmn+G1druIJ5NrdRIY2Rfk2/MOpyxXkHjr65ALsXiSW+0+71LTrEXNjbu6h/N2tPsJDlBgg8ggZIyR2GDSWfiuHUdZ060solmtb+xa9iud+PkBUY246/MO/rVHQdM1Lw34ZuNEismuWieYWkyuoR1diy78nKkbsHg9MjPSs/SPBk+laroFs8cs1lp+lPayXMcvl5kZ1boGDY4P6UAdRoWtPrL6krWwg+xXj2hxJu3lQDnoMD5hWvXNeENLutK/tpLi2eFLjUpbiHfIHLRsFAOck9j1rbbUrFL4WTXlut2QGEBkAcg99vXFAFqiiigAooooA4vxN/wAlI8Ef717/AOia7SuC8V6lYwfE3wXHLeW8bo13vVpACu6LC5HbJ4HrXe0AFFFFAHIm5ki+Jl3A0t49v/ZUUqwo7siuZHUttBwDhRU/gWWWfRruWae4lb+0buMGeVnZVSd1VfmJxhQBWLqN7NoPxSfUL2SQ6Zc2MFs0yhQtszSSbN/GdpIPzZGCQDxW/wCEdOfTLXUbc3clyhv5pFMiqCC7b26AZ+ZiaAOiooooAKKhurq3srZ7m6njggjGXkkYKqj3Jrkbrx1JFIupWNlHq/hooA95psvmzQv33x9SvTpyPSgDtKKoaRrOm67YJe6XeRXVu/R42zg+hHUH2PNX6AIrl1jtZndA6KhJU9xjpXJ6B4g0q8udB+yaQls+rWEl3GyhcxKuzKcDvvHT0rqb/wD5B11/1yf+RryXwDq+n6hq3gi1tL2Ceez0S4juI43BMTHyeGHb/wCsfSgD2KiiigAooqsmoWUt9LYJdwvdxoHkgWQF0U9CR1AoAxr/AFOVNFu9bdrhrGKNpI4LXaHeNcneWbHUDIAI49avF7iwlgkMzz2krLGwkxuiLcKQRjIyQDnJ5z61kX0Zi8H3fh/KLdC0a0g81wiyKVKowJ9sZxyDnjpWi92NRW1tLUB23pJOysGWJUYNgkZBJIAxnuT2oA1/OiHWRP8AvoU37TAJEj86Pe+dq7hlseg7037Hbf8APvF/3wKVbS2V1dbeIOvRggyKAMO81m5nttQhgmtNPmjdo4ZbmcAgj+MoQeM578j0zVq11p7nVo7GNbOUeUZZXiutxQZAHy7ecnP0xXPeKHvprHX7mKG7nspLT7LDHEhf94MlpAg5IJYLkf3fTmtnSNYsLrUHih1l7uWRBi3MQXy8dTwoIzkZyewoAq6/q95p94mom8Sy0a0yk7yw7/NduAcAg7VIxx1LegrQ8M3up6lp8l9qBgEc8ha1SOMqVi6Luyx+Y9cds4rmfFJTy9TmUqtqLSWIXc5y3nMuFjiLA5yTgkEckAZIOLui6Jp2neLZ1aykhvJIfNiZFCwOoOCw2gDfyMg8+nc0ATHxDcy6/ei0lE1tDcQ2CW4jJ3S/flfdjnCcYB6qc1oeG9UuL+0P2hJ3f7Rcr5rIFVVSVlVeO+AO3Y5pmm2MX9raqkZeIQzoq7Djgwx/4VF4Rtg2lmbz5zsvbvCl/lP76QcjvQBm+EP+R78c/wDX5b/+iFrt64jwh/yPfjn/AK/Lf/0QtdvQAUUUUAFRzbvIk2MVbacMBnBqSmTbvIfapZtpwoPWgDjfCWt6lr3h7RtRl1S3F5dHfNbeWuGQMQwXHIOMHJz+tdrXL+BtAl0TwnpllqFrEl/aIyFlIbqT0I7YxXUUAFFFFABRRRQBxvjn/kMeDv8AsNL/AOipK7KuN8c/8hjwd/2Gl/8ARUldlQAUUUUAFFFFABRRRQAUUUUAFFFFABVDV9a03QbBr3VLyG1t143yNjJ9AO59hV+uH8axpL4w8FJIiuv26U7WGRkQsR+tADP7T8U+Mvk0eGTQNHbg393Hm5mX/plGfug/3m9eBW3ovg/TPD9vOdPVvt86kS6hOfNnkY/xMx6/Tp7UzwRrV3r/AIbF9e+X532meL5FwMJIyjj6AV0dAHkWvafeafcpc+K7WXfDxD4p0VSk0QH/AD3jHbHXqvsK2dO8Z6no1nHPrflaxojj93rumLuUL6zRjJX3K5HsK9EIBBBGQa5218F6Vp2vnV9N86xaQH7RbW77befIxlo+me+Rg0AUb74i6RmO20Hdr2ozLujtbAhsD+879EHufyrb0b+3JdJLa0LKG/diQlsGdI17AkkbiO54rnfhtbQW8HiPyYY4/wDie3S/IoHAIwOOwrt6AOb1Pwhbaz4Tg0TUJt0luiCG6iTY0bqMB15OD+PcipW8Oynxfaa6L1AttZvaeR5P3gzKxO7d1yo7Vv0UAcm+jW2i3HiDVtVuI7u01KWKV7f7OflKKqKPvHdnaOoH5Vj6L4t0bw7ZSafb6brMyefLLutNMkaFS7FiqEDG0Zx+FeiUUAcZ/wALK03/AKA3iL/wVS/4Uf8ACytN/wCgN4i/8FUv+FdnRQB4d8TfihcWtnavptlfrayt5dxbalYyQI+PmBVxtbPHIz+HWq/hH49aakaWN34dvY5HbO60lNwXY98P836mvWvEHgzQ/FVzay61atdra5MULyMIwT1JUEZPA65rR07RdK0hNmm6baWi4xiCFU/kKAF0vU4dXsUu4YbmJG/guYGicfgwFcldtdp8XybOGCWT+wOk0pQf6/1Ct/Ku6rIuvDOm3mrnVZFuVvTD5HmxXcsZ8vOduFYDGefrQBznw6uBbaTr0M6OL211O4e7hjXKI7YfbFjquCMdDkngVP8A8LK03/oDeIv/AAVS/wCFdPpulWOj2pt7C3WGNnMjYJJdj1ZieWJ9TzVygDjP+Flab/0BvEX/AIKpf8KP+Flab/0BvEX/AIKpf8K7OigDjP8AhZWm/wDQG8Rf+CqX/Cj/AIWVpv8A0BvEX/gql/wrs6KAPEfHvxi1LQbuyutFtLpbeUMktvqmnvEuRyCjcHPPI57U/wAO/tDWepSx22oeH71LhzgfYv3+4+y8H+dela74I0HxNqNte61Zm9a2XbDFLI3lrk8nYDgk8dc9K1bDSNN0qPy9PsLW0T+7BEqD9BQBxniK/i1PxF4Fuoo7iNH1GT5biFonH7luqsAa7W61GysnVLm6iidgWVWbBIHU49B61ynjP/kb/BH/AGEZP/RLVN4ZmUeLvFUd8yrqH2qMoG6m18tfL2+2fMz75oA6m2ure9t0uLWeOeF/uyRsGVvoRRdXdvZWz3F1PHBAgy8kjBVUepJ6VRS6tNOksLS1hXyLyeRFMZ+VWw8h49DtasTxfqS3ng/xfaiMo1layRsScht0QcEfgwoA6N9W06M2we9t1N1/x7gyAeb3+X1/Cpbu8trC2e5u544IEGWklYKq/UnpXC6kbr+1vAXn+Ts+0nb5ZOf+PZ/WrPizVb278IeJ7S60xrMR6ZNIrtMr7gVYDIHToaANm3sfC+qXN29vFp11NPhrnYVcyDGBvHcY9a2JJLXTrPfI8VtbQqBliERB0HsBXC3DXkHxC0NryaCV59PuIrd7NNjRYCszSAlty8ADnAPY5qgt5f3Unw/1PV7957S8cy3G5FSJJzB+6HygfxE4znnGKAO/bX9ISKeR9StlWAAy7pAPLB6EjtntVmG/tLm4nt4LmKSeDHmxq4LR56bh2zXO+OktT4T1qZdhufsLKWHXbngH8c4/GquuaTdtr8mu6Nj+1rG2iHlFsLdREuWib3OMqexH1oA6kapYG2luBeQeRCxSSTzBtRgcEE9jnin219a3u/7NPHL5Z2uFbJU9cEdq80tdQOpX3hK/2Sx6ZNrF80qSqV2SnzPLDjsQ2R9cV0OqXBtPiLbXcBPkwaVO+o7OfkDAx598h8e26gDd8Tf8iprH/XlN/wCgGub0Gy1u9+HPhpdE1eHTZVs4jI8tqJw42DjBYYrSudV/tr4f6nfiONElsp9gjmEgICEdRx+Hasrw7JKPBfhNEFzGVtIJI5onwjNhV8uQdwQ2eh6HoQKAJ/7B8ff9DrZf+Cdf/jlH9g+Pv+h1sv8AwTr/APHKqwanqLanq2oPqdiHgt0tI9sLSI0qE+ZtAbJId1Xpk46Vtz63fWfinRtGla2dLy0lmlmMZQ7o9gOBnjO/v0x3oAzv7B8ff9DrZf8AgnX/AOOVWPhLxm179sPi3TTc4A806Ku7AzjnzPc/ma6Dw/rN1quoa1BOIBHYXf2ZDGDlxsVsnJP97H4VW1rxHLZeJLbRluLWxa4g82Ge8jZknfcR5SkMuGAAJ5P3hgUAUf7B8ff9DrZf+Cdf/jlH9g+Pv+h1sv8AwTr/APHK0U1zUbrVbfRYY7eHUFsUu72V1LpCWO0IFBBJJDd+AvfNWdF1uW91PU9JvERb7Tmj3tGCElR1yrqDkjowIycEdTQBi/2D4+/6HWy/8E6//HK8q+KngzxtresaZbLI2u3MUbEzW1gLdYgSMAvuIPQnGePxr6KrzLW/GWrR+Jp9W05TJ4a0OUWuoheTMz/6xl9fK+XP1agDmfB/gH4sad5Jm8Vrp8AxmCWQ3W0em0/L+Rr2uxiuobOOO9uUubgD55Ui8sMf93Jx+dSxSxzRJLE6vG4DKynIIPQg0+gDP1jXNM0Cxa91W9itbccbpGxuPoB1J9hXKf2h4p8ZHbpcMnh7R24N7cx/6VMv/TOM8ID/AHm59qqeI2ij+Jkl5NbQ3Laf4cmu4EmXcqyLL94eh7ZHNdp4e1GTWPDWl6nKipJd2kU7qnRSyhiB7c0Aclqvgmx0fQHTTPDdtrsk0ga/+2y5uLlcHJDsPv5wRyB6YrF0DV9RsGePwxeTanb24/0jw9qreXe2oHaN26j0ByOmDzXrNYXiDwjpHiQI95C0V3Ecw3tu3lzxH/Zcc/h0oAh0fxxoerwz/wCk/Yrq1UtdWl7+6lgA6llPb3HFQaZ4z/4SDWI4ND02a70tSRPqjny4eAeI8jMhzxxx71zfjXw9Cll4Sj1YxareDWre3kvJ7dA8sRLHa2ByMAZ9cZr0yOKOGJYokVI1GFVRgAegFAGVNo/23VNQa9igmsLu0jtmiYkkhS5ORjGDv/SqemaLqPhzw1c2Wn3C312ru1s145AIJ+VXYDJwOM98V0dFAHJ6R45tbi+TSdctZNF1huFtrojZMfWKTo4/X2pmp+O4mvZNK8NWja3qqna6wNiC3PrLL0XvwMniqHxN0+11R/C1lewrLbzaxGkiHjIKPnkc074UWkFj4f1W2toljhi1m7jRB2UPgD8hQBPa+B7jV7lL/wAZ3w1SdTujsIwVs4D7J/GfdvyqxqvgO0lvG1TQbl9D1Y9Z7VR5c3tLH91x+R9662igDxy/ik0jVftOsI3hbWXOBrmnLvsLs9hMh4BP+1/31XZS+NodG02zttSlh1LXpk3LZ6QpkabPRlHZcYOScV1s8EN1A8E8SSxONro6hlYehB61m6L4Y0Tw6Jf7I0y3tDKxZ2jTBPtnrj0HQUAc0PD3iHxefM8U3J07TG6aPYy8uPSaUcn3VcD3rS1D4e+HLy0t4rexXTp7UYtbqx/cywf7rDr1PByDk11NFAHL6Q/iHQxdx+IryzvNLtoTLHqQ/dy4HUSJjGcc7ge3SrD+KUt9LtdWu7KW3024ZAJXI3RhzhWdf4QSR3OM896ueI9JOu+GtT0kSeWby2khD/3SykA1z+sWepeIfBKaDJYSW97dJHDcs2PLhAI3sG/i4B2455Gcc4ALGtWPirW9Uksbe8i0fRVA3XUB33U/HIXIxGO2eTxWroHhjSfDVs8WmWqxtIczTMd0szf3nc8sev51rKNqgelLQByerat4viv54LHwjaXtkDiOaTVFjMg9ShQ4/Oqo17x6oAHgayAHYayv/wAbrtqp6jdvbRRpAFa5nfyoQw+XdgnJ9gAT+GKAOW/t/wAff9CPZf8Ag6X/AON0f2/4+/6Eey/8HS//ABurEmrmNRcvc3j24vBYNcI6qVlL+XnyyuNu84zye/TmugsLiZ3mtbrBuIMZdRgSKejAduhGPUHtigDl/wC3/Hv/AEI9l/4Ol/8AjdH9vePf+hHsv/Byv/xut+LXY5vEF5o62dz59rAk7SHZsZXLBQPmzn5W6gdKXw9rsHiPSv7Qtre4giMskQWcKGyjlG+6SMZU96AOeOvePSMHwNZH/uMr/wDG6X+3/Hv/AEI9l/4Ol/8Ajdb766smo3VhYW0l5PaAG42MqrGSMhMk8sRzjp6kVZ0rVbbWLIXVqW27mjdHGGjdThlYdiCCKAPBviz4q8ZaXdaVd/Y20C9k3qPsep+f56jH3kCgcE9ffFXfB/jn4uXYiSTwz/aMBx++uIfsxI9d3C/pXuTWVo92LtraFrkLtExQbwPTPXFT0AeV6Lr1xolx8RNc1CySK5tnhle2SXeAwgGF3YGecc4ruLaz1hrW0uJNWY3BKPPD5SeURkblX5dw4zgkmuZ0TTbbWPE/xC028QvbXM8MUgBwcGADiun0nTdZsY4rW71WG5toAFR1tikzgdN7biM+pAGfagDZaSNVZmdQq/eJPT61zOravcWfjjR7L7Y0djc2txLJGI1bcyFNvOCR98/pTIzbW0WvNd2LzRPqGUiNszhyY4xnAByMg847GmaT4ZaO70DULe+/cadZyWwiktmVn3lcnkgqBsGAQeKAJvDWsTXt74ga7vjJbWl/5EBkVUCp5aNzwOcuevtUOr6tcR+MNOsotUmhsLmxnnbyIkk+ZGjAwdrHHzHP4VMnh4adFrt1epDqiXlwb1LX7N0cRqoXkkH7o5wOTTE8KXdrqOlXmn3tpbCwsntRC9qXDbyhZsh17oO3c0AV9F8aNLoNndXcE15Jd3c9tbNaRjMoTeVLKT8jFUPB6HrirGiareeKrjVJorm40+1s7prSOJEQuWUDcXLBh1OAB6d802y8FyWM1rcRagrTjU5NSumaDiWR42jIUBvkGG469O9WYvD19peq3t1ot/bwW9/L589tcW5kAlIALoQ6kZwMg559KAKzz6xDrkGn3GpvubSp5XaONADIkkYDgFe4Y8dOaz7HxRqUujtp+pSi1163MDF41XbcwvIq+agYHghsH0b8K6C40K6l1mPUEvk+SxltdskJYkuysWyGH90cY/GoNS8Iw6tYaUl1MFvtOeJ47qFNpO0gsuMn5WA5GfQ9qAIdI1K88S3ermG9ls7ewvGsoxEiFnZFXczblPc8AY4H5W/CevvruiNc3SJFcQXEtrNt+6XjcqSPY4Bx74pYdBuNMvtQn0i6hhS/k86WOaIuEmIALrhh1AGV9e4rC1nw9d6XotlYaTafabaK8huJGMxEkkxuFZmYBTkdT6DPT5RQBZ8c/wDIY8Hf9hpf/RUldlXGeN8/2t4Nzwf7ZX/0TJXZ0AFFFFABRRRQAUUUUAFFFFABRRRQAVxPjL/kc/BP/X9N/wCiWrtWYKpZiABySe1eW+KfFen3/inQ7vTIrvUrPRbmSW/ubKBpY4gyFMbhwxGckDOBQBv/AAt/5Epf+v26/wDRz12lc74Kh0eDw4iaHqC31k0skolDAnc7FiDjpgnoea6KgAorL1zxDpXhyy+1areR28Z4QHlpD6Ko5Y+wFcqfHF/FPHquqwQaH4fGQiXuTeXbY42Rr93ntyT6c0AXPh5/qPEf/Yfu/wCa12Vch8O4LpNJ1O7ubOe0F/qlxdwxzrtfy3I2ll7Hjoa6+gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDivGf/ACN/gj/sIyf+iWrqrvStO1CRJL2wtbl4/uNNCrlfpkcVznjXRda1K70K/wBDFm9zpt005S7dlRgUK/wgnvVf7V8S/wDoHeGv/Aib/CgDp7zTjc3mmzI6xpZymTZt+9mNkx7fez+FQwaJELvVZLoRXMN/KkhhkjBC7UVMHOc/dzXPfaviX/0DvDX/AIETf4UfaviX/wBA7w1/4ETf4UAdY2mWDmAtZWx+z/6nMS/u/wDd44/Cov7JtpXvDdxx3K3TgskqBlChQAuD26n6sa5j7V8S/wDoHeGv/Aib/Cj7V8S/+gd4a/8AAib/AAoA6uHS9Ptw4hsbaPeu1tkSjcPQ4HIpf7NsTY/YfsVv9kxjyPKXy8em3GK5P7V8S/8AoHeGv/Aib/Cj7V8S/wDoHeGv/Aib/CgDqk0jTYrNrOPT7VbVvvQrCoQ/VcYqaKztoJWlit4Y5GAVnRACQOgJrj/tXxL/AOgd4a/8CJv8KPtXxL/6B3hr/wACJv8ACgDsHtLaSB4Ht4mhckvGUBViTkkjvzUcdjFZ20kenQ29qzcjbEAufUgYz+dcn9q+Jf8A0DvDX/gRN/hR9q+Jf/QO8Nf+BE3+FAGtq9hHYeEte2Y3z2880m0YBYoQcDt0FYHh3Tby/wDDfgh4pJVtIbMPOUcAKfK2qcdc/MenTr6UagvxJ1HTbqyew8NolxE8TMtxNkBgRn7vvXVeGNNm0fwvpem3DI01rbRxOUOVJUAHFAGFH4bvgt2lnFDp8lrdmfTpyd+7KqCGUfwEAg8578EA1Yu9D1C/8W6Jqt3BZvDaWk8Nwocn55ChyoK8gbD1x1rqqKAOLtdITRl1+XV2htrK/vhNAsFyYyQUVApI24JK54OKkk0m81TSYrK7gsNa0x7GOMmafLeeu4M27acj7vzZyCM117KrjDKCPcUAADAGB6CgDkNJ8LX+gXVhfQXK3s6aeljdrKxUyBCWR1bnkbmGD1B68crJpuoac+rau0TyX+plEcWrA/ZoY0IUAtjJySc8ct7V19FAHAnVvE8ngi3i0bTDcXsukxNDM84DiUgAlg3HQ7gdxJxyKqaI/iDRfDMOhp4AuZbdYikpfUbcmYt99m+bqxJP416SBgYFFAHGfDe113TNEm0vWNNks4LWUrYeZOkreQeVRipPK9M8cYrs6Ko6trOnaFYve6peQ2tuvV5Wxk+g9T7CgDhPFX/I96r/ANilcf8Aoyur8D/8i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'che_267_2.jpg']
che_268	OPEN	Abscisic acid is a hormone that inhibits plant growth. The synthetic route of its derivative I is as follows<image_1>. i. <image_2>ii. <image_3>Based on the principle of the above synthetic route, using the raw materials, the following route is designed <image_4>to synthesize the organic compound N. The simple structural formula is shown in the figure<image_5>, and c is 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'che_268_2.jpg', 'che_268_3.jpg', 'che_268_4.jpg', 'che_268_5.jpg']
che_269	OPEN	Compound K has antihypertensive activity and its synthetic route is as follows<image_1>. It is known that <image_2>D can also be prepared from m-nitrotoluene by electrolysis, and the transformation relationship of the main substances is as follows<image_3>. It is known that the definition of electrolysis efficiency η is: η(P) = \frac{n(\text{electrons used to generate P})}{n(\text{electrons passing through the electrode})} \times 100\% If Ce(OH)_3^+ produced by electrolysis completely converts m-nitrotoluene to D through two-step oxidation, when the electrode passes through 1mole^-to generate amol D, η(D) =()		4a \times 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che_270	MCQ	Deuterated drugs are a research hotspot in the field of medicine in recent years. They refer to drugs obtained by replacing a deuterium atom (D) with a common hydrogen atom (H) at a specific site on a drug molecule. The synthetic route of a deuterated drug Q for treating tardive dyskinesia is as follows (some reagents and reaction conditions are omitted)<image_1>. Data: Isotopes affect bond energy. Generally, the larger the mass number of the isotope, the greater the bond energy. The following statement is incorrect:	['A. A can form intramolecular hydrogen bonds', 'B. J and CH_3OH are homologous to each other', 'C. Chiral carbon atom exists in M', 'D. One of the characteristics of deuterated drugs is enhanced molecular stability']	BC	che	有机化学基础	['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che_271	OPEN	Claritane is an important desensitization drug that can be used to treat various allergic diseases such as allergic rhinitis and urticaria. The synthetic route for the precursor K of Claritane is as follows: <image_1>known: i. <image_2>ii. <image_3>During the process of I→J, SeO_2 is transformed into compounds containing +2-valent Se. The ratio of SeO_2 and I in the reaction is 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che_272	OPEN	Benagliflozin is a new oral hypoglycemic drug used to treat patients with type 2 diabetes. The synthesis route of its precursor is: <image_1>known: i. <image_2>ii.- TMS means <image_3>that the further synthesis of beniglizing is carried out using K (glucose) as raw material. The synthetic route is as follows: <image_4>The purpose of the N→P step is 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'che_272_2.jpg', 'che_272_3.jpg', 'che_272_4.jpg']
che_273	OPEN	"The industrial process for preparing calcium carbonate from dolomite (the main components are calcium carbonate and magnesium carbonate) is as follows<image_1>. It is known that at room temperature,$\text{Mg(OH)}_2$:$K_{sp} = 5.6 \times 10^{-12}$;$\text{Ca(OH)}_2$:$K_{sp} = 4.7 \times 10^{-6}$.
The recyclable substance in this industrial process is ( )."		\[ \text{NH}_3、\text{CO}_2、\text{NH}_4\text{Cl} \]	che	常见无机物及其应用	['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che_274	OPEN	"""Arsenic in drinking water can cause arsenic poisoning, and arsenic-containing toxic wastes generated during metal smelting need to be treated and detected. Arsenic in smelting wastewater mainly exists in the form of arsenous acid \(H_3AsO_3\). Acidic high-concentration arsenic-containing wastewater can be treated by chemical precipitation, and its technological process is shown in <image_1>. It is known that:
① There is a reaction between \(\text{As}_2\text{S}_3\) and excess \(\text{S}^{2-}\): \(\text{As}_2\text{S}_3(s) + 3\text{S}^{2-}(aq) \rightleftharpoons 2\text{AsS}_3^{3-}(aq)\);
② The solubility of arsenous acid \(H_3AsO_3\) salts is greater than that of the corresponding arsenic acid \(H_3AsO_4\) salts.

One method to determine the concentration of \(H_3AsO_3\) in a \(H_3AsO_3\) solution (containing a small amount of \(H_2SO_4\)) is as follows:
It is known that when titrating a weak acid solution with a standard NaOH solution, the weak acid generally requires \(K_a > 10^{-8}\).

i. Adjust pH: Take V mL of the test solution, add an appropriate amount of NaOH solution to it to adjust the pH, and neutralize \(H_2SO_4\).
ii. Oxidation: Add an appropriate amount of iodine water to the above solution to oxidize \(H_3AsO_3\) to \(H_3AsO_4\).
iii. Titration: Titrate the \(H_3AsO_4\) solution obtained in step ii with \(r\text{mol} \cdot \text{L}^{-1}\) standard NaOH solution to the end point, and consume \(V_1\text{mL}\) of standard NaOH solution.

Analyze Figure 1<image_2> and Figure 2<image_3>, and explain the reason why sodium hydroxide solution is not used to directly titrate arsenous acid: ( )"""		\(K_{a1} = \frac{c(H_2AsO_3^-)c(H^+)}{c(H_3AsO_3)} = 10^{-9} < 10^{-8}\)	che	常见无机物及其应用	['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che_275	OPEN	"Electroplating sludge (mainly composed of CuO, containing Fe_{2}O_{3}, etc.) is a waste generated during the treatment of electroplating wastewater. Its harmless treatment and resource recovery technology has always been a research hotspot. A technological route for the comprehensive recovery of iron is as follows: <image_1>

Information:
i. The extractant is prepared by dissolving N902 (which can be represented by HR) in kerosene. The reaction for extracting metal ions is as follows:
\[ M^{n+}(aq) + nHR(\text{org}) \rightleftharpoons MR_n + nH^+(\text{aq}) \] (M^{n+}⁺: Cu^{2+}, Fe^{3+}; org: organic phase; aq: aqueous phase)
ii. The distribution coefficient is commonly used to represent the ratio of the concentration of solute X in two solvents when extraction reaches equilibrium, and the extraction rate is commonly used to represent the ratio of the amount of substance of solute X in the organic phase to the initial total amount of substance. That is: Distribution coefficient = \[ \frac{c_{\text{org}}(X)}{c_{\text{aq}}(X)} \]; Extraction rate = \[ \frac{n_{\text{org}}(X)}{n_{\text{all}}(X)} \times 100\% \]

Experiments show that copper ions in the organic phase can be stripped by sulfuric acid. Different concentrations of sulfuric acid used will affect the copper stripping rate. After a sufficiently long time, the experimental results are shown in the figure <image_2>.

When the concentration of sulfuric acid is 2 mol·L^{-1}, under other unchanged conditions, only increasing the temperature, ( ) (""can"", ""cannot"", ""cannot be judged"") improve the stripping rate."		cannot be 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'che_275_2.jpg']
che_276	OPEN	Studying methods to extract Zn from zinc-containing resources is of great significance. \n\nI. Industrial acid leaching for zinc extraction \nZinc oxide ore contains ZnO, $\\text{Fe}_2\\text{O}_3$, FeO, PbO, $\\text{Al}_2\\text{O}_3$, CaO, $\\text{SiO}_2$, etc. <image_1> \n\nKnown conditions: \ni. The $K_{sp}$ values of several sparingly soluble electrolytes <image_2> \nii. The concentration of main metal cations in the leaching solution <image_3> \n\nBefore electrolysis, the concentration of both iron and aluminum ions in the $\\text{Zn}^{2+}$-containing solution must be less than $10^{-4} \\text{mol} \\cdot \\text{L}^{-1}$. The pH adjustment range should be (ignoring volume changes caused by ① and ②) ( ).		5.0~6.0	che	常见无机物及其应用	['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']	['che_276_1.jpg', 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che_277	OPEN	"The process for extracting silver from lead and silver slag (containing metal elements such as Pb, Ag, and Cu) is as follows:<image_1>
It is known that PbSO_4 is poorly soluble in water;Ag^+ can form [Ag(SO_3)_2]^{3-} with SO_4^{2-}.
Na_2SO_3 and formaldehyde were used for ""complex leaching"" and ""reduction and precipitation of silver"". During ""complex leaching"" of sodium sulfite, the relationship between the silver leaching rate and solution pH and leaching time is shown in the following figure <image_2>. The reason why the silver leaching rate decreases when the leaching time exceeds 4 hours is analyzed ()."		Sodium sulfite is both a complexing agent and a reducing agent for silver, reducing Ag^+ to 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'che_277_2.jpg']
che_278	OPEN	"The flow chart is as follows to produce pure copper from chalcopyrite (the main component is CuFeS ˇ, containing impurities such as SiO ˇ)<image_1>. The ore and excess (NH) ˇ SO are mixed in a certain proportion, taken the same mass, and roasted at different temperatures for the same time. The changes in ammonia absorption rate during the ""absorption"" process and copper leaching rate during the ""copper leaching"" process are measured as shown in the figure<image_2>; At 400℃ and 500℃, the main substances of copper and iron contained in solid B are as shown in the table<image_3>. The reason why the copper leaching rate increases significantly with the increase of roasting temperature below 425℃ is ()"		When the temperature is lower than 425℃, with the increase of calcination temperature, the\(SO_3\) produced by the decomposition of\(NH_4)_2SO_4\) increases, and the content of\(CuSO_4\) in soluble matter increases, so the copper leaching rate increases significantly.	che	常见无机物及其应用	['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', 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']	['che_278_1.jpg', 'che_278_2.jpg', 'che_278_3.jpg']
che_279	OPEN	The method for measuring the purity of $Co_2O_3$product is as follows: <image_1>It is known that $Co^{3+}$reacts with EDTA-2Na according to the amount of substance 1:1. If the volume of EDTA-2Na standard solution consumed when titrated to the end point is 20.00mL, the purity of $Co_2O_3$product is ( ). (The molar mass of $Co_2O_3$is $166 \, \text{g} \cdot \text{mol}^{-1}$)		\[ \frac{16.6a}{m} \times 100\% \]	che	常见无机物及其应用	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCABlAtMDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiuZXx3oj7vKXUpVViu+LTZ3UkHBwQmDyKAOmorm/8AhONJ/wCeGrf+Cq5/+Io/4TjSf+eGrf8Agquf/iKAOkorm/8AhONJ/wCeGrf+Cq5/+Io/4TjSf+eGrf8Agquf/iKAOkorm/8AhONJ/wCeGrf+Cq5/+Io/4TjSf+eGrf8Agquf/iKAOkorm/8AhONJ/wCeGrf+Cq5/+Io/4TjSf+eGrf8Agquf/iKAOkorm/8AhONJ/wCeGrf+Cq5/+Io/4TjSf+eGrf8Agquf/iKAOkorm/8AhONJ/wCeGrf+Cq5/+Io/4TjSf+eGrf8Agquf/iKAOkorm/8AhONJ/wCeGrf+Cq5/+IpY/G+jPPDCw1CIzSLEjT6fPGpZjgDcyADJoA6OiiigAooooAKKKKACiiigAooooAKKKKACiiigAopGYKpZiAoGST2rA/4Tvwh/0Neh/wDgxi/+KoA6Ciuf/wCE68If9DXof/gxi/8AiqP+E68If9DXof8A4MYv/iqAOgorn/8AhOvCH/Q16H/4MYv/AIqj/hOvCH/Q16H/AODGL/4qgDoKK5//AITrwh/0Neh/+DGL/wCKo/4Trwh/0Neh/wDgxi/+KoA6Ciuf/wCE68If9DXof/gxi/8AiqP+E68If9DXof8A4MYv/iqAOgorn/8AhOvCH/Q16H/4MYv/AIqj/hOvCH/Q16H/AODGL/4qgDoKK5//AITrwh/0Neh/+DGL/wCKo/4Trwh/0Neh/wDgxi/+KoA6Ciuf/wCE68If9DXof/gxi/8AiqP+E68If9DXof8A4MYv/iqAOgorn/8AhOvCH/Q16H/4MYv/AIqp7Pxd4a1G7jtLHxDpNzcyHCQwXsbu3GeFDZPANAGzRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAh6Guc8B/wDIo23/AF1m/wDRrV0Z6Guc8B/8ijbf9dZv/RrUAdJRVbUNQtNKsJ76+nSC1gQvJK5wFFYkni8RaW+qvouqDTljMvneUpYrjOfL3b8Y9qAOkoqO3mS5top4/uSoHXPoRmpKACis7WNcsdDhhe7dvMnkEUEMa7pJnP8ACq9zVI+KYLa/tbTVLO5017t/LtnuNpSR8ZC7lYgMewOM0Ab1FFIxwpIBOB0HegBaKoXt6I40g8z7NcXOUgZ9vL4yBzwT7e1VLTWLgxvYzwxza1b2qzT29u2Ey2QAGPAyVOMmgDaorK1zU59L8J6lqqQBbi1sZblYpDkBlQsFODzyOxqjq+ra5p/hy/1NLDTt1vaSXABunb7qFunljPT1H1oA6Oua8bf8gqw/7Cdp/wCjVrftJJZbKCSdESZ41Z1jYsoYjkAkAkfhWB42/wCQVYf9hO0/9GrQB0tFFcV4dFgNHea+e43z6vfQo3nSAM32uYKoAOOgA/CgDtaK5vwzbi21nxMqrMsf2+PZ5jM3H2aE8ZJ7k1BrcyXetaeUF75MKTCXyopF5O3b/Dz0NAHV0Vwmq20dzFaLb/2mCl7byPu80Dy1kUv0H90GtvVdctxodxff8TGG3iWQyukBjZAoJLHcAQO+RQB0FFedWGptF4Kjlhg1FL2ZIGa4nd2aaWRV+aNd3zZJPy5Ucdq3dBsbjR9VvDe3El8bxo/JvWVzI/DEo4A2qF6gjAO7GM9QDqKM1xNxqhg8S3Gn3PjBbZIEh2RzeQryTMWOCNoJQKF6YzuPIxWU+uyprU2st4k8PpDDAYVkSFs3GSCT5X2j5guOGznlsDBoA9Lorita1e60/QtOVr0X9zexyeVe237lDiMyK23JByB696xbTxBqI0i+IXddRyyRvNPdPlozdTRhEVVb5xtUA49+1AHp4IIyORRXNaV5tlqtlp0L21tbC0YmyUEjAxh42I55YhunUGuloAgvf+PC4/65N/I1zvhPQ9Ik8IaO76XZM7WURZmt0JJ2D2ror3/jwuP+uTfyNYeg6ha6V8PNN1C9mWG1t9OjklkboqhBmgDS/sDRv+gRYf8AgMn+FH9gaN/0CLD/AMBk/wAKyrHXdf1XT49TstDtRZzL5kMdxelJ5EPIO0RlVJHQFvqRWvouotq2kW989u9s8oO6Fzlo2BIKn3BBoAb/AGBo3/QIsP8AwGT/AAo/sDRv+gRYf+Ayf4Vo1S1XU4dJsvtEwZyzrHHGv3pHY4VR7kmgCP8AsDRv+gRYf+Ayf4Uf2Bo3/QIsP/AZP8KzLvxBfw61aaFbWlrPqs1s95L5kzRRRxhguAQrFjlgOgzgnjpUh8Tf2fpWp32v2q6amnf61hL5iOMAhkOASCTgZAOeMUAX/wCwNG/6BFh/4DJ/hR/YGjf9Aiw/8Bk/wrI/t/xD/ZX9rDw/b/ZNnm/Z/tp+0+X1zt2bN2Odu72zW1o+rWevaRa6pp8oltblA8bD07g+4OQR6igBn9gaN/0CLD/wGT/Cj+wNG/6BFh/4DJ/hTdU1b+yJ7eW6VRYTOsLTdPJkY4Ut/skkDPY/XjToAzv7A0b/AKBFh/4DJ/hR/YGjf9Aiw/8AAZP8KyNT1GSDXJjp7XEuoW0I36c8gSKZXzskLHO0AowyPQ5FUrLUrd7zTvtVzcPrMVu3lKhRHvolUB5Nn93dkqG56470AdJ/YGjf9Aiw/wDAZP8ACj+wNG/6BFh/4DJ/hWZaaujeFrjVNQvHuLR5JGLwQtG1vFuI2sB825MfMcdQeKbDePYxWuly3FzqcsszW6F0Te6Ly8j8YKqCqk92wOrYoA1f7A0b/oEWH/gMn+FYPiHS9PstY8Ky2tjawSHV9paKFVJH2afjIFQ+Gdctr6GwsYbrUrdpZ7ia2WSIv51ukhK5do8BCrIRg5AKjProeKv+Qn4U/wCwyP8A0mnoA6WormV4YGkRA+0EkFscD8KlqG8/48rj/rm38qAMW68Ryx6fZzw2g8y+t2lgBLuFO0MNwRS2ORnAPerEHiSylubK1K3Kz3eQgNrKEyF3H5mQDGB1rlNMj0fTLnwx5cdlFcvYsZFtbcecVMa8kLliM98Vf8Nu2qa1EGidU0G2ayZnJy07EZH1EaIc9/N9qAOhvfEeiadqEVhe6vY215Ljy4JrhVdsnAwCc8npVq+1Cz0y1a5vrqG2gUgGSZwignoMmuV8beG9IvNA1KBdItbnVNTDRQO6AyGVhgNuIyAv3vYLWTLFPb/FHwh4fnuHntdO0iSdXk6zTAeXvPqwAz7bj60Aeh2l3bX9rHdWdxFcW8gyksThlYexFTV5IfEup+G9T8aHT7aCS3h1i0CiUkAGcIH2gd8nd1HJ710n9t+KV8ZSeHHOkh7jTzfW84jkItwJAjIy7v3n3hggp0JwOlAHV6lqun6Pa/atSvIbS3yF82dwignoMnirMM0c8KSxMGjcZVh0I9a8p8Qa/d+JPgpqF3qEUMd5FfR204hB2Fo7tFyuSTg4FerQ/wCoj/3R/KgDL1HVLm017RrCGGN4r1phKzEgoETcCPx4/GpLnxFotmYvtOrWUImDGNpJ1VXCnBwScHB4rFvtA0e48Z6en9j2DBbaeaYm3T5iSgBPHJ+9Wf4TtoLW80GO3iSKM6bcPtRQBkyqSePrQB2enanY6vZreaddRXVsxKiWJgykg4Iz9RUM97Nb6zaWrJGbe5Vwr5IZXUZxjoQRn0xjvmqPg7/kWYP+uk3/AKMaszUYbzXdSl1SxUOmj/8AHgm7AuZwf3vPTbtHlg+rOewoA7Gudn8TQ2viiSxuLuyi09bJJvNd8N5jSFAM5xjge+a2NO1C31TT4b21YmKVcjIwR6gjsQeCPUVylncXuofEadord9PhTTUDeegLyKJn+6AflBOeTz7c5ABp2nijz7K4dbWW7uorq4gEFmhbAjlZBuY/KpIAPJHXitlLiZ7BZ/sjicoGNuXXcrf3c5xn8a4OxvtSPhiTWrKPWILWVJb7yUltGVSxaRgCy7sZJ6jPtXRWtlFbeHlvL3UtQiXa13NJJOoZd3zEHaAuB0AFAGj/AGhqH/QGm/7/AMf/AMVUtjc3s7z/AGuw+yorDyj5wcuMckgdDnPrXGzTX8t74WKz6rZJqV1MktvPc5YoLeV0yQDtJKqSOo6Vu6VFa3V68y3eom9sSY5bWa5J2Fh3XowIwQf/AK9AF7U9QvbaKKeztPORZlFwjnaRGThmBzwVB3YPUAjimw+ILa4MYSOZPPVntmkjwsyhAxYeg5xziuf8QWf9qX88WowtDDHYvcbLWYo8gXjbI4HI5Py8j3OaSzk1GS60ZtReCTdBcNbyRjazRGJCN69AwJIOODjPGcUAdPoV9NqehWN9cIiSzwrIyxklQSO2a0KxvCf/ACKWk/8AXqn8q2aACiiigArjtYhuNU8f2ul/2lfWlqNLkuCtpN5e5xKignj0Y12NctJ/yVe2/wCwHL/6PjoAl/4Q5f8AoP69/wCBv/1qP+EOX/oP69/4G/8A1q2NT1O30mz+13W8W6sFd1XIQE4yfbOOe1M1jVF0jTGvTC04EkUYRCASXdUHXj+LNAGV/wAIcv8A0H9e/wDA3/61H/CHL/0H9e/8Df8A61dJ2rAPi6wXVruxaK5xbrxKkLOJWH31TaDnbwCfU47UARf8Icv/AEH9e/8AA3/61H/CHL/0H9e/8Df/AK1OtfGNhc/a8w3S+SSY1W3kd5oxxvChehIYD1xXQK6tGHGQpGeRjj8elAHO/wDCHL/0H9e/8Df/AK1H/CHL/wBB/Xv/AAN/+tXRqysMqwI9QaWgDm/+EOX/AKD+vf8Agb/9aj/hDl/6D+vf+Bv/ANaukpGZUGWYKPUnFAHOf8Icv/Qf17/wN/8ArUf8Icv/AEH9e/8AA3/61dJ1ooA5HTrSfSfHCWC6nqF1bS6e0xS7m8zDBwMjjjg111c3L/yUm3/7BUn/AKMWukoAKKKKAEPQ1zngP/kUbb/rrN/6NaujPQ1zngP/AJFG2/66zf8Ao1qAMH4wEjwxpxl/5B41W2N9np5O/nPtXoJwy84KkfgagvrG11Oxmsr2BJ7WdCkkUgyGB7VlWXha3sbdLWO/1F7JBtW2luNybey5I3be2M9OKAMiC7fWPGeo6BBfTWVjpljbtClqwUymTd82cH5VCqAOnzVb8CapqGoaVe2+py+fc6dfz2JuduPPEbYDkDjJHWr9/wCGLC91eHVke4tNQihMAntX2M0ZOdjDBBGRkZHFVb/w9p1noggFxf29tCHci1uXjkmlf+JmUhmcknqcEnp0oA5zxJuT43eD5Ln/AI9GtblIC33RNtOfxxj9Ks/GMBvh5Okf/H413bC0A+95vnL099u6tq08ONqfhDS7DxKTdX9vHHI1wGxJHMo++rDkMOmR159asx+GLM39te3k91fzWp3W/wBrkDLE2MblUADdjueRQBr24cW0Ql/1mwbvrjmpK4/xbKdN1PSr8/2pHCb2FZrqCcmGNSdoR4t4yGJAJ2nGc54FdbMZFhcwqrSY+UMcAntk+lAHO6XANZm1iPUSbiK11fdbB/8AlmUWN1x9Hya1jpNv5F5HG80TXbFpZYn2uSQFzu65AAA9MCnaXp402y8kv5kjO8ssmMb3ZizH8zx7Yq7QBha+PtNtH4faPzYtUgntpJGl2Mq+XgnO05OCa52W0tb/AE1bKWxuALu7m010/tacjYFcbsn129MV1l/pst3q2m3SShI7UyF8HDHcuBjiqP8Awjksf2NUu9wi1CS8diNrYYMMDrk5YelAFzSL6e4ub+zlto4UsXSFGWYvvBQNk5UY6j1rP8bf8gqw/wCwnaf+jVrW0/TTY3d/OZzL9rlEmGGCuEC4z36ZrG8eTRW+i2c00iRxJqVqWd2AVR5q8knpQB0N7dx2FjPdy/chQucdTjsPeuCmubgaNoGm6neSLrK6lbySiVgX5YnK8cqMge3Q8108+v8Ahm5Mfna5pjrGwcIbyPaWHIJGecHke/PpUWoap4N1eAQalf6DewhtwjuZoZFB9cMTzQBqRQyQXRnm1OSSNlCCJwiqDnrwAc9utYus2M0/iq1uQr+THZyIzrEr/MXUgfMD2BqGxX4eaXere6f/AMIxaXSAqs1uYI2APXlcVYOoeEyxJ8RQ5JzxrTj/ANqUAct9hkvPDKvIs1wsWqCWVDbod0Ud5uYcLuPyKeB9K7rWrT+1dM+zHm0lG6cEffQDOwj0PAPtkd6yornwdAmyHXreNMltqaywGSck8SdSST+NWrTWfCljZfZLfWtMWD5vlN8rdTk8lie5oA5vw9pj2o8J7XMdjNGJVt85zJ9mGX/2RkcKO5YnrxN4Hv8Ac2hadBdExpohlmgHRX3xhWI68gv9ea6O28Q+GLO1htoNb0tIYUWONReJ8qgYA+96VHY634V02zitbXWdKjiiQRoPtiEhR0GS2aAOe8oWuu3lokFxKzavbXE04iJT/VruLHoP6DFUrS7uYtMne3uJIbdre2kt44wERYpbuXaQoGBmMIPpXWXWr+FLxGSbWtLMchzLGLyMCXjGHwfmHtUV5f8Ag+/e4a51nTX+0RRxSYv1X5UZmXBDAggsTkUAYvjiW1Wfw0sLWMdtHeTQlbi5FtCAsTqULhW29MYx+VZdhaRanqeuR28umxq8Ad5bXUftMduJGlaQhii7SxLDpxvJ6cHqbObwRYG3a21PS1aCWSdGN+rN5kgIdySxLE5PJzUtzqHg+8vPtNzq+lSthQVa7j2ttJI3DPzYJyAcgHkYPNAFHwKY783V8s8xgh221ra3BBe3VVG4kYyu49B3VVPeu0rm21HwY+sprDajop1FIjCtz9pj3hCc4zn/ADk+tZ3jHxzBpHh+bUtD1PR724tf3klo92mZox94KQ2QwHI65x0NAHXXv/Hhcf8AXJv5GvOvFGnXmq/AEWtjE8s/9mwOI0GWcLtYgDucA1Dofxw8J+IrCSG6lk0q9aMqYrnlCxH8LjgjJ74PtXceDyD4M0Uggj7FD0/3BQBN4d1Kz1Xw5p99YOjW0kCFNpGF4Hy/UdPwrlL26g174nQaLqIjuNFk0dri2hk5iuJfMAZsdGwvTrjqOua6VfCWgpc3E6aZAhuTunjTKxTH1eMHYx9yCat6nounawIft9qkzQNvhkyVeJvVXGGU/QigDA8Cm4gGvWDzSy2NjqTw2TytuIj2qdu48kKxZfbGKo+PHm/4S3wJGR/oLaozSN/01EZ8sfq9dJqGiaIdFjsruxgOmW7Bxa+WDGx5wCnRuTnHrg9axdJ8HLH4Sg0yRzBLb3jXtirHebH5y0UY5/hU7Tg92AOOaAH+KvDWj+KtUgtnu57HXbOH7RaXls+2WNSSpx/eXPUe/vXEa/J4m1LwF4r8P6qyalf6JcW0n2i2TH2qIMkvK9mC8keo79T6hNoljq4gu9U0y3GoRptEqHMkR7+XKMMB15GCQeQOlWtN0qw0e0+y6fax28JYuyoPvMerMerMe5PJoArx6vYN4XXVvOj+wfZfO8zcNuzbnrXP/CmwudP+HtitykkTTyTXCQuMGNHkZlGPoQfxrZ/4Q/w8J/N/sm2x5nm+Vt/c+Z/f8v7m/wD2sZ96g8V6lHb2v2F5poFuInMk0cbEhAOVBUcMSQM9hnocGgCj8U1ik+GGv+aQFFtuU/7YYFf/AB4Cuj0eSeTRdPe7z9pe2jaUMMHftG7I+ua5Hw/pqeJvh/4dsZlVtKFtBJcBh/rihBEeD23KCT3GAM5OLPizTkj17RdWGkW8oS/gSW+WXbcxbm8tFXK/6vc43AMOp4OTQBb1S4urvxXZ6algAqWs9xHNOQY2bdGmcA5IVZGypxnI5HJGVHGF8E69rDhZNQQ3Ur3BBDu0DOI+QeAAvAHAyfU12bWFu2qR6iVP2mOF4FbPGxmViMfVBVX+wLD+x7vSyjG2uhMJefmPmli2D2+8aAM6KXVNI8K3l5ObK+McT3EcYj+zblwXO8jcCxyckKATz3rBtvDsia9okV3NHPdTaRdmWReFVmktjK6deWMkpyMcNjgV3E+nwXOlS6bIGNvJAYGG7naV2nn1xVOTw7ZObDaZo1srdrWMJIRmJtmVJ6n/AFac+x9aAOb8ERwS6xfYmLyacps1BkDb8sA0qgcAP5SMccbt/Oc1q+Kv+Qn4U/7DI/8ASaetKfw9pk93ZXX2fyp7JPKge3doisfH7s7SMpwDtPHArN8Vf8hPwp/2GR/6TT0AdLVTUtNt9VtPstyZvKLBiIpWjJwehKkHB6Ed6t0UAc5P4e+xXGmJoFpZWNvAZfM2RhQm5QNwUY3Nx3x6+xRPCEFpfQXumXtxZXIOLuRArfbBkn94CMFsk4bqMkdK6SigDjL3wr4pn1241O28Xw2/mDZFE2lLJ5Mf91SZO+ASe+B6DGhc+FnuItIuTqLHWdMDeXfvFu3lxiQMmR8regIxgYNdHRQBxmp+AmvdBuLCDVBFdXl7He3d5Lb+YZXQqQAoZQo+VR34HrzVpvDOqt4wg8Rf2vZ+bFYGxMP2BtpUsrls+b13Lx6DjnrXU0UAeeN8N9RbwbeeHP8AhILcR3d4bt5/7PO4MZFkwB5uPvL+Rron0fX7j7NFda7aG0jdWmjg04o0yjnYWaVsA45wOma6GigDDbTtSdb++hmgg1O4Xy4fNQyJFGudqnBBJOSTg8E45CjMWn+HZNOvtLKT74LKwe2ZycM7Eqc4/wCAmuhooAwtP0a9s9Ch0z7UkfzyGaaLO7azFsLkcHnGe3b22La2hs7aO2t4xHDGoVFHQCpaKAMKHw39j16TUbDUbm1gnJe4slCtFI+R84BBKk98detOttOvv+EwvNTnEItjZx20JRjuch2YkjtjIHU568dK26KAPPrL4frH4KWyn0zQ21H7GyFmsFZ/MKn/AJabuuT1rsf7NW5sbOC7yVhVC8KnKOwAxn1AI/GtCigDndR0bVL/AMX6Nf8A2i0Gl6c8k3l+WwmMjRPGBnO0rhyegPHetUaXbLrT6soIungFu2Dwyhiwz7gk/nV2igDHk0m4nh1GaeSNry7tzAgGQkS4OFB6nk5Jxz6DpT3tr+z8OxW1mtvNdwWwjEcjFVkYLjG7+H64NatFAFDRLGTTNDsbGVlaSCFY3ZOhIHOPar9FFABRRUc7SrbyNAivKFJRGbaGbHAJwcfXBoAkrlpP+Sr23/YDl/8AR8dZGh/GDw1qV2+nanJJouqxOYprW94CyA4IDjgjPrg+1anmRzfFK0lidXjfQpWVlOQwM8eCDQBpeJ5bmHSCYJI1MtzbQYkiDja86I2QevDGq/jBHHhtsyZ/0u16Af8APxHU3irT9S1TSYrTS5IIpTdwSPLKT+7RJFcsox8zZUcHA5PPYx69ps3/AAjAs7YT3MoubZyXYs74nRmY/gCfQAccCgDY+zym4eQ3cpjaPYIsKAp5+YHGc8+uOK4XEMPiTWbNr0QQ2rxJBGwLeWGgTdtO8YzznHfJrv5cCJyWKgDJZeornk0+S98Qw3UMdxb20Bd5ZnARriUqEHGMkBR1P+zjpwAZmnSq/jLTEjvRMiWc6hUTaFGUwPvHj8ulU5Zv+Er+K1/oN+ok0jRrOOU2rDKTzPghnHRgB0B4zzW9p2j3Et/rr3U13Hvvf9FmDjcIvIhzsJBwC4bOO4NUtV8Oajp/i/8A4SvQEhuLmW3FtfWU8vli4Rfusj4IDjpzwR3FAGi/hvQ9HvotbtoINNSzjkecQII43TacllGBkdc4z1FUV8cMkWnahd6U8Gi6k6R2155wZwX+4ZI8fIrcYIZuoyBWndWt74i0y8sb61NhZXVs8LK0ivMS6lTnblVA6jDHPtjnm7Xw1rl54Z0zwtqttAtvp8sO+/SYFZ4oSCgRPvBjtAIOAOcE0AegV5v4HS18dPrGva3aQ3uL+W1tILmMSJbxIQAFU5AY9SeproLzW9fsPEdnHPplmdFvLn7JE6TsblXwxDsu3bs+U8Ak4IPtVXTdD1HwhqupvpVmt/pOoTtdfZ0lWOW3lb720NhWQnB+8CPQ0AUtFnOgfFO88L2gKaTc6cL+C3H3beQOFYIP4VOc4HAPTrXf1ymk6DqEeu6h4o1KO3OrXFuLaC1hkJjgiB3BS5AyScEnHbjNaHh/VbzUJtSguxaSGzn8pbi0YmOT5QSMEnDLnBGTz+QAK0v/ACUm3/7BUn/oxa6Subl/5KTb/wDYKk/9GLXSUAFFFFACHoa5zwH/AMijbf8AXWb/ANGtXRnoa5zwH/yKNt/11m/9GtQB0lFFFABWJ4h8MweI/s3n6jqlp9nYun2G6MB3EYySvJOCR+JrbooAqaZp8eladFZRzXE6xg/vbmUySOSc5ZjyTVuuX1rxTc6f4mg0a1tIZ3ks5Lpi8hXbghRk4OByST6KeCcCsXTfiHqGoW3heYaREo1e5+zzYmOVO123RjHzKFUMScY3Ac84AOxfRoJb2Weee5njkkSX7NLJuiR0wVZV7YKg4zjPOM81o1xeo+OJobTX9QsbOKe00KYwXCSOUeVgAXKnBwFz3Bzg9K6ywnkurCC4mjSOSRA5RHLgZ54JAz+QoAsUUUUAFFFFABXNeNxnSrAH/oJ2n/o1a6Wua8bf8gqw/wCwnaf+jVoA6Py0/uL+VHlp/cX8qdRQA3y0/uL+VHlp/cX8qdRQA3y0/uL+VHlp/cX8qdRQA3y0/uL+VHlp/cX8qdRQA3y0/uL+VHlp/cX8qdRQA3y0/uL+VHlp/cX8qdRQA3y0/uL+VYPi7QbzxHoE2kWV6lgl1+7uJxHvfyj95VHTLDIz2BroKKAPPNF+EHhDwxZSzR6eL68SMkXF5iQqQOqr90HIznGR611PhD/kTdF/68of/QBWne/8eFx/1yb+RrM8If8AIm6L/wBeUP8A6AKANqiiigDL17w5pXiaxWy1i2NzbBw/l+a6AsOhO0jP407Q9B0zw3pw0/SLUW1qGLiMMzcnqcsSa0qKAILi9t7WSGOWQCSZtsaAZZz1OAPQdfSsqXxn4ag1j+yJdcsU1Df5f2czDcG9PrWTo962pfFDxEsnK6ZbW9rCD/DvHmOR9fk/75pni7w9Yalo9t4YsbOJZ57iOYSKnNuqyB3mLddxwRnOWZ+eNxoA6jUNWsNLCG9ukh8zOwHktjrgDmi41LTl0o3s91CLGRB+9L/KwbgYPfOe1cvZ7pfjDqKTAstro0At9xzgPI+8j67QD/uiuF8PO1x4k0jSHZpNKt/FWoi3jY/KBHCZI8euHLMPegD17RJdLfS4odHkjazth5KqjE+Xt/hOeQenWlTRbCPUpb9YX8+Vg75lcoXChd+zO0NgAbgM+9cBrGoXGgeOvGV7pTxh4/DqahMkgLIZo/MC5AI52KtX/wDhIPEiSeFZTc2Jj1weW8X2c/uWMJkDA7ufunj3oA7m8vLfT7Oa7u5Vht4VLySN0VR1J9qbYX9pqllFeWM6T20o3JInRh6iuCu9a1G+8LfELS9TeKabTLaeNJok2B43tywyMnkc10vgL/kn/h//AK8If/QBQBtRXkE11NbJJ+/hwXQjBAPQ89QeefY1PXG+MLgWGu+EdVt3PmS6j9gYqx2vDNGzMCB1+aJCPTFdlQAVyHjzTbPV38NWF/As9rNq4WSNicMPs857V19c14q/5CfhT/sMj/0mnoApf8Kp8Df9C7bf99v/APFUf8Kp8Df9C7bf99v/APFVVvfHeoafq1nHdaZDBa3WrLpkcMshW4YMdqzgYxsJB4/Wuq8Q6pJonh3UdVit1uDZ273BiaTZuVAWPODzgHHHX060Ac//AMKp8Df9C7bf99v/APFUf8Kp8Df9C7bf99v/APFVXHjTXEvdC8zQ7ZrXW49tqEu/3iy+WX/eZXCpgHlSxwOhPFFv8QJrfTNa/tbTUXVNMvEsxa2ku5bl5MeUEZgMZJwcjjGfagCx/wAKp8Df9C7bf99v/wDFVBafDf4d6hE0tno1jcRqxQvFMzDI6jIatGPxJf2Piiy0PW7O3jOoxPJaXNtIWQsmC8bBgDkA5B6H0HOMrwLdrp3hzxDdC3nnEOs3zCG2j3u3708Kvc0ALdfD34bWDql5pmm27sMhZrgoSPXlqnh+GHgG5hWaDQrOWJxlXjldlP0IaqvxUSK48NaRK0QJOsWRXemGXMg7HpwSK7wxI0RiKjYQVIHHFAHnHin4deEdI8M3+o2fh6x862haUCQyMDgdOGFT6l8OvBVh4euNRXwzaSyQ25lCGR1DEDOM5OK2X8CaXZeGNW0fRIRZf2hGVd3kklAYjGfmYn8BiqPxD06C58LfZzY2txe+UQs8sCyeTGg3Ow3DIzgLxzlwe1AFW48AeALVU8zwx5rsPmFrHNMFPGQSvTr3xRY+APAd/dSQx+EpogiBvNuIJokbJIwCxBJGPTuPfF+G8Tw/pt1bWmh2+n3v2ee5cWkMYhAjBCyNgg/PgYGCex6Zra0e/wD7Ujgme5kS4ihVp7baAp3qCG6EkehB9QeQQADkh4K+GvkX0raJbR/YS4uVcyAxbV3HPPTbgg9weKzbTw38PJDpou/DunW/2y2aZyL0uLdgAdr/ADDqD19QRV7xQsfiDw/4uvbaNY7KG1njMyKFad4otxJPBPzhV57Q+jc6V5dQJ4vhcX0EYXSLj94Id20+ZFzjv60AVT4H+F6xQyPY6UiTRiSMvdFd6noRlulPh8BfDK4LiCw0qUopdgl0W2qOpOG4HvUHxBkUReC7lITfN/a0JAiRVaUeW/QMQBn0JFb+lzQar4ln87w9PptxYW8bRyXCxh5FlMgZQUZgV/dr360AYkfgf4XSyLHHZ6Q7scKq3eST7DfVy4+GPw/tYWmuNDsoYl+88krKo+pLVT8BaTp17aeKYbqwtp4n168VkkiVgQJDgHIqp4Os4f8AhIvFXgqcPc6PplxbXNpHOxfyw/7zy+c5UMowDQBZ/wCEL+Ff/Pto3/gZ/wDZ1fPww8AiATnQrMQkBvMMr7cHoc7qp6TY2k/xb8VwTWsMkLafZgxvGCpB354p3ji1trzR4/CEGpRafGtoZSzyqpIjGIVGfVwCfZMd6ALv/CqfA3/Qu23/AH2//wAVQ3wq8CqpZvD1qABkku/H/j1XPA/iaLxF4JstWllRZEjMd2SwxHInD5Ppxn6EGr19a6R4rsTZyXMV3aCRWmignyr45CvtPTODjvj0oA50fDn4cmzN4NJ042o6zee2wc4+9ux1qS3+GPw/u4VmttDspom6PHKzKfxDVD4X8N2Wm+Otcn0W3FtojW8cMtug/cvdBmLFF6AKpUHHGSR2Nc/os1z8PbhdQeUv4U1O6lFwhHGnzGQgOMdI2wAfQ80AdBa/Dz4b30jR2ml6bcOoyyw3Bcge4DVNcfCzwVFbSyReGLeaRULJEJGBcgcDJbAz71LaXraXYa3eabpwvJpNTKokWADuCDczAH5QOSeeBVrwv4pfW9V1nS5ltmuNMaLdPavuilWQMVIzyCNpBHNAHmOjfs9Q3N7Lf+I72OISyFxYadkRxgnhd7cnHHbt1Ndzovh7SvDPxEtNP0i0W2thoszbQSSSZ48kkkk13lctJ/yVe2/7Acv/AKPjoA6miiuN8Q22nxXNzbRT64NTlha4i8i7vXjznptjfCjPGMAYPFAHVWl9a3ySNazxzCORon2HO1xwVPoasV5tBpdkNQtZo4vEVlG6+dqAjk1ImeYqFAznPAH3vYCuw8OQ2FrpGbKC/tYZJmYx6g8pkDlsH/WsSMnng4OfUmgDSS9tZF3JcxMMkZDjqODToLmC6j8y3mjlTJXdGwYZHBHFYvhyM2mj+Vc25SRZpnYPtBCtKxB5PQ0/wvA1npbQSw+RK1zcSCNgASDITnH0I59xQBsPcQxzxwPMiyygmNCwDPjGcDvjIpGuYFuktWlQTuhdIyfmZRgEge2R+dck15NeeJkltLeQag7NbobqBlW2tkPzuM4yXbaARwcL6GoV1pLvxBpOtmORIjoN7cGMgFgBJbkjrjtQBrNBr8niEXMthpr2sTlbeQ3sm6OM/eby/KwXI4+9wOAeTnbuL22tHhS4nSJp32R7zjc3oPeue1Z3k8AvMLi8zPHHIHlcJMod1OMx4AIBx8p/GudvNOVPEj2N+WW2W1jnjiuPEt2Bv8xsMCT1G0cduDQB6LctOlvI1rFHLOB8iSSFFY+7AEj8jWVpOhR6drOp6jHDDbm/MZeGH7pZQcueB8xzg8dh61zXgnTLu5h0jWbiN5yI5c3MutXUzYJIGI2yhBwM5PYHqK7+gDm5f+Sk2/8A2CpP/Ri10lc3L/yUm3/7BUn/AKMWukoAKKKKAEPQ1zngP/kUbb/rrN/6NaujPQ1zXgR0HhK2BZQfNm7/APTVqAOmopvmJ/fX86PMT++v50AOopvmJ/fX86PMT++v50AcvqHhS5vLvxDeR3kcd1qVolnbuUJ8iMA5+uSxPHoPSnQeERaa3oVxbSQpYaRZNbQ25Qkhm2guDnrtBH4mum8xP76/nR5if31/OgDy1Ta6rf8AiC5S/wBE+z3F5tmtriWSFm8rCjzEVhnJUnJHzKRkY4r0nS7iW60q1uJoRDLJErNGucKSOgzjih7LTpLjz3trVps58wxqWz9as+Yn99fzoAdRTfMT++v50eYn99fzoAdRTfMT++v50eYn99fzoAdXNeNv+QVYf9hO0/8ARq10fmJ/fX865rxq6nS7ABgT/adp0P8A01WgDp6KKKACiiigAooooAKKKKACiiigAooooAKKKKAIL3/jwuP+uTfyNZnhD/kTdF/68of/AEAVp3v/AB4XH/XJv5Gszwh/yJui/wDXlD/6AKANqiiigAooooA5gaedH8dXOrCMm11W3jhlkUZEU0ZO0t7MrEZ9VA7iqDeDPEBu7yePxzfxC7fdIqWUGQOgVWKllAHTB469STXbUUAYd74cE2oW2pWd7LaahBbm2M4UP5kZwcMD1IIyD2OeoJFV38E6YNCsdNt2mgawnF1bXSkeYk24sXPGDuJbIIwQSMdMdJRQBy83gyKbS9ege9dr7XIjFeXhjGdmzywqqOAAucdeTk5qJ/Bty0fh9RrGDohzCTbD5zsZMt8391vzGa62igDjn8DzOfEv/E4bGvpsmH2Zf3Y2lPl5/unv35qS18J6tZ+HIdDg8SyRW0UIgWWO0VZggGOGzgHHGQMj611tFAHMatp0mueJNGgjQJp+kTG8mfGMzBCkUa/QO5b0+Ud+OnoooAK5rxV/yE/Cn/YZH/pNPXS1zXir/kJ+FP8AsMj/ANJp6AOUl8A+JXtoY2utKmmtdcTVEu5PM825UOW2yHHGAcADIwB0rvdf02bWPDGpaWkiRy3tpJb+YQdql0K5x7ZrTooA5F/C1+x8Jn7RbZ0Nt0vDfvf3Rj49ODnvWbqPw7utTPiVn1FIJNSuoLyzliU7raWIfKT/AHugr0CigDmI9D1PU9b0nVNbFnG+mJL5cVq7OJJHAG8llGAADxz161P4U0G58P22oQ3E0Uv2m/nu0MYI2iRi2059M9a6CigDmvG3h288TaXaWlncQQNBew3RaZSwPltu24Hqcc1bEHiCe5txcXFhFbLIHl8hX3uB0UEnABOM+2a2qCcDJoAKy/EFlJe6DqENvCHuZbZ40HAJyOBk1Rn1+ewV3l8i8jnmVbJrcNhgfveYQGCBRkljxgHvxVKPxBq0ay6h5dlcWNzGslnF9oZXLYOVUmMZzgEA89e2MAFzXNPv00PVWsbRb+/vYzDsMoi2oQVUKSMYXJJBPJLewq1Z6EILvTL1pmWe0svskiJ92UfL1+hBx9TUtzdag2nReQLWDVGjEn2WZ9ysR95dwx9N2D9KytV1+9W1mW2+y20n2Z7qKWSduI06sy+Wfl9RnOM4IPIAF1LQbxfB3iawt2+1XOordtBHwuDKpATJOOp6+9aDaXdNrUWp+dCJI7V7YJsOMMytnr/sfrS6bqGpXbwtcWtpFbtAJHdbhi4Jxj5GQEA89eaQ6hqcTzRm1tJmL5tiLnZ50e0EnGDggnHp3oAyvEPhvV9Yh0ErfWpudMu1u5JJIiBMyqRjaDxndWmlvr0t9bvcz2MdtGS0i26uHkwDtGSeBk5NZNj4j1gujva2txbXhaS2P2go0Maj5/NzGMANxnGeQD61sza09jbaal9Cn9oXriNYLZzIC2MsQSB8oHOTigDE0Pw94j0KPVEt7vS3N9fTXgZ45D5ZkbOMZ5xWl4X8Lr4eW9uJ7p73U9Qm8+8u3GN7dAAP4VA4Aq3O+rf2xaywIf7P2OtzC4Tdn+FkIb1yCDxjGKkttTluNXnsv7OuEhhjDG5YpsLn+DAOc4wfSgDL07w9eWfjrV9fkngaC/t4YVhUHcnl55J6HO41c03SJ0vdRu9UFrcTXMwMRRD+7iVQFTn8T9WNbNFAHIaH4Pm0nW/ELSNaTaHrEpmNg0ZYIxXD5zwQ3ORirl74a+waPc23g+20rRbu4wHmjs1UY9cJjJ5OM9M10dFAHM+HdM8S6c6Ralf6ZJZRRlY4bS2aMluxZmZj6+5NXdN0XboEulaqlvdRSmUSIFOx0dicEH2OK2aKAPPW+H19p3gmfQdJ1BJMX63Ma3jNskiDKfJkIySpA29Dx2rS8N+G9W0rxbrOrXb6eLfUobZTFbBgY2iDjAyMY+fr39BXYUUAFctJ/wAlXtv+wHL/AOj466muWk/5Kvbf9gOX/wBHx0AdTWJbD7T4vvLlOYre1S2LDpvLFiPwG38626ZFFHDGEiRUQdFUYFAD65zxzs/4RdvMXfH9ss9y7S24faYsjA6/SujpkkUcybJEV1yGwwyMg5B/AgGgDzbX4rBV8YS2Vj9njGgwD/j0aEk77jOAVBPRfyHpW/BDpZ8baY9jpy27LZXRJNk0B+9DjG5Rnv09feuqkijlRkkjV1YYYMMgj3p20Fg2BuAwDjmgDlLSdn1+9azvdQvZHmKyeXapHFEFGAjSOvzAHPCEnJORyaxLrw7Hp/iDTNJfxBeQ2zaLeQJJJ5AwPMtxtGY+c5z68cEc16PUNxZ213t+028U23O3zEDY+maAObmnttR8NWen2c3nBrpLNWBBLeVJhm47YQmq3iXU49Jv/O8ya/kkUp9nt4oXliIyQT8hPl9ck9ODzk11TafZvCIWtYTGFKhNgxg8kY9KfBaW9qCLeCKIHrsQDP5UAYfhO7s00qKzGuW+o3QLM+x0G0kklVUYwozgDHSuiqAWNot19qFrCLjGPNEY3Y+vWp6AObl/5KTb/wDYKk/9GLXSVzcv/JSbf/sFSf8Aoxa6SgAooooAK59vA/hlnZjotrlmLHCkZJOSa6CigDn/APhBvDH/AEBrb8j/AI0f8IN4Y/6A1t+R/wAa6CigDn/+EG8Mf9Aa2/I/40f8IN4Y/wCgNbfkf8a6CigDn/8AhBvDH/QGtvyP+NH/AAg3hj/oDW35H/GugooA5/8A4Qbwx/0Brb8j/jR/wg3hj/oDW35H/GugooA5/wD4Qbwx/wBAa2/I/wCNH/CDeGP+gNbfkf8AGugooA5//hBvDH/QGtvyP+NH/CDeGP8AoDW35H/GugooA5//AIQbwx/0Brb8j/jT4fBfhy3uI54tHtlliYOjbT8rDoRW7RQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUANkRZYnjb7rAqfoa5iDwLaWtvHbwazr8cMShERdSkAUDgAV1NFAHNf8ACGw/9B3xD/4M5KP+ENh/6DviH/wZyV0tFAHNf8IbD/0HfEP/AIM5KP8AhDYf+g74h/8ABnJXS0UAc1/whsP/AEHfEP8A4M5KP+ENh/6DviH/AMGcldLRQBzX/CGw/wDQd8Q/+DOSj/hDYf8AoO+If/BnJXS0UAc1/wAIbD/0HfEP/gzko/4Q2H/oO+If/BnJXS0UAc1/whsP/Qd8Q/8Agzko/wCENh/6DviH/wAGcldLRQBzX/CGw/8AQd8Q/wDgzko/4Q2H/oO+If8AwZyV0tFAHNf8IbD/ANB3xD/4M5KfB4Ns4tQtLyXUdXuntJfOhS6vXkRX2sudp74ZvzroqKACiiigAooooAKKKKACkJABJ6ClooA4Z5dPjuddl0+yMiRtulRAVjdwvmOXz0GWU4H3j6/NVG8tJ7TRXuZtOv706k8cd59pkiVZjKypGE2yExbSyhcDgdefmrrDoUoHiDF3u/tXlEZcCE+UI/xztzUE3hq7msLS2fXLyRYJreUpJHDsbypEfHyxhv4PX86AKviO5t4fD1g91p9wl+ZI4rNHUuYZ3IiXe6EqBl+cnB+uKx7zS7+S81i3kaR0NlaTSQqQSkKPMfIU9TvEYBznJZvbHY67pUmr2dvbx3PkCK8t7ljtzuEUqybfbJUc1Bd6LPdavdXH2vyrW5t4YJVjGJCsbSNgN2DeYQSOcDjB5ABmeDoPOj1DXZnjnF3sihliTiSCJcBgo/vOZG46giseOKC8uY5tN3Q2i6utrbpPGxVSFkeRgjYIy7lccDEa11mkaCdDupksrtl0pwDFYMgKwN32N1Cn+6cgHOMdKrweHriOZ2e7V0/tZr9F242IUxs9zkk596AOEv7y5udB1yV7cxWup2Fzc2jtbpgxLbLuAxKSmWyenXnvXoOv3NvpXhqS/kimcWkQaKKCVoy7YwqjaR1JArP1nwbDNoDWGjR2ttL9kls0edXfbHIoVsYYc47nNbdzpzXl1a+e4+y2xEgiA5kkHQt7Drj1x6cgGBfvJD4j0SKAahPDc2dzJJDb3zEMVMO1ss6ggbm6HvW3o9uFNxcvYXdnNI+1lubnzS6r91uHYDI/GsubwteQazBqOk6qkCwJKkdrdW3nRRiQqW27WRgMoMDJA5xWnp9rriXTSanqdrNEPuRWtoYh/wACLO5PboRQBq0UUUAFFFFABRRRQAUUUUAFc1q2kawfFVvrelNZMUsXtHjuiw+86vkFf92ulooA53f4x/546J/38l/wo3+Mf+eOif8AfyX/AAroqKAOd3+Mf+eOif8AfyX/AAo3+Mf+eOif9/Jf8K6KigDnd/jH/njon/fyX/Cjf4x/546J/wB/Jf8ACuiooA53f4x/546J/wB/Jf8ACjf4x/546J/38l/wroqKAOd3+Mf+eOif9/Jf8KN/jH/njon/AH8l/wAK6KigDnd/jH/njon/AH8l/wAKN/jH/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che_280	OPEN	"A process for extracting substances containing Ni, Cu, Fe, Mg, and Al-containing from a nickel ore resource (the main components are NiS, SiO ˇ, containing a small amount of CuS, FeS, MgO, Al ˇ O, Fe ˇ O) is as follows:<image_1>
Information:
i. At 25℃, the\(K_{sp}\) of some substances are as follows:<image_2>
ii. When the ion concentration in the solution is ≤ \(10^{-5} \, \text{mol} \cdot \text{L}^{-1}\), the ion is considered to have been completely precipitated.
In order to allow complete precipitation of\(Fe^{3+}\), the minimum pH value of the solution in VI belongs to the range of ()(fill in letters).
a. 2~3  b. 3~4  c. 9~10  d. 10~11"		d	che	常见无机物及其应用	['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'che_280_2.jpg']
che_281	OPEN	"Nickel sulfate ($NiSO_4$) is often used to make battery electrode materials and catalysts. One process for preparing nickel sulfate containing crystals from nickel-rich concentrate slag is as follows:<image_1>
Heavy copper. Add active NiS solids to filtrate 1 to convert $Cu^{2+}$to CuS slag. Under the conditions that the amount of nickel sulfide is 1.6 times the theoretical amount and the reaction temperature is 80℃, the effect of different reaction times on the copper removal effect of nickel sulfide is shown in the figure <image_2>. After 30 minutes, the possible reason for the significant decrease in the copper-nickel ratio in the slag is ( ). It is known that under certain conditions, CuS can be partially converted to CuO, while releasing part of $S^{2-}$."		CuS is partially converted into CuO, causing the released $S^{2-}$to react with $Ni^{2+}$to form NiS and enter the slag, resulting in a decrease in the copper-nickel 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']	['che_281_1.jpg', 'che_281_2.jpg']
che_282	OPEN	A process for recovering copper and arsenic from the insoluble by-product black copper mud (main components are Cu, As and Cu ˇ As) produced in the copper electrolysis workshop of a factory and the arsenic-containing waste residue (main component is As ˇ S) produced in the wastewater workshop of a factory. The schematic diagram is as follows<image_1>. Before depositing copper, the oxidation leaching solution needs to be diluted. The effect of dilution multiple on copper precipitation is shown in the following figure<image_2>. When the dilution multiple is small, the reason why the As content in filter residue 2 is higher is ( ).		$HAsO_2$is easily decomposed to form As ˇ O. When the dilution factor is small, the sulfuric acid concentration is large, and the solubility of As ˇ O is is small, resulting in a higher As ˇ O content in the filter residue 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'che_282_2.jpg']
che_283	OPEN	A process flow for preparing $Na_2CrO_4·2H_2O$using chromite (the main component is $FeCr_2O_4$, also contains $MgO$,$Al_2O_3$,$SiO_2$, etc.) as raw material is shown in the figure<image_1>. It is known that $Al_2O_3$is roasted with soda ash and converted to $NaAlO_2$, and $SiO_2$is roasted with soda ash and converted to $Na_2SiO_3$. The relationship between the quantity concentration of the soluble components of related elements in minerals,$c$, and $pH$, is shown in the following figure<image_2>. Process IV occurs with the reaction $2CrO_4^{2-} + 2H^+ \rightleftharpoons Cr_2O_7^{2-} + H_2O$, and calculate the $K \approx ( )$of this reaction.		$10^{14.8}$	che	常见无机物及其应用	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADUA0IDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDgLz4j3ieIdS0nTfC1/qTafIElkgcY5GRxjjv8AlR/wn3iH/oQNX/77X/CovAv/ACUfx7/18W//AKC1dxqmpQaRp819crKYIVLyGKMuVUck4HOKQzjP+E+8Q/8AQgav/wB9r/hR/wAJ94h/6EDV/wDvtf8ACutGvWD6CNahlM1gYvO8yJS3yYyTjr+FX4ZRNCkgVlDDOHGCPqKYHB/8J94h/wChA1f/AL7X/Cj/AIT7xD/0IGr/APfa/wCFd/WQviOymluFtY7m6S2YpNJBEWRWHUZ/iI7hc0Acv/wn3iH/AKEDV/8Avtf8KP8AhPvEP/Qgav8A99r/AIV22n39vqlhDe2jl4JhuRiCMj6Gp5ZUhieWV1SNAWZmOAAO5oA4L/hPvEP/AEIGr/8Afa/4Uf8ACfeIf+hA1f8A77X/AAroj4t0xbOO+cXCWEhAW7eEiI5OAc9Qp/vEY963AQwBByD0NAHA/wDCfeIf+hA1f/vtf8KP+E+8Q/8AQgav/wB9r/hXbX99BptlJd3JYRR4ztUsxJOAABySSQMCsvTvFumanDetALlZbIZuLeWBklQYyDsIz0FIDnf+E+8Q/wDQgav/AN9r/hR/wn3iH/oQNX/77X/CukXxVpjeGj4hBnOmhPM8zyjnZ/e29cVqWd0l7ZxXMSuI5VDrvXacHpxQBw//AAn3iH/oQNX/AO+1/wAKP+E+8Q/9CBq//fa/4V1L+IbP7VcW9vHcXb2xxP8AZ4i4jOM4J6E47DJ56Vc07UrTVrKO8splmgk6MP1BHYj0oA4r/hPvEP8A0IGr/wDfa/4VWvfihqWlrDLqXgzUrOCWVYhLLIoG5unb616RXnnxk/5FKw/7CkH/ALNQCPQgciikHQUUxDqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoornvEup6lZ3mj2WmSW0Ut/cNE0k8RkCgRs/QMP7vrQB0BIUEk4A5JNR29zBdwrNbzRzRNyrxsGB/EVgta+LlUltY0gADkmwf8A+O14l4d0Px3ceJ7678KyyWeny3LuLgqYbaQZOGEbZyD24PFK40j0zwL/AMlH8e/9fFv/AOgtXZeIsf8ACM6rn/nzl/8AQDXB/DRL2Pxt41TUZYpbwS24meFSqM21s4Br0i6tYb21ktrhBJDIpV0J4YHqD7UA9zzHX4ZvAVjqJt0Z/DWqQupjQZ+xTspA2jtGx/I/ro+MtWu7ZNYbT7+48+x05JhFG3lpbsSxDsc/OWA4XBHHbNd3LY21xYPYzQrLbOhRo3+YMp7HNUb/AMMaJqly1xfabbzyvF5LM653J6H/ADxQFx7y3F14baSBgbqS0JQj++V4/WsL4YSQn4faZHGQJIlZJlPVZAx3A++amFjp1t4osYLKGa1NouGMcbhJFKECPONu0Z3H3A7k1qt4b0lrua6FoI5ZzmYxOyCU/wC2FIDfjmmBzmrRz3vi/TdN0/WLqzsbqyuZHFoVHzK68qSDzljzVn4kQXL/AA21aG2aSSVYV3Ecsyhhuzj/AGQa6I6RYG9t7z7KguLdPLhccbF/ujHQcDj2rF0f7DJ4p1B7UyofKCSROsg8xgxy53cd8D1APbFIB+s3Fg3w6vZWeM2T6a23kYKmPgD68YqXwVFdW3gnRYb7ctylpGHV/vD5eh98VaTw1o8exVskEUb+YkOSYlbOchM7Qc89KrajptpdeIdOl8lmnRjM0uTgKgwF9B8zA474NMC8gktILmfVbu3kiSVpY3MYQQp2BJJyRzzxWHb2qSXGta3KRHPfWuyKBiAwhRThiPUls+2QOtdDqOm2WsWTWl/AlxbOQWjflWx0yO9ULDwloGlrOthpVvbCdNkvlLtLr6EjtQBwlql//wAKHZhdWwg/sl/k8g7sbTxu34z+FekaSR/Y1lz/AMu6f+giohoGlDSP7JFnH/Z+MfZ+dmPTHp7VkalZ2EWsaVbQJcQy27IyyokhVYxkCMEccngg8YHPakBQ+Fm6LwrcQXHF7Ff3Aug3XzN5PP4EUvw/RzqHiq4iz/Z82rSG3P8ACxAAdl9i3f2NdNcaHp1zcy3L2+2aZQsrxuyGQDgBtpG78auW1tBZ20dvbQpDDGu1I41Cqo9ABTC5LXnnxk/5FKw/7CkH/s1eh1558ZP+RSsP+wpB/wCzUAtz0EdBRQOgooEOooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKZNNFbxNLNIscajLO5wAPc1TTW9KksmvU1Kza1U4acTqUH1bOKAL9FQ211b3sCz2s8c8LfdkicMp+hFVbjXtItLlre41O0imUZZHmVSPqCaANCiq13qFnYwiW7uoYI2OA0jhQT7ZpbO/tNQh82zuYriMHBaJwwB9OKALFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXMeJf+Rl8Kf9fsv/AKIkrp65jxL/AMjL4U/6/Zf/AERJQCOnIyMHpR06UUUAed+Bf+Sj+Pf+vi3/APQWr0SvO/Av/JR/Hv8A18W//oLV6JQhsKKKKBBRRRQBn6vOtpZ/apLm4gjjZQ3kqrE7iFHBU9z2rmZ7XVWlkuUnuRqQkNvb3f2UFRbttYs67O2CMeoyMBjW/r+64gt7CFS8088TYH8KK6szH2wMfUitcdKBmTpQEc17LJNfsdyhmuxtQ4UcoMAAdj7j8TlWpMDXom0WeYm7lYS+ZEoZWc7ThnBx+FanilS/hPV1VC5NpKAoGSflPFc5qVoc6tOmjSW6tbWaKvlp+8ImcsAVJHdc5PpmgDofC0P2Xw9Z2zxGCZI8vCxG5SSev61s1zOj25Hi/VLj+zHs0azt0UuijcQ0ucFSR6d/SumoEFFFFABRRRQAV558ZP8AkUrD/sKQf+zV6HXnnxk/5FKw/wCwpB/7NQNbnoI6CigdBRQIdRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFY/ifWJtC0R722t0uJvNiiSN32KS7qgycHH3vStiuY8e/8i0n/X9af+j0oBB9u8a/9ATSP/Bg/wD8bo+3eNf+gJpH/gwf/wCN109Vr++g02xlvLkssEK7pGVS21e5wOcDrQBg/bvGv/QE0j/wYP8A/G6Pt3jX/oCaR/4MH/8AjdXr/wAUaTp65ku0ciSONkRgWXfjBI64+YEn05q5Bq+n3SXDWt1Hc/ZhmVYG3leMgYHfHagZi/bvGv8A0BNI/wDBg/8A8bo+3eNf+gJpH/gwf/43Vy78WaNa6Yb4X0Eq+T5yxJKokdf9lSQSeDx7Vastd0vUZUitL6CWV4/MEaSAtt9x260AZP27xr/0BNI/8GD/APxuj7d41/6Amkf+DB//AI3W/Bf2d1PLBb3cEssJxIkcgZkPoQOlWKBHO6PrGoaj/a9pqdlBbXNkQhEExkVgyBgckD19K4rQLjU1+C80UemxPbfYboeabnBx8+Tt2/1rsNLhNx4i8VwiV4i8sA3pjI/cr0yCP0qW08H21l4Uk8Ow6he/Y3R49xMZcI2dw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'che_283_2.jpg']
che_284	OPEN	A schematic flow diagram for processing lead-containing slurry (mainly containing PbO₂ and PbSO₄) from waste lead-acid batteries is shown below <image_1>. It is known that: i. $K_{sp}(PbSO_4) = 1.6 \\times 10^{-8}$, $K_{sp}(PbCO_3) = 7.4 \\times 10^{-14}$, ii. $HBF_4$ and $Pb(BF_4)_2$ are both strong electrolytes soluble in water. Under heating, $PbCO_3$ decomposes to produce $CO_2$, ultimately forming $PbO$. When an $80 \\, \\text{mg}$ sample of $PbCO_3$ is heated in an argon atmosphere, the remaining solid weighs $713 \\, \\text{mg}$ at $316\\degree\\text{C}$. At this point, the molar ratio of $n(\\text{Pb}):n(\\text{C})$ in the solid is ( ). [$M(PbCO_3) = 267 \\, \\text{g} \\cdot \\text{mol}^{-1}$, $M(PbO) = 223 \\, \\text{g} \\cdot \\text{mol}^{-1}$]		3:1	che	常见无机物及其应用	['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che_285	MCQ	The following experimental devices cannot achieve the experimental purpose:	['A. Figure I<image_1>: Fountain experiment using $\\mathrm{SO_2}$', 'B. Figure II<image_2>: Verification of the heat change in the reaction of Cu with concentrated nitric acid', 'C. Figure III<image_3>: Verify that $\\mathrm{NH_3}$is easily soluble in water', 'D. Figure IV<image_4>: Preparation of ammonia gas']	D	che	常见无机物及其应用	['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che_286	MCQ	The working principle of the acid fuel cell alcohol detector used to detect drunk driving is shown in the figure<image_1>. The following statement is incorrect:	['A. The Y electrode is positive', 'B. When the battery is working, electrons flow from the X electrode to the Y electrode through the external circuit', 'C. When the battery is operating, H\\(^+\\) migrates from left to right through the proton exchange membrane', 'D. The negative reaction formula of this battery is\\(\\text{CH}_3\\text{CH}_2\\text{OH} + 3\\text{H}_2\\text{O} - 12\\text{e}^- = 2\\text{CO}_2 + 12\\text{H}^+\\)']	D	che	常见无机物及其应用	['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che_287	MCQ	"According to the two-dimensional map of the valence class of sulfur<image_1>, there is a record on ""silver needle testing"" in the ""Xi Ji Lu"" by Song Ci, a famous forensic scientist in the Song Dynasty. Silver needles are mainly used to test whether there are toxic substances containing sulfur. One of the reaction principles is: \( \text{Ag} + \text{X} + \text{O}_2 \rightarrow \text{Ag}_2\text{S} + \text{H}_2\text{O} \) (reaction is not balanced), known: \( \text{Ag}_2\text{S} \) is a gray-black solid that is insoluble in water. The following statement is wrong"	['A. When the silver needle turns black, it means that the substance being tested may be toxic', 'B. During silver needle testing,\\( \\text{Ag} \\) was oxidized', 'C. X acts as a reducing agent in the above toxicity testing reaction', 'D. The ratio of the amounts of the oxidizing agent and the reducing agent in the above toxicity testing reaction is 4 :1']	CD	che	常见无机物及其应用	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEOAY8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKRmVBlmCjIGScdaAFoopkk0UTRrJKiGRtiBmA3N1wPU8GgB9FMWaJ5ZIklRpI8b0DAlc8jI7U+gAoqOeeG2iMs8qRRggF3YKBk4HJ9zUlABRTZJEhieWV1SNAWZmOAoHUk+lMa6t0hSV54ljcgI5cAMT0we+aAJaKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArxf8AaA8Y3GjadpmjafcmK6nlF1IUPISM5T83AP8AwGvaK+evix8P767m1DxfrF9tMt3DbWlpFz5cJcKCx9cZOB3PWgD2zwnr0fifwppusx4H2qEMwHRXHDD8GBFcy2oQeIvi7BYFJZLXRLSSZGCjy2uGKqTnPJQHHAOCx6YqT4ceDNS8CQaho0t6t5pbyefaSj5XjJ4ZWXt0B4469Kk+zPp/xDjtdLhhDLorBRKxCjM4JY4BJOTk+pPWgCtca8mheJ/FDQ25utSuZbWKztI/vzP5Ix9FGck9AM120NxJBpkc+qNBBKsYa4Kv+7Vsc4Jxx9a5HwnpK23jjxPdXkovNTH2dDdPGFYK0YJVQPurnt7DJNdJZ3Vlrq3G6KGb7FePCQwD7ZEPX2NAHI6pdaZ431BbW/vYrbQLOTcySTiOS8lH3TtJBWNeoz944PQczWfxC0/S76TSdavUkELBI9Th/eRSA/dEm0fu3x1z8pPQ9hqaVfatqV9raC/toY7PUGt41a23HaI0bk7h3Y9qXTb7UpPGuo6XeXkFzaQ2EE6KkATDs8gJ6n+4KAKHxI1WJfDUemIJpTq0kdvIIMblt3dVducAcMFGe7CoNQs7HxJrWn6EJ47bSbCMy28Sna9xKgCqyeqR5znoWx6Vp+O4IU0F7nYBK11Zqz99ouEIH05P50nkm6+KMc8IHkadpLwyEdFklkRlX/vmMn8R60AHhrxjFqlyumXaN9tAbZcQoz290qnBdHAwpz1VsEHjnrXV1y/w8/5Eix/66T/+jnrqKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArz34z/8AIgj/AK/7X/0YK9Crz34z/wDIgj/r/tf/AEYKAPQqqf2Zaf2x/avlf6b5H2cSbjxHu3Yx064/KrdFAGNqPhPQtWvTe32mwy3LKEaXJViB0BIIzirelaLpuh2rW2mWcVrCzmRljGNzHqT6n3q9RQBlDw1on2i4nbS7WSa5lMsryxByzEAZyc9gOOlS2Wh6Xpt5Nd2VjBbTzIscjRLtDKpJAwOP4jWhRQBT1LTLTV7T7LexmSHzEk2hivzKwZeR7gVJaWNtYRultEEDsXc5yzsepYnkn3NWKKAKWk6Xa6LpsVhZqywRFioZixyzFic/UmrtFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV578Z/+RBH/AF/2v/owV6FXnvxn/wCRBH/X/a/+jBQB6FRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUANdxHGzt91QSa5+DxPdT6SmpnQbyG0aLzt888KbUxnJy/HHPNdCQGBBAIPBB715j4xu5/G/iWPwDpErJYQ7ZdcuYuPLjzxCD/AHj/AJ6GgDsPCPiqDxjo51S0srq3tTIUja4UDzcdWXBPGeM1v1BZWdvp1jBZ2kSxW8CCONF6KoGAKnoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACs/R9VTWLSW4jjaMR3M1uQxzkxyMhP4lc1Bq2mape3CPY6/Pp0YXDRx28UgY+uXBNcl4P0XXJNLuHj8VXMSLqV2GQWcBDETuCclc8nJ9s8UAb2teKJYdetvDmjQR3WsTIZZPMJEVpF/z0kxycngKOT7da5r4sQ3cPw5C3t2tzMdQtiXSLy1H7wcAZPH1Jqh4V0SDXPiN4/k1Oa6W4S4ihRYbh4SsW07WypB6AY7Vzmr32qS/DHWdL1S6kvW0jxHHZQ3cvLyosikbj3IzQB77RRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQByXiXxJdWviXSPDWnTW1teakkkv2q5QuqKmOFXI3Oewz2qewuPEtp4lt9O1SWyu7GW2lkS7ghMTl1KDaykkDhicg8+2Oa/jXwpofjXyNJv5JINShQ3NpcQnEkWCASD3GduR9PrXNeG9T8WeEvGtj4P8S3K6rZaikp07UsYkyi7mV/w9c9RyewBv23ifUfFHiDU9M8PPb21npcghudQmiMu+XukaggcdyT+FJL4o1Lwz4l0zR/ET29za6oxitNQgiMW2UfwSISRzkYIP4Vz3wNjfT9K8RaNd/LqNnq0huFPU5VQG+h2nmnfGqF9RTwnpVp/yELjWI2hx1VVU7m+gyDQB6pRWHJ4gng8SWulzaTcJb3RdIbzepVnVdxyoOQMA4J9PpXkfxi+Jnijwz4vh0rR5xZW0cKTF/KVzOT67geBjHGO9AHvFFY/hTVbnXfCel6pd2/2e4urZJZI8YAJHUex6j61sUAVNTjvZdLuY9NlihvWjKwySglUY9CQOuK5Lwd4U1fwhpUltGmnXV3cStPd3ks8ge4kJ+8fkOPpXcV4L8YPid4p8NeMk0rSJfsNtDEku8xK/2jdzn5gflHK8dwaAPZNJttWS8vbnVZ7ZjKUWCK2DbY0UHqW6kknnjtWtWR4X1S41vwtpep3UIhuLq2SWSMDABI7e1a9ABRUN3M9vZTzRxmR442dUHViBnFfPHgT4v+LtZ+I1pY3rx3FnfTGM2qwhRAOTlSBn5cdyeM0Ae+atr+laDEsuq3sVpExwJJchc/XpV5Zo3gE6OHiK7wy8gjGcjHWuf8eW8V34I1S3nQPFJGFZT3BYVyXhbULz4f8AiOPwTrk7y6Xcsf7DvpD1HH7hj6jPH/1xQB6Fp+safqrTLY3KzmFzHJtB+Rh1U8dR6Verm/B4AXXMDH/E4uf5iukoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACooLeG2QpBEkas7OQgwCzHJP1JJNS0UAYV74Wtp9bbWbO7udP1CSLyZpbbb++QdAyspBI7HGa4z4oaRaaJ8MUsrJGEY1G3dmdizyO0oLMxPJYnkmvUK89+M/8AyII/6/7X/wBGCgD0KiiigAooooAKKKKACiiigAooooAKKKKACiiigDB1nwrbazqtrqhvL20vbSNo4JrWXYVDEE5BBDdBwQRSaf4VhtdaGsXt/d6nqCRmKGW6K4hU/eCKihQT3OMmt+igDAv/AAlZ3Wsf2zZ3FzpupldklzaFR5y9g6sCrY7EjI9adp3hW0stVbVrq4uNR1MrsW6u2BMS/wB1FUBUHrgZPet2igDmL3TZtU8TabqCWN1Zz6fO6tcvKuyWAqQVAVjkMdp5Axt/PY1DRNK1Z4n1HTrS7aLmNp4Vcr9Mir9FACKoVQqgAAYAHaloooAKoahomlatJE+o6baXbxf6tp4Vcr9Mir9FACABVCqAABgAdqWiigArPttD0mzv5L62020hu5c7544VV2z1yQM1oUUAYPjJLibwxd29paTXU8oUJHEBk4YHuQBR4l8N2HjPw5Jp1/HJGJBvik24kgcdGHoRW9RQByHw50nWNF8O3Fprr+Zf/bZWabP+uBxh/wAQK6+iigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKoaRqser2ktxFG6LHcTW5DdSY5GQn6ErmodT07U7ydHsdclsIwuDGlvHIGPrlgTXJ+DtI1t9LuWj8TTxoNSvAUFpCdxFw4JyV7nJ9s0AdD4w8Sf8IzoM91DCbi+ZG+zW4/jYKSSfRVAJJ9B7iuA8aatc698D9I1W82fabqezlk8sYXJkHQUmu+JNR2eI7i/8JeIJJXt57S2mEK+TBBgjcPmz8xG5jjoAO1YVzqcl/wDs/wClwvp93ai1uLKN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']	['che_287.jpg']
che_288	OPEN	It is known that the maximum allowable emission concentration of\( SO_2 \) in the air shall not exceed 0.02 mg·L\(^{-1}\). <image_1>The content of\( SO_2 \) in the air can be quantitatively analyzed by the following device. The students in this group checked the data and learned that the measurement principle is\( SO_2 + I_2 + 2H_2O = H_2SO_4 + 2HI\). If the time starts from the introduction of gas until the blue color of the solution in the jar just fades, it takes 9 minutes. Given that the air flow rate is 200 mL·s\(^{-1}\), the content of\( SO_2 \) in the air in this place is () mg·L\(^{-1}\) (the result is accurate to 0.001).		0.015	che	常见无机物及其应用	['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che_289	OPEN	Ammonium ferrous sulfate\([(\text{NH}_4)_2 \text{Fe(SO}_4)_2]\) is an important reagent in analytical chemistry. Ammonium ferrous sulfate can be completely decomposed when isolated air is heated to 500 ° C, and the decomposition products contain iron oxides, sulfur oxides, ammonia gas and water vapor. A chemical group selected some devices as shown in the figure <image_1>to carry out the experiment of preparing ammonium ferrous sulfate by mixed crystallization of ammonium sulfate and ferrous sulfate (the clamping device is omitted). Experimental steps: (i)...; (ii)Add reagent;(iii) open d, c, heat, and introduce ammonia gas to prepare ammonium sulfate;(iv) first open b, close a, and open the piston of the liquid separation funnel; after a period of time, close b and open a;(v) Pour the solution in B into an evaporation dish, and carry out a series of operations to obtain ferrous ammonium sulfate. One defect in this device is ().		Device B did not take anti-suction measures when ammonia was introduced into 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che_290	OPEN	<image_1>Ammonium ferrous sulfate\([(\text{NH}_4)_2 \text{Fe(SO}_4)_2]\) is an important reagent in analytical chemistry. Ammonium ferrous sulfate can be completely decomposed when isolated air is heated to 500 ° C, and the decomposition products contain iron oxides, sulfur oxides, ammonia gas and water vapor. In order to explore whether the decomposition products contain water vapor,\( \text{SO}_2 \) and\( \text{SO}_3 \), the correct connection sequence of the selected devices is A → ()(fill in the alphabetical number of the device, not all of the following devices must be used).		CEFB	che	常见无机物及其应用	['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che_291	OPEN	"With the determination of my country's carbon peak and carbon neutrality goals, the utilization of carbon dioxide resources has attracted much attention. Answer the following questions:
I. Synthesis of urea from CO_2 and NH_3
2NH_3(g) + CO_2(g) \rightleftharpoons CO(NH_2)_2(s) + H_2O(g) \Delta H = -87 \text{kJ} \cdot \text{mol}^{-1} It is completed in two steps,
Step 1: 2NH_3(g) + CO_2(g) \rightleftharpoons NH_2COONH_4(s)
The second step: NH_2COONH_4(s) \rightleftharpoons CO(NH_2)_2(s) + H_2O(g), the energy change is as <image_1>shown in the figure.
If the reaction is carried out in a closed container with constant temperature and constant volume, the following description can explain that the reaction has reached an equilibrium state ()(fill in the serial number).
a. Reaction rate: v_{\text{positive}}(CO_2) = 2v_{\text{inverse}}(H_2)
b. Simultaneous cleavage of 2mol C-H bond and 1mol H-H bond
c. The density of the mixed gas in the container remains constant
d. The average molar mass of the mixed gas in the vessel remains unchanged"		bd	che	化学反应原理	['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']	['che_291.jpg']
che_292	OPEN	"An experimental team prepared a small amount of NaHSO_3 solution and explored its properties.
I. Prepare NaHSO_3 (the device is shown in the figure<image_1>).
II. After diluting the obtained NaHSO_3 solution to 1mol/L, experiments a and b were carried out<image_2>.
(4)The reasons for gas generation in experiment b were analyzed and two assumptions were proposed:
Assumption 1: Hydrolysis of Cu^{2+} increases c(H^+) in solution.
Assumption 2: When Cl^-exists, Cu^{2+} reacts with HSO_3^-to form a white precipitate of CuCl and c(H^+) increases in the solution.
The group went on to propose hypothesis 3: Cl^-enhances the oxidation of Cu^{2+}, and designed a primary cell experiment (shown in the figure<image_3>) to prove this hypothesis. When NaCl solid is not added, the solution has no obvious change. Please complete the experimental phenomenon after adding NaCl solid ( )."		Current is generated, and white precipitate is formed in the right 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A2iuLn0+815rzxbaQlrqDYdHibgvFGSWPt5uWH+7tNAHf0Vn6JrNnr+kwajYyFoZRyGGGRhwyMOzA5BHtWhQAUUUUAc/47/5J54l/7BV1/wCimroK5/x3/wAk88S/9gq6/wDRTV0FABRWXrlxKLQ2VlqEVnqlwrfYmlUFXkUZ24I59wOcZI6Zrnb7XNUurj+znmTT0u4dsNwsBkOBHuknDLKpjjBKqCw649aAO2orlNI1TVZdcTSJNRsrl7OLN8slo8E5GMI6/OVYMcksBjt14Ggt9ePqcr215aT6fJiGMbcyQ3AJ3KcEZXaCcHkEHt0ANuiuGtvEM1xrOn3gv5IYL3z4I4ZIR5Mixtxccy5Vewxyd4yCMGuk0+S9utKaWLVtPvJXkYxXMNufKC7vu7RIckcjO4fSgDVorgbrWdV1y9ttK03WYITLPPGL6GwkTY8O0naGkKyKSSp6jg1Z0/XdX1fT7M/2zpmnXV07CJJNPdhJsdlKqTKAxIU8DkA9O9AHa0Vk6/e3NlpckljNa/b418yOCdwqz46pknjPQHscdRkHGttdFx49aN9RSK1j0mN5Lfz1KCV5G/DICkcf4UAdfRVOLVtOuL37FBf20l15fm+Skqs23ON2Ac4zWFql9ctqulRQ6zZqUv8AybiONWB3GF2CMA/OflODjsaAOporhP8AhKYU1rW5pfFGmWkFqiWu26UqqTqW3MEMgyPmQZB5xjjFbOq6ldaf4dgt31G1l1e8TyYLhVESM5HMgUscKo+Y8np7igDoqK5a1vpLzTkj0271m6WykNo9xCtuTcMoGX3ScMM5GRjkGl0O81FvFGoWl7cXwgitYHjhvBbg7naQEgxD0QcE+vFAHUUVyPjTxALdI9AsdTt7HVb9Di4lkCi0i6NKckc9lHc+wJFa38TT2+sWtm/iLQbnToIs3ly7CNycfKFPmEFu54AA+tAHb0VHBPDdW8c9vKksMihkkjYMrKehBHUVJQAUUVg+INZ1jTY3OkeH21MxJ5ku+6W3XHopIO5uOmAPfPFAG9RXMt4209fBln4kEM5ivVjFvbYHmSSSHCxjnGc9+neptL8RTza4+iatYx2OpeQLmJYrjzo5Ys4JViqncpwCMdxgmgDoKKKzNb1ZtItbeZYBM011FbBS+wAyOFznB6Z9KANOisOw8QPcarqljc2ZiNlIkYaEvN5m5FcnAQbcbgKzbTXWi8batBM+oS2zR2ghhW0ldYmbeCThflB2jJOBQB11FVbie5gEkgitxCg3GSScrgAZJPynH51xnhrxQbgahq17rGmiC9n8y1tZ9QVfIhUBV425BbG459RwDmgDvaKy9JvNQvpJriZNNbTZFV7OazummMikclsoB9CCaq+I57zR/DWp6lDfytNa20k0auiFSyqSAQFzjPvQBvUVi3NjPc6ZDJPrt9ZbNk0kkJhTpgkEsh+X19qs65rdj4e0ifUtQlCQxDgZGXY9FX1JPFAGjRXm0Wv6xp+jz3H/AAk+hXOqX0xkhs5mDR2xbonmCUfIgGScckHGSQK7vS9UtNSgP2e/s7uaIKs5tZQ6q5GccE49s9qAL1FYut63NoWj3WpXUFsIYFJwbggseiqPk6k4A571ieHteOneH7aPVte0i5vT80skuprw7nOwfL0BO0delAHa0Vji+1az0O4vdUttPSeHfIVguZGjEQ5yW8vdkDqAp6VyT+NdQt9b1O4e0X7LFYQyqjm6EaZaXL8WxIzgc47cZ7AHotFcfqWu309vdQmIWktrf2ERkhmLbxI8ZccqCBhiOevoKv6tq0sN9/oN5EHsji8tJUOXR1Oxl7/eA5BxgOOo4AOhorzPT/GGpwrbXVxOJl1Kxlv2jaxni8p1SMJHEzsQQWYdAcnnvXZaBfRLbQ6TJd3N1f2kCfaZZYXGWwM7mIABOc4znBz0oA2qK8+HjP7C3ilhJNczJI0mmqys8cmIYiEUj/akX5eCd3GecWrDxRJH4k1IXv8AaUqQ6fbOYINNuCBITJvKpsLDOABnrigDt65/x3/yTzxL/wBgq6/9FNW7FIs0KSqGCuoYB1KkZ9QeQfY1heO/+SeeJf8AsFXX/opqAOgooooA8/8Ajb/ySHXf+3f/ANKI69Arz/42/wDJIdd/7d//AEojr0CgAooooAKKKKACiiigAooooA8/8Jf8le+Iv/cM/wDSdq9Arz/wl/yV74i/9wz/ANJ2r0CgDI07Rja6lrFzP5UqXt2lxGuM7NsaJznvlCfyqzq0F/Pp8y6XcQQXhQiN54i6Z7ZAIOPofzq9RQBmaJo66X4asdHmZbhbe2WB2ZeJMLg8eh9KgHg/wyHDjw9pQYHOfscec/lW1RQBTGkaat19qWwtRcbdnmiJd230zjOKjTQ9JjhmhTTLNYpzmVBAoEh/2hjmtCigDLfw1oUqxLJo2nsIv9WGtkOz6ccVLBoek2tytxb6ZZxTpwsiQKrD6ECr9FAFMaTpwvvtwsLYXeMef5S78f72M0iaPpkU000en2qyz8SusKgyf7xxzV2igDO/sDR/sf2P+yrL7LnPk+QuzPrjGKdNomlzvG8lhbF412o3ljKr6A+ntV+igClPpGm3NtHbT6faywREGON4VZVx6AjirBtoC0ZMSZi+5x936VLRQAhAIIIyD2NZn/CNaF5ry/2Np/mOcu/2ZMsfc4rUooAzl8P6MkLQrpNiImbcyC3XBPqRjrV8RosflhFCYxtA4xTqKAM2Xw/o88kLzaZaSNCSYy0Kkpn044pv/CNaGYniOj2Bjkfe6m3QhmznJ461qUUAVZNMsJrMWcllbvbAYELRApj6dKg/sDR/JSH+y7MRx/cQQLhfoMcVo0UAU7TSrGxkaS2tYo5GGGdUAYj0zSXOkafdzedNaQtNjBk2DcR6Z61dooAqpbwabZuLOzVVUFhFCoXcf0GTWVoNhc2+pX90yyxW90Q4imYM4fGDyCeMAVv0UAY+n6I9jqWt3rXIlOpSpIq+Xt8oLGqBc556E5461hf8IXqX/CDQ6F/bcxlS3jiKFY/JypGRny9+OPXNdrRQBleJdIk17w3qGlRTrA93CYhKybwuevGRUN7pd82s2N9Zvbr5FpNbnzc8F2jIYKOuNh4yO3NbdFAHKReEbrS7/wC36HrEkFxcSb9QW8jM8d2f75UMuxwOAVIGABggDHV0UUAZFjpMtr4l1bVHlUx3qQIkYzlfLDAk/Xd+ladwJjbuLcoJiMIX6A+p9fp/KpKKAOZn8IvIdNgi1e5j062lE1xaGKNhdSK28Mz43Al/mODg+gp0/hX7XZ+IIJbp0OqO5Ro5HxGGiVOVBAJ+XNdJRQBmT6Ml3bQWd3KZbKJFVoAuBMR/f9V6fL09cjitMAAAAYAoooAwrXwnYWPiWfXLKW5tZblf9JtopMQTP/z0ZMY3+4xW7RRQAUUUUAc/47/5J54l/wCwVdf+imroK5/x3/yTzxL/ANgq6/8ARTV0FAHN+N7qys9CWa6t3lmWdBZlY2YR3DHbGxI+6AW6njtWLrEEV9rFtoLaTdyWM9v5syxlFku0iKgI2912xAsPl6sc8AZLdbrOjwa3ZR2txLNGiXEVwDEwBLRuHAOQeCVGagv/AA9DqOu2upy3E6fZ7eSARwyvEW3shyWRgeNnT3oAwNDv9WbxZc2C6Kj21mqQteXMyRzwRsN4jIQuJB0wcr2yOpqC+jtdT1zXbfSRLaSw25k1CcxvGxldNqlNw5PloRuHHz55IrqNJ0GLSNQ1K6inmkF68bFZZGkKbU2/eYkn1oj0GKK/1i8W4lMmqIiuHwVj2oVG325zz3oA4eR7nQNB0XVkuXWSSxt7SyjVTJvbYCIiT3kJPzdti+ldtpmh/YfDFno/nuoihWOWSM4Zzj58Htk55HPPGDzVRPB1hcafbWmsbdRS2t1t4VdNqRgKF3KuThzj72cjtjmrmm6ReaVpz2sWsXV4wb91JqCrKY1/u5XazfViT70AY+sWdpoN5pWpXF3Na6XYJJCrxJGsdrvAALDZ9zAxnscZ4PFHw94cOr6VcW+ofaX8OSDFlZ3aKsrfOX88sqqyEk/KOCAATycDo5/DVpqMu/WJJNTUHKwXAHkIfaMAK3sX3EdjVH/hEbmwkT+wPEN/plsHBNmypcwhe4QSAsnsFbaPSgDpJpYbW3eeeRY4okLPI5wFUDJJJ7VxmmjWp7bVPFWn20T3N9Ir29ncgoZbWNcRru/gZss4JBA34I9OmvdJTUnjS9lM1pHhvs+MLIw7yf3h3C8D1B4xbuoHuLZ4ormW2dhhZYgpZD6gMCPzBoA5fRrl9Q8fX908EkDJpForQyfejZ2kcqfccZrJ1VI7HXrxjLKDBqkGoySeUCqebEYI1HzZY7gCeABmum8PeHJdGivZbvVZ9R1O9YNcXskaRk7V2qFRRtUAdvUn1qte+C0v5LiS41zVC1x5PmYEAz5T70/5ZccmgDJkuYLCfS4dJl1K2a31JLC5U7HjmZ/ncSKWxuIO7evOT36VveKxcCwgktbG3mkSX5rmaVI/siEHdIrMDg44yORnODjFVW8ExtM0v9uarva9F+Ti3/1oXaD/AKrpgdK1F8P2UkNguo7tUnsWLw3F6qM4b+98qhc++KAOWurGzZLQxWGj7TbyLJbJF57eWEOyVHKK3UAZPykHg5xmr4F06z1KHS5rjT9GjurKzheVTZK9xKzIDHOJDgqOuMZ5Lc5FdfqHh9JrLUY9LuDpd3fnfNdQwo7O23blg4IIx9PqKSHwtpcX9kuY5DcaVCILedZWR9gAGG2kbgcA4ORntQBnahbeV8QdINoIopJLO8eRmj3bjuhGTgjJ6d+gq02g6gkGtiO+tmfU2Z8NbMAhMSx4zvPHy5zjvVnV9AGqX1pfRale6fd2qyIktp5RJV9u5SJEdT90ds8VX/4R7VP+hz1z/vzZf/I9AGhpZFrpkdpI6tLZQpFN5fI3BAeO/eqvhbxRp/i/Rv7U01Z1g814sTpsYMpweMmnaPoH9kS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']	['che_292_1.jpg', 'che_292_2.jpg', 'che_292_3.jpg']
che_293	OPEN	"Explore whether Cl^-can be oxidized by KMnO_4 under different conditions
Experiment: Add solution X to 0.5mL of 0.1mol·L^{-1} KMnO_4 solution, and use a moist potassium iodide starch paper to test the gas. The results are as follows<image_1>.
Based on the results of I and II, the influence of Cl^-on the determination of Fe^{2+} by KMnO_4 was further explored. The experiments are as follows: Add FeSO_4 solution to the mixture after experiments I and II respectively, and use a moist potassium iodide starch paper to detect the gas. <image_2>Filter out the precipitates in a and b, add dilute sulfuric acid respectively, and the precipitates are dissolved. Take a small amount of solution and add KSCN solution, and the solution turns red. Explain the reason for the production of Cl_2 in experiment b: ( )."		H^+ is produced during the oxidation of Fe^{2+} by MnO_4^-, which enhances the acidity of the solution;c(Cl^-) is large;Fe^{2+} promotes the reaction between MnO_4^-and 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']	['che_293_1.jpg', 'che_293_2.jpg']
che_294	OPEN	"A research team explored the reaction between Fe^{3+} salt solution and Cu and conducted the following <image_1>experiments.
Information: i. \text{CuCl and CuSCN are white solids that are hardly soluble in water};
ii. \text{Fe}^{2+} + \text{NO}_3^- \rightarrow [\text{Fe(NO)}]^{2+} \, (\text{Brown}).
The color of the solution obtained in Experiment III was not blue. The group speculated that [Fe(NO)]^{2+} was formed in the reaction. The following experiments were designed and implemented <image_2>to verify their conjecture.
Reagent X is ()"		20\text{mL NaNO}_3 \text{and HNO}_3 \text{mixed solution [pH approximately 1.3, c(NO }^-\text{)=1.5 mol/L]}	che	化学反应原理	['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/3eDXPeF7ZL/V70TalqcMt1+/jlWUDdH2B4+tAHpd9qljptq9zeXMcUKDLMx6U6y1G01GyjvLWZZLeQZVweDXm3h7UdI0xdQbVLO6nlS7KLKYWfPAwM9M13kDWGt6QsktnJFbcny54zGRj2oA0nuI0QtvU4GcAjNUNJ8QadrMcrWs6loXKSIxwyN6GvONdmt7vSdYmsNISCzt8LDeBiC7ZwcD096v3mhabaeJNChtbGJVuYpHmRcgSMAME0AeiNe2q3CQGePzX+6m7k1JNPFbpvlcIvTJrjNOXwu3iFLe40qKy1mL/ViTPzD/AGD3rp9VeB7Z7SeGWRJUIOxC1AC6tq9ro2lzajdMfs8Q3MV54qzaXUV7aRXMDbopFDKfUV5f4iSXSPh3c6VNLdXBkl2QmSIjCk8L+Vd9YahFb6fBCLa6GxAOITQBsVU1DUYNNsZbuckxxjLbeT1xWfo/iSy167v7S3jnDWj+XL5kZUZwDx+dYuvT6LcW+r6YLd/PtIhJKdpxjIPB9eaAOnl1a2h0k6ixPkeWJPfB/wD10sOq2c1jDeecqQzAFC5xnPSuC8QX9jbeG9HtrTTHuG1BEXy0BLrHtyW/l+dXIx4eum0/R5vDt9PGAAsstq4RCOhJ6UAd7uBXdnjrmsrTvEenanFdS2837u1cpIx6AjrVDxVq0ei6VFaQqySXR8iIqpITPGfwzWJp+uW+m39totgIYrOKMm7nuF2/OcnHPfJBoA6f/hLNBH/MTg/OrWl61p2tRPLp13HcIjFGKHOD6Vzcmovh9uv6Iq84UwgnH/fVU/AGtadFbz2Mt/bNeTXcpVUIG/nqBQB35OBk9KydJ8SabrT3KWc4Y20nlvk965zx54pNlHFo9kJjc3jeU0sSFvKB4PTvWRLF4c0PQ1toNFu/tUnyCWW2cF3PVvc96APTkkSQZRgw6cHNOrz/AMNX2leErW207ydTMt3LjdLbtguck49B1r0AHIzQAUUUUAFVdS1CDStPnvrlisMK7mI9KtVxvj50vbCPR2eRIrhs3MkYyUiHU+1AHQR67p7aTDqck4htZQCrycdelSDWdOIBF3GQfevM9YtrSXTSLO91mSKLyin2gfuGGexxya66TVo7ez8pta0u3mWNVxKoyhIGMjNAG9Z6zp1/dTW1rdxyzQ48xFPK59atTXEVuqtNIqBjtBY9T6Vx/hFZR4j1kzzRTynyiZYl2q3yDkCpfiOVHh633AlftkeQOp4agDo9T1KDSdMuNQuSfIgQu5Xk4FS2d3FfWcV1CSY5VDKT6VzHi67a98Gala21ndvLJbMqKITycVJb6+NH8N2hk03UJHRFUxxWzMwP0oA6okAZJwKjaeJULGRcAZ61EDFf2CmWNhHKgJSQbTz2IrBl0OxCyBNEtyADgmbGaANPR9fstaglmtmIWOQxtvwORV9LiGSVo0lRnXkqDyK818EaRay2OoE6NbyEXkgGZsY9q6nw7plraXUtxNpFrp99Ido8qbeXUdDQBty6nZwSGOW4RXHUGozrWmrjdeRDPTJrO13XW0nUbG0h08XM145VcuFAIBPJx7VzupSXuseKLW2n0aLNivnGP7SoBPY5x70AdodZ04DJu48fWq2j+JNN143Q0+bzfsz7HwO/tWPbeJ767s7ue30OMpaO0cmbhRyvXHFbHhrUl1nQ7fURaLbGcZKAg45x1FAEUviQQmTdpeoFUzlhEMcd+tUz44slsDfGxvhag483yhj09axL+P7L4pu7SZ0d9SbESLGZCg243HB4GRWQdNaZLvwsgjdLcAvdpAWwxIOMZoA75PEnmPGBpOo4kIAPlDH161tg5AOMVwE1t5OsaTcFJikD7SsVo/JOME88Diu3vU86xkHmTR/LndF98fSgCKfV7K21GKxnmEc8w/dK3G/6U251m1tdVttOcsbi4BZABxgetcLq1lp12qXU0niOSa03SQs0ZwrYPP3araHcQ3tkup3U3iF7tgyl4oiRgHoOPagD1OisPwvGg0rzUm1KQSsWxqAxIvtjAwKt3FmsayTy39xHGuWJ3gBR+VAEeoeIdP0zVLPT7mUrcXZIiGOuP/1Vq54zXlGlyxar4ouNduV1aWCIGGyaOIsCvds49ciuhn1XT768i0WS51u3nvFIQmMpx9SOKAO2BBGQcikJABJ6Vn6NpKaLpyWcd1c3CJ0e4fc354rmIr/XvEWo63pltd21pFbSGFWMJZseuc0AdJo+v2GurObGXf5Ehjf2IrUrmNN0PWtKsktbW+sEjX0tTye5PzVW0/VNcHjdtJvbi1lt1tvNzHEVOcgepoA7Csl/Eemx6+uitOBetH5m30FReKPEUPhzR5rtkeWUKSkaDJPv9K4bRE0dbObXNa028u765Blkma1bai+gPpQB6issbPsV1LYzgGn15dodxpWkXV34kltNSTzV+VI7djGiCvSLC9j1Gxhu4Q4jlUOodcHB9qAKEPiK3uNQu7KC3uJJbUgSbUyBmrP9pnOPsV1n02f/AF65bw9JNF4s8RmGESN5sfBbHY0up3N+PHOkEQhQYpcoJhhsAdaANzU/E1vpFstxeWt1HE0ix7indjgd/etmNxJGrr0YAiuA8bXWpz6Tsu7COC3W8g8qRZw5f516gdK7eS5js9MNxIcJHFuP5UAV01yxk1yTR1kJu44/MZfQf5NOvdYtbC/s7OcsJbtisWBwSMf41x/gS4/tldV1iDKXc9yVZpojwgJCgfhWD4l8S37+P9OtUjjlisHJadV43ZGVx6jFAHr1HSsWKHWpr62ul1G1Njty8QgO5vo2azdW1h9Q8UQeGrOUoQnnXci9VTsv48fgaAOqZ1SMuT8oGSazdM8Qafq1pNdW0v7mKQxszeorI8U6ta6bawaLHOlvNeDYjMcBV7ms/TruSPVLPQtASIadZpm8mlTIPoAfU80AdTPr+lW0DzTXsSRoMsxPAFW7S8gv7WO5tZVlhkGVdehFcP4lu21+X7Da28kmkwNuvZYUyXx/CuOvv9a6rQtS0u+sETTJUMcICGMfeTHYjsaANWiiigAooooA8e+M0iS/DLQ5I3V0e5tmVlOQQV4INet2n/HlB/1zX+VeTfGn/km2i/8AX1b/APoNes2n/HlB/wBc1/lQBNWT4m/5F68/65mtasnxN/yL15/1zNAC+G/+Ra07/r3T+VXTfWikg3EQI7bxVLw4M+GdPB6G3T+VZsvgHQZ5nleG43scnFy4/rQBvi+tGYAXERJ6AMKsVzMHgPQbeeOaOG4DxsGXNy55H41vXrXKWchs0R7gD5Fc8E+9ABdXlrZIHuZ44VJwC7ACqn/CQaP/ANBK1/7+rXO3DeMbpQtxpGjSqDkCRmYfqKbaafrrXcQuvD+hLAWG8onIHtxQB0n/AAkGj/8AQStf+/q0n/CRaN/0E7T/AL+r/jUo0XS8c6baZ/64L/hXI3Xwh8K3d1JcPbTB5G3ELMwH4AGgDqh4i0Y9NTtD/wBtV/xo/wCEg0f/AKCVr/39WsTQvht4c0C7e4tbTe7LtImYyDH0bNb/APYul/8AQOtP+/C/4UASWup2N6xW1uoZmHUI4OKt1Xt7CztGLW9rBCT1McYXP5VYoAKKp3eq2Vi4S5uFjY8gGq3/AAkek/8AP7HQBqHoa5TwT9/Wf+vw/wAhXR2t9b30TSW0qyKOMiuT8LXtvp9vrlzcyLHGl2xJJ9hQB115eQWNs9xcSLHGgySxxVHQtYOt2jXS20kMJYiMvwXHriuetrW78Z3q3t8jw6PE26C3bgykfxN7e1dBq+pLpFtDFBEGnmYRQRKMDP8AhQBqkAjBANJ5af3F/KobNJo7dftEm+Q8scYqRriFcbpUGTgZagB5UMMEAj0NJsXbt2jb6Y4rkvH3iTUvDGlxX1hDbzK0ixsspI6nHGK072+1S08MSXoS3N5HHvK5Ozp+dAGx5EWMeWmP90UeVC3GxDjtgcVy3grxNea94YXWtTS3t43BICMcAD1zWXp+rppVxc6vcSy3M2p3IWC2V87E4BOM4GOTQB3nkwE48tM/QU4QxKciNQfUCuI0O61K48Q6lrEtrcyWrnyrZVYbdoxk4z1yDXSaHrset2s06QSQrFK8RD46qcHp9KANGW3hnKmWNHKHcu4ZwaWLycHytmM87fWucuLy+t/EULW0qSaZKjecG6o3bH1rN8ATxrZajdS3DMZ7t2TcxIC8Dj8qAOt1DSrHVY1jvbdJlVgy7uxByKlW0gScziMeaRjceuKgttXsru9ls4Jw88Qy6jtWN/wkN4PHEWiPAiwPbtLvzycED+tAG+LK3F412Il89l2l++Kq3ugaZqF5BdXNqkk0Dbo2PY1pUjttUtjOBQA0xIzBiilh0JFKqKmdqgZ9BXHDxBq1zo1zrEESxJbyMPs8owWVTgn9K6azuRqukQXKboxcRBx6jIzQBdorD03VpV1abR77P2hBvjkxgSJ/iO9blABRRRQAVy3gz/j58Tf9hqb/ANAjrqa5bwZ/x8+Jv+w1N/6BHQB1NFFFABRRRQAUUUUAFFFFABRRRQAUyX/Uv/umn0yX/Uv/ALpoA8r+A/8AyL2uf9hWX+Qr1evKPgP/AMi9rn/YVl/kK9XoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDO1//AJFzU/8Ar0l/9ANU/BX/ACJGif8AXlF/6CKua/8A8i5qf/XpL/6Aap+Cv+RI0T/ryi/9BFAG7XG+I7rSv7esrVGiGpTsN7A/MI1OTn2612VcZqmiT3HxG0u/WwU2kUDiScAdSDwfWgDM8R6raT6hHosQltrW55mnSJmeUD+FcfTrVXVdbtPDMNvHo1rLPaysIjp8lu67zj+EkdeO9bPiO11A+NtFl02CI+WrZMmQi8H0qLxFDr1xqOh/aoLQxJeqzG3LEj5W65HSgDotF1dtR0YXd9YPpqY5jnYcD3rkVt4dTGqQ6EyRadFG0PmRNkKcEtj6givQ540lt2R41kUj7rDINcZ4J0u503wnqUVxZG1lkmlcRYHQgY6UAZGm6RJ/wiOlOpK2VmHY85LsXZdx+mc/hV7wvHNqvilrue7F5Fp0JhjnXo5Yhh+IHFT6W19c+ErfSLKErNIHSaWRcLEpZs9epxVLSrDXfh9LHp9nYyaxpMrZ3xbVljY8nOcAjOaAO0122gk0i7eSGNmERwWUE1z+jb08FaftnisohB81wQNw6/d9609U0zUtauoI2uBbaU0Z8+Ef6xzxxnsOvQ1lXHh/UtIkQaZbwX1hGuFt7h2LIPQDofxoA5LU0nTWNHu9Lso4rUXDIs1yp33DEYye+Oa7/QPE41K+u9Lu7ZrW/tP9YhHysv8AeB9K8/vG8bz+Kbe9ufD99c6daktDar5QCtjHXOSK7zw/e6rql1Lc6h4fGmHG0mbaXce2CePrQBn6rc6DrGtS2c9zai0ij/0mQSBRvPQFgevWsRLbQ7zxk1rZWbXVvFaptCOyrxnkNnmtTQvC4n13XW1TSI47WadXhBUbXxnnA+tS3drPF4uuYtOtPLU2aRoyIFRc55/CgDDt1/4pYShSqy6opAJzwGA/pXpN7Zm+t1gMrJGfv7erD0rl9b0Y6d4a0+xtY3lMdzGzbRk/eBJrq7m8gsoBJcMVXpwpP8qAOY8U6Bu8PSW8dxOtmCPMiiAyE9uOtYfiJrVBpl1p2qXd1qewx2cUe0/eAGW44ArqrzVNWvt1vpOnYVhxc3PEZHsBz+lcva+Ctb8KXkur6TPDqVxLzNb3Chce0eBx9OKAOm0vwyHsdPl1x/t2p23zi4YYZSe3GK6SuP0vxxPeanHpt54e1Kzum67wpT65BNbGrXt4wNlpkRa6fgyMPliHqaAOe1+Q+IvF9hokHzQWbfabpx0BH3V/X9Kux+IdR07xHFo2qWW6K4B+z3cIO3j+FvQ1qaBoEGhWrqrGW5mbfPO/LO1ZXizxRPoKqB4fvb4udsUsCqQrHpnJyKAKvw8/evr112m1BiD9FUf0qtrNrHba3rcbz5uNStx5MSoSQBgEk/ga1vBWm3WieE0+1QMbuQtNJEuM5Pb64xWZfy6rc+KINQj8PX3lJatETlM5JP8AtUAP0f8AseC1tZr25EzpbraRkKdqkABgD65WneFZBbeKtT0211CaayjRHS2lQgwZzwCRyOP0rnINP1+PRLG1Ph698yHU3um+ZPuEt/te4rWhutd0/wATaxqsfhi/lW5jiWJQ0eSV3Z/i9xQB0/izUpdL0jz4LB7yYsERUTcUJ4zWVptvPNpslqdNa0ndTL9okdGZm9SP0rY1O11bVbO1+xXj6aWOZwUVmx6c5FUp/Ckpa3it9RmS2BzcgnLy/wDAjyOfQ0Acbq9/dQ6h4fubmytmnimdZkhA2uBkZrttBtbi5upNRmisVtZQDBHFGNye+4etc/drLf8AjnS9Pi0W5t7azDM8sgXY64x1B9+9bGk6FrOh67KlpcwyaJId4hlJ3xMey+1AFXxtD5d7oZt1RZGvFOSOpyOtaetaLqmrfZcXFonkSiT7rc1V8cWeoTR6deafZSXj2lwsjQxkBmGR0yQKb/wmGsf9CTrX/fUP/wAXQBPrem6veajpMwEEkVtc+ZJsyCBtIzz9a6VJUeMupyB1Nck/i/WWjYL4J1rJBAy0P/xdWvB39sHRZm1mz+zSvK7JCWywU9Ae1AF7SfFGka5e3Vpp92s09q22VQCNprYrj/CfhC30TWNU1aO1+zPfPny9xOAO5967CgArl/GFvfDSL+az+yKjQEO0qsWP0xXUVna/aT32hXlrbbfOliKpu6ZoA8+MetDwDZNdTWRstke1I0YPnJ6knFZd7LAg8SCSLfJ9ptyp2ZxxH37Vt3Xh7VdN8C20F3O9zfCSNNiD5UXd0A/rXYDSbK10+adbAzyzKryxrgmRgBjrx2FAGT4TOfEGqkADMcBx/wBs1pvxCaWa20mxtyv2ie/j2huRwG647VH4KurjUNX1vUJdMubCFpFREnAB+VQD0PtWpDpcuqeI11i8QpFbKUtYj3zjLH8hj60AWVj8SBQPP0zp/wA83/xqt4O1i/1rTJ578QCRJ2jHkggYH1ro65TwDBLBo9yssbITcuQGGOKAOhvtPttRhEVyhdAc4DEfyrgfE39iw3UWh6RbiXVro7VxM5EQ7sfm/Su9vrNr2MRfaHijP3wnVh6Z6j8K4LxHYtoXifQpNJ0aa62hgzR4Jz/tMTk0ARaZ4f0vwsZNLvIJby5k/eQv5jAzMeo4OPSt7w74TjjnGp6lYwx3qsTCI5ZCY19DliCat3ehXeu6eDqUiW16h3wvbk/uj9T1+nSqOj3fjO21YadqdlbXFmo4v0bG4e49aAHeKf8AkavDn/Xdv/QTVK+ttPuPH9yL+GSQC2G3Zu46f3as+MIdQl8RaAdPgWSSOZmLSZ2KNp6kU+PSfE8fiCbVP+JWfMi8vZvfj9KAKPhVIY/DWvpApWIXM20HOQPx5rX8D7/+EGsPLZVbyzgt0HJrMt9H8TaXpWqIRpsguZJJflZ8jd26VseC7SWLwbYW11GUkCEOvTHJoA5iXzL7xYNM0q8eK7x51zfFclh02LkYxWXLZ2+keN7iymiWZ7tVZWklYb2xyeCMc11s9vJB47DxQ+VbJYkeaq8A7v51RvbUyP5+i2ct9qTnm8nQbF9iG5A+goAjsNKc+L9PljhgijiRy6x3RYk8Y+Usa7fU2aPT5pllePykLkpjJA5xzXn+jXMugavJd65o962oznZ9pjVfKx6KAenuRXb6tPNLpM0cNnNK80LBVXHBI75NAHNjW3utJguJJL5IbwmJPmTJPI9KXT2k0qK40y2e+Z7NTI6F04B564qhHp2sL4c0W0OkXHm21wXkGV4G4n1rU8rUv7f1i6/sq48q5gVIzleTtA9aAL3hCSfULE6xJeXrpdgMtvcFCIx7bR703X7O61yzubeQtb6eiNvwcNNx09hUPg6TUrHTbHSrvR7qHy4RvnYrsBGOODmuk1AFtOuQBkmNuPwoA4DwTfXlt4UtIYdS0iKNC6qkpO4DeevNPmu7m5+Imi+feWFxiJsfZSeOe+TWz4N0e3h8KWwutOh88byweJSx+dvUVkKHvviLY/Z9Clso7SJvNkaNVU88cj60Aeh1w/h+1km8W+Iyl1LCBcdExz+YruD0rz/Qo9eTxT4hltYLYRPcfK1xuGfpgUAdj/Z8/wD0Ern/AMd/wrl7GF4fifMrzvMfsXV8Z+8PStvd4n/556X/AN9v/hWLpdrq3/CwprrUIYVT7JtDwklc5HHNAGv4xhjPhXU5NgL+ScMe3Iqlp9jqWoeCobRJrVBNbbASrcZrY8R2c2oeHb61t13SyxFUHqa5jSfEmt6dpNtZy+C9XeSFAjMjRYOPTL0AaN7o2sDwlJpkT2ssnklBgEbvzra0dWt9LtLSbAnihRXUdiAKwf8AhMNX/wChJ1r/AL6h/wDi6j8P3fiDUPFF1dXmjTadp5jARbhgXLcdlJFAFLTiV1fxeQSCAvI+hqt4b03wxeeGrG9vnge+EJy73JDAnr/FV7S7DUJPEXiNVijWCdkAaTIzwelatj4c+wadHZx2GmsiLtDMmSfxxQBwsYX/AIVrbsjlwdSjwSxb/lqO5r0+5sE1C1t4pWPkjazoP4+Ohri9e8PXmn+GLbTrO3haJbyJ9sZJI/eAmvQIgVgQHqFH8qAOD0jUf7L0zWRAoM73siRIOP4jz7AVmTW2maZqfhyCS+tppZJne6l8wfMx25JrpvCFhn+1Zbq1wXvJNu9eq7j61B4g0W2fxR4f8nToTGkjmTbCMAfL14oAqeGPFtraa3L4anuVmUMTZ3CHcrr/AHSR3HP6VleB5GuPi14tkmOXQIq57DC16RFpOmwsrRafaRspyCkKgg+vSuNfTf8AhHfiY2rBcWeqxCORuyyDpn8AKANbxnqcel2kDjT2uriZ/KjdYfM8vPfpVfSNNkOnG3k025jiYF5GaRc3BPrjkfpWnrt1r0U1vHotjbXAc/PJcMQqflzULza5ZSwy3CTXTMPnhtFTYPxbBoAWPWorG+h0iLTWjmdC6Rhhgge9M0DSlTV73VJNJfTriU7CvmBlkH97A6Gsa5l1eXxtaaqvh6++zxQsjfMmcn/gVdLZaze3Wo/Z5dDvLaHbnz5Sm3Ppwc0AbNFFFABRRRQB5B8af+SbaL/19W//AKDXrNp/x5Qf9c1/lXk3xp/5Jtov/X1b/wDoNes2n/HlB/1zX+VAE1ZPib/kXrz/AK5mtasnxN/yL15/1zNADvDf/Itad/17p/Krd/DcXFm8drcfZ5iPlk27sfhVPw3/AMi1p3/Xun8qxr228cNeSmz1LTUtix8tXtSWA9zuoAd/YXij/oZx/wCAi/410Gm293bWSR3t19pmHWXZtz+FcnIPHFkBcXmr6WLdCDIRakcd/wCOtq38X6NM0cQv4mlbAwD1NAFrUvEOlaRKsV9eJA7DKhs8iqX/AAnHhz/oKQ/r/hW68MUuC8at9RTfslv/AM8U/wC+aAIdO1Sy1a3M9jOs0QO0svrVtgSpAODjg1jarr9loLJHLbXDb+R5EJYfpWd/wn+mf8+epf8AgK1ADptE8SvM7R+JAiFiVX7KpwPTrTP7C8Uf9DOP/ARf8alg8c6dcTpEtpqAZzgFrYgV04OQDQBi6Pp2r2cztqOrC8Qj5V8kJj8jUWoa7qFpeyQw6Ld3CL0kRRg/rW/UJu7dSQZkBHvQByVzqk96wa58J3MrDoXiBxWrpmmaffWYmn0OK1ckjy5IhmttJElXKMGHqKg1HUbbS7OS6u5VjiQZJY4oAgnfTtBsJZisVtAoJbaMCvOfBelt4pv9Rv7qVv7LW7LxWxGNzY6t7V0VnY3Xi68XUtUjaLTEw1taHqxH8Tf4VP4HVUOsKoAAvCAB9BQB1iIsaBEACgYAHaua10eV4p0W4kOIAWj56byRj+Rrp6q6hp9vqVq0Fwm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8+LtBhL2knF/ap0I/vAVLGP8AhLPhXrUlgC32l5JIwRyeOlenPAk1s0EwEiMu1tw+9VDRNCs9AsXs7JSsDOXCHoM9qAOU+D19Dc+AbO2VgJrXMUqd1YGq/wAaLhG8FnTlO65vJVjiQdSc1t3PgS1XUpdQ0m+uNJuJuZTbAFX/AOAnipbDwVaQakmo6jdT6nep9yW4x8v0UcUAYE9nPoHgbTkvNel0lLW2VSYmAZ3x05611/hu4u7rw3Zz3zB53iBZh/F71n+Jtb0OIPpep28s7yL8qC1aQZPTkAgVDoqz+HfBkdvKrtcbT5MJOW56LQBx/wAPY7l9Z8Yi1l8mJrvCyf3eBkj3xXS+Dr+efXtTtItbk1axgABllYFkk4yoI7VY0DT7XwT4Zkn1De0k8hluDHGXJZvYDPpVbw5bWl74uuNa0i3kt7CSDZLujMQeTI52kDt3xQB3DEKpJ6DrXD29/otx4suorNozFbKzXHl87pH/AK8Gu5IyMGuO8OaFcWfi7X725so4oLh08lgBhgN3OPXmgDDkvLHXtee11C1uFsbAho7OOBm3nszY+nA9qbP4qu9K16LTrHTLjVINvmxwvEY5IATjIJ6itSwtNbj8b63PZR26QyKgDTq2DyemKmsbXV/+Fjfab+OEoLDaHhB253njnvQBt6pe6edAaTXFit4ZE3PFM4+uK8/1mwk1bwa14WKWEkomjQH76n7o+gFd34zsJNR8K31vBaJczsgCIwHXI9ayNUsJ4Phpa2Ygbzo4Y1aNRkggc0AVNXsZrK6OpXF4LMSIEhlJ4hC8jP1z+laXgS2lltrzWLjJlvpd4J/ugAf0zUeu6Rc+NbJdNJe10wAF5cfO5HQAHpR4fuPEmkXiaLf6Z9ptIxtivYWCjb23A9/pQB2dFFFABRRRQAUUUUAR3H/HtL/uH+Vcz8N/+RA0r/cb/wBDaumuP+PaX/cP8q5n4b/8iBpX+43/AKG1AHVVE1vA7FnhjZj1JUGpay9QXULsm2tcW8Z4ec8nH+z7/WgDlr+1t/EvjSG1hiQ2mmqWlZVGDIeg/DBrd0Ga2nSbTriGL7VatsdWQfMOx+laWl6Va6Ta+RbJjJyznqx9SawPFfhm9vZU1bQrr7Jq0A+U/wAMo/usKAOqjijhXbGiovoowK4e58yXxtq17CSBZWBjDjsxww/lW1oF14im0NpNZs4Ir8AhY4myCexNLb6JLa6HfRgiS9uwzSMe7HoPoM4oAq+EPtmq+FdPvbrUblppoVZjkcnH0qAz30HxEtLD+0Lh7VrZnaJiME4PtS+GvDGq6b4dsrSbWbiKSKIKyIikKcdBxU1r4avoPGEWrTai9zCkBjxIoByc+lAGv4g1mLw/olzqc0byRwLuKJ1NVvCXia38W+H4NWtonijlJGx+owcf0rQ1S1kvdPlto/LzINpMi5AB68UzRtJttE0yKxtVCxpk8DGSTkn86AL9I43IR6ilooA8d+FRGi+NPEeiXv7u7eXzUDcb1PpXsDusaM7kBVGSTXOeIvBOmeIbiO7cyWt/F9y6gOHH+P40WnhS4TCahrt7qEIxiKVVUce6gGgDl/iRPFcan4UmjOUOoDDEdeGp/j5lHjbwjkjPnn+a11PifwjY+J9OhtJ3ktzA4eGWHhoyPSsu5+HFjf3Gn3F/qF3cz2TblkYgFj746fhQB2g6CsPxhdrZ+Fr5mPLxmNR6luB/OtuNBHGqLnAGBmsjUNJfVr+E3RH2OBt4j/vt6n2oAyvDnhq7t/D1jG+sX8TCFcorLhTjp0qHR2v4PH19Yy6pdXNtFboypKQRkj2FdmAAMCudtNKu4vHF9qTJi2lgRFbPUgc0Ab1x5vkP5OPMI+XPrVHR9Hj0tJHLGS5mbfLK3VjWhM7RxM6RmRgOFBwTWJcv4gvwFtI4bGM8OZvmce644/OgDC1W8Twt4m1DWrt1ZLiJUggTmSRsDgCjw3p+ueIBNfeKYYfskziS2snXLQ46HPrWzpnhCys7w393JJf356zz84+g6CuioAinX/RXRR/AQBXm2m6BqUPhabzTeRsFlO0OgA5PYjNd5qsWpTII7E2wVuH87d+mKwrjQdbntpYc2A3qVzvl7j60AcvpuhajeeCSsT3bs6sAvmJg8/TNeg+G7aWz8M6fbSgLLFbojAdiBXOaZ4U1qw0tbJ3sHAyCd8ozn8a0vDuj6zo85gd7IaaFJVEaRn3fVieKAMjxRpktpaxalqGoyXNxDOJLe3UcMw6Kork9Hubk6do11Jc22m3S+YqteRF4m3ZHUdDzXqX9jedem+vXE0yAiFB91Pce9Zmk+GI7nwmNK1m1U5ZiVPJHJIINAGFJZ31vqF59rYXBXRpA1xGpCMSxOB+Bro/CFvHdeB9MilXcht04/AUviOx1ZPDxstCjtnPleSVnJztxjg/SrWkabeaX4WtLCN4/tUUCoWb7oIHNAGJqE0Gna1a6UNY1L7RcklYoACIx6njgVl6TZy2l7rs76rqWyO7O8xYLHgckYrp4PD82mw3F3ZtFPq03LT3OSCfTjoPpVfwbpur20eoXOtxQx3N3cNIY4uVAwB/SgCfw7ZWcrS38Orzaosh488q3ln0GBxTfGnjC28F6THf3NvJOryCMLH2zTNP8ILpHiybVdPnMNrcJia1z8pf+8B27Vpa/o/8Ablktk/leQ7Ay7lycDnj3oAuabfJqem297GpVJ4w4B6gEVaqO3gjtreOCJQscahVA7AVJQAjHCk+lcPBr8Op+NbmGG1l22EWGUxkFnPT9D1rua5rRvD91p/inV9VnnjkivCpjUDlQFA5/KgDnIbm/1Lxlcpd6UbqSxVWhhEqqke7vz1NVb278TWvi6Oy0S0S1edDLJBcSB4zjuMdDXQx+HNTbxnqeopeS2lvNHGqGMKdxAOetPtvD2oweOIdSlu5Lq3W3ZC8gUEE/SgDQ1XWxoPh43msIZXWPMggiLLmuI1TTBfeC49VuTuEkyTRRkdMuME/gcV3vijTLnWPDl5YWjok0yFQzjisvVdDvH8D2+lwIJLmJYgQDgHaRn+VAGT4m0+00uzl1PUJZPJuAEkePgx/3cVseBdPkt9Ie+nB8++kMx3dQp6A0t74cfxKFj1lStig+W1VvvH1YioNF0PxHoOpC1gv4LnRB9xZwfMjHoCOv40AW9b8N3Gq+ItP1CK9ktUtVcExfeORiud8daPPDaaeW1i+kBu0HzsvHv0r0eua8ZaNd61aWUVoBujuVkYk9AKAF1DwzdXdhNAuuX5Mi4G5lx/KtLQtObSNAs7CRw7W8QQsBwcCtFRhQKraj9pNlItoAZmGFJ6D3NAHJ+AbZJU1m4ljR1lv3ZCyg8YWuw+yW3/PvF/3wKraNpcWj6ZFZxc7Rlj6nuav0AQ/Y7bIP2eLI6HYOKiubBLi4juG5kiB8sN90H1q3Va5+2b1Ft5O3HO/NAHP61D4h/sS9L3Vhs8lsgRNnGPrWZ4Ut/Ekng2zFpe2EeUYIXhYkfMfeulv7XVbzT7i2D2imWMpnDcZFVtC0zVtH0W3sGktHMQI3ANzyT/WgDW06O8isIkv5o5rkDDvGpCk/Q1ZZgilmOABkmsawj8QJqtxJfzWb2JX91HEGDg++ajv7PUtazbyN9jsjxIAcyOPTPYUAc3DYt4r8RapqkTYht4/ItJO28Zyw/Suo8PayNStjBNiO9tzsmiJ5BHf8a0rGxt9Os47W1jEcMYwqiua8U+EbjUrhNT0S9On6tHwJRyrj0Yd6AOtrgE0TUJfFOr3Ci6jhkKbCjKA2B7iuqhi1iPRoo3lt5b8KA7sCEJ79Kyjo+tsSSbAknP35P8aAOW8O6RfS3usqst3lbhhxIn+FdP4B0u60nSbmG7QrI1wzjcQSR74rP0zwlren3F5KZLB/tEpkxukGM/jVuw8P65puqi5tmsEjmbNzl5WLD2ycCgCfxSdaubu2sdP08S2kv+vm8wLgelamlQ3dlGkF3LaKgG2KOFSuB6cnmoNX0nVtQv4jbau9nZhf3iRoCzH6kdKiTwsbeYyWmp3UG7luj5Pr82cUAZuk/wDJTta/69of/Zq7CYuImMShnxwD61zMPg6aDWLjU0128+0ToqOdidBnHb3rW0fSrnTPO+0apcXxlbcDMqjb7DAoA8+1jRL1fGLTRn7TeSWyySxt91xv+7+Ap77pNW1SW9tUk1CCJI7OJP8AlnuUHA/z2rtm0udvGA1LjyBbeX753Zpw8L6YNTudQMTG4nILEueMDHFAHCXwjPw/1KxuxMdZtIB57MSPmPcHv0Neg20fl+G41xyLfHP0rjdc8JaxPfzW+n29otnfkLczmRy6qOnBOO9d+LYCxFtnjZsz+FAHIeBLB5/B1v8A6bcIrGQbVIwPnb2rXs/DC2GlyWNtqF0EfefmI6sST29TWHpWi+NdCsvsFlcaNJbI7GNplk3YJJ5xx3q9t8f/AN/QP++ZaANHQbUaDZWmjSziaYRswYcZAx/jWVdaudS8b2ei/ZnjNuv2iVmHBx93B796bZ6H4quPFNrqurX9gkFvE0fk2it8+SOu76VNPomp2/jafXoik8L26wpCOGUjPJ9uaAHeIsXPirQLZWO5HkkYDsNv/wBaop/+SpQf9g8/+h1q6ToskF9LqeoSia/lG3I+7Gv91az9d0LWpfEMOsaLNZLKsBgdLoMRjOcjbQB0Ul5GLSS4jBlVM5C9eOtcl4d1dL+11nXihhjVmjRWGCqpnnHbrWr4Z0nVtO0ie31a7hnuJZJHDQghV3EnHP1rJ03wnqFppUujTzK8FxcNLNMvdT/D9aAOfvL3UtS8C6Vc3Nwsl3JfxlWcZ2/OMAiu+sINfW9V7y8sntNmPLiiYNn1yTWJ4l8EzahFbto94LSSCRJPKcZjcqcjPcfhU1jJ45F9FFeQ6R9mB+eSPfnHtmgDrqKB05ooAKKKKAOH8e/8kc1T/sGr/IVe+Gn/ACTbQP8Ar0WqPj3/AJI5qn/YNX+Qq98NP+SbaB/16LQB1VF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'che_294_2.jpg']
che_295	OPEN	"Study the reactions between magnesium strips and different alkali solutions<image_1>
\text{Description: } \romannumeral1. \text{In the experiment, all magnesium bars have been polished off the surface oxide film with sandpaper} \\
\romannumeral2. \text{No CO was detected in any of the gases generated during the above experiments}_2 \\
\romannumeral3. \text{Mg}^{2+} \text{and HCO}_3^- \text{can form stable complex ions [MgHCO}_3\text{]}^+
Based on the conclusions drawn from the above experiments: ()"		The amount (rate)(or the degree of reaction) of H_2 precipitation when Mg reacts with aqueous solution depends on whether Mg(OH)_2 can be 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yW7W8N3asytIpGAWiK4QjjoxGRwBXIfEDUFtPg4+mapcxWmqRfZ7ZkdgDIySJ86A/eUhS3HbOehoA3ZdR8R+H/HOi2uoaqmpaZrRki8r7KsRtZVTeNhXkqQCMMSR61k+Bp9di1fxkNL07TrmE67MWa6v3gYNheAFhfI6c5H0rpdP0O61S5sddu9ds9Tktrdxpslva7YFLjBlYCRvMbHHBUYzgDOab4S8Jat4avdWmn1u1vY9SuHu3RdPMRSVsdD5rfLx0Iz70AZXw7a6fxn47a9hhhuTewb44ZTKinyuzFVJ/75FdB4z2x6fa3MmpG1jguBJ5KxozXL4OxF3cBg2GBOQNuSMDIqeGPCWraD4h1fVLvXLW9XVZFlnhTT2hKsq7V2N5rYGOxB+taHinSLrV4bFLSz0m4lhuRJv1OEyrAMH51QEbm9BkdevFAGHp2lrHp0uvw3VvrOppm7lKFWSaUDAUOvHyplFwMAksRk1flvY9V8R+EdQgVxDcW1zModcMFaNCMjsea6Cxs5bVMz3s11MRgu+FUewVQAB+Z9zWJBZ65e+No77ULS0trCwt5Yrd4rgyNcNIUOSpUbcBMY55NAG3d29qElubmWVI0Xe7ee6KoAznAIA6ZriNBvLPSdNGqarHf28Gt3rXCXPmybI97BYVkw2VJQJ8xGOcEjiuo1TS59ekFpefutJVsywhvmuiDwrEdI/UdW6HAyGsa21/Dpch03S7bUpVHFpPP5IfHYMVYZ+oA9xQBl+FC8mqeJpDPcSRrqXkxLLM7hAkUeQu4nHzFulQfFD/kmXiD/AK9T/MVo+EtKvNL0iT+0fKF9d3Mt3cLE25UaRidoOBnAwM+1N8ZaBeeKPDlzo1rqENil0uyaWS2Mx2eijeuD7nP0oA1YED6fb5jR2WNWQP03AceuPrXD+G7q/j+JuqxeIdLitdVu7NGtZrWYywPbRtgqCVU7gz8kjnjgY56afTNdfw9BZ2+uwWupxlc3kdiGR1B+6Ymc9RwcNnuMdKdY6NLDqJ1fVbyK61BYDAskUPkxRR53NtUsxBJAySx6DpQBh2909j8ZLvT0/wBRqOkpdOo6CWNym78VIH/ARXbVzOlaWbvxlqHiaVSqNbJY2YYYJjUlmf6Mx49lz3rpqACiiigDn/Hf/JPPEv8A2Crr/wBFNXQVz/jv/knniX/sFXX/AKKaugoAimieUAJPJDg8lApJ/MGuA8dXd5Y6tp8lpdySz6dDLfMZEQhM4iXOFHXe3/fJrvLuW5jjAtLcTStwC7hUX3Y8n8gfw61zuo+E5rnw/q8KXMc+saio8y5lBRCV5VABkqg6Acnkk5JNAGxJpdxJfWtz/bOoKsDEmBfKEc2RjD/u8kfQiua1Wa3h8dah9oF4c6PHt+zRyt/y0l6+WP51fnHjG9nslaw0SzhjuUkmkTUJZ2KD7yhfIQZPu1dBNEkbSXUVoktyyBMgAMwB4BY9gST+fFAHA6FDaX+oaNFPpkeoLD4dt2wyI+ws3H3yMZ2mui8HJHb6XqCQ23kompXW2FFUbf3h4AHFXLDSrmxW8vS8M2qXZDSFsrGAowka9woBPODyScc4qDw7Y6ta6HcfbEtbXUbm5muCisZo4t7kgZ+Utx9KAMOGdDrsd1pWsXDw69fMrrEI0+ztHBhgweNmLfu8FTtxn25js9QLajpuuXM1/d3JuLnTLayUROzDzQrS5VEwAItxznAPX10m8JXq6tBqNvfadBKl093IEsHxLI0XlknM3HGOnpTNM8J6xpEMxtdZsDdSSyOJ5tNdiivIZCijzgAMk/XjOcCgCfx1E76VZFbiSMf2lZjaoXr56c8g1zXivMP9rWrXM160tlZW3nyBN0jNcuCPlULkDPQDpXa6r4cs9YuobjUWuLqGFBix8zFvI4OQzJ0Y+gYkDjjPNQvos2qXUFxfhILe1BNpZR8hHKld7kcFgCQFHAyeW4IAKnhO4Oo6pq+rx288VpfrazW5lTbuXyR+HHfBqp4gi/srUrnU9PvZLWQ2ywlY4o0hRt7NvkkZWySXHyqN59Dnifw7pniXTzo9new6XHYafaG3eSC7kkkmO1QrbTEoX7vTcetXtQ0a9v7l51MEDqSY38xpJOmPkZgVhz0JVWOD1BoA4bTo59S8Ky+G7S61OXUHeSO6guRDbxhmPmMzMY2Ybg+4KNzDODjBr1hQQiggA45wc1weh+DJ5rbVJNQtF0WW5kjNtHZXZmeBogwE3mFRudizE5ByDhs5Irr9Jt9QtdOih1S/jvrpeGuEg8nf6EqCRn6ce1AF6iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArn/Bv/ACA7n/sK6l/6WzV0Fc/4N/5Adz/2FdS/9LZqAOgooooAK8/+Fn/M6/8AY133/slegV5/8LP+Z1/7Gu+/9koA9AooooAKKKKACiiigAooooAKKKKACiiigDz/AP5uF/7lT/27r0CvP/8Am4X/ALlT/wBu69AoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDn/Hf/JPPEv8A2Crr/wBFNXQVz/jv/knniX/sFXX/AKKaugoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArn/Bv/IDuf+wrqX/pbNXQVz/g3/kB3P8A2FdS/wDS2agDoKKKKACvK/h7Br0tx4zbS9S022g/4Si+DJdae87FspyGWZABjHGOx5549Urz/wCFn/M6/wDY133/ALJQB0H2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHP/Y/GH/Qd0P/AME03/yVR9j8Yf8AQd0P/wAE03/yVXQUUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQBz/2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHP/Y/GH/Qd0P/AME03/yVR9j8Yf8AQd0P/wAE03/yVXQUUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQB5P9m8Sf8L12f2rpX27/AIRrPnf2ZJ5fl/afu7PPzuzzu3Yxxt713H2Pxh/0HdD/APBNN/8AJVc//wA3C/8Acqf+3degUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQBz/2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHP/Y/GH/Qd0P/AME03/yVR9j8Yf8AQd0P/wAE03/yVXQUUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQBz/2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHP/Y/GH/Qd0P/AME03/yVR9j8Yf8AQd0P/wAE03/yVXQUUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQBz/2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHP/Y/GH/Qd0P/AME03/yVR9j8Yf8AQd0P/wAE03/yVXQUUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQBz/2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHP/Y/GH/Qd0P/AME03/yVR9j8Yf8AQd0P/wAE03/yVXQUUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQBz/2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHP/Y/GH/Qd0P/AME03/yVR9j8Yf8AQd0P/wAE03/yVXQUUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQBz/2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHP/Y/GH/Qd0P/AME03/yVR9j8Yf8AQd0P/wAE03/yVXQUUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQBz/2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHP/Y/GH/Qd0P/AME03/yVR9j8Yf8AQd0P/wAE03/yVXQUUAc/9j8Yf9B3Q/8AwTTf/JVH2Pxh/wBB3Q//AATTf/JVdBRQBz/2Pxh/0HdD/wDBNN/8lUfY/GH/AEHdD/8ABNN/8lV0FFAHB+NLXxUvgXxC1xrOjSQDTLkyJHpMqMy+U2QGNyQDjvg49DW59j8Yf9B3Q/8AwTTf/JVHjv8A5J54l/7BV1/6KaugoA5/7H4w/wCg7of/AIJpv/kqj7H4w/6Duh/+Cab/AOSq6CigDn/sfjD/AKDuh/8Agmm/+SqPsfjD/oO6H/4Jpv8A5KroKKAOf+x+MP8AoO6H/wCCab/5Ko+x+MP+g7of/gmm/wDkqugooA5/7H4w/wCg7of/AIJpv/kqj7H4w/6Duh/+Cab/AOSq6CigDn/sfjD/AKDuh/8Agmm/+SqPsfjD/oO6H/4Jpv8A5KroKKAOf+x+MP8AoO6H/wCCab/5Ko+x+MP+g7of/gmm/wDkqugooA5/7H4w/wCg7of/AIJpv/kqj7H4w/6Duh/+Cab/AOSq6CigDn/sfjD/AKDuh/8Agmm/+SqPsfjD/oO6H/4Jpv8A5KroKKAOf+x+MP8AoO6H/wCCab/5Ko+x+MP+g7of/gmm/wDkqugooA5/7H4w/wCg7of/AIJpv/kqj7H4w/6Duh/+Cab/AOSq6CigDn/sfjD/AKDuh/8Agmm/+SqPsfjD/oO6H/4Jpv8A5KroKKAOf+x+MP8AoO6H/wCCab/5Ko+x+MP+g7of/gmm/wDkqugooA5/7H4w/wCg7of/AIJpv/kqj7H4w/6Duh/+Cab/AOSq6CigDn/sfjD/AKDuh/8Agmm/+SqPsfjD/oO6H/4Jpv8A5KroKKAOf+x+MP8AoO6H/wCCab/5Ko+x+MP+g7of/gmm/wDkqugooA5/7H4w/wCg7of/AIJpv/kqj7H4w/6Duh/+Cab/AOSq6CigDn/sfjD/AKDuh/8Agmm/+SqPsfjD/oO6H/4Jpv8A5KroKKAOf+x+MP8AoO6H/wCCab/5Ko+x+MP+g7of/gmm/wDkqugooA5/7H4w/wCg7of/AIJpv/kqj7H4w/6Duh/+Cab/AOSq6CigDn/sfjD/AKDuh/8Agmm/+SqPsfjD/oO6H/4Jpv8A5KroKKAOf+x+MP8AoO6H/wCCab/5Ko+x+MP+g7of/gmm/wDkqugooA5/7H4w/wCg7of/AIJpv/kqj7H4w/6Duh/+Cab/AOSq6CigDn/sfjD/AKDuh/8Agmm/+SqPsfjD/oO6H/4Jpv8A5KroKKAOf+x+MP8AoO6H/wCCab/5Ko+x+MP+g7of/gmm/wDkqugooA5/7H4w/wCg7of/AIJpv/kqj7H4w/6Duh/+Cab/AOSq6CigDn/sfjD/AKDuh/8Agmm/+SqPsfjD/oO6H/4Jpv8A5KroKKAOf+x+MP8AoO6H/wCCab/5KqPwMJl8NyLcSRyTjU9QEjxoUVm+2TZIUkkDPbJx6mukrn/Bv/IDuf8AsK6l/wCls1AHQUUUUAFef/Cz/mdf+xrvv/ZK9Arz/wCFn/M6/wDY133/ALJQB6BRRXL6rreq2fjXR9GgNl9m1FJn3vCxePywpI4cA5z14x70AdRRXL6dreq3XjjVNElaz+zWMMM+9IWDyCTdhfv4GNvXnPoK6igAooooAKKKKACiiigAooooA8//AObhf+5U/wDbuvQK8/8A+bhf+5U/9u69AoAKK5DV/iLpei3jpc6fq72MUnlT6nFaFrWFs4O585wDwSAQDx1rrUdJY1kjYMjAMrA5BB70AOoormfFHjOHwrdWMNzo+qXYvpVggktFiZWlbOEO6RSDx1xj3oA6aioreV57aOWSCS3d1DNFKVLIfQ7SRn6Ej3rnrvxxptpcXWbe8lsbOUQXmoRIpgt5Dj5WO7ccZGSqkLnkjmgDpqKQEMAQQQeQRWSniSxfxQfDypci9Fs1yS0JWPYGC8McZ5PbI460Aa9FFFABRRWJ4s8QHwv4fn1YWTXYiZAY1kCfeYLnJ+vYGgDbopjOREXVGchchFxk+wzgfnXNeHfG0fiTVb7T4ND1a2awlMN1LciEJFIBnb8srEn/AHQRQB1FFFczNqGqQ/ESCwNyj6bNpks6WyQgMJEeMZLk853HA+UDvnrQB01FcxovjnT9Y8Q3egS2d9pmrWyCQ2t8qK0iH+JCjsGA9jVu48Rvb+JYNE/sTU5GmQyJdJ5Pk7BtDMSZAwwWAxtz6A0AblFFFABRXPT+Lrb+07jTtMsL7V7q2OLlbFY9sB/us8jom7/ZBJ9qsab4msNSlv4dtxazaeqtdpdx+WYtwJ5J4IwM5BK+hNAGzRXLx+Nobm0+32WiazeaXgkX0MKbGUdWVGcSsPdUOe2a3tN1Kz1jToNQ0+4S4tJ13RyoeGH+e3agC1RSMyopZmCqBkknAArnbvXNUsLq6jewjuYneH+z5IS37xXID+ZgNtCdS/TBFAHR0VxkPibU/wDkKGTSJdKvEUWa/a5FLSDIKqxhG7dxhTyTnGR03nvNVPh9blLCGPVjD5n2B59wLDkpvA/DdjAJ6UAatFc9qOuTiO3tYgltd3zNBbncXZJQpZsgIwwuCCelO0bVNV1PTtMuo4tPnik4up1lljzgEFo0aPkbhxkgY7mgDfoqi2po2rf2bbp5syIJJzuwIVOduf8AaODgegJ44zeoAKK5bVfGyaV4ntNAfQdXnurwMbZ4RB5coUAsQWlBGM/xAe2aXXvGsega5YaTLoerXU2oMUtZLYQFJWAyRlpVIIHqB7ZoA6iioLm6is7KW7uD5cUMZkcn+EAZNcvD4rk0rQV/tyUNrTWcl8LWKE5CFsIhxxuyypzjcc4oA6+isCw1o2Gk6XFrk8rajcGOB3WzkVXmYdB8uAODz04q7rmoXWlacb62snvViYGaCL/WMncoO7DrjvigDSorAsdTvLnxtqtgZF+w2tnbuqFBuEjl88/RRwa3sjJGRkckUALRWR4g8R2Phqzjub5LlkklSJfJhL/MzBRk9F5I6kVb1TU7fR9Nnv7oTGCBC7+TE0jYAyeFBPagC5RVTStRh1fSbPUrdXWC7hSaMOAGCsMjOM880anqdlo+ny3+oXKW9tEMvI5/IDuSegA5NAFuisW016e+sJryLRNRiijwyi5RY3mTuUTcWB9nCnmtOyvLfUbKG8tJVlt5kDxuvQg0AY3jv/knniX/ALBV1/6Kaugrn/Hf/JPPEv8A2Crr/wBFNXQUAFFZXiTUZ9L8P3dzZx+Ze7PLtYxj55m+VBz/ALRFZl1qviFdJQwaRdC9gZPNaX7P5cqgDecLKSuQWx3yBxjqAdRRXM6Jr2o6nOt3/Zl42nXxV7VswAQw7c72/ebjuPYKSMj3q94k1G7sdKePS4hNq1wDHZxHpvx95vRV6k+2OpFAGxRXJX3ii+0nQ7Bzb2mpaldMsEMME5Q3EvRsDYdoXBLZ+7g5rqsv5WQi+ZtztLcZ9M4/XFAD6K4zxR4j1fTvDmoXNv8A2TBcwRFlK3/mMpH+yYsE+1Xj4gvTdWdon9gm4uHwsZ1Vt7qOXKqIuSBzigDpaKz9SvksCjT6lY2cb/Kv2rjc3XAJYdqw7fxZHPq13bHV9ES0gVAtyZRmRyMlQu/oBjnPU4xxQB1lFYdhfyajrG618QaZd2sERE1pbRBn3MflYv5h2jgjGOefwfrGunSNIub+XT7nbEmVGY8sx4VQN2SSSAB70AbNFYei3WtR6Daf2xZSzal5QM5hESAvjkAb/wAO34VNHrMqaOt5qOm3lhM24G32faGQjPJMW4Y75oA1qK4bSvGVzc+EtLvyJHupRaxztPZSRo7TOq7kYhVbGScLn8M1tW2p6lP4vm0xXtZLK0tRJcyLCysJXPyIDuI+6CTx3X1oA36Kqalqdlo9i99qFwlvbRlQ0j9BkgD9SKybXXDHrmvLfXUaWFm0AjZlwsYaPcSzeme54HrQB0NFIrK6hlYMpGQQcgiuFutZ1l/EesWsFzdG3tZkSNYYSQuYkYglbaTPLE8t36UAd3RXFaVqmtP4osrW4mujZyQTPKJoSBldu3k28WOp7n6V0Wvaquj6DdX6qZXRP3Ma8mWQ8Io9yxA/GgDTorjdK8ZiHSrWPVTHNfrGouJIrq0RWfHOB5/HP+RWzofiFNekna2s5FtIjtF0LiCVHcH5l/dyMQRx1xQBs0VlS6jd2eqyreRQDTGiDw3KvhlYAllZT2AXduGPTHesrQ9d1qTSHvNS0a+cyySTRBBAmyAsTGCDIDnbjOQDQB1VFZ+naqmqaJaapb20/l3USSpE20OAwyM847+tZ+r6lqjp5OjWx/tCF45Ht5miw8RbBz8+QMbiCO69+RQB0FFYg8QtcTGOw0y4vDFc/Z7rypoR9nOMktl+2RwMnmk8T+Il8PW1k4SCSa7u0t0WacRIAclmLEHAChj07YoA3KK5Kz8X2Uni/VLSbWtP+wRWtu8H7+MDexkD/Nnn7q8dq6HTtW07WIpJdNvre7jikMTvBIHCuOoyO9AFyiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArn/Bv/ACA7n/sK6l/6WzV0Fc/4N/5Adz/2FdS/9LZqAOgooooAK8/+Fn/M6/8AY133/slegV5/8LP+Z1/7Gu+/9koA9ArjNe/5Kn4P/wCuF9/6AldnWHqHh5r7xNput/bTHJp6yJFEIgVYSABtxzk9OMY/GgDH0b/krXij/rwsv/aldpWHZ+Hms/FN/rv20vJfRRxSQmIBVWPO3ac5z8xznP4VuUAFFFFABRRRQAUUUUAFFFFAHn//ADcL/wByp/7d16BXn/8AzcL/ANyp/wC3degUAc74qtF1TRZ/DdqqCXUIzE+0cQxNw8hH0zj1bHuRh69Hc2njzwfpFnqN5bWE1vcxyQwybVZY4129uvPXt2weauT/AA/ea/urxfGPieGS6ffIIbmFVHYADyuABwBVmfwPBNq+jaius6rFLpMfl26q0TKwIw5ctGSxYDk5+mDQBy9nY3lynjTS31/Whb6TMWsnW9cSxloRIMyZ3uAc4DEjB5B4wzVtQuNV8JfDfULt99zcanZSStjG5jGxJrpofAaQSa3IniLWt+s/8fRJt+DgLlf3XynaNv0PrgipJ8MraXTtHsD4k10W+juklmoa3BRl+6SfJ+bAOOcigDt5HVEyzBegBJxyeAPzryTw+QPgFr7XOPNKaiZ9/XzN75z79K76Hw1OL+1ur3xHq9+ts5kS3nFukZbBALCOJCcZyMnGcGoLrwNpl1cXe64vI7G9mE93p0bqIJ5OPmYbdwzgZCsAccg5NAFzwh5//CF6H9p3ef8AYId+7rnYM5rGm/5LRaf9gGT/ANHrXR/2Sn9upqovL1dlv9nFoJsW+M53bP73bPpWXJ4QWTxgniX+29UW5SPyFgHk+SIiwYx48vOCR1zu96AMa6W7vvi1c6TJquoR6e+iiYwQ3BjAYylcgrgqcDqDn3rmGl1UfDDWNXbxBqzX2iXlxFaSfaSNyxTYHmAf63I4O/P4c59Ak8Ho/i6TxImtanFdvb/ZvKTyPKWPqFAMZPDfNkknPtxWYPhpa/8ACN6hoJ8Qa21lfztPPloN5ZiS4B8rgMSCfpxjnIBFHdy+KfHGpaLdXV5bWenWNvKsdpcvbtLJKCS5ZCGIAAAGccnOeK5rVNT1G7+F/ivTdSne6l0nUhZJdOPmmQSRlS3qwDYJ74rupvBVu9zZX0Wralb6rawfZv7QhMQlmi67ZFMZjYDt8uRSan4E07UvDD6At5f2lrLN59xJbunmzuW3Euzq3JbB4x0A6cUAdBcyzw6fLLbW/wBonSItHDvCeYwHC7jwMnjNcJ8MLi7utQ8Xz39l9hu5NVDS23miXym8pMruHDY9RXdwW0kNgls13PLIsez7RIE8xjj7xwoXP/Ace1ctpvgF9Iub+4sfFevRS3832i5Yi0ffJjGcNAQPwwKAOh1HR9H1vbFqenWN/wCScqlzAkvlk9wGBxmqE2g3r+MrTW47+2S1t7V7X7J9kJYqxVifM8wAcouPl6Z+ovaPpI0i2liN7d3sssrSy3F2ymR2OB/CqgAAAAADAFaNAHn/AIh8J/8ACSapq1xZT/Y9bsJoZtPvV6xv5Q+U+qN0Ip3hfxUPEXiC1jvIvsesWFlcQ6jaNwYZA8XI9UbqD6V0WmeHJNN1q81I65qd2bsgyQXHk+UCBhdoWNSMDjrz3yeatNoOnHXm1oQBb57Y2ski8eZHkEBvXGOD70AeaRajfwan4b1Gy1LVL23vdW+zT6hcXLpBeI2/iO2LMqqMYDYX7uRkHNdte6pr1hrllFLFZSWOoSSwRRRI3nQMqM6szlirghDkBV25HLYyaUPw00yCysLNdV1kwafdi6s1NyuICCfkX5eV5I5ywHQir8Fv4kPiE3FxZaV9kVvLhl+3SPJFD3whiALtgZO/A464+YAwPgqd3w+V5eb1r24N4T9/zfMOd3vjFL8Y4XX4ca5NZDF08USzlD8xgEnOR6YLfrW/L4MtU1e41PStR1DR7m6O65+wtGY52/vNHIjru9wAa1rfSbaG1mglDXX2gYne5w5mGMYbjGMZ4AA54FADtJMB0eyNts+z/Z4/L2fd27RjHtivMPAt7daZ4d8V3VvfWNhpkWuXLQXV8heGOIEZwoZc5bgYYck9eh7KHwRDaWhsLLXNZtNL5AsIpk2Kp6qrlDKq+yuMdsVovYz6LpNtp/hzStOa3iGzyJ7loERfYrG+4k9c49c0AT6Hez6l4fsL67iSKa4t0lkRDlQSM8e1cbbXGhWul61FZzT3ml2W+JYLd9+/70sqAjpGN6qegAXGfXsdA0ldC0O101GVlgUj5V2qMknCjsozgD0ArPi8Ny2+jeILNbpJZtVluJldk2BDIu0KcZzjA5/SgDj7ya3ttAnub6C61WLVmjjuLD7JPHEFYhYktyyBQVyAM43HnK102uX+lS+FbbUtXW50kQOlzbx3EixXAkTkIME8sPlKg5IYjvS3PhW/m0jTbP8Atq4lNrNayOkqxCNhE6sQNsYb+Hjn61qeJtGk1/Q5dOjuFgMkkTl2TeMK6sRjI67cZ96AORFhrkuvNEZVW6bR2SFTjELPIPMlJ65JyQB6KD3xL4Vtob3xJA8ENotro9s8UbW6Yw0hG1H/AOmiIhDf7w9a6a80y/fXzqFpNBGrWf2bc+SyHfu3BcYP4kf0NCz8JXOiags+has8MEz+Zf295Gbhbhz1kB3KUkPfB2/7PFAGd8OpZL6TxbdzOwuJdcniY91VAqIPwArkrWPWr34Zal4jXxPq8epaZcXctuftP7siKRvldejggYwenGMc59CtNPPhvW9XvEilk07UWF24hjaRopwuH+VQWIYKpGAeQfUVxvgDwudV8PXlpqsuvW1u9/NNPpdzbmCGZWkLLy8YcgjGVV8eo5OQB+uXGo6p48+H13aSW9pe3Fhcy5uIGlRC0aEgqHUnr/eqXxLDrUXxA8CHVdQsLpDez7Ba2LwFT5RzktK+f0rpdU8Dx6p4ms9dOu6tbXNiGW1jg8gRxKwAYAGIkg4/iJ9sU7XvBMev65YatLrmrW02nsXtY7YwBImIwThomJJHqT7YoAseNZtMt/DM1xq97NaWcMkcheGQKzMGBVOQQQxwMH17day/Duj297aPetJeNfTP5zTTLIyowH7tVMozIqZJB5UklvTHR6zZX19pT21hfLaXJK7biSBZduCCTtPGcdPQ4pdP0mOxw8lxc3lz/FcXUm5ie+AMKmfRQBQBzd7d32oab4Yl1G0+yX39rossPQEoJAWXPO0hdw9iK6u6trJw091DAwRcs8qg7VHPU9qxb3RdX1DxRYXVxf2n9j2UhuI4EgYTNLtZAGbcQVAYnoDn86vanpLaywtr11/swEF7dOtx7Of7meqjr3OMggHH6cy2en6l4t/sBbyzvrgzeTHGPOS1RQiOiEfNkAuVyDhuMnitbw9DaSeO/EN3bQRxqlvaQqVjCnBVnP8A6GK6W+jvDYummy28FyF/dmeIvGD2BUMpx9DWX4X0W+0uC9utWuLefVNQn+0XLWyFYlIVUCoGJOAFHJ5NAGT8Uv8AkS/+3+z/APR6V0HiX/kVdY/68pv/AEA1V8VeFovFlhHZXOp6hZ26SLIy2ZjG9lIZSS6MeCM8Y981Z1HRX1Lw++ky6tfJ5kflS3UYiE0ikYOcoVGR6KPbFAFXwN/yIPh//sHQf+gCuc8XRXGr/Ezwxo5untbWKC4vwyqrFplwqkBgQWUMSMggZ6V02m+GU03wsfD6arqUkCwmCK4eRFnhTbtAVkReR2JBPvTb7wpZ31lpsT3d6l3puPsuoLKDcIdu0kswIbcOoYEH0oAzfCmrasfEviDw7q1z9uOmmGWC9Mao8kcqkhXCgLuGMZAGfSq/w0nk8jxHY5zBZa5dRQegUkPgfQsa37LSofD1rdzwC6v766fzJppSDLcSYwuSAFUAADgBRR4X0MaBo/2Z3ElzNNJc3Ui9HlkYsxHtk4HsBQBB47/5J54l/wCwVdf+imroK5/x3/yTzxL/ANgq6/8ARTV0FAGF4rtpJdGmmitobhoIZXUTSlBGdh+cYVssOcdOtcrZ2Ev/AAi0dzfWGh28MllHcGQWMl3JKREN0kjAIA313fWvQL61F7YXFoXaMTxNGXXGV3DGRn61zsHhIx6TDofnldLRVWdi5knvAABtdj91eMEDPHAKjigDB8IWQstP8PtZJZRTyW8cTzp4fk8woqgsjzK+1CSOpOM9jXV6xJcWIlv1e2tY1U+dcuocrGP9p3QJ6/xCh9K1O01tLnSry3jsJ2zeWk8RYA4+/EQRtY4AIOQevBzmbUtEXWLhBqEgksYmDpaBfkdx0aT+8AeQvTPJzxgA4C20q6j8Yaveabe3cOoJFCFuJEt5WujIpYhlLKgB2jAj2ZxyTXdaNH4guNJJ1m6hgupACotbURvD6hsySoT9DiquneG7l7vXZNeksr2LUjHGsUMLIoiRSBuDMfm5PQ9gRjtd0jRJNP0b+zLzULm/jWRjHJM7eZ5e7KozA5bA4yevegDlPEIuteubjwnpGvXFxcPGWv3kSAx28fTHyxgl2PGAeOp7A37dtV1sQRWOqatHb4K3lwxt42gcdY0HkHcwPB6DGec8Vdm8NXqeJ4rzTby30/TlsRatFBbjzBhy3yZ+RRz/AHT+HWpdR8Lyvd/btF1e40m9baJ2RBNHcAYH7yN+C2BjeMN6kgYoAZ4gXGv+EwSWIvpBuOMn/R5eeK5u6VvKvz9svAv/AAkcP7gQr5R/fxdW2Z/8errda0S71O80WWG+aAWNw00kqqpkbMTJ8oKlerc5FVm8HK8EsJ1zVNkt2t43Fv8A6wMrA/6rplRxQAum8ePfEB/6dLP/ANq1heNGupdQ0G5vxax6b/aOxbK8kCRy/upCHmYhgMEDauDjqeThem0rRLjT9e1LUJ757pbuKFFMoUOuzfnO1VGPm9Km1bS5NRvtHnSRFWxuzcOGzlh5bpge+XH5UAcNrTaRM2lRwWPhlJDqlrzY3SSS/wCtXoojXj15rtvE7Tvoc9naMVurwG3jYdU3D5n/AOArub8Kh1/SdS1a605ILm0jsYbuK4nV4mMp8ttw2sGxyQBgjpk57VuSLvjZR1IIoA8p0nTdUXwN4esor4TQXZsWsopBl4XjBkk57piMEZ6ZI4GBWxpFraah4rgl0ee+ijR3v9VzeSkGdhsWBl3bcjBJGOAi9jWvpXhrULDTNNtzeQLPZ2a2qSqhby+BvZQeCxxgE8DA4OSKLfwe+k6pFe6Hqk1oJGzfwzqbhLw/3zkgrJ/tA9MAg4GAC7qOlPrer2v2tMabYSCdYz/y3nH3SR/dTqPVsf3ecW91eHwvqviPUNQt5mS6kt47OFE3PeSeVjy416sc8HsPzrprtdWlZo7R7O2TjE0itMxHf5PlAPvuP0qvp3hu0sr46jPJNf6mV2/bLtgzqv8AdQABUHsoGe+aAM7wf4e/szTbnzIZra0vmWddJnZZFsWI+dFIJBUtzgcD0rntVk1GJ/EU9tDEsNi7+QBAgUBYlbn/AEd88k/xj8K9HmEphcQOiSkfKzqWUH3AIz+Yrnb/AMParqFhdWj6vbqLiJ4ywgn43Ajp5+O9AHP2Fvf3Os6NBe2sc1heRSm6R7ZHRh5eQDm3TAyf7xz0rtJdGtn+yLEBBFZj/R4okUJEcYBC4xkDIHpk1kN4b1b7NbxprMKyW+DE/lXONwGAWUXIDD/ZPBrpIFlWCNZ5FklCgO6JtDN3IGTge2TQBB9jmAwNQuf++Y//AIis3wdd3d94Vsrm+uGuLp9/mSMqg5DsMYUAcYx07Vu1zFjoGq6X4iRrS8tn0FpZrg20iMJopJOSFYcMm4scEAjceT0oAyjZ6Vqs2vWVj5i2NojfaIssFM8g3OgVvujCrkDA+dvU1jww2mj2Wh61qEeh6VDHo8q+aLlVlnd40xwUXJ4buetd3YaB9jn1yR7t5hqs/nEFcGIeWqbQe/3c/jWXF4d8Rx6Tb6ZJq+g3NrAiRotzokjkhMbSf9JAJGAc4HNADrW4m0n4VRXEbeVcWmjhgQB8jrF6Hjgjoals/D013JYazcaxfjURaeWXVIBtD7WZceX0yo61JH4evpNCm0vUtSS8+1XDy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che_296	OPEN	"A chemical group explored the reaction of ammonium ferric sulfate [NH_4Fe(SO_4)_2] with Na_2CO_3 and Na_2SO_3<image_1>.
Data show that Fe^{3+} can oxidize SO_3^{2-}. Aiming at the phenomena in Experiment II, the group designed and implemented the following <image_2>experiment.
Explain the possible reasons for the differences in phenomena in Experiments II and IV based on the principle of chemical reactions ( )."		The rate of reaction Fe^{3+} + HSO_3^- \rightleftharpoons \left[Fe(HSO_3)\right]^{2+} is greater than the rate of redox reaction between Fe^{3+} and +4-valent sulfur; in Experiment II, Na_2SO_3 was excessive and c(Fe^{3+}) was low; In Experiment IV, Fe^{3+} was excessive, c(Fe^{3+}) was higher, the rate of redox reaction occurred faster than in Experiment II, and the reverse movement of Fe^{3+} + HSO_3^- \rightleftharpoons \left[Fe(HSO_3)\right]^{2+} was continuously 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'che_296_2.jpg']
che_297	OPEN	"To explore the differences in preparing different metal ion monoamine ligand solutions, the experimental operations and phenomena are as follows:<image_1>
Data: ① The concentration of saturated ammonia water is about 14mol·L^{-1}
②Co(OH)_2 is a light blue precipitate
③ The [Co(NH_3)_6]^{3+} solution is red and is converted into an orange-yellow [Co(NH_3)_6]^{3+} solution under the catalysis of activated carbon
Comparing the reactions before adding excess ammonia in Experiment i-a and Experiment i-c, it is speculated that NH_3 has a certain promotion effect on the formation of [Cu(NH_3)_4]^{2+}. Design the <image_2>experiment shown in the figure below: Repeat experiment i-a in test tubes 1 and 2 respectively, and then add different reagents respectively. Experimental phenomena confirmed the prediction. The experimental phenomenon is ( )."		The precipitate dissolved in tube 1, but not in tube 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', 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'che_297_2.jpg']
che_298	OPEN	"The experimental team explored the reactions of \( \text{NaHSO}_3 \) solution with \( \text{CuCl}_2 \) solution and \( \text{CuSO}_4 \) solution respectively.<image_1>

It is known that: \( \text{Cu}^+ \xrightarrow{\text{concentrated ammonia water}} [\text{Cu(NH}_3\text{)}_2\text{]}^+ \, (\text{colorless solution}) \xrightarrow{\text{exposed to air for a period of time}} [\text{Cu(NH}_3\text{)}_4\text{]}^{2+} \, (\text{deep blue solution}) \)

After the solution of Experiment I was left to stand for 24 hours or heated, a red precipitate was obtained. It was verified that the red precipitate contained \( \text{Cu}^+ \), \( \text{Cu}^{2+} \) and \( \text{SO}_4^{2-} \). The presence of \( \text{Cu}^+ \) and \( \text{Cu}^{2+} \) in the red precipitate was confirmed through Experiment IV <image_2>. Some students believe that Experiment IV is insufficient to prove that the red precipitate contains Cu^{2+}. Design Comparison Experiment V for Experiment IV to confirm the presence of Cu^{2+}. The plan and phenomena of Experiment V are: ( )"		Take a small amount of pure Cu_2O into a test tube, drop enough concentrated ammonia water, and dissolve the precipitate to obtain a colorless solution. After being exposed for a period of time, the solution turns dark 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']	['che_298_1.jpg', 'che_298_2.jpg']
che_299	OPEN	"An experimental group explored the reaction between SO_2 and K_2FeO_4, and the experiment was as follows.
Information: i. K_2FeO_4 is a purple solid that is slightly soluble in KOH solution; it has strong oxidizing property, rapidly produces O_2 in acidic or neutral solutions, and is relatively stable in alkaline solutions.
ii. Fe^{3+} can form [Fe(C_2O_4)_3]^{3-} with C_2O_4^{2-};<image_1>
Access information: a. Fe^{3+}, SO_3^{2-}, H_2O(or OH^-) will form the complex HOFeOSO_2. <image_2>b. SO_3^{2-} and O_2 are catalyzed by metal ions to produce strong oxidizing peroxymonosulfuric acid (H_2SO_5)
Remove part of the orange solution from Experiment 1 and leave it for a long time. Combined with process ii in data a, analyze the reason why the solution in Experiment 1 was ultimately ""almost colorless"":()"		After SO_2 was continuously introduced for a period of time, the acidity of the solution increased, and the generated H_2SO_5 oxidized the HOFeOSO_2 in the orange solution	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAHpBesDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD1Txp8QNJ8CpaNqcdw/wBqJCeSm7pXJ/8AC/8Awt/z56n/AN+P/r1T+NSq/iPwWrAMpvsEEZB5Fesf2Xp3/Pha/wDflf8ACgDzP/hf/hb/AJ89T/78f/Xo/wCF/wDhb/nz1P8A78f/AF69M/svT/8Anwtf+/K/4Uf2Xp//AD4Wv/flf8KAPM/+F/8Ahb/nz1P/AL8f/Xo/4X/4W/589T/78f8A169M/svT/wDnwtf+/K/4Uf2Xp/8Az4Wv/flf8KAPM/8Ahf8A4W/589T/AO/H/wBej/hf/hb/AJ89T/78f/Xr0z+y9P8A+fC1/wC/K/4Uf2Xp/wDz4Wv/AH5X/CgDzP8A4X/4W/589T/78f8A16P+F/8Ahb/nz1P/AL8f/Xr0z+y9P/58LX/vyv8AhR/Zen/8+Fr/AN+V/wAKAPM/+F/+Fv8Anz1P/vx/9ej/AIX/AOFv+fPU/wDvx/8AXr0z+y9P/wCfC1/78r/hR/Zen/8APha/9+V/woA8z/4X/wCFv+fPU/8Avx/9ej/hf/hb/nz1P/vx/wDXr0z+y9P/AOfC1/78r/hR/Zen/wDPha/9+V/woA8z/wCF/wDhb/nz1P8A78f/AF6P+F/+Fv8Anz1P/vx/9evTP7L0/wD58LX/AL8r/hR/Zen/APPha/8Aflf8KAPM/wDhf/hb/nz1P/vx/wDXo/4X/wCFv+fPU/8Avx/9evTP7L0//nwtf+/K/wCFH9l6f/z4Wv8A35X/AAoA8z/4X/4W/wCfPU/+/H/16P8Ahf8A4W/589T/AO/H/wBevTP7L0//AJ8LX/vyv+FH9l6f/wA+Fr/35X/CgDzP/hf/AIW/589T/wC/H/16P+F/+Fv+fPU/+/H/ANevTP7L0/8A58LX/vyv+FH9l6f/AM+Fr/35X/CgDzP/AIX/AOFv+fPU/wDvx/8AXo/4X/4W/wCfPU/+/H/169M/svT/APnwtf8Avyv+FH9l6f8A8+Fr/wB+V/woA8z/AOF/+Fv+fPU/+/H/ANej/hf/AIW/589T/wC/H/169M/svT/+fC1/78r/AIUf2Xp//Pha/wDflf8ACgDzP/hf/hb/AJ89T/78f/Xo/wCF/wDhb/nz1P8A78f/AF69M/svT/8Anwtf+/K/4Uf2Xp//AD4Wv/flf8KAPM/+F/8Ahb/nz1P/AL8f/Xo/4X/4W/589T/78f8A169M/svT/wDnwtf+/K/4Uf2Xp/8Az4Wv/flf8KAPM/8Ahf8A4W/589T/AO/H/wBej/hf/hb/AJ89T/78f/Xr0z+y9P8A+fC1/wC/K/4Uf2Xp/wDz4Wv/AH5X/CgDzP8A4X/4W/589T/78f8A16P+F/8Ahb/nz1P/AL8f/Xr0z+y9P/58LX/vyv8AhR/Zen/8+Fr/AN+V/wAKAPM/+F/+Fv8Anz1P/vx/9ej/AIX/AOFv+fPU/wDvx/8AXr0z+y9P/wCfC1/78r/hR/Zen/8APha/9+V/woA8z/4X/wCFv+fPU/8Avx/9ej/hf/hb/nz1P/vx/wDXr0z+y9P/AOfC1/78r/hR/Zen/wDPha/9+V/woA8z/wCF/wDhb/nz1P8A78f/AF6P+F/+Fv8Anz1P/vx/9evTP7L0/wD58LX/AL8r/hR/Zen/APPha/8Aflf8KAPM/wDhf/hb/nz1P/vx/wDXo/4X/wCFv+fPU/8Avx/9evTP7L0//nwtf+/K/wCFH9l6f/z4Wv8A35X/AAoA8z/4X/4W/wCfPU/+/H/16P8Ahf8A4W/589T/AO/H/wBevTP7L0//AJ8LX/vyv+FH9l6f/wA+Fr/35X/CgDzP/hf/AIW/589T/wC/H/16P+F/+Fv+fPU/+/H/ANevTP7L0/8A58LX/vyv+FH9l6f/AM+Fr/35X/CgDzP/AIX/AOFv+fPU/wDvx/8AXo/4X/4W/wCfPU/+/H/169M/svT/APnwtf8Avyv+FH9l6f8A8+Fr/wB+V/woA8z/AOF/+Fv+fPU/+/H/ANej/hf/AIW/589T/wC/H/169M/svT/+fC1/78r/AIUf2Xp//Pha/wDflf8ACgDzP/hf/hb/AJ89T/78f/Xo/wCF/wDhb/nz1P8A78f/AF69M/svT/8Anwtf+/K/4Uf2Xp//AD4Wv/flf8KAPM/+F/8Ahb/nz1P/AL8f/Xo/4X/4W/589T/78f8A169M/svT/wDnwtf+/K/4Uf2Xp/8Az4Wv/flf8KAPM/8Ahf8A4W/589T/AO/H/wBej/hf/hb/AJ89T/78f/Xr0z+y9P8A+fC1/wC/K/4Uf2Xp/wDz4Wv/AH5X/CgDzP8A4X/4W/589T/78f8A16P+F/8Ahb/nz1P/AL8f/Xr0z+y9P/58LX/vyv8AhR/Zen/8+Fr/AN+V/wAKAPM/+F/+Fv8Anz1P/vx/9ej/AIX/AOFv+fPU/wDvx/8AXr0z+y9P/wCfC1/78r/hR/Zen/8APha/9+V/woA8z/4X/wCFv+fPU/8Avx/9ej/hf/hb/nz1P/vx/wDXr0z+y9P/AOfC1/78r/hR/Zen/wDPha/9+V/woA8z/wCF/wDhb/nz1P8A78f/AF6P+F/+Fv8Anz1P/vx/9evTP7L0/wD58LX/AL8r/hR/Zen/APPha/8Aflf8KAPM/wDhf/hb/nz1P/vx/wDXo/4X/wCFv+fPU/8Avx/9evTP7L0//nwtf+/K/wCFH9l6f/z4Wv8A35X/AAoA8yb9oHwogy1rqSj3hx/Wl/4X/wCFv+fPU/8Avx/9eq3x5srS38I6c0NrDGxv4wSkYBxz6V6dZaXp5sLYmxtifKX/AJYr6D2oA86/4X/4W/589T/78f8A16P+F/8Ahb/nz1P/AL8f/Xr0z+y9P/58LX/vyv8AhR/Zen/8+Fr/AN+V/wAKAPM/+F/+Fv8Anz1P/vx/9ej/AIX/AOFv+fPU/wDvx/8AXr0z+y9P/wCfC1/78r/hR/Zen/8APha/9+V/woA8z/4X/wCFv+fPU/8Avx/9ej/hf/hb/nz1P/vx/wDXr0z+y9P/AOfC1/78r/hR/Zen/wDPha/9+V/woA8z/wCF/wDhb/nz1P8A78f/AF6P+F/+Fv8Anz1P/vx/9evTP7L0/wD58LX/AL8r/hR/Zen/APPha/8Aflf8KAPM/wDhf/hb/nz1P/vx/wDXo/4X/wCFv+fPU/8Avx/9evTP7L0//nwtf+/K/wCFH9l6f/z4Wv8A35X/AAoA8z/4X/4W/wCfPU/+/H/16P8Ahf8A4W/589T/AO/H/wBevTP7L0//AJ8LX/vyv+FH9l6f/wA+Fr/35X/CgDzP/hf/AIW/589T/wC/H/16P+F/+Fv+fPU/+/H/ANevTP7L0/8A58LX/vyv+FH9l6f/AM+Fr/35X/CgDzP/AIX/AOFv+fPU/wDvx/8AXo/4X/4W/wCfPU/+/H/169M/svT/APnwtf8Avyv+FH9l6f8A8+Fr/wB+V/woA8z/AOF/+Fv+fPU/+/H/ANej/hf/AIW/589T/wC/H/169M/svT/+fC1/78r/AIUf2Xp//Pha/wDflf8ACgDzP/hf/hb/AJ89T/78f/Xo/wCF/wDhb/nz1P8A78f/AF69M/svT/8Anwtf+/K/4Uf2Xp//AD4Wv/flf8KAPM/+F/8Ahb/nz1P/AL8f/Xo/4X/4W/589T/78f8A169M/svT/wDnwtf+/K/4Uf2Xp/8Az4Wv/flf8KAPM/8Ahf8A4W/589T/AO/H/wBej/hf/hb/AJ89T/78f/Xr0z+y9P8A+fC1/wC/K/4Uf2Xp/wDz4Wv/AH5X/CgDzP8A4X/4W/589T/78f8A16P+F/8Ahb/nz1P/AL8f/Xr0z+y9P/58LX/vyv8AhR/Zen/8+Fr/AN+V/wAKAPM/+F/+Fv8Anz1P/vx/9ej/AIX/AOFv+fPU/wDvx/8AXr0z+y9P/wCfC1/78r/hR/Zen/8APha/9+V/woA8z/4X/wCFv+fPU/8Avx/9ej/hf/hb/nz1P/vx/wDXr0z+y9P/AOfC1/78r/hR/Zen/wDPha/9+V/woA8z/wCF/wDhb/nz1P8A78f/AF6P+F/+Fv8Anz1P/vx/9evTP7L0/wD58LX/AL8r/hR/Zen/APPha/8Aflf8KAPM/wDhf/hb/nz1P/vx/wDXo/4X/wCFv+fPU/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ZQSvpU1ABXF6v/AMlK0X/rhN/IV2lcXq//ACUrRf8ArhN/IUARaCBe+KNejubmXZFKgRfNIA+Wo9EUjx3rMa3ErwxwDajSFgOa07fwRYHVr/ULxfOkumBA3EbQBiiz8P6V4a1K+1COcw/aI8FHb5QPqaAKvw6/48dU/wCv+b/0Ku0riPhrIk2majLGdyNfylWHQjdXYXl5DYWkt1cMVijXcxAJ4+goA8WtJdYi+NetHRra2uJvLG5biQoAOO4FR/Ee98Q3EtlB4qtEs9E80GWSzPmDOeMk4xUOg+K9Ntfixq+sXAuY7GZAscpt3O48e1bXxA8WW/jLRT4f8P2k95cXLAeY0LIqe5yBQB6hoT2cmiWZsHD2vlKIyPTFN1//AJAF9/1xaqfgzRpdA8KWOnTtuliQbvrW46LIhRwCp4INAHB+Cdfe28H6bCdJ1B9kIG5IuD+tZ/hfXmi8Ua/J/Zd+++RPlWPleD15r0uKJIY1jjUKijAAHAriPCEufGniWPHSSP8AkaAKXiDVH1HxV4cX+z7uALck7po8D7pr0C4gimjPmxq+AcbhmnvDHI6u6KzKcqSOlYviTxAdHSC3htZLm6umMcSIOAfUn05oA8+uoo4/AtztjwDqz5CDBPzmrnihIfM8O4tr0f6QmdzHn5e3NN1XT7zR/D/2PUyiRy3n2kzxqWVSTkggc961NV1TRtaGkyQatbxiylWRvMBUnC470AOvVjHjDQNkNzGcyczEkfdrv+1eV3XiQXHjnT5LrUdPNjbBmjMOS7EjGK9CvdZt7SxW4XdK0gHlRqPmcnoPagDI8capJa6SLCzO6+vT5USjrz3rAFpH4B1DSp1XFnPGLe4bsrdQT+JrotG0S4m1Jta1cK14wxFGOkS+n1rV1vSLbXNJnsLlQUkXAPoexoAvo6yIrowZWGQR3p1eXaBr2teD9Xj8M61ZzXVsxxaXcYyNvo36V6grblDDuM0AcN498FXOvTW2q6Rd/ZdXs+Ym7MPQ/nXN2HxHvbC5XQ/HWmPbO52LdAfJIfX2rrtd1XUtI8VQzw2E1zYGACdoz/q+TzXMeOdd0rxrox0XSraW7v5WAUmFl8v3yQKAMv4zTiWfw1axNusZJFbg8H0r2SzRY7KBEAChFwB9K8/8S/D6fWvAun2CSgalYorROf7wHSptG+INvpmnRWXiSC4s9QhXY48pnD47gqDQBhfHZBFp2j3kfFxFdrsI6/eWuvuPGcOjaTZmeyvLtxbo8xto93l5UctXM6np178SvEVhMbeS30GxfzQ8gwZm4PA9OB+degagLTTdLmPlL8ybAuOW4wBQBZ0zU7XV9PivbOQPDKMqRVpXViQrAkdcGud8J6JJovhZbORgsjBm46LnNct8N9F1bTvEeuzXd+11aPL+7bJxnJz1oA9NooooAo6xcPaaNeXEbbZI4WZTjOCBXG6fpmp+NPCS/wBoawfKuVIZBAv866XxbN5fhu8Rf9ZMhiQepbgVL4ZsG03w7ZWrjDpEu4e+OaAMifwjqFxZQWcmuObeHGEMC4IHY1NN4e1uWS3KeI5I0ibJRbZcMPSunooAyNct7m8sVsYicTfLLJ0wvf8AGooNX0PTLZbNb2GMRLt21tM6J99lX6nFV2SxwxItyT1JxQBwvg7X9Kh1TX2kvolD3zspJ6jiuv0rxHpetTzw2F0szwnD7e1c14LW0/tXxDuWDH258ZA9q6qW90rTWTfLbQNKwVcYBY0Ac94qSSTxLoaxyeW3nfexnsayrP7Ra+O9ala6O6O0V2cIM4BJ6Vr+Jo7mbxHoptFDMsm4lgSoHNUoNN1GLxHr19eRKIZLEorr0JANABaRR6pHc6lZteK99GEeUQDJAHHf3pdJmmn1hdHsb+5thY4aaNrZdr55xn3zVTwqinQYP+J5fQ9fkRMgfTipPBoA8ba6PtUtzyn7yUYP3RQBq+MNG0e7+z3+qTzq8H+qWOdo9zfgapeEbPTba+kup7wTajLwkbOXMadhzV/xqnhlobZvEXKI+6MAMcn8Khi8R2NpDEbbTZILVh+6uGjyCPp1oAZ43/5C3hz/AK/0/ka7MfdFebeLfEVhd6joDxPK4hvEeQrC+AMHnpXTL420ZtQtrFJZmmnOF/csAPqcUAZ/xC1m4tdDntLBC87r+8I/gTv+Nc/YapFB4UmMk8bWssSwxWRHJcjksfc12HjG3ij8M3zogDOMk9zXO6r4dij8KJdafZNNd3McW4L2wvWgCLREOh/YdFvtPs7q9uVLqwQYVeevFbGn3j6T4uTRIdNtoI7lWnd4274z0x7Vm6ho979lfVHtZ11UIqxSJIq+WBjgZ/Gn6Rcm+8e2hlYSXMFipmKsGwxBHUUAP+I+mWw02G8ljM0xuUHzc4HoBU2v2lvdeF5IrTQnNwyLt2wAHtVj4kME0C3duFW6QsfQV0Ftq2nG1h/0+1+4v/LZfT60AclqtvZp4MljbRGWUW5BJgGQcV1PhpUTw3pyogQfZ0+XGMfKKsNqmmMMNfWhB7GZf8axIfE1jJ4z/saGeOQmDeBH8wHA7jjvQBV8SaVZxavFqETbb66H2YBT15zn9Kl8cKsPheOLbkGaJcf8CFY13HF/wtqwt/PkKJbmYRE/KrbsZrW1+U69rFppFp88cUgluXHRQDkDP1FAGb4u02yiTw+UtIUY3sOSqAHrXoCACNR2xXG+PCsR0RmIVFvosseABmtW28Q2dz4h/suK5jkPkeZhG3dwO1AGRquk2th4hWS1lZZtSYK0Sn5flO4nFTXdtoZ8RDTHe7W7lQuFjmZVAH0NZcSpH8WZEkuJJEhtBIqv92PJOcUsDXH/AAk+oeJjAZbJB5KYHIAyGYe1AGZoE2iz2+orrOqTqYpigBuXBC/hXoXh+HT4NHgXTJXltCMxu8hckfU81xvw71DSbmz1CSWW2G+5YgTYU4+hr0C2ltpI/wDRZInQcfumBA/KgCauT+IWg6frnhmdb1hE8Q3xS91btiug1PUrfSbGS8uSwijGTtUsfyFed6H4xtfHHio208NzBa25zBFLEwEp/vHjFAGN8K9Vk1LVG0/xHLI2p2Q228cwwNnY+5r2mvGPjDBbaNf2OuaWsqa1CwwsMbHenocD613Pgbxvb+LNNTdFNBfIg86KSNlwfYkUAdayhlKsAQeoNeOfE6eS91K0tNNhj8izmVp2xgMxONv6ivXL1bh7V1tmVZSMBm6CuF8a6dBpHhaFV5ZrlGkkPVjuHNAGdq2qRzaPqlje6PHZ6hHBkSogw64PRq2fEP8AySOX/rwX+QrW8U2Ml/4SnitYfMuJIgq4AyeKztQ8M6he+Azpi3couGtVj8tsYBwOKANq0sIdU8IwWdwAY5bcKc1i6Fp62/2iwjvWMFlEsImY5ORnNbzWclv4Y+ztO0MkUGDJH1BA7VyPw505dQ8OTyXNzJOkl07MWP8ArOnWgCGTTV8SXS2Gmym10u1ffLOrYaaT696nu9W0OLWLKDxGEtbyybdBcsflfjHX8ayfDg8OxX+rQ6ij7kuCEAVyAMn0p+m6Z4e1b4jTQw2wmtlsw22QNw27rzQB6HqFnZeJdEkg8xZIJl+WRex7EVwtzNd2emXtpp8r3EttAIIpmPTAwxP5V2niKBofDd19lunsvJhZlaLAxgVzHhOHHwxmnkfzZZkkdpD1YnmgDLtYp5fDGlacw8yIEy3Mm3Cnk8H8cVZjL674n0mznsY7eSz3SzKq9sfKfzFatvdWtt4AjEwLPIhCIg+ZmzxWF4H1VdH1W4h8T+Zbatc/6uSb7rR9gD09aAPVKjngjuYHhlQNG4wykcEU5HSRA6MGU9CpyDTjwM0AeITz33wr8YPZ2iNNpeqt+4T/AJ5yH/Ir1bw9pR0+zM0533dwfMmc+p7fQV5J8V/EVndeKNFS2juZjY3O64KQNhf05r2XRtVtdZ02O7s2ZomGMshU/kaAPOJbptT+O0dtIcx2NsSg98jn9a7Dx4CfC8wBwfMjwfT5hXKahYto/wAabLUmyINQhMW7tuyOP0rrfHEcs3hqVIELSGRMADP8QoA8+vobhNQvy91uAktsjYBnk11eq6k2r2f/AAj+jRI7SxhZ5yBsiHf6ms/UPCmut510ot5vPeEmJMhgFJz1+tW9MhtpfHN5b3CBPLgXKlsc4FAGXp2oXXwxjTS72ze8012/d3VuoLZP94V6MupwnTVv3V44Su47xgqPU1yGu2dhH4w0BUCkNK2V3ZB+U11up39lp9r/AKadsT/LgIWz+AoA4jX9NsLKG/8AE9tPJdNc7cJHMUXgY6in6jbwWd3o9ssVwzX5w2bx/k4zxXN6mtlpei6tBaXk01vczCSGAQv8nr29av8AiTxFbvqPh2WzEsjQt8x8lsL8uMnigDodGk0zwrrn9gWv2i5nu3adyPm8vPPzGtTxdo2lapp6SatPLFBAwfMcpTJH0rE0rXdA0e8QyzTT6jfPh5fIbr6ZxwOa3PF66FNomNfP+hFgeh5PbpQBz3huy0pNYF7c3ZMoG20t5ZS5RfXnvWn8QznQLc/9PcP/AKEKhstf0qzsYm0zTJfsAGEuTHwPwPzVneNvEdhe6FbxxvJJKLmJmCQv0DDPagD0K2/49Yv9wVj+KNMgvtIuJLgF1jiYqhPGfcd6pjxxotutpA0sxkl2oAIX4PvxWvrbB9AvGXJBhJH5UAch4Pjsm8FWIbRjJJ5H3xADk/WpvDNlDa6TMl5oL+YZpGG6AE4J4q34D1SwTwZpqPe26OsQBVpQCD9Ca6T+1dN/6CFr/wB/l/xoA5n4dRxx6RcbIPJJnbIK7T1rV8Z24uvCGpxsAf3DsM+oGaoa94o03S77Soo7qBhPcbWERDH7p9KueNbsW3g/UZM8tCUX3LDA/nQBh/C7WTc/Di1ublifsysjH2Wtfwr430rxebsacJR9mkMb+YuOfas74daSdF+HdrDcxkl4zK6Y5+YZxUXw71Xw9qD6nHomkyae8U5EyuMF29aAJ7T/AJLDqf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']	['che_299_1.jpg', 'che_299_2.jpg']
che_300	OPEN	At 25℃, the ionization equilibrium constants of the three acids are as follows: <image_1> Generally speaking, if the equilibrium constant of a reaction is greater than 10^5, it is generally believed that the reaction can proceed more completely; if the equilibrium constant is less than 10^{-5}, the reaction is difficult to proceed; if the equilibrium constant is between 10^{-5} and 10^5, it is believed that there is a certain degree of reversible reaction. Please analyze whether CH_3COOH can react with NaF to form HF from the perspective of chemical reaction equilibrium constants 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che_301	OPEN	The chemical chain reforming combined with CO_2 capture and production of H_2 designed by our scientists is shown in the following figure: <image_1>Effect of adding water vapor in fuel reactor and absorption reactor ()		Increase the yield and volume fraction of H_2 in the product gas through steam shift reactions and promote the absorption of CO_2	che	化学反应原理	['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che_302	OPEN	"The recycling of chlorine resources can improve the utilization rate of substances and is also an important measure to practice the concept of green chemistry. O_2 can be used in industry to convert HCl to Cl_2. The reaction is: O_2(g) +4HCl (g) 2Cl_2(g) + 2H_2O(g) ΔH Known: H_2(g) + Cl_2(g) = 2HCl (g) ΔH_1 = -183.0 kJ·mol^{-1}
2H_2(g) + O_2(g) = 2H_2O(g) ΔH_2 = -483.6 kJ·mol^{-1} When catalysts are used industrially to catalyze the reaction of O_2 and HCl, the relationship between the conversion of HCl and the initial flow rates of HCl and O_2 at different temperatures is shown in the figure <image_1>(the conversion at lower flow rates can be approximated to the equilibrium conversion). At the same flow rate, compare the conversion of HCl at temperatures T_1, T_2, and T_3. At higher flow rate, a&gt;b&gt;c, and at lower flow rate, a'&lt;b'&lt;c', please explain the reason for a&gt;b&gt;c at higher flow rate ()"		At higher flow rates, the reaction does not reach equilibrium, and the reaction rate is fast at high temperatures, so the conversion rate is high	che	化学反应原理	['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']	['che_302.jpg']
che_303	OPEN	<image_1>Bipolar membrane was used to electrolyze Na_2SO_4 to prepare NaOH, trap CO_2 in flue gas to prepare NaHCO_3. It is known that bipolar films are composite films that can dissociate H_2O between the films under the action of direct current to provide H^+ and OH^-. When 2 \text{mol} e^-is transferred in the circuit, the device shown above produces () mol of NaOH.		4	che	化学反应原理	['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che_304	OPEN	Ammonia is synthesized by magnesium chloride recycling process (MCC)<image_1>. Select NH_4Cl solid for conversion. According to the process of synthesizing ammonia<image_2>, the advantages of using NH_4Cl solid to convert Mg_3N_2 are as follows: ()		High ammonia yield and high atomic utilization	che	化学反应原理	['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'che_304_2.jpg']
che_305	OPEN	"The device for converting \( \text{CO}_2 \) into methanol by electrolytic reduction is shown in <image_1>. It is known that the definitions of electrolysis efficiency \( \eta \) and selectivity \( S \) are as follows:
\[
\eta (B) = \frac{n(\text{electrons used for generating B})}{n(\text{electrons passing through the electrode})} \times 100\%
\]
\[
S(B) = \frac{n(\text{CO}_2 \text{ used for generating B})}{n(\text{discharged CO}_2)} \times 100\%
\]
When \( \text{CO}_2 \) is completely consumed, it is measured that \( \eta (\text{CH}_3\text{OH}) = 33.3\% \) and \( S(\text{CH}_3\text{OH}) = 25\% \). It is assumed that part of the discharged \( \text{CO}_2 \) is converted into \( \text{CH}_3\text{OH} \), and the remaining \( \text{CO}_2 \) is completely discharged at the cathode to generate \( \text{CO} \). Then \( \eta (\text{CO}) = ( ) \)"		0.333	che	化学反应原理	['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']	['che_305.jpg']
che_306	OPEN	A reaction principle for capturing CO_2 and realizing resource utilization is shown in Figure 1<image_1>. After the completion of Reaction I, using N_2 as the carrier gas, a mixture of N_2 and CH_4 with a constant composition was introduced into the reactor at a constant flow rate. The amount of each component of the gas flowing out per unit time changed with the reaction time as shown in Figure 2<image_2>. CO_2 was never detected during the reaction, and there was carbon deposit on the catalyst. It is speculated that a side reaction (Reaction III) occurred: <image_3>the reason why the Reaction II rate decreased to 0 during the time period t_1-t_3_____.		The surface of the catalyst was continuously covered with carbon deposits until Reaction II could not 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che_307	OPEN	"Indirect electrolytic desulfurization
The schematic diagram of indirect electrolytic desulfurization is as follows: <image_1>When FeCl_3 is regenerated in the electrolytic reactor, the yield differs greatly from the theoretical value. The possible reason is_____."		A side reaction occurs at the anode, and water electrolysis consumes part of the current to produce O_2, so that Fe^{2+} is not completely oxidized, or the pH is inappropriate, resulting in the hydrolysis of Fe^{3+} to form a 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che_308	OPEN_OnlyTxt	Fe^{2+} ground state extra-nuclear electron arrangement is ()		1s^2 2s^2 2p^6 3s^2 3p^6 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che_309	OPEN	Potassium magnesium fluoride (KMgF_3) is a material with excellent optical properties, and its unit cell structure is shown below <image_1>. Based on this unit cell structure, similar ions can be substituted or partially substituted to synthesize various new materials. The radius of Fe^{3+} is close to that of Mg^{2+}, and partially replacing Mg^{2+} with Fe^{3+} can introduce charge imbalance and reactivity, thereby synthesizing new catalytic materials. A laboratory synthesized a new catalytic material, KMg_{0.1}Fe_{0.2}F_{1}O_{0.1} (O^{2-} is an interstitial anion introduced to balance the charge without disrupting the original unit cell structure). Given that the edge length of the unit cell is a nm, to synthesize a catalytic material with a thickness of 301 \mu m and an area of 1 m^2, the theoretical amount of Fe^{3+} required for doping is approximately ( ) mol. (1 \mu m = 10^{-6} m, 1 nm = 10^{-9} m, and Avogadro's constant is approximately 6.02 \times 10^{23} mol^{-1}).		\frac{1}{10 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che_310	OPEN	Graphite phase carbon nitride (g-C_3N_4) is a new type of photocatalytic material. g-C_3N_4 has a layered structure similar to graphite, and one of the two-dimensional planar structures is shown in the figure<image_1>. The inter-particle interaction forces in g-C_3N_4 crystals are ()		Covalent bond, Van der Waals 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che_311	OPEN	Iron ferricyanide dihydrate Fe\left[Fe(CN)_{6}\right]\cdot 2H_{2}O can be used as a cathode material for proton batteries. Its unit cell shape is a cube, the side length is a nm, and the structure is as shown in the figure<image_1>. It is known that the molar mass of Fe\left[Fe(CN)_{6}\right]\cdot 2H_{2}O is Mg·mol^{-1}, the Avogadro constant is N_{A}, and the density of this crystal is ()g·cm^{-3}.		\frac{4M}{N_{A}\left(a^{3}\times 10^{-21}\right)}	che	物质结构与性质	['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']	['che_311.jpg']
che_312	OPEN	Iron (Fe), cobalt (Co), and nickel (Ni) are Group VIII elements in the fourth cycle, called iron elements. Related compounds are widely used in scientific research, production and life. Metallic nickel and its compounds are widely used in synthetic materials and catalysts. A crystal containing three elements: Ni, Mg and C is superconducting. The unit cell structure of the crystal is shown in the figure: <image_1>the side length of the crystal is known to be a nm (1nm = 10^{-7} cm), the value of Avogadro's constant is N_A, and the density of the crystal is () g·cm^{-3}.		\frac{213}{N_A \cdot a^3} \times 10^{21}	che	物质结构与性质	['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']	['che_312.jpg']
che_313	MCQ	"At 25^\circ\text{C}, the following equilibria exist in a 0.1\ \text{mol/L}\ \text{K}_2\text{CrO}_4 solution:
\[ ①\ \text{Cr}_2\text{O}_7^{2-}(aq) + \text{H}_2\text{O}(l) \rightleftharpoons 2\text{CrO}_4^{2-}(aq) + 2\text{H}^+(aq) \quad K_1 = 3.27 \times 10^{-15} \]
\[ ②\ \text{CrO}_4^{2-}(aq) + \text{H}_2\text{O}(l) \rightleftharpoons 2\text{CrO}_4^{2-}(aq) \quad K_2 \]
\[ ③\ \text{HCrO}_4^-(aq) \rightleftharpoons \text{CrO}_4^{2-}(aq) + \text{H}^+(aq) \quad K_3 = 3.3 \times 10^{-7} \]
The relationship between \(\lg\frac{c(\text{CrO}_4^{2-})}{c(\text{Cr}_2\text{O}_7^{2-})}\) and pH is shown in the figure <image_1>. The following statement is incorrect ( )"	['A. As the pH increases, the value of\\frac{c(H^+) \\cdot c^2(CrO_4^{2-})}{c(Cr_2O_7^{2-})} decreases', 'B. Chemical equilibrium constant of reaction ③ K_3=\\left(\\frac{K_1}{K_2}\\right)^{\\frac{1}{2}}', 'C. At pH = 9.5, the concentration of HCrO_4^-is about 1.0 \\times 10^{-3.8}mol/L', 'D. Relationship between ion concentration in solution at point a: c(K^+)>c(CrO_4^{2-})>c(Cr_2O_7^{2-})>c(H^+)']	A	che	化学反应原理	['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']	['che_313.jpg']
che_314	MCQ	At room temperature, dilute AgNO_3 solution was added dropwise to the mixed solution of Na_2SO_4, NaCl, and Na_2CrO_4. The relationship between-\lg X [X = c(\text{Cl}^-), c(\text{CrO}_4^{2-}), c(\text{SO}_4^{2-})] and\lg c(\text{Ag}^+) in the solution is as <image_1>shown in the figure. It is known that the solubility of Ag_2SO_4 is greater than that of Ag_2CrO_4. The following statement is correct:	['A. Line ② represents the relationship between-\\lg c(\\text{SO}_4^{2-}) and\\lg c(\\text{Ag}^+)', 'B. The Ag_2SO_4 solution corresponding to point d is a supersaturated solution', 'C. When Ag_2SO_4 and Ag_2CrO_4 precipitates are formed simultaneously, c(\\text{SO}_4^{2-}) in solution>10^5c(\\text{CrO}_4^{2-})', 'D. A small amount of AgNO_3 solution was added dropwise to the above mixed solution to precipitate Ag_2SO_4']	C	che	化学反应原理	['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che_315	OPEN	"A synthetic route for the drug oxcarbazepine is as follows: <image_1>The reduction reaction in the synthetic route is ().
a. Reaction ② b. Reaction ③ c. Reaction ④ d. Reaction ④"		ab	che	有机化学基础	['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che_316	OPEN	"Vanadium is an important transition metal, and its compounds have diverse chemical properties and wide applications.

I. Vanadium nitride (VN) is often prepared by carbothermal reduction and nitridation in industry. The relevant thermochemical equations and equilibrium constants are as follows
① V_2O_3(s) + 3C(s) + N_2(g) \rightleftharpoons 2VN(s) + 3CO(g) \Delta H_1 K_1
The known reaction ① is completed in two steps through the following two elementary reactions:
② V_2O_3(s) + 4C(s) \rightleftharpoons V_2C(s) + 3CO(g) \Delta H_2 = +742.0 \text{kJ} \cdot \text{mol}^{-1} K_2
③ V_2C(s) + N_2(g) \rightleftharpoons 2VN(s) + C(s) \Delta H_3 = -304.2 \text{kJ} \cdot \text{mol}^{-1} K_3
In industry, a large amount of harmful gas CO is produced when preparing VN using reaction ①. Methanol can be produced using CO and H_2 as raw materials. The chemical reaction equation is: CO(g) + 2H_2(g) \rightleftharpoons CH_3OH(g) \Delta H < 0. At T_1^{\circ}C, a 2L constant-volume closed container was filled with 2mol CO and 4mol H_2 to synthesize CH_3OH(g). The change of the quantity and concentration of CO with reaction time was measured as shown in Figure 1<image_1>:
At T_1^{\circ}C, a 1-L constant-volume closed container was filled with 2mol CO, 2mol H_2 and 3mol CH_3OH(g). At this time, the reaction would ()(fill in ""proceed to the left"",""proceed to the right"" or ""reach equilibrium"")."		to the 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che_317	MCQ_OnlyTxt	In a constant-pressure vessel at a certain temperature, when the following physical quantities no longer change: ① the pressure of the mixed gas, ② the density of the mixed gas, ③ the amount of total matter in the mixed gas, ④ the average relative molecular mass of the mixed gas, ③ The color of the mixed gas, ④ The ratio of the concentration of each reactant or product is equal to the ratio of stoichiometry, ③ The percentage content of a certain gas, the following options are correct:	['A. What can explain that 2NO_2(g) N_2O_4(g) has reached a balanced state is: ①③ ④ ③', 'B. What can explain that I_2(g) + H_2(g) 2HI (g) reaches an equilibrium state is: ④', 'C. What can explain that NH_2COONH_4(s) 2NH_3(g) + CO_2(g) reaches an equilibrium state is as follows: ①②③ ③ ④', 'D. What can explain that 5CO(g) + I_2O_5(s) 5CO_2(g) + I_2(s) has reached an equilibrium state is: ②④ ③']	D	che	化学反应原理	['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che_318	MCQ	"The electrocatalytic double hydrogenation device for unsaturated organic compounds is shown in the figure<image_1>. It divides the electrolytic cell into four areas through an anion exchange membrane and a palladium membrane electrode. The active hydrogen atoms (H*) generated at the two poles penetrate into the hydrogenation reaction area of unsaturated organic compounds through the palladium membrane electrode, and in the isolated anode and cathode chambers, the electrocatalytic double hydrogenation of unsaturated organic compounds is achieved.

It is known that: Faraday efficiency = \frac{the amount of material needed to transfer electrons for the reaction to convert into the target product × f}{the amount of electricity actually passed through the circuit} (f is Faraday constant, with a value of 96485C/mol).

The following statement is true"	['A. Electrode b in the device should be connected to the negative pole of the power supply', 'B. Electrode reaction formula occurring on the M electrode: 2H_2O + 2e^- = 2OH^- + H_2 ↑', 'C. The theoretical maximum Faraday efficiency of the cell is 200%', 'D. If power loss is not taken into account, 2mol of 4-ethynylaniline is completely hydrogenated, and the number of electrons transferred in the circuit is 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che_319	MCQ	The following equations that explain the facts are correct:	['A. Electrolysis of saturated NaCl solution produces gas at both poles:<image_1>', 'B. 84 Disinfectant and white vinegar can enhance bleaching effect: $ClO^- + H^+ = HClO$', 'C. Add excess clear lime water to the NaHCO2 solution and a white precipitate appears: \\[ 2HCO_3^- + Ca^{2+} + 2OH^- = CaCO_3 \\downstream + CO_3^{2-} + 2H_2O \\]', 'D. Brick red precipitate occurs when acetaldehyde and newly prepared Cu(OH) ˇ suspension are heated together:<image_2>']	D	che	认识化学科学	['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'che_319_2.jpg']
che_320	MCQ	The following chemical terms or diagrams express correctly:	['A. Expression of the extra-nuclear electronic orbital of the ground state F atom:<image_1>', 'B. Simplified structural formula of maleic acid:<image_2>', 'C. Electronic form of $\\text{H}_2\\text{O}_2$:<image_3>', 'D. $\\text{CO}_2$The stick model of the molecule:<image_4>']	B	che	认识化学科学	['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che_321	MCQ_OnlyTxt	A cancer bone metastasis detection product independently developed by China has been approved for marketing. Its active ingredient is $\text{Na}^{18}\text{F}$. The following statement is incorrect:	['A. $\\text{F}$Located in the second period, group VIIA of the periodic table of elements', 'B. $^{18}\\text{F}$has 9 protons and 9 neutrons in its nucleus', 'C. $^{18}\\text{F}$The energies of electrons in the L layer of atoms are all the same', 'D. $\\text{Na}^{18}\\text{F}$is an ionic 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LEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDC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che_322	MCQ_OnlyTxt	The following statement is incorrect:	['A. Starch is hydrolyzed to produce ethanol, which can be used in wine making', 'B. Oils are hydrolyzed in alkaline solutions, and the resulting higher fatty acid salts are often used to produce soap', 'C. Amino acids, dipeptides, and proteins can all react with both strong acids and strong bases', 'D. The bases on the two strands of the DNA double helix structure complement each other through hydrogen 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che_323	MCQ_OnlyTxt	The following statement is incorrect:	['A. Proteins can be separated from solution by salting-out', 'B. The hydrolysis reaction of glucose to produce $\\text{CO}_2$and $\\text{H}_2\\text{O}$is exothermic', 'C. Nucleotides undergo hydrolysis under the action of enzymes to obtain nucleosides and phosphate', 'D. Hardened oil obtained by catalytic hydrogenation of vegetable oil is not easily oxidized and deteriorated by 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che_324	MCQ	H_2A is a binary weak acid with ionization constants of $K_{a1}$and $K_{a2}$respectively at room temperature. In NaHA solution, the concentration c(X) mol·L^{-1} of A^{2-}, H_2A, OH^-changes with the concentration c mol·L ^{-1} of NaHA solution as <image_1>shown in the figure. It is known that pX = -lgc(X) and pc = -lgc. The following statement is wrong ()	['A. In 1×10^{-2} mol·L^{-1} NaHA solution,$c(HA^-)>c(A^{2-})>c(OH^-)>c(H^+)$', 'B. In 1×10^{-6} mol·L^{-1} NaHA solution,$c(H_2A)<c(HA^-)$', 'C. K = K_w/K_{a2} for reaction OH^- + HA^-A^{2-} + H_2O', 'D. When pOH = pA,$c(H^+)\\approx\\sqrt{2K_{a1}K_{a2}}$']	C	che	化学反应原理	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAExAZoDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACisjxRfalpvhq/vtJggnvbeIyJHOxCMBy2SPbOPevOdF8W/FbXtHttUsPD+gta3Kb42aZlJH0L0AeuUteY/2r8Yf+hd8P/8Af8//ABdH9rfGL/oXfD//AH/P/wAXQB6dRXmP9rfGL/oXfD//AH/P/wAXSf2t8Yv+hc0D/v8An/45QB6fRXmP9rfGL/oXfD//AH/P/wAXR/a3xi/6F3w//wB/z/8AF0AenUV5j/a3xi/6F3w//wB/z/8AF1XfxD8XUvorM+HdB86WN5VHnnG1SoP8f+0KAPVqSvMv7V+MP/QveH/+/wCf/i6P7W+MP/Qu+H/+/wCf/i6APTqK8x/tb4xf9C74f/7/AJ/+LpP7W+MX/QuaB/3/AD/8coA9PorzH+1vjF/0Lvh//v8An/4uj+1vjF/0Lvh//v8An/4ugD06ivMf7W+MX/Qu+H/+/wCf/i6ZLrXxghieRvDugbUUscTnoP8AgdAHqNJXlVj4i+Lmo2Fve2/h7QTDcRrLGWnIJVhkcb/Q1Y/tX4w/9C74f/7/AJ/+LoA9OorzH+1vjD/0Lvh//v8An/4uk/tb4xf9C74f/wC/5/8Ai6APT6K8w/tb4xf9C5oH/f8AP/xyl/tb4xf9C74f/wC/5/8Ai6APTqK8x/tb4xf9C74f/wC/5/8Ai6P7W+MX/Qu+H/8Av+f/AIugD06ivJ18TfFttUk04eHdB+0RwrOw844CsWA58z1U1a/tX4w/9C94f/7/AJ/+LoA9OorzH+1vjD/0Lvh//v8An/4uj+1vjF/0Lvh//v8An/4ugD06ivMP7W+MX/QuaB/3/P8A8cpf7W+MX/Qu+H/+/wCf/i6APTqK8x/tb4xf9C74f/7/AJ/+Lo/tb4xf9C74f/7/AJ/+LoA9Ooryq98Q/F2wsbi8n8PaAIYI2lcickhVGT/H6CpU1j4wuob/AIRzQACM8zn/AOOUAen0teY/2r8Yf+hd8P8A/f8AP/xdH9rfGH/oXfD/AP3/AD/8XQB6dRXmP9rfGL/oXfD/AP3/AD/8XSf2t8Yv+hc0D/v+f/jlAHp9FeY/2t8Yv+hd8P8A/f8AP/xdH9rfGL/oXfD/AP3/AD/8XQB6dRXmP9rfGL/oXfD/AP3/AD/8XV3wP4v8S6t4r1jQPEun2NpdafFHJi1YkHfyOSxHTFAHoNFFFABRRRQAUUUUAQX17b6dYz3t3KsVvBG0krt0VQMk1z1r4yR77TIb3Tp7KHVgTYzO6sHONwVgD8jFeQOe/fitjXdJi17Qb7SZ3ZIryB4WdeqhhjIrzSfT9fvPEHhHwteT2VwNGuI764uLQPuWOJSsZkzwpfJGBnPJ6UAekeI/+RY1X/r0l/8AQDWF8K/+SYaB/wBew/maZ8Qdb1rTNKnt9M8OS6nBPayiadLhYxANuOQRzxk/hWb8M7/VY/hxoaQaMZoxb4WT7Si7uT2NAHohpaxTqWtf9AA/+BaUf2nrf/QA/wDJtKANqo42cyShhwG+XjtgVk/2nrf/AEAD/wCBaVGmr627yL/wjxGw4/4/E9M0Ab1FYv8Aaet/9AA/+BaUf2lrf/QAP/gWlAG1WRcf8jdYf9eVx/6HDTP7S1r/AKAB/wDAtKybjUtY/wCErsD/AGEd/wBiuML9rTkb4cnP5fnQB2FIKxv7S1r/AKAJ/wDAtKT+0tb/AOgB/wCTaUAbdRTs6opjGTvUHjPGef0rK/tPW/8AoAH/AMC0qKbV9biQN/wj5OWC/wDH4nc4/rQBv0VijU9b/wCgB/5OJR/aWt/9AA/+BaUAbVV7/wD5B1z/ANcm/kazf7S1r/oAH/wLSq99qWtf2fc50EgeU2T9rTjg0AWfCX/ImaH/ANeEH/ota2a47wpqOsL4R0ZU0PegsYQrfakG4bBg47VrnUta/wCgAf8AwLSgDaorF/tLW/8AoAf+TaUf2nrf/QAP/gWlAGrAzsjeYMEOwHGOMnH6VLWBDq+tyhiPD5ADFf8Aj8TscVL/AGlrf/QA/wDJtKANqisX+0tb/wCgAf8AwLSj+09b/wCgAf8AwLSgCCD/AJKHf/8AYKtv/Rs1dDXDQ6jrA8fXrDQyXOmQAp9qTgeZLzn8T+Vb/wDaWtf9AA/+BaUAbQorE/tPW/8AoAH/AMC0pf7T1v8A6AB/8C0oA053lSW3Ea5VpMScZwu1j+HIFT1gTazrUUkKHw+SZX2D/TE64J/kDUv9pa3/ANAD/wAm0oA2qKxf7S1v/oAf+TaUf2nrf/QAP/gWlAD/ABXx4P1o/wDTjP8A+gGtSL/Up/uiuR8U6jrLeEtZV9CKKbKYM32tDgbDzitOHU9b8lP+KfP3R/y+JQBu0tYv9pa3/wBAA/8AgWlH9pa3/wBAA/8AgWlAG1UcDOyEv13MOnbJx+lZJ1PW/wDoAH/wLSo4dX1uVS3/AAjxGGK/8fidjj+lAG9RWJ/aet/9AA/+BiUf2nrf/QAP/gWlAG3Xmvhz/ku3jL/r0tP/AEAV10mp66InMfh8l9p2g3aYJ7V5v8MLjXrr4qeK5vEtrFa6o1tB5sMRBVRj5cYJ/hx3oA9kooooAKKKKACiiigBsiLLG0bZ2sCDtJB/Mciq9lp1np6Otpbxxbzlyo+Zz6sepPuatUUAZniT/kWNV/69Jf8A0A1g/Cr/AJJhoH/Xt/U1p+Nb4ab4L1e5NvPcbbZ18uBNzncNucegzk+gBNY/wpmY/DXQUMMgUW33zjB5Pvn9KAO1NLULTsJvLEEpH98Yx/OlmmaIjbBJJn+5jj8yKAJajjkV3kUA5RsH8gf60SytGgZYnkP91cZH5mooplKSyJC4cH5043ZwPfHTFAFmioopmlUloZI8dnxz+RNNhuGlcqbeWMYzlwMfoaAJ6x7gf8Vhp5/6cbn/ANDhrR+0N5/l/Z5cZ/1nG3+eayLyd4/GenqLeWQGxuOV24/1kPqaAN6kFRzStEAVhkkz/cxx+ZFDSssIk8mRm/uDGR+uKAJajmlWFVZgSCyrx6k4FIkxaIuYnUj+A4yf1qLz0lTM8LxKGXHmY5bPGME98UAWqKhSZ2lKG3kUD+NtuD+RzQ07LNsEEpH98Yx/PNAE1VtQ/wCQbdf9cX/kafNO0RAWCSTP9zHH5kVBqkrJpNyyxO5MTfKuMj5T6kUAU/CAx4L0Mf8AUPg/9FrWzWF4RkP/AAg2iSeW+f7PgOzjJ/dj3rYilaVSzRPGQej4z+hNAEtFQxTtIxDQSR47vj+hNAnYzeX9nlAz9/jb/PP6UAOhlWZWKg4V2U59QcGpKqLcKjlIYJHUucsmMBs89T61NNMYgMQySZ/uY4/M0AS0VE8pWHzPKdjx8gxn+dKkpeIuYnU/3Gxn+eKAMGD/AJKLf/8AYKt//Rs1dFXMWUrS/ETUC0LxY0q34fHP72b0JroUnd5Cht5UA/jbbg/kc0ATUVA07LMIxBKRn74xj+eaWadoiAsEsme6Y4/M0ALLMkUkKsCTK+xcDocE/wAgalqpeXEcJti8MkjvJiNVxkNtY9yB0Bqbzm8jzDDJu/558bv54/WgCWioopWkUs0Lx47PjJ/I0kM7SsQYJY8d3A5/I0AZvi0Z8G63/wBeE/8A6Las27+IXhXSjNBd6vEstsVSZFVmKEjPYHj1Pbirniq4Y+Ftbj+zygfYZxvONv8Aq2981xFnqNrZ+OPHkFxaXNw08FqqpDbPL5n7jGzKggE5HBx39DQB6S+q2KaO2rfaYzYLCZ/PU5UpjO4Y6jFct8P/ABVf662rWGtRG31WyuS/kMACIJPni6cHAOPw55NY9lpV/YeEfC/gu6F7HJIqm+uIIGkWJVywTftKcttXnjAPqMt1XT7zwn8R9J1q1fVtUjvYmtdSP2Yy7Ixgo/7tAOG+pxQB6fUcMiyoWUEAMy8+oJB/lTi/7veFJ4yAOp/OsLV9budN8NahqOn6RcXM9urNHbDGZX3YOMEng5J/SgDS1XVrDRNPlv8AUrqK2tYhl5JDgD/E+1c/4L+IOleOpdRGlQ3SxWTqplmQKsmc4K8+x647V5ppXgTxZ8S9Wj1fx9NPZ6ap3wacnycZ6bf4B7n5j+teyaXp9joNrHpumaZ9mtY8BREqhfqeck+p60Aalea+HP8Aku3jL/r0tP8A0AV6JLO8bALbyyZHVNvH5kV534c/5Lt4x/687T/0AUAelUUUUAFFFFABRRRQAdKzrTXtJv7s2tpqNrPONx8uOUEnacNj1weD6VY1CKObTrmKWYwxvEytIGwUBHJz2xXk3hTUbmfWvC+j68ot4rFXk0i9jiKpqShCi8/wHYdxX+Lg+mQD0/xJ/wAixqv/AF6S/wDoBrB+FX/JMNA/69h/M0nxA8Y6R4c0mey1B5xNeWsohEcDOD8uOSBgckdaxvht4q06y+HWiW0sd+ZEt8Hy7CZ16noVUg/hQB6UaWue/wCEz0r/AJ5al/4Lbj/4il/4TPSv+eWpf+C6f/4igDoKjjiVHkYHJdsn8gP6Vhf8JnpX/PPUv/BdP/8AEUxPF2lJJI3l6id5z/yDp/QD+57UAdJRXP8A/CZ6V/zy1L/wWz//ABFJ/wAJnpX/ADy1L/wWz/8AxFAHQ1j3A/4rDTz/ANONz/6HDVb/AITPSv8Anlqf/gtuP/iKyrjxhpf/AAlVjL5eo7RZ3Cn/AIl0+cl4e2zPY/p60AdtSCuf/wCEz0r/AJ5an/4LLj/4igeM9K/55al/4LZ//iKAOhqKeFZ0VWJADq/HqDkfyrD/AOEz0r/nlqX/AILp/wD4io5/F2lTIq7NSGHVv+QbP2IP9z2oA6Wiuf8A+Ez0r/nlqX/gun/+Io/4TPSv+eWpf+C2f/4igDoKrah/yDbr/ri/8jWR/wAJnpX/ADy1L/wW3H/xFV77xlpbWFyoi1LJiYD/AIltx6H/AGKAL/hH/kTND/7B8H/ota2a4jwt4v0yHwlo8LR6iWjsoVbbp07DIQdCEwfqK1v+Ez0r/nlqX/gtuP8A4igDoaK57/hM9K/556l/4Lp//iKP+Ez0r/nnqX/gun/+IoA3IIVhVlUkhnZzn1Jyf51LXM2/i3SoUZdmpHc7P/yDZ+5J/ue9Tf8ACZaV/wA8tS/8F0//AMRQB0FFc/8A8JnpX/PLUv8AwWz/APxFJ/wmelf88tS/8Ftx/wDEUAJB/wAlGv8A/sFW3/o2auirgYfFumL48vJzHqG1tNgQD+z592RJKemzOORzW7/wmelf88tT/wDBbcf/ABFAHQiiue/4TPSv+eepf+C2f/4ij/hM9K/556l/4Lp//iKANyaBZZIXYkGJ9647naR/U1LXLz+LNKmlt32aiPKk3/8AINn5+Vh/c96sf8JnpX/PPUv/AAXT/wDxFAHQUVz/APwmWlf88tS/8F0//wARR/wmelf889S/8Fs//wARQBY8Wf8AIna3/wBeE/8A6LaodG8NxaZrOoawl5cSTakIzOkgXb8i7VxgAjA461j+J/F2mTeFNYiWLUdz2Uyjdp06jJQ9SUwPqa0ofGmkmFAI9SPyjpptx/8AEUAdJUVzcwWdtJc3MyQwRKXeSRgqqB1JJ6Vy+rfEXQdG02a/uxqKQxDktp8y5PYZZQMn3Irxq/1nxD8XNTUXv23SPCiNuCw20kplA/3VO5vrwPr1APoDRdf0rxHZNeaRfRXlurmNnjOQGHUfqPzq9DEsSFVOQWZvzJP9a4zw5f8Ahbwro8el6TZ6jDboSTnT5yzserMdnJrSg8XaVFGV2aicszf8g6fuSf7nvQB0tFc//wAJnpX/ADz1H/wXT/8AxFH/AAmelf8APPUv/BdP/wDEUAdBXmvhz/ku3jL/AK9LT/0Ba6n/AITTSf8AnnqX/gtuP/iK43wdexaj8a/GFzAsqxtaWuBLE0bcIByrAEflQB6nRRRQAUUUUAFFFFAFe/soNS0+5sbpN9vcxNFKucblYYI/I1gW3hFxFotvfX4urbR5FktQINjllQohdskHAbsBk/lXT0UAZfiQD/hGdVOBn7JL/wCgGsL4V/8AJMNA/wCvYfzNavjG/tdN8HatdXkyxQLbOpdumWG0D8SQPxrF+FNzA3w20GFZozKLblAw3Dk9qAO1/Cj8Kha7tlnEDTxCX+4XG78qWa7t7YqJ54493TewGaAJfwqONXEkpb7pYFee2BRLcQwRiSaVI0PAZ2AFQwXscouJTLGYEbCyAjbjAJ5+uaALX4UfhUcNzBcKWhlSRRwSjA4psN7a3DlILiKRgMkI4JxQBN+FY9x/yOOnf9eFz/6HBWkLy2M3ki4iMucbN4zn6VjX17a2/jXTkmuIo2+wXPDuAeZIcfyP5UAb/wCFA+lRzXVvbbfPmji3dN7AZ/OhrmBIBM0yCI4w5YYOfegCT8KiuFdkUR8HepPOOMjP6UqXMEkJlSZGjGcuGBA/Gq730c8YNlNHMRIgbyyGwpYZ6e2aALn4UfhUSXdvJMYUnjaQdUDAkfhSNeWyTeS08Yl4+QsM8+1AE34VX1D/AJBt1x/yxf8AkafNdW9uVE00cZbpvYDNV9VuIYNJuZJZUjQxMAzMAD8poAp+EP8AkStC4/5h8H/ota2fwrD8Izwr4G0OUyIIxp8GX3DA+Qd62IriG4UtDKkig4JRgQDQBJ+FH4VFDd21wxWGeOQjqEYHFILy2afyFuIjNnGwON35UALbq6o4kySXYjJzxk4/SpfwqnFfwqXjuLiJJBIwCswBxkgcfTFWJrq3tgpnmjj3dN7AZoAk/Cj8KY1xCkPnPKixYB3lgBz70JcQyRGVJUaMZy4bj86AMGD/AJKLff8AYKt//Rs1dD+FcxY3MFz8Rb9oJo5VGl24JRgwB82b0roY7y2llMUdxE8gzlVcEj8KAJh9KPwqFry1ScQNcRCYkAIXG7n2pZry2tyBNPHGSMgOwGaAEnSRpbcxkhVky/PVdrD+eKm/CqV/eraNZu0qJFJNsdmIAxsYjn6gVZ+1QG3+0edH5PXzNw2/nQBJ+FH4VHDcwXCF4ZUkUdSrZAqIalYlJHF5AUjUs7CQYUep9BQBQ8WDPg7WwBybCf8A9FtWrD/qU4/hFeGeP/izc+IBeeG/BMLXKtE4u74LlRFtO/b6DGfmP4djXpXgfTJfCvhq20vWNc+3X5Jkd5ZckbuiruOcD/GgDo7+wtNTs5LO+tYrm2kwHilQMrYORkH3FTQwxW8KQwxrHGihVRBgKB0AFJNcwQbTNNHGD03sBmle4hjh855EWPg7yeOfegB/4VHArrGRJyd7H8MnH6YpVuIXhMyyoYgCS4PGB71XsL6K9jcxzxyFXYHYwOBuOP0FAFv8KPwqKO7tppTFHPG8gzlVYEika9tln8hp4xLkDZuGfyoAm/CvNvDn/JdfGX/Xpaf+gCvRJry2t2Cz3EUZIyA7gZ/OvO/DnPx28Y/9elp/6AKAPSqKKKACiiigAooooAKKD04615xq+n+MNPuNOI8azPPfXqQi1SxhCKpJZwCVJwqK3J9B60Adj4oijm8K6sksauhtJcqwyPumsT4VD/i2Ggf9e39TWh4x1rStM8P30F/qVpayz2koiSeZUaQ7SPlBPPUdKyPhdfWkfwz0FHuoVYWwyrSAEcmgDtzS4FVTqViP+X23/wC/o/xpP7TsP+f62/7+r/jQBbxUUUnmSTIQB5bBfrwD/Wof7TsP+f62/wC/q/41HHrWmvJIgvrYFDg5lX0B9fegC9gelLgVU/tTT/8An+tv+/q/40v9p2H/AD+23/f1f8aALWBWNcD/AIrHTz/04XP/AKHBV/8AtKx/5/Lf/v6P8ayLjUbIeL9PP2uDH2G5GfMH9+GgDocUgFV/7Rsf+fy3/wC/gpv9p2A/5fbf/v6v+NAFvAqC5m8hEYKDukVPzIH9aZ/adh/z+2//AH9X/Gop9Z02BVZ7235ZV4lXucetAF/FJgelVf7U0/8A5/rb/v6v+NH9p2H/AD/W3/f1f8aALWB6VX1Af8Sy6/64v/I0n9pWB/5fbf8A7+r/AI1Bf6jZHTrn/S4P9U3/AC0HoaAK3hAY8FaEP+ofB/6LWtmue8I6hZDwboim7gDCwgBBkGR+7FbB1KxHW8t/+/o/xoAtYFGBVX+07D/n9t/+/q/40f2nYf8AP7bf9/V/xoAktpvPR2K42yMn5MR/SpsCqEOs6bKrFb23G12U5lXqDj1qT+1NP/5/rb/v6v8AjQBbwKMVV/tOw/5/bb/v6v8AjR/aVj/z+W//AH8H+NAGPAP+LjX/AP2Crb/0bNXQ4FctDqFkPiFfObyDB0u3GfMGM+bNXQf2lY/8/lv/AN/R/jQBZxS4qp/adgP+X62/7+r/AI0f2nYf8/1t/wB/V/xoAkuJjFLbIFBEsmw+3ysc/pU+BWfNq+nRy26NdQM0smxcSLwdrHPX0BrgfH3xi03w0TpmihNU1pzsWOM7o4mPA3EdT/sj8cUAenYFc5418IweNfD7aRcXlxaRmRZC8B5bHYjuOfzAPaq3grW9UufDME/iqawt9TcljFFIBtXtuGeGrof7U08/8v1t/wB/V/xoA5VvCGjeDvh5rNlpFosS/YJjJK3Mkp8s8s3f+XpXZRAeSn+6KwfFeoWTeD9aVbyAk2M4AEg5+Q1qQ6nYGFMXtuflH/LVf8aALlLgVVOpWH/P7b/9/V/xpP7U0/8A5/rb/v6v+NAFrAqO3kM0ZYrgh2XH0Yj+lQ/2pp//AD/W3/f1f8aih1nTJUJW+thhmXHmr1BI9fagDQwKTAqr/amn/wDP9bf9/V/xpRqViel7b/8Af0f40AWsCvNfDn/JdvGX/Xpaf+gLXoP9oWX/AD9wf9/BXnnhiSOb45+MnidXU2lrhlOR9wUAemUUUUAFFFFABRRRQAVzz2s1/wCO47iW3kFrplofJkZSFeaU4OPUqqY/7aV0NFAHK+OfDGi65od3d6np0NzPa2spgkcHKHaTx+IFZnww0jTZ/hroUs2n2kkjW2Wd4VJPJ7kV1PiUhfC+qkkAfZJeT/uGsL4Vf8kw0D/r2/qaAOh/sLSP+gXZf+A6/wCFH9haR/0C7L/wHT/CtCigDP8A7C0j/oF2X/gOn+FMTQ9ELuF0ux3A/N/o69cfStOo0iCSSOCSXOTn6Af0oAp/2FpH/QLsv+/C/wCFH9haT/0C7L/wHX/CtCigDP8A7C0j/oF2X/gOn+FZFxoelf8ACX6eo0yz2GxuSV8hcE74cdvr+ddPWPcH/isNPH/Tjc/+hw0AWP7C0j/oF2X/AIDp/hQNC0j/AKBdl/4Dp/hWhSCgCh/YWkf9Auy/8B0/wpkuiaIqgyaXY4JAGbdOpPHatOop4lmRVZiAGVuPUHNAFQaFpA6aXZf+A6f4Uf2HpP8A0C7L/wAB0/wrQooAz/7C0j/oF2X/AIDp/hVe/wBC0gaddEaXZAiJ8H7Onofatiq2oH/iW3X/AFxf+RoAwPCWiaVJ4O0R30yzZ2sICzGBSSfLXk8Vsf2FpH/QLsv/AAHT/Cq3hH/kS9D/AOwfB/6LWtigCh/YWk/9Auy/8B1/wo/sLSP+gXZf+A6f4VoUUAZkWiaIwYx6XY4DEHFuvUHnt60/+wtI/wCgXZf+A6/4VbhiWJWCnOXZjn1JzUtAGf8A2FpP/QLsv/Adf8KP7B0j/oFWP/gOn+FaFFAHHw6LpZ+IN7GdNs9g0y3YL5C4BMs3OMewroP7C0j/AKBdl/4Dp/hWbB/yUa+/7BVv/wCjZq6KgDP/ALC0j/oF2X/gOv8AhR/YWkf9Auy/8B0/wrnvG3xJ0LwPan7ZN59+wzHZQsDI3oT/AHR7n8M1r+FNdk8S+GbLV5bCWxe5TcbeXqvJHtkHGQcdDQBzvxB8HS6z4dTT/D66bp97NOFMrwBSU2tuAZVJBxzn2NReBvhJoPg+13zxR6jqTjElzPGCB7Ip+6P1Nd3NAk0kDsxBifeuO52kf1NTUAZ/9haT/wBAuy/8B1/wo/sLSP8AoF2X/gOv+FaFFAHMeK9F0qPwfrTpptmrrYTlWECgg7Dz0rUh0LSPIT/iV2X3R/y7p/hUfivnwfrQ/wCnGf8A9ANakP8AqU/3RQBS/sLSP+gXZf8AgOn+FH9haR/0C7L/AMB1/wAKvmsHW/G/hnw6HGqa1aW7p1i8zdJ/3wMn9KAL/wDYWkf9Auy/8B1/wpkWh6Iykx6XY43EHFuvXPPb1ry3Wf2itAtVZdI027v5BwGkxCh988n9Kx9E8W/E74jW0zeGzpmlWUczLJKGBcEndg7tx79QooA9qk0fRIULy6fp6IOrNCgA/SuQ1zxv8NdAJS6m0qWYD/VWsCzN9PlBAP1IrwrXbfULrXLnTtaufEviK+tJTHJFbgpGpHXaSH499or23Sfhj4esfCq3ml+HLaPWpLTzIRqZMxjmK5AfPHB64AoA5OT4h3fiVzb+CPh2k+44W7u7VQg9zjCj8Wq58JrXWbT4l+KItfS3j1L7LbtKluqqi5GQAF46Y6Vq+FvCHxHj1601DxF4riFpA25rK2UbZBj7pAVVA/Ornhz/AJLr4y/69LT/ANAFAHpNFFFABXPeHPFtnr11qFjuWK/srqaF4DkFkSRkV1z1BAGcdDkV0NeNa94ku/F+oTeHfCfh5l1jTr6cPqTHyorJhKw3q45JYZJXvk8NzQB6D4x8b6N4L0t7rUrpBOynyLdTmSVh2A9M456CtrTbl7zS7S6kADzQpIwXoCQDxXlmh+G9O8I65cXvjnN/qNyWMWtXTb4CMcpg8RN1Az17HtXqtiYG0+2a1GLcxKYh/s44/SgCxRRXnlr43tdb8Q3Sya1HpukWtybOEBgr3cw+8WYj5UB4XoWOee1AHS+NdNtdW8F6vZ3iF4WtnYqGK8qNw5HuBWT8KYY1+GegOFAY23X8TXQeI8f8Ixqgz/y6S/8AoBrD+Ff/ACTDQP8Ar2H8zQB1wjQSFwo3EYJoaRF+86j6mnV4/wD8I/oWq+KviBFqqhkt1ilj3ysPKJiyXHPXPf8AxoA9E17xLFo11p+nxQG71PUZDHa2ytt3ADLOx7Ko5JwfpVe98TzaLqenW2tWUVvb6hKLeG5gnMirMRlUcFVxu5wRnpzivO9IXUdP1b4eeItcMn2dtPeymuJc/upHB8suT03AgZPfrXR/Fm3bXtK0vw5Yvu1G+v4mTYcmFFyWlOOQB6+9AHQL4onPxAbwqbBARYfbxc+eeY9+zG3b1z70tn4nnuvHF94bNiii0t0uGuPPJ3KxwBt29fxrmbqA3fx98tLya3ZfDXLQld3/AB8dOQfXNP8AD0X2b41eIIWupbh/7MgO6UqW+97AUAehC3iEvmbBvznNY95bxS+M9OZ0DEWFzyf+ukNbtY9x/wAjfp//AF43P/ocNAGpJBHMAJEDAdM0GGNoxGVBQcAVJSCgBiwxrGUCgKeoqGWyjaNVjVUxIj9P7rA/0q1UNysjIojOCHUnnHAIz+lADlgiSQyKgDnqaRreJpPMKAv61LRQBHJBHKQXQNjpmq+qQpJpV0rqGAhfAP8AumrlVtQ/5Bt1/wBcX/kaAMzwhEn/AAg+hxlflOnwZH/bMVsRwpENqKFB7Csrwgf+KL0P/sHwf+i1rYoAZHbxRElECk9cUgt4hL5oQb/71S0UAVIbGJC5dVZmkZ849Tmp5II5QPMUNjpmm2ySJG4kJJMjkZOeCxI/SpqAGNEjR+WVBX0oWJEj8tVAT0p9cV4x+KPhvwY6295O9zet/wAutqA7j3bkBfxOaAL9pDHD8Rr8RqFB0q36f9dZqzviIfFdvpMKeC7KOS+uJSk05K7oUI6jccde/ar+l3KXvjae7jV0SbRrWRVkXDAGSY4I7GuooA8q8EfBq00m6/tnxPONY1p23lpCWjjPr833j7n8u9eoSW0MpBeMNjpmobzU7DTY999e29sn96aUIP1NOs9Qs9RtVurG6hubds7ZYZA6nHXBHFADbyxS7e13BSsMvmYI6/Ky/wDs1T+TH5XlbRs/u149rn7QGgWuoQw2NjqFx5FwROxAjUrgqccknk5wQOlM8SfHW3u7FrLwVZ3t7qkmNkjWpKIO525yT+GKAPZI4Y4gQihQeSBVa4uNO0mJp7q4t7SPHMksgQfma8N0mL45a9++a9/s6GUY3XSRxbR/uBSw/Ktu3+BP9qXS3vi7xPqGqz9SqnaPpuYk4+gFAGl4z+Knge20TU7S31JL28nt5IkW0UvlmUj733cc+tcZqHxy1rV5ktvDPhYmfgB5ladz9FUDH5mvR734eeFPDfhPWJNN0S1SZbGYiaRfMcHYejNkj8K7i3ijSJSiKuQM4GKAPD9S+H/xS8VaW17q3iZIJ2j3R6dCxRc/3W24APvz9areCvgLqNnrlrqPiWXT57WMlpLMbpC+QQMkgDrg9+le/UtAHF658KvCWvizW404QRWm4RxWhEKkHGchRz0rZ8NeFNH8KWL2mkWUdtG7ln2kkt6ZJJJwOK26it1dIyJDk72I5zwWJH6YoAEt4kcusahj1IFBt4Wk8woC/XNS0UARSW8UxBkQNjjmvOvDnHx18ZD/AKdLT/0AV6VXmvhz/ku3jL/r0tP/AEAUAelUUUUAFYU0mj+CNBv7+4fyLQTS3c8hGWZ5HLHp1OWCj8BW7XJ/EqyfUPAOpwR2LXsm1GWFZNhJV1IOcHpjPTtQBgP8RdN8Q6bLBqnhPXodEuo9r3lxZboQhH32wSQvfPbrXodhFFBp1tDBJ5kMcSqj5zuUAAHivPpde+JcumPbjwNZLM0WzzDqSFQ2MZ2+ntn8at+EL3xbbTaTouqeG007Tre28kXAvFnZyiAKCABjOM59qAO+IyCK8nPhm/h8Ca14KfTppbme7drS5CExOjybxIX6KV7g88cZzXrFFAHDePfBya1oTXEmr6patYWcmEtbgosuFz8479P1ql8NPD9tdfDjQ53utQRnt8lY7yRFHJ6AHArs/Ef/ACLOq/8AXpL/AOgGvIvhT4h8etYaDpo8N2x8PBNv20kq3l8/Nndyc9sUAewWGkQ6dK0kdxeSFl24nuXkA+gYmua0/wAEofGOtaxq9hpl3FeyRSW+9fMeEou3+JeM4B4ParfjrU/Fel6bbyeE9Ig1K6eXbKszYCLjqBuXPPvVPwFqfjm/e8Xxjo9pYooU27wMMsecggM3t6UAdlPBDcwPBPEksLqVeORQysD2IPUVS0zRdJ0gyjTNMtbIufnMECx7vyHPWuI8aXvxQj14xeFNOsH0wRqVlkZS7N3yGIx+A/H06jwfc+IbnQFPia3t4NVRysiQHK47E4JGcHsaALy+HtEXUP7QXR9PF6XL/aBbJ5m4992M596I/D+iw6gdQi0iwS9LFzcrbIJCx6ndjOTmvMGX43SaqzK2lxWvmnAPl7dmfxbGPxr0XxSviA+GrgeG2t11fC+UZvudRu68ZxnGaAJZ/DttPO8rXeoqXYsQl7Kqj6ANgViz+G7UeK7CP7XqW02VwxP26XOQ8Pfd7n/IrG8GR/FRfECHxTNp7aVsbzAgTeTj5du0euOvbNT/ABDTxm2uaQPBslulz9nuPN84L9zdF/e464oA6j/hGLTH/H5qn/gwm/8AiqB4ZtP+fzU//A+X/wCKrN8CR+M00+5/4TOW0kuDIPIEAGQuOc7RjrXMeJYfi8fEN2dBuNOGll/9HDCPIXHfcM5oA7n/AIRm1/5/dT/8D5f/AIqoLnwzCI18q+1XdvUHF9L03DPf0zVqzTXR4TRLqW1OvfZSDIAfK87HBx6ZxmvOdLX4zRazZtqlzpn9n/aEWfiM5QsAcbRnpQB6GPDFp/z+6p/4Hy//ABVL/wAIzaf8/mp/+B8v/wAVVXxsnil9BA8IyW6al5qkmcDBjwcgZ4znHX3rF8BxfEddRuG8YzWLWflYiWIJv35HPyjpjPX2oA6T/hGbT/n81P8A8D5f/iqrX3hm0XT7lvtmp8RMeb+X0P8AtVheN9P+JF1rEb+EdW0+10/ygGjmUF9+Tk8o3GMd61vDlr4ls/CFyniu+t73UiJG3wIFVU28LwBk9ecd6AK/hXw3ayeEdGka71IM9jCxC30oAJQdAGwPpWv/AMIzaD/l91T/AMD5f/iq8n0z4Z+ONY0vT7z/AIWDd29rJbxvDFCZF2IVBAwrAcDivW9U0NtV8LTaLNf3KPLbiF7uM7ZM4wW+p/rQBH/wjdmTgX2pZ/7CEv8A8VVLVLDQtFt1n1PXbuyiY7VefVHQE+gy3JrnvC3wZ0nwzr1vrK6tqd3d25JQSyKE5BHIAyevrXSeMPBnh3xbb27eIId8VmWdH84xhQcbskEccD8qAKHh+PQPECXB07xDd3phkIfydTkbapJ25w3cD9KxvEnizwR4V1GTTtS13VxexgF4Irq4crkAjJBx0IPWsvwb4n+Hvh3xYvhzwrYTSXF9KY5bqAtLGNudvzMckfTjmvTLzwvoF/etfXui6dcXTABpprZHcgdOSM0AePeJr7xV4hW0TwBFqjaVc2/nHU3u5cnBIZfmb5SMYxgk9q4rwTYFdUtppvA2t6vevcKZr+WaSMRNu5ZcL1HXLN27V7/rPjzwd4OtxbXWpWkBjGEtLYBmX22J938cVwUvxf8AEvih3tfA3hO4kycC8ux8qj1IHyg/VqANPxb4c12TW76HwnqUtrf/AGG1Zprq9lOEMk2cEk+g6++Oa5HSteTwne3E/jL4gyaufKKJYaXdyyMHyOSy4AwARgnvVm2+G/irxf4qmi8beIpI3FpFNLBZEDMZeQKnACjBVj0PWvSdA+Ffg/w5h7TR4Zp/+e11++b6jdwPwAoA8K8QQy/EfV0v/DvhLXLpQojE97ds8bAZ7t0/77rp/Dfwd8dLY/ZLnxIdD0+Ri7WlnM7kE9QQCB29TXv6RpGgRFCqOAAMAU7FAHk1l8B/CenyWv2iO81JnlxK00pUAbGOcLjuBXa2HgbRNKgMGmxT2UR5K21w8YP1wea3Z5/Jlt02582TYTnp8rHP6VPigDE/4Rm1/wCf3U//AAOl/wAaP+EZtf8An91T/wAD5f8A4qtvFGKAOO8UeHLaHwnrMi3mpErYzMA19KRwh6gnmtKHwva+Sn+naqflH/L/AC//ABVTeLv+RM1z/rwn/wDRbVqw/wCoT/dFAGR/wjFr/wA/uqf+B8v/AMVR/wAIza/8/up/+B8v/wAVW1S4oAxD4Ytf+f7VP/A+X/GobfwxAUJkvtV3b2xm/l6bjjv6YrocVFBIZoyxGMOy/kxH9KAMn/hGbX/n91P/AMD5f/iqX/hGbX/n91P/AMD5f/iq2sUYoAxP+EYtP+f3VP8AwYS//FVxPhG1Sz+NvjCBHldVtLXBlkLt9wdSSSa9RxXmvhz/AJLt4y/69LT/ANAFAHpVFFFABRRRQAUUUUAFFFcFN4t1bVvGF1o/hvUPDoWzcRTw3ryNcMwwXZFUgbRkL9Qc0Ab3ja0mvfBerwW95JaSG2ciaMAkADJHPqAR+NY3wogkX4caDKbqZkNtxEQu0cn0XP610viP/kWNV/69Jf8A0A1hfCv/AJJhoH/XsP5mgDqHt5GnEguplXj92Au3+Wf1pZ4JJipS6lhA6iMLz9cg1OaKAIZYXkjCrPJGR/EgXJ/MEVHErNFLALiXeh2mUhd3Iz6Y7+lWqjTy98mzG7Pz/XA/pigBsELwoVe4kmJOd0gXI9uAKbBbSQsS93NMCMYkCY+vCirFFAFcW0ouPNN5MVznyiE2/T7uf1rIvreWXxlpzJeTQgWNxlUCYPzw+qn/ACK36yLj/kbrD/rxuP8A0OGgDRngeYKEuJYcdfLC8/mDQ8LvbiIXEisAB5oC7jj6jHP0qagUAQxwukJjNxI7HOJGC7h+Qx+lRBWs0zLcTT7mVRvC8EnHYD1q3UU/lbF83G3euM+ueP1oAZHbyJM0jXczqc4jYJtH5KD+tD28jTeYLqZVyP3YC7f1Gf1qxRQBBPBJMV2XUsOOvlhefzBqtrMMkuj3KpcywkRMS8YUk/KePmBFaFVtS50u7/64v/6CaAMrwjE7eBdEj85wxsIf3gA3D5B7Y/StiGF4lKvPJKSc7nxkfkBXDf8ACe6B4K8C6KdVvALn+zoSlpH80r/IOi9vqcCsLRPjzo95a3t3rVm2lwREfZV8zzZLjrkBQBjp16c9eKAPVIbeSEktdSzZHRwvH5AV4T4m0Txf4l1O6k8da/beHfDaTN5cAnT94o6bVB+Y+7c+g7Vfk+JHjrx45g8DaC1lZk7W1C6AOPfJ+UY9BuNXtH+BqXd1/aPjbWbnWbwnJjEjCMexJ+Yj6baAOY03xx4b8Nkab8NvD1/qd9gK9wYv9bj+JvlLke3yj6Vt/wDCKfFTxyzN4g1tNC06Yc2lr94L6YU/+hN+FesafpmieG7QwWNtZ2ECjcwQKgx6k9/qazfGvie58L6Va31raQ3Ynuo7ba8pTBc4ByAaAOf0D4J+EtETfLbyahd5z593h8H2TG38wa7+3tFtrXyI3IAGFIVRt+gAA/Sue8W+Jr/wzaaXMllb3JvLyKzYGUpsaQ4DD5TkD8K6dN/lr5mN+Bu29M+1AHM2EDw/ELUA9xLOTpdt80gUEfvZuPlAroI7eRJi7XUzqc/IwXA/IA/rXL+M/EOn+CWTX54Jp57kxWjrHyEhV2Znx/sh2+pKiuujkSaJJI2DI4DKR0INAEJt5GuPNF1Mq5H7sBdv8s/rSz28kzArdTRADogXB/MGpxRQBUvCQbePzpY2kk2howpOdpPOQeOO1TeS/wBn8rz5N2MeZxu/lj9KSYw+ZAJcbi/7vP8Ae2n+mamoAigheJCrTySknOXxkfkBTYIHiJLXMsuez7ePyAqeigDnvFlvIPCWuyG6mKmxnPlkLtH7tuOmf1rWFvJIInW6ljUKPkULg/mCf1qj4t/5E3XP+vCf/wBFtWtD/qU/3RQAyeF5QoS4khx/cC8/mDSvEzQ+WJnVuPnGM/yx+lS96KAIkiZIShmdmwfnOM/yx+lRWSny2bz5ZRuK/vAowQSD0A9KtVHCYyh8vG3c2ceuTn9c0AMigkjlLtcyyA5+RguB+QBpDbyG48z7VMFz/qwF2/yz+tWKKAIJ7eSZlKXU0IA6IFwfzBrzzw5/yXbxl/16Wn/oC16VXmvhz/ku3jL/AK9LT/0AUAelUUUUAFFFFABRRRQAV5r4nHh3xZDE/h+S3fxHa3yCCSFSk8Lq43l+AwTaGyTweMZJFelUmAO1AHFfETTvE15pU0mia1BYWkVrKbqKS3EhlG3sT04yPxrN+GtjrUvw50N7fWY4Yjb/ACxm0DbRk98812viT/kWNV/69Jf/AEA1hfCv/kmGgf8AXsP5mgDS/s3xD/0H4v8AwCX/AOKpf7O8Qf8AQfi/8Al/+KrdNFAGF/ZviH/oPx/+AS//ABVRx6Vr6PIw8QRku2W/0JeuAP71dDUccWySVs53tnHpwB/SgDG/s7xB/wBB+P8A8Al/+Ko/s7xB/wBB6L/wCX/4qt2igDC/s3xD21+H/wAAR/8AFVk3Fhr/APwldgn9uw7zZXBD/YhwN8ORjd7j8q7Osi4/5G+w/wCvG5/9DhoAg/s7xD/0H4f/AABH/wAVSjTvEP8A0H4v/AEf/FVu0CgDC/s7xB/0H4v/AACX/wCKqKfSdelRVfxDGAHVh/oSjkEEfxetdFUVxD56KucbXV+noQf6UAY/9m+If+g/H/4BL/jR/ZviD/oPx/8AgEv+NXtX1vTNBsmvNVvobS3HG+VsZPoPU+wrxPxb+0E7StZeEbLeSdovLhCc/wC4n+P5UAevHTvEA/5j8X/gEv8A8VXmnxN8dTaDot1p1r4wt5dWkAUQ21oCyjOGBYEhDjPXms620/4sfEe2jTU7saBpZULJtQxPMO52j5jn0JArstE+EPhbwpp1xcLa/br5YmYXN2A5U7Tyq9B/P3oA8H8K/C7xX4yKXcVs1vZuRm8vCVDD1UdW49OPevX9C+Amm6ROt1c6gmoXAwR9ptd0an/c3YP45r0fwj/yJuh/9eEH/ota2aAuc/FpGuQRrHDrcEcajColgoAH03U46b4h/wChgjH/AG5L/jW9RQB5Td6Lolz8XLm212KyuEfQleTzlVFkk8wgvt6Zx36iucvUltPg5pMF5M6Qf26n2Myvhvs4mOwgnnG3kH0x2r05/Cb3Xj2bX71LKe0eyW0W3kTcVw24PyMZzxj9a6O4sLO8CC5tIJgn3fMjDbfpmgDzf4lQWtnY+HJf7RnkzrlowE1xuUruOTj+tejf2lYi6S0+2W/2l08xYvMG9l9QOuPemyaVp0yosthausY2oGiUhR6Djiufv47SXxNY2a6LdeVbzLOZ4rXEbSeX5a5bgbVQ8/QDnkUAZdzZTeONQ1mS1vbN9NWJ9KCSxNJ1wZXUq4wS2F/7Zgin/CrW2u/Dkmh3tykup6JO9jNgjLKhwjj1BGBn2rr7Uaba3stjaRQQ3AjWaSOKML8pJCk4HqrflUsGnWNrKZbezt4ZCMF44gpI+oFAGWdO8QZONeiAz0+xD/4qj+zvEH/Qfi/8Al/+KrdFFAHOS6Pr0skLP4hjBjfen+hL1wR/e9Cam/s7xB/0H4v/AACX/wCKrXng86W3fdjypN+MdflYf1qagDC/s7xB/wBB6L/wCX/4qj+zvEH/AEH4v/AJf/iq3aKAOM8UWGvJ4T1l5NcieNbGYsn2MDcNhyM7uK0odO8Q+Sn/ABP4vuj/AJcR/wDFVY8Xf8iZrn/XhP8A+i2rWh/1Cf7ooAxP7N8Q/wDQfi/8AV/+Kpf7O8Qf9B+L/wAAl/8Aiq3e9FAGCdN8Q/8AQfi/8Al/+KpkOk69EhVPEEZBZm/48l6kkn+L1NdDUUEXkxlc5y7N+ZJ/rQBj/wBneIP+g/H/AOAS/wDxVH9neIP+g/F/4BL/APFVu0UAYX9m+If+g/F/4Ar/APFVxXg+O4i+NvjBLq4FxMLS1zIE2A/IO2a9SrzXw5/yXbxl/wBelp/6AtAHpVFFFABRRRQAUUUUAFFFc9e+L7C08Y6d4ZCPLeXiu5ZfuxBV3fMfU+n4+lADvGx1AeCtXOmeR9q+zPt8/Ozbj5unfbnHvisr4U+b/wAKz0HITZ9m4wTn7xrofEn/ACLGq/8AXpL/AOgGsH4Vf8kw0D/r2/qaAOsbzvMGNmz3zmlk87I8rZjvuzUhooAY/mbf3e3d/tdKghW5XzzIULM2U5OAMD+uatVFGzmWUMPlDDbx1GB/XNACx+btPm7N3bb0pIvP3HzfLx/s5qWigCL9/wCb/wAs/L/HNY92Zv8AhNNOCBNv2C5zuJz/AKyCt2se4H/FY6ef+nC5/wDQ4KANSTzcDytnvuzQ3m+X8uzzPfOKbdXdvY20lzdTxwQRjc8kjBVUe5NeL+I/ju91eHSvBGly6hdPlVuHjYgn1RByfqcfSgD2aS4FtbtLdSwxBQSXZtqge5NeV+JfjdptpONO8P2763qJcBfsu4R5B6ZxlvwGPeuc074ReL/GlyNS8da5PArAEW6MGkx6YHyJ+AP0r1nQfBeh+D7RY9D02OKRmRZJiN8jjIzljz6+1AHkrfDjxx8TtSj1bxjdR6Vbou2K2RMsqk5IC54+rHP5V6h4X+HWgeENv9madC8vGbq4+eY/QkcfQYFdhRQBFJ52R5WzHfdmoNU8z+yrrYF3eS+cn/ZNXKrah/yDbr/ri/8AI0AZnhEyHwPoZAXf/Z8H0/1YrYj83b+82Z7bayvCH/Il6H/2D4P/AEWtbNAEUfn5PmeXjttzQPP83ny/L9s5qWigCnCl4hYFoypkYjdknBJI/SrEvnYHlbPfdmkt2kZGMowQ7AcdsnH6VLQBG3m+X8uzf79KVfM8v59u/wBulPooA5m0Mv8AwsW/8wLn+yrfG0/9NZq6JfO3ncE2dsZzWDB/yUW//wCwVb/+jZq6KgCI+f5vHl+X75zRL5+R5Xl477s1KKKAKd5HdO1q1uygpLuk3EgFdrDHHXkirH73yv4PM/SmTtKstuIxlWkxJx0Xa39cVPQBHH5u0+Ztz/s0kXn5Pm+XjttzUtFAGF4s8/8A4RHXM+Xs+wT+uf8AVtWqnnbI9mzZtGc5zWf4t/5E3W/+vCf/ANFtWrD/AKlP90UAJJ5uB5ezPfdmlbzPL+Xbv9+lP70UAMXzPL+fbv8AbpUNmtysbi4Kk72I2kngsSP0xVmooGdkJcYO5h07ZOP0xQAJ9o8w7/L2dtuc0Hz/ADePL8v3zmpaKAI5POyPLCY77s15z4c/5Lt4x/687T/0AV6VXmvhz/ku3jL/AK9LT/0BaAPSqKKKACiiigAooooAqapPd22l3U9ja/a7tImaGDeE8x8cLk8DJ7149Lea1Z+O/CP2jwvfLebrqSTzLqFmuXdBvYENgBRjg9gAOle2VVn02yub+2vpraN7q13eRKR80e4YbH1FAHJ/EXV/EWnaVNDo3h4albTWsouZzcrH5Ax6HrwSfwqj8M7nWU+G+hLb6baSxC2G13vChPJ6jyzj867DxH/yLGq/9ekv/oBrC+Ff/JMNA/69h/M0AbP2vX/+gRZf+B5/+N0v2vXv+gTZf+Bzf/G61jS80AY/2vXv+gTZf+Bx/wDjdRpqGvvJIv8AY1mNhwT9vPPGf+efvW5zUcciu8igHKNg/kD/AFoAy/tmv/8AQIs//A4//G6Ptmv/APQIs/8AwOP/AMbq7qGp2Ok2j3WoXcFrbp96SZwqj8TXkniD42TalcNpPgHSrjVL1vlFy0LFF9wvU/U4A96APQtS8Q6ho1k95qVnptpbJ96WXUdoH5x9favLNU+Nsl94ihi8MaG2pX6wSW8RRmZGLshyF2hiBs9qfpvwd8ReLL1NV+IGtzOxOfscL7iB6Z+6v0UH616LpHhjRvDHiPTrTR9PhtYvsNxuKr8znfDyzHk/jQB5mfhx8QPHF1Hf+MtQVLQnd/Z0dz5ZX0GArKv15Nej+HfDjeFLUW+j+GNNgGMNKL0mR/8AeYx5NdnzRQBkfbNf/wCgRZ/+Bx/+N1FPqWvQIGOjWjAsq8Xx7kD/AJ5+9bvNRTSrEqs4JBZVGPUnAoAzBea/30iyH/b8f/jdL9r17/oE2X/gc3/xutal5oAx/tev/wDQJsv/AAOb/wCN1XvrvXjp9zu0myA8psn7c3of+mddBzVbUP8AkGXX/XF/5GgDmfCt1rg8IaKItLs2jFjBtZr1gSNgwSPLOPzrX+16/wD9Amy/8D2/+NU3wh/yJWhf9g+D/wBFrWzzQBk/a9e/6BNl/wCBzf8Axuk+2a9/0CbL/wADj/8AG61+aKAMOHUdemViNGs1AZl5vz2OP+eftU32vXv+gTZf+Bzf/G60oZVlVigOAzKc+oODUvNAGR9r17/oE2X/AIHN/wDG6Q3mv9tIsv8AwPb/AON1sc0c0AcRDd65/wAJ/eEaVaeb/ZkGV+2nAHmy4OfL+vGO1b/2zX/+gRZf+B7f/GqqQf8AJRb/AP7BVv8A+jZq6LmgDIF3r3/QJsv/AAOb/wCN0v2vXv8AoE2X/gc3/wAbrWFHNAGFNqevQyQp/Y1mxlfYCL88HaTz+79qm+16/wD9Amy/8Dm/+N1pSzJFJCrAkyvsXA6HaT/IGpuaAMj7Xr3/AECbL/wOb/43SG71/wD6BNl/4HH/AON1sc0c0Ach4pu9cPhHWfN0qzWP7DNuIvSSBsOcDy+a1IbzX/JT/iUWX3R/y/t/8ap3i3/kTNc/68J//RbVqw/6lP8AdFAGX9r1/wD6BFl/4Ht/8bpftevf9Amy/wDA5v8A43WtS80AY/2zX/8AoEWf/gcf/jdRw6hr0qlv7Hs1AYrzfnsSP+eftW3TIpFkQsvQMV/EEg/yoAzPtevf9Amy/wDA5v8A43R9r17/AKBNn/4HH/43WvzRzQBj/bNf/wCgRZf+B5/+N1w/hJ7iT43eMGuoUil+yWuUSTeB8g74Gfyr1DmvNfDn/JdfGX/Xpaf+gCgD0qiiigAooooAKKKKACiiq1vqFleSyR213BNJEcSLHIGKH3APFAGV41vJLDwXq9xFaTXbi2dRFD945GCfoM5PsDWP8KZXPw10FDA4UW33yRg8n3zXR+JP+RY1X/r0l/8AQDWD8Kv+SYaB/wBew/maAOraZxNsEEhX++CuP55pZZXjICwvJnupHH5moNS1Sw0ize71G7htbdBlpJXCgfnXk2t/Gi71e/OjfD/SZdTvG4+1SRny19SF4492wPrQB6hrniPSvDdh9s1a8itYeg8xgCT6AdSfYV5LqPxs1HW786d4B8PzXlw/Lzzxk+2doPA6csR9KdpfwX1TxJqP9tfEHWJLq4k+Y2kD8L/slugHso/GvWtE8P6V4etPsmk2UNrDxlY1AzgY5PUn3PNAHkumfCHXfFd0mq/ETWbieQHKWMLjCjrjI4X6KPxr1TQNE0zQLX7HpWjpp8HU7FUbj7kEkn3NbNFAEImk87Z9nk25+/lcfzz+lY95M6eM9OVYJHBsbnlSuPvw+prerIuB/wAVfp5/6cbn/wBDhoA0pZXjxtheTPXaRx+ZFDSOsO8QuzcfICM/zxUtIKAGLI7RFzC6sP4CRk/riojKsiA3EDRKGXb5hBy2eOhPfFWainhSZFVyQA6sMeoORQAJK7SFTA6gfxEjB/WkaaRZdgt5GX++CuP55qaigCKWV4yAkDyZ67SOPzIqvqsjJpNyyxO5MTfKpGR8p9TV2q2of8g26/64v/I0AZnhF2HgfQ3EbE/2fBheMn92K14pGkUlonjIPRiOfyJrL8IceC9DH/UPg/8ARa1s0AQxTPISGgeP3Yr/AEJoE0hlKGBwufvkjH881NRQBVWcKxWC3d03HcylQA2Tnqc9allleMDZC8uf7pAx+ZFEMSQqwQkhnZj9ScmpaAI2kYRBxEzN/cBGf54oWRmjLGJlb+6cZ/nipKKAOYspXk+It+XheLGlW/DEc/vZvQmuhSZ2kKtbyIv94lcH8jmsOD/ko1//ANgq2/8ARs1dFQBCZXEuwQOV/v5XH880sszxsAkEkme6lePzIqUUUAVbqZYzbloWkdpMIBjIbaxzyfQGpfNfyd/kvu/uZGf54/WiaFJZIWYkGN9y4PU4I/kTUtAEccjOpLRMh9GI5/I02KZ5D88Dxf7xU/yJqaigDA8WTSHwlriG3kC/YJ/nJXH+rb3z+layTOixqsEjjaPmBXA/M5rP8W/8ibrn/XhP/wCi2rWh/wBSn+6KAGyyMmNsTSZ/ukcfmaVpGWLcImZv7gIz/PFSd6KAI1kYxFzEwbH3CRn+eKitJhKjFYHiUMfvEcnJz0J75qzUcMaxIVU5BZm/Ekk/zoAak0jSFWt5EA/iJXB/I5oM0gm2C3kK/wB/K4/nmpqKAIpZXjYBYHkB7qV4/MivOvDhz8dfGP8A152n/oAr0qvNfDn/ACXbxl/16Wn/AKAtAHpVFFFABRRRQAUUUUAR3ECXNvJBJu2SKUbaxU4IxwRyPqK86gi0nS/i/YQR6RNpLNYSQWzxRIsN6cgkEqf4QvGeee2Bn0K9S5kspkspY4blkIikkTeqt2JGRke2awbTQNSutVsNT8QXlpcT6eH+zJaQNGoZhtZm3MxJxwAMAZPXsAUPiF4wsfDmkzWV1a380l7ayiNre3Mir8uPmPbrXk2hfFrU7XwXpPhnwjotxfarDbbJZjEXEZyfuqOvXqcD617z4kA/4RnVTjn7JL/6Aa5r4R2Fpa/DXRpbe2iikng3yuiAGRsnknvQB5ZpngXUvEN6uqfEO41+6k3ZFlDayMAPQtjCj2X869a0W90Lw9ZC00nw3qVpCO0enOCx9ScZJ9zXYmloA5//AISyD/oFaz/4Av8A4VHH4ngSSV/7M1g72Bx9gfjgD+ldJUUSuJZi2dpYFee2BQBi/wDCWQf9ArWf/AB/8KT/AISyD/oFaz/4AP8A4V0FFAHPHxdAP+YTrX/gvk/wrLn8V258U2Mn9mawMWc42mwkycvDyBjpx+ortax7hf8AisNPPpY3I/8AH4aAK3/CXQf9AnWv/BfJ/hSjxbB/0CtZ/wDACT/CugpBQBgf8JZB/wBArWf/AAAf/Cop/E8E6Kv9mawuHVv+PB+xB/pXS1Dco7IojznzFJwccZGf0oAxf+Esg/6BWs/+AD/4Uf8ACWQf9ArWf/AB/wDCugooA58+LYB/zCda/wDACT/Cq194tt20+5H9la0MxMMnT5MdD7V1NVtQGdNuv+uL/wAjQByPhfxVBD4S0eL+zNYfZZQruSwkKnCDkHHI961v+EtgP/MJ1r/wXyf4VP4QH/FFaF/2D4P/AEWtbNAGB/wlsH/QK1n/AMAH/wAKP+Etg/6BWs/+AD/4V0FFAHNW/iaCFGX+zNZbc7P/AMeDjqSf61L/AMJZB/0CtZ/8AH/wratlkVHEhyfMYjnPBJx+lTUAc/8A8JZB/wBArWf/AAAf/Ck/4S6D/oE61/4ASf4V0NFAHAReKbcePLyb+zdXO7TYE2CxfcMSSnJGOnPX61vf8JdB/wBAnWv/AAXyf4UkA/4uLfn/AKhVt/6NmroqAOfHi2D/AKBWs/8AgBJ/hR/wlkH/AECtZ/8AAB/8K3xS0AczN4lgmkgf+zNYHlSb8fYH5+Uj+tTf8JZB/wBArWf/AAAf/Ctm4SRpbYxkhVky/OMrtYfzIqegDA/4SyD/AKBWs/8AgA/+FIfFsA/5hWs/+AD/AOFdBRQBxPifxVBN4T1iL+zNXTfZTLuexcKMoeSccCtKHxdB5Kf8SnWvuj/lwk/wq34tGfButj1sJ/8A0W1a0I/cp/uigDB/4S2D/oE61/4ASf4Uv/CWQf8AQK1n/wAAH/wrf70tAHP/APCWQf8AQK1j/wAAX/wqOHxRBEhX+zNYOWZv+PB+5J9PeukqK3V1jIk5O9iMntuOP0xQBif8JZB/0CtZ/wDAB/8ACj/hLIP+gVrP/gA/+FdBRQBz3/CXQZ/5BOtf+C+T/CuO8HXi3/xr8YXCxTRBrS1+SeMo4+QdQeRXqVea+HP+S7eMv+vS0/8AQFoA9KooooAKKKKACiiigAooooAwvGmpWuleDNXu72Xy4FtnQtgnlhtXp7kCvN/APxX8HaJ4E0jTb/VGiureAJIggc4OT3AxXrep2Y1HS7qyLbPtELxbsZ27gRnH41neFvDsfhrwxYaMZVuTaR+X53l7N/JOcZOOvrQBzH/C7PAX/QYf/wABpP8A4mj/AIXb4C/6DD/+A0n/AMTXfeTF/wA81/KjyYv7i/lQBwX/AAuzwF/0GH/8BpP/AImo0+NvgUvJu1htufl/0aTpj/dr0HyYv7i/lVOy0PTNOnup7Sxhhlu5PNndFwZG9TQBx3/C7PAX/QYf/wABpP8A4mk/4Xb4C/6DD/8AgNJ/8TXfeTF/cX8qPIi/55r+VAHBf8Ls8Bf9Bh//AAGk/wDiaz5vjH4HbxBaXQ1dvKjtpo2P2eThmaMjt/smvTfJi/55r+Vc1ceDI7j4h2niv7UALeyNp9l8rhslju3Z/wBrpjtQBj/8Ls8Bf9Bhv/AaT/4mk/4XZ4C/6DD/APgNJ/8AE133kxf3F/KjyYv+ea/lQBwP/C7fAX/QYf8A8BpP/iaZN8bfA21fL1hs7hnNtJ0zz/D6V6D5MX9xfyqnqOhaXq8cMeoWMFykMqzRrImQrjow9+TQBx3/AAuzwF/0GH/8BpP/AImk/wCF2+Av+gw//gNJ/wDE133kxf3F/KjyYv8Anmv5UAcD/wALt8Bf9Bh//AaT/wCJqK7+NPgSWynjTWGLNGygfZpOpH+7XofkRf8APNfyqjrejx6xoOoaYGEP2y2kg8wJnZvUrnHfGaAPPvD3xh8D2HhvS7OfV2Wa3tIonH2eQ4ZUAPb1FaX/AAuzwF/0GG/8BpP/AImup8N6BF4e8N6fpHmCf7JCsXmlNu/HfHOPzrU8mP8A55r+VAHA/wDC7fAX/QYf/wABpP8A4ml/4XZ4C/6DD/8AgNJ/8TXe+TF/cX8qPIi/uL+VAHn0Xxs8C7W8zWWzuOMW0nTPH8PpUn/C7fAX/QYf/wABpP8A4mux0/Q9L0o3BsbGC3NxKZpvLTG9z1Y+9XPJi/uL+VAHA/8AC7fAX/QYf/wGk/8AiaX/AIXZ4C/6DD/+A0n/AMTXe+RF/wA81/KjyIv+ea/lQB5VF8XvBK+MbvUG1ZhbyWEEKt9nk5ZZJSRjHoy/nWx/wuzwF/0GG/8AAaT/AOJrai8Hxx/EGfxT9pBEtgLP7N5XTDbt27PtjGPxro/Jj/uL+VAHA/8AC7PAX/QYf/wGk/8AiaP+F2+Av+gw/wD4DSf/ABNd95MX/PNfyo8mL+4v5UAeey/G3wP5kPl6y23f+8zbSfd2n/Z9cVL/AMLs8Bf9Bhv/AAGk/wDia7G+0PS9SltZb2xgne1k82BnQHy39R71c8iL/nmv5UAcD/wu3wF/0GH/APAaT/4mj/hdvgL/AKDD/wDgNJ/8TXfeRF/zzX8qPIi/55r+VAHmOv8Axi8D33h3U7SDVmaae1ljRfs8gyzKQO3qavx/GvwGI1H9sNkAD/j2k/8Aia6fxX4cj8S+F7/RhMLb7XHs84R7tnIOcZGenrVzSdLi0zR7Kwysn2aBId+3G7aoGcfhQBxv/C7PAX/QYf8A8BpP/iaP+F2+Av8AoMP/AOA0n/xNd95MX/PNfyo8mL/nmv5UAcF/wuzwF/0GH/8AAaT/AOJqOL42+Bdh8zWWzuP/AC7SdM8fw+mK9BMERGDGuD7VT0vQtL0WzFpptjBa24Yt5cSADJ6mgDjv+F2+Av8AoMP/AOA0n/xNJ/wu3wF/0GH/APAaT/4mu+8mL/nmv5UeRF/zzX8qAOC/4XZ4C/6DD/8AgNJ/8TWL4A13T/Enxf8AFmqaXOZrOa0tgjlSucKAeDz1Br1fyIv+ea/lXPaZ4TXTfHGs+JBd7v7Sihi+z+Xjy9i4zuzzn6CgDpaKKKACiiigAooooAKKKKAGyAtGyq5QkEBhjI9+a5X4fXl5eaJfNfXc13LFql3CJZiCxVJWUdAAOB0AArqpCVjYhSxA4UdT7c1y/gOwv9N0zUINQspLV5NSubmMO6NuSSRmX7rHnB5zQB1VFFFABRRRQAUUUUAB6cda841rT9c0DWdB1K38RX91eX2oxW13ZSybrd42yZPLjwNu1QSD1wOcnr6MxKozBSxAzgdTXAw3/iuXWHvrjwdM0+4w2zS30HlW0ZPLYDFiSMFsDPGB6kA7+iiigAooooAKKKKACszW7a5urUJDqj6ZAMme4iC+YFxwFLAqvucduPUadZGuavHpaQJPpV/fQ3DFHNrb+cI/d1Bzg+oB96AMz4f32pah4emk1DUItRRLuWK0vY9uZ4FOFdtvGchvwxXVVyPgbw82htrU6WosrTUL03FtZjA8pNijkDhSSCcDoMfQddQAUUUUAFFFFABRRUF9aJf2FxaSPIiTxtGzRttYAjGQexoA4HVdf1O7+IHhcWly8OizXU8Oxcj7UyRMS59UB4A7kE9MV6LXmWq/De6Gu+GjYaprEllZyyec7XgBtk8shdnTGTgcA8V6bQAUUUUAFFFFABRRRQB5/wDEi51KN7RRpuszaJEjTXc+k3AjlVug6HcQBuJA4ORzxXVeGHsJPDVhJpd3Nd2TxBop55Gd3B5+Ytzn61DqN/r8GqNb2Whw3dm0WUuGuwm2T0dSM7enIz9Km8M6Gnhzw9aaVG/mCBTlguAWJLHA7DJOBQBrUUUUAFFFFABRRRQBS1fUY9H0a+1KZS0VpA87Adwqk/0rz3wn4hiefS73xPaXw1PWyHtbqdFNshIykUQDEp8pHJALEE5PFeh6tp0WsaPe6bOSIruB4HI6gMCD/OuOtfCWq3dn4c0vVRbLbaFMkq3EMhLXBjUrH8uBtyDk8npgZzkAHe0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRXP6/4pTQdS0ywOm3l3NqLOkPkBSNyoWwcnPOOuMDqSMUAdBRXHad8QrO40/VpdRsbjT73SZUiurJiHfc/Ee0jhtxIA6f1rV0vXrq81m40q+0ieynihWdJN3mROjHGN4AG4Hqv6mgDcooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArh/Gr3MfjLwU9pCk0wvLjCO+0EeQ+7nB5xnHvjpXcVSu9J0+/ure6u7OCae3OYZJEBaM+qntQBxGq+BNQ1y28S3rTR2Wp6lLbyWe1twg+z8xljjqTnPXGR1xXSeH38T3Ehl8QW9haBI9ixWkrSeY2RlySBgccDnqc10FFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB//Z']	['che_324.jpg']
che_325	OPEN	The emission reduction and control of volatile organic compounds has become one of the key tasks of air pollution control in my country at the current stage. The process of removing ethyl acetate through catalytic oxidation is as follows: I. \[CH_3COOCH_2CH_3(g) + 5O_2(g) \rightleftharpoons 4CO_2(g) + 4H_2O(g) \Delta H_1 < 0 (\text{main reaction})\]II. \[CH_3COOCH_2CH_3(g) + H_2O(g) \rightleftharpoons CH_3COOH(g) + CH_3CH_2OH(g) \Delta H_2 > 0\]III. \[CH_3COOH(g) + 2O_2(g) \rightleftharpoons 2CO_2(g) + 2H_2O(g) \Delta H_3 < 0\]IV. \[CH_3CH_2OH(g) + 3O_2(g) \rightleftharpoons 2CO_2(g) + 3H_2O(g) \Delta H_4 < 0\] When the pressure is certain, a mixed gas of n(ethyl acetate): n(oxygen): n(water vapor) = 1:5:1 is introduced into a closed container filled with a catalyst to cause reactions I, II, III and IV to occur. At different temperatures, the percentage content S of each carbon-containing substance (CH_3COOCH_2CH_3, CH_3COOH, CH_3CH_2OH and CO_2) at equilibrium changes with temperature as <image_1>shown in the figure, and curve c represents the change of S(CH_3COOH) with temperature. It is known that: \[S(CH_3COOH) = \frac{2n(CH_3COOH)}{4n (CH_3COOCH_2CH_3) +2n (CH_3COOH) + n(CO_2)} \times 100\%\] When the temperature is T_2, the volume fraction of carbon dioxide is ( )(keep one decimal place).		0.333	che	化学反应原理	['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che_326	OPEN	In the storage and transportation of fruits and vegetables, part of the mechanism of a\(C_2H_4\) conversion reaction is shown in the figure <image_1>(*O represents active oxygen species). Studies have shown that the highly acidic bridging hydroxyl groups (\(\ce{-OH}\)) on the catalyst surface are active sites for catalytic oxidation, while the weakly acidic silicon hydroxyl groups (\ce{Si-OH}\) and aluminum hydroxyl groups (\ce{Al-OH}\) do not show catalytic activity. The adsorption of the generated\(H_2O\) on the surface of the catalyst reduces the catalytic activity. The principle is ( ).		H_2O combines with the H^+ ionized by the bridging hydroxyl group to form H_2O^-(or the oxygen atom in H_2O forms a hydrogen bond with the hydrogen atom in the bridging hydroxyl group).	che	化学反应原理	['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']	['che_326.jpg']
che_327	OPEN	Preparation of methanol ($CH_3OH$). The synthesis of methanol from $CO_2$and $H_2$mainly involves the following reactions: Reaction 1: CO_2(g) + 3H_2(g) \rightleftharpoons CH_3OH(g) + H_2O(g) \quad \Delta H_1= -49 \, \text{kJ} \cdot \text{mol}^{-1} Reaction 2: CO_2(g) + H_2(g) \rightleftharpoons CO(g) + H_2O(g) \quad \Delta H_2 = +41 \, \text{kJ} \cdot \text{mol}^{-1} In a 1L closed container, add the catalyst and add 1 mol of $CO_2$and 3 mol of $H_2$; When the above two reactions occur, the equilibrium conversion rate of CO_2 $and the selectivity of methanol change with temperature are shown in the figure<image_1>. At 550 K, if the total pressure of the system after the reaction is p, then $K_p$=( ) for Reaction 1 (list the calculation formula).		\frac{\frac{0.12}{3.76}p \cdot \frac{0.2}{3.76}p}{\frac{0.8}{3.76}p \cdot \left(\frac{2.56}{3.76}p\right)^3}	che	化学反应原理	['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che_328	OPEN	"People have designed a method to prepare sulfuric acid from industrial waste liquid as raw material. Electrolysis of $(NH_4)_2SO_4$waste liquid to produce concentrated sulfuric acid and at the same time obtain ammonia water. The schematic diagram of the principle is shown in Figure 1<image_1>. Some students designed a fuel cell to jointly treat $(NH_4)_2SO_4$waste liquid using M, N, concentrated sulfuric acid and concentrated ammonia produced in Figure 1. The schematic diagram is shown in Figure 2<image_2>. Concentrated sulfuric acid should be injected ( )(fill in the ""C pole area"" or ""D pole area"")."		D polar region	che	化学反应原理	['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'che_328_2.jpg']
che_329	OPEN	"One of the goals of ""carbon peaking and carbon neutrality"" is to effectively fix and utilize carbon. The reactions related to the synthesis of $CH_3OH$and $CH_3OCH_3$using $CO_2$as raw material are as follows:

i. $CO_2(g) + 3H_2(g) \rightleftharpoons CH_3OH(g) + H_2O(g) \quad \Delta H_1 = -49.0 \text{kJ} \cdot \text{mol}^{-1}$

ii. $2CH_3OH(g) \rightleftharpoons CH_3OCH_3(g) + H_2O(g) \quad \Delta H_2 = -25.0 \text{kJ} \cdot \text{mol}^{-1}$

iii. $CO_2(g) + H_2(g) \rightleftharpoons CO(g) + H_2O(g) \quad \Delta H_3 = +41.2 \text{kJ} \cdot \text{mol}^{-1}$

At 5MPa,$CO_2$and $H_2$were fed at a volume ratio of 1:3, and only reactions i and iii occurred. In the equilibrium system, the proportions of CO and $CH_3OH$in the carbon-containing product and the $CO_2$conversion rate change with temperature are <image_1>shown in the figure. At 270℃, the equilibrium constant $K_p$of reaction iii is ( )(equilibrium constant expressed in partial pressure, partial pressure = total pressure × mass fraction of substance)."		1.5 \times 10^{-2}	che	化学反应原理	['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']	['che_329.jpg']
che_330	MCQ	In a closed container with a volume of\(2L\), when\(800^\circ C\)\(2NO(g)+O_2(g)\rightleftharpoons2NO_2 (g)\) In the system, the change of n(NO) with time is as follows<image_1>. The following statement is incorrect:	['A. The <image_2>curve showing the change of\\(\\mathbf{NO}_2\\) in the figure is a', 'B. Use\\(\\mathbf{NO}_2\\) to express the average rate of the reaction from 0 to 2 s\\(v=0.003\\,\\text{mol/(L·s)}\\)', 'C. At equilibrium, the conversion rate of\\(NO\\) is 65\\%', 'D. \\(v_{\\text{inverse}}(\\mathbf{NO})=2v_{\\text{positive}}(O_2)\\), indicating that the reaction has reached equilibrium']	A	che	化学反应原理	['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'che_330_2.jpg']
che_331	MCQ	Reaction\(X=2Z\) goes through two steps: ①\(X\rightarrowY\), ②\(Y\rightarrow2Z\). The change curve of the concentrations of\(X\),\(Y\), and\(Z\) in the reaction system over time is shown in the figure<image_1>. The following statement is correct.	['A. a is the curve of\\(c(Z)\\) versus t', 'B. When\\(t_1\\),\\(v(X)=v(Y)=v(Z)\\)', 'C. When\\(t_2\\), the consumption rate of\\(Y\\) is less than the generation rate', 'D. \\(c_1=\\frac{2}{5}c_0\\)']	D	che	化学反应原理	['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che_332	OPEN	A research team simulated the reaction. When the temperature is t, a certain amount of CO\(_2\) and H\(_2\) are filled into an evacuated closed container with a volume of 1L, and the reaction reaches an equilibrium state in 5 min. From the reaction for 2 minutes to the reaction reaching equilibrium, the curves of the amount of some reactants and products versus time are shown in the figure<image_1>. The ratio of CO\(_2\) to H\(_2\) at the beginning is ( )		5:12	che	化学反应原理	['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che_333	OPEN	Organic matter is closely related to human life and development. (1)Ethyl acrylate (H\(_2\)C=CHCOOCH\(_2\)CH\(_3\)) is an important synthetic monomer and chemical intermediate. It can be used to produce a variety of polymer materials with different properties. It is widely used in the textile industry, adhesives, leather and other industries. One synthetic route for preparing ethyl acrylate is as follows<image_1>. The atomic utilization ratio of the reaction of forming a polymer from ethyl acrylate is 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che_334	OPEN	Figure 1 below <image_1>shows the experimental device for exploring the catalytic oxidation of ethanol. The experimental operation is as follows: first connect the device according to the figure, close the pistons a, b, and c, heat the middle part of the copper wire for a while, then open the pistons a, b, and c, and intermittently introduce gas. After the experiment was carried out for a while, the alcohol lamp was removed, and the reaction continued. The reason was ().		Catalytic oxidation of ethanol is an exothermic reaction, and the heat released can keep the reaction 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che_335	MCQ	A-F are common organic compounds, and the production of unsaturated hydrocarbons A can be used to measure a country's petrochemical level: B can be used as food packaging materials. The transformation relationship of each organic compound is <image_1>shown in the figure. Experiments were <image_2>carried out with the experimental device shown in the figure, and F was prepared by reacting 4.6 g of C and 3.0 g of E. What is wrong about the above experiment is ()	['A. Concentrated sulfuric acid only serves as a catalyst', 'B. The long tube in test tube a does not extend below the liquid surface to prevent back-sucking', 'C. Saturated Na ˇ CO solution reduces the solubility of ethyl acetate and facilitates stratification', 'D. After the experiment, shaking test tube a can observe that there is oily matter in the upper layer, and the red color of the lower layer solution becomes lighter.']	A	che	有机化学基础	['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'che_335_2.jpg']
che_336	MCQ	Organic compound M is an intermediate for the synthesis of new antithrombotic drugs, and its simple structure is shown in the figure <image_1>. The following statement about M is incorrect:	['A. All atoms in M molecule cannot be coplanar', 'B. 1molM reacts with sufficient Na to form\\(1\\text{mol}\\text{H}_2\\)', 'C. M can undergo addition, addition polymerization, oxidation and substitution reactions', 'D. M can fade bromine carbon tetrachloride solution and acidic potassium permanganate solution, and the fading principle is the same']	D	che	有机化学基础	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEoAsEDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiobq6gsrWS5uZUigiUs7ucBQPegCaivObP4gav4svJ4vB+kpNZwtte/vGKRk/7I6mpNT8Q+OvDVub7UdIstRsY+ZTZOfMQeu04zQB6FRWH4W8V6V4v0ldQ0ucSJ0dDw0bejDtW5QAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV4T+0N4luYYbDw5auVFz+9m2n7wB4X88Gvdq+bP2hIHt/GulXrg+S0QwfoRmgD3XwZosGgeEtO0+BAoSFSxA+8xHJNbkkayxtG6hkYYIPcVW0uVZtKtJEIKtCpBH0q3QB82aHeyeAPj1d6TCxWwvLgI0fYBwGB/DNfSdfMni+FtU/aNjgtsswuYASO2EXNfTdABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUVxXi74oeHfCKmKa4+1Xp+7bW/zN+PpQB2tFcj4S+I/h7xfCBZ3Qhux9+2m+V1P9a66gAooooAKKKKACiiigAooooAKwdf8AGWheGgq6lfKs7fcgQF5GPsoyar+PfFKeD/CV5qpAaVV2wqe7npXnvwX8PtrkVx4017/TL+6lYQtKMhADyQKAOxj+JtiwDyaJrkMH/PZ7M7QPXAJP6Vq2Hjjw/quqW2n6ffJc3E8byhUH3QpAO4HkHmuhKgrtIBHTFefXXgiDTfifpniTTLcRpOkkN2iDABOCG/Q/pQBqa18SfD3h6YR6rLcWpJIVnt32tj0OMGtLQfFmm+JEWTThcPCwysrwsin6EivNv2i0U+EdPYgbhcnB/AV6J4DRU8BaCFUAfYYTgf7goAb4g8baP4Y3HVWuIYlIBlEDMnPuBiotB8faH4mkC6S9xcKW2mQQOEB+pGKzfjCiyfC/WAyg4VCM+u8Vl/ARVX4ZQkAAm5kyfXpQB6dRXA6h8YvCGl6hPY3N1Os8DlHAiyM/nVb/AIXj4J/5+7j/AL8//XoA9Horzj/hePgn/n7uP+/P/wBej/hePgn/AJ+7j/vz/wDXoA9Horzj/hePgn/n7uP+/P8A9etfXPH2n2Xw9l8U2bGSB0P2cMMFmyQB+YNAGpr/AIw0Pwyq/wBp3yRyv9yFQXkb6KOaw4/ibZOA76HrkcH/AD2azOMeuAc/pXFfBjQn8SPd+NdfP2u8nmZbfzBlUAPJA+uR+Fe2YGMYGPSgDnbHx14e1PUrSwsL9bi4ulZlRAcrtHO4HkVV1v4jeH/Dsvl6rJcW2SQrPbvtb6HGKydS8Ew2PxN0PxJplsI1keSG8WMYHMbEN+Yx+NYn7RCKfAlqxUbheLg+nymgD0DQPF+meJVWTTftEkLAlZWgZVOPQkUzxB4z0nwxubVDcRRLjMogZkGfcCofh2ip8PdDCgAfZVOBVL4sIr/DLW9wBxbsRn1AoAtaF8QdC8SyBNJkuLgbtpdbdwoPuSMV1VeU/s/Ko+HIYAAm5kyfXmvVqACiiigAooooAKwNf8aaF4aKx6heqLh/uW8YLyN/wEZNVfiF4qXwf4Pu9U4M/wDq4FPdz0/kTXCfBfwydSs5vGeuf6XqF9I3ktLyEQHGRn3z+VAHWx/EyxOHm0XW4IP+e0lmdoHrgZP6Vr6d410HWNUh0/Tr5LmeWIygR/wgeueQfat8qGUqQCDxg1wP/CFwaR8UrHxBpluIoLqKSO6VBhQ20kN7Zx+tAHeySxwxtJK6oijLMxwAPc1xtx8TdDFy9vp0N9qrxnDmxty6qfTccD9a87+Lniu+1rxfY+BdKnaKKWRVunQ8sSen0Aya9k8P6DY+HNHt9OsYEjjiQAkDlj3JoAw9O+JWg3t8tjdG50y6c4SK/hMW76Hp+tdgCCAQcg965Xx/4StPFfhm6t5IlF0iF7eYD5kcdOa4X4F+OLvWLO48PapIZLuyGYnY/MydMH6UAev3FzBaQPPcSpFCgyzu2AB9a46T4n6NJK6aZaalqiocNJZ2xZAfqcA/hXmvj7X7zx18TrPwRZTvHpsUwW52HHmEctn8Aa900vS7PR9PisbGBIYIlChVGPzoA5/R/iLoGrXwsHlmsL49Le9iMTH6Z4P511M0ohheUhiFGSFGSa4b4qeErfxB4TubmKMJqVmpmt50GGBHbPpWT8E/HU/irw9JYahJvv7DClz1dOxPv2/CgDa1D4seFdKvDaX9zcW9x/zzktnBP6c11Gk6xb6zbme2jnWMYwZYmQnPoDXhXxviT/hZ/hg7R85QNx1/eCvoKEAQRgdNo/lQByWs/Evw54enEOqzXFqxJCl7d8Nj0OMGtXQfFOneI4xLpwuGhYZWR4WRWHsSOa8u/aPUHw3pTYGRcMM/hXp3gpQvgjRQoAH2OPgf7tAG9RRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFcR8T/AaeOfDZt4iI7+3PmW7n1/un2NdvRQB5R8O/HA0fTY/DHizdp+pWQ8tHnBCyqOmD610/iH4j6Fo1i7W90l7esMQ21v8AMzt26dq09cvPDX2u107XDYPPcnEEN0qsXPsDUFuPCGi69HpdtBpdpqkq70hjiRJGXnkYGexoA4f4Y+AtQTXbzxp4jj2ajeOzwwHrEp7n3x/KvXKKKACiiigAooooAKKKKACiiigAooooAKKKqajqdlpFk95qFzFb26DLPIwAFAFusLxJ4v0TwpZm51W9SLj5Ywcu3sBXmur/ABb1XxLfPo3gDTpLqX7rXrJlV9x2H1NWNA+D0X2n+3fHOoNqd8PnZJZMxp359QPTpQBl3Xi7xv8AE6ZrLwraPpWkE7ZL2QfMw+v+H510/hr4Y+F/Birf6zPHfajIwDXN62RuPZQf65qhr/xf07TZV0LwZYLqd9/q41t0/dIfbHX8KoaV8LvEPi7UYtZ8eanN8rB4rGJ8BPy6fhzQBv8Ai/4PaRrsn9o6NI2kaoPmWa3OFY+4/wAMVzNj498YfDq4TTvGtg99YA7Uv4hzj6jg/wA/evboYlggjhTOyNQq5OTgDFR3llbahavbXkEc8DjDRyKGU/gaAM/QPE+keJrJbvSr2OdCOQD8y+xFa9eO698HLnSr9ta8CahLp14p3G23nY/sP8DxRofxiutIvl0bx5p76feDgXOzCN7n/HpQB7FRVeyvbXUbWO6s5454JBlZI2yCKsUAFFVr/ULTTLSS7vrmO3t4xlpJGCgfjXkmtfF+/wBcv20bwDpz31yflN2Uyqe47fieKAPS/EPirRvC9k11qt7HCo+6pPzMfQCjwv4msvFmiR6pYBxC7FdrjBBH+RXnHh/4NSX18uteOL+XU78ncIC5KL7H/DpXrVra29lbJb2sMcMKDCpGoUAfQUAePftGvKPCWmqufLa5O/8AIYrsPhEEHwx0by8Y8nJ+vep/iZ4Tbxh4MutPhA+1J+9g/wB4dvxrgPgh4wi0+0k8Hay32S/tpWEKTfKW55XnvntQB7fRSbhjORisFvEQuvEKaTpaJcNF815LnKwr2GR/EfT2NAHnX7Rf/InWH/Xz/QVreEk8fHwho/2OfRBbfY4vKEkEhbbtGM4frisj9otgPCOnqSMm5OB+Ar0TwIwbwFoJBBH2CHp/uCgDz/4lp43HgDVDqk2jtZ7F8wQQuH+8OhLkfpWp8Bf+SYwf9fMn9K0/jC6p8L9YLHAKoP8Ax8Vl/AUg/DKHBBxcyZ/SgDQ1HXfhnDqE8d/Lowu1ciUSRqW3e/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che_337	MCQ	The crystal structure type of FeO is the same as that of NaCl, and the ion radius data is shown in the table: <image_1>the top view of the FeO unit cell may be ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	CD	che	物质结构与性质	['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', 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'che_337_2.jpg', 'che_337_3.jpg', 'che_337_4.jpg', 'che_337_5.jpg']
che_338	OPEN	\text{The unit cell structure of a crystal composed of Cu and Cl is shown in the following figure <image_1>. It is known that the density of the crystal is} 4.14 $g/cm^3$ \text{, then the side length of the unit cell is ( )pm(column calculation formula, let} $N_A$ \text{be the value of Avogadro's constant).}		\sqrt[3]{\frac{(64 + 35.5) \times 4}{4.14 \text{g/cm}^3 \times 10^{-30} \times N_A}}	che	物质结构与性质	['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']	['che_338.jpg']
che_339	OPEN	The unit cell structure of a certain magnetic iron nitride is shown in the figure<image_1>. Let N_A be the value of Avogadro's constant. If the density of the crystal is ρ g·cm^{-3}, then the unit cell parameter x=()(expressed in an algebraic expression containing N_A and ρ)nm.		\sqrt[3]{\frac{728}{9\times N_A \times \rho}} \times 10^7	che	物质结构与性质	['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che_340	OPEN	Theoretical calculations predict that a new substance X formed of mercury (Hg), germanium (Ge), and antimony (Sb) is a potential topological insulator material. <image_1>The crystal of X can be regarded as formed by replacing some Ge atoms with Hg and Sbin the Ge crystal (unit cell shown in Figure a). Figure b shows a unit structure formed by replacing some Ge atoms in the Ge unit cell with Hg and Sb, and Figure c shows the X unit cell. If the molar mass of the simplest form of X is Mg \ $\cdot\text{mol}^{-1}$, then the density of the X crystal is ()$g \cdot \text{cm}^{-3}$(Let $N_A$be the value of Avogadro's constant).		\frac{4M}{N_A x^2 y} \times 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che_341	OPEN	The atomic numbers of elements A, B, C, D, and E in the first four periods of the periodic table increase in turn. For their ground-state atoms, A has the same total number of electrons outside the core as its number of electrons;B has 3 unpaired electrons in the valence electron layer;C has 3 times the number of electrons in the outermost layer as its inner layer;D and C are of the same main family;E has only 1 electron, but the sub-outer layer has 18 electrons. Answer the following questions. In a 1:1 ionic compound formed by these five elements, the anion has a tetrahedral structure and the cation has a long and narrow octahedral structure. As shown in Figure 1 <image_1>, the first component lost when the compound is heated is ()(fill in the chemical formula)		H_2O	che	物质结构与性质	['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che_342	OPEN	The 2021 Nobel Prize in Physiology or Medicine is awarded to two scientists for discovering temperature and tactile receptors, the discovery of which is related to capsaicin. One synthetic route for capsaicin 1 is as shown in the figure <image_1>(some reagents or products have been omitted). Among the isomers of G, there are ( ) species (excluding stereostructure) that meet the following conditions.① It can react with\( \text{FeCl}_3 \) solution;② It can react with saturated sodium bicarbonate solution to release gas.		13	che	有机化学基础	['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che_343	OPEN	The comprehensive utilization of straw (containing polysaccharides) is of great significance. The route for synthesizing polyester polymers from straw as raw material is as shown in the figure<image_1>. J is an isomer of E, and there are ( ) structures of J that meet the following conditions (regardless of stereoisomerism).① contains no\(-CH_3\);② contains no rings other than benzene rings;③ can react with\( \text{NaHCO}_3 \) and 0.1 mol J can consume up to 0.2 mol\( \text{NaHCO}_3 \).		8	che	有机化学基础	['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che_344	OPEN	Compound Q is an intermediate in the synthesis of an antipyretic and antitussive drug. One route to synthesize Q is as follows: <image_1>Among the aromatic isomers of E, there are ( ) ones that simultaneously meet the following conditions.① There are 3 substituents on the benzene ring;②1mol of the organic compound can react with a maximum of 2mol of\( \text{NaHCO}_3 \).		6	che	有机化学基础	['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che_345	OPEN	Propranthaline bromide is a drug used to assist in the treatment of duodenal ulcers. Its synthetic route is shown in the figure: <image_1>X is an isomer of I and has the following structure and properties: ① It contains <image_2>structure;②1mol of X undergoes a silver mirror reaction. 4mol of silver can be formed;③ It contains no rings other than the benzene ring. Eligible X common ( ) species		12	che	有机化学基础	['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'che_345_2.jpg']
che_346	MCQ	A synthetic route for polymer material Q is as follows: <image_1>Known: <image_2>The following statement is correct ()	['A. The type of reaction that forms X is an addition reaction', 'B. Y is CH_3COOCH_3', 'C. Up to 10 atoms in an X molecule are coplanar', 'D. The ratio of the amounts of Z to Y in the reaction that forms Q is 2:1']	AC	che	有机化学基础	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACcA0IDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoorD1zxB/Zt/YaXaQi51S/ZhDEzbVVF5aRzg4UfqSBQBuUVzGr+Irzww1pca0ttJps8ywSXMAZDbu3CllJOVJ4yDxxx6dPQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV57rNvJY/G3QdWuGIsrrTZLCNj91ZgxfBPYsDx67a9CrI8T3uk6b4eur3W4Vl0+AK0qtH5n8QA4+pFAHNfF5Wu/AU+lwRCa91CaO3togeWcsOR9ACT6Cu5iQxwojMWKqAWPf3rFhh0TT/ENtYR23/Ewlt5JoncFysasoYBmJI5YcCt2gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKMjOM0UAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFcfL4lv9Z8W3nh3QGt4RpyKb6+niMoRmGRGihly2OpJwPQ1cRvFFtrMFnNNZXNjLFIReJbMrRyDG0Ou/BGN3IIz6DuAdJRXG+Atf1vxNot7eahLYJLFdzWsYgtnVQUbG45kOc+nH1o+H3iPWPE1rqlxqjWIFpfy2SLbQMmdhA3Es7dc9KAOyornPFvihvD6WFrZ2y3Wq6lOLezgZtq7u7MeyqOTVfUF8Zadpcl5De6df3CAM9stk0Yx38s7ycgZ4IOfagDq6K5GfxJf6r4tufDmhG3haxiWS/vJ4zIIyw+WNEBGWPXJOAB0NNPiPUPD/ijTtE1+a3uINTylnewxGI+aP8Alm67iMnsRj0xQB2FFcZp/iLVPFuqanDoU1vZaZp05tXvZYfOeeYAFgi7gFVcjJOc56CpNO8T3sfiqfwlq7Wy6mbf7TZ3UUREdxH0OULEhh3G7nB6UAdfRXGeBPEGt+JLfWJNRksFNnfzWUX2e2dcmM43nMhzn04+tHgTxFrPiG410am9j5enajJYxi2t3QvtAO4lnb16UAdnRRRQAUUUUAFFFFABRRRQAUVy2s6zq6eIXs9ISKSGy0+W6vFaIyFpG4gRQpBySrn6fUU208SXM+r2Cusohk00zTxLaSZWbK4xxux98dxxQB1dFUdIvZr/AEe2vLm3NtLLGHaI5ynscgH9K5xPEeqS+C9c8QqbfyoxNLpo8s8xIDtZzu+bcQTxjg0AdjRVH+1LODUbbSri9g/tKaEypCPlMgXG5guTgc9Mnv1waoa1qt5HHc2en2l19tWPfDKqxsjHqMgsCVz8p4B64IODQBu0Vy1l4zW40+K8fSb4QMyQmYKm1pWkEe1fmyRuPXpWtpuoT3mpatbyrGI7S4WKMqDkgxqxzz6tQBp0UUUAFFFFABXFfFv/AJJbrn/XOP8A9GpXa1xXxb/5Jbrn/XOP/wBGpQBbvf8AkqWkf9gm6/8ARkNdVXKXn/JUtI/7BV1/6Mhrq6ACiiigAooooAKKKKACiiqGtSX8OjXU2lxpLfRpvhicZEhHOzqMbgCM9s55oAv0VjnxHbQhEubTUo5yis6R6dcShSQDjciFTjOODXI+HfFup3V9YnzL++sp7q4t7kPpUwMBV28tg4QKB0Vg2SMDpzQB6NRXH+LfEFxZWlzbBhpsgIa3vZrhI0Yj5sDdw2cHKjnFJF4zvxZ6Xe3Wgy29tqNzBbQmSZRJmQkbinYcA4znB7EUAdjRWD4Yv7u/bWjdzeYINUmghG0DZGoXC8dep5PrW9QAUUVRn1eyttXtdLll23d0jvEmOoXGefx/Q+lAF6iiigAooooAKKKKACiiigAriPiJr17px0LRdPlaC41u/S1a5X70UeRvK+jEHAPbnviu3rk/HPhe41+DTL7T2RdT0i8S8tlkOFkwfmQntkAc+1ACeJ/D8Fn4Vv7rSC9lqNlbvPbXMbHdvQbsNn7wOMEHOc1x2s69ba1p3w+8RXhS0W9vALsmTYhXy2yG5xt3KDzXba9catrPhy602w0m4gvL6BrcyXJURwBxtLEhiTgEkADnjpXPar4Zu9KXwRpmk6dc3drot0sk8yFANojZScFgcktnFAFfx5q+ianf+FI9N1S0uJn1mGKVLa5DMYSr5BCn7uQv6V6gqqiBVGFAwB6VxHj+y1LUrjw1/Z+mXN0LPVYrydkKAJGqsD1YZPzDiu3U7kDFSuRnB6igBaKKKACiio5/O8h/s+zztp2b87c++KAJKK5PwZ4sn8Q/2pa6nbwWOp6bcGG4tEYtsX+F8nGVbnHHatLw3ql9rNnJfXEUEdrJI32Roy2ZogflkOegYcgc8Ec0AbVFFFABRRRQAUUUUAFRLcwOwVZ42Y9AHBNPf/Vt9DXnfwu8LaCPB+iaz/ZNp/aWxn+1eWN+7cwzn6UAejUUUUAFFFFAHOeIpZI/EHhhEkZVkvZA4BwGHkucH1ro65nxJ/yMXhX/AK/pP/RD101ABRRRQAjMqKWYgAdST0pkc8MrbY5Y3PXCsDTbu0t7+0ltLuFJreVSkkbjKsD1BFcDY6DpOgfGG0i0nT7eyjl0OdnWFNoY+dFyaAPRKKKKACiiigAoqOdHeB1jlMTkfK4AJU+uDxXGfDvWtX8T+Grq/wBRvh5/2qa3j8qFVCBGwDjnJ+vFAHb0V5xoHji6tvBmueJPEF350en3c9skUUSpuCMAv/Aifwrd0mLxRqmjw6ld6nHY3VwglSzjtleOEEZCsT8zH1II9qAOqorjBrHjeLRrF4vDtpf3zeYt2GvPs6oyuVG0FTlSBkH0qH+3/iH/ANCRYf8Ag4X/AOIoA7miuPtPEviS0jurzxL4dtdM022geZ7iLUBM3HOAoUdfrSeG7vxB4q0aLXJL4aXBeDzLS0igSQrEfumRmBySOeMdaAOxorzXxT4h8W+H/BF1qc89tFqNrqAt/kgzFLEzqFYA89GHfrkVq/ELWdX8L+Ap9XsL0Nd2oUsZIVKy5IHI7de1AHa0VXsllWyiE85nl2gtIVC5P0HFWKAPLvC8sfhH4neKdP1eRLddauFvLCeU7UmHOUBPG4FsY68V6Imq2kuomxglE06LulEZ3CIdt57Z7DqakvtOsdTt/s9/Z293DnPlzxB1z64IpkOk6dbWBsINPtYrM9bdIVEZ/wCAgYoA85+Fel2upeHdRn+2XQzqt1xBdMq438HAOKPhXJLH4U8SDT54POj1q62yT7pFUZHzMFILcZOMjPrXocGh6TapKlvpdlCkq7ZFjt0UOPQ4HIqL+wbO2jb+yobfTJ2IzNa20YYgHofl5FAHmuv6ncXD+B/Hl2kb2VjNKl81qCyRrJ8nmY5IAI5ByR0r0uTxBpa2MV3Fewzxz8QCGQOZiegTHU1Pp2mwabYfZI8uhZ3csB8zOxZiccckmorHQNH0y4aew0mxtZnGGkgt0RiPcgUAcRoS/wDCOfFzxFFqLCGPXRFPYSvwsrIu14wf7wznHpR41tv+En8f+FdLsHEj6VeC/vnTkQIuCqsR0ZiMAde9eg3ljaajbNbXtrDcwN1jmjDqfwPFNsdOstMt/IsLO3tYc58uCMIufXAoA8/+GA/4R698QeFtQ/c6guoy3sAfjz4JAMOnrgqQcdKBbt4i+N1tq1gRJp+i2L289wp+Vpm3fuwe5AbJ9MV31/pWnarGseo2Ftdopyq3ESyAH1GRT47CzishZR2kCWgXb5CxgJj029MUAeafDHTbbUoPEsv2u6U/27d8QXLIuN3BwD+tW/hH5SHxhDHL5mzX5+S+5iNq4JPfODz7V3Nvomk2nmfZtLsofMUo/l26LuX0OByPanWmjaXp8plstNs7aQjBeGBUJHpkCgC7RRVDWdYs9B0yTUb9nS1iI8yRULbATjJA7e9AF+iqWl6xput2gutMvoLuA/xwuGA+vofrV2gAorm/Guh6jrOgXC6NqVzYanGm6B4ZSoZh/Cw6YPSue0HXJvHthYWtr9s057Jv+JswkZXjlXgwqc85IySeij1PAB6LRTUQRoqDOFGBk5P506gDzm5j1DSNQ8YXNniTVJ7GCUy5+SI4n59cKAAPU9uaz9IkFheeHbeCzkjit9KllTE8CkMfL3NnPfcSc85Oa7e80O5uLvX5kkiA1CwjtogSflZRKCW46fvB+RqvZ+ETBLYXEl6pntLT7LhbdNpB25PT1QUAWfskuq+GYLWK5l8m7T99MZxI/lNywV14JIO0MOgOR2rjpryCy+Dt3p9jbNM62VwhjhHywrluWPQcY46n0r0aytpbW18mW5NwwJIcoq8E8DCjHHSsiDw4zeCpfD91OA00EsLyxjpvLcjPpmgCXSdJTRzLf6hcpcapeMi3Fzt2gknCog52oCcAZPuSazfEytqOtaVol9Cn9n30kgHln94SiF8kkfKOCPl56cjkU+bQfE18trDfeI7IwwzxTObfTTHJIUYMBkysBkgZ4rYOmNNrqalcOpFvG0dtGv8ADuxuYn1OMewHvwAcatk1ppfmWt3MmlLqlvbRWExEgiaO8RNyPwQpCn5TnHrXT6F/yGvEX/X6n/oiOrOm6bPY6fPb+eglkuZp0cLkLvkZwCD1xnFV/DemapYf2jPq89rNdXd0Zc2qMqBQqovDEnJC5PPegDcorDvvGGhaXraaRqN/HZ3ciB4xcfIsgP8AdY8GttWDKGUggjII70ALRRUVzbpdW0tvLu8uVSjbWKnB9CORQBhat410jS706dG0uoap/wA+Ninmyj/eA4QdOWI61iX+heJPHVtJaa80Wi6FLjfY2xEtzKAQRvkI2oMgHCgntnvXWaNoOleH7T7LpVhDaRE5YRryx9WPUn61o0AcPL8NrSxuE1Hw5qN3peqxoVE7ubhJc4z5iufmzgZIIPA9KlXxjqOhKI/GGlG1VeDqViGltT7n+KMf72R712dIQGUqwBB4IPegCG0vLbULSO6s7iK4t5BlJYnDKw9iKhvtY0zS2RdQ1KztGcEqLidYywHUjJFUrTQdJ8ODUL7S7FLV5kMkscWQjMoPOwcA/QVgfCknUPBsWv3e2XUtVkee5n6s3zEKuf7qqAAOg/GgDtopY54klhkWSNwGV0OQwPcEdafXnPhq9fS/i94h8L24xp0lmmpRx54hkJUOFHYMXzj1HvXo1ABRRRQAVi+Koi3hvUZ0nnikgtZXRopCnOw4zjrW1Ve/s49Q0+5spSwjuImicqcEBhg4/OgDjxfSzabo1vba1cospitbvYUJjJt2ckOVJD/dPXjIqbwNc2VrFq+lxXYm+y3zOshkDmRJvnV8jg5JYfVTVvT/AADoNhHaxtbyXSW0arHHdSmSMMMkybD8u8k8nFTaz4Tt9U1vT9ZhuJLS+s2UMyDKzxBt3luvcZ5B7H8qAKOrWk+oeMNN0zUZYrvT54ri4a02FUVYzGE3DPznL8544GAK5LT9NlutA0DVLSK4VZteh32EBZ4LdYppELopyUGFGedvsK9LttJSLV59Unk867kTyUbbgRRZyEH44JPcjtwKp6R4c/sfwzFo8F/OpjaRxcIArbndnPByMZbp7UAcjNOkOha2r6hPZ+b4laPFum6S4y6fuV5GC/TdnjOaveCZruPxr4r06ZZobWBLOWG2luDN5RdZN3J6Z2jgEitC38CWs3h2bS9Zu5b+We9a+e5T9w4lLZDLtPykYHSr2l+DtH0jWJdVtY5/tk0apJJJO779oIDHJ5bBPJ9TQA7QPF2keJY9QfT5ZCthM0FwZYym1h169uKz49LuNZ0u81hW2ajcyLcWBcYEKx58lT7N8xb/AK6sPStu30Ozgs7y3KvKL1me5d2+aUsMHJHTjAGOgAqBfC2mIion21VUYAF9OAB/33QBf02+j1LToLyNSolXJRuqnup9wcj8KtVV0/TrbS7UW1ojJFuZ8M5Ykk5JyST1rN8TeK9P8JWsF5qqTrZSyeW1zHHvWJj0345APTOP6UAblFZ+ka7pWvWoudKv7e8h7tC4bH1HUfjWhQBU1PVLLRtOlv8AUbhLe0hGZJXzhR+FRaNrmmeIdPF/pN4l3aligkTOMjqOaxviH/yKEv8A18W//o1a6gDAFAC0UUUAFFFFAHN/2hdf8LKbTfOb7GNIWfyu2/zWXd+QAro2YIhZjhVGSa5If8leb/sBL/6PauuoAxdB8XaB4oaddF1OG9NvtMojB+XOcZyB6H8q2q4/SQB8VPEmP+gfZfzlrsKACiiigAooooA8z8e6NbL448N3kLyQSatM2m34jbAuINpfa3/fOM+hx6V6WiLGioihVUYCgYAFU7zR9O1C4guLyyhnmt23QvIuTGfVT2PA6VdHAoAKKKKACis/Udc0zSJraPUb2K1NyxWJpm2qzDtuPGavghgCCCDyCKAFooooAa/+rb6GuS+F3/JNdE/65N/6G1da/wDq2+hrkvhd/wAk10T/AK5N/wChtQB19FFUNbvn0zQdRv4lDyW1tJMqnuVUkD9KAGah4h0bSphDqGrWVpKRuCTzqjY9cE9Per0c8U0CzxSo8LrvWRWBUr1yD6VxPwnhFx4EttXuW8+/1Rnnu535aRtxGD7ADAHasbQ9LtZPiB4p8Hyxu+hx+TfxWquVRGdcumAfuEknb0oA1ta8QwanrOk3WkWl5qdppd08l1cWcW9FHlshCn+MgnkLmuw0rV7DW7MXWnXUdxFkqxU8qw6qw6gj0PNWYIIbaBIIIkiijG1ERQFUegArE1ex0vRvtvigWgS8trZ5JHiYp5wVScOBw3tnOKAN+ivPvA2mJ4s8KW2v+Igb291DdMAzHZAu4hVjGflwB1HPvUvgvV7y38YeI/CF5cyXSaY0c1pNK25/KkUMEY98ZAyeaAO8rjLn/ks+n/8AYBn/APR8VdnXGXP/ACWfT/8AsAz/APo+KgDs6KKKACiiigCOaWOCB5ZZFjjUZZmOAB7mvKPhNZaVfeELyaW/uEdL+5ZxDqUsSqu/glVcAfXFetMoZSrAEHqDTFghQELEig9QFAzQB4Vp+kHxP8G/E+kaVMs94mrXE0cQl3O4VwR3ycjuetepaB420TVNDt7l7+3tpxGontppAkkUgHzKVPOQa6RIYoiTHGiE9dqgVGbG0a4Fw1rAZh0kMY3fn1oA4XxpNo+oR6fcalZeJsOrmIaaJF+XPVwh4zwRnnB7Vyf2fwl/z4eP/wA5/wD4qvbaKAPGo9C0jXNJ1jS9FtvFMV9c2MiRnVGl8knggfMcZJArq/AHirS/+EN02wv7qGw1HTrZLW6tblxG8bIoXoccHGfxruqglsrSaZZpbWGSVfuu8YJH0NAHm/xf1a0u/hnOQ5jWW8gWEyHYZQJFJZR1x159s9MVU+LVhpVv8L764gv7qRpQnkiTU5pVk+YdFZyG/KvV3hikAEkaNjpuUHFI0ELKFaJCo6AqMCgCoI7bWNFESzs1vPEB5lvMVOMdmU5H4Vi/8IBpP/P5rP8A4NZ//iq6hVVFCqoUDsBiloA5b/hANJ/5/NZ/8Gs//wAVR/wgGk/8/ms/+DWf/wCKrqaKAOW/4QDSf+fzWf8Awaz/APxVH/CAaT/z+az/AODWf/4qupooA5b/AIQDSf8An81n/wAGs/8A8VR/wgGk/wDP5rP/AINZ/wD4qupooA5b/hANJ/5/NZ/8Gs//AMVR/wAIBpP/AD+az/4NZ/8A4qupooA5b/hANJ/5/NZ/8Gs//wAVR/wgGk/8/ms/+DWf/wCKrqaKAOW/4QDSf+fzWf8Awaz/APxVH/CAaT/z+az/AODWf/4qupooA5b/AIQDSf8An81n/wAGs/8A8VWR4l+HEd5oFzaaTdagbuceWrXWqTmNAerMNx3YGeMcnFegUUAeZeBvgxpfg67j1BtTvbq/UctHIYY/ptU5I9iTXptFFAGH4i1W6s44bTT7eZ7y6cRrMsJaOAHrIxHoO3c4rjb7R7rwF4u0/VtBtby+s9Q/cavAimR2PUXGf72Sc+ufy9OooAbG4kjV1zhhkZGD+Vc9d+CtMvbuW5kutWV5WLMI9SmRQfYBsAV0dFAHLf8ACAaT/wA/ms/+DWf/AOKo/wCEA0n/AJ/NZ/8ABrP/APFV1NFAHLf8IBpP/P5rP/g1n/8AiqP+EA0n/n81n/waz/8AxVdTRQBy3/CAaT/z+az/AODWf/4qj/hANJ/5/NZ/8Gs//wAVXU0UAct/wgGk/wDP5rP/AINZ/wD4qj/hANJ/5/NZ/wDBrP8A/FV1NFAHkHij4LHxPr9uTqdxbaTbx4zLcSXM0rHrjecIOnPP0r0Hwp4S0/wfpQ0/Tpbt4hz/AKROz4PsDwv4AVvUUAFFFFABRRRQAUUUUAIyq6FWGVYYIPcVyeg6Hqfg+2l0vTILe90nzHltVeYxSQbiWMZ+UhlySQeozjBxXW1y/je9ubK00ZrW4khMus2kTmNiNyNIAyn1BHagCXQPDb2Gsalr2ovFLq2o7VcxjKQxL92NCQCR3JwMnHAwK6OiigAooooA53WPAfhfX9Qa/wBU0eC5umUKZGLAkDp0NUP+FU+B/wDoXbb/AL6f/wCKrsaKAOO/4VT4H/6F22/76f8A+Ko/4VT4H/6F22/76f8A+KrsaKAOO/4VT4H/AOhdtv8Avp//AIqj/hVPgf8A6F22/wC+n/8Aiq7GigDjv+FU+B/+hdtv++n/APiqP+FU+B/+hdtv++n/APiq7GigDjv+FU+B/wDoXbb/AL6f/wCKo/4VT4H/AOhdtv8Avp//AIquxooA47/hVPgf/oXbb/vp/wD4qsLxN8FfD2sW9va6Xa22lR+ZvuLiNWeVlHRVBOBnuT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'che_346_2.jpg']
che_347	MCQ	The mechanism of Bayer's one-dimensional Liger reaction is shown in the figure below<image_1>: where R, R', R''are hydrocarbon groups, the following statement is correct ()	"['A. ① is an addition reaction, ② is an elimination reaction', 'B. If 1 mol d is generated, 1 mol e^-is transferred', ""C. R, R'have different structures, and the product d may also be R'COOR"", ""D. If only the No. 1 oxygen atom in the reactant is ^{18}\\text{O}, the product R'C^{18}\\text{O}^{16}\\text{OH} is formed""]"	C	che	有机化学基础	['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che_348	MCQ	"Silicon is an important material in the electronics industry. The schematic diagram of the industrial production of silicon using quartz sand (the main component is SiO_2) and magnesium powder is as follows<image_1>. Known: electronegativity: Si &lt; H
The following statement is incorrect ()"	['A. Magnesium strips are used for ignition in I, which takes advantage of the large amount of heat released by the combustion of magnesium strips', 'B. The main reactions in II are: MgO +2HCl = 2MgCl_2 + H_2O, Mg_2Si +4HCl = 2MgCl_2 + SiH_4 \\uparrow', 'C. To prevent the spontaneous combustion of SiH_4, II needs to be isolated from air', 'D. Substances containing silicon in the process only reflect oxidation']	D	che	常见无机物及其应用	['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BRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAAOlFA6UUDKup/8gq8/64P/AOgmuL+Dn/JNtP8A96T/ANDau01P/kFXn/XB/wD0E1xfwc/5Jtp/+9J/6G1A+h3M0Ec8ZjlUMjdVPeqf9jaYOPsMBI/2a0KxvEuuweHdGnv5uSoPloOrtjgCglHH+MbO31fWtP8ADGlQJFKzi4vJYxgxxDtkdyf5V2sGg6ZDCkQsomCAKCVya4/wPJdHS31l9LluLzUm82SbeOmflUewrrBqeoY50eb3+cUDJ30LSpUKPp1uwPUFARU8Nhb2tqba2jWCLHCxqAAfaub8O+JdU1XxPq2m3WnJbw2eza4kyeR0IxXWngUCMcaG23nV9R4P95P/AImuQ8P6TNa6v4qupr3UIoY5EdXUqDIArE9V5rf8eXt1YeGzcWU5hnFzCocDsXAP86TVLHUI/D95K+ryEfZXLDyl5+WgZy3iIJ4h8HRXumX2pXUbXkICSBezjJwFHT1rr7jwvFqGnfZbvUtReGRArp5ijI9Mhc1leDdJv18Iads1N41ZN2wRKcZPvSeDRfL4p8Rx3Woz3McEsaqkmMDcCSR6dKAOosNHt7DSl09HneBV2jzHy2PqOa4zxhplvFPpWlaY08V5e3KgsLmQlY1+ZzjdjGBj8a9AJGOT075rzXTb688RfEnUpbKSCJbO3EUEk8JkBUkAkAMOvrQB10nhDQ7gRfabR5miIZC88hIYd/vVkXfiNNUsvEmmW9nIILC3kj+0bsqx2niqlh4g1q2u/E3265guEsSsUCRxFC0jAhQOT3xWlFow0X4f38DndcPaySTyYwXcqSSaAE8K6tbaX4I0J7vdHA9qgMx+6h9/SuuSZJEVkIZW5DA5BrkfDRsP+FcaVHqZiFrJapG/m9DngVY8F6Jf6BZ3NndXQuLUTk2ZzkiPtk96BGX8Y/8AknF//vJ/6EK7PSf+QRZ/9cV/lXGfGP8A5Jvff7yf+hCuz0n/AJBFn/1xX+VIfQuVR1CxtLtAbtSUj+bIdlx+RFXq5vx1qP8AZvhDUZkOJmhKRj1Y8CmItrpWkyRq6LuVuhW4cg/rXM6LptpD8VdXMSEeVZRFPnJwT16nmtnQvDNjZaJY20sbtJFCisxlflgOT1qXTfD9jp3iW81K3nPm3EKRtCW3bQO/JzQMb47/AORE1s/9Or/yq54bUf8ACM6X/wBesf8A6CKp+O/+RE1v/r0f+VXfDf8AyLOl/wDXrH/6CKAJNZlRdMuoywDNA+31OBzXG+D/ABFb2PhXR7KO3kmMdkJJ5EwFhGMjd9auavfy3/im7to0f7PYWEnmuQQN7jgD14xWXo9i6fDrR7Owt1aS4t1luOo3oOSCfegCtosl/a6RrPiCPU7JLm6ZriSOS2LSxr0QE7x2A7d6r32vm+0Dwwuq3KSXr30cspSF1wME9xgnntVrVRpviNdNn0xHgvNQY20sY4CxocNuHfBGM1oeMoHv9V0rTrL5X0+NrtgvRQuAo/IGgC/pd5ZW/iy4a1vLqSC9RWEJhby0cZBO49M8cY7V2KNkcjmqWk38Wp6ZBewH5ZkDDvz3H4Hj8KvL2oEOooooA828Bf8AI7eLv+vhP5GvSa828Bf8jt4u/wCvhP5GvSaACiiigApCcUtIeRQAhbHagPntXM+NtJju/Dl/crLPDcQwM8ckUzKQQM9AcV5/8JfEuoQa3deHtauZZZpF86B5XyT7c+38qBntFM3jOKdkYry74xeIbuw0A2WmyyRz5WWaSNsGNAwA5HqSBQCPUC3HSlU5Ga4X4aafu8J2Oo3M9xcXk8e5pJZmbr2wTj9K7gHbx/KgQ+kzSbgelZHibxBZ+G9En1K8b93EOFzyx7AUAarTIoyzBR6k4pqXMMp/dSo+P7rA15x4V02/8b2x17xDcTi1nJNtYxOURU7EkYJrU1fwDBDZvceHbi402/iBaMpKzI5HQMGJzQM7jNLXB/Dzxs3ia3nsr5BFqlm3lzL/AHsd67ygQUUUUAYHjf8A5EjWP+vV/wCVVvh1/wAk/wBG/wCvcVZ8b/8AIkax/wBer/yqt8Ov+Sf6N/17igDqKQ9KWkIyMUAV7m3ju7eS3mQNG6lWU9CDXL+F9L1TwzpF3bzlryNblmtIlb5ljPQZNbN7dazE04ttOt5IlUlJHuip6emw/wA6xfh9qus6zost1qvkHE8iRGPOSAxGD+VAG1/a1+OP7Gm4H/PQVyHjW/u5tT8Nl9NkQrqGVBcHd8h4rabXbnTPGcei3uZLe/QyWswGChHVD6+ufeqnjoY1Twr3xqP/ALIaBmhHqHiN/ECI2kxx6YY8FzL84b16dK6QH5c4z/jTsZxVGXT2eZpPt10gP8ClcD/x2gRxXhoTR+I/Ezbbza92pBhUYJ289fwrqPMl9NT/ABRKytEvv7UjupbZdQURXLwuyvH8zLjn7vvU39px/wBuDR/N1T7YYDcBdyY2AgdcepFAzF8Vwz3Gs+Gwsd84TUAz+cq7VGxuePwrv/NQSlMrvxnbnnH0rkPEertoFhFeSpqUwaZIgoePILHHHymta38PW0moQ6y8t59rEYUeZLjCnsQOKAIPF+uXmirpLWUccj3V8tuyyHAKlWPXtyBUEFpq9peXmpNplpJdzrgObs/Io5CgbOlU/iLNHCnh2SQkIurxknH+w9bk3iTSTAy/aWyVOP3L+n0oAwtG8Ualc/D+fVb+KJbohkg8ok72J2rx9SKueG7LV9E0WC0j0u1cjLO5vCNzHknGysjwTaTX/hXS5FQNBB5kyRlsCSTJ2g+3Oa6vQtftdbSZIg0dzbtsnt36of8ACgDL8La5rGpa5rNpf20EcNnIEQo5JUnt05+tb9/cahGUWys4rgNncXn8vb/46c1zvg0A6t4lfOQb3GfoDxWlrHiqx0a7S0miuprh1yqQxbjQI5m6uNVPxNsGbT7cTfYJAEF0cEZ67tn9K6PTh4kOtTzX62a6c4+SKNyzofrgZrCZ9b1Dxhaa1aaLIsEVq8BW5lEZOTkHgGuqtBrEkwe7NrHERzCgZjn/AHsj+VAziPC91q+n2Oq3VlbRXsC6jcF7bJSQDeckNyPwxXXeHPFen+JbeRrXfHNCdssEow8Z9xWV8PWzYar1/wCQlOfqN5rctdAsLPW7nVLaIR3FwoWUr0OO+PWgDO1nXYLbVpNHNg8sslqZhJGAeOnINcX4fvfIk8Myf2dO4TT3yAi5fg9Oa2vENwLXx7JcMdoTR5D+pqpa7dIHhgXjCELpZRi/ADbOQT60gLz+I9U1zw7BfaLpQW3mZlnWWURsFHdWAP8AKtPS5tR/s2NYLDTYLILjcLkyAj3+UZNc14Yjn1XwBY6XbyGC1cSNc3I/hj3nKj3PrW74R1KzvNFmgFtb2mlwO0NsTLkyxqcbiD64pgGg6ZrOkeKZ181JtGuk81QoOIX/ALq8ng9a7XNcX4YgurbXbl7LUFvdAnXfAS+4wP3QH0+tdnQIWvN/En/JZvDv/Xm3/oZr0ivN/En/ACWbw7/15t/6GaBo9IoFFAoEFFFFABRRRQAUUUUAFFFFABQTijvSN0oA5XxV46s/Clza29xZ3NzLcg7FgGTxWJ/wtu3zj/hHNZ/781H4yXPxM8JDjl5M+/ymvRgi5+6uPpQM89/4W1b/APQuaz/35o/4W1b/APQuaz/35r0TYv8AdH5UbF/uj8qAPO/+FtW//Quaz/35o/4W1b/9C5rP/fmvRNi/3R+VGxf7o/KgDzv/AIW1b/8AQuaz/wB+aP8AhbVv/wBC5rP/AH5r0TYv90flRsX+6PyoA87/AOFtW/8A0Lms/wDfmj/hbVv/ANC5rP8A35r0TYv90flRsX+6PyoA87/4W1b/APQuaz/35o/4W1b/APQuaz/35r0TYv8AdH5UbF/uj8qAPO/+FtW//Quaz/35o/4W1b/9C5rP/fmvRNi/3R+VGxf7o/KgDzv/AIW1b/8AQuaz/wB+aP8AhbVv/wBC5rP/AH5r0TYv90flRsX+6PyoA87/AOFtW/8A0Lms/wDfmj/hbVv/ANC5rP8A35r0TYv90flSFFx90flQB5y/xhsIdpn0LVYUZwm+SMAZNeiQTi4t45lBCuoYfiM1wfxcQL4NUhVH+lRdveu207P9mWnH/LFP5CgGW6KKKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAA6UUDpRQMq6n/yCrz/rg/8A6Ca4v4Of8k20/wD3pP8A0Nq7TU/+QVef9cH/APQTXF/Bz/km2n/70n/obUD6HbXNxFbQPLK21EGSa5KfTZ9Yjvda1NcRR20gs7Y9EG3l29WPb0FddNBHMu2RAy7t2D0zVXVhjRb0Dj/R5P8A0E0EmV4AB/4QbSs/88f6mukI6f41xXgi41mLwbpqR6Vbugi4ZrsoTye2w4rfa813j/iT2n/gcf8A43QBh+GcHx54qI/vw5/75NddctMlu7QRLJIB8qM20H8cHFcZ4RNy3jbxQ9zbCGRnh4Vt6/dP8WB/Ku4b7poA43xHp+u6/pH2Iafa2582OXebwtjawOPuD0qt4u1bWLTwzPC+nWyPcqLaIpebmZm44XZ+PWui1PXrPTh5fzXFy3CwQjczf0FZenaJeapq8eta6Arxf8elkpysP+0fVsUAJouoatDbLpi6TbCW0iVSr3pBYEdcbPXNVbPSfEtjfa3d29tYiXUirITckiEqCM/d+br7Vs63pV1cSR3+lyiHUIAQu4ZWRe6H9PpWTb/ELTrWYWWuQT6XdjgrKhZGP+yw60Aadrba7L4ea11B7f7e37tpIScbTwT9cZrI0K1isPiPqVtCoWOPT4wB/wACFdha3cN7brPbPvjPRsEfoa5T/hH3vPHuoXt5BILRrVI4nEjJlgf9kjtQBU8P2C3vjLxI8pJjhvInEZ6EhWwT9OtdfrFob/SLy0WURGaFow5GdpIxk1g6dp1h4Pv9XvZ75RFeurpCcsy4B45JLHmo7n+2PFhEMaSaZpBP7x2/1s6+gH8IPrzQBiaXo/8Ab02n6MJDPoejKFllxtFzKOmB6CvSUjESKiKAijAA7Cq1jYwafaxWtrCI4Y+FVelXu1AHAfGP/km9/wD7yf8AoQrs9J/5BFn/ANcV/lXGfGP/AJJxf/7yf+hCuz0n/kEWf/XFf5UkN7FysTxB4b0/xHBFDqCSskbhgEkK5x24rbprHHamIx/+Ea0ztDMP+3mX/wCKrl9I0qFfijqBgaZIbWzjwvnM4Jb13E5ro9U8VaRowP8AaN0bUjoZUOD7DHFY/gVzqmoaz4g2OsN7Pst9wxmNBtB/HFAzU8dj/ihNb/69X/lV3w3z4Z0v/r1j/wDQRVPx2QPAmtf9ej/yq34ZYf8ACMaXj/n0j/8AQRQBB4nnjsvDepTsoBELD3JxgVkeE9Xt7XRINKvI/IvLG0jJjJzvQqCCP8KseJIpNbvbXRYv9UZBNdsP4UB4X8aTxFa6VpeoQeJLuYQ/ZYGiCD/lp6DFAiGztTYTz6zLZ5vLolbW0jH+rX6+pOST747VpaFo8lp9ov8AUGWW/vDmYjoi9FQewH61i3GqanZ+DLLWwjm4EhmeFxktG7khfwBGPpVzU7++svEGky28UstnqamOaM/8sjgEN7cHH4UAVdJ03W/D/ia5trWBLnQLpvOTL4Nux+8B6jPP41268Vx2mapfaZ40m8PXYaa1li+0Ws+OVXoVb6GuxU8/55oAfmikyKKAPN/AX/I7eLv+vhP5GvSa828Bf8jt4u/6+E/ka9JoAKKKKACg0UUAY/in/kVdV5/5dZP/AEE15F4502bR7Dw54y09WEtsqLNt6ke/8vxr1zxUceFNV/69ZP8A0E1nxaTBr3gKHTpwCs9oFB9GxwR+NAzV0zWLbUdDg1RJV8h4vMZs8DAya8s8bRPe/DPxDr9whWS+mhEQPVYhMuB+NZPgy/1LyLr4fSLIJTc7TL2jhHLj8QMfjXdfFuGO1+E+oQRqAkfkAAeglSkHU1fhvk/D/Sf+uIrHi1u58TfEe80QTvFp2noS8cbbTK/Tk9cfStj4bH/i3+kjOcwjFc1c6e2jfFN9T0eaG4aaIm9tHcIUB7hvXPbFMCDxjqGr+EPEem2ulakYbDUXEeJ1M3ktnGRk5I/Gsf4zy6jaeG9Isb28S5keUtJKkWxWIHGRk12GpaFL4t8T6ZfX5itrHT28xIPNDPI/b6D86rfGLw5NrnhIT2qFprJvMCDqy45oA7PwxEkHhrTIoxhFtkAH4VrnpXJfDnXIta8G6fIrgzwxLFMvcMBg5rqLm5itbd55nVI0UszE8AUAeGaC7WH7QeoQQ8R3E0u9R05ya95rxb4dadLr/wARNY8WuhFp5r/Z2I4OScfpXtNABRRRQIwPG/8AyJGsf9er/wAqrfDr/kn+jf8AXuKs+N/+RI1j/r1f+VVvh1/yT/Rv+vcUAdRQelFI33TQBDcsPs03P8Dfyrk/hmw/4RIDPS6nH/kQ0/XNZvLjXIPDumwyxySrvnuivyRp6D1Jpi6ddeEJWk0i0e60yTmW1VsvG/d1J6g9xxzQB0t1b2jSx3c8SNJb5KSMM7M9cVxfjHU7G91nwvDbXUcsq6gSUU/MBsPUVoP8QtHjGya01GNh95TbHj/Gudm8TeCY9eXWzpd59tVcLILUj8cetAz1IEcU1jkda5HRfHMXiK7MOnaVemNMB5Zl8tVH9fpW9dahawu1s9wY5ivUIxxn8CKBHH+Cx/oWp5mvYs6lMQsIXB+76iqowfi4n+kXv/IKk+bC7v8AWJ7dK6qCW2t49keouoJy2ICMn16Vze2X/haCX/2mYWw0x4jcCI/e3odvT2z+FAB49Vn0ixMct9KRqEDYkUYwHGTwK9CjYGJSOeBj8qwLxrW9tHt5dVn2uMZEPI+ny9ai0bUYLe8TRIze3CpHlbuZPlb/AGc8c0AVPiAPm8N5x/yF4/8A0B6624z9lk6fcP8AKuS8fWc16ugxQLLuXVI2ZohkoNj881ry6JM0DhdY1I5U/KzR4P8A45QBmfDnefBlngDG5+vpmtqz0G0stZvdUiUie8AEgzxx3qn4K0u70bwzBY3wAnRmzg5zzTtd8UWvh62e5v7a6WBf40QMD7daAM3wI5k/t2QYw2pSAfga6wxp5gkKDeOAxHP51ynw7gmj8OPczxNFLeXL3ARxyAxyK3Z9ZWGZ4vsF7IV6skYI/nQByfg19Y1Dwgl9Jqzlxv4KAjg8DNS6Xe61feDf7afU8S+Q0oQRDHAqPwi95pHhEWF1pN+Lgb/lEa4Oenek0mS7tPAP9lS6Vfi6Fu8YAjXGSMDvQMZapqlx8PpNVi1IWzzWjTlIYVADEZrofBLXcvg/S7i9u2uppoEkMjDB5Gaw7KS7h+HiaO+lX4uxYmIjy1xu249al8P6rqWnaboWkPoF8VS2SO4nIVREwGPXmgRT8QwfaPiXawm3kuIzp53RowGQGPB9q6HUpnu7KRbjw80qhSQHKnHH04rIv4r+X4oQfYXiiddOIaSWIuv3j6EfzrbuLbxEYJF/tDTmypGBZuCePXzKAOV8KRT3vw503SrfMRuS6yuo/wBWm45x70t/PZ6VodxocVrE2qI5tbaPaMsp+62PTBGTVrwxeS+HvClpp00BudTG4Lbwe7E8nsKZdeEtaurs+JDdxDXI+YYNmYlT/nmT1J9/0oA6bwtoFv4c0S10+BRlEHmN/ff+JvxNbtcf4b8X3er3j2F9od3Z3cDbZmA3RZ9QeOPzrsKACvN/En/JZvDv/Xm3/oZr0ivN/En/ACWbw7/15t/6GaBo9IoFFAoEFFFFABRRRQAUUUUAFFFITg0ALSHpRnNFAHm/jL/kp3hL/fk/9BNejjpXnPjH/kp3hL/ff/0GvRx0oGxaTNLSdqBBuHrRuFct4us9ZWyfUNBunW9hG77MVDJOB/D7H3BqXVvEa6P4aa9u/LhvRDxAGyfNI4UevNAG/LcwwFRLKibjgbjjJqQOpGQe2a5LVpJNd0mWxn0mUPLESpEgypI4Yd6doE2raZotvZXlncXU8SBXlLqCaAOrDg96XcPWuX8N+JbrXry+im0uW3gglaNJy3yuAf51e1zS7i8s2ewu5La+QExSA5BPoR0IoA2d49aZJcRRAGSRVBOMk4rntL1fVRotk+oaazalIv72KNhkY4z+NSzX8t8jwSaPK6/dZS68f4GgZvhgwBUgg9CKXdXE+F7i/wBOtrqzaCa8Edw/lgSKTEhY4U/QcVqaVf67c6pcx6hpSW1kD+4kEmWxj+IUCOizS0i9KWgBKKU0dqAOA+Lv/Imr/wBfUf8AOu107/kGWn/XFP5CuK+L3/ImL/19R/zrtdN/5Blp/wBcU/kKBstUUUUCCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAB0ooHSigZV1P/AJBV5/1wf/0E1xfwc/5Jtp/+9J/6G1dpqf8AyCrz/rg//oJri/g5/wAk20//AHpP/Q2oH0O9qORQ4ZWAZSCCD6VJRigkZDGsMQjRQqLwFUYApzAHqKU1i674ittDeyjmSR5LubykSPk9OtAGrFEiSMyoqs/LEDk/WnTxiaFo2zhhg7Tg00NlQecHnnrWZY+ILS+1OfTtzRXcIy0Mg5K9mHtQBatNOtLEk29uiMTy/Vj9Seav1hv4htV8SJooEr3Bj8xmVcog7ZPvzW1mgB1U7vTbK+dGurWGZozlDIgOD61V17XIPD2ky6lcq7wxMisEHPzMFH86u2tyt3bRTxhgkihhuGD+NAFhVCqAAAB2AqK5j82Ip5jx5GNydf5UGRdwUsNx6AGq2lajHqloLmJJEQsVw454oGRW2iafbSCVbfzJf+ekpLt+vStIDGKdRQIKO1FHagDgPjH/AMk4v/8AeT/0IV2ek/8AIIs/+uK/yri/jEf+Lc35yPvp/wChCsux8J/ECSwgeLxz5cbRgqn2NDtGOmaRR6pRXmX/AAiHxE/6H3/ySSj/AIRD4if9D7/5JJRcVjvtT0qx1WBYb62juIwwYLIMjIqzbwRQRLHCipGowqqMAD6V5x/wiHxD/wCh9/8AJJKB4P8AiJn/AJH3/wAkkouFj0S+sre/sZbS6jEkEilXQ9xS21rDa28cECBIo1CIo7KOlednwl8QlUlvHwAHUmyQVD/wjfjsD/kosXt/okf+NMD0mG1hgkkkjTDOcsx71He6bZalGiXttHOiNuUOMgGvPU8K+P3BKfEBWXuVs46d/wAIh8RDz/wnvX/pySlcLHozRRtGEZVMeMBccU/apwQBntXm3/CIfEP/AKH3/wAkko/4Q/4if9D7/wCSSUXCx6I0EXnCcxqZAu0Pj5sV5p8SdR1/wjeReIdIuDJYyEJc28g3KGHQjuM/0qf/AIRD4h9/HvH/AF5JXNeO9G8V6R4YuJda8aLd28mE+zmzRfMPoD2ouNGv4c+OGkX4SHV7drGboZFO9Cf0Ir03T9VsdThEtldxToRnMbZ/Svi6GGS4kVIY3kY9AoyT+Fek+CvAHjeSdLq0uJtJiJz5kh6j/d70XHY9N8Bf8jt4u/6+E/ka9Jry34Yw3Ft4l8TxXdx9ouElQSSldu84POO1epUyWFFFFAgpDS0UAYfiDRJtdspbIajLawSqUkEajJB9zRoGjT6HZx2bX0t1BEm1BIo3D8RW5RQBh2vhvT7TxHda5FFi7uYxG57cd6z/ABV4SbxbZSWNzqk8Nm7AtFEq84ORyR64rrMCkwPSgDmfDPhp/C1glkmpTT2kQOxZVHy/iK4iTwXpXj/XtQ1i01C6tIhJ5RMEnMjL1J9B7V62yhgVIyCMEV53cfDG6sr6a88MeIbjSGmYu8ZQSx5/3SRQMy7j4PQWUD3EPifU4JIxuWWSTKqR3xXoHheS6ufDFg+okPcPCvmEj73FYum+ENTLofEPiO51VFOfK8pYkP1C8muxjVUAVFAUDAA6YoA4ybwIbHUpr/w3qMmlSzZMkezzIWPrtyMfgaZP4N1fWVEOv+InuLXvBaQCFXHvksf1rusD0owPSgClp+n2umWcdpaQpDBGMJGo6CrtFFAgoopKAMHxv/yJGsf9er/yqt8Ov+Sf6N/17irHjYn/AIQvVwP+fV/5V5x4R8NeOLzwpp0+n+Mvslo8IMUP2RW2D0yaB2PZ6Q9K8z/4RD4if9D7/wCSSUf8Ih8RP+h9/wDJJKVwselbFLb8Dd64p1eZ/wDCIfET/off/JJKP+EQ+In/AEPv/kklFwselMit1UH6iozawN96GM/8AFec/wDCH/ET/off/JJKP+EP+In/AEPv/kklFwPSI4Y4eI0Rc/3QBUgA7V5n/wAIh8RP+h9/8kko/wCEQ+In/Q+/+SSUXCx6bRXmX/CIfET/AKH3/wAkko/4RD4if9D7/wCSSUXCx6bSV5n/AMIh8RP+h9/8kkpf+EP+In/Q/f8AkklFwsel4B5pa8z/AOEQ+Inbx6P/AABSl/4RD4if9D7/AOSKUwsel1Bc28NzEY541kjPVXXINedf8Il8RAcf8J9g/wDXilJ/wiPxEPXx7/5IpSuFj0mNQo2qAABgY6U+vM/+EQ+IY/5n3/ySSj/hEPiJ/wBD7/5JJRcLHplFeaf8Ih8RP+h9/wDJJKP+EQ+In/Q+/wDkklFwPTKSvM/+EQ+In/Q+/wDkklH/AAiHxE/6H3/ySSi4WPSDFGZfN2r5mNu7HOKJEWVCrZwwxjNeb/8ACIfET/off/JJKP8AhD/iH/0Pv/kklFwseh2tja2mRBCqZ6kDk/U96s15n/wiHxE/6H3/AMkko/4RD4if9D7/AOSSUXCx6WEUNuAwTTq8y/4RD4iZ/wCR9/8AJJKd/wAIh8RP+h+/8kkphY9LrzfxJ/yWbw7/ANebf+hmmf8ACIfET/ofv/JJK4/V9A8XRfELSLO48UiXUZIGaG8+yqPLXceNvQ0DSPe6BXmf/CIfEQ8jx7j/ALcko/4RD4if9D7/AOSSUrisemUV5n/wiHxE/wCh9/8AJJKT/hEPiJ/0Pv8A5JJRcLHptFeZf8Ih8RP+h9/8kko/4RD4if8AQ+/+SSUXCx6bRXmX/CIfET/off8AySSl/wCEQ+In/Q+/+SSUXCx6ZXL+ObXU59Ckm0a6e31C2/fR7RkOB1Uj6Vzf/CH/ABE/6H3/AMkkqOfwr4/t4JJZvHyrGilnZrFMYAouFjm/D3x0mgZbTxDp+WU7WngOCPqp/wAa9U0TxhofiCJXsNQidj1RjtYfga+SdVZptUuCZ/tLGQ5kCBd/vgVu+GvBvifWblJdLtJ4gCMTklAPxouNo9v8X8/E3wkf9qT+VekjpXiEOi65onjjwnBrmrf2hLvfYNuPL+X1717eOlMTFpD0xS0lAjldSm1jSvE9ibVWu9NvZPLmjI5gOPvA+ntVBrbSdQA129szdz/aC1pGMknBwuB0/E1u+KdYXR/D17eIy+aqERjPVzwo/PFUonXRNFsrC2t/td+kQVIweSe5Y9hQBz2q3b+G7j+17wSX/iC7/d21hE5VEU/w4/rW2xudd0z+0NNlaw1SMfPCx3gN/cYfpkVieEL7Rrkf8JBqV6bjVJ85doXxCP7qgAipPEer2+nXMesaNfBLxnWOW2aNhHcZOMZwMH3oGbvgvV31jRmE1j9iuLaRoJogPl3g8ke1M1G81jRfEFnsze6ZdyiN1ZfngJ7gjt9R+NHhnxT/AG2zxPo91Yzqf3qvGNu7vz3q94k1+00TRrq5kmjMyIQiA8s3YYoArx6tBB/a+tXLBYLYmJST2Uc4/wCBZrG8Nr9i0W+8W38zSTXwN0F8w7I0I+VAOmQMDNV7zSJ5vCH9nz5+z2tqZbs4wJpsZI+meams7Btb8F6FpEYK239nwzTleM/ICF/GgCHwsNS0rQ7zUP7Ptpbq5d7m4la8KkM3zAFdnGAQOtdF4L1XU9b8OwX2pwRRSy5ZdhyCueDXJ6i00ulG8tbgLNqNulhJa4/5bj5Wb8Olej6XZx6fpdrZxDCQRLEOOyjH9KBFlOlOoooADR2oNHagDgPi9/yJi/8AX1H/ADrtdN/5Blp/1xT+Qrivi9/yJi/9fUf867XTf+QZaf8AXFP5CgbLVFFFAgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAAdKKO1FAyrqf/IKvP+uD/wDoJri/g5/yTbT/APek/wDQ2rtNT/5BV5/1wf8A9BNcX8HP+Sbaf/vSf+htQPod7S0lKKCRj5z7Vw7Wt3r/AI4l1G3liFrpi+RF5qFgZG5ZhgjoNo/Ouw1BphbSC3XMpUheehPeuG12zvvDsGkrp+rXUK3N4kU6KEwSwYswypOSQO9AHQxWWupqFxK2sW7xvGFWA2/CHPDfezzz+VYniaK90CI+Jv8AQpr6CMW4byWUkM6jH3/xrQOmaTZ6jcTXes3ks8yLHLHJKOmSRwgBB61geObbRG8KXC2TTPOZItq+bM2fnGeCfQUDNu30zUbPT5pv7UtIJ7wAvcNAdwLDjBLY4z0rf0q3vLfTkgv7xbyYDBmSPZuH0zXMT2PhObSFF4k06pErtEZp8kgdhu65re0m8h1bQEfS2e3Xbsj81CShHqDyfzoEcN4p1S7Gka5oV6HkNvLbTQz4+8jTJwfcV0/lX2peJLI293JBY2MAMoTH712GApz2Az+lct8TZ7vTNFt4Zr5JZby6ijbEIUhVYNnOegIH51tXOl30cEGrWmtyl1TYkESL5cjMAPm7nHX8KBj9JhbXfHd7qru/2PT1FvAqsQrP/EeOtami3IsNYv8AR5W2NuNxBn+JD1x9Dj86l0ZtM0fTYLRL233fecmQZZjyawfG02mXr2ENrqqWmtF82M6cgMOSrex6UAd6pJPNOrD8Mza3Jp6jXILeO5A6wsTn6g1uUCCjtRR2oA4D4xAL8Ob7H99P/QhXZaSB/ZFn/wBcV/lXG/GP/knF/wD7yf8AoQrstJ/5BFn/ANcV/lSQ2XcD0owPSjFGKYgwPSjFGKSgBssSTxNHIoZGGCD3FeX+JNJso/ij4etI4ilvNEzSRrIwViCfevUq878T/wDJXPDH/XB/5mkM7y1sbayjKW8QjU8kAmrGBS4oxTEGB6UYFGKMUAMfAxXBeLvAVz401uFtQvzDpdsP3dvEPmdu5J/Su/Kg9aQKAc0Ac7oXgjw/4dUCw02JX6mV/mcn8en4V0W1fSlwM5pcUDuebeAv+R28Xf8AXwn8jXpNebeAv+R28Xf9fCfyNek0AwprHsOuKdUcsayoyODtYYODjj6igQoY4yTk4pVJNeEfEhtY8MeKorjR769+xxRrPLCZmZQN2D17c17JoOqw61otpqMDZWaNT16HuKANQ9KYSc9eajubqO2tZZ52CRxoXYnsBXhmharqvij4sG1vbq7hsGLyC3SUqNoU4HHrQB7xuNPqCCFLeFYo8hU4wzE/qeakDk9sD3oAfijFNLHtSg5FABgelIflxinVyXxG8Sy+FvCVxfWwH2kkRxE9FY8ZoA6ZriNXCmVAc9CwBp3mc4yPbmuL0fwTpt3pVvc6lcXN9fTIHe5Ny68kfwhSABUWj6Xq+j+OVtp9TnvNLNuzW6zEEofQnHNAHaz3cFrt8+dI9zYXewGfpVgHI61zXinwlZ+KVshdTzw/ZZRIhibGfrXRxqEQKCcD1oAfSUtFAHP+Nv8AkSdY/wCvV/5VW+HX/IgaN/17rVrxvx4J1j/r1f8AlVb4dD/i3+jf9e4oGdRgelGB6UYoxQIMD0owPSjFGKADAowKMUYoAMCjA9KMUYoAMD0owPSjFGKADFNIB607FJigDzXXbAJ8StCsI7m8jtbtJWmiW5fDEKSO/FSfETS4tG8Hz32n3F5bzxyRAOt054Z1U9SfWrGvj/i7fhcf9M7j/wBANT/Fcf8AFA3ff99B/wCjUpAdLo1hDZWMflGVi6KWaSVnJOPc1pACoLP/AI8oP+ua/wAqnpjFwPSjA9KMUYoEGBRgUYoxQAYHpRgelGKMUAGB6UYHpRijFABgelGB6UYoxQAYFFGKMUAFebeJB/xebw5/15t/6Ea9JxXm3iT/AJLN4c/682/9DNA0ekDgUYoxRQIXAowPSjFGKADA9KMD0oxRigAwPSjAoxRigBK5zxlo+o6/pDaXY3aWiTkCeUjLBO4ArpMUhUE570DucH4c+FHhnQdsj23225XnzZ+R+A6V3EcSQxhI0VEHRVGAKeFAPFKelAXPN/GPHxO8JD/bk/8AQa9IHSvN/GP/ACU/wl/vyf8AoJr0gdKAYtIRxS0UCPO/iZpVjDpNvqjKyywX0DE+Y21gZFByM46V29raW8CeZCnzOuS3Un8azvFfhuDxTo0mmXMrxRvIj7kPPykH+la6J5caxpxtXaKAOP8AhjcQp4Gsg8qKQW4LAEc0fEa4hfQbQRyxs39oW5wGBP8ArBV/w14NstG0SGyuFS5lTO6TBGSfbNSa34P0/VLSKGNBbsk6Sh06/KwP9KBm8iKMcfjXF/Eqz04aHFdTwR+at3CFfHP3hXbLxgD9axfE/hq38T6fHZ3EskapKsmUPJwc0ATeIQv/AAjOobeB9nfH5VR8KzR2/gbRppWWJRp8Bdm4/gFbF/Y/bdKmsg+wSRmPcPcYrH0/wx5dnaWd9cme0s4liihHCsFGAW9Tx9PagDi4ZRp3jBteu7aZNCnkLQMxysch4MhHYN1r1K2uIriBZIZlkRhlWU5BpLmwtru1e2nhSSB12tGV+Uisjw/4Q07w4HWxNxtZiwWSZmCewHTFAjfU5FLSKu0dc0tAAaO1Bo7UAcB8Xv8AkTF/6+o/512um/8AIMtP+uKfyFcV8Xv+RMX/AK+o/wCddrpv/IMtP+uKfyFA2WqKKKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUdqKKAAdKKKKBlXU/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che_349	OPEN	"Semiconductor ""silicon"" has become synonymous with high technology in the information age. High-purity silicon is the basic material in modern information, semiconductor and photovoltaic power generation industries. The main process flow for preparing high-purity silicon is shown in the figure:<image_1>
It is known that SiHCl_3 is easily hydrolyzed and hydrogen gas is generated during the reaction.
In silicates, SiO_4^{4-} tetrahedron [as shown in (a) below<image_2>] can form four major structural types: island, chain, layered, and skeleton network by sharing oxygen ions at the apex angle. Figure (b) <image_3>shows a chain structure of polysilicate with chemical formula ()."		(Si_4O_{11})_n^{6n-} \text{or} Si_4O_{11}^{6-}	che	常见无机物及其应用	['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']	['che_349_1.jpg', 'che_349_2.jpg', 'che_349_3.jpg']
che_350	MCQ	Add a few drops of phenolphthalein solution to a certain volume of Ba(OH)_2 solution, and then add a certain concentration of H_2SO_4 solution drop by drop to the mixed solution. The curve of the conductivity of the mixed solution measured with time during the addition process is shown in the following figure<image_1>. The following statement is incorrect ()	['A. Reaction occurs in the ab section: Ba^{2+} + 2OH^- + 2H^+ + SO_4^{2-} = 2H_2O + BaSO_4 \\downstream', 'B. At time t, Ba(OH)_2 reacted completely with H_2SO_4, and the red color faded completely when the solution continued to add H_2SO_4', 'C. The continuous increase of conductivity of bc solution is mainly related to ions ionized by excessive Ba(OH)_2', 'D. The conductivity of the solution at b is not 0, indicating that there are a very small amount of freely moving ions in the solution']	C	che	认识化学科学	['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che_351	MCQ	At 25℃ and 70℃, chlorine gas is absorbed with NaOH solution with the same concentration, and the conversion relationship is shown in the figure: <image_1>It is known that the amounts of substances forming NaCl and X in Reaction 1 are equal; when the same amount of NaOH is consumed, the mass ratio of NaCl formed in Reaction 1 and Reaction 2 is 3:5. The following statement is incorrect ()	['A. In the above two reactions, the ratio of NaOH to Cl_2 in the reaction was 2:1', 'B. When an equal amount of NaOH was consumed, the ratio of the amounts of X and Y formed in Reaction 1 and Reaction 2 was 3:1', 'C. Heating the bleach solution will reduce the amount of active ingredients', 'D. If both X and Y are 1mol at a certain temperature, 4mol of NaCl is also formed']	D	che	认识化学科学	['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che_352	MCQ	The principles of the four coal-fired flue gas desulfurization methods are as shown in the figure<image_1>. The following statements are incorrect ()	['A. In method 1, the valence of sulfur in the solution before and after SO_2 absorption did not change', 'B. If the flue gas still contains NO_2, simultaneous desulfurization and denitrification can be achieved by using Method 2', 'C. The substance that can be recycled in Method 3 is NaOH', 'D. In Method 4, SO_2 reacts with CO, and the ratio of oxidant to reductant is 2:1']	D	che	认识化学科学	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADqAyoDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKD0rzHU/GWreDvHskGsXMl54ZlWJDdPGitZSPnbuKKMqdp5I4/DkA9Oorm9RnvT4s0WG11SWOyuo5nkiRI2V9gUrglScHd61bfxZoUd+LJ9SiExn+zZOdnm/889+Nu7/AGc5oA2aKK838O+IL/xdJrUcXiNtP1e0upoo9OWKIrEinCF1ZSz5xyQw9BigD0iiuA1bxVrGk6N4X0dUR/FGsrHEzSp8kTBQZZGUY6c8f4Vd8SjXvDegz61ZaxPfvZL509rdxxBJox98AogKtjJByRxyDQB2VJkZxnn0qlouqwa5ollqtrnyLuFZUB6gEZwfcdK5zW7uC48RRIba4g1PTXje2lLbYp45cockdVGGJU4PyA0AdZJcQxSxRSSokkpIjVmALkDJA9eKlryKCaSW60/TtevJ5bh5RLp0zSsoeZckzMuP3cRZlRM8k9iCMdf4W/tKOz1bUr2PU3uvOaMWE8isFEY48pjgHdnO44Bz2xQB12c9Khgu7e68wW88cpicxyBGB2MOoPofavOpNc0/TdBvb/Q9TuhbzbrqOBiAUmkYRpCA4OxTIsmR2IPas+K5uNH1LxFPeT3k0cNlF/ak9iqI01yI/mKkn5QFKgYGST1GKAPW6Kq6bCLfTLWFWnZUiUA3DbpMY/iPc1aoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoorB8ZNqEHhbUb3TNRksrq1t5J0ZY0cMVXOGDA8cY4x1oA3qK4vwN4un8SWNzpWqqbDxHp/7q9hG3Oe0iA5BU9e4/DGbmg6u1n4ZGo67qxlLXEkQklRF6SsiqoRRkkAcckmgDqKK5y/8b6LZ+G9U1uO5WeHTgRNGoKurjohU8qSSByO9UtCg8Q674dt9Vvdbnsbu8jE8dvbQxGOBWGVU71LMcEZ5HtigDsKK82h8aalqXgfxOTOLPX/DwmSdoEUo7IpKsFYHCtjp7Hmt7RbnU734bWmpT6pMb+405Ls3AjjBVmjDYC7duM+o/GgDqyQBknAoyMZ7V594W8S3lx8LbPxBrn2jVPtSn7WscSfJGWKkhVAyAMEjk4z9KzrkX+lC3h0y/lGmWKSxqJZ2BjjEnzyzSY+6oR1QdTx1waAPToJ4bqBJreVJYnGVdGDAj2IqTPOK8t0qL7WNFi0N9WttFvrt5WmilPmQuN0jJKhHyBnGc5IIOMDINdJ4jvbAa3bx3DXVrqFjG15ayIcLdKBho8jqMlcqefukUAdRNd29vJDHNPHG8zbIg7Ab2xnA9TjtU1eReI76+1BNSRNQa8hsLu3tLQOibmvwwdn4xhEB5B67Tzjr2fhu5jvPEGp7m1X7XaxRRT/amUREsCw2qpIBAPPfDDrQB1VFMldo4ndY2kZVJCLjLH0GSBn6mud0Dxtpuv6xqGjrDc2WqWBHnWl2FV8cfMu1mBHI5B7j1oA6WisQ+IseJxoX9lX/AJpi88T5i8ry923dnfu69sZ9q26ACikZgilmICgZJPauPk+IMI0ybWItE1SfRY1ZhfxKhV1XqwTdv28ddvv05oA7GisfVPEun6RZWk9yZDLeEJbW0S7pZnIyFVfX36DuRVH/AITFLO7t4Nb0q90hbpxHBPctG8bueiFkZtrHtnH1oA6aiiuV8ceKZ/DljZW+nwpNq2qXK2dkkn3A7fxt32jvigDqqK5m60bxFHo8rWfiS4fVBESvnQReSz46bQgIGenzZHfNW5vEun6Va2yatdCC7a2E0kW0syKANzMFBwoPc8UAbdFc14g8Tx2lhpi6XLFPdaxMkFjIPnT5hkyHB5VVyffgd6zNb8Q3tr4l0fwZpFyTqN2jXF1ezKHMEIzlgOm5iCBxgenSgDuKK4XxbqereBtOi14alPqWnQyol9bXKRhtjELvRkVcEEjg5B9qj1nWdU/4WN4X0+w1iVNL1aCeaREiibIRNy7WKkgHI9aAO+orhfGmqavpvivwtaWOqTW9tqd20FxGIo2+ULnILKSDWpc6vNoXiyw067maax1betu7gboZlG4qT3Vh09CCOhGADpqKKKACiiuS8deLJvDsWm2GnpHJq+r3K2tosgJVMkbpGA6hcjj3FAHW0Vx3iGHxBoPh641ey1ye9ubKMzy291DEIp1UZZRtUMpxnByffNb3h3W7bxJ4esdYtP8AU3cQkCk8qehU+4II/CgDTooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiq2oZ/s26wSD5L8jtwaAJ3kSMZd1UepOKha+tEZFa6hUu21AZB8x9B6mvKtPSO4OgS6g0l2jeEpbuRbmRpVaQGE7yGJGeTVSxe10/wr4N1aXRJJ9O06yF3PPBHHua4wI0Q5IJO5ifqB70Ae0VnPr2kxafNqD6jbLaQyGKWYyDbG4baVY9iDxzWfrurXlndeHFtsRLf36wzpImTsMUjkdeDlRzXDXLNdaHbaUir5UviGaa6d0LIka3hChgCM5kZBjPQN6UAesqwZQykFSMgjvS1ykWoa/ceLX0hLrTxBaQRXNxItq2WDs6iMDfwcITnntxUPjW4uItZ8LwwtdbJ7945YraUxtIvkucZyOMgHr2oA7BmVFLMwVRySTgCorW8tr2Iy2txFPGGKlonDAEdRkd65u50TTr4AX3hm6vQOgu5kmA/B5CKu6TF/Z9nfRWPhuLTY4zughjaJBcHb6JkKcjHPt+ABto6SLuRgwzjIOajiureeWaKKeN5IWCyorAlCRkAjtxzXnEwe5imu9BhvbUXtxDe3FkQySSzYYeWCCPKGUVnb0JNUYbo3llqF5pFvcT6oAsGozWt1MHmC/L5lvuc+YEYsOcAkHnsQD1osq4yQMnAyetRXV3b2Ns9zdTJDAnLySHCqPUnsK5nxHBp1t4estF1T7bJZ3Tx2iXu/fJDMSBG5bqG3Yw3Y4zXN6rq9vqN6ITfTPp/2CbUNQj+0Ph7XlYlVQw5cfMT/AI0AenI6yIrowZWGQQcginV514T2K3hrT7221EXwtHnQx3hMEQjCqQVEhyBvC8jr2HOO8v8AUbLS7Vrq/uobW3X70kzhVH4mgCzXHrHpGu+J/Euj3bW9zHNa26SwbwSRiTPTnI/TiqFp8W9A1jxNFomiMbxySZrpm8qCNB1O48sewAHJPWuwXUNJV963dmG9RIuaAPNfDFjrnhz4g6d4Y1EvdaZaW9zLpt82ctEwQeW3uuPyI7YrmtZ1zTb3wsZoLq306OPX0dtKTHmRnz/mlmLZIJ68bVGcc17idT0wsGN9aEr0Pmrx+tRG70U783FgfMIZ/nT5iOhPrQBmP4h1CPWdOj/s+F9L1CUxQzpMTLwhcOU242nae+eh74rjNe03wd41sLjXBqEei67Zl1a7imEUsboSPmGRuBxweuOhrrs3B8Rfb31/SGtQdqReUd6R9wG8zGSQMnb2Fa0s2gzvE8smnSPF/q2dkJT6elAHlE39vPpvgHxzq1vLNJpzOmoARkOIZPlExX2GCfrXceN/EOny+DL61sLmG+vNRga3s4LZxI0zuNowB2Gck9ABXT/2rpuMfb7X/v6v+NV4JtBtpnmgk06KWT77oyKW+pHWgDmtIGoeCPDPhvR2gtJEUQW0xkudsjO7gN5a4+bbu3dRwDUus3uqXHxD0vSYY7RYY7aa+RmkJLMMR/MuOAPMYgZ59qu67Fa66Psc+qaYNOYo7KcGUMrBsq27A6DnHFaRl0JtSTUTPZG9SIwrP5i7ghIJXOemQDQByHh22nvLzxRDfXVhPML42k0tzAS0qCNGAxvAVRvIAH15OTVr4c22rJ4Sh1GfV59QNxDugtZyFjiOTxvwzkcAck496110zwktzdXLRaZLNdSmaaSVkcs2AP4s44A4HFXtOl0PStPhsLK5tIbWFdkcYmBCj8TQB5z5S+ItCfxHeQJDK2twxw26NuSLZcJFnPG48N2/jb1qv4i0/SrPxrYaRNdMLaeZJry9kkO2NiwdopD90GVooyAcY+bA5Feg/wBn+F10j+yo5LSKy87z/KjuAuH3785Bz97mtBNF0mXSpbEWkE1ldZaVWG8TFurMTncT6mgDRUhlBUgg9CKWqmmaZZaPp0Nhp9ulvawrtjiTooq3QAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABWF41uIbfwTrbTSpGpsZlBdgMkocD61u1FO1uqD7Q0YUnjzCMZ/GgDhfGXhy4vxZ+L/Cksf9u2CZTy2yl5D/ABRNjrnnHv8AmMGTXraPwD4SvL+yhhlu9VLxzXZYR2EhkkO98EZxkjBIHr0r1RbyyRQq3NuqjsHFMefTZIjE8tq0ZOSjMpB5z0+tAHix09PFM/xF0Oy1P7be3iW0tvIwA88om7I2gDaSAoPTkcmvRvCPivTJfBllLfXcNnc2lusV5BcOI3gkQYYMp5HTI9iK6RbnT0dnWa2V2ABYMuTjpUUo0ee4S4lFlJPH9yR9pZfoeooA8otLF7fwZ8RvE14Daxa8J3tEmGxmjCOEODyC248fStrQNF8NS/Cqw1CTYSukxmWT7U4CyeUMg/NgHPavQ3u7CRdrz27D0LqaaLjTghQTWuw87dy4oA878B6tLp3wKtb6wFtcT2VpLI8csu0DaXJzgHnjp/Ko7uHUh4f8Gre3Nuba6uIFmt5ELLM7xtIXl5GcMM7emeua9En/ALJubSa0ma0e3nQpLGWXDqRgg/hVW907w/qNtZW12tpNBZOrwRNICqlVKjjPOATwaAOWvtM1G9+INnHZ64tg72LzTyWEWPOCSIoV1dmU8McHGR9OKveKZ7m88T6H4daFEgu2ecXiyAyDyVD427ePn2HOSDjpW3bad4dstRGoWkNjb3IiMO+IqnyEgkYHB5UflViaPR59RttQla2a7tlZYZTIMoG+8Bz3wKAPN20XTdO0DxDcciPTtTmW2tixxKxSMMvqzuuU7n5z3NdL8MPsp8LGaKcPdXE7S3MLOS9u3CrE2eQUVVXn0zWzBpmgW1/Jeo0JneZrjLz7gsjDBZQTgHAxkdqx/El54f8ACsk3i9dLt7m6QBLqe3ZfOEfTcB/FjjPQ4+mKAO0ryTUvCd3qus+I9f0GT7P4j0zVQ1tJnAmT7PDuib1B5/P3Ndt4b8feGvFka/2TqsLzsP8Aj3kOyUf8BPJ/DirmjaHLpN9qVy181x9vn+0SI0YUK+1V4x2wo60Acj4Q8W23i7xdHexo1vdQ6S8V3bScNBKJRuU5rMtvEOr2994Vf+17i+a91KS1vbhFAtJgdxCxAgHC4ADAYODya7lPBulReJdQ1uKMxz6haG2ukThZBn73+9jjNc/D8LRFY6Xaf8JLqpj0q4E1lxH+6Az8v3eevU5xjigDr/7X0i9uLrTV1C1lnjRvPgWUF1XocgHIry2W28S/DTTJTaqniTwQULGFmxPbQt1wf4lwf/1V2EJ07VfFUSpBdQmyhntrfNpIqsXx5jlioXHygDnkkn0p0fge8i8Njw7/AMJHePpZi8hg8SGby8YKB8cDHHIJx3oA5Vr6DUvjd4TuQWOmS6K02nB+m9gc4/2tuM/hXQfGVYz8LNYL8MvlGM9w/mLjFbeqeDtM1DT9Nt4vMs5dL2mwuIDh7fAA4zkEEDBByDUd14Uk1i4tW13Umvra2cSJaJEIoncdGccliOuMgZ7UAWND1iFNN0ew1K9gTWZrOJpLd5AJGfYC3y9fU/ga5j4p2F0knhzxJb20lzFol+J7qKIZfyTgMwHcjFa+vB7rXtLXT1DzWl+klxA9sdrAoQZN+AMqp4IJGQB1xXUyzRQgGWREB6bmAzQBkReL9AuNPS8t9VtZ45FyiwyB3c/3Qo5LdsYzmuH8Ra3ZyeLNXs5Xi0e8/sdN80uGnu1O4iKIHK4BODgEknA6Zr0KJdGguHuIRYxzv9+RNgZvqe9Stcac8qytLamRQQrllyAeuDQB4z4fuI53+EtzHKJba3S4tZSDwkzRDaD78Gun8TW0nh74t6P4tn/5BNxaNp11Nji3bJZWY9lJwMngYrr9YsNJ1bTUtDcwQNDIs1tLGy5gkU5VlHTj07gkd6vW17EbVFvLm0abGH8txtb3APTPp29T1oA4n4o3kOv+En8M6TNHealqskUcUULB9qh1ZnbH3VAXqax/EdnpUPxI8A6Ld3EbwWllcQPul2HiIBckEEEla9Mtf7IsgwtfsUAY5YRbVyfU4qRp9OdtzS2pb1LLmgDzHxlYaLonjzwP9mZIJDfuZA9wzYXZwTuJxya2fiYj3V94KgtubltfglXb/cQMXP0xXatPpztueW1Y+pZTWWLO0uNfTV727tXktkaKzjVxiEN95s92YAD2HA7kgDbLXNTbxOuk3+mxQxz273EEkU29lVWVcSDAAJ3A8EjqO1R6TdeIbbxTeaTqUP2rTfJ+0Wmoqm3+LBifHBYdQRjI7UaVFfWuqz3d/remXEc2dwihKPgZ2LuMhAUZPAHJJPc1vfb7P/n6g/7+CgCxXnHxQ0y7TUvDHim2ikni0W933UUalmELlQzgDk7cfrntXf8A2+z/AOfqD/v4KPt1n/z9Qf8AfwUAcz4u8T6Z/wAIZfGyvIby4vbZ4bSG3cSPO7qVUKoyT1/AVkaPHrHw7+HmmWi6dFdR2NuJLwtPtYs7kskYAO5huPXGeMZ7drENHguJLiEWUc0n35E2hm+p71la1He397byWWs6XDbQ/N5NxCZN0gOQxIkXp2Hrz2GADpAcqDjGR0pa4Of4r6BpPiOXQddkaxuEwY7lvmgmU9GDDpnvkYBBGa6PVfE+m6b4Vu/EKXEVzZW8LSh4XDB8dACOOTxQBs0Vxfhyx1nxDodvrWq63e2txfRCaK2smVIrdW5UAFSWOMZLZGe1aGn39zoGmSDxNqKyzNeNFBKI8NMp5QKijJbHYDsaAOkorlNd8XxjwTrWr+H2F5dWEbqYihDRyDruQgEYBzgjtWPpD3WsaVpur+HfF95qSmeD7bFN5bB0LrvG0KDGwGeB2BHvQB6HRXDS63f+JPH194a0+8exsdKhjkvbiDBllkflY1JBCjHJOM9uKi1jV7/wL4h0cXN9cX+h6rci0c3OGktZj9whgBlTzkHJGOD2oA76iiigAooooAKKKKACiiigAqG7iaeznhUgNJGygnsSMVNRQB5heeDP7J0/S9Otb6efV7nTRpBDzMyLCShnlAYnaAqcAYGWUdxVTVruytfE8doJWTwhBeRT3lyqEwwXSDCxFugUssbE9AwweW49OvNLs77f58RJdQjlWKllBztJBzt9R0PepBYWYsfsItYfsmzZ5HljZt9NvTHtQBheJdKvtfXRLnRr21iNpei686RTIpTy3X5QDyfn45ArE0hLCLwJrP8AaU4RZby9gefaN7Hz5AuAOrbjkAdzxXcWNhaaZZx2ljbRW9tGMJFEoVVH0FVLPw/pljMJYLYbw7yKXYtsZ2LMVBPBJY5I/pQBx3w41VprnVE19vsnii6lWW4s5V2ERqiqhQZO5cAnjoSRW3rEQ1LxtosMbZ/syOa9mx/CWQxxg/Xc5/4Aa2b/AEPStTu7W6vtPt7i4tG3wSSRhmjPsf8APY9qswWcFu87xph533yMSSWOMd+wAxigDz3wre+Gp/COky6hr8ovHtIzNu1aZTv2jORv45rd+H8jy+C45YpmuGa4uSjzSs+4ec4X5jk4wBXT21rBZWsVrbRJDBEgSONBhVUDAAHpSwW8NtEIoIkijBJ2IoUZJyeB7kmgDyqe81m/+H3inWzeRW5ae6ZxbksWER8pUVuMLiPkjk5P3aueJdLuJLDw7bxatb2+b2C3iewg8mWBGHIRg5wMDGMYrvZtD0ybSbjS2solsbjf5sMY2K28kt0x1JJP1psmgaTI1szWEAa2kWWIqgUqw6Hj60Ac94xu9Q8P+DY7eKU3ss7x2RurmQLIGkYIHAVcEjOe3TvWU/hjR4vFmp2VwxisjpcM1w28Jv2ySY3HsqgLgdgoHSu/vtOs9TgWG9t4540kWVVcZw6nKke4IqrdaBpl7qIvrm2Es+xYzuY7WVSSoK5wcFieR1+lAHBfDSSyk17U7m5kWDUpEVYrZ9ymSIku1wobHEjsTgdAAK7rXvDOjeJ7L7JrOnw3cQzt3j5kz3VhyD9KnvdF0zUbq1urywt557R98EkkYLRnGODV+gDyWy+BejaN4ng1Kx8m808gpcafqUQlG090bHBHHUH6812v/CvPBv8A0K+kf+Aif4V0tFAHNf8ACvPBv/Qr6R/4CJ/hR/wrzwb/ANCvpH/gIn+FdLRQBzX/AArzwb/0K+kf+Aif4Uf8K88G/wDQr6R/4CJ/hXS0UAc1/wAK88G/9CvpH/gIn+FH/CvPBv8A0K+kf+Aif4V0tFAHNf8ACvPBv/Qr6R/4CJ/hR/wrzwb/ANCvpH/gIn+FdLRQBzX/AArzwb/0K+kf+Aif4Uf8K88G/wDQr6R/4CJ/hXS0UAcfqnw/8HxaReyR+GdJV1gdlYWiAghTz0q38PP+Sc+HP+wdB/6AK2NY/wCQJf8A/XvJ/wCgmsf4ef8AJOfDn/YOg/8AQBQB0tFZ2uaxFoOlS6lcQzS28HzTGFQzIndsZ5A6nHOKuJcRPbLcCQCJlDhjwMEZzzQBLRWdq+tWeh28VzfF0t5JViMqruVCxwpbHIBOBn3o1zV00TRrjUmhedYcExxkbmywHGeM80AaNFIrblBxgkZweoppljWRYzIokbJVSeTj0FAD6KKKACiiigAooooAKKKy9W1230a5sY7uKbyryYW6TIu5UkP3Q3cZ9cY9cUAalFNZ0QgMyjccDJxk1QutatLLV7PTbgvHLeBvs7lfkdlGSuexxzz17UAaNFZ2p6sNNn02L7PJO19dC2XyyPk+Rn3HJHACH3+taOaACuG8f6fZ6rrfhCxv7aO5tZdScSRSrlWxbynkfUCuzhvLW4keOC5hldOHVHBK/UDpXK+L/wDkafBf/YTk/wDSeWgCf/hW3gr/AKFjTP8AwHWj/hW3gr/oWNM/8B1rqaKAOW/4Vt4K/wChY0z/AMB1o/4Vt4K/6FjTP/Ada6migDlv+FbeCv8AoWNM/wDAdaP+FbeCv+hY0z/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che_353	MCQ	The figure <image_1>shows the thermogravimetric curve of CaC_2O_4·xH_2O in N_2 and O_2 atmospheres (the curve of sample mass versus temperature. At 205℃, the crystal completely loses water). The following relevant statements are correct ()	['A. The value of x is 5', 'B. Substance A is CaC_2O_4, and CaC_2O_4 is thermally stable below 420℃ under the condition of isolating air and will not decompose', 'C. The decomposition products of CaC_2O_4·xH_2O are exactly the same at different temperatures whether in O_2 or N_2 atmosphere', 'D. Whether in O_2 or N_2 atmosphere, when one CaC_2O_4·xH_2O finally transforms into C, the number of transferred electrons is the same']	B	che	认识化学科学	['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che_354	MCQ_OnlyTxt	Now take mg of the magnesium-aluminum alloy and just dissolve it completely in a certain concentration of dilute nitric acid (assuming that the reduction product of nitric acid is only NO), drop bmol/L NaOH solution to the mixed solution after the reaction. When the drop is added to V mL, the resulting precipitate mass just reaches the maximum value, which is mg. The following incorrect statements about this statement are ()	['A. The amount of NO_3^-in the solution when the magnesium aluminum alloy is just dissolved is\\frac{bV}{1000} mol', 'B. The mass of OH^-in the precipitate was 17bV g', 'C. The volume of NO generated under standard conditions is\\frac{22.4(n-m)}{17} L', 'D. The amount of nitric acid that reacts with the magnesium aluminum alloy is\\left(\\frac{n-m}{51} + \\frac{bV}{1000}\\right) 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che_355	OPEN	"Sulfuryl chloride [SO_2Cl_2] is easily soluble in alcohol, soluble in hot water, and insoluble in cold water. It is stable in acidic, neutral and alkaline aqueous solutions and is mainly used in the manufacture of medicines, pesticides, dyes, etc. The device for preparing sulfuryl chloride is shown in the figure below. Its principle is SO_2Cl_2 + 4NH_3 = SO_2(NH_2)_2 + 2NH_4Cl. It is known that sulfuryl chloride (SO_2Cl_2) has a melting point of-54.1 ℃ and a boiling point of 69.1℃. When exposed to humid air, it will hydrolyze to produce acid mist.
I. Preparation of sulfuryl chloride<image_1>
II. Use the following <image_2>device to determine the content of SO_2(NH_2)_2 in the product (assuming that only NH_4Cl impurities are contained, some devices have been omitted)
Ammonia evaporation: Take a g sample for determination. After adding the drug, heat the instrument M, and pass the evaporated NH_3 into a conical flask containing V_1mL c_1mol/L H_2SO_4 standard solution.
Titration: Put the water in liquid sealing device 2 into a conical flask, and then pour the solution in the conical flask into a volumetric flask to prepare a 500mL solution. Take 20mL of the solution and use c_2 mol/L NaOH standard solution to titrate the excess H_2SO_4. A total of V_2 mL NaOH standard solution is consumed. The content of SO_2(NH_2)_2 in the product is ()(list the calculation formula)."		\frac{a - \left( c_1 V_1 \times 10^{-3} - \frac{1}{2} c_2 V_2 \times 10^{-3} \times 25 \right) \times 107}{a} \times 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'che_355_2.jpg']
che_356	MCQ	Using the high selectivity of electrolytes to transport radical cations, the 3+2 cycloaddition of benzofuran-like organic compounds with vinyl azide compounds can be achieved through electrolysis, as shown in the working principle diagram <image_1>. The electron utilization rate at the electrode during the process is only 60%. The correct statement is:( )	['A. The direction of electric current flow: Anode → X electrode → electrolyte → Y electrode → cathode', 'B. The reaction at the Y electrode is <image_2>', 'C. During the process, the only cation moving towards the Y electrode is <image_3>', 'D. When 1 mol of <image_4> is produced, theoretically 1 mol of electrons is transferred in the circuit.']	A	che	化学反应原理	['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', 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pqbti78bsc46Zp1ACEgAknAHU1U0zVrDWrIXmnXUdzblmQSRnIypwR+YrE8W6VrfiGNdGsrlLDS50/wBNvFbMzL/zzjHbPdj2NcZ8N/DGp+HbKG/0K58/Trq5ljvNPuXxt2ysgljbH3gqjIPX16UAetUUUUAef+LNLfU/hHA0ABubK0gvYQRkFolVsY75AI/Gnal4jnXVPBevW1w40jVD9lnhz8u6ZA0bfUMuM+9dXoaLJ4Y01HAKtZxAg9xsFeaWmkzXvw88U+DY9xvtDuXNkM/OFz50BB9+gPtQB69RWV4Z1iPxB4Z03Vo2BF1bpI2OzY+Yfgcj8K1aACiimu6xozuwVFGSxOABQBn+INKj1zw9qGlygFbq3eLnsSCAfwODWT8PNVl1bwRpz3Rb7bbKbS6VvvLLGdjA+/GfxrO0zxXe69rM+rW08dn4Q05HElzKo/01wDllJ6IvqOpFYHhaTxdLda3q/hjT9OGianem5thqckkbv8oDSKFBwrEZGeaAPWKK4r7V8Sh/zDPDR9vtU3/xNH2z4k/9Ajw5/wCBsv8A8RQB2hIUEnoOa8l0/Qbnx14d8S6pHKkba7qKRRyuSB9jgkCgD6hX+uaf4s8T+OreCHQ5NK0db7WN1tbra3jvIuR80mNowqjkmuo1rwjJJ8MG8Naa4W4gtI0t2B25kj2spz2yy/rQBp6xp+otaXBtNVFtbrAQIRbq2AF9TVLwdZamnh7RZZdW8y3+xRHyPs6jjyxgbuvFdDYm4m0y2N9CI7l4V8+LIYK5HzDPQ85qeONIo1jjRUjQBVVRgKB0AFAHCeBdD8a6X4g1q48S6ul5Yzvm1jDlsfMTkDHyjHGK3PHVrfXvgjVodMacX3kFoPIYhy68gDHrjFdDXJePNU1SzsrGx0fzYrq8uAHulTK20KfNI7EjA+UYAPXNAGZ4ZaTXPiTq2qXCFW0qxg09FPaRx5kv4g7RXoFcT8LYXfwi2sTAi51m6m1CXP8Atsdo+m0LXbUAIc4OBk9q4rxJd+ID/ZfmaTYqBqMJXF+xycnAP7rj6121Vb2wgv8AyPODfuJlmTBx8y9KAILM310xOqafaw+UweExXBm+bkZ5RcdffrWBPZJ4k8e6fqEa/wCh6CswE4IxLPIApQeyAc+5A7GtnxJYarqejS2ekakmnXEvym4aIuVXvtwRg+/asLR/DXiyxns4rrxNavpsDAtbW9gIi4HIG7JwM4z68+tAGTNrHiPxLBrFxoo1KJ7W6mtrL7M1sIt0ZxmQSNuOWHPAwCMep7rQ5dSn0Szk1i3S31Foh9oiRgyq/fBBIx+NcifA+u6X4h1C98M+Io7Cx1KXz7m1nthKFkP3nTngmu2sbRbGyhtlkklEa4Mkrbnc9yT6k80AWKztXn1OCCM6ZHZPIWwwu5mjXHsQDzWjVS+0uw1SNY9Qsra7RDuVZ4lcA+oBFAGF/aHiz/n18P8A/gdJ/wDEV0sRdoUMgUOVG4KcjPfB9Kyf+ER8Nf8AQv6X/wCAkf8AhWuiLHGqIoVFACqowAPQUAeaeGLe60yx8b+HNPkEGr21zLc29wFDM6zLviZs/eIOQc+ldl4P1z/hI/COmaswAkuIAZQO0g4cf99A1ga0P7C+Keiaovy2+sQPptwe3mL88R+p+YUeB86P4m8T+GW+WOG6F/Zof+eM3JC+wcMPxoA7qiiigAoorlvF/iqTRhBpelQC98QX+VtLXsvrJJ6IP1oAzdGzofxV1vS/uWur26alAvRfNX5Jce5+Umu7ry/xhe3/APwkvhO302FdV8U6cWnuoYD5cfksm2Qsx4QMcYzWz/wkvjn/AKEFf/BtF/hQB29FcR/wk/jgdfAB/DVYv8KP+Eo8bDr4Af8ADVYaAI/Gf/E78X+GvDA+aHzjqd4o/wCecX3AfYuR+Vd3XjfhHxtBN481bWfEVnLpf24rp9lNKweBTESHj8wcAl+fQ17GCCAQcg9CKAFoopHdUQu7BVUZJJwAKAFrhfD/APxIviZ4g0Tpb6lGuq2w9GPySj/vrafxptz4v1PxRevpvghI2hjfbc61Ou63ix1WMf8ALRv0qjrupRat8RPDkWg77/U9KnZdRmhH7qKB12urt03ZAIXk8GgDuNTh1mV4zpd7ZW6AHeLi2aUk+2HXFcz4btfFBtbox6rpYQX9zuBsHJJ85s4Pm8ZOfp713FQ21rBaI6QRhFeRpGGScsxLMfxJNAHF674ZsPFviLW9K1BMpJptqUkA+aJw8+GX3Fc3pfiXUILmz8GeJmxrdjqFuYJz0vIN/wArg9zjr/jmvRINDuYfEtxrB1J38+JIWtzEoUIpYrg9c/OeaNa8L6dreo6XqFwm2802cTQSr191PqDQBJrHibRvD5jGq6hDamQZUOT06ZOOg56nitSKWOaJJYnV43AZWU5DA9CDWP4gaAWk9tHDFLf30JgjRsfMvIy3+wu4k/XHUgVa0LToNI0Gx022lMsNpCsCuTkttGOfyoA0O1cv8Pv+RRi/6+bn/wBHyV1FZmg6QuhaSlgsxmCySSbyuPvuz4x7bsUAadFFFAGdoH/It6X/ANekX/oArlb/AP4kXxa0+8PFrr1o1nJjoJo/nQn6qWH4V1Wgf8i3pf8A16Rf+gCqnijwzB4nsbeGS6ntJ7adbm3ubcgPFIucEZBHc0AZ/gXSL7w/Fq+k3EJWyiv5JbCTIw0Mnz7cdRtJIrrK4b+y/iJpYxZeINL1ePsuoWhhcD03RnB/Kl/4S7xVpvGs+CbqRB1n0q4W4B/4AdrCgDuCcDJrzfVL6X4h6jcaVZXDW/hSxYjUr9W2/a2XrCjf3Rj5mH0+t+T4keENQgl03Vrm40xp42jkt9RhktmKkYPzdO/Y1jW9tB43aPw94fQWfgfTyEuZoPlF8w5MSH+5n7zd/wBSASWVmvxDuYYIIPsvgbTmCQwquwai6dOO0SkfiR+XpTFLa3JWM7I14SNc8DsAKS2tobO2itraJIoIlCRxoMBVHAAFS0AcfH8TPDUsdzIkmoNFauY7iQabcFIWHUMQmAR3zW3J4h0//hHJddtZvtlisJmVrYeYXAHQAd+2K8n8PeL08JaV4yuJtLurmJ/ENygmXaIUZtoAds5UZ6nBHP4V3vwz8L3HhLwbDYXdxFNPJK9w3knMa7v4VPpj+tAEfgvRL2e6m8W+IIyusX6Yit2/5crfqsQ9+7H1rtKKKACiiigDM159ZTSn/sGG0lv2IVPtblY1B6sccnHpXnt2+t38U/gSw1iTUtTuAz6xqsiAR2Ub8GNFHGSMgLnI5P06LxZ4kvn1BPC3hkq+uXK7pZyMpYRH/lo/v6Dv/Pa8M+G7LwtpC2FmGZixknnkOXnkP3nY9yaAOc8Ha3Poc9t4J8QRx21/bQhLC4QYivYUGAV9HAxlfxrvKx/Enhuw8UaWbK+VgVYSQzRnbJBIPuuh7EVmeEr7X4bi40LxDbPLcWiBodTjT91dx9AT/dk9R+NAHV0UUUAFFFFABRRRQAUUUUAFFFFAHJfEnTZtQ8E3ctoub2wZb62I6h4ju498Aj8azJnkvvFXhDxlpcEk9pfWzWd15SlisciiRGbHQBlIJPTNd86LIjI4BVhgg9xXAWHhfxn4Us1sfD2saZe6dEzeTa6jbMjRKSTtEiHnr3FAHoNFcP8A8Jb4s0zjWfBNxKg6z6VcrcA/8AO1h+tSwfFLwuZVg1C5uNJuD/yx1K2eA/mRt/WgDR8W+KovDdnFHDC15qt43lWNlH96Zz3Poo6k9hXG4u/CTbV2av8AEHXRknqkC/8AskKf+PEflf1jWvDun6o2v6M6a74j1JRaWEEU4lC4HO3H3E/iY1u+EfCjaIs+panOL3X78h7y7I6ekaeiDoBQBP4S8Kw+GrKVpJmu9Uu2829vpB88zn+SjoB2roaKKACsfxXrI8P+FNT1UgE21uzoD3fGFH4kitC9vbbTrV7m8mWGBBlpH4Cj1J7Vymsa14M8WadFps/iKza3lnjfbHcqBMUYMEOeoJAyKAJ/CvhW0t/h5YaJqdtHcpJbh7pJVyGkf5n/APHicGsc2ev/AA7Yyaas+t+GF5azJ3XNkv8A0zP/AC0Uf3TzxXogxgY6UUAZmj+INN1/Sl1LSrhbqAgnCfeBH8JHUN7GuG1GDUfEtrLqnjScaB4Wh+caaZdslwByDOw6dvkHPbrWp4k8ImxnufE/hi5Gl6vGhlnQLmC8C87ZUHfr8w55qj4X8PTeM7fT/FfiydL1po1ns9ORSLa2BGQdp+8/uaAIrRNX8a2sdlo0D+HPCCLsWVE8u5u06YRf+WaHnnqePWu70XQ9N8PadHYaXaR21un8Kjkn1J6k+5rQAwMCigAooooAKKKKAMXVfCWg65drdanpsVzOq7FdychfQc1p2dnb6fZxWlpCsNvCoWONeigdqnooAKKKKACiiigDO0D/AJFvS/8Ar0i/9AFaNZ2gf8i3pf8A16Rf+gCtGgAooooAiuLW3u4jFcwRzRnqkiBgfwNJa2tvZW6W9rBHBAn3Y4kCqv0AqaigApshcRsY1Vnx8oY4BP15p1FAHA+FPBmoWVp4j07xBbafPY6xfTXRWGdnIWQAbSCg6Y6g1f8ABWi+IfDNu+jX09re6VA5Fjc+c3nrF/CjqVwcdMhuldfRQAVk+I9OTUdEuY2uLu3ZI2ZJbWdonUgcHKnn6HIrWqhrVzBaaLezXEqRRrC+WdgB900AcB8O/F+pQzW/hbxY5/tJ4FnsLtiSLyErkc93Hf1x7c9D4btfL8W+JAbm8kSCaJYY5rqR0jDRKxAUkjqSaoXvhax8b/D7SEhuFjvra2iks72I5aCUIO47eoqD4Z3es3E3iN9ftvK1SK5iinVekhSJVDDt8wAPpzQB3UGn2drdXN1BawxXFyQ08qIA0hAwNx74FWa5SLXdftPE2m6fqthZi21MSeU1tIzPbsi7sSZGCMcZHeuroAKyvEtxdWXhrUryzm8q4traSaMlAwJVSQCD24rVrH8Wf8i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che_357	MCQ	At room temperature, it is assumed that the quantitative concentrations of Co^{2+} and C_2O_4^{2-} starting substances in 1L of aqueous solution are both 0.01mol·L^{-1}. Under equilibrium conditions, the relationship between the molar fractions of all four carbon-containing species in the system and pH is shown in the figure <image_1>(ignoring the change in solution volume). It is known that the existence forms of cobalt-containing species in the system are Co^{3+}, CoC_2O_4 (s) and Co(OH)_2(s);$K_{sp}[CoC_2O_4]=6.0\times10^{-8}$,$K_{sp}[Co(OH)_2]=5.9\times10^{-15}$. The following statement is correct ()	['A. The species shown in line A is HC_2O_4', 'B. Ionization equilibrium constant of H_2C_2O_4 $K_{a2}=10^{-8}$', 'C. At pH = a, the quantitative concentration of Co^{2+} substance is $1.6\\times10^{-3}mol·L^{-1}$', 'D. When pH = b, the quantitative concentration of the substance: $c(OH^-)<c(C_2O_4^{2-})$']	D	che	化学反应原理	['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che_358	MCQ	There is a reaction in the AgI^-CH_3COOH aqueous solution system at room temperature: Ag^+++CH_3COOO^-CH_3COOOAg(aq), and the equilibrium constant is K. Given that the initial concentration is $c_0(Ag^+)=c_0(CH_3COOH)=0.08mol·L^{-1}$, the relationship between the mole fraction of all carbon-containing species and the change in pH is as <image_1>shown in the figure (ignoring the change in solution volume). The following statement is correct ()	['A. Line II represents the change in CH_3OOOH', 'B. Ionization equilibrium constant of CH_3COOH $K_a=10^{-n}$', 'C. When pH=n,$c(Ag^+)=\\frac{10^{m-n}}{K}mol·L^{-1}$', 'D. At pH=10,$c(Ag^+)+c(CH_3COOOAg)= 0.08 mol·L^{-1}$']	C	che	化学反应原理	['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che_359	MCQ	At room temperature, add solutions containing Cl^-to solutions containing Pb^{2+} and Ag^+ respectively, and the relationship between pM and pCl at equilibrium is <image_1>shown in the figure. It is known that: AgCl(s)+Cl^-(aq)[AgCl_2]^(aq), PbCl_2(s)+2Cl ^-(aq)[PbCl_4]^{2+}(aq);pCl=lgc(Cl^-);pM=lgc(M), M represents Pb^{2+}, Ag^+\[AgCl_2]\^,\[PbCl_4]^{2+}. The following statement is correct ()	['A. Line b represents the relationship between pc\\{[AgCl_2]^}~pCl', 'B. At room temperature, the K_{sp} of PbCl_2 is of the order of 10^{-10}', 'C. At room temperature, AgCl(s)+Cl^-(aq)[AgCl_2]^(aq) K=10^{-4.8}', 'D. At room temperature, add NaCl to the mixed solution of Pb(NO_3)_2 and AgNO_3 with a concentration of 0.1 mol·L^{-1}, and when pCl=5,$c(Ag^+)+2c\\{[AgCl_2]^}>1\\times10^{-5}mol·L^{-1}$']	CD	che	化学反应原理	['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']	['che_359.jpg']
che_360	MCQ	Weak acid H_2A exists in equilibrium in the organic and aqueous phases: H_2A(cyclohexane) \rightleftharpoons H^+(aq) + HA^-(aq), and the equilibrium constant is K_a. At 25℃, add V mL of water to V mL of 0.1 mol/L H_2A cyclohexane solution for extraction, and adjust the pH of the aqueous solution with NaOH(s) or HCl(g). The relationship between the concentration of H_2A, HA^-, A^{2-} in aqueous solution, the concentration of H_2A in cyclohexane $[c_{cyclohexane}(H_2A)]$and the aqueous extraction rate\alpha \left[ \alpha = 1 - \frac{c_{cyclohexane}(H_2A)}{0.1 \text{mol} \cdot \text{L}^{-1}}} \right] with pH is shown in the figure<image_1>. It is known that: ①H_2A does not ionize in cyclohexane;② Volume changes are ignored. The following statement is incorrect:	['A. Curve ① represents the change in H_2A concentration in aqueous solution', 'B. At pH = 5,\\alpha < 75\\%', 'C. K_{a1} of H_2A = 10^{-4}', 'D. If the water volume is 2V mL, the pH at intersection N remains unchanged']	A	che	化学反应原理	['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che_361	MCQ	At room temperature, add hydrochloric acid to the suspension containing sufficient CaC_2O_4 solid to adjust the pH, and the relationship between pM and pH in the system is <image_1>shown in the figure. It is known that pM = -lgc(M), where M is H_2C_2O_4, HC_2O_4^-, C_2O_4^{2-} or Ca^{2+} in solution;K_{sp}(CaC_2O_4) = 10^{-8.6}. The following statement is correct ()	['A. Curve L_3 represents the relationship between pc(HC_2O_4^-) and pH', 'B. At room temperature,\\frac{K_{a1}}{K_{a2}}} of H_2C_2O_4 = 10^{1.5}', 'C. At room temperature, the equilibrium constant K = 10^{5.6}(aq) + 2HC_2O_4^-(aq) \\rightleftharpoons CaC_2O_4(s) + H_2C_2O_4(aq)', 'D. At point X, c(HC_2O_4^-) + 2c(C_2O_4^{2-}) < c(Cl^-)']	CD	che	化学反应原理	['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che_362	MCQ	"At room temperature, the following equilibrium exists between dicarboxylic acid (H_2L) and Hg^{2+} in the aqueous solution system:
Hg(OH)_2(aq) Hg(OH)^+(aq)+OH^-(aq) ;Hg(OH)^+(aq) Hg^{2+}(aq)+OH^-(aq);HgL(aq) Hg^{2+}(aq)+L^{2-}(aq), the equilibrium constants are K_1, K_2, K_3, and K_1<K_2. The distribution coefficient of mercury particles contained in the system changes with pH as <image_1>shown in the figure. The following statement is wrong ()"	['A. Curve II represents the change in HgL', 'B. K_2=10^{a-14}', 'C. When pH=a,$c(L^{2-})=\\frac{K_3\\cdot10^{a-b-14}}{K_1}$', 'D. Too large or too small pH is not conducive to the coordination of Hg^{2+} and L^{2-}']	BC	che	化学反应原理	['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che_363	MCQ	At room temperature, ammonia water was added dropwise to the saturated solution of Cu(OH)_2 [sufficient Cu(OH)_2 solid], and the reaction occurred: Cu^{2+}(aq)+4NH_3·H_2O (aq)[Cu(NH_3)_4]^{2+}(aq)+4H_2O (l). The relationship between lg c(M) and pH in the solution is <image_1>shown in the figure, where c(M) represents the concentrations of Cu^{2+},[Cu(NH_3)_4]^{2+}, NH_3·H_2O, and NH_4^+. The following statement is wrong ()	['A. L_1 represents the relationship between lgc (NH_4^+) and pH', 'B. K_{sp} of Cu(OH)_2 =10^{-19.7}', 'C. At pH=9.3,$c(NH_3·H_2O)+2c (Cu^{2+})+2c\\left\\{[Cu(NH_3)_4\\right]^{2+}>10^{-4.7}mol·L^{-1}$', 'D. K=10^{2+}(aq)+4NH_3·H_2O (aq)[Cu(NH_3)_4]^{2+}(aq)+4H_2O (l)']	CD	che	化学反应原理	['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che_364	MCQ	At 25℃, titrated 20.00 mL of a mixed solution of NH_3·H_2O and CH_3NH_3Cl with 0.1000 mol·L^{-1} HCl standard solution to determine the content of the two substances. The titration curve is shown in Figure A<image_1>; the relationship between the distribution fraction of the four nitrogen-containing substances and the pH is shown in Figure B<image_2>. The following statement is wrong ()	['A. In the mixed solution,$c(NH_3·OH)>c(CH_3NH_3)$', 'B. NH_3·H_2O⇌NH_3^+OH^-+OH^- K_b(NH_3·OH)=10^{-3.4}', 'C. At point b, there is $\\frac{c(NH_3^+OH^-)-c(Cl^-)}{c(NH_2OH)}<0.1$', 'D. There is $c(Cl^-)+c(OH^-)=c(NH_3·OH)+c(CH_3NH_3^+)+c(H^+)$at points a, b and c']	B	che	化学反应原理	['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'che_364_2.jpg']
che_365	MCQ	At room temperature, for a 0.01 mol·L^{-1} Na_2CO_3 solution containing MCO_3(s) and a 0.01 mol·L^{-1} Na_2SO_4 solution containing MSO_4(s), the pM[pM=-lgc(M^{2+})] and the distribution fraction of carbon-containing particles δ such as δ(CO_3 ^{2-})=\frac{c(CO_3 ^{2-})}{c(CO_3 ^{2-})+ c(HCO_3^-)+ c (H_2CO_3)} are <image_1>shown in the figure.①M^{2+} does not hydrolyze;②10^{0.6}=4. The following statement is wrong ()	['A. Line ② represents the variation curve of MCO_3', 'B. x=6.97', 'C. The K_{sp} of MSO_4(s) M^{2+}(aq)+SO_4^{2-}(aq) is of the order of magnitude of 10^{-7}', 'D. If the concentration of Na_2CO_3 solution is changed to 0.1mol·L^{-1}, the intersection point of curve ①② will appear on the right side of point a']	D	che	化学反应原理	['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che_366	MCQ	Add Na_2S_2O_3 solution dropwise to saturated AgBr solution (sufficient AgBr solid), and the following reactions occur: Ag^+++S_2O_3^{2-}[Ag(S_2O_3)]^-and Ag(S_2O_3)^-+S_2O_3^{2-}[Ag(S_2O_3)_2]^{3-}. The relationship between lg[c(M)(mol/L)], lg[N] and lg[c(S_2O_3^{2-})/(mol/L)] is shown in the following figure<image_1>. M represents Ag^+ or Br^-;N represents\frac{c(Ag^+)}{c\left\{[Ag(S_2O_3)_2\right]^3}} or\frac{c(Ag^+)}{c\left\{[Ag(S_2O_3)_2\right]^3}}. The following statement is wrong ()	['A. Line L_2 represents the relationship between\\frac{c(Ag^+)}{c\\left\\{[Ag(S_2O_3)_2\\right]^3}}} and c(S_2O_3^{2-})', 'B. a=-6.1', 'C. When c(S_2O_3^{2-})=0.001mol/L, if the concentration of Ag(S_2O_3)_2]^3-in the solution is x mol/L, then c(Br^-)=\\frac{10^{-3.8}}{x}mol/L', 'D. The K of AgBr+2S_2O_3^{2-}=[Ag(S_2O_3)_2]^{3-}+Br^-is of the order of magnitude 10^1']	AC	che	化学反应原理	['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math_367	MCQ	The arithmetic operator MOD represents taking the remainder, such as $a \text{MOD} b = c$, which means that the remainder of $a$divided by $b$is $c$. As shown in the figure<image_1>, a program block diagram about taking the remainder. If the value of input $x$is 3, output $x =$()	['A. 1', 'B. 3', 'C. 5', 'D. 7']	A	math	算法与框图	['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math_368	MCQ	If you execute the following program diagram<image_1>, the output $S =$()	['A. 37', 'B. 46', 'C. 48', 'D. 60']	C	math	算法与框图	['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math_369	OPEN_OnlyTxt	Given the complete set\( I = \mathbb{R} \), set\( A = \{1,2,3,4,5\} \),\( B = \{x \mid x > 2\} \), then\( A \cap \overline{B} =( ).		\{1,2\}	math	集合与常用逻辑用语	['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math_370	OPEN_OnlyTxt	Known function $f(x) =| 2x+4|  + {2|\frac{2}{a}-x|}$. If $a = [f(x)]_{\min}$, find the solution set for the inequality $f(x-1) \leq2x + 5$.		$[0,3]$	math	不等式选讲	['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']	['img_for_onlytxt.jpg']
math_371	OPEN_OnlyTxt	Given the complete set\( U = \mathbb{R} \), set\( A = \{ x \mid x \leq1\} \),\( B = \{ x \mid x \geq2\} \), then\(\overline{A \cup B} =().		\(\{ x \mid 1 < x < 2 \}\)	math	集合与常用逻辑用语	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFFT2ds97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math_372	MCQ_OnlyTxt	"The negation of the proposition ""$\forall x \in \mathbb{Q}, x + \sqrt{5}$is irrational"" is ()."	['A. $\\exists x \\in \\mathbb{Q}, x + \\sqrt{5}$is not an irrational number', 'B. $\\forall x \\in \\mathbb{Q}, x + \\sqrt{5}$is not an irrational number', 'C. $\\exists x \\notin \\mathbb{Q}, x + \\sqrt{5}$is not an irrational number', 'D. $\\forall x \\notin \\mathbb{Q}, x + \\sqrt{5}$is not an irrational number']	A	math	集合与常用逻辑用语	['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math_373	OPEN	<image_1>In the quadrangular pyramid P-ABCD, AB \perp BC, AD \perp CD, PO \perp bottom surface ABCD, point O is on AC, and PB = PC. If PO = AB = BC = 1, the tangent value of the dihedral angle P-AD-B is 2\sqrt{2}, and find the cosine value of the dihedral angle D-AP-B.		\frac{2\sqrt{15}-3\sqrt{5}}{15}	math	空间向量与立体几何	['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']	['math_373.jpg']
math_374	OPEN_OnlyTxt	The center of ellipse C is the coordinate origin O, the focus is on the y-axis, the eccentricity e = \frac{\sqrt{2}}{2}, the shortest distance from a point on the ellipse to the focus is 1-e, the line\ell intersects the y-axis at point P(0,m)(m \neq0), and intersects ellipse C at two different points A and B, and\overline{OA} + k\overline{OB} = 4\overline{OP}. Find the range of m values.		(-1, -\frac{1}{2}) \cup (\frac{1}{2}, 1)	math	平面解析几何	['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math_375	OPEN_OnlyTxt	We know the function $f(x) = x\ln x$. If $x_1, x_2 \in (0, 1)$, then $|f(x_1) - f(x_2)|$and $|x_1 - x_2| ^{\frac{1}{2}} The size relationship of $is (   ）。		$ \leq 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math_376	OPEN_OnlyTxt	Party A and Party B participate in the knowledge competition. The rules of the competition are as follows: Two people take turns to randomly pick questions, and the correct answer will be 1 point, and no points will be scored for any wrong answer; then the other party selects questions to answer, and each person completes one answer and is recorded as a round of competition. During the competition, any player who leads by 2 points will advance immediately and the competition will end (regardless of whether the round is completed or not). It is known that the probability that A will correctly answer the question is $\frac{1}{3}$, and the probability that B will correctly answer the question is $p$. Whether it is correct or not is independent of each other. Draw lots will determine the first answer party. It is known that after the first round of answering questions, the probability that both A and B will each add 1 point is $\frac{1}{6}$. Remember that the total number of times Party A and Party B answered questions at the end of the competition is $n (n \geq2)$. Due to the length of the competition, the answer to the competition cannot exceed 3 rounds. If no one improves after 3 rounds, the competition will be held on an elective basis. Ask for the probability of successfully advancing within 3 rounds of competition.		\frac{17}{216}	math	计数原理与概率统计	['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math_377	OPEN	"In order to understand the online learning efficiency of students in the school, a school randomly sampled the mathematics scores (unit: points) of 100 students in the first grade of high school, and obtained the following frequency distribution histogram: <image_1>In order to supervise students 'online learning every day, improve the quality of students' daily homework and enthusiasm for learning mathematics, the mathematics teacher of Class 1 of this grade specially designed a daily homework Mini programs on WeChat. Whenever the homework submitted by students is excellent, they will have the opportunity to participate in the Mini programs ""Play games and earn points"" activity. After the start of school, you can receive corresponding small prizes from the teacher based on the number of points you get. There is a row of squares on the page of the Mini programs, with a total of 15 squares. At the beginning, there is a bunny in the first square. Every time the start button of the game is clicked, the bunny jumps along the square. Each time it jumps 1 square or 2 squares, the probability is $\frac{1}{2}$. Click the start button of the game in turn until the bunny jumps to the 14th square (reward 0 points) or the 15th square (reward 5 points), the game ends. Points are automatically accumulated every day. Set the probability that the bunny jumps to the $n (1 \leq n \leq14)$grid as $P_n$, and find the value of $P_{15}$(probability of winning)."		P_{15} = \frac{2}{3} \left[ 1 - \left( -\frac{1}{2} \right)^{15} \right]	math	计数原理与概率统计	['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']	['math_377.jpg']
math_378	OPEN_OnlyTxt	"Given the function $f(x)=x^2+alnx-2x$, there are the following four conclusions:
① When $a \geq 0$,$y=f(x)$is an increasing function on $(0,+\infty)$;
② When $0<a<\frac{1}{2}$, there are two extreme points for $y=f(x)$;
③ When $a \leq 0$, there is a maximum value for $y=f(x)$;
④ If the function has two different extreme points $x_1$,$x_2$, then the maximum value of $f(2x_1x_2)$is always negative.

The serial numbers of all correct conclusions are ()"		②④	math	函数与导数	['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math_379	MCQ	"<image_1>In ""Nine Chapters of Arithmetic"", a triangular pyramid with all four faces being right triangles is called an integral partition. As shown in the figure, a student used two identical semi-cylinders to obtain a triangular pyramid A-BCD. The triangular pyramid is separated,\(O_1\) and\(O_2\) are the center of the semi-cylinder, the radius is 2, BD=4,\(\angle AO_2C = 60^\circ\), the moving point Q moves (including boundaries) in\(\triangle ACD\), and satisfies\(BQ = \sqrt{10}\), then the trajectory length of point Q is ()"	['A. \\(\\sqrt{2\\pi}\\)', 'B. \\(\\sqrt{3\\pi}\\)', 'C. \\(2\\sqrt{2\\pi}\\)', 'D. \\(2\\sqrt{3\\pi}\\)']	A	math	空间向量与立体几何	['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math_380	MCQ_OnlyTxt	Given\(0 < x < y < \pi\) and\(e^y \sin x = e^x \sin y\), where\(e\) is the base of the natural logarithm, then the following options must be true ()	['A. \\(\\cos x + \\cos y < 0\\)', 'B. \\(\\cos x + \\cos y > 0\\)', 'C. \\(\\cos x > \\sin y\\)', 'D. \\(\\sin x > \\sin y\\)']	B	math	函数与导数	['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math_381	OPEN_OnlyTxt	Let f(x) = e^{x^3} - x - ax, discuss the number of zeros of f(x).		When 0 \leq a < b = \frac{1}{a}e^{\frac{1-2a}{3}}, f(x) has no zero; when a < 0 or a = b, f(x) has one zero; when a > b, f(x) has two zero.	math	函数与导数	['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VseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMMcX2hrUS+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math_382	MCQ	<image_1>As shown in the figure, hyperbolic\The left and right focuses of (x^2 - \frac{y^2}{8} = 1\) are\(F_1\) and\(F_2\) respectively, and the straight line passing through\(F_1\) intersects the two branches of the hyperbola at\(A\) and\(B\) respectively.(\(A\) is on the line segment\(F_1B\)),\(\odot O_1\) and\(\odot O_2\) are inscribed circles of\(\triangle AF_1F_2\) and\(\triangle ABF_2\) respectively, and their radii are\(r_1\) and\(r_2\) respectively, then the value range of\(\frac{r_1}{r_2}\) is: ().	['A. \\(\\left(\\frac{1}{3}, \\frac{1}{2}\\right)\\)', 'B. \\(\\left(\\frac{1}{3}, \\frac{2}{3}\\right)\\)', 'C. \\(\\left(\\frac{1}{2}, \\frac{2}{3}\\right)\\)', 'D. \\((0, +\\infty)\\)']	D	math	平面解析几何	['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']	['math_382.jpg']
math_383	MCQ_OnlyTxt	It is known that the general term of the sequence $\{a_n\}$is $a_n = \frac{1}{n^t}$, where $t$is a normal number, and $S_n$is the sum of the first $n$terms of the sequence $\{a_n\}$, then the following statement is incorrect ()	['A. $\\exists$constant $m$such that for $\\forall n \\in \\mathbb{Z}^+$there is a necessary and sufficient condition that $S_n < m$is $t > 1$', 'B. $t < 1$is a sufficient and unnecessary condition for $S_n \\geq \\ln(n+1) (n \\in \\mathbb{Z}^+)$', 'C. For $\\forall n \\in \\mathbb{Z}^+$,$S_n \\leq2 + \\frac{2}{2^t}$is a necessary and insufficient condition for $t \\geq \\frac{3}{2}$', 'D. For $\\forall n \\in \\mathbb{Z}^+$,$S_n \\leq1 + \\frac{3 \\cdot 2^t}{3^t}$is a sufficient and unnecessary condition for $t \\geq \\frac{3}{2}$']	D	math	集合与常用逻辑用语	['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math_384	MCQ_OnlyTxt	"It is known that the equation of the moving circle $C$is $(x-\cos \theta)^2 + (y-\sin \theta)^2 = 0$, where $\theta$is a constant, and $\theta \in [\pi, 2\pi)$has the following two propositions:
① There exists $\theta \in [\pi, 2\pi)$, so that circle $C$is tangent to circle $C_1: (x+\cos \theta)^2 + (y+\sin \theta)^2 = 1$;
② For any $\theta \in [\pi, 2\pi)$, there is a point $P$on the line $l: x\cos \theta + y\sin \theta + 1 = 0$, and there are two points $A$and $B$on the circle $C$, so that $PA \perp PB$. then ()"	['A. ①② are all true propositions', 'B. ① is the true proposition, ② is the false proposition', 'C. ① is a false proposition, ② is a true proposition', 'D. ①② are all false propositions']	C	math	集合与常用逻辑用语	['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Yzxkd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp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math_385	OPEN_OnlyTxt	It is known that the edge length of the cube $ABCD-A_1B_1C_1D_1$is 4, M and N are the centers of the side surface $CD_1$and the side surface $BC_1$respectively, the plane $\alpha$passing through the point M is perpendicular to the straight line ND, and the section obtained by cutting the cube $AC_1$by the plane $\alpha$is denoted as S, so the area of S is ()		7\sqrt{6}	math	空间向量与立体几何	['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']	['img_for_onlytxt.jpg']
math_386	MCQ_OnlyTxt	If a regular triangular prism container $ABC-A'B'C'$is known with each edge length of 4 (unit: dm)(the container wall thickness is ignored), then ()	"['A. A sphere with a diameter of 2dm can be placed into the container', 'B. A regular tetrahedron with an edge length of 3.9 dm can be placed into the container', 'C. An octahedron with an edge length of 1.6 dm can be placed into the container', ""D. If point P is the midpoint of line segment $BC'$, the minimum distance from point A to point P along the surface of the container exceeds 5.6 dm""]"	ABC	math	空间向量与立体几何	['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math_387	MCQ	As shown in the figure<image_1>, in the straight prism $ABCD-A_1B_1C_1D_1$, the bottom surface $ABCD$is a diamond shape, and $AB=AD_1=2$,$\angle BAD=60°$, M is the midpoint of the line segment $D_1C_1 $, N is the midpoint of the line segment $B_1C_1$, and point P satisfies $\overriding {BP}=\lambda\overriding {BC}+\mu\overriding {BBB_1}(0\leq\lambda\leq1,0\leq\mu\leq1)$, then the following statement is correct ()	['A. If $\\mu=1$, the volume of the triangular pyramid $P-DBC$is fixed', 'B. If $\\lambda=\\frac{1}{2}$, there is and only one point P, such that $PD\\perp PB$', 'C. If $\\lambda+\\mu=\\frac{1}{2}$, then $|PN| +| PC| The minimum value of $is', 'D. If $\\lambda=0$and $\\mu=\\frac{1}{2}$, then the section perimeter obtained by plane $DPM$cutting the straight prism is $\\frac{9\\sqrt{5}+7\\sqrt 13}}}{6}$']	ACD	math	空间向量与立体几何	['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']	['math_387.jpg']
math_388	MCQ_OnlyTxt	The triangle formed by the chord of a parabola and the two tangents passing through the endpoint of the chord is called the Archimedes triangle. Given that parabola $C: x^2 = 8y$, Archimedes triangle $PAB$, chord $AB$passes through the focus of $C$$, and point $A$is in the first quadrant, then the following statement is correct ()	['A. The ordinate of point $P$is $-2$', 'B. The directness equation for $C$is $x =-2 $', 'C. if $|AF| = 8$, then the slope of $AB$is $\\sqrt{3}$', 'D. The minimum value for $\\triangle PAB$area is 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math_389	MCQ	The triangle formed by the chord of a conical curve and two tangents passing through the chord is called the Archimedes Triangle. As shown in figure <image_1>$\triangle MAB$is an Archimedes triangle with parabola $E: y^2 = 2px (p &gt; 0)$, the chord $AB$passes through the focus $F$, and $BC$,$AD$are perpendicular to the direcrial $l$, and $C$,$D$are vertical feet, then the following statements are correct ()	['A. A circle with diameter $AB$must be tangent to the direcrimal line $l$to the point $M $', 'B. $\\frac{|CD| ^2}{|AF| \\cdot |BF|}$is the constant value of 4', 'C. $k_{OA} \\cdot k_{OB}$is a constant value of $-4$', 'D. $\\tan \\angle AOB$has a minimum value $-\\frac{4}{3}$']	ABC	math	平面解析几何	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAD6AOoDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKK5Lwxqepan4p8SpLd+fpljOltb/ALtRiTaGkGQOcbgKAOjs9RtNQNwLSdJTbzGCbb/BIMEqffkVarjfAH+u8V/9h6f/ANAjrsqACiiigAoorgrXUrnT/GXivTrzUryS0Wzt7i3BO54i4ZSIxjqWxgY64oA7wsq4yQMnAz3pa8c8f+Jr/wAGaf4Gsru8knuxdxzXcrnLOiABgx7/AH+vfGa9iVgyhh0IzQAtFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAFTU7+HS9Ku7+4bbDbQvK59AoJP8AKuc+Gto1t4KtZZypu7x3vbnB5Dynfg++1lq1rXiPwlLHd6LrGq2Ch0MdxbTTBDtI5zyCPrWnof8AZI0iBdEe2ewUYjNs4dPzBOTQBz3gD/XeK/8AsPT/APoEddlXG+AP9d4r/wCw9P8A+gR12VABRRRQBS1XVbTRdOlv752S3ixuZUZyMkAcKCepFYNhoFvqXi2XxZMkybrdILeGQbchST5jL6ndwD0HPU8dXRQB4x8V/A0viXxPpd5fXbw2011DptqkeCQGV3eQ++4AAegr1bQIL210CxttSZWvIYVimdTkOyjG4fXGfxrA8d/8fHhT/sOwf+gSV2FABRRRQAUUUUAFFFFABRRTZJEijaSR1REBZmY4AA6k0AZniHxBY+GdHl1LUH2xIQqqPvSMeAqjuTWop3KDjGRXjfju/TxINJM0V2iXWs21rZxTWrogj35aXcV2ktt4weF+rV7IOgoAWiik3DdtyM+maAFooooAKKKKACiiigAooqhrMl9FpFydMtvPvTGwhQsFG/HBJJ6ZoA43wKo1rxf4s8TMAY3uhp1t/uQjDH8WOfwqtprHTPjvf6bpyhLK80pbq7iQYVZg+0NjsSMfXNXvCNhr3hfwXZaRBoXmaggZppZ7tFiaRmLM25dzEZP92tjw14WOj3t/q9/cC71nUWDXM4XaqqBhY0HZR78nqaAM/wAAuiz+KwzKD/b0/U/7Eddj5sf/AD0X868x8NeCvDviLU/FN5qumJc3C63PGHZ2GFCoccEepqLTvh74Vm+Imt6dJpKNaQWVrJFF5j4VmaXcfvd9o/KgD1PzY/8Anov50ebH/wA9F/OuS/4VZ4K/6AUX/f2T/wCKo/4VZ4K/6AUX/f2T/wCKoA63zY/+ei/nR5sf/PRfzrkv+FWeCv8AoBRf9/ZP/iqP+FWeCv8AoBRf9/ZP/iqAG+O5ENx4Vw6/8h2Dv/sSV1/mx/8APRfzryvxh8O/ClhP4dFto8cYuNYiglxI53IUckct7Cun/wCFWeCv+gFF/wB/ZP8A4qgDrfNj/wCei/nR5sf/AD0X865L/hVngr/oBRf9/ZP/AIqj/hVngr/oBRf9/ZP/AIqgDrfNj/56L+dHmx/89F/OuS/4VZ4K/wCgFF/39k/+Ko/4VZ4K/wCgFF/39k/+KoA63zY/+ei/nR5sf/PRfzrkv+FWeCv+gFF/39k/+Ko/4VZ4K/6AUX/f2T/4qgDrfNj/AOei/nWJ4i0y71qKC3t9VgtbVZFeeJ4PM88A52E7hhTjkd/pXLa74T+GXhu2E2qafbQbvuR+bI0kh9FQNlj9BXDa/oGnz6VLf2nhWLQNJ4VLq+Mj3k5PAWK33feJ4G4+9AHpPjnTYLt9K1G78RWOl2elXK3aCeIEPIvQE7xkc9BzzSp44v8AV1VPDGgXWpAjBvbgG1ts+oLfMw+gP1rgPgn4ESO71bVNYt4rl7a4FtbLN+88p1GXPIxkZC5HcHFe6AADAGB7UAcX/wAIx4o1nJ1/xO9tA3W00aPyR9DK2XI+mK2tB8JaN4bMr6balZ5gBLPLI0kj/VmJP4Vt0UAFFFFABRRRQAUUUUAFFFFABRRRQB5b4b8N3Wr6n4puIfEeraco1udPJtHQITtQ55U88/pXX+HvCSaDqV7qEmq3+o3d3HHG8l46khULEAYA/vGqHgD/AF3iv/sPT/8AoEddlQAUUUUAFFFFAHH+O/8Aj48Kf9h2D/0CSuwrj/Hf/Hx4U/7DsH/oEldhQAUUUUAFFc1rPjjR9IuvsEby6hqhHy2Finmyn6gcL9WIrivEPiLxTezxWErNp090v7nRtMYSXsi/3pJj8sK+4z9aAO38T+OvDvhGEtq+pRRy7dy26HdK/wBFHP4nArkbXxD42+IHOhWf/CO6I+MahdpvuJV9Y06D6n86f4T+EWn2VymreIIor3Ud29Icl4oifUtzI3+034AV6WzRwxFmKpGgySeAAKAOU0/wt4d8GW1xrV5I093Ghe41S/fzJiMc/Meg7YFYEtzPeWN58QNdt2jtLCB5NH06XjZx8srj/noxwB6A+tXbdH+I2rpezKw8KWMu62iYY/tCZT/rD/0zU9B3PNXPGYOq634e8NR8pPc/bbte3kQ4bB9i+wUAangnR20PwjYWkuTcsnnXDHq0rne5P4k10FA4GKKACiiigAooooAKKKKACiiigAooooAKKKKAON8Af67xX/2Hp/8A0COuyrjfAH+u8V/9h6f/ANAjrsqACiiigAoopskiRRtJI6oijLMxwAPc0Acj47/4+PCn/Ydg/wDQJK68kAEkgAd68p8ceNLPVb7QLTw5GdVu7fWInDplbfeEcBDLjbnnPGeAa6EeEdZ8QkSeLdYZrc9dL00tFBj0d/vv+YHtQBa1Lx9p0F42naRDPrep9Ps9iNyof+mkn3EH1Ofaqg0HxR4lAfxDqn9l2TddN0tyGYejzdfqFwPeus03SrDR7NLPTbOC0t06RwoFH1471y/iDW7/AFfV38K+G5vLugobUL8DIsoz0A9ZD2HbrQBnNNb6bdP4U8AafaxXq/8AH7fbMx2gPd26ySeik/Xiuo8OeFrHw5BIYi9zfXB33V9Od0s7erH09AOBVrQtBsPDmlx6fp0PlxL8zMTlpGPVmPUse5rSoAK4HU55fH2sy6FYyMnh6zfGp3SHH2lx/wAu6H0/vEfSrPiTVr3W9Wbwl4fnaKfaG1K+T/lziP8ACp/56N29BzXUaRpNloelwadp8Cw20C7UUfqT6knknuaALMEEVrbxwQRrHDGoVEQYCgdABXHeGP8AideNvEWvsMxW7rpdqf8AZj+aQj6u2P8AgNbvinWF0DwvqOpkjdBCxjH96Q8Iv4sQPxqPwdo7aD4S07T5ebhIt07ZzulY7nOe/wAxNAG5RRRQAUUUUAFFFFABRRRQAUUUUAFFFQXd3BY2slzcvshjGXbBOB68UAT0VU03U7LWNPiv9OuY7m1lzsljOVbBIOPxBqCfX9LttWj0qW9jF/Iu9bcfM5XOM4HQe9AHP+AP9d4r/wCw9P8A+gR12Vcb4A/13iv/ALD0/wD6BHXTalq2n6NZtd6leQWtuvWSZwo/XrQBcqG6u7axtnubueKCCMbnklcKqj3Jrjv+Et1rxF8nhLR2+zNx/ampq0UI90T77/oPeprTwBb3Nyl94nv59evUO5RcfLbxn/ZhHy/icmgCN/HNzrMht/B+kyann5TqE2YbSM/7x5fHooP1oi8C3GryJc+MNWk1VwciyhzDZp7bBy/1Yn6V2aRpEgSNFRFGAqjAFOoA4rxla29l/wAIlb2sEcEKa5AFjjUKqjZJ0Arta4/x3/x8eFP+w7B/6BJXTanqNtpOmXOoXkgjt7aNpJG9ABmgDB8X6/dWQttG0ULJruokpbgjKwIPvTOP7q/qcCtHw34etfDWkJY2xaRyxknnc5eeVuWdj3JNY3gnTbm4+0eKtWjK6nqoDJG3W2tx/q4h6cfMfc+1dhQAVyvivxFdW08Gg6Gqy69fDMYIyttH0aZ/Ydh3NW/FXiVfD9lEkEJu9UvH8mys0PzSue59FHUnsKj8KeGm0SCa81CYXet3zCS9usfebsi+iL0AoAt+GvDtr4a0lbO3ZpZWYyXFxIcvPKfvOx9SfyrYoooA4rxgV1jxP4d8M8lHnOo3WP8AnlDyoPsZCv5Gu1ri/CWdY8V+I/ELgNEJhptmx/55xffI9jIW/wC+a7SgAooooAKKKKACiiigAooooAKKKKACsTxZKV8PT2yOUlvStpGV6gyELkfQEn8K26wdSttRu/EWmOtnE2n2jtK0hmw28oVUhcdAGbv6UAcf8OdSTQvAE1lHH5txa6nc2Vrb7sGR/MJVRn65J7AE9qb8MbCS68WeLPENxMbmR7kWKzt/EYwPM2+i7sAeyitLR/B2o+Hp9d1GHy728u7y4nsYHk2RwCTuTjOTgA9eBx1Nanw80K98N+ELfTdRjjW8R3eZ45N4kZmLE5wPX9KAOK8N6rr934o8WeH9BfT7V11WWee7unLuisFX5IhjcRt6k45FdppngHTLa7j1HVZp9b1RDlbu/Ifyz/sJ91B9Bn3rk9L8NS6rN4k1TSpltNesdeuGtbgjhhtjzE/qjd/TrXc+FvEsXiOxk3wta6jat5V7ZSH54JPT3B6g9xQBvAAdKKKKACiiigDj/Hf/AB8eFP8AsOwf+gSVB4rH/CR+KtK8KAE2iAalqJHeNG/dxn2Zxz7LU/j0hZ/CpPAGuwn/AMckqPwAp1E6z4nc7v7WvG8gntbxfu4/zwzf8CoA7QDAwKy/EGv2XhvSZNQvWYqCFjiQZeVz91FHdiatajqNppOnz399OsFrAheSRuigVyPh/TrvxRq8fizW4Hhgjz/ZOnyf8sEP/LZx/fYdB/CPegC34V0C8a9l8TeIVVtauk2pCDlbKHqIk9+7Hua62iigArE8X6z/AGB4U1HUQMyxxFYV/vSN8qD/AL6Irbri/FWdZ8YeHfDy/NCkjaneL/sRcRg+xkI/75oA2vCWjDw/4V07TCdzwQjzG/vOeWP4sTW1RRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcb4A/13iv8A7D0//oEdS+KPD94t9H4l8PBV1q2XbJCThL2IcmJvQ/3W7GovAH+u8V/9h6f/ANAjrsqAMnw74gs/Emkpf2ZZeSksLjDwyD7yMOxBrWrifEWk3ug6s/izw/C0spAGp2Cf8vcY/iUf89FHT1HFdTpGrWWuaXBqOnzCa2nXcjD9QR2I6EdqALtFFFAHmnxtv30zwppt5ECZY9STy8f3jFKB+pFdr4fsIdA8K6fYs6pHZ2qI7k4HC/MT+OTXG/GS2F5ovh62IyJdetUP47hVnUJpfH+rS6JZSMnhyycLqNyhx9qkH/LBD/d/vH8KAC0jf4iaumo3CMvhayl3WcLDH26VT/rWH/PMH7o7nmu/6DAqOCCK2gjggjWOKNQqIgwFA6ACpKACiiigAri/BuNY8Q+IfExyY5rj7Ba5/wCeUOVJHsXLn8K1vGmsSaF4Q1G/txm6WLZbrjJaVyFQY7/MRVjwxo6aB4a0/S0HNvCquf7z9Wb8WJP40Aa1FFFABRRRQAUUUUAFFFFABRRRQAVz2r3Hi6O/ZdI0/SZrTaNr3N06OT34CEfrXQ0UAch9s+IP/QI8P/8AgdL/APG6PtnxB/6BHh//AMDpf/jddfRQByH2z4g/9Ajw/wD+B0v/AMbo+2fEH/oEeH//AAOl/wDjddfRQB5P4MuvGqy+I/semaK5OsTGbzbuRdsm1MhcIcr05rqftnxB/wCgR4f/APA6X/43TPAH+u8V/wDYen/9AjrsqAOQ+2fEH/oEeH//AAOl/wDjdcfdJ448EXeo+IbbSNKOnXBEl5YW9xI6q/eZRsBHH3sZz1xXr9Iyh1KsAQRgg96AOKtNX8c39nFd2mneHJreZQ8ciX8pVlPQg7Kn+2fEH/oEeH//AAOl/wDjdZ0gk+G+qNOgZvCV5LmVBz/ZsrH7w9Iieo/hNd8jrJGrowZGGVZTkEetAHhvxkvfFi+FbCTV7PTbWCPUonSSyupGkDhXx1QY78/Su00L/hMLDQrK30jRfDiaesSmDZfSkFSMg52c5znPfNU/jbKkHhzQ5ZQGjTW7ZmB6EAPmtfwFK+mNqPhK4J3aTIDaMx5ktXy0Z99vzJ/wGgCb7Z8Qf+gR4f8A/A6X/wCN0gvfiCemkeH/APwOl/8AjdULfUbjxz4w1Gwilli8PaO4hn8pihu7jqVLDnYvcDGT1yKq+MBF4Y8X+ELjRo1tZL6/+x3MEPypNE2MllHBK5yD1oA2vtnxB/6BHh//AMDpf/jdH2z4g/8AQI8P/wDgdL/8brr6OlAHkuu3PjTW/FukaLJp2jCaxYaq8aXchRgp2IGOzj5myBg/drq/tnxB/wCgR4f/APA6X/43UXgj/ib6v4g8TsMi7ujaWp7eRDlQR9W3muYgu9CvfiD4svdW1XyNMsPLt44TfvEplC5kYKGGTnjjvQB1n2z4g/8AQI8P/wDgdL/8bo+2fEH/AKBHh/8A8Dpf/jdaGgeH7bS725v7SS7EF5DFiC4uHk8sjcSRuJxnIyPat+gDkPtnxB/6BHh//wADpf8A43R9s+IP/QI8P/8AgdL/APG66+igDkPtnxB/6BHh/wD8Dpf/AI3R9s+IP/QI8P8A/gdL/wDG66+igDzrxJfeMo9BuX1Oz0O0tlXmeLUpkdD2KlUznPQd+mDXn/hHxD8aJJFjh06S9tc/K2pwiIBfXcdrH9a9r8U6pdaJoNzqltp8d99kQzPE0uw7RySvynJAz6VHouu3mtzx3Nvpyros0PmQ3jTfPIeMYjxwpycHPbpzQBb0SXWpbENrlrZ2913W1maRT+ajH61p0UUAFFFFABRRRQAUUUUAcb4A/wBd4r/7D0//AKBHXZVxvgD/AF3iv/sPT/8AoEddlQAUUUUAR3FvDdW8lvcRrLDIpR0cZDA9QRXC2FxN8PtVi0e+keTw3dybdPunOTaOT/qHJ/g/uk/Su+qpqWm2mr6dPp9/As9rOmySNuhFAHA/GjTjq/hjS7BM759SRUI/veVLt/XFRXep40jwr8QoQf3cCW2oqvTyJMBif9x8H86zdVk1XQ9b8MeGNVMt1bJrEMun6i3/AC0iCuPLk/213AZ/iHNdJ4Vs4l/4SbwVexj7NBM7wIeN1rOCwA9gxdfwoAz/AADLF4O/t7StY8yCZ9QlvIZmjYrcxPgqyMAQx45Uc+1X7DSL/wAU+OYPFGp28trpmnRlNKtZhtkd2+/M69VyMAA88AkCr3gC9mGl3OgXzbr/AESX7I7N1kjxmJ8e6Y/EGuvoAK57xxq0mjeEb64tyftkii3tVHVppDsTH4nP4V0NcVr/APxOviDoOiY3W9gjarc/7w+SIf8AfRY/8BoA1LZbTwR4IghkP7uwtAuFHzSMq8gDuSc/nXN/DnQLPUfhyq6nBHLcajLLc3YZRuV3ctg5GQQNtei4oxigBAAAAOgpaKKACiiigAooooAwNXj1bVLqbSFs1i0uaICW+E43EHO5AmMgkYGc9Ce4FVPAGn61o/hm30rV4YozZL5ETJJvMignDew27Rjrwa6qigAooooAKKKKACiiigAooooA43wB/rvFf/Yen/8AQI67KuN8Af67xX/2Hp//AECOuyoAKKKKACiiigDg/ijpkOsWXh7T52kWO41qFC0bbWX5JOQexHWuVvNcv/CvizTLjX2Jv7BTazXIGF1Cxc/60ejRtgsvuT0rtvHf/Hx4U/7DsH/oElaHjHwjYeMtCl069BR8FoJ1+9C+MZHt6juKAMfxCR4f8Y6T4niP+h323Tr8g/KAxzDIfox259GruK8o8I/aNR0DU/hn4rymo2kBihl7T25+5IhPUqcfkO+a7HwLrE+q+HVivht1LT5GsrxSf+WkfG7/AIEMN+NAHTE4BJ7VxngQHU7vXfE7HempXhjtW9beHKIR6Anc341e8e6rLpPhC8e2Gby522lsB1Msp2L+Wc/hWroWkw6FoNjpVvkxWkCxKT1OBjJ9z1oA0KKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigA6UgdT0YH8a890+9uPH3i/VI2llj8OaPN9mEUbFftlwPvbyOSi/3ehyM56Vvz+DNLGqaXe2FrDZfZJzJIkC+Wso2MAGA4bDFSM9MUAUfAH+u8V/8AYen/APQI67KvMPDHim20XUvFNtLp2r3LNrc777PT5Z0HyoMblBGeOlbifEvSXu5LVNL19riJVeSIaTMXVTnBI25AODj6GgDs6K5L/hYNl/0BPEn/AIJp/wD4mj/hYNl/0BPEn/gmn/8AiaAOtorkv+Fg2X/QE8Sf+Caf/wCJo/4WDZf9ATxJ/wCCaf8A+JoAZ47/AOPjwp/2HYP/AECSuwryvxj40tLufw4V0nXY/J1iKU+bpcybgEcYXK/M3PQc9a6f/hYNl/0BPEn/AIJp/wD4mgCfxf4YfW7eC+06RbXXbAmWxusdG7o3qjdCK4rw74ri/wCE6ivZoms7jVNunarZOcG3vIwTG/urruUHvgV13/CwbL/oCeJP/BNP/wDE15z8S4bXxRCNU0PSfEdprsIXDjSJ1W4VSCqsdvUEAg9v5AHf6znWviRo2lD57XS4m1K5HUeYfkhB9/vsPpXaV538KbuXWLfWdc1HbHrF3dCO6tTkPbiNQqoynkH7x59a9EoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACg8iiigDzHwpPJ4A1LXNJ1qzultLq/kvbO/hgeWORXx8jbQdrDHfrXfadqT6kzyx2s0VoANkk6GNpD7IRkD3OM1oUUAedeEPEeh6TfeKrfUdYsLOY65O4juLhI2K7U5wT04NW/DepWOq/E3xFc6deW93B9gs18yCQOuQ02RkcZpngnStPvbvxVLdWNtPINdnUNLErHG1OMkV2lrp9lY7vslpBb78bvKjC5x64oAs0UUUAFFFFAHH+O/+Pjwp/2HYP8A0CSuwrj/AB3/AMfHhT/sOwf+gSV2FAEVy6x2srvL5SKhLSZHygDk815IniXxFb/C2TxdNr032ySZnsrWaGLZNH5m1EKhAxJHOQe9dZ8U9Taw8CXlrC4F3qRWwtwTjLSHafyUk1xniHSNJ0TXfB1p4TWGTXYrqOOVIm3j7OBh2kGSFHTng9cUAdrqfhu81AWviTRmXS/EQgUyKwzFOMZMUo7+gbqKv+HPF0GtTSadeW76drduP9IsJj8w/wBpD/Gn+0K6MdKxPEXhbT/E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math_390	MCQ_OnlyTxt	The straight line $l$passes through the focus $F$of the parabola $C: y^2 = 2px\ (p > 0)$, intersects the parabola $C$at the two points $A$and $B$, and intersects the $y$axis at the point $M$. If $\overriding {FM} = 3\overriding {FA}$,$|FB| = 5$, then $|AB|  =$（ ）	['A. $\\frac{25}{3}$', 'B. $\\frac{15}{2}$', 'C. $\\frac{20}{3}$', 'D. $\\frac{35}{6}$']	A	math	平面解析几何	['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math_391	MCQ_OnlyTxt	It is known that the point $P$is the point above the ellipse $\frac{x^2}{9} + \frac{y^2}{5} = 1$, and $F_1$,$F_2$are the left and right focuses of the ellipse. If $\angle F_1PF_2 = 60^\circ$, then the following statement is correct ()	['A. The area of $\\triangle F_1PF_2$is $\\sqrt{3}$', 'B. $\\triangle F_1PF_2$The area of the inscribed circle is $\\frac{\\pi}{3}$', 'C. The ordinate of point $P$is $\\frac{5\\sqrt{3}}{6}$', 'D. If the point $M$is a moving point on the ellipse, the maximum value of $\\overline{MF_1} \\cdot \\overline{MF_2}$is 9']	B	math	平面解析几何	['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math_392	MCQ_OnlyTxt	It is known that \( F_1 \) and \( F_2 \) are the common foci of the ellipse \( \frac{x^2}{a_1^2} + \frac{y^2}{b_1^2} = 1 \) and the hyperbola \( \frac{x^2}{a_2^2} - \frac{y^2}{b_2^2} = 1 \). Let \( M \) be a common point of the ellipse and the hyperbola, with \( |F_1F_2| = 2\sqrt{3} \), the radius of the circumscribed circle of \( \triangle F_1MF_2 \) is 2, and \( 0 < \angle F_1MF_2 < \frac{\pi}{2} \). Denote the eccentricity of the ellipse as \( e_1 \) and that of the hyperbola as \( e_2 \). Then which of the following statements is correct? ( )	['A. $a_1^2 - b_1^2 = a_2^2 - b_2^2$', 'B. $3b_1^2 = b_2^2$', 'C. $3e_1^2 + e_2^2 = 4e_1^2e_2^2$', 'D. The minimum value of $e_1^2 + 3e_2^2$is 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math_393	MCQ	"Design a beautiful ribbon whose shape can also be regarded as <image_1>part of the curve\( C \) in the figure. It is known that\( C \) passes through the origin of coordinates\( O \), and the point on\( C \) satisfies: the abscissa is greater than\(-3\), and the product of the distance to the point\( F(3,0) \) and the distance to the fixed line\( x=a \)(\( a&lt;0 \)) is 9, then the correct number of the following statements is ()

① \( a = -3 \);
② If the point\( (x_0, y_0) \) is on\( C \), then\( x_0 \leq3\sqrt {2} \);
③ The maximum value of the ordinate of the point in the first quadrant must be greater than\( \frac{3}{2} \);
④ When the point\( (x_0, y_0) \) is on\( C \),\( y_0 &lt; \frac{9}{x_0 + 3} \) is satisfied."	['A. of 1', 'B. of 2', 'C. of 3', 'D. of 4']	C	math	平面解析几何	['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math_394	MCQ_OnlyTxt	It is known that the three pockets numbered 1, 2, and 3 have exactly the same balls except for the color. Among them, pocket 1 has two No. 1 balls, one No. 2 ball and one No. 3 ball; pocket 2 has two No. 1 balls and one No. 3 ball; pocket 3 has three No. 1 balls and two No. 2 balls. For the first time, take out 1 ball from pocket No. 1, put the removed ball into the pocket with the same number as the ball, and for the second time, take any ball from the pocket. The following statement is incorrect ()	['A. The probability of getting ball number 3 the second time is\\(\\frac{11}{48}\\)', 'B. If you get ball No. 1 the second time, the probability that it comes from pocket No. 1 is highest', 'C. Under the condition of getting ball No. 2 for the first time, the probability of getting ball No. 1 for the second time is\\(\\frac{3}{4}\\)', 'D. If you place 6 different balls in these 3 pockets, with at least 1 in each pocket, there are 540 different distribution methods']	D	math	计数原理与概率统计	['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math_395	MCQ	"Newton, a famous British physicist, used the method of ""making a tangent"" to find the zero point of the function. As shown in the figure<image_1>, make a tangent to $f(x)$at the point with the abscissa of $x_1$, and the abscissa of the intersection of the tangent and the $x$axis is $x_2$; repeat the above process with $x_2$instead of $x_1$to get $x_3$; go on, you get the sequence $\{x_n\}$, which is called the Newton sequence. If the function $f(x) = x^2 - x - 6$,$a_n = \ln \frac{x_n + 2}{x_n - 3}$and $a_1 = 1$,$x_n &gt; 3$, and the sum of the first $n$terms of the sequence $\{a_n\}$is $S_n$, then the following statement is correct ()"	"['A. $x_{n+1} = \\frac{x_n^2 + 6}{2x_n - 1}$', ""B. $x_4 = x_1 - \\frac{f(x_1) - f(x_2)}{f'(x_1)} - \\frac{f(x_2) - f(x_3)}{f'(x_2)}$"", 'C. Sequence $\\{a_n\\}$is a decreasing sequence', 'D. $S_{2025} = 2^{2025} - 1$']"	ABD	math	数列	['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']	['math_395.jpg']
math_396	OPEN_OnlyTxt	"If the finite sequence of $n$terms $\{a_n\}$satisfies $a_1 = a_n$,$a_2 = a_{n-1}$,...,$a_n = a_1$, that is,$a_i = a_{n+1-i+1} (i = 1, 2, \cdots, n)$, then the finite sequence $\{a_n\}$is called a ""symmetric sequence"". It is known that the sum of the first $n$terms of the increasing sequence $\{c_n\}$is $S_n$, and $4S_n = c_n^2 + 4n$. The combination numbers $C_n^0, C_n^1, C_n^2, \cdots, C_n^n$are symmetric and just form a ""symmetric sequence"". Mark $P_n = C_n^0 + c_1C_n^1 + c_2C_n^2 + \cdots + c_n C_n^n$, and find $\sum_{i=1}^n P_i$."		$\sum_{i=1}^n P_i = (n-1)2^{n+1} + n + 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math_397	OPEN_OnlyTxt	"Given the hyperbola $C: frac{x^2}{2}-frac{y^2}{4}=1$, the point $P_0$ with an x-coordinate of 2 is on $C$ in the first quadrant, and the slope of the line $P_{n-1}P_n$ is $k$. When $n in mathbb{N}^*$, the line parallel to $P_{n-1}$ intersects the left branch of the hyperbola $C$ at point $M_n$, and the perpendicular line from point $M_n$ to the y-axis intersects the right branch of the hyperbola $C$ at point $P_n$, which is different from point $P_{n-1}$. Let $S_n$ denote the area of triangle $P_{n-1}P_nP_{n+1}$, and the sequence ${S_n}$ is a constant sequence. Is this statement correct? (Fill in ""yes"" or ""no"")."		yes	math	数列	['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math_398	OPEN_OnlyTxt	The known point $M_nleft(sqrt{3}b_n, -frac{1}{2}b_nright)$ in the ellipse $C_n: frac{x^2}{a_n^2} frac{y^2}{b_n^2}=1(a_n>b_n>0)$, $A_n, B_n$ are the left and right vertices of $C_n$, respectively, $P_n, Q_n$ are the two moving points on $C_n$ that are different from $A_n, B_n$, and the array ${a_n}$ of the long semi$a-axis of $C_n$ satisfies the following properties: when the slope of the line $A_nP_n$ $k_{A_nP_n}$ and the slope of the line $B_nQ_n$ $k_{B_nQ_n}$ always satisfy $k_{A_nP_n }=3k_{B_nQ_n}$, the line $P_nQ_n$ intersects the $x$ axis at the point $D_n(-a_{n 1}, 0)$. Definition: The sum of all terms of an infinitely proportionally decreasing sequence ${d_n}$ is $S=sum_{n=1}^{infty}d_n=frac{d_1}{1-q}$, where $d_1$ is the first term of ${d_n}$, $q$ is the common ratio of ${d_n}$, and $0<q<1$. Let $O$ be the coordinate origin, $a_1=2$, and $S_n$ be the area of the quadrilateral $B_nP_nQ_n$, and find the maximum value of $sum_{n=1}^{infty}S_n$.		\frac{4\sqrt{3}}{3}	math	数列	['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math_399	OPEN	In the planar rectangular coordinate system $xOy$, the ellipse $C: \frac{x^2}{a^2}+\frac{y^2}{b^2}=1 (a>b>0)$The left and right focuses are $F_1$,$F_2$respectively, the eccentricity is $\frac{1}{2}$, the passing through $F_1$and the tilt angle is $\theta The straight line $l$of (0<\theta<\frac{\pi}{2})$intersects $C$at two points $A$and $B $(where point $A$is above the $x$axis), and the circumference of $\triangle ABF_2$is 8. Now fold the plane $xOy$upward along the $x$axis. After folding, the corresponding points of the two points $A$and $B$in the new image are recorded as $A_1$and $B_1$respectively, and the dihedral angle $A_1-F_2-B_1$is a straight dihedral angle, as shown in the figure<image_1>. Explore whether there is a $\theta$that causes the circumference of $\triangle ABF_2$to be $\frac{15}{2}$? If it exists, find the value of $\tan \theta$; if it does not exist, explain the reason.		exists,\tan \theta = \frac{3\sqrt{355}}{14}	math	空间向量与立体几何	['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math_400	OPEN	As shown in Figure (1)<image_1>, the parabola $E is known: The focus of x^2=2y$is $F$, and the directirix is $l$. The moving straight line $m$and $l$that pass through the point $F$intersect at two points $A$and $B$(where the point $A$is in the first quadrant). The circle with the diameter of $AB$and the directirix $are tangent to the point $C$, and $D$is any point on the chord $AB$. Now fold $\triangle ACB$along $CD$into a straight dihedral angle $A'-CD-B$, as shown in Figure (2)<image_2>. When $\angle A'CB$is minimum, and when the distance between the two points $A'$and $B$is minimum, place a cylinder inside the triangular pyramid $A'-BCD$, so that the bottom of the cylinder is on surface $BCD$, and find the maximum value of the cylinder's volume.		\frac{6-4\sqrt{2}}{27}\pi	math	空间向量与立体几何	['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']	['math_400_1.jpg', 'math_400_2.jpg']
math_401	OPEN	<image_1>As shown in the figure, the point $O$is the center of a regular hexagon $ABCDEF$with a side length of 1, and $l$is any straight line passing through the point $O$. Fold the regular hexagon along $l$onto the same plane, then the maximum value of the area of the folded figure is ()		$6\sqrt{3}-9$	math	等式与不等式	['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math_402	MCQ	"<image_1>The figure shows the relationship between the speed $V(x)$(unit: meters/minute) and the time $x$(unit: minutes) within 15 minutes from a certain time when a certain drone is flying. If the ""speed difference function""$v(x)$is defined as the difference between the maximum speed and the minimum speed of the drone in the time period $[0, x]$, then the image of $v(x)$is ()"	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	C	math	函数与导数	['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UvEXxe8J+F9bn0jUp7oXcG3zBHblgMgEc9+CKAO7orGXxTpbeEf+EnEkn9mfZjc7/LO7YBn7vXNc1oPxi8I+I9attJsJ7s3VyxWMPblQTgnr26UAd9WX4k1VtC8M6pqyRCVrK1knEZOAxVScZ/Csjxf8RPD/gia1h1mWdHuVZoxFCX4Bwc/nRpWu6D8TvCeox2Mtw1hOJLOcshjcZXnGfZutAFzwT4ifxX4O03XJLdbeS7jLNErZCkMVOD6cZrfryLQPit8PfCumWvhyxutRaGzYwo8luSWO45JPHcnsPpXoXibxXpXhLRRq2qySral1QGOMsSW6cUAbdFch4S+Jfhzxtfz2WjzXDTwxecyywFBtyBnPTqRVPxH8XfCfhfW59I1Ke6F3AF8wR25YDIDDnvwRQB3dFY1r4p0u88J/wDCSxSSf2b5DXG4xkNsXOfl654Nczofxk8IeIdatdJsZ7s3Vy2yMPbkAnBPJ7dKALnjjxxL4R1Xw3Zx2SXC6vei2dmcqY1yoyPU/P8ApXZ15r8U9R8GWGpeHZ/FM99HPaTtdWi2qZDFSuQ/HTIX0NdV4S8Z6P41sJrzRpJnihk8p/NjKENjPf60AdBRXm958cvBVjqE9lNcXnmwytE+LViMg4Ndd4l8VaX4T0T+19UkkW03qgMcZYkt04oA2qK47wn8TfDfjTUZbDR5rhp44/NYSwlBtyB1/GoPEvxZ8LeE9ak0nVJrpbqNVZhHAWABGRzQB3FFYtl4q0q/8Jf8JPBLIdL8h7guYmDBUzu+Xrn5T9a5jRvjP4P17WLXS7Ke7NzdOI4w9uQCfc9qAPQaK5jxf4+0LwQLX+2pZ0+1bvLEURfO3Gc/mKl8I+NtG8bWdxdaNJM8dvII5PNiKEEjI69aAM7x544l8HXOgxRWSXI1O9Fs5ZyuxcgEj35rs68X8aeP/hvrur2dtq93qiz6NfGRPIgIUupwQcjlcr7GvZYpUnhSWM5R1DKcYyDzQA+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAbJGJYnjb7rqVOPQ14b+z9E2jar4q8P3Y23tvMhZTxkKWUn6cj8xXulcbrngCO98UQeJ9G1F9H1qNdkkyRCSO4XpiRMjdx3z2HoMAHIftD2y3XhLSYkXfdPqCpCo6nKsCB+lVPjnoNyvgLQNQ5ll0d0SZvZlUE/99Kv516DD4Nku9ftNa8Q6mNUubIH7HCtuIYIGPVwm5iW9yTjtXSXtlbajYz2V3Cs1tOhjkjcZDKRgigCLSbuO/wBHsryJw0c9ukqsO4ZQQf1rxr4XWD6z8Y/F/igc2kM0sETf3mZ+MfRV/UV3Fj4F1fSNHbQ9K8Vy2+kfMsaPaCS4hRuqpKWwOpwSpIro/DnhzTfC2jRaXpcPlwR5JZjlpGPVmPcmgDzPxNBDc/tNeF4p4kljbSXyjqGB4uexr1T+xNK/6Bll/wCA6/4V5f4g/wCTn/Cv/YJf/wBBua9eoApppOnRyiVNPtVkByHWFQQfXOKnntoLqPy7iCOZM52yIGGfoalooAht7O2s1Zba2hgDckRIFz+VRTaXp9xKZZrG1kkPV3hUk/iRVuigBjRRvEYmjRoyNpQjII9MVDBp1jayeZb2VvC+Mbo4lU4+oFWaKAK9xY2d4VNzaQTlehljDY/OpIYIbeIRQRJFGOiIoUD8BUlFAFRdK05JhMtharKDuDiFQ2fXOKmntoLqPy7iGOZM52yKGH5GpaKAILeytbMMLa2hgDdfKjC5/KmTaZYXMplnsbaWQ9XeJWJ/EirVFADGijaIxNGhjI27COMemKgg02xtZPMt7K2hfGN0cSqfzAq1RQBBcWNpebftNrBPt+75sYbH50+GCG2iEUEUcUY6LGoUD8BUlFAFQaVpwl80WFqJM7t4hXOfXOKnnt4LqPy7iGOaPOdsihh+RqSigDyPx9ZvZ/FHwENOtmgha5bzPs6bVPK5zt46evavUp9MsLmUyXFjbSyHgtJErH8yKyNb8YaXoOv6No14s7XWqyGO3MaAqpGBliTx1A4zXQ0AM8qPyfK8tPKxt2bRjHpioINNsLWTzLeytoZMY3RxKp/MCrVFAEFxZWl5t+02sM+37vmxhsfTNPgt4LWIRW8McUY52xqFH5CpKKAKn9lad53nfYLXzc7t/kruz65xU89vDcxGK4hjljPJWRQw/I1JRQBBb2VpZ7vs1rDBu6+VGFz+VMn02wupPMuLK2mfGN0kSsfzIq1RQAwRRiLyhGvl427McY9MVBBplhbSiWCxtopB0aOJVP5gVaooAguLK1vAoubaGfb93zYw2PzrB8a24tfh34hjsIRCw0+cosC7Tu2HoB3rpapavqdvo2j3up3Qc29pC88gQZbaoJOB68UAcZ8JtKtn+GWhTXlhEboxuxeaEb/9Y2DkjPTGPwrvJoIbmIxTxRyxnqjqGB/A1n+HNds/E3h+z1nTxItrdIWjWVQrDBIIIBPcGtSgCC3sbSzLfZrWCDd18qMLn8qZPptjdSeZcWVtM+MbpIlY4+pFWqKAGLFGkIiWNBEBtCBRjHpioIdM0+2lEsFjbRSDo6RKpH4gVaooA8l+MltPc+IvASxQySp/awDhULD70fX8M/rXqsFtBax+XbwRwpnO2NAo/IVieJPGGleF77R7TUROZNUufs9uY0DBWyBlueB8w6Z610FAFRtK055TK1hatITuLmFSSfXOKnmgiuIjFPEksZ6q6hgfwNSUUAV7ews7Nma2tIIC3BMUYXP5Ulxp1jdSeZcWVvM+MbpIlY4+pFWaKAGLFGkQiSNVjAwEAwAPTFV4tL0+CUSw2NrHIOjpCoI/ECrdFAENxZ2t4oW5toZwpyBKgbH50tvbW9rH5dvBHCmc7Y0CjP0FS0UAeQfGbTs6p4OltLL531dfMeKLljlcZIHPf9a9f6Vz3ifxjpfhSbS4tSWctqNyLaHykDbWOOWyRgcjpmuhoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDyHxB/yc/wCFf+wS/wD6Dc169XkPiD/k5/wr/wBgl/8A0G5r16gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDjPFfgibxF4w8M65HexwppExkkiZCTIMgjB7dK7OvN/HnibV9I+IngvTLG7MNnf3DLcxhQfNGVGCSM9z0r0igAooooAKKKKACiiigAooooAKKKKACsvxJpTa74Z1TSUlET3trJAJGGQpZSM4/GtSsPxlf3Ol+Cdcv7OTy7m2sZpYnwDtZUJBwfegBngnw7J4U8HaboctwtxJaxlWkVcBiWLHA9OcVv1yfwz1e+174daNqWpTme8mjbzJCAC2HZQePYCusoAKKKKACiiigDjPHHgeXxdqvhu8jvUt10i9FzIrIWMi5U4Hofk/Wuzrzf4n+J9X8P694Mg0y7MEV9qQiuV2KfMTdGNpyOBhj0r0igAooooAKKKKACiiigAooooA4zx74Im8Y3GgSxXqW39mXy3Lh0Lb1yMge/FdnXm/xV8T6v4dvPCiaXdm3W81JYrgBA3mJlflOR05PSvSKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA8h8Qf8nP+Ff+wS//AKDc169XkPiD/k5/wr/2CX/9Bua9eoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAwtZ/4Rr+3NH/tf7F/anmN/Z3nY8zdxnZ+lbtec+OvC+r6x8QvBmqWNqJbPT7hmupN6jyxlTnBOT0PTNejUAFFFFABRRRQAUUUUAFFFFABRRRQAVU1T7D/AGVd/wBp+V9g8lvtHnfc8vHzbvbGat1ieMdPudV8F63p9nH5lzc2M0USZA3MyEAZPvQBZ0D+yP7Cs/7B+z/2Xs/0f7P9zbk9Pxz+NaVcp8NdGvvD/wAPNH0vUofJvII282PcG2kuzAZHHQiuroAKKKKACiiigDD1/wD4Rv7dpH9u/YvtP2kf2f8AacbvO4xsz36fp7VuV5z8TfC2r+Itd8HXGmWwmi0/URLcsXVfLTch3cnnhT05r0agAooooAKKKKACiiigAooooAwvEX/CNebpn/CQ/YvM+1L9h+04z53bbnv0rdrzn4p+FtX8SXnhWTSrYTrZakstwd6rsTK/NyeRwenNejUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB5D4g/5Of8K/8AYJf/ANBua9eryHxB/wAnP+Ff+wS//oNzXr1ABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHFeLPG9z4d8ZeGNDhtIpYtXmaOWR2IZBkAbcfXvXa1z2ueENL13X9G1i8aYXWlSF7cI+FYnB5HfpXQ0AFFFFABRRRQAUUUUAFFFFABRRRQAVl+JdVfQvC+qatHEsr2VrJOqMcBiqk4P5VqVS1fTbfWdGvdMuiwt7uF4ZCpwdrAg4P40AZngfxDL4r8GaZrc8CQS3UZLxoSVBDFTjPbjP410FZfh3QrPw14fs9H08ubW1QqhdtzHJJJJ+pNalABRRRQAUUUUAcV468b3HhHVvDNnDZxXCatfC3lZ2IKLlRlcd/n7+nvXa1z3iTwfpfie+0e71EyiTS7n7RbiN9oLZBwfUfKK6GgAooooAKKKKACiiigAooooA4rx/43uPB1z4fit7OK4Gp3y28hkYjYmQCRjv836V2tc94n8H6X4ql0uTUmlDadci4h8t9uWGOD6jgV0NABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAeQ+IP+Tn/Cv/AGCX/wDQbmvXq8h8Q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8wGeaoav8VvBeh6nNp19rSLdQnEipE7hTjOMqCM0AdnRXn/8AwuzwB/0Gz/4DS/8AxNH/AAuzwB/0Gz/4DS//ABNAHoFFef8A/C7PAH/QbP8A4DS//E0f8Ls8Af8AQbP/AIDS/wDxNAHoFFef/wDC7PAH/QbP/gNL/wDE0f8AC7PAH/QbP/gNL/8AE0AegUV5/wD8Ls8Af9Bs/wDgNL/8TR/wuzwB/wBBs/8AgNL/APE0AegUV5//AMLs8Af9Bs/+A0v/AMTVzSvix4L1rVLfTbHWBJdXDbIkMEi7m9MlcUAdpRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRVPUZ723tS1hZC7n52o0ojH4k54/CgDx/9nb/jy8Tf9fqfyaus+NWlTar8LtUWBC8lsUudo/uow3H8FLH8KyPhP4Q8UeB21KDVLG1lhvpll8y3uQTGRkHIIGRzXqk0MdxBJDMgeKRSjqw4YHgigDi/hDdpefCvQnU8xwtEw9CrsP6Vwnji2bWP2i/CtnGNxtEhuHx/CEdpOf8AvkfnXVaF4f8AEvw8N5puhafBrWizytNapJdiCW2ZuqtkEMvTkc9eK0/CXgu4sNf1DxVr8sNx4g1ABT5OfLtohgCNM9eAuTjt9cgHn+vWZ0f9p/SNQkGItSjUqx6bvKMWP/HR+dexeI7lbPwzqtyxAEVpK+T7IaxPHngkeLrK0mtLgWes6dMJ7G6IyFcc7W/2SQPy/A5WsWfjfxho7aBe6bZaNbTgJfXqXfnF0zyIkA4z/tdAaAOf/Zz0p7TwXf6jIpX7bd4TPdEUDP8A30WH4VU+GOi6VrHxD+JP9p6bZ3vlar+7+0wLJszLcZxkHGcD8q9f0XR7PQNGtNK0+Py7W1jEaAnJOO5Pcnqa8u+EH/JQ/id/2FR/6NuKAPQ/+EK8K/8AQt6R/wCAUf8AhVqw8OaHpdx9o0/R7C0nwV8yC2RGwe2QK06KAM3UPD2i6tOs+o6RY3kqrtD3FukjAemSOnJq1a2FnY2Ys7S0gt7YAgQxRhUGevA4qxRQBjQ+EfDdvOk8Hh/S45o2DJIlpGGUjoQccGruoaTp2rRJFqVha3kaHcq3ESyBT6gEVcooApado+maQrrpunWlmshBcW8Kx7sdM4HNVbnwp4dvbmS5utB0yeeQ7nkktEZmPqSRk1r0UAV5rCzuLE2M9rBJaFQhgeMFCo6DaeMcVUsfDmh6XcfaNP0fT7SfBXzILZEbB7ZArTooAztQ8P6Nq0yzajpNjeSqu1XuLdJCB6ZI6VYstPs9OtRa2NpBbW4yRFDGEUZ68DirNFAGNF4S8NwXCXEWgaXHMjb1kW0jDK3qDjrV3UNK07Voli1KwtryNTuVLiJZAD6gEVcooAo6doulaR5n9m6baWfmY3/Z4Fj3Y6ZwOar3Xhbw9fXL3N3oWm3FxIcvLLaozMfckZNa1FAFeWws57E2M1rBJaFAhgeMFNo6Db0x7VTsfDWhaZci5sNF0+1nUECWC2RGAPXkDNalFAGdqGg6Pq8qS6lpVleSINqtcW6yFR6AkVj6N4g8PJ4nvvBul2f2a4sYhNJHFAscOGxnGO/IzxXU1xml+CJ9P+J+r+LGvI3gvrdYlgCncpG3OT0x8v60AbSeEPDUcyzJ4f0pZVbcrrZxgg9c5x1q9qGmWGqwCDUbK2u4Q24R3ESyKD64I61booAo6domlaR5n9m6bZ2fmY3/AGeBY92OmcDmq934W8PX9y9zeaHptxPIcvLLaozN9SRk1rUUAV2sLNrD7A1rAbPZ5f2cxjy9v93b0x7VTsvDWhaZdLc2Gi6fa3CggSwWyIwB68gZrUooAz9Q0HR9XkSTUtKsrx0G1WuLdZCo9ASKnsdOsdLt/s+n2dvaQZLeXBGEXJ74FWaKAMZfCPhtbgTr4f0sTBt4kFpHuDZznOOtX7/TLDVYBBqNlb3cIbcI7iJZFB9cEdatUUAZ+naFpGkPI+m6XZWbSABzbwLGWA6ZwOaivPDGgajdPdXuiadc3D43SzWqOzY45JGa1aKAOY8YeIvD/gvw1E+sWudMllWzW3igV15UkArwNuFP5VpWfhjQNPukubLRNOtrhPuyw2qIy/QgZrB+Jngibx94ctdLgvY7Rob1LkyOhYEBXUjA7/Pn8K7OgChqOh6Tq7I2paXZ3jRghDcQLIVHtkcVLYabY6XbfZ9Ps7e0g3FvLgjCLk9Tgd6tUUAYv/CIeGjN53/CPaV5u7dv+xx5z1znHWm+K77w7p2hvceJvsZ09GB2XUYcM3YKpByevSuR8Y/Fyy0i9/sPw3bnW9fkfy1ggyyRt33EdSPQdMHJFZGhfCvVPEupp4h+JF615c53RaYjfuoh2DY4/wCAj8SeaAMG2udc+Id1cWfgPRbbwz4dkbyrjVEt1ilmUdRlQD/wEH6kZrqPCnhjwBoXiafwWNMGo60luLq4ur63WQOOOATnb94HAH4mvU7e3htbdILeJIoYxtSNFCqo9ABXIW/giaD4sXfjI3sZgnsRbC32HcG+UZz0xhf1oA1v+EK8K/8AQt6R/wCAUf8AhR/whXhX/oW9I/8AAKP/AArdooAwv+EK8K/9C3pH/gFH/hR/whXhX/oW9I/8Ao/8K3aKAML/AIQrwr/0Lekf+AUf+FH/AAhXhX/oW9I/8Ao/8K3aKAML/hCvCv8A0Lekf+AUf+FH/CFeFf8AoW9I/wDAKP8AwrdooAwv+EK8K/8AQt6R/wCAUf8AhWNazeCrL4gJ4btNCs4NZjt/tSzRWMaqo9Aw5Bx/+uu2rjB4ImHxYPjL7ankGx+zfZ9h3bumc9MYoA7OiiigAooooAKKKKACiiigAooooAKKKKACiiigAoorJ8Uvdx+EtYfT932xbKYwbeu/YduPxxQBSuPHWgQX89jHdTXdzbnEyWVrLceUfRjGpAPsa0NF8Q6V4ht5JtLvI7hYn2SqMho29GU4Kn2Irz74Davpd34Ci0+3eNdStpZGu48/OxZiQ59RggZ9qbp2+8/aF1C60fmxg08Q6pJH9xpv4VPYuPl9+DQB6hd3ltYWkt3dzxwW8S7pJJG2qo9Sa5+18f8Ahu6nto1vZIxdNtt5Z7aSKKY9gjsoVs9sHmuA+JupN4g+JvhjwNvJsHlS5vogeJRkkK3sApOP9qvQPHeiW+s+AdW09oU2ras8IC/cZBuUr6YIFAHS14/8IP8AkofxO/7Co/8ARtxW/wDBrxTP4p8AQSXkplvLKQ2szscs+ACrH/gJHPsawPhB/wAlD+J3/YVH/o24oA9gooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArzjQ/E2r3nxt8QaFPdltMtrRHhg2jCN8vOcZ/iPevR6wrQ+Gv+Evvha/Yv8AhIPJX7Vsx5vl8Y3e3T9KAN2iiigAooooAKKKKACiiigAooooAKKKKAPN/jX4n1fwp4Osr/Rbs21y+oxxM+xWymyRiMEHuor0isLxUfDQ0yE+KfsX2L7QnlfbMbPN524z3xu/DNcb4v8Ai9b2F8NC8J2v9ua7JlQsILRRH3I+8fYfiRQB3PiDxLpHhbTWv9YvY7aEfd3H5nPoo6k/SvJZNb8bfF+Y22gRSaB4XLESX0nEk69MDHX6Lx6mtPw98J77WtSTxD8Rb5tTvyMx2G791D3wccHHoOPrXrUUMVvCkMMaRxIAqIigKoHQADoKAOZ8G/D/AELwRZCLTbffdMMS3koBlk/HsPYV1NFFABXnFp4n1eX49X/h17rOlRaYJEt9gwH+Q7s4zn5j3r0esOM+G/8AhM5hH9i/4SP7KPNxjzvJyMZ9un6UAblFFFABRRRQAUUUUAFFFFABXnA8T6ufj23h37V/xKhpnmfZ9gxv67s4znt16V6PWHnw3/wmYH+hf8JH9l9vO8nP8s0AblFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABSOyojO7BVUZJJ4ApawPHFnfaj4G1uz00kXk1nIkYHVjjoPcjI/GgDw/WvCV5rOtan4w+GKTWtvbMyM0Umz7VJz5hgX+7jsep6Cu8+DXjTRtY0htChsItL1a0Bae2XP749GkyeSc9ckkVf+CmoWdz8NdPsoGVbqyMkVzDnDo+9jyOvOaxJ9Gtp/wBomyvdDRB5Fo0uqvCPkVyGUBscbjleOp60AYFwrf8ADWS+aPlwhjz6fZR/XNe5aswTRr5mOALeQk/8BNeU/E/TZPD/AMQvDfj1I2NlBKltqDoM+WuSA5x2wxGfYDvXbfEHxBaaV4A1K6FxG73Ns0NqqNkzO42qEx16547UAec/s1LIND15iD5RuYgvpu2nP81rD8MeGNe8SfEPx/8A2H4mn0T7Pqr+d5QJ87dLNtzgjptP/fVeqfCPwrN4S8A2trdxGK9uXN1cIeqswACn3ChR9c1zPwg/5KH8Tv8AsKj/ANG3FAD/APhWHj3/AKKZff8AfDf/ABVb3hDwV4q0HWxeav41utVtPLZTayIcEnocknGK7+igDhPGfg7xP4g1eK60bxjc6PbLCENtGhwWySWyCOoI/Kt7w9o2qaV4XXTdR1uXUL8K4+3OmGGc44PXHv6Vu0UAeW6b8OvG9pq9rdXHxFvZ4IplkkhMZIkUHJXBbHI4rqvG3h3W/EVjbQ6J4in0WSKQtI8S58wY4BIIIxXUUUAcn4I8Na74chvE1vxLPrRmZTEZVI8rGc4yT1yPyrntc+H3jPUtcvL2y+IF5Z200heK3VGxEvZeGxxXptFAGFqej6peeDm0m21uW31MwJH/AGkqDdvGNzY7bsH6ZrnPCHgnxVoWuLe6t41utVtBGym1kQ4YnocknpXoFFAHC+M/B3ifxBqsV1o3jG50i3WIIbeJDgtk/NkEe35Vu+FdG1TRfDy2Gq61Lql4GY/a5Fw2D0HJOce9btFAHlunfDrxvaavbXVx8Rb2eCOZZJITGcSKDkrgtjkcV1fjXw9rXiHT7eDRfEM2iyxy75JIlyZFx04IIrp6KAOP8EeF/EHhxrw634on1pZgvlLKhHlEZyQST1yPyrF8Q+AfGOq69d31h4+u7G0lfdFbIhxEMdBhhXpVFAGHqOj6pdeDzpNvrUtvqX2dIv7RCfMXAGXx2zg/nXMeFPA/izRNfivtU8cXep2iKwe1kQ4ckYHUnGDz+Feh1w3xB+JNj4KtltYU+263cDFtZR8nJ6M2OQM9up7etAHNfGu8vtIjt9StfGVzpJEPlxabbqS9xJuJ3cEYGCASeBj1OK4bwX8PfiNrery61dapfaLJdW4b7fI+ZJhkAKVDBhwM8+grvvBHw2v77Vh4w8eP9s1mTDwWr8pbDqMjpkdl6D610mleNrnUPijrHhRrSJLaxtllSYMd7Mduc9sfN+lAHL/8Kw8e/wDRTL7/AL5f/wCKo/4Vh49/6KZff98v/wDFV67RQB5F/wAKw8e/9FMvv++X/wDiqP8AhWHj3/opl9/3y/8A8VXrtFAHkX/CsPHv/RTL7/vl/wD4qj/hWHj3/opl9/3y/wD8VXrtFAHkX/CsPHv/AEUy+/75f/4qj/hWHj3/AKKZff8AfL//ABVeu0UAeRf8Kw8e/wDRTL7/AL5f/wCKo/4Vh49/6KZff98v/wDFV67RQB5F/wAKw8e/9FMvv++X/wDiqP8AhWHj3/opl9/3y/8A8VXrtFAHz940+Enj2+0eCL/hJ7jxB/pKH7LM2wJww8zLNjjOPoTXS+Avg7qXgjxFHqMXiUSW+CJ7eO32+cMHAJJPGcH8K6f4neN7jwF4btdUtrOK6ea9S2KSMQApV2J474TH412tAHGeNvCniLxFc2kmi+K7jRY4kKyRxKSJCTwcgj6Vp+D9E1bQdDaz1jXJtYujMzi5kXBVSAAvJOcYJ59a6CigDyr/AIVx45/tL7R/wsi98vzd+zyzjGc4xux/Su18X6JquvaELLSNcl0i6EqubmNckqAcrwRjOQfwroKKAOL8E+E/Efh27upda8WXGsxSxhY4pUICNn72ST9K4rxD8N/F2rfF3UdY03V5dLs5rVPLv42GeAqmLaCD2Jz04r2muLt/G88/xau/Bps4xbwWIuRcbjvL/KcY6Yw36e9AGxDo+qR+DP7IfWpX1T7KYv7S2fN5hBw+Pb+lcp4Z8B+L9H8QW19qXju71GziLeZauhxJlSAOWOOSD+Fej0UAcb438K+IvEdxaPoniu40WOFWEkcSE+YSeDkEVe8GaDrHh/SpbXWtfm1mdpS6TSrgouB8vJJNdJRQB5XcfDnxxLqktzH8R72OFpi6xiM/Kuc4xux0/Cu18YaLquvaJ9j0fW5dHufNVzcRLklRnK9QR1B/Ct+igDiPBXhHxJ4d1C4n1rxdcazBJFsSGVThWzndkk/T8ap+K/A/izW9flvtL8cXWl2jqoS1jQ4TAwejDOTz+Neh0UAYVvo+qxeDP7Ik1yWTVPszRf2mYxuDkHD49sj8q8v8PfDTxlpPxbtNXv8AWZb60it8y6i5GZR08kqW3fj0xXttcUPG9wfi2fBv2OL7MLH7R5+479/XGOmMUAdrRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAc5qfgLwvq9819eaRCbpvvzRO8LP/vFCM/jWrpWjabodp9l0uxgtIM5KwoF3H1Pqfc1eooAjnghuoHguIo5oZAVeORQysPQg9RWBpvgPwtpF8t7ZaNbxzpzGzbnEX+4GJCf8BxXR0UAFeP/AAg/5KH8Tv8AsKj/ANG3FewV4/8ACD/kofxO/wCwqP8A0bcUAewUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFeS+NfiRf6lq58HeAk+16vJlLi8Qgx2w6HB6ZHc9vc9ADQ+IPxNOi3S+HPDUP9o+JrkhEijG5YCe7e/fHbqeKX4ffDEaFct4h8RzDUfEtyTI8zncsBPZfU+/4DjrpfD74b6f4JtGuJGF7rVwM3N9IMtk8lVzyBn8T37Y7egArnrLwjpVj4zv8AxNC0v9o3kKxSqXygAxyB2zgflXQ15V4eS9H7QXiZpFuPs32GPaWB2fwYx29f1oA9VooooAKKKKACiiigAooooAKKKKACiiigDn/GHhDSvGmkw6dq5lFvFcLcL5T7SWAIxn0IYiugryr4/R38ngbT105blpv7Vi4tw27/AFcmOn+1t/HFeq0AFFFFABRRRQAVz8XhHSofHE/ipTL/AGnNbC3dS/ybeOcevygV0FeV2Ud+P2kdSdlufsZ0hdpIby8fJ07fez+OaAPVKKKKACiiigAooooAKKKKACuf/wCER0oeOP8AhKsy/wBpm1+zld/ybfXHr2roK8rEd/8A8NJM5W5+x/2RwcN5eP5fe/WgD1SiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArx/4Qf8AJQ/id/2FR/6NuK9grx/4Qf8AJQ/id/2FR/6NuKAPYKKKKACiiigAooooAKKKKACiiigAooooAKa7pHG0kjKiKCWZjgAepNRXt7a6bZTXl7PHBbQqXklkOFUDua8T1HWde+NGrSaN4eaXT/CUEm27vyCDcY7fywvuCfSgCz4k8b6z8RdYl8I+AWK2YAF9q2cKFJwQp7L7jluQOOT6J4K8DaT4G0kWenx7535nunA8yVvc9h6Cr/hrwzpfhPRotL0m3EUCcsx5eRu7Me5Na9ABRRRQAVztl4z06/8AGt/4VijuBe2UKzSSMo8sg44BznPI7V0Vcdpngh9O+JereLDfK8d9brELfy8FCNuTuzz93070AdjRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHO+M/Gem+BtIg1PVI7h4JrlbYCBQzBmDHJyRxhTXRVx3xI8Dt4+8PW2lLfCz8m8S5Mhj35AVlIxkdn/SuxoAKKKKACiiigArnYvGemzeO5/CCx3H9oQWouWcqPL2nHAOc5wwPTFdFXH2/gdoPindeMvtwKT2Qtvs3l8hvlGd2emF9O9AHYUUUUAFFFFABRRRQAUUUUAFc7/wAJnpv/AAnf/CIbLj+0Psv2nftHl49M5znHPTHvXRVxw8DsPiofGYvhsNl9mNt5fO7pndnpj2oA7GiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArx/4Qf8lD+J3/AGFR/wCjbivYK8f+EH/JQ/id/wBhUf8Ao24oA9gooooAKKKKACiiigAooooAKKKKACs/W9c07w7pU2p6rdJb2kIyzt3PYAdyfQVR8WeLtJ8GaNJqWqz7VAIihXl5m/uqP69BXl2i+Gdc+LesReJPGCvaeH4n3WOlAkeYPU98Huep7YFAEMUHiD446oLi58/SfBdu/wAkQOHuyD19CffoO2TmvadL0ux0XTodP022jtrSFdscUY4A/qfc1Yt7eG0to7e3iSKGJQiRoMBQOgAqSgAooooAKKKKACvNdC8Ratd/HDxDos9676bb2iNFbkDah+TkcZ7mvSqwrSfw03i++itTZ/8ACQLCv2rYv73y+2T+X6UAbtFFFABRRRQAUUUUAFFFFABRRRQAUUUUAea/G7xJq/hfwbZXujXjWly+pRxM6qDldkjY5B4yor0qsPxVP4bt9MhbxQbIWRuEEf2xQU83nbjPfGfwzW5QAUUUUAFFFFABXm1n4k1aT4/ahoD3jHSo9MEiW20bVfCHd0zn5j+dek1hxz+Gz4zmhjNn/wAJGLUGXCjzvJyMZPpnH6UAblFFFABRRRQAUUUUAFFFFABXmo8Sasfj+2gfbG/soaZ5n2bA27sZ3dM5r0qsPz/Dn/CZCHNn/wAJGLXP3R53k59fTPagDcooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK8f8AhB/yUP4nf9hUf+jbivYK8f8AhB/yUP4nf9hUf+jbigD2CiiigAooooAKKKKACiiigArkfHfxB0rwLpoluT9ov5eLayjPzyH1PovvWd8Q/iZa+EUXTNOi/tDxDcjbb2kfzbCeAzgc/QdT+tZngT4Z3Mepnxb41k+3+IpmEiRuQyWvpjHBYdscDt60AZvhP4f6r4w1hPGPxCHmykZs9LZcJEucjcvYf7P4n0r2MAKAAAAOABS0UAFFFFABRRRQAUUUUAFeeaJ4U1ey+M2veIp4FXTLu0RIZRIpLN8uRtzkY2nqK9Drh9J8a3uofFbWfCr20C2djbLLHIufMLHbnPOMfN6dqAO4ooooAKKKKACiiigAooooAKKKKACiiigDzz4yeE9W8ZeEbLTtGhSW4j1GOZw8gQBAjqTk+hYcda9Drh/in42vPAfhm01SxtoLiSW+jt2SbONpV2OMHr8mPxruKACiiigAooooAK88tPCerRfHO+8TvCn9lTaaIUl8wZL/ACDbt6/wk5xivQ64e28bXk3xgvPB7W0AsoLAXCyjPmF/lPPbGGxjHbr2oA7iiiigAooooAKKKKACiiigArzweE9WHx0bxP5Kf2SdN8nzfMGfM6bdvX3zjHvXodcQPG14fjAfB/2WD7ELD7R53Pmb+vrjGOMY989qAO3ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKRmVFLMQFAySTwBQAtFec6h8cPA2n37Wh1CacoxVpIIC6A/Xv+Ga7TQ9f0vxJpiajpF5HdWznG5Dyp9COoPsaANKiquo6lZ6Rp81/qFzHbWsK7pJZDgKK5yD4i6HI9oZ47+ztrxgltd3do8UMpPQByMDPbOM0AdbXj/wAIP+Sh/E7/ALCo/wDRtxXsFeP/AAg/5KH8Tv8AsKj/ANG3FAHsFFFFABRRRQAUUUE4GT0oAK8v8e/E2az1FfCvhCL+0PEc58smMbkts9z2LAfgOp6YrO8YfEPU/EusP4M+H37+8cFLvUVOEgXodrdsZ5b8ua7DwD8PNM8Dae3lE3OpzgG6vZOWc+g9Fz+fegDO+Hnwzh8Ls2s6xN/aPiS5y091Id3lk9QhPf1bv9K9CoooAKKKKACiiigAooooAKKKKACsCz8KaRZeML7xHBv/ALTu4ljmBkyu0Y5C9ugrfryzw/a36ftAeJZ5YbgWrWMeyRlOw/cxg9Ox/I0Aep0UUUAFFFFABRRRQAUUUUAFFFFABRRRQBgeLvCekeMdKh0/Wg5to7hZ12SbDvAIHP0Yj8a368r+PlrqF34G0+PTYbmaf+1YiVt1YtjZIB0/2iv44r1SgAooooAKKKKACsGLwppEXjWfxOgf+1ZrYQP+8+XZxzt9flAreryyytdQH7SGpXDQ3IsjpC7ZCreWfuDg9OoP4g0Aep0UUUAFFFFABRRRQAUUUUAFYH/CKaQPG3/CUYf+1TbeR/rPl2eu317Vv15YLTUf+GjzcmC5+xf2RxJtby/TGen3v1oA9TooooAKKKKACiiigAooooAKKKKACiiigAooooAKxfFOkXOv6MdKhuPs8NzIiXUisQ3kZy6rjuwG36Ma2qKAMA+B/C50k6X/AGDp/wBjKbNnkLnHrnrn3zmvI/hBY3Xhz4veKfDlrK8mlQRuSCcgFZFEZP8AtbWYfn6V7L4k1+18N6LNqFyGcjCQwoMvNKeEjUdyTgVgfDjwnceHtNvNQ1Tada1ic3d6RzsJJITPtuP4k0AcZ8SNQPiH4teFvBjMXsI5EuruL+GQ8kBh3AVf/Hq9H8caRDrPgXWNPkjVla0coMdGUblI+hAryO5Vl/ayUzD5GCGPPp9lA4/EGvcdWYJo18zHAW3kJ/75NAHCfBLxNN4j+H0K3UpkutPlNq7McsygAqT+Bx+FY3wg/wCSh/E7/sKj/wBG3FZv7NUcg0LXpCD5TXMar6ZCnP8AMVh+GL3xzafEPx//AMIZplhe7tVf7X9rYDZiWbZt+devz569BQB9HUV5F/bPxx/6FrQP+/g/+PVv+ENQ+Jt1rezxXo+k2emCNiZLd8vv7AYkb+QoA76iuF8Z3/xItNWiTwjpGlXmnmEF3unw4kycjl14xj1rUsNY1jTvA8mqeLl0/T9Qhjd5Qj/uU5OwE5PXjoT14oA6OaaO3hkmmkWOKNS7uxwFA5JJ9K8U17xZrfxV1eXwv4KZ7fREYLf6sVIBXuAfQ84HVsdhmuah1P4i/GiCGzNvBbaClwq3c1qDCjjIzksxLYHOB+Ir1nV9J17wf4asdP8Ahxo2myeW+Jo7psEjH3sllySepJ/+sAbPg/wbpPgrRl0/S4eTzNO/35m9WP8AIdq6GuU8EXfja7gu28Zadp9k6sot1tGzuHO7d8ze2OfWud1zVPi9Drl3Ho2g6JPpqyEW8sknzMnYnMo5/CgD02isPUpvEkfg9ptOtbKTxCIEIgdj5Jl43gHIOPvY5Hauc8I6h8TrrXFj8VaNpNppnlsWkt3y+7sBiRv5UAd/RXDeM7/4j2mqRL4R0nSryxMQLvdPhw+TkcuvGMetbvhabxJceHkl8TWtnbasWbMVsxKAfw55PP0JoA3KK8u07VfjJJrFtHf6BoMdgZlE8qSciPPJH70nOPb8K6vxrc+MLXTrd/B1hY3l0ZcTJdtgBMdR8yjr70AdNRXIeCLzx1dm8PjLTdOslXb9mFo+Sx53Z+dhjp6VieIdT+LcGvXcWhaFotxpYf8A0eWWT52XH8WZF5/CgD0qisTUZvEcfhAzWFrZyeIRbofIdj5JlwNwByOOuOfTmuY8Kaj8UrnXoo/E+i6PaaVtYySwSZcHHy4xI3fHagD0KuasfGljf+OdR8KRQTi6sYFmeVgNjZxwOc/xD9azvGt98Q7TULceD9K0u9s2izM10+HWTJ45deMY9e9ZXgXwf4kt/E2peMfEjWkGq38JhNjbjKJjGCW3N129OaAPS6K8sttV+M7apFHceH9ASzMwWSUSdEzyf9aT09vwrsPGdz4rtdJik8IWNleX3nASR3bYAjwckfMvOcd6AOjorj/BF547u2vP+Ey0zTrJVC/Z/sj5LHndn5246elY3iLU/i1b6/dx6DoWi3Olhh9nllkw7LgfezIvOc9qAPSaKxJ5vEY8HGaG2sm8RfZg3kFj5PnY5Gc9Ovf8e9cv4U1H4pXOvwx+J9F0e00raxllt5MyA4O3GJG747dM0Aeh0VxPjW++IVpfWw8H6Vpd7aNGfOa6fDq+fd14xj1rX8H3Hie50UyeLLOztNR81gIrRsrs4wT8zc9e9AG/RXlsWqfGY6ukUugaALLzgrSiXpHnr/rc9P8AZ/Cuw8ZXHiu10iOTwhZWV3feaBJHdtgbMHJHzLznHegDoqK4zwTe+P7u5u/+Ey0vTLKBUX7ObR8szZ5z87cY+lZnifUvitb+ILmPw5oejXWlDb5Es0mHPAzuzIvfPagDofG/jWw8CaNBqeoQTzQzXSWwWAAsCwZs8kcAKa6WvOviD4P1vx38NrOynNvBrcDR3bwxn928oRlMYJPA+c4Oe340nhnUvitc6/bx+ItE0a10o58+WGTLjg4xiRuc47UAejUVxnja98f2lzaDwdpem3sDIfPN2+GVs8Y+deMfWtPwfceKLnQ2k8WWdlaal5rBYrRsr5eBgn5m5znv6UAdBRXlZ1X40f2n5f8Awj+gfZPO2+Z5v8Gev+tz09s+1dr4uuPE9toQk8KWdnd6n5qgxXTYTZzkj5l5zjv60Ab9c1D40sJviBceD1gnF5BaC5aYgeWQcfKOc5wwP51R8E3vxAu7q6/4THS9MsrdUHkG0fLM2ec4dhjH0rivEXh34iWHxZv/ABX4a0mwuo5rdbeMzzLt2bVBypdTnK/SgD2iisOGbxG3g3zprWyXxH9lLeQGPk+dg4Gc9M47/jXK+GdS+K1x4gto/EWh6Na6Ud3nywyZcDacbcSNznHagD0aiuN8b3vj60ntP+EN0zTb2Flb7R9rfDK2eMfOoxj61f8ABlz4sutJlk8X2VlZ33mkRx2jZGzA5PzNznPegDo6K8sudV+My6rLHb+H9AazExEcrS9UzwT+9z09vwrtfF8/ia20PzPCdpZ3epCVQYrtsKU5yR8y89OpHegDeorifBV98Q7u/uB4w0rS7K0WPMTWr5dnz7O3GPpVPxXqPxRttelj8MaLpF3pW1THLcPh84+YHMi989qAPQq5v/hNLA+P/wDhDxDP9tFp9pMuB5eP7vXOcc9KsW83iRvBvnXFtYr4j+zM3kKx8jzsHAznOOmefx71534O8NeOrr4qt4s8V6bZWY+xNAfs8qkE8AYAZj+ZoA9gooooAKKKKACiiigAooooAKKKKACiiigAooooAKztc1zTvDmkz6nqlylvawjJZjyT2AHcn0rRqlqej6ZrUCQ6pYW15EjblS4iDgH1ANAHkWk/FXwXqerrr/iLWvKniyLDTxazOtmOhckJhpCO44A4Heuv0v4r+HvEfiGy0Xw7JNqE85ZpZPJeNIY1GSTuAJPQAAd+tbX/AAgXhH/oWdJ/8BE/wq5pvhjQdGuTc6Zo9jZzshQyQQKjFSQcZA6cD8qAPNvijpM2ieNvDvj+CFpLWykWHUPLGSkeTh8emGYflXV+P/E9hZeArya2uo55tRt2gsY4m3NcO42jYB1612LoksbRyIrowwysMgj0IrG03wd4b0i+N7p2h2FtdH/lrFAoYfT0/CgDF+FXhOXwf4DtLC6TZezMbm5XOdrtj5T7gBR+Fcp8IP8AkofxO/7Co/8ARtxXsFeP/CD/AJKH8Tv+wqP/AEbcUAewUUVznjLxtpHgjR2vtSlBkIxBbKf3kzegHp6noKAL3iHxFpnhfSJdT1a5WC3jHGfvO3ZVHcn0ryCz0zX/AI26smp6wJ9M8HQOGtrQHDXOO/v7t0HQdzVjw94O1r4naxF4r8cBodLQlrDSc4BXsWHYfq3sMZ9piijghSGGNI4kUKiIMKoHQADoKAIbDT7TS7GGxsbeO3tYV2xxRrhVFWaKKACiiigAooooAKKKKACiiigAooooAKKKKACvNNB8QardfHLxDo817K+nW9ojRW5xtQ/JyPfk16XWFaX3huTxffWlqbQ6/HCputkeJfL4xlscjpxn0oA3aKKKACiiigAooooAKKKKACiiigAooooA8z+OPiHVvDXguyvNHvZLO4fUo4mkjxkr5cjY57ZUflXplYfiq+8OafpkMvihrNbJrhFj+1x7083krxg88Hn0zW5QAUUUUAFFFFABXmdn4h1aT9oHUNCe9kOlx6YJEtuNobCHP15NemVhxXvhw+MprONrP/hIltQ0uI/33k5GAWx0zjjPpQBuUUUUAFFFFABRRRQAUUUUAFeZjxDqx/aBbQvtsn9ljTN/2bjbuxnd9fevTKw/t3hw+M/se60/4SIWm7Hl/vvIz03Y6Z5xn3oA3KKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvH/hB/wAlD+J3/YVH/o24r2CvmPT/AB9L4J8Y/EK30+0Nzq+p6u0dmpGUUrNNlj6/fGBQB7T4++I2m+B7JUK/bNWn4trGM/M5PQtjoufz7Vyvgz4d6lrmrp4y+IDG51J8Pa2Df6u3HUZXpkcYXt3yekvgDwPZaZft4n8Wata6j4luG37nuFdbfPYc8sOmeg6CvTf7V07/AJ/7X/v8v+NAFuiqn9q6d/z/ANr/AN/l/wAaP7V07/n/ALX/AL/L/jQBboqp/aunf8/9r/3+X/Gj+1dO/wCf+1/7/L/jQBboqp/aunf8/wDa/wDf5f8AGj+1dO/5/wC1/wC/y/40AW6Kqf2rp3/P/a/9/l/xo/tXTv8An/tf+/y/40AW6Kqf2rp3/P8A2v8A3+X/ABo/tXTv+f8Atf8Av8v+NAFuiqn9q6d/z/2v/f5f8aP7V07/AJ/7X/v8v+NAFuiqn9q6d/z/ANr/AN/l/wAaP7V07/n/ALX/AL/L/jQBboqp/aunf8/9r/3+X/Gj+1dO/wCf+1/7/L/jQBbryHw1/wAnGeKf+vJP5R16n/aunf8AP/a/9/l/xryXw3e2i/tDeJ5muoRE1koVzINp4ToaAPZaKqf2rp3/AD/2v/f5f8aP7V07/n/tf+/y/wCNAFuiqn9q6d/z/wBr/wB/l/xo/tXTv+f+1/7/AC/40AW6Kqf2rp3/AD/2v/f5f8aP7V07/n/tf+/y/wCNAFuiqn9q6d/z/wBr/wB/l/xo/tXTv+f+1/7/AC/40AW6Kqf2rp3/AD/2v/f5f8aP7V07/n/tf+/y/wCNAFuiqn9q6d/z/wBr/wB/l/xo/tXTv+f+1/7/AC/40AeV/tG/8k+0/wD7C0f/AKKlr1+vGf2h720ufAOnpBdQysNVjJVJAxx5UvPFet/2rp3/AD/2v/f5f8aALdFVP7V07/n/ALX/AL/L/jR/aunf8/8Aa/8Af5f8aALdFVP7V07/AJ/7X/v8v+NH9q6d/wA/9r/3+X/GgC3XkNh/ydBqn/YJX/0GOvU/7V07/n/tf+/y/wCNeSWN7aD9pnU5zdQiE6UoEnmDaTtj4z0oA9moqp/aunf8/wDa/wDf5f8AGj+1dO/5/wC1/wC/y/40AW6Kqf2rp3/P/a/9/l/xo/tXTv8An/tf+/y/40AW6Kqf2rp3/P8A2v8A3+X/ABo/tXTv+f8Atf8Av8v+NAFuiqn9q6d/z/2v/f5f8aP7V07/AJ/7X/v8v+NAFuvIF/5Ogf8A7BP/ALKK9U/tXTv+f+1/7/L/AI15It7af8NMvP8AaofJ/srHmeYNudo4z0oA9moqp/aunf8AP/a/9/l/xo/tXTv+f+1/7/L/AI0AW6Kqf2rp3/P/AGv/AH+X/Gj+1dO/5/7X/v8AL/jQBaLKuNxAycDJ70tYWvx6N4h0O70u51G3SO4TaJEnUNG3VWHPUEA/hXzpZfFrxr4D1mfR9Ru4tXhtJTGy3Lbyyjusg55HQnNAH1RRXmHhj46+E9eeOC9kfSLp+At1zHn/AK6DgfjivS4Z4bmJZYJUljYZV0YMD9CKAJKKKKACiiigAooooAKKKKACiijoMmgBrukSM8jKiKMlmOABXLD4g6RczSxaTBqOseUdryafaNLED6eZwp/AmvPptWuvjB49m0K0mki8IaW268aNypvGBwFJHYnOBnoCeuMezWlpb2NrHa2kEcFvEu1I41Cqo9ABQBgaD460PxBqM2mQSzW2pwjMljeQtDMB67W6/hXPar8EfBusateancw3ouLuZp5dlwQpdjliBjjkmuV/aBUaPceG/EtiRDqkFwyLKvDMoAYAnuAQf++jXs+n3QvtNtbsDAnhSXHpuAP9aAPNv+Gf/A//ADz1D/wJ/wDrUf8ADP8A4H/556h/4E//AFq9SooA8t/4Z/8AA/8Azz1D/wACf/rUf8M/+B/+eeof+BP/ANavUqKAPLf+Gf8AwP8A889Q/wDAn/61H/DP/gf/AJ56h/4E/wD1q9SooA8t/wCGf/A//PPUP/An/wCtR/wz/wCB/wDnnqH/AIE//Wr1KigDy3/hn/wP/wA89Q/8Cf8A61H/AAz/AOB/+eeof+BP/wBavUqKAPLf+Gf/AAP/AM89Q/8AAn/61H/DP/gf/nnqH/gT/wDWr1KigDy3/hn/AMD/APPPUP8AwJ/+tR/wz/4H/wCeeof+BP8A9avUqKAPLf8Ahn/wP/zz1D/wJ/8ArUf8M/8Agf8A556h/wCBP/1q9SooA8t/4Z/8D/8APPUP/An/AOtR/wAM/wDgf/nnqH/gT/8AWr1KigDy3/hn/wAD/wDPPUP/AAJ/+tR/wz/4H/556h/4E/8A1q9Srk9R8d2kWtyaDo1nPrOsRjMsFsQscH/XSQ8L+p9qAOZ/4Z/8D/8APPUP/An/AOtR/wAM/wDgf/nnqH/gT/8AWr0LSZtWmtmfV7O0tJi3yx21y0wC+7FF5+grQoA8t/4Z/wDA/wDzz1D/AMCf/rUf8M/+B/8AnnqH/gT/APWr1KigDy3/AIZ/8D/889Q/8Cf/AK1H/DP/AIH/AOeeof8AgT/9avUqKAPLf+Gf/A//ADz1D/wJ/wDrUf8ADP8A4H/556h/4E//AFq9SooA8t/4Z/8AA/8Azz1D/wACf/rUf8M/+B/+eeof+BP/ANavUqKAPLf+Gf8AwP8A889Q/wDAn/61H/DP/gf/AJ56h/4E/wD1q9OnmjtoJJ5W2xxqWY4zgCuGtPilYaj8QLfwnZ6deiZldpprqMwbMLuGEYbjn3x+NAGV/wAM/wDgf/nnqH/gT/8AWo/4Z/8AA/8Azz1D/wACf/rV6lXL+IvGkOj6ta6HYWcmp67dqXhs43CBUHV5HP3F4POCfagDlf8Ahn/wP/zz1D/wJ/8ArUf8M/8Agf8A556h/wCBP/1q6Ox8azQa9b6F4m0xdJ1C7BNm8dx50FxjqofCkN/skfjzXX0AeW/8M/8Agf8A556h/wCBP/1qP+Gf/A//ADz1D/wJ/wDrV6lWZreu2WgWbXN4LhwFZxHbwNK5CjLHaoPA7k8CgDgP+Gf/AAP/AM89Q/8AAn/61H/DP/gf/nnqH/gT/wDWrovAHj638fW2o3dpZSW1ta3AhjMrgtINudxA4X6ZNdPqGoWuladcX97MsNrboZJJG6KooA82/wCGf/A//PPUP/An/wCtR/wz/wCB/wDnnqH/AIE//WrL1L47Xlupv7HwPqc+hhsDUJi0SuPUfIVH/fX5V6F4L8caP460pr7SncNGQs9vKAJImPTIHY84PfBoA5H/AIZ/8D/889Q/8Cf/AK1H/DP/AIH/AOeeof8AgT/9avUqKAPLf+Gf/A//ADz1D/wJ/wDrUf8ADP8A4H/556h/4E//AFq9SooA8t/4Z/8AA/8Azz1D/wACf/rUf8M/+B/+eeof+BP/ANavUqztZ1u00OzNzdLcOACwjt4HlcgDJIVQTgevQUAeff8ADP8A4H/556h/4E//AFqP+Gf/AAP/AM89Q/8AAn/61dF4B8f23j+DUrqzspLa2tLgQxmVgWkBXO4gfd+mTXYUAeW/8M/+B/8AnnqH/gT/APWo/wCGf/A//PPUP/An/wCtV/x38W9L8DatDpkljcX908XmyLAwHlAnjOe5wTj0+tHgP4qw+PNXmsbXQ7u1SGLzZJpXBUc4A47n+lAFD/hn/wAD/wDPPUP/AAJ/+tR/wz/4H/556h/4E/8A1q9SooA8pufgR4Bs7WW5uPt0UESF5JHusBVAySeK+cptIOveJbm28KaZe3Fq0pFtEFMj7OgLHHHrz0r7V1jSLPXtLm02/R3tJsCVFcpvAOcEjnBxzTtN0nTtHtVttNsbe0hUYCQRhB+lAHzr4Y/Z31m+dJvEV7Hp0HUww4llPtn7q/Xn6V7n4R8EaN4KsnttJSceZjzHlmZyxHtnA/ACujooAKKKKACiiigAooooAKKKKACuJ+LWszaH8NNYubdyk0kYt1cHBXeQpI98E121cp8SfDc3ivwHqelWoBumQSQKTjc6ncB+OMfjQBzXwF0NNL+G8N6R+/1KZ52OOQoJRR+S5/4FXqFeY/BPxFb3Xg2Hw9cEW+r6SzwTWsnyvjcSGwecc4PuK6Hxl48sPC9uba3/ANP1yYbbTToPnkkc9Mgche5J9KAPKPjTdSeLviPoPgywBkaIjzdvZ5CM5/3UXP4n0r6AghS3t44YwAkahFA7ADFeZfC/4fX+k3t14s8UP5viHUMsVOD5Abk9ONx9uAOK9RoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA84+Mnjibwf4VWDT2I1TUWMMDL1jXHzOPfoB7nPaqfgjVfBnw+0ODSNQ16wj1ubEmos0u5jOfvK7DONvTk9veuV+M8A1D4teD9Pul3Wcixgqeh3TEMPyAr1zWvBuiav4ZuNEOm2sdu0RSIJEF8pscMuOhBoA3opY54klikWSN1DI6HIYHoQe4p9eL/s76veT6JrWh3TMyaZcIYi38IfdlfoChP/Aq9ooAKKKKACiiigAooooAKKKKACvFrwAftS2WBjNhk/8Aftq9prxe9/5Olsv+vD/2m1AHtFeJfBq6bxH4/wDGXiW4O+Z3WGJj/DGWOAPwRPyr2w9DXhf7OSG1TxLZycTQzxhh6Y3D+YoA2/2gbZ18FWGq27GO6sNQjdJF6qCGHH4hfyr0Pwtq51/wppWrMoV7u1jldR0DFRuA/HNcH+0FOsXwyKN1lvYkX6/M38lNdT8NLd7X4aeHYpAQ32GN8H0Ybh+hoA6qmycxt9DTqa/+rb6GgDxr9nUAeHtdAGAL/wD9lr1TXNFh162t7S6c/ZUuEmmixkTBeQje27af+A4ryz9nb/kX9d/6/wD/ANlr2agBjwxPCYXjRomXaUI+UjpjHpXh/wAItHXTvi341j00FdKtHe3AH3Q3mHav4bWH4V6j4u1+bSLGOz0yH7Trd+TFY24/vd5G9EUHJP0HejwV4Ug8H+Hk09JTPcu5murgjmaVvvMf5D2FAHRUUUUAFFFFABTJv9TJ/un+VPpkv+pf/dNAHjn7PIA0fxEAMAaj/wCy17DdTi1tJrgxySCJC+yJSztgZwAOp9q8f/Z6/wCQR4j/AOwj/wCy17LQB89+H/i9J4U1nUT4p8K39nPqd01xLcMpWQL0RdjgZVVAHB9T3r3PQ9d03xHpUWpaTdJc2snAdex7gjqCPQ1LqelWGs2MllqVpDdW0gw0cq5H/wBY+9eP/DzSJ/A3xl1rwpazSvpVxafa4lc52jI2k+4yVz3xQB7ZRRRQA2RikbMqM7AEhFIyx9Bnj864EfEm6tPHlh4a1rw3caYmoAi2uXuEkDt2GF4Hp1OCRXoFeNftAbIdN0PUImlF3ZXXmkw8MkRwC27t82wD3NAHU6x8Qr+3123sdD8Lajq9n9p+z3N9CpEUbA4YKQDnbzknAyMZrvKp6VFYwaRaR6YiJYiFfIEf3dmMjH4VcoAKKKKACiiigAooooAKKKKACiiigDE1Xwf4d1u6F1qWjWdzcD/lq8Y3/wDfQ5qxpPhzRdC3HS9LtLRn4ZoogGb6nqa06KACiiigAoo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H4ltLSDXUDQwXKzQ5lMeZBkAZzznJ4rdr5J1zxF488d3q6MJRrKWN2jrNp9rmNZOVDblUccnk8d69Z/s343/9BnRf++F/+IoA9doryL+zfjf/ANBnRf8Avhf/AIij+zfjf/0GdF/74X/4igD12ivIv7N+N/8A0GdF/wC+F/8AiKP7N+N//QZ0X/vhf/iKAPXaK8i/s343/wDQZ0X/AL4X/wCIo/s343/9BnRf++F/+IoA9doryL+zfjf/ANBnRf8Avhf/AIij+zfjf/0GdF/74X/4igD12ivIv7N+N/8A0GdF/wC+F/8AiKP7N+N//QZ0X/vhf/iKAPXaZNEk8EkUozG6lWHqCMGvJf7N+N//AEGdF/74X/4iobrS/jZJZzo+r6O6NGwZURcsMdB8nWgDs7SXwh8NPCBMV7FbaUju6ky+Y0jk8hepY+wrz+bXvGvxdmltPDccmheGc7Jb6XiSYd8Y5P0X8TzXn/hz4O+NdZsLbUPJggjilPl2upF1IIPOUI6E/nX0jf2mvxeCha6M9jBraW8aqxTECuMbsDHA6449KAKngz4e6D4ItSum2++7cYlvJgDK/wCPYewrqq898J2fxPh16N/E2paVPpexvMSFAHzjjGFHerXjW1+Idxqdu3hC/wBNt7IQ4lW5QFzJk88qeMY/WgDuKKwfC8XiSLw4sfiS4tJtXy/7y3XCY/hzwP0ribOw+Mo1SBrrVtENoJgZVEY5TPIHy56e9AHceKvD2i+JdKSy10D7KsySLmXy/nHTn8cYraRFjRUUYVQAB7V5h8ddL1fVfBlnDpNrLcut8jSRwxs74wQDgdskZroPAdr43tYblfGF5YzrtQWot1wy9d24gD/Z/WgDsaK808QWPxal168fRNU0iLTC/wDo6SINwT3yp5/GuvuovEbeDjHbT2i+IfsygSlT5Pm8ZOMdOvagDcorz3wnZ/FCHX4n8TalpU+lbW81IUG8nB24wo74/DNWvGtr8Q59Sgbwjf6bb2QixItymXL5PPKnjGP1oA7iuV8UfDnwv4uBbU9Mj+04wLmH93KP+BDr+Oat+EYfE0OhbPFVzaT6l5jYe2XC7O2eBz1ri7aw+Mg1WJrjV9ENn5wMiiMcpnkD5c9PegDL/wCEF+IfgNmbwbrv9raap3Lp1+RlR6DJx+RX6Vf0b442CXC6f4v0q80DUAdrmWJjGT69NwH4H612njSHxZPpUK+ELqzt73zgZWulyCmD04IznFYGg+F/E2sxXtr8R00fVbN0At1jhG9G5yQQBjjuOaAN/XtO8M+NvD6RX91b3WmmVJUlhuQF3Dphgcd66KNFjjVEGFUAAe1fMPj34Pa/oNzeXOgRSXGiSXCeTaQO8ki56Flxzg555619H6DHfxeH9Pj1Ro2v1t0E5iBC78DOKANGiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK8g8EzO3x58ZLqzEah5SrZiQ/8sMjhc9sbDx716/XPeIvBejeJZ4Lq8imhv7f/AFF7aymKaL6MO3Xg5FAHFfHfw5pt94Jk1p1WPVLF4xbSrw8m5wuz1PUkehH1q14+8Map4n+DMFtOpfWrW1guXTu8qIPMH1OW/HFdJZ+A9MhvYLy/u9S1i4t23QNqdyZRE3qq4C598ZrqKAOQ+F+sx658ONEnQ/PDbLayjuHjGw5+uM/jXC+G7BvFn7QOueJYhnTNJH2aOXs8oQJgev8AGfy9a7u5+HWkSXlzPZXep6Wl2d11Bp90YYpj3JXHBPcriug0jRtO0HTo7DS7SO2to+iIOp7knqT7nmgDy/4m/wDJWPh//wBfDf8AoS169XkPxN/5Kx8P/wDr4b/0Ja9eoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiis/Wtb07w7pU2pardR21rEPmdz1PYAdyfQUAWry8t9Ps5ru7mSG3hQvJI5wqqOSSa8T1LWtd+M+rSaL4dMun+E4XC3eoMmGn9h6+y/QnHSo0i1/45aoJZxPpXgq3kJROj3RB/U8fRe2TXtWlaVY6JpsOn6bbR21rCu1I0GAPf3PuaAOK1PUNB+DXhfTLay0ySS3uLtLY+WwDsxBJkcnqeOn4cCvQa5Tx54Ih8c6fYWk149qLS7W53IgbdgEFf1611dABRRRQAUUUUAFFFFABRRRQAUUUUAFRXM62tpNcOCViRnIHUgDNS1DdQC6s5rdiVWWNkJHbIxQBg+B/F8Hjfw2msQWslqpleIxOwYgqfUV0lcz4E8Hx+B/DS6PHdtdATPKZWTb949MZNdNQAUUUUAFFFFAHMeOfGcHgfQ4tTuLSS6WS4SAJGwUjdnnJ+ldLFIJYkkXO11DDPvXMePPBkfjnQotMkvGtBHcJP5ipuztzxjI9a6aKMRQpGCSEUKM+1AD6KKKACiiigAooooAKKKKAOZ8deMoPA+gLqs9pJdK06QiNGCnLd8n2Bro4ZRNBHKoIDqGAPuK5rx74Nj8c+H00qS8a0CzpMJFTd93PGMj1rpYYhDBHEDkIoUE+wxQA+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA8h+Jv/JWPh//ANfDf+hLXr1eQ/E3/krHw/8A+vhv/Qlr16gAooooAKKKKACiiigAooooAKKKKACiiigAoorkvHfxA0rwLpfnXbCe+lGLayQ/PKfX2X3/AK0AaHivxdpPg3R31LVZwi8iKJeXmb+6o7n+VeV6N4a134vavF4j8WiSz8OxMHsdMU480ep74Pdjyc8YFXfCngDVvGWsJ4w+IOXY/NZaU33IlzxuU9B/s9T1PpXsYAAAAwB0AoAjtraCzto7a2hSGCJQqRxrhVA6ACpaKKAPL/jdrep6JoWiS6XezWjyapGjtE2Cy7WOD7cdK9QrD8T614f0S1tJvEMkCQy3SRwGaIyATclSAAcEYPPb1rcoAKKKKACiiigAooooAKKKKACiiigAqrqcjw6VeSxsVkSB2UjsQpxVqmSyRxQvJKQsaKWYnoAOtAHnvwT1XUNY+HqXWpXc11P9qlXzJm3NgEYGa9FrF8K6toOtaGl34cMJ07zGVRFCYlDA8/KQMc89O9bVABRRRQAUUUUAea/G7V9R0bwVbXGm3k1pM19EheFtpIwTjP4CvRbVme0hdzlmjUk++KyPFWsaBomlJc+I2hFk0yIvnQmUbyfl+UA9Oue2K21ZXQMpBUjII7igBaKKKACiiigAooooAKKKKAPNvjdq2o6N4GiuNNvJrWZr2JDJC2045OM/gK9Cs3aSxt3Y5Zo1JJ7nFZfirV9A0XRxdeIzCLEyogE0JlBcn5flAPTGc44xWyjK8auhBVgCCPSgB1FFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB5D8Tf+SsfD//AK+G/wDQlr16vIfib/yVj4f/APXw3/oS169QAUUUUAFFFFABRRRQAUUUUAFFFFABRRXmHj/4mzWN+PC3hCH+0PEk5EZ2LvS2z3Pbdj8B1PpQBo/EL4l2vg9E02wi/tDxBcjbb2cYLbSejPjnHoOp/WsnwJ8NLsan/wAJd42mN/4glIkiikO5bXuBjpuHtwO3rWj8PPhlD4Xd9a1mUaj4kuSXmunO4RluoXPf1bv9K9DoAKKKKACiiigDgvip4M1LxppOlW2myQJJa36TyecxUbACDjAPPPSu9rgfit4y1PwZpGlXOlrAZLnUEgk85Nw2bWJA5HPA5rvqACiiigAooooAKKKKACiiigAooooAKr30DXWn3NuhAaWJkBPQEgirFV7+drXTrm4QAvFE7qD0yATQByXwt8Kah4N8GJpWptCbn7RJKfJYsoBPHOB6V2tcT8K/FWo+MPBaapqnlfaftEkZMSbQQDxx+NdtQAUUUUAFFFFAHDfFTwjqPjPwvBp2mNAs6Xccx85io2jIPOD612tvGYbaKMnJRApI9hXE/FbxbqXg7wtBqGl+T573ccJ81Nw2nJPH4V21vIZraKQgAugYge4oAkooooAKKKKACiiigAooooA4f4qeEtR8Z+E49N0xoVuEuo5v3zFQVGQecH1rs7aMw2sMTEFkRVOPYVxfxW8Wal4O8JR6jpfk/aHuo4sypuAU5J4/Cu0tpDNaQytjc6Kxx6kUAS0UUUAFFFFABRRRQAUUUUAFFFFABRRRQBgaD4R0/wAO6pq2oWc1482qTedMs85dVPP3R2HPv2HQVv0UUAFFFFABRRRQAUUUUAFFFFAHkPxN/wCSsfD/AP6+G/8AQlr16vIfib/yVj4f/wDXw3/oS169QAUUUUAFFFFABRRRQAUUUUAFBOBk9KZLLHBC800iRxICzu7YCgdSSegrxXX/ABdrfxS1abwt4HZoNIT5dQ1UjAK55Cnrj6ctz0GaAL3jH4h6n4h1hvBvw/Bnvmyl3qKH93AvQ7W7Y/vfgMmus8AfDrTPAtgTH/pWqTgfar1x8znuF9Fz+fetLwf4L0jwTo66fpcPJ5muHA8yZvVj/IdBXQ0AFFFFABRRRQAUUUUAYfijQdB1+0tIdfSJoYblJYfMl8vMoyAM5Gc5PHetyvMPjZomq63oeiRaVY3F3JHqkbusCliq7WG446DJ69BXp9ABRRRQAUUUUAFFFFABRRRQAUUUUAFMmjjmgkilAMbqVYHuCOafVXU43m0q8iiUtI8DqoHclTigDO8K6Lomg6Ill4f2fYBIzgpL5gLE8/Nk1t1518FNJ1HRvh7Ha6nZz2dx9qlbyp0KMATwcHmvRaACiiigAooooAw/FWh6Fr+lJa+IBH9kWZJF3y+WN46c5HXOMVtoqoiqoAUDAA9K82+NukalrXgq2t9Lsbi8mW/icxwIXYLyM4Hbkc16LaqyWkKOMMsagj3xQBLRRRQAUUUUAFFFFABRRRQBh+KtE0PX9HFp4gEf2ISo4Ly+WA4PHOR64/GtqNFjjVEGEUAKPavOPjdpGpaz4Git9Lsri8nW9icxwIXbbyM4HOORXodmjR2UCOMMsagj0OKAJqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDyH4m/wDJWPh//wBfDf8AoS169XkPxN/5Kx8P/wDr4b/0Ja9eoAKKKKACiiigAooooAKq6jqNnpGnzX+oXMdvawLuklkOAoqr4g8Q6Z4Y0iXU9WuVgto+56ueyqO5PpXj1np2v/G7VE1LVfO0zwdA/wC4tVbDXOD19+nLdB0Hc0ALdahr/wAbtVfT9LM2meDbeXbPcnh7kjt7/wC70GcnsK9h0Dw/pnhjSIdM0q2WC2iHQdXPdmPcn1q1p+n2mlWENjYW8dvawqFjijGAoqzQAUUUUAFFFFABRRRQAUUUUAcn488cQ+BtPsLuWye7F3eJbbVcLtBBJboc4A6d/UV1lct458EW3jiwsbS5u5bYWl2tyGjUHdgEY5+vWupoAKKKKACiiigAooooAKKKKACiiigAqK6nFraTXDAssUbOQOpAGalqK6gW6tJrdiQssbISOoBGKAOd8BeMF8ceGV1hbI2eZniMRk342nrnA/lXT1zfgfwhB4I8OLo8F1JcqJXlMjqFJLHpgV0lABRRRQAUUUUAcr4+8aJ4G0GLU2sjeeZcpB5Yk2Y3Zyc4PYV08UglhSRcgOoYZ965vxz4Ng8caHFplxdyWyx3CTh41DE7c8c/WukijEUKRrkhFCjPtQA+iiigAooooAKKKKACiiigDlvH3jNPA3h5dVeya8LTpCIhJs+93zg9ge1dNDKJoI5QCA6hgD2yM1znjnwbB440FNLuLuS2VZ0mEkahjlc8YP1ro4YhDBHECSEUKCfYUAPooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACsnW/E+h+HI0fWNUtrIP9wSvgt9B1Na1ef2Xwz0vWLq41zxbaHUdVu3LeXPITHbR5OyNADjgYyfXNAHU6J4o0PxGjto+qW15s5dYnyy/UdRWvXzj4+8Kx/DDx3oGu+F3kt4bufY1sGJAII3KPVWB6H/AAx7D8SPFTeD/At9qsQ/0oqIbYHtI/AP4ct+FAGhqfjLw5o141pqGr20Fwo3PGWyUHq2Puj61sW1zBeW0dzbTRzQSLuSSNgysPUEda4r4TaGmm/D+yup182+1VPtt3M/LSmTLDce/wApH6+tcv4L1J/CPxf1vwLuP9l3RN3YITxCzKJCi+xBYfVR6mgCT4m/8lY+H/8A18N/6EtevV5D8Tf+SsfD/wD6+G/9CWvXqACiiigAooooAK53xl400nwTozX+pzfOwIgt1+/M3oB/M9BWd4/+Ium+BrFVdTd6rPxbWUZ+Zyehb0XP59q5Pwb8OtT8QauvjH4gn7TqDgNbae4+S3GcjK9sdl98nJoApaB4Q1v4oazF4q8cK8GlI26w0gEgFexYdgePdvYYr2mKKOCFIYkVI41CoijAUDgAD0p/SigAooooAKKKKACiiigAooooAKKKKAPL/jfq+p6RoWhy6ZeXFq8mqxo7QsVLDaxAOO3HT2r1CsLxR4i0Lw5a2c+vSKkU90kUJaIyYlOSDgA4xgnPat2gAooooAKKKKACiiigAooooAKKKKACqupyPFpN5JGxV1gdlI6ghTirVMllSCF5ZW2xopZj6AcmgDzz4I6lfar8O47jULua6m+1Sr5kzlmwCOMmvRqxPCmuaL4h0JL7QNosfMZAqxeXhgeflwPr+NbdABRRRQAUUUUAeafHDVNQ0nwTbT6ddz2srX8Sl4XKkjB4yO3Ar0a1ZntIWcksY1JJ9cVj+K9f0Pw7pKXmvlfsjTJGoaHzPnJ4OMHpjOfatxHV0V1OVYZB9RQAtFFFABRRRQAUUUUAFFFFAHmvxw1TUNJ8CxT6ddz2spvYlMkLlTjnjI+gr0SzZnsbdnJLNGpJPc4rJ8Wa/onh3Rxea/t+xtMkYDReZlyeOMdsZz7VtI6yRq6HKsAQfUUAOooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiivPvFPjrTpdYfwxaa/p+nSLj+0L6e6SIwIeqR5I3Sn16L35wKAKN/YD4hfE+0YIW0LwyxMkuPluLs4OwHuFwufxHesz9oxnHgawVc7TfLu/74bFddaeMfh/4Y0KO1s/EOjx2dqmFigu0lc9zwpLMT+pqn8RNEl8ffCuRrS3kiumiS+toZRh8gbtpHYlSRj1IoA6rwsqp4R0VU+6LCAD6eWtePeICf8AhqTRvL6+VGHx/wBc36/hivRfhZrcetfDjR5M4mtYBaTqeqvGNvPpkAH8a4rwnp7+Lfjrrvi1BnS9N/0W3k6iSQIE+X1HDH8RQBD8Z76503x94LvbOxe+uYHd47WMkNKQy/KMA/yNaH/C1vG//RKtV/7+Sf8Axqk+Jv8AyVj4f/8AXw3/AKEtevUAeSJ8U/G7SKv/AAqvVBkgZ81//jVd94o1rU9D8OtqOmaHNq12pQfY4nw2D1PAJOPYVu0UAcL4M8aeJPEmqy2ureCb3RLdIi4uZ5CQzZAC4ZF9SeM9K53x/wDF3UvDviebwxouhLfX7xL5EyzbzvYdPKUEkj0JH5VY8dfEu7Oqjwh4Ij+3a/Mdjzx4aO29eemR3J4XvzxWv8PfhpaeD421G+k/tDxBc5a4vZPmKk8lUJ5+p6n9KAOd8AeA7uzsrjxx4ltLjUvFUyvPFbXICtEQDtAB6MccHsCABWloXxG8X6rrlnY3fw41GxtppQkt1JK22Je7HMYHHpmvTaKAOT8b+KNb8Mw2T6N4Wute89nEot3I8nGMZAVic5PbtUvgrxHrHiSwuLjWPDVzoUkcgSOKdyxkGMkjKqR+VdPRQB5dqfxK8ZWWr3Nnb/DPUrmGKZo451lbbIoOAwxGRg9etdr4h1nU9I8MPqdhoc2pXyqh+wRyYfkjIyAc4z2B6VuUUAcL4M8a+I/EmrS2ureCb3RLdIS4uZ5GIZsgBcFF9SfwqPxf458TeHtb+xaX4FvtZtfLVxdQSMFJPUYCNjH1rvqKAMPRNZ1TUvCa6re6FNY37Ru4055AXyM7VyQMFsDqBjNcdonxG8X6nrlpY3fw31Gxt5pQkl1JK22Je7HMYHH1r02igDlPG3ifW/DMFpJo/ha610zMyyLbuQYsDgkBWPP07U7wT4m1rxLa3c2s+GLnQmidViSdyxlBByQCqkY47d66migDzHWfiP4w07XLyxtfhtqN5bwzNHFdRyttlUHAcYjIAI5612Wv6zqeleF31Ox0ObUb5URvsEb4fJxkZAOcZPQHpW5RQB4Tr7+M/iw+naTN4Nn0CK0ulu3ur2R9hABG0ZjGT836V3fjLxt4k8OaxHaaT4IvdatmhEn2mCRgobJBXCo3TA6+tRfFjxhqng7SNKudKMIkudQSCTzU3AptYkfjgc16BQBh6DrOpap4VTVL7Q5tPv2R2/s+R8vkE7RkgYzgdQOtcXpXxJ8Y3+sWlncfDTUrWGaVUkuHlbbGpPLHMYHHXrXqFFAHL+NvEus+GrK1n0fwzc668shWRIHKmIY4JAVic/Sm+CfE2teJba7l1nwvc6E0Lqsa3DkmUEHJGVUjHHbvXVUUAeY618R/F+ma3eWNp8N9SvbeGUpHcxyttlXswxGRz9a7LVtY1PT/AAi+rW2hzXeorCkn9mpJ85Ykbl3AHO3J6DnFblFAHA+D/HPibxDrf2LVPAt9o1r5bObqeRioI6DDIuc+1P8AGXjbxJ4c1eO00rwRe61bPEH+0wSMAGycrhUbGOOvrXd0UAYfhnWdT1rw4mo6loc2lXjF/wDQpXy3B45IGM+4FcXpnxJ8Y32s2tlcfDTUrWGWZY5Lh5m2xqTgsSYwMAc9a9QooA5fxr4k1nw1Y20+j+GrnXXlkKSRwOVMYxkE4Vic/SqXhbxFr3jDTdUg1bwrdaARH5cRuXJ8wsCDgFVPHH512tV9Qne2026uI8b4oXdc9MgE0AeG+FNW8bfDTTJfDQ8A3urCG4dxeW0j+W+7H3cRnj8a9f1XWNTsfCLatbaJNd6iIEk/s1JMPuONyZAOSMnoOcVhfCjxRqXi/wAFJqmqtE119okjJjTaCAeOPxruKAPPvCXjvxRr+ux2Op+Ar/SLVkZmu5pG2qQOBhkXOenWrXjXxl4i8Nalb2+keC7zXIJId7TwSMAjZI2kBG7AH8a7eigDC8Ma1qet+HV1HUtCm0q8YuPsUr5bA6HJAxn3AribL4meM7nVILSX4Y6nDHJMsbTNM21ATgtkxgYHXrj3r1OigDzD456Zqur+DbS20nTLm/lF6kjrboWZVCtzgc4rd8BeJtc8QW9xHrHhW70MWqxrE1w5PncHOAVUjGB69arfFjxXqfg/wrBqGlNEtw95HETIm4bTknj8K7e3kMttFIwALoGOPcUAeceIPiJ4u0jXruwsvh1qOoW0L7Y7qKVtsq4+8NsZH612F1rGpweD21ePRJpdSFss39mLJ8+8gZTOOo57dulbdFAHnvhPx54o1/X4rDUvAN/pFoysz3k0jbUwMgYZFzk4HB71b8a+MvEXhvUYLfSPBd7rkEkW9p4JCAjZI24CN7HnHWu3ooAwPCOuanr+hC+1XQp9GuTIyi1mfcxA6NyARn3FcZbfErxnNq8VnJ8MtSiieYRtMZm2qM4LZ8vbjv1x716lRQBzfjPxBq/hzSorvR/DtxrkzShHggcqyLgndwrE8gDp3ql4I8W6/wCJprtdY8IXehRwqpje4kJ80nOQAVU8fjXY0UAeHfGS+8VeIBN4bsfBeozWlvcxzR6hCGkWUBewC4HXHXtXsWhy3E+g6fLdWr2lw9vGZLdzlo22jKn3Fcn8WPFep+D/AAjHqOlNEtw93HETIm4bTnPH4V21rI01pDK2NzorHHqRQBLRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUANkQSxPGxYBgVJUkHn0I6VwL/BXwHI7PJozs7HL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'math_402_2.jpg', 'math_402_3.jpg', 'math_402_4.jpg', 'math_402_5.jpg']
math_403	MCQ	Given\( a > 0 \) and\( a \neq e \), then the image of the function\( f(x) = e^x - a \ln x \) may be ()	['A. <image_1>', 'B. <image_2>', 'C. <image_3>', 'D. <image_4>']	BCD	math	函数与导数	['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math_404	MCQ_OnlyTxt	It is known that the domains of the non-constant function $f(x)$and its derivative $g(x)$are both $\mathbb{R}$, then ()	['A. If $f(4-x)+f(x)=2$, then $f(x-2)-1 $is an odd function', 'B. If $f(1-x)$is even, then $g(1)=0$', 'C. If $f(x-2)$is even and $f(2x-1)$is odd, then $f(3)=0$', 'D. If $f\\left(\\frac{1}{2}-2x\\right)$and $g(x+1)$are both even functions, then $f(0)=0$']	BC	math	函数与导数	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFFT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CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_405	MCQ_OnlyTxt	It is known that the domain of function $f(x)$and its derivative function $f'(x)$is $\mathbb{R}$, satisfying the requirement that $f\left(\frac {3}{2}+ x\right)-f\left(\frac{3}{2}-x\right)=4x$, and $f'(x+3)$is an odd function, remember $g(x)=f'(x)$, and its derivative function is $g'(x)$, then $g\left(\frac{15}{2}\right)+g'(2025)=( )$	['A. -2', 'B. 2', 'C. 1', 'D. 0']	B	math	函数与导数	['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math_406	OPEN_OnlyTxt	It is known that the functions $f(x)=\frac{a\ln x}{x}$and $g(x)=b(\sqrt{x}-x)$ $(b>0)$have the same maximum value. Then the minimum value of $a+\frac{e}{b}$is ( 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math_407	OPEN	It is known that in the circuit shown in the figure<image_1>, each switch has two possibilities: closing or not, so there are a total of $2^5$possibilities for the 5 switches. Among these $2^5$possibilities, there are () cases where the circuit is turned on from $P$to $Q$.		16	math	计数原理与概率统计	['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']	['math_407.jpg']
math_408	OPEN_OnlyTxt	"Lao Zhang comes home from work at 17:00 every day. He usually walks for 5 minutes and then walks home. There are two bus routes: $A$and $B$. The time (unit: minutes) taken to take route $A$follows the normal distribution of $N(44, 22)$, and it takes 5 minutes to walk home after getting off the bus; the time (unit: minutes) taken to take route $B$follows the normal distribution of $N(33, 4^2)$, and it takes 12 minutes to walk home after getting off the bus. The following statement is considered unreasonable from a statistical perspective ().

Reference data: If $Z \sim N(\mu, \sigma^2)$, then $P(\mu-\sigma < Z < \mu+\sigma) \approx 0.6827$,$P(\mu-2\sigma < Z < \mu+2\sigma) \approx 0.9545$,$P(\mu-3\sigma < Z < \mu+3\sigma) \approx 0.9973$

① If you take the line $B$, you will be able to get home before 18:00;
② It is more likely to get home before 17:58 by taking route $A$than by taking route $B$;
③ It is more likely to get home before 17:54 by taking route $B$than by taking route $A$;
④ If you take the line $A$, the probability of arriving home before 17:48 is no more than 1%."		①②	math	计数原理与概率统计	['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jrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMMc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math_409	OPEN_OnlyTxt	"Let the domain of the function\( y = f(x) \) be\( D \). For the interval\( I = [a, b] (I \subseteq D) \), if and only if the function\( y = f(x) \) satisfies any of the following two properties ①②, then the interval\( I \) is said to be a ""beautiful interval"" of\( y = f(x) \).
Property ①: For any\( x_0 \in I \), there is\( f(x_0) \in I \); Property ②: For any\( x_0 \in I \), there is\( f(x_0) \notin I \).
It is known that the domain of the function\( y = f(x) \) is\( \mathbb{R} \), its image is a continuous curve, and for any\( a < b \), there is\( f(a) - f(b) > b - a \). Then the function\( y = f(x) \) has a ""beautiful interval"", and there exists\( x_0 \in \mathbb{R} \), so that\( x_0 \) does not belong to any ""beautiful interval"" of the function\( y = f(x) \). Whether the statement is correct (fill in ""yes"" or ""no"")."		yes	math	函数与导数	['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math_410	OPEN_OnlyTxt	"In 1691, Leibniz et al. derived the ""catenary"" equation ( y = frac{c(mathsf{e}^{frac{x}{c}} mathsf{e}^{-frac{x}})}{2} ), where ( c ) is the parameter. When ( c = 1 ), it is the hyperbolic cosine function ( cosh(x) = frac{mathsf{e}^x mathsf{e}^{-x}}{2} ), and the principle of catenary is applied to suspension bridges, overhead cables, hyperbolic arch bridges, arch dams and other projects. Three properties of trigonometric functions by analogy: (1) square relation: ( sin^2 x cos^2 x = 1 ); (2) The sum of the two angles: ( cos(x y) = cos x cos y - sin x sin y ), (3) derivative: ( begin{cases} (sin x)' = cos x, (cos x)' = -sin x, end{cases} ) defines the hyperbolic sine function ( sinh(x) = frac{mathsf{e}^x - mathsf{e}^{-x}}{2} ). The infinite sequence ({a_n}) satisfies ( a_1 = a ),( a_{n 1} = 2a_n^2 - 1 ), is there a real number ( a ) such that ( a_{2024} = frac{5}{4} )? If it exists, find the value of ( a ) and if it doesn't, explain why."		exists,\( a = \pm \frac{1}{2} \left( 2^{\frac{1}{2023}} + 2^{-\frac{1}{2023}}} \right) \)	math	函数与导数	['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math_411	MCQ_OnlyTxt	A, B, and C conduct passing training with each other. The first time A passes the ball, the passer will pass the ball to either of the other two as possible. The following statement is correct ()	['A. The probability that the ball will be in the first hand after 2 passes is $\\frac{1}{2}$', 'B. The probability that the ball will be in second hand after 3 passes is $\\frac{1}{4}$', 'C. The probability that the ball will be in the first hand after $n$passes is $\\frac{1}{3}\\left[1-\\left(-\\frac{1}{2}\\right)^n\\right]$', 'D. The probability that the ball is in the hands of A after 2024 passes is greater than $\\frac{1}{3}$']	AD	math	计数原理与概率统计	['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math_412	MCQ_OnlyTxt	There is a circular lucky turntable divided into five sectors. The five sectors are marked with the numbers 1, 2, 3, 4, and 5. When the disc is rotated and the pointer points to the inside of the sector and records the corresponding numbers. Continue this process, and the probability that the sum of the numbers obtained by recording the previous $n$times is even is $P_n$, then ()	['A. $P_2 = \\frac{13}{25}$', 'B. $P_7 > P_8$', 'C. $\\left\\{P_n - \\frac{1}{3}\\right\\}$is the proportional sequence', 'D. $\\left\\{P_{2n}\\right\\}$is a decreasing sequence']	AD	math	计数原理与概率统计	['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math_413	OPEN	"""Brownian motion"" refers to the never-ending irregular motion made by tiny particles suspended in a liquid or gas. In <image_1>the test vessel shown in the figure, the vessel consists of three chambers. When a particle performs Brownian motion, each time one will be randomly selected from the channel ports of the chamber to reach the adjacent chamber. It is known that the initial position of the particle is in Chamber 2. Then the probability of the particle arriving at bin 2 after n random selections is $P_n=$()"		\frac{1}{4}-\frac{1}{4}\left(-\frac{1}{3}\right)^{n-1}	math	计数原理与概率统计	['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math_414	OPEN	"In the <image_1>diagonal grid array shown in the figure, a robot starts from the center square O, and each movement can cross one side of the square where the robot is located (for example, the robot can move to $Q_1$,$Q_2$,$Q_3$or $Q_4$for the first movement). If the robot walks out of the diagonal grid array and is regarded as a ""failure"", otherwise it is regarded as a ""success"", the probability of the robot ""success"" after 2025 movements is ()"		\left(\frac{3}{4}\right)^{2024}	math	计数原理与概率统计	['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']	['math_414.jpg']
math_415	MCQ	On the Lantern Festival in 2024, students Zhang and Chen plan to go to Lianjiang People's Square to participate in lantern riddles guessing activities. Student Zhang's home is at location E as shown in the picture, Student Chen's home is at location F as shown in the picture, and People's Square is at <image_1>location G as shown in the picture. The following statement is correct ()	"[""A. The shortest number of paths from Student Zhang to Student Chen's home is 6"", ""B. Among the shortest path chosen by Student Zhang to People's Square, the probability of meeting Student Chen at Point F and going together is $\\frac{18}{35}$"", ""C. On the way to People's Square, Zhang wants to pass through the Huahai Sea to enjoy the light show (you can enjoy the road around the Huahai Sea). There are 22 shortest paths to choose from"", ""D. When Zhang and Chen chose the shortest path to People's Square, they met at People's Square. Event A: Zhang passed by Chen's house; Event B: There was no overlap in the paths from F to People's Square (except for the intersection), then $P(B| A)=\\frac{5}{12}$""]"	AB	math	计数原理与概率统计	['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']	['math_415.jpg']
math_416	MCQ_OnlyTxt	There are three opaque boxes: red, yellow and green. The red box contains two red balls, one yellow ball and one green ball; the yellow box contains two red balls and two green balls; the green box contains two red balls and two yellow balls. For the first time, Xiaoming randomly drew a ball from the red box and put the removed ball into the box of the same color as the ball; for the second time, he randomly drew a ball from the box where the ball should be placed. Remember that when drawing red balls, you get 1 mooncake, yellow balls get 2 mooncakes, and green balls get 3 mooncakes. The mooncakes obtained by Xiaoming are the sum of mooncakes obtained by two ball draws. Then the following statement is correct ()	"['A. If you draw the green ball the first time, the probability of drawing the green ball the second time is $\\frac{1}{5}$', 'B. The probability of drawing the red ball the second time is $\\frac{2}{5}$', 'C. If you draw a red ball the second time, the probability that it came from the yellow box is $\\frac{2}{9}$', ""D. Xiaoming's probability of getting 4 mooncakes is $\\frac{11}{40}$""]"	ACD	math	计数原理与概率统计	['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math_417	MCQ_OnlyTxt	It is known that in a quadrangular pyramid\(E-ABCD\) with equal edge lengths,\(A\),\(B\),\(C\), and\(D\) are coplanar, and\(F\) is the point above the line segment\(BE\), and\(\overline{EF} = \lambda \overline{EB}\), then for the following plane\(\pi\), the orthographic projection of\(E-ABCD\) on\(\pi\) is a quadrilateral: ().	['A. \\(\\pi \\parallel CE\\) and\\(\\pi \\parallel BD\\)', 'B. \\(\\lambda = \\frac{1}{2}\\),\\(\\pi =\\) Plane\\(ACF\\)', 'C. \\(\\lambda = \\frac{1}{6}\\),\\(\\pi =\\) Plane\\(CDF\\)', 'D. \\(\\lambda = \\frac{2}{3}\\),\\(\\pi =\\) Plane\\(CDF\\)']	ABD	math	空间向量与立体几何	['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math_418	MCQ_OnlyTxt	In a cube\(ABD-A_1B_1C_1D_1\) with an edge length of 2,\(E, G\) are the midpoints of the edges\(BD_1, CD\) respectively,\(F\) is a moving point (including the boundary) in the square\(C_1CD_1\), and\(B_1F \parallel\) is plane\(ABE\), then the following statement is correct ()	['A. \\(A_1, B, E, G\\) Four points are coplanar', 'B. \\(A_1B \\perp AC_1\\)', 'C. The trajectory length of the moving point\\(F\\) is\\(2\\sqrt{2}\\)', 'D. The minimum value of the volume of the triangular pyramid\\(B_1 - D_1EF\\) is\\(\\frac{1}{3}\\)']	ABD	math	空间向量与立体几何	['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math_419	MCQ_OnlyTxt	Given the function $f(x) = \cos 2x - a(2\cos x - 1) - \cos x + 1$, the following conclusions are correct ()	['A. The graph of $f(x)$is symmetric about the line $x = \\pi$', 'B. If $f(x)$has exactly three zeros on $\\left[-\\frac{\\pi}{3}, \\frac{2\\pi}{3}\\right]$, then the value range of $a$is $\\left[-\\frac{1}{2}, \\frac{1}{2}\\right)$', 'C. When $a = \\frac{1}{2}$,$f(x)$increases monotonically on $\\left[\\frac{\\pi}{3}, \\frac{2\\pi}{3}\\right]$', 'D. If the minimum value of $f(x)$on $\\left[-\\frac{\\pi}{3}, \\frac{2\\pi}{3}\\right]$is $M$, then $M \\leqslant 0$']	ACD	math	三角函数与解三角形	['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jrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMMc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math_420	MCQ_OnlyTxt	In $\triangle ABC$, the edges faced by internal angles $A$,$B$, and $C$are $a$,$b$, and $c$respectively. We know that $a = \sqrt{3}$,$(a+b)(\sin B - \sin A) = c(\sin B-\sin C)$, then ()	['A. $A = \\frac{\\pi}{6}$', 'B. The maximum value of the circumference of $\\triangle ABC$is $3\\sqrt{3}$', 'C. When $b$is maximum, the area of $\\triangle ABC$is $\\frac{\\sqrt{3}}{2}$', 'D. The value range of $b-c$is $(-\\sqrt{3}, \\sqrt{3})$']	BCD	math	三角函数与解三角形	['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math_421	MCQ	The Broca point of a triangle was first discovered by the French mathematician Kroll in 1816. When a point $P$in $\triangle ABC$satisfies the condition: $\angle PAB = \angle PBC = \angle PCA = \theta$, the point $P$is called the Broca point of $\triangle ABC$, and the angle $\theta$is the Broca angle. As shown in the figure<image_1>, in $\triangle ABC$, the edges faced by angles $A, B, and C$are $a, b, and c$respectively. Remember that the area of $\triangle ABC$is $S$, the point $P$is the Broca point of $\triangle ABC$, and the Broca angle is $\theta$, then ()	['A. When $AB = AC$,$PB^2 = PA \\cdot PC$', 'B. When $AB = AC$and $PC = \\sqrt{2}PB$,$\\cos \\theta = \\frac{2\\sqrt{5}}{5}$', 'C. When $\\theta = 30^\\circ$,$a^2 + b^2 + c^2 = 4\\sqrt{3}S$', 'D. When $A = 2\\theta$,$b^2 = ac$']	ABC	math	三角函数与解三角形	['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math_422	OPEN_OnlyTxt	Given the function $f(x) = \\sin(\\omega x + \\frac{\\pi}{3})(\\omega > 0)$ which has exactly one zero in the interval $(\\frac{\\omega}{2}, \\omega)$, and satisfies $f(\\omega) + \\frac{\\sqrt{3}}{2} = 2f(\\frac{\\omega}{2})$. the value of $\\sum_{i=1}^{2025} f(\\frac{i\\omega}{2})=( )$.		-\sqrt{3}	math	三角函数与解三角形	['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KKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_423	OPEN_OnlyTxt	It is known that $a, b, and c$are the opposite sides of the three internal angles $A, B, and C$of acute angle $\triangle ABC$, and the area $S = \frac{a^2 - (b-c)^2}{2}$, then the value range of $\frac{b+2c}{a}$is ()		\left(\frac{11}{4}, \frac{\sqrt{185}}{4}\right]	math	三角函数与解三角形	['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']	['img_for_onlytxt.jpg']
math_424	OPEN_OnlyTxt	In triangle $ABC$, the opposite sides of corners $A$,$B$, and $C$are $a$,$b$,$c$, and $\tan B = 3\tan A$respectively. When $b = 4$, find the value range of $ac$.		$\left(0, 8\sqrt{2}\right]$	math	三角函数与解三角形	['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math_425	OPEN_OnlyTxt	The function $f(x) = 3x^2 - 8\sin(x + \varphi)$is known, where $|\varphi| \leq \pi$。If $\forall x \geq0 $,$f(x) \geq0 $, find the value range of $\varphi$.		$\varphi \in \left[-\pi, \frac{\pi}{6} - \frac{2\sqrt{3}}{3}\right]$	math	三角函数与解三角形	['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math_426	OPEN	As shown in <image_1>, given a line segment $B_1C_1$ with length 2, construct an isosceles triangle $\\triangle A_1B_1C_1$ with $B_1C_1$ as the base and vertex angle $\\theta$ ($0 < \\theta \\leq 90^\\circ$). Take the trisection points $B_2$ and $C_2$ of the side $A_1B_1$ (with $B_2$ closer to $A_1$), and construct an isosceles triangle $A_2B_2C_2$ with $B_2C_2$ as the base and vertex angle $\\theta$ outside $\\triangle A_1B_1C_1$. Repeat this process iteratively: for $n \\geq 2$, take the trisection points $B_n$ and $C_n$ of the side $A_{n-1}B_{n-1}$ (with $B_n$ closer to $A_{n-1}$), and construct an isosceles triangle $A_nB_nC_n$ with $B_nC_n$ as the base and vertex angle $\\theta$ outside $\\triangle A_{n-1}B_{n-1}C_{n-1}$, resulting in a sequence of triangles $\\{\\triangle A_nB_nC_n\\}$. If all vertices of $\\{\\triangle A_nB_nC_n\\}$ lie on or inside the circumcircle of $\\triangle A_1B_1C_1$, find the range of $\\cos \\theta$.		$\left[0, \frac{1}{2}\right]$	math	三角函数与解三角形	['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']	['math_426.jpg']
math_427	MCQ_OnlyTxt	"In △ABC,""\sin^2A +\sin^2B = \sin(A + B)"" is the () of ""C is a right angle"""	['A. Sufficient but not necessary conditions', 'B. Necessary but not sufficient conditions', 'C. necessary and sufficient condition', 'D. Neither sufficient nor necessary']	B	math	三角函数与解三角形	['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math_428	MCQ_OnlyTxt	It is known that the infinite sequence\{a_n\} satisfies: a_1=p, a_n+[S_{n-1}]=qn, n≥2, p,q \in \mathbb{R}, where [x] represents the largest integer not exceeding x. Then the following statements are correct ()	['A. For any p, q,\\{a_n\\} is not a constant sequence', 'B. There are positive numbers p, q such that\\{a_n\\} is an increasing sequence', 'C. For any positive number p, q, there is a positive integer M such that a_M,a_{M+1},a_{M+2},\\cdots are periodic sequences.', 'D. If\\{a_n\\} is a constant sequence, then there must be p=q']	BD	math	数列	['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math_429	MCQ_OnlyTxt	It is known that all terms of the increasing sequence\{a_n\} are positive integers and a_{a_n}= 3n, then ()	['A. a_1=3', 'B. a_n>n', 'C. a_5=6', 'D. a_{2023}=81a_{33}']	ABD	math	数列	['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math_430	MCQ_OnlyTxt	It is known that the function f(x) with domain (0,+∞) satisfies\frac{f(x)+ xf'(x)}{e^x}=1, f'(1)-1 = 0. The first term of the sequence\{a_n\} is 1, and a_{n+1}f(a_{n+1})-f(a_n)=-1, then ()	['A. f(\\ln 2)\\cdot \\ln 2=1', 'B. f(n)>1', 'C. a_{2023}<a_{2024}', 'D. a_n\\geq1']	ABC	math	数列	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFFT2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math_431	MCQ_OnlyTxt	If the sequence\{f_n\} satisfies f_1=1, f_2=1, and f_{n+2}=f_n+f_{n+1}(n \in \mathbb{N}^*), then the sequence\{f_n\} is called a Fibonacci sequence, also known as the golden section sequence. Fibonacci sequences have direct applications in modern physics, quasicrystal structure, chemistry and other fields. Then the following conclusions hold ()	['A. 3f_n=f_{n-2}+f_{n+2}，n \\geq 3，n \\in \\mathbb{N}^*', 'B. f_1+f_2+f_3+\\cdots+f_{2025}=f_{2026}', 'C. \\exists n \\in \\mathbb{N}^*, such that f_n, f_{n+1}, f_{n+2} are an equal proportional sequence', 'D. f_1^2+f_2^2+\\cdots+f_{2025}^2=f_{2025}f_{2026}']	ABD	math	数列	['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math_432	OPEN_OnlyTxt	It is known that the positive number column\{$a_n$\} satisfies $a_1=\frac{1}{2},a_{n +1}a_n+a_{n+1}-a_n=4$, if there is a non-zero constant a, so that the sequence $\left\{\frac{a_n+a}{a_n-a}\right\}$is an equal number sequence, and the general term formula of the sequence\{$a_n$\} is $a_n$=( ).		\frac{4}{5\cdot(-3)^{n-2}-1}+2	math	数列	['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HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v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math_433	OPEN_OnlyTxt	The general term formula of the given sequence\{a_n\} is a_n=\sqrt{\frac{\sqrt{2}+\sqrt{n +2}}{\sqrt{n+2}+\sqrt{n}}}, and S_n is the sum of the first n terms, then S_7=( ).		4\sqrt{2}+1	math	数列	['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math_434	OPEN_OnlyTxt	It is known that the image of the function $f(x)=\frac{2}{1+e^{\sin \pi x}}$bisects the circumference and area of the series of circles $C_n$, and the horizontal and longitudinal coordinates of the center of the circle $C_n$on the right side of the $y$axis form the sequence $\{a_n\}, \{b_n\}$, then the sum of the first $n$terms of $\left\{a_n \cdot (b_n+1)^{a_n}\right\}$is ().		(n-1) \cdot 2^{n+1} + 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ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_435	MCQ_OnlyTxt	A known decreasing proportional sequence $\{a_n\}$satisfies: $a_n > 0$,$a_1a_5 + 2a_3a_5 + a_2a_8 = 36$,$a_2a_6 = 8$, if $b_n =\log_2a_n$, then the sequence $\{|b_n|\} The first 12 items of $and $T_{12} =$ ( )	['A. 9', 'B. 12', 'C. 18', 'D. 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math_436	OPEN_OnlyTxt	The sequence $\\{a_n\\}$ is an arithmetic sequence with a non-zero common difference, and $a_1 = 1$. It is known that $a_{b_1}, a_{b_2}, a_{b_3}, \\cdots, a_{b_n}$ forms a geometric sequence, with $b_1 = 2$, $b_2 = 6$, and $b_3 = 22$. Let $c_m$ ($m \\in \\mathbb{N}^*$) denote the number of terms in the sequence $\\{a_n\\}$ that fall within the interval $(3b_m, 3b_{m+1})$. Define the sequence $\\{d_n\\}$ with $d_1 = 1$, and for any integer $k \\geq 2$, if there exists a positive integer $k$ such that for $n = 1, 2, 3, \\cdots, k-1$, the relation $d_{n+1} = c_n d_n$ holds, and $\\sum_{i=1}^k \\frac{d_i}{d_{i+1}} = \\frac{1}{3}$, find the value of $d_{k+1}$.		d_{k+1} = 3 \times 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cYzxkd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMMcX2hrUS+bHJFjJaNuT05wSc9vfwSvqP4NfadL+DN1dauGjsw1xcQ+YOlvsBJ+mQ5/GvlygD6b/aA/5JbpX/AGEIf/RMlfMlfT3x3he8+ElhcQKXiiu7eZ2A4CGN1B/Nl/OvmGgD1r9nf/kpFx/2DZf/AEOOsX42/wDJXtd/7d//AERHW1+zv/yUi4/7Bsv/AKHHWL8bf+Sva7/27/8AoiOgDuv2Z/8Aj88Sf9c7f+cleTePWZ/iJ4lLHJ/tS5H4CVhXrP7M/wDx+eJP+udv/OSvJfHf/JQvEv8A2Fbr/wBGtQBz9fTXwP8A+SOar/18XP8A6KSvmWvpr4H/APJHNV/6+bn/ANFJQB8y19SfH0O/wstmhP7sXsJbH93Y+P1Ir5br6v0xLb4q/A2OyWRTdm1WBiT/AKu5iAwT6ZIB+jUAfKFFWtS0290fUJrDUbaS2uoW2yRSLgg/4e/er3hrw1qfizWoNL0u3eWWRhvcD5Yl7sx7Af8A1utAH0R4ZSSP9mCcSnLHSb1h9CZSP0xXy/X2Z4j0y00X4PazpdiQbez0eeBTnJ+WNgc++c596+M6APoX9nWUJ4Z8Tc/dkRv/ABxv8K+eq29G8H+IvENo91pGjXd5bo/ltJDHlQ2AcZ9cEfnWM6NHIyOpV1JBB7EUANooooAKKKKACiiigAooooAKKKKACtnwnrz+GPFmma0iswtJ1d0U4LJ0ZR9VJH41jUUAes/FP4vWvjvQrXStOsbq0iSfzpjMV+fAIUDB9yfwFeTUUUAeh/Cn4kRfD6+1E3lrPc2d5EoMcJGRIp4PPbDN+lZXxI8Zjx14vk1aKGSG2WFIYIpSCyqBk5xx94sfxrkaKACvWfD/AMWNM0f4SXXg+XTruS6mtbqAToV2Ay78HrnjcM15NRQAV6zrHxY0zUvg/H4Mj067S7S1t4PPYr5eY3Rieuedh/OvJqKACvWdY+LGmal8H4/BkenXaXaWtvB57FfLzG6MT1zzsP515NRQAUUUUAFem/Cf4maf8PYdVS+sbq6N60RTyCo27A2c5P8AtCvMqKALmrXi6hrF9eopVLi4klVW6gMxOD+dU6KKACvbvAXx4j8O+F4NI1uxu72S1+SCaFlz5X8Ktk9R0Htj0rxGigDf8b6/B4o8ZalrVtDJDDdyB1jkxuXCgc4+lYFFFAHVeDPiDr/gW5eTSp1a3lOZbWcFonPrjIwfcEGvX7f9oTw1qlkkPiPwzOx/iSNY7iPPqA5WvnaigD6NX4zfDPS3WbTPC0qzjkNDp8ERB+u7Nch4v+P2u63BNZaLbrpNrICplDl5yPZuAv4DI9a8hooAUksSSSSeST3pKKKACvXdF+Lml6Z8IpfB0mnXj3b2VzbCdSuzMpcg9c4G8flXkVFABRRRQAUUUUAafh3UotG8TaVqk0bSRWd5DcOiYywRwxAz34r1HxR8dbi88T6TrHh22ntVs4pIp4LrBWdWKkg4P+yOeorxuigD6E/4XJ8OfECpP4k8Ik3uPmZ7SG4A9g5IY/lTdQ+P3h/R9Maz8H+GzC2Pk86JIIkPrsQnd+Yr59ooAv6zrOoeINWuNU1S5e4u523O7foAOwA4AHSqKsyMGVirA5BBwQaSigD3Dwj+0FNZ6cmneK9OfUY1XZ9qhIMjr0+dW4Y++RnvnrWuvxU+EdrKLy38IkXOdwKaXAGU+ud3H1FfPFFAHq3j/wCN+p+LLGTStLtjpmmyArN8+6WZfQnGFHqB19ccV5TRRQAUUUUAanh7xBqHhfXLbV9MlEd1btkZGVYHgqw7gjivebf49+ENc01LfxP4enL9WiMMdzCT6jcQf0r5yooA98u/jf4S0CzmTwV4TS3upAQZZLeOBB6EhCS/0OPrWD4V+M6aX4W12w1y2vNQ1HVJ5pjcKVC/PGqAH0A29hwK8hooAfDNJbzxzwyNHLGwdHU4KsDkEH1r3XQ/j9YXejLpnjTQjfgKFkmhRJFm92jfAB+h/AV4PRQB9BRfE/4R6VOt3p3hFzdKdyMmnwqUPqCW4/CuA+I3xZ1Px6q2KQCw0mN9626uWaQ9i7d8dgBgZ78GvPKKAFVmRgysVYHIIOCDXt/hH9oKaz05NO8V6c+oxquz7VCQZHXp86twx98jPfPWvD6KAPodfip8I7WUXlv4RIuc7gU0uAMp9c7uPqK47x/8b9T8WWMmlaXbHTNNkBWb590sy+hOMKPUDr644rymigArvfh58VNW8AyNbpGL3SpW3SWkjFdp7sjfwn14IP61wVFAH0VcfF/4Xa4Rdaz4Vklu8fM0+nwysfYNuyR9cVheJPjvbR6O+k+B9G/smFxj7Q0aRsgPXZGmVB98n6V4lRQB6vqvxY0/Uvg+ng1tPu/tot4YjcMy7MxurZ656LXlFFFABRRRQB6z8K/ixpngHw/eade6dd3Mk90Zw0JUADYq45PX5a8moooA9Z8P/FjTNH+El14Pl067kuprW6gE6FdgMu/B6543DNeTUUUAFes+LPixpniD4YWnhWDTruK5hit0MzldhMYAPQ55xXk1FABRRRQAV1HgLxteeA/Ea6pbRCeJ0MVxbs20SoeevYggEGuXooA+ir/41/DfVyl3qnhO4vLxBhTcWNvKR7BmbOK8b8eeIdM8T+KZdT0nTRp1o0aIsAVV5UYzheK5migD0z4efGTVfBNsumXUH9o6SCSkTPtkhz12Nzx32n8Mc13s/wAWfhRqkpvdR8JtLdnlmm02B2Y/727n8a+dqKAPdfEf7Qca6Y2neDtHNguzalxOqL5Q/wBmNcrn3Jx7V4dPPLdXEtxcSPLNKxeSRzlmYnJJPc5qOigD2vwd8ejYaNHo/ivTZNTt0TyxcRlWdk7K6Nw3HfI989a1f+FkfBy3cXcPg4tODkKNNhGD9C2B+FfP9FAHqvxD+NV94u0+TRtLtP7O0p8CTLZlmUfwnHCr7DPTrjivKqKKAPc/Bfx2sLHwzDoXirS57yOCIQLNCqSebGBgB0cgcDAzk59PWl4t+Jfw/wBQ8MajpWgeEFtLi6j2pcfYoIdhyDn5ST2rxmigDtPhh40tPAniqXVr21nuYntXgCQkbsllOee3y1Q8f+Jbfxf431HXbWCWCG68vbHLjcNsaoc446rXNUUAej/Cf4jWHw+n1WS+srm6F4sQQQFfl2ls5yf9quL8RalHrPifVtUiRo4728muER+qh3LAH35rMooAK9Z+H3xY0zwf4GvNButOu5555ZXWSIrtAdFUZyc9q8mooAK6zwJ8QdY8Bak9xp5Wa1mwLi0lJ2SAd/Zh2P8AOuTr6P8Ag/rfh3xZ4Dm8GanHbxXwieGRAqo1xETkMp7sv58A0ARzfHPwDrluh8QeFbieZR9yW1huVX2BZh/IVi6z8erGy0ySw8EeHY9M8wcTyRxpsPqI0yCfcn8DVLWv2dfEdteP/Y97ZXtoSdnmuYpAPQjGPxB/AVc8N/s56rJfJJ4j1G1gs1ILRWjF5H9skAL9efpQB2OjyzQ/sz3lzqEzST3On3krySHJZpXkIJJ6k7h+dfL1e8/G3x/pi6PH4I8PSRNBHsW7aA/u41TG2JfXBAJx02geuPBqAPXvhb8XNL8B+F59KvdOvLmWW8e4DwlcAFEXHJ6/Ka8nu5hcXk86ggSSM4B7ZOahooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAClR2jdXRirKchgcEH1pKKAOtsvih430+MRweJb8qOnnOJcfi4NV9V+IXi7WoGgv/ABDfywsMNGsuxWHoQuAR9a5qigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoo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math_437	MCQ_OnlyTxt	Given the sequence 1, 1, 3, 1, 3, 9, 1, 3, 9, 27, 1, 3, 9, 27, 81,..., if the sum of the first $n$terms of the sequence is $S_n$, then the value of the smallest positive integer $n$that satisfies $S_n > 1600$is ()	['A. 26', 'B. 27', 'C. 28', 'D. 29']	C	math	数列	['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eEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMMcX2hrUS+bH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AKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_438	MCQ	A bee starts from hive $A$and climbs to the right, and can only climb to the two adjacent hives on the right at a time (as shown in the picture<image_1>). For example, from hive $A$, you can only climb to hive 1 or 2, and from hive 1, you can only climb to hive 2 or 3,..., By analogy, using $a_n$to represent the number of methods for bees to climb to the $n$hive, then the remainder of $a_{2023}$divided by 7 is ()	['A. 2', 'B. 3', 'C. 4', 'D. 6']	D	math	数列	['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']	['math_438.jpg']
math_439	MCQ	<image_1>In the regular triangular frustum $ABC_1-ABC$,$AB = 2A_1B_1$,$P, D$are the points on the line segments $B_1C_1, BC$respectively,$O_1, O$are the centers of the upper and lower bases, and $M$is a point within the base $ABC$. The following conclusions are correct ()	['A. $AA_1 \\perp BC$', 'B. If $BD = \\frac{1}{3}BC, AA_1 \\parallel$Plane $B_1DM$, then the trajectory length of point $M$is equal to $\\frac{1}{3}AB$', 'C. $V_{A-CBB_1C_1} = \\frac{3}{2}V_{A_1-ABC}$', 'D. When $PD \\perp BC$, the figure formed by the four points $O_1, O, Q, and P$is a right-angled trapezoid']	AC	math	空间向量与立体几何	['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']	['math_439.jpg']
math_440	MCQ	<image_1>As shown in the figure, it is known that the axial section of the truncated cone is $ABCD$, where $AB = 3CD = 12\sqrt{3}, AD = 8, M$ $is the midpoint of the arc $\widehat{AB}$, and $\overrightarrow{DE} = 2\overrightarrow{EA}$, then ()	['A. The volume of the round table is $208\\pi$', 'B. The maximum value of the angle formed by the straight line where the bus bar is located and the plane $ABCD$is $\\frac{\\pi}{3}$', 'C. For a section passing through any two bus bars to form a round table, the maximum value of the cross-section area is $32\\sqrt{3}$', 'D. The length of the intersection line between the plane passing through the three points of $C, E, and M$and the lower bottom surface of the round table is $\\frac{36\\sqrt{3}}{5}$']	ABD	math	空间向量与立体几何	['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math_441	MCQ_OnlyTxt	It is known that the edge length of the regular tetrahedron $A-BCD$is 6, and the points $M$and $N$are the midpoints of $BC and AD$respectively, then the following geometries can be placed into the regular tetrahedron $A-BCD$as a whole ()	['A. cone with base on plane $BCD$, base radius $\\sqrt{2}$, and height $2\\sqrt{6}$', 'B. A cylinder with a base on the plane $BCD$, a base radius of $\\sqrt{2}$, and a height of 1', 'C. cone with a straight line $MN$, a base radius $\\sqrt{2}$, and a height of 2', 'D. Cylinder with axis straight $MN$, base radius $\\sqrt{2}$, height 0.2']	ACD	math	空间向量与立体几何	['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math_442	MCQ	<image_1>As shown in the figure, in a cube $ABCD-A_1B_1C_1D_1$with an edge length of 2, the point $P$in space satisfies $\overriding {AP} = \overriding {AD} + \lambda \overriding {AB} + \mu \overriding {AA_1}$, and $\lambda \in [0,1], \mu \in [0,1]$, then the following statement is correct ()	['A. If $\\mu = 1$, then $BP \\perp AD$', 'B. If $4P = \\sqrt{5}$, the maximum value of $\\lambda + 2\\mu$is $\\frac{\\sqrt{5}}{2}$', 'C. If $\\lambda = 1$, then the minimum value of the cross-sectional area of the square in plane $BPD_1$is $\\sqrt{6}$', 'D. If $\\lambda + \\mu = 1$, the minimum value of the tangent value of the angle between plane $ACD_1$and plane $ABP$is $2\\sqrt{2}$']	ABD	math	空间向量与立体几何	['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math_443	MCQ	<image_1>As shown in the figure, a rectangular container $ABCD-A_1B_1C_1D_1$made of transparent plastic is filled with some water. It is known that $BC = 8$,$CD = 3\sqrt{3}$, and $AA_1 = 8\sqrt{2}$. When the bottom surface $ABCD$is placed horizontally, the water surface position satisfies $BF:FB_1 = 1:3$, and the geometric volume of the water-containing part of the container is $V$. The following proposition is correct ()	['A. Fix one side of the bottom surface of the container with $BC$on the ground, tilt the container, and the part with water is always prismatic', 'B. Fix a vertex $B$on the bottom of the container on the ground, tilt the container, the part with water may be a triangular pyramid', 'C. A cone with a volume of $V$and a height of $4\\sqrt{2}$cannot be placed in a sphere with a radius of $3\\sqrt{2}$', 'D. A cube with a volume of $V$can be rotated arbitrarily in a cone with a regular triangle in axial section and a base radius of $3\\sqrt{6}$']	ACD	math	空间向量与立体几何	['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']	['math_443.jpg']
math_444	OPEN_OnlyTxt	In the regular triangular pyramid $P-ABC$,$PA = PB = PC = 3\sqrt{2}$,$AB = 6$, point $D$moves inside $ABC$(including the boundary), and the distances from point $D$to edges $PA, PB, PC$are recorded as $d_1, d_2, d_3$respectively, and $d_1^2 + d_2^2 + d_3 = 20$, then the length of the motion path of point $D$is		2\pi	math	空间向量与立体几何	['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math_445	OPEN	<image_1>As shown in the figure, in the quadrangular pyramid $P-ABCD$,$PA \perp$plane $ABCD$, and the quadrangular $ABCD$is a right-angled trapezoid, where $DA \perp AB$,$AD \parallel BC$,$PA=2AD=BC=2, AB=2\sqrt{2}$. If there is a curve $E$passing through point $C$in the plane $ABCD$, any moving point $Q$on the curve satisfies that the angle formed by $PQ$and $AD$is equal to the angle formed by $PC$and $AD$. In the plane $ABCD$, let the point $Q$be the moving point of the above-mentioned curve $E$on a section of curve $CG$inside (including the boundary) of the right-angled trapezoid $ABCD$, where $G$is the intersection of curves $E$and $DC$. A circle with $B$as the center of the circle and $BQ$as the radius intersects the edges $AB$and $BC$of the trapezoid at two points $M$and $N$respectively. When the $Q$point moves on the curve segment $GC$, find the value range of the volume of the tetrahedron $P-BMN$.		\left[\frac{10}{9}, \frac{4}{3}\right]	math	空间向量与立体几何	['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math_446	OPEN	In $\triangle NBC$,$\angle B = 90^\circ$,$AD \parallel BC$,$NA = CD = 2AB = 2$, as shown in the figure, <image_1>fold $NAD$along $AD$to $\triangle PAD$. If the size of the dihedral corner $P-AD-B$is $120^\circ$. Is there a point $E$on line segment $PD$such that the cosine of the angle formed by plane $ABE$and plane $PDC$is $\frac{1}{5}$? If it exists, determine the location of point $E$; if it does not exist, explain the reason.		There is a point $E$, which satisfies the meaning of the question when $DE = \frac{1}{2}DP$or $DE = \frac{4}{5}DP$.	math	空间向量与立体几何	['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math_447	OPEN_OnlyTxt	It is known that the bottom surface $ABCD$of the quadrangular pyramid $S-ABCD$is parallelogram,$SA = AB = SB$,$SB \perp AC$,$\angle ABC = 60^\circ$,$BC = 2$,$AB = 1$. Let $T$be the point on line segment $SD$. Plane $\alpha$passes through points $B$,$T$, and $AC \parallel$Plane $\alpha$. Explore whether there is a point $T$, so that the tangent of the angle formed between plane $SAD$and plane $\alpha$is $\sqrt{34}$. If it exists, find the value of $\frac{ST}{SD}$; if it does not exist, please explain the reason.		Yes, the value of $\frac{ST}{SD}$is $\frac{1}{5}$or $\frac{1}{2}$	math	空间向量与立体几何	['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math_448	OPEN	<image_1>As shown in the figure, in the pentahedron $ABCDEF$, the side length of the diamond $ABCD$is $2$,$EA = EB = FC = FD = \sqrt{10}$, and $EF &gt; BC$. When the volume of pentahedron $ABCDEF$is the largest, find the cosine of the angle between plane $ABE$and plane $BCFE$.		\frac{\sqrt{31}}{31}	math	空间向量与立体几何	['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math_449	MCQ	"When studying the total probability formula, we transform the study of the occurrence of an event into the analysis of several prerequisites for the occurrence of the situation. This is an important recursive idea. In <image_1>the honeycomb-shaped regular hexagonal map as shown in the figure, the ""○"" in the upper left corner and the lower right corner represent the starting point and the end point respectively, and the solid dot ""●"" in the honeycomb grid represents the mine. There is a minesweeping robot at the starting point receives the command and moves to the end point. Each movement can only move in the three directions shown by the arrow. If you move to the minefield, the mines will be eliminated immediately. Remember that during the movement, the maximum number of mines that the robot can remove is $M$. Now add two mines (indicated by the cross ""x"") to the figure, the following methods can increase $M$and only increase is: ()."	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	BD	math	计数原理与概率统计	['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', 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', 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', 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', 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']	['math_449_1.jpg', 'math_449_2.jpg', 'math_449_3.jpg', 'math_449_4.jpg', 'math_449_5.jpg']
math_450	MCQ	As shown in the figure<image_1>, a triangle is divided into 9 rooms, and the 2 rooms with common sides are called adjacent rooms. A small ball moves from one room to the adjacent room with equal probability at a time, then ()	['A. Put 2 balls in different rooms, and the probability that the rooms are not adjacent is $\\frac{3}{4}$', 'B. Place $k$balls in different rooms. If the rooms are not adjacent to each other, then $k \\leq 6$', 'C. There are 6 paths for the ball to depart from room C and reach room H after 4 movements', 'D. The probability that the ball starts from room C and reaches room H after 20 moves is $\\frac{341}{1024}$']	ABD	math	计数原理与概率统计	['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']	['math_450.jpg']
math_451	OPEN	As shown in Figure 1<image_1>, a circle is divided into n (n \geq2) sectors, each sector is colored with one of k colors. Adjacent sectors are required to have different colors. There are a_n = (k-1)^n + (k-1) \times (-1)^n methods. As shown in Figure 2<image_2>, there are 4 different colors of paint. If you paint the 12 areas in the picture, the colors of adjacent areas are required to be different, then there are () different coloring methods (answer with numbers)		201852	math	计数原理与概率统计	['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'math_451_2.jpg']
math_452	OPEN_OnlyTxt	Given that events A, B satisfy 0 < P(A) < 1, 0 < P(B) < 1, P(\overline{A}B) - P(A\overline{B}) = 2P (\overline {B}), then P(B)|\overline{A})·P(\overline{A}| The value range of\overline{B}) is		\left[0, \frac{2}{3}\right]	math	计数原理与概率统计	['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math_453	OPEN_OnlyTxt	A shopping mall has launched a shopping lottery promotion. The rules of the event are as follows: ① For every 100 yuan spent by customers in the mall, they can get 1 lottery ticket. ② Each lottery ticket can be held once, that is, one ball is randomly picked up from a box containing 4 white balls and 2 red balls (each ball has the same possibility of being touched). Reward rules: If you find a white ball, you will not win the prize. The white ball will be returned to the original box, and the lottery draw will end; if you find a red ball, you will win the prize and you will receive 1 gift. The red ball will not be returned to the original box. You will also get an additional chance to draw the prize (There is no need to use a new lottery ticket for this lottery opportunity.) Continue to randomly draw 1 ball from the current box, and the reward rules remain unchanged;③ Starting from the second lottery ticket, each lottery ticket will be drawn based on the previous lottery ticket;④ If the customer obtains 2 gifts (that is, the customer pulls out both red balls) or uses up the lottery ticket, the customer's shopping lottery will end. The customer spent 1000 yuan, let X represent the number of lottery tickets used by the customer in this lottery, and find the expectation E(X) of X.		7 - 10 \times \left(\frac{4}{5}\right)^{10} + 3 \times \left(\frac{2}{3}\right)^{10}	math	计数原理与概率统计	['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bvy/tYdRzJJwcYzxkd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A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i8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMMcX2hrUS+bHJFjJaNuT05wSc9vfwSvqP4NfadL+DN1dauGjsw1xcQ+YOlvsBJ+mQ5/GvlygD6b/aA/5JbpX/AGEIf/RMlfMlfT3x3he8+ElhcQKXiiu7eZ2A4CGN1B/Nl/OvmGgD1r9nf/kpFx/2DZf/AEOOsX42/wDJXtd/7d//AERHW1+zv/yUi4/7Bsv/AKHHWL8bf+Sva7/27/8AoiOgDuv2Z/8Aj88Sf9c7f+cleTePWZ/iJ4lLHJ/tS5H4CVhXrP7M/wDx+eJP+udv/OSvJfHf/JQvEv8A2Fbr/wBGtQBz9fTXwP8A+SOar/18XP8A6KSvmWvpr4H/APJHNV/6+bn/ANFJQB8y19SfH0O/wstmhP7sXsJbH93Y+P1Ir5br6v0xLb4q/A2OyWRTdm1WBiT/AKu5iAwT6ZIB+jUAfKFFWtS0290fUJrDUbaS2uoW2yRSLgg/4e/er3hrw1qfizWoNL0u3eWWRhvcD5Yl7sx7Af8A1utAH0R4ZSSP9mCcSnLHSb1h9CZSP0xXy/X2Z4j0y00X4PazpdiQbez0eeBTnJ+WNgc++c596+M6APoX9nWUJ4Z8Tc/dkRv/ABxv8K+eq29G8H+IvENo91pGjXd5bo/ltJDHlQ2AcZ9cEfnWM6NHIyOpV1JBB7EUANooooAKKKKACiiigAooooAKKKKACtnwnrz+GPFmma0iswtJ1d0U4LJ0ZR9VJH41jUUAes/FP4vWvjvQrXStOsbq0iSfzpjMV+fAIUDB9yfwFeTUUUAeh/Cn4kRfD6+1E3lrPc2d5EoMcJGRIp4PPbDN+lZXxI8Zjx14vk1aKGSG2WFIYIpSCyqBk5xx94sfxrkaKACvWfD/AMWNM0f4SXXg+XTruS6mtbqAToV2Ay78HrnjcM15NRQAV6zrHxY0zUvg/H4Mj067S7S1t4PPYr5eY3Rieuedh/OvJqKACvWdY+LGmal8H4/BkenXaXaWtvB57FfLzG6MT1zzsP515NRQAUUUUAFem/Cf4maf8PYdVS+sbq6N60RTyCo27A2c5P8AtCvMqKALmrXi6hrF9eopVLi4klVW6gMxOD+dU6KKACvbvAXx4j8O+F4NI1uxu72S1+SCaFlz5X8Ktk9R0Htj0rxGigDf8b6/B4o8ZalrVtDJDDdyB1jkxuXCgc4+lYFFFAHVeDPiDr/gW5eTSp1a3lOZbWcFonPrjIwfcEGvX7f9oTw1qlkkPiPwzOx/iSNY7iPPqA5WvnaigD6NX4zfDPS3WbTPC0qzjkNDp8ERB+u7Nch4v+P2u63BNZaLbrpNrICplDl5yPZuAv4DI9a8hooAUksSSSSeST3pKKKACvXdF+Lml6Z8IpfB0mnXj3b2VzbCdSuzMpcg9c4G8flXkVFABRRRQAUUUUAafh3UotG8TaVqk0bSRWd5DcOiYywRwxAz34r1HxR8dbi88T6TrHh22ntVs4pIp4LrBWdWKkg4P+yOeorxuigD6E/4XJ8OfECpP4k8Ik3uPmZ7SG4A9g5IY/lTdQ+P3h/R9Maz8H+GzC2Pk86JIIkPrsQnd+Yr59ooAv6zrOoeINWuNU1S5e4u523O7foAOwA4AHSqKsyMGVirA5BBwQaSigD3Dwj+0FNZ6cmneK9OfUY1XZ9qhIMjr0+dW4Y++RnvnrWuvxU+EdrKLy38IkXOdwKaXAGU+ud3H1FfPFFAHq3j/wCN+p+LLGTStLtjpmmyArN8+6WZfQnGFHqB19ccV5TRRQAUUUUAanh7xBqHhfXLbV9MlEd1btkZGVYHgqw7gjivebf49+ENc01LfxP4enL9WiMMdzCT6jcQf0r5yooA98u/jf4S0CzmTwV4TS3upAQZZLeOBB6EhCS/0OPrWD4V+M6aX4W12w1y2vNQ1HVJ5pjcKVC/PGqAH0A29hwK8hooAfDNJbzxzwyNHLGwdHU4KsDkEH1r3XQ/j9YXejLpnjTQjfgKFkmhRJFm92jfAB+h/AV4PRQB9BRfE/4R6VOt3p3hFzdKdyMmnwqUPqCW4/CuA+I3xZ1Px6q2KQCw0mN9626uWaQ9i7d8dgBgZ78GvPKKAFVmRgysVYHIIOCDXt/hH9oKaz05NO8V6c+oxquz7VCQZHXp86twx98jPfPWvD6KAPodfip8I7WUXlv4RIuc7gU0uAMp9c7uPqK47x/8b9T8WWMmlaXbHTNNkBWb590sy+hOMKPUDr644rymigArvfh58VNW8AyNbpGL3SpW3SWkjFdp7sjfwn14IP61wVFAH0VcfF/4Xa4Rdaz4Vklu8fM0+nwysfYNuyR9cVheJPjvbR6O+k+B9G/smFxj7Q0aRsgPXZGmVB98n6V4lRQB6vqvxY0/Uvg+ng1tPu/tot4YjcMy7MxurZ656LXlFFFABRRRQB6z8K/ixpngHw/eade6dd3Mk90Zw0JUADYq45PX5a8moooA9Z8P/FjTNH+El14Pl067kuprW6gE6FdgMu/B6543DNeTUUUAFes+LPixpniD4YWnhWDTruK5hit0MzldhMYAPQ55xXk1FABRRRQAV1HgLxteeA/Ea6pbRCeJ0MVxbs20SoeevYggEGuXooA+ir/41/DfVyl3qnhO4vLxBhTcWNvKR7BmbOK8b8eeIdM8T+KZdT0nTRp1o0aIsAVV5UYzheK5migD0z4efGTVfBNsumXUH9o6SCSkTPtkhz12Nzx32n8Mc13s/wAWfhRqkpvdR8JtLdnlmm02B2Y/727n8a+dqKAPdfEf7Qca6Y2neDtHNguzalxOqL5Q/wBmNcrn3Jx7V4dPPLdXEtxcSPLNKxeSRzlmYnJJPc5qOigD2vwd8ejYaNHo/ivTZNTt0TyxcRlWdk7K6Nw3HfI989a1f+FkfBy3cXcPg4tODkKNNhGD9C2B+FfP9FAHqvxD+NV94u0+TRtLtP7O0p8CTLZlmUfwnHCr7DPTrjivKqKKAPc/Bfx2sLHwzDoXirS57yOCIQLNCqSebGBgB0cgcDAzk59PWl4t+Jfw/wBQ8MajpWgeEFtLi6j2pcfYoIdhyDn5ST2rxmigDtPhh40tPAniqXVr21nuYntXgCQkbsllOee3y1Q8f+Jbfxf431HXbWCWCG68vbHLjcNsaoc446rXNUUAej/Cf4jWHw+n1WS+srm6F4sQQQFfl2ls5yf9quL8RalHrPifVtUiRo4728muER+qh3LAH35rMooAK9Z+H3xY0zwf4GvNButOu5555ZXWSIrtAdFUZyc9q8mooAK6zwJ8QdY8Bak9xp5Wa1mwLi0lJ2SAd/Zh2P8AOuTr6P8Ag/rfh3xZ4Dm8GanHbxXwieGRAqo1xETkMp7sv58A0ARzfHPwDrluh8QeFbieZR9yW1huVX2BZh/IVi6z8erGy0ySw8EeHY9M8wcTyRxpsPqI0yCfcn8DVLWv2dfEdteP/Y97ZXtoSdnmuYpAPQjGPxB/AVc8N/s56rJfJJ4j1G1gs1ILRWjF5H9skAL9efpQB2OjyzQ/sz3lzqEzST3On3krySHJZpXkIJJ6k7h+dfL1e8/G3x/pi6PH4I8PSRNBHsW7aA/u41TG2JfXBAJx02geuPBqAPXvhb8XNL8B+F59KvdOvLmWW8e4DwlcAFEXHJ6/Ka8nu5hcXk86ggSSM4B7ZOahooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAClR2jdXRirKchgcEH1pKKAOtsvih430+MRweJb8qOnnOJcfi4NV9V+IXi7WoGgv/ABDfywsMNGsuxWHoQuAR9a5qigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK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math_454	MCQ_OnlyTxt	Let x_n be the positive real root of the equation x^2 + \log_{n+1}x^n = n^2 + 3n about x, and let a_n = \left[ \frac{x_n}{2} \right], where [x] represents the largest integer not exceeding x. Let the sum of the first n terms of the sequence\{a_n\} be S_n, then S_{2023} =()	['A. 1012^2', 'B. 1012\\times1013', 'C. 1013^2', 'D. 1013\\times1014']	B	math	函数与导数	['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math_455	MCQ_OnlyTxt	It is known that the domain of function f(x) is\mathbb{R}, and f(x)f(1-y) + f(y)f(1-x) = 2f(x+y), f(0) = 1, then ()	['A. f(2) = 1', 'B. \\exists x_0 \\in \\mathbb{R}，f(x_0) <0', 'C. The image of f(x) is symmetric about point (0,1)', 'D. f(x) is an even function']	ACD	math	函数与导数	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFF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math_456	MCQ_OnlyTxt	The equation for curve C is given as| x| ^{\frac{1}{2}} + |y| ^{\frac{1}{2}}} = 1, then the following statements are correct ()	['A. Curve C is symmetric about the origin', 'B. If a point on the P(x, y) curve C, then y ≥ 16| x|', 'C. If curve C and curve (a -|x|)y = 1 has a common point, then a ≥ 1', 'D. If the point $(\\frac{1}{n+1}, a_n)$ ($n \\in \\mathbb{N}^*$) lies on the curve $C$, then $\\frac{1}{\\sqrt{|a_1|}} + \\frac{1}{\\sqrt{|a_2|}} + \\cdots + \\frac{1}{\\sqrt{|a_n|}} > (\\sqrt{n+1} - 1)^2$']	ACD	math	函数与导数	['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Ek4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMMcX2hrUS+bHJFjJaNuT05wSc9vfwSvqP4NfadL+DN1dauGjsw1xcQ+YOlvsBJ+mQ5/GvlygD6b/aA/5JbpX/AGEIf/RMlfMlfT3x3he8+ElhcQKXiiu7eZ2A4CGN1B/Nl/OvmGgD1r9nf/kpFx/2DZf/AEOOsX42/wDJXtd/7d//AERHW1+zv/yUi4/7Bsv/AKHHWL8bf+Sva7/27/8AoiOgDuv2Z/8Aj88Sf9c7f+cleTePWZ/iJ4lLHJ/tS5H4CVhXrP7M/wDx+eJP+udv/OSvJfHf/JQvEv8A2Fbr/wBGtQBz9fTXwP8A+SOar/18XP8A6KSvmWvpr4H/APJHNV/6+bn/ANFJQB8y19SfH0O/wstmhP7sXsJbH93Y+P1Ir5br6v0xLb4q/A2OyWRTdm1WBiT/AKu5iAwT6ZIB+jUAfKFFWtS0290fUJrDUbaS2uoW2yRSLgg/4e/er3hrw1qfizWoNL0u3eWWRhvcD5Yl7sx7Af8A1utAH0R4ZSSP9mCcSnLHSb1h9CZSP0xXy/X2Z4j0y00X4PazpdiQbez0eeBTnJ+WNgc++c596+M6APoX9nWUJ4Z8Tc/dkRv/ABxv8K+eq29G8H+IvENo91pGjXd5bo/ltJDHlQ2AcZ9cEfnWM6NHIyOpV1JBB7EUANooooAKKKKACiiigAooooAKKKKACtnwnrz+GPFmma0iswtJ1d0U4LJ0ZR9VJH41jUUAes/FP4vWvjvQrXStOsbq0iSfzpjMV+fAIUDB9yfwFeTUUUAeh/Cn4kRfD6+1E3lrPc2d5EoMcJGRIp4PPbDN+lZXxI8Zjx14vk1aKGSG2WFIYIpSCyqBk5xx94sfxrkaKACvWfD/AMWNM0f4SXXg+XTruS6mtbqAToV2Ay78HrnjcM15NRQAV6zrHxY0zUvg/H4Mj067S7S1t4PPYr5eY3Rieuedh/OvJqKACvWdY+LGmal8H4/BkenXaXaWtvB57FfLzG6MT1zzsP515NRQAUUUUAFem/Cf4maf8PYdVS+sbq6N60RTyCo27A2c5P8AtCvMqKALmrXi6hrF9eopVLi4klVW6gMxOD+dU6KKACvbvAXx4j8O+F4NI1uxu72S1+SCaFlz5X8Ktk9R0Htj0rxGigDf8b6/B4o8ZalrVtDJDDdyB1jkxuXCgc4+lYFFFAHVeDPiDr/gW5eTSp1a3lOZbWcFonPrjIwfcEGvX7f9oTw1qlkkPiPwzOx/iSNY7iPPqA5WvnaigD6NX4zfDPS3WbTPC0qzjkNDp8ERB+u7Nch4v+P2u63BNZaLbrpNrICplDl5yPZuAv4DI9a8hooAUksSSSSeST3pKKKACvXdF+Lml6Z8IpfB0mnXj3b2VzbCdSuzMpcg9c4G8flXkVFABRRRQAUUUUAafh3UotG8TaVqk0bSRWd5DcOiYywRwxAz34r1HxR8dbi88T6TrHh22ntVs4pIp4LrBWdWKkg4P+yOeorxuigD6E/4XJ8OfECpP4k8Ik3uPmZ7SG4A9g5IY/lTdQ+P3h/R9Maz8H+GzC2Pk86JIIkPrsQnd+Yr59ooAv6zrOoeINWuNU1S5e4u523O7foAOwA4AHSqKsyMGVirA5BBwQaSigD3Dwj+0FNZ6cmneK9OfUY1XZ9qhIMjr0+dW4Y++RnvnrWuvxU+EdrKLy38IkXOdwKaXAGU+ud3H1FfPFFAHq3j/wCN+p+LLGTStLtjpmmyArN8+6WZfQnGFHqB19ccV5TRRQAUUUUAanh7xBqHhfXLbV9MlEd1btkZGVYHgqw7gjivebf49+ENc01LfxP4enL9WiMMdzCT6jcQf0r5yooA98u/jf4S0CzmTwV4TS3upAQZZLeOBB6EhCS/0OPrWD4V+M6aX4W12w1y2vNQ1HVJ5pjcKVC/PGqAH0A29hwK8hooAfDNJbzxzwyNHLGwdHU4KsDkEH1r3XQ/j9YXejLpnjTQjfgKFkmhRJFm92jfAB+h/AV4PRQB9BRfE/4R6VOt3p3hFzdKdyMmnwqUPqCW4/CuA+I3xZ1Px6q2KQCw0mN9626uWaQ9i7d8dgBgZ78GvPKKAFVmRgysVYHIIOCDXt/hH9oKaz05NO8V6c+oxquz7VCQZHXp86twx98jPfPWvD6KAPodfip8I7WUXlv4RIuc7gU0uAMp9c7uPqK47x/8b9T8WWMmlaXbHTNNkBWb590sy+hOMKPUDr644rymigArvfh58VNW8AyNbpGL3SpW3SWkjFdp7sjfwn14IP61wVFAH0VcfF/4Xa4Rdaz4Vklu8fM0+nwysfYNuyR9cVheJPjvbR6O+k+B9G/smFxj7Q0aRsgPXZGmVB98n6V4lRQB6vqvxY0/Uvg+ng1tPu/tot4YjcMy7MxurZ656LXlFFFABRRRQB6z8K/ixpngHw/eade6dd3Mk90Zw0JUADYq45PX5a8moooA9Z8P/FjTNH+El14Pl067kuprW6gE6FdgMu/B6543DNeTUUUAFes+LPixpniD4YWnhWDTruK5hit0MzldhMYAPQ55xXk1FABRRRQAV1HgLxteeA/Ea6pbRCeJ0MVxbs20SoeevYggEGuXooA+ir/41/DfVyl3qnhO4vLxBhTcWNvKR7BmbOK8b8eeIdM8T+KZdT0nTRp1o0aIsAVV5UYzheK5migD0z4efGTVfBNsumXUH9o6SCSkTPtkhz12Nzx32n8Mc13s/wAWfhRqkpvdR8JtLdnlmm02B2Y/727n8a+dqKAPdfEf7Qca6Y2neDtHNguzalxOqL5Q/wBmNcrn3Jx7V4dPPLdXEtxcSPLNKxeSRzlmYnJJPc5qOigD2vwd8ejYaNHo/ivTZNTt0TyxcRlWdk7K6Nw3HfI989a1f+FkfBy3cXcPg4tODkKNNhGD9C2B+FfP9FAHqvxD+NV94u0+TRtLtP7O0p8CTLZlmUfwnHCr7DPTrjivKqKKAPc/Bfx2sLHwzDoXirS57yOCIQLNCqSebGBgB0cgcDAzk59PWl4t+Jfw/wBQ8MajpWgeEFtLi6j2pcfYoIdhyDn5ST2rxmigDtPhh40tPAniqXVr21nuYntXgCQkbsllOee3y1Q8f+Jbfxf431HXbWCWCG68vbHLjcNsaoc446rXNUUAej/Cf4jWHw+n1WS+srm6F4sQQQFfl2ls5yf9quL8RalHrPifVtUiRo4728muER+qh3LAH35rMooAK9Z+H3xY0zwf4GvNButOu5555ZXWSIrtAdFUZyc9q8mooAK6zwJ8QdY8Bak9xp5Wa1mwLi0lJ2SAd/Zh2P8AOuTr6P8Ag/rfh3xZ4Dm8GanHbxXwieGRAqo1xETkMp7sv58A0ARzfHPwDrluh8QeFbieZR9yW1huVX2BZh/IVi6z8erGy0ySw8EeHY9M8wcTyRxpsPqI0yCfcn8DVLWv2dfEdteP/Y97ZXtoSdnmuYpAPQjGPxB/AVc8N/s56rJfJJ4j1G1gs1ILRWjF5H9skAL9efpQB2OjyzQ/sz3lzqEzST3On3krySHJZpXkIJJ6k7h+dfL1e8/G3x/pi6PH4I8PSRNBHsW7aA/u41TG2JfXBAJx02geuPBqAPXvhb8XNL8B+F59KvdOvLmWW8e4DwlcAFEXHJ6/Ka8nu5hcXk86ggSSM4B7ZOahooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAClR2jdXRirKchgcEH1pKKAOtsvih430+MRweJb8qOnnOJcfi4NV9V+IXi7WoGgv/ABDfywsMNGsuxWHoQuAR9a5qigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACi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math_457	OPEN_OnlyTxt	If the equation about x| x^2 - 2ax|  + |x^2 + 2ax - 3a^2| = 2x + a has two unequal real roots, then the range of values for the real number a is ()		\left(-\frac{1}{3}, 3\right)	math	函数与导数	['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AooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_458	MCQ_OnlyTxt	Known curve C:| x| - \frac{y| y|}{4} = 1, P(x_0, y_0) is the point above C, then the following statements are correct ()	['A. There is a point P(x_0, y_0) such that 2x_0 - y_0 = -1', 'B. \\left| 2x_0 - y_0 + \\sqrt{5}\\right| The range of values for is\\left[\\sqrt{5}, 2\\sqrt{2} + \\sqrt{5}\\right]', 'C. Ruo\\left| 2x_0 - y_0 + m\\right|  + \\left| 2x_0 - y_0 + n\\right| The value of is independent of x_0, y_0, and m > 0, n < 0, then the value range of n is\\left(-\\infty, -2\\sqrt 2}\\right]', 'D. Ruo\\left| 2x_0 - y_0 + m\\right|  + \\left| 2x_0 - y_0 + n\\right| if the value of is independent of x_0, y_0, its minimum value is 2\\sqrt{2}']	BCD	math	平面解析几何	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAE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math_459	MCQ_OnlyTxt	The straight line passing through point P(2,0) intersects the parabola C: y^2 = 4x at points A and B. The tangent of parabola C at point A and the straight line x = -2 intersect at point N, and passes through point N and makes NM AP intersect at point M, then the following conclusions are correct ()	['A. Straight line NB and parabola C have 2 points in common', 'B. Straight line MN always crosses the fixed point', 'C. The trajectory equation of point M is (x−1)^2 + y^2 = 1(x ≠ 0)', 'D. \\frac{|MN| ^3}{|AB|} is\\frac{25\\sqrt{5}}{8}']	BCD	math	平面解析几何	['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math_460	OPEN_OnlyTxt	Hyperbola E: \frac{x^2}{a^2} - \frac{y^2}{b^2} = 1(a > b > 0), the focal length is 2\sqrt{2}, the left and right focuses are F_1 and F_1 respectively, the moving point P is on the right branch of the hyperbola, and two perpendicular lines passing through P intersect the two points M and N respectively. if| PM| +| PF_1| The minimum value is 3, then| PM| +| PN| The minimum value of is ().		\frac{7\sqrt{2}}{25}	math	平面解析几何	['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math_461	OPEN_OnlyTxt	Given the hyperbola E: $\\frac{x^2}{a^2} - \\frac{y^2}{b^2} = 1$ ($a > 0, b > 0$) with right focus F and left vertex A. Let P be a point on the right branch of E. The chord length intercepted by the line PF on the circle O: $x^2 + y^2 = a^2 + b^2$ is $\\frac{1}{2}\\sqrt{a^2 + b^2}$, and $\\overrightarrow{PA} \\cdot \\overrightarrow{PF} = \\overrightarrow{PA} \\cdot \\overrightarrow{FA}$. Find the eccentricity of E.		\frac{8}{5} \text{or} 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math_462	OPEN_OnlyTxt	Let M be a set of straight lines. If the tangent at any point on C is in M, and any straight line in M is a tangent at a point on C, then C is called the envelope curve of M. The envelope curve of M_1 is known as C_2: x^2 = 4y, and the straight lines l_1, l_2 \in M_2. Let the common points of l_1, l_2 and C_2 be P and Q respectively, and let l_1 \cap l_2 = A, and the focus of C_2 be F. If point A is on the circle x^2 + (y+1)^2 = 1, find\frac{|FA|}{|FT| The maximum value of}.		\frac{1+\sqrt{5}}{2}	math	平面解析几何	['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math_463	OPEN_OnlyTxt	Let $a$ be a positive number. A geometric sequence $\\{a_n\\}$ with first term $a$ is called a $G$-type sequence if $a_1 + 1$, $a_2 + 2$, $a_3 + 3$ also form a geometric sequence. Given $a_n = a^{2^{n-1}}$ for $n \\in \\mathbb{N}^*$, where $\\frac{1}{2} < a < 1$, and $\\{a_n\\}$ is a $G$-type sequence. Define $b_n = a_n - \\frac{1}{a_n}$ for $n \\in \\mathbb{N}^*$. Investigate the relationship between $b_n$, $b_{n+1}$, and $b_{n+2}$ ($n \\in \\mathbb{N}^*$), and find the value of $b_{n+1}^2 - b_n b_{n+2}$.		b_{n+1} = 3b_{n+1} - b_n,  b_{n+1}^2 - b_n b_{n+2} = 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math_464	OPEN_OnlyTxt	"Definition: Let $\{a_n\}$ be a sequence, and $a$ be a fixed value. If for any given positive number $\varepsilon$, there always exists a positive integer $N$ such that when $n > N$, $|a_n - a| < \varepsilon$ holds, then the sequence $\{a_n\}$ is said to converge to $a$, and the fixed value $a$ is called the limit of the sequence $\{a_n\}$, denoted as $\lim\limits_{n \to \infty} a_n = a$, which is read as ""when $n$ approaches infinity, the limit of $a_n$ is equal to $a$ or $a_n$ approaches $a$"". For example, let $a_n = \frac{1}{n}$. For any given positive number $\varepsilon$, take $N$ as a positive integer greater than $\frac{1}{\varepsilon}$, then $\frac{1}{N} < \varepsilon$. It can be obtained that when $n > N$, $|a_n - 0| = \left|\frac{1}{n} - 0\right| = \frac{1}{n} < \frac{1}{N} < \varepsilon$, so $\lim\limits_{n \to \infty} a_n = 0$. It is known that the sequence $\{a_n\}$ satisfies $3a_2 = 2a_1 + 4$, and when $n \in \mathbb{N}^*$, $a_n + a_{n+1} = 2n + 1$. Find $\lim\limits_{n \to \infty} \frac{\sum\limits_{i=1}^n \frac{1}{a_i}}{n}$."		0	math	数列	['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math_465	OPEN_OnlyTxt	"If the sequence $\{a_n\}$satisfies: For any positive integer $n$, there is a positive integer $k$, such that $|a_{n+1}|=| a_n+k| If $is true, the sequence $\{a_n\}$is called a ""normalized sequence of order $k$"". Let $S_n$be the sum of the first $n$terms of the sequence $\{a_n\}$. If the sequence $\{a_n\}$is a ""16-order normalized sequence"" and satisfies $a_1=8, S_{2024}=-16192 $, find all possible values of $a_{2024}$."		-24	math	数列	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFF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ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_466	OPEN_OnlyTxt	"If $\{b_n\}$ is an increasing sequence, and the sequence $\{a_n\}$ satisfies that for any $n \in \mathbb{N}^*$, there exists $m \in \mathbb{N}^*$ such that $\frac{a_m - b_n}{a_m - b_{n+1}} \leq 0$, then $\{a_n\}$ is called a ""segmentation sequence"" of $\{b_n\}$. Let $c_n = q^{n-1} \ (q > 0 \text{ and } q \neq 1)$, and let $T_n$ be the sum of the first $n$ terms of the sequence $\{c_n\}$. If the sequence $\{T_n\}$ is a ""segmentation sequence"" of $\{c_n\}$, find the range of the real number $q$. (Attachment: When $q \in (1, +\infty)$, if $x \to +\infty$, then $\left(\frac{1}{q^x}\right) \to 0$)"		[2, +\infty)	math	数列	['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math_467	OPEN_OnlyTxt	"Known set $M_n=\{x \in \mathbb{N}^*| x \leq 2n\} (n \in \mathbb{N}, n \geq 4)$, if there is a matrix
\[
T=\begin{bmatrix}
a_1 & a_2 & \cdots & a_n \\
b_1 & b_2 & \cdots & b_n
\end{bmatrix}
\]
Satisfy:
① $\{a_1,a_2,\cdots,a_n\} \cup \{b_1,b_2,\cdots,b_n\}=M_n$;
② $a_k-b_k=k (k=1,2,\cdots,n)$。

Then the set $M_n$is called a ""good set"", and the matrix $T$is called a ""good matrix"" of $M_n$. Judge whether $M_6 (n=5,6)$is a ""good set""; if so, find all ""good arrays"" satisfying the condition $5 \in \{a_1,a_2,\cdots,a_n\}$; if not, explain the reason."		"$M_6$is not a ""good set"";$M_5$is a ""good set"", and there are four good number arrays that satisfy $5 \in \{a_1,a_2,a_3,a_4,a_5\}$:
\[
T_1=\begin{bmatrix}
3 & 8 & 10 & 5 & 9 \\
2 & 6 & 7 & 1 & 4
\end{bmatrix}, \quad
T_2=\begin{bmatrix}
8 & 3 & 5 & 10 & 9 \\
7 & 1 & 2 & 6 & 4
\end{bmatrix}, \quad
T_3=\begin{bmatrix}
4 & 10 & 9 & 5 & 7 \\
3 & 8 & 6 & 1 & 2
\end{bmatrix}, \quad
T_4=\begin{bmatrix}
9 & 5 & 4 & 10 & 7 \\
8 & 3 & 1 & 6 & 2
\end{bmatrix}.
\]"	math	数列	['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math_468	OPEN_OnlyTxt	Given sequences $\\{a_n\\}$ and $\\{b_n\\}$ where $\\{a_n\\}$ is a geometric sequence with $a_1 = \\frac{1}{2}$, $b_2 = 5$, and the relation $a_1b_n + a_2b_{n-1} + \\cdots + a_nb_1 = 4a_n + b_n - 3$ holds for all $n \\in \\mathbb{N}^*$. Find the sum of all elements in the set $M = \\left\\{x \\left| x^2 - \\left(b_n + \\frac{1}{a_n}\\right)x + \\frac{b_n}{a_n} = 0, n \\in \\mathbb{N}^*, n \\leq 2N, N \\in \\mathbb{N}^* \\right.\\right\\}$.		$6N^2+N+2^{2N+1}-\frac{2}{3} \times 4^{\left[\frac{\log_2(6N-1)+1}{2}\right]}-\frac{4}{3}$	math	数列	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv5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math_469	OPEN_OnlyTxt	"Given that $r$is a given positive integer, let $G$be a set consisting of a function $f(x)$that satisfies the following conditions ①②③ as elements: ① The domain is $[0,r]$;②$f(0)=0$;③$f(x)=f(k)+a_k \cdot (x-k)$,$k<x \leq k+1$, where $a_k \in \{-1,2\}$,$k \in \{0,1,2,\cdots,r-1\}$. For the given integers $m$,$n$(where $0 \leq n \leq r-1$), remember $A_{n,m}=\{f(x) \in G|  f(n)=m\}$。Take a function $g(x)$randomly from the set $G$. Whether for any $0<n \leq r-3$, the probability of the random event ""$g(x) \in A_{n,m} \cap A_{n+3,m}$"" occurring does not exceed $\frac{3}{16}$."		is	math	数列	['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']	['img_for_onlytxt.jpg']
math_470	OPEN_OnlyTxt	For a given set $A \subseteq \{(a,b) \mid a \geq0, b \geq0\}$, a set $A$is said to have the property $(K_1, K_2)$if there exist nonnegative real numbers $K_1, K_2$such that: $K_1(1+a^2)(1+b^2) \leq (a+b)(1+ab) \leq K_2(1+a^2)(1+b^2)$holds for any $(a,b)\in A$. If the set $\{(a,b) \mid a \geq 0, b \geq 0, a^3+b^3=2\}$has the property $(K_1,K_2)$, find the maximum of $\frac{K_1}{K_2}$.		$\frac{\sqrt[3]{2}}{\left(\sqrt[3]{2}\right)^2+1}$	math	数列	['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math_471	OPEN_OnlyTxt	"A given sequence $\{a_n\}$, where $a_n \in \mathbb{Z}, n \in \mathbb{N}^*$. Take $n=5$, at least one term in the sequence $\{a_n\}$is negative, and $\sum_{i=1}^5a_i > 0$, place the terms of the sequence $\{a_n\}$on each vertex of the regular pentagon in turn, one term for each vertex. The three terms of any three adjacent vertices are $a_i, a_j, and a_k$. If the middle term $a_j<0$, the following exchange is performed to transform $a_i, a_j, and a_k$to $a_i+a_j, -a_j, a_k+a_j$until the transformation terminates when the numbers on each vertex of the regular pentagon are non-negative. ""For any eligible $\{a_n\}$, the above transformation needs to be terminated a limited number of times."" Is this statement correct?"		correct	math	数列	['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math_472	OPEN_OnlyTxt	With the rapid development of China's modernization, the great rejuvenation of the Chinese nation is booming, the happiness index of people's lives is rising, and various indicators related to physical health are receiving more and more attention from the people. The value of the health indicator is known as $a \in K=\{1,2,3,\cdots,n\}$, where $n$is a positive integer, and $n$can be calculated from special physical examination data about this health indicator. The specific method is as follows: A person first conducts several physical examinations, and constructs a set $T$from all the data from his physical examination. Duplicate data can only be used once, and $T \subseteq K$. Let the smallest element in the set $T$be $u$and the largest element be $v$. Then calculate relevant probability or expectation data from the values of random variables $u,v$, and then calculate the corresponding $n$value in the set $K$, thereby evaluating the health status. In this way, the physical examiner is guided to choose a lifestyle that is conducive to maintaining a normal and healthy lifestyle for this indicator. When the positive integer is $n \leq 222$, the health status is normal. Remember that the random variable $\xi$is the arithmetic median of the random variables $u,v$. After studying the physical examination data of resident Xiaoshuai for this indicator, it was found that the expectation of the random variable $\xi$was 12. Question: Is Xiaoshuai's health status normal? Please explain the 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math_473	OPEN_OnlyTxt	"Decimal and binary are common number systems. The decimal data is a number represented by ten numbers 0, 1, 2, 3, 4, 5, 6, 7, 8, and 9, with the base number being 10. The carry rule is ""every ten is entered into one"", and the borrow rule is ""borrow one for ten""; the binary data is a number represented by two numbers 0 and 1, with the base number being 2, the carry rule is ""every two into one"", and the borrow rule is ""borrow one for two""; for example: The decimal number 20 corresponds to the binary number being $10100_2$, and the binary number $1111_2$corresponds to the decimal number being 15. Use $\sum(A)$to represent the sum of all elements of the non-empty set of integers $A$. It is known that set $A=\{a_1,a_2,\cdots,a_n\}, a_i \in \mathbb{N}^+, i= 1,2,\cdots, n$and $a_1<a_2<a_3<\cdots<a_n$. If $n=11$, and for every positive integer $m \leq2025 $, there is a subset $S$of $A$, such that $\sum (S)=m$, find the minimum value of $a_{10}$."		501	math	数列	['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math_474	OPEN_OnlyTxt	"It is known that there are two points $A and B$on the image of the function $y=F(x)$. The equation of the line $AB$is $y=G(x)$. If the line $AB$is exactly a tangent to the curve $y=F(x)$($A,B$are tangent points), and $\forall x \in D$($D$is the domain of $F(x)$)$F(x) \geq G(x)$, then the function $y=F(x)$is called a"" tangent-supported"" function. It is known that $g(x)=\begin{cases} ax-\ln x, & x>0, \\ x^2, & x<0, \end{cases}$is a ""tangent support"" function, find the value range of the real number $a$;"		\left(-\infty, \frac{1}{e}\right)	math	数列	['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math_475	OPEN_OnlyTxt	Given an infinite sequence $\\{a_n\\}$, let $S_n$ denote the sum of the first $n$ terms of $\\{a_n\\}$. For $n, k, m \\in \\mathbb{N}^*$, the following three conditions are provided: \n1. $a_n \\in \\mathbb{N}^*$; \n2. $(n-m)S_{n+m} = (n+m)(S_n - S_m)$; \n3. $a_{n-k} + a_{n-k+1} + \\cdots + a_{n-1} = m a_n$ ($n > k$). \nIf $m > 1$, the sequence $\\{a_n\\}$ satisfies both conditions 1 and 2, and $a_{2025} = 4050$ with $a_n \\neq a_{n+1}$, find the general term formula of the sequence $\\{a_n\\}$.		$a_n=2n$or 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math_476	MCQ	As shown in the figure<image_1>, in the regular triangular frustum $ABC-DEF$,$AB=AD=2$,$\angle BEF=\frac{\pi}{3}$, and the point $M$moves in $\triangle DEF$(including boundaries), then the following conclusions are correct ()	['A. The cosine of the angle formed by $DC$and $BE$is $\\frac{\\sqrt{3}}{6}$', 'B. When $MC$is parallel to the plane $ABED$, the trajectory length of the $M$point is 2', 'C. The maximum cosine value of the angle formed by $MC$and plane $DEF$is $\\frac{\\sqrt{6}}{3}$', 'D. When $MC\\perp MF$, the trajectory length of the $M$point is $\\frac{2\\sqrt{3}\\pi}{9}$']	ABD	math	空间向量与立体几何	['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math_477	OPEN_OnlyTxt	Given positive integers \(k\) and \(m\) where \(2 \leq m \leq k\), a finite sequence \(\{a_n\}\) is called a \((k, m)\)-sequence if it satisfies both of the following conditions. The minimum number of terms for a \((k, m)\)-sequence is denoted by \(G(k, m)\).\n\nCondition 1: Each term of \(\{a_n\}\) belongs to the set \(\{1, 2, 3, \ldots, k\}\);\nCondition 2: Any permutation of \(m\) distinct numbers from the set \(\{1, 2, 3, \ldots, k\}\) is a subsequence of \(\{a_n\}\).\n\nNote: A subsequence of \(\{a_n\}\) is formed by selecting terms \(a_{i_1}, a_{i_2}, \ldots, a_{i_s}\) (where \(i_1 < i_2 < \ldots < i_s\)) from the sequence.Find the value of \(G(4, 4)\).		12	math	数列	['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math_478	OPEN_OnlyTxt	If the function\( y = f(x) \) satisfies a set\( A \) within the domain, and for any\( x \in A \),\( e^x [f(x) - e^x] \) is a constant\( a \), then\( f(x) \) is said to have the property\( M \) on\( A \). Let\( y = g(x) \) be a function with the property of\( M \) on the interval\([-2, 2]\), and for any\( x_1, x_2 \in [-2, 2] \), there is\([|g(x_1)| - |g(x_2)|] (x_1 - x_2) > 0\) is true, then the value range of\( a \) is ( )		\([-e^4, e^4]\)	math	函数与导数	['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math_479	OPEN	"It is known that in the tetrahedron $P-ABC$,$E_i (i= 1, 2, 3,\cdots,6)$are the midpoints of the edges, as <image_1>shown in the figure. If $E_1, E_2, E_3, E_4, E_5, E_6$are perpendicular in pairs, then the tetrahedron $P-ABC$is called ""diagonal tetrahedron"". In the spatial rectangular coordinate system $O-xyz$, there is an ellipse $C: \frac{y^2}{2} + x^2 = 1$in the $xOy$plane, and the straight line $y = kx - 1$and $C$intersect at the two points $A and B$.$ P$is a point in space. If $P-ABO$is a diagonal tetrahedron, find the minimum value of its circumscribed surface area $S$."		\frac{5}{2}\pi	math	空间向量与立体几何	['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']	['math_479.jpg']
math_480	MCQ	As shown in the figure<image_1>, in a cube $ABCD-A_1B_1C_1D_1$with an edge length of $2$,$P and Q$are the midpoints of edges $CC_1 and BC$respectively, and the moving point $M$satisfies $\overriding {DM}=\lambda \overriding {DA}+\mu \overriding {DD_1}$, where $\lambda, \mu \in \mathbb{R}$, then the following conclusions are correct ()	['A. If $\\lambda + \\mu = 1$, then $CM \\perp DB_1$', 'B. If $\\lambda = \\mu$, then the volume of the triangular pyramid $B_1-AMC$is fixed', 'C. If $\\mu = \\frac{1}{2}, 0 \\leq \\lambda \\leq 1$, the minimum angle formed by line $PM$and line $BC$is $60^\\circ$', 'D. If the point $M$is on the surface of the circumscribed sphere of the triangular pyramid $C-DPQ$, then the trajectory length of the point $M$is $\\sqrt{2}\\pi$']	ABD	math	空间向量与立体几何	['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math_481	MCQ	As shown in the figure<image_1>, the bottom surface $ABC$of the triangular prism $ABC-A_1B_1C_1$is a regular triangle with a side length of $2$,$\angle CAA_1 = \angle BAA_1 = 60^\circ$, the following statements are correct ()	['A. If $AC_1 \\perp AB$, then $AA_1 = \\sqrt{2}$', 'B. The sine value of the angle formed by straight line $AA_1$and bottom surface $ABC$is $\\frac{\\sqrt{6}}{6}$', 'C. If the projection of point $A_1$into base surface $ABC$is the center of $ABC$, then $AA_1 = 2$', 'D. If the volume of the triangular pyramid $A_1-ABC_1$is $2$, then the volume of the triangular prism $ABC-A_1B_1C_1$is $6$']	ACD	math	空间向量与立体几何	['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']	['math_481.jpg']
math_482	MCQ_OnlyTxt	"Let\( m \) be a real number other than 0, and the function\( f(x) = \begin{cases} 
|3x - 1|, & x \leq 2 \\ 
x^2 - 10x + 24, & x > 2 
\end{cases} \), if the function\( F(x) = 2[f(x)]^2 - m f(x) \) has 7 zeros, then the value range of\( m \) is ()"	['A. \\((-2,0) \\cup (0,16)\\)', 'B. \\((0,16)\\)', 'C. \\((0,2)\\)', 'D. \\((-2,0) \\cup (0, +\\infty)\\)']	C	math	函数与导数	['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math_483	MCQ_OnlyTxt	Leonhard Euler was one of the most outstanding mathematicians in history. Constants, formulas and theorems named after Euler can be found in many branches of mathematics. In topology, Euler's formula describes the relationship between the number of vertices, edges and faces of a convex polyhedron: If the number of vertices of a convex polyhedron is\(V\), the number of edges is\(E\), and the number of faces is\(F\), then\(V - E + F = 2\). According to Euler's formula, the following statement is judged to be correct () Note: If the line segments of any two points on a polyhedron are within the polyhedron (including surfaces), the polyhedron is called a convex polyhedron.	['A. If a pyramid has 5 more edges than vertices, the pyramid is a hexagonal pyramid', 'B. A polyhedron with seven edges', 'C. There are convex polyhedrons where each face is pentagonal or hexagonal, and the number of sides of any two adjacent faces is different', 'D. If each face of a convex polyhedron is a square or a regular pentagon with a side length of 1, and the spatial figure formed by each vertex and the edge connected to it is the same, then all possible values of the number of faces are 6, 7, 12']	AD	math	平面解析几何	['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AooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_484	OPEN	<image_1>If you stretch both ends, the following ropes will knot ().		1，2	math	平面解析几何	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAB+AgMDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKyNe8UaJ4ZtTcaxqMFqgGQrHLt9FGSfwFcf/AMLu8H7VlJ1FbVm2i5Nm3lk/Xr+lAHo9FZOieJtE8RwedpGpW92o+8qN8y/7ynkfiK1qACiiigAooooAKKKKACiiigAooooAKKKKACiiori5gtYmluJo4o15LyMFA/E0AS0VwOs/GHwjpEjRJeSX8gOD9jjLqP8Agf3fyJrBf476eZmij0iVXLiNBPdRpljjrydo56/4GgD1yivFx8fRHqUtjceGnE8faK9R88A8HAB4PQVuaf8AG3w/PbxT6lZajpsUjlFllgLpkdeV/wAKAPTKKp6dq2navbrPp19b3cTDIeGQOP0q5QAUUUUAFFFFABRRRQAUUUUAFFFIzBVLMQAOST2oAWivPdb+MXhzTdQbTtPW61m+U4MVhHvAPpu6H8M1gXHx4WzvYrW88Iatbyy/6uOTCs30BHNAHsNFeaWvxw8LeesGqw6jpMzdru2bA/LJ/Su60vX9I1uETaXqdpeIe8MobH1A6UAaNFRT3UFrGZLieOFB1aRwo/M1xmq/FzwZpU5t/wC1Re3HaKxjMxJ9AR8v60AdxRXkMnx+0hpZI7bSbrKNszcSLF83p3xT7T4y6hcanPYnwpvkgh+0OsGpRO3l8cgcZPI4HNAHrdFeYaX8dPC95NFHfw32mCb7ktzFmM/iM8e/SvR7K/s9StUubG6huYHGVkhcOp/EUAWKKKKACiiigAooooAKKRmCqWYgADJJ7V4R40+JOs+JPtVr4Tn8nToZxbCSAk3N9JnlYgASFxznH+FAHqWv+P8Aw14bn+zahqcX2ztaxfvJcnoNo6fjXKv8c9AiBkm0rV44PMEYkMUfJIyON+enNct4Z+B0+qXaap4ndrFc7ks7aTMp75kl559cc+4r0ZfhT4KWz+ynQoGT+8zMW+u7OaALek/ELw5q95HZJem2vZcbLa7QxO2emM8H8DXUV4f40+CPkWst/wCFrid2T52sJ33lwO0bnkHA6H861/g/49u9aifQdYlD3sCloHZ8yMg4Kv8A7Q9e4+hoA9ZooooAKKKKACiiigAooooAK4r4meMpvCPh1Tp8XnareMYrVMZ2nGS5HoB/Su0JAGT0r54+OGp6Rq3inToP7Q+0Q2tpJujs5AzLKW6HGccD9O2c0AVPh98Pr/x7c32s63qV5HA2beVxIsrXJP3wGOQACB0zz06V6DN8BfCraa9nBdapCGO4H7QGG71K4wa5Xwz8Vo9A+H9pb6H4Vu7xLCHFzIZlVEbqzHG5sEknkCsxvj/4gup1TytLsIpOkgjeYp0+8Nw9fTt0oANa+GGv+B3trzTp5ri0iufNl1KyBF1DHgAhkz8yjGeM9+ldH4T+NcyzR2viOAS2JuGto9ZhUojkdGdD0yOe30rk7b4v+KL86hbz69bQSRqfsxj0/fHOR2J6rntwa5C6vb4wvdX2n3Dw3spa5tpLUwQCZgQrow4B/Ad+vYA+xUkSWNZI2DIwyrKcgj1p1fJ+m2Xia8TU9I8O6zrt5e6XOUiayvCIGhzgYG8EdD0yOR9a6W41vx/4VgsZW1fXDE20Xn9pacZEtz3Pmc7h+IoA+i6K8H03466haXs66pFp+o6bAUVrm0fyZW3DOVjY/NjoQPzr2Pw94k0rxTpSajpF0txbsdpxwUb+6w7HkUAatFFFABRRRQAVzniLx14c8LHZqmpRpcH7tvGDJK3/AAFcn86ofE/xbN4O8GTX1oAb2Zxb22RnDsCc49gCa8S8C+GYPHfimT7Lfal5cEfmapqTSlZLh36Io/hBIPJ5IB4FAHZar+0XYW87wafoF2zrkE3jiLB/3Rn+dZkP7QGqT2T3f2LR4drbfIkmk8z64C8j6elen2fwu8G2agnQ7a5kHWW7BmZsepbNeTfEbx7ZWc6aV4XtYrLTlLxte2VuimaVR9xOPuAkZI6549wDZ1P4167aaO840SzZJFxHfWlx58aE92Xgj6NiuY0PSvEnxFvLs22qRarb5USXuosyrEWXJVYATgjJGcY9D0NdB4X+DV9rmjtq/iTUJ7LVZ0H2dII1QwjsZAAMtz06j19OEe08T/Crxc10+bR4kUqVP7i8jUAMM+p4OMZye3FAHruk/AvRYYkGs6he6ltx+5EnlRDHoF5/Wuvtfh34QtE2x+HdPbPVpYRIx+rNkmrPhDxbpvjLQotT06Tg/LLE33on7qf881vUAczcfDvwddRGKXw3pu090t1Q/muCK4/V/gZpMsZ/sHVL7SyG3rCZDLEG5xwee57969WooA+XvEvhrxT4FEd09gLfyemtaZKw3nPWRc/zA6969Q+HHxUh8Q3Q0TVZ4mvwv+j3SqUS7A64B6N7d69NngiuYJIJ41kikUo6OMhgeCCK+XviF4NPw58RC4tAf7MvX8yyuASHtZFOdue/9R7igD6lorlfh74sXxh4SttQbaLpP3VwF6bx1I9jwfxrqqACiiigAooooAKKKKACvBPi346u9T1q48L6Wl0+nWCmTU3tTtZ8DJQt/Co7+/0r3uvj/ULqeN/Fml3uoJAz6lJLcR4IlmdS4Az0K7iCRnI6gdaAOx8J/COfxvDB4guWh0HT3QLa21kpMjIP4mYnqfU5J9uK7KX9n3w5KoaXV9Yd16M8ynH/AI7XQ/8ACb+HfBvg3SlmuRM/2KMwW1qN8koCjkKOg9zxXjut/Erxf8SL9tK0ayuILJmw9nZOfOdf9t8cD14A9c0AWPGWg6f4Ynt3tfHMeoXlqClvY3sS3J+bqvcKPriuIu9OvNGWO9vonsbmWQyfarC6iPB5wI0YbefcV6j4Y+As1wPM8S3CRW4fdHbQKPNI/wBuTt7gZ+or17R/Bnh7QrFrPT9JtYonXbJmMM0g9GJyW/GgD5VvtUudSe3XXru7vLC6IEN/dSs0kABxnarEfVSMntXtXh/4S6Nqdnp+oXHiO51RIhugmtSkXX/bUbj07nirniz4OWN7b3M/hiYaTdSj95bL/wAe1x3wydB+HA9K850nUfEvgbxQ1pY2R0+4MQaTR5mZob1wcEwHnBI6c9eOelAHsUHwi8DQuznQYpXY5ZpppJCT6/MxqG6+Dfga53Mmjm2lPSS3uJEK/QbsfpWt4M8c6T41037RYyeXcoB59q5/eRH3Hce9dNQB4vrXwXu9NtI5vDeqSXqWjmaPS9TAkikOOV7DkZHb6jrXmejeLb7wFq0lzZQz2N2J2F9o8qkQeXxjbuYtu5/yK+tK4H4qeBdO8V+F7u6eJY9SsoHlguFX5jtBbYfUHH4ZzQB1HhrxFYeKdDt9V06TdDKvzKfvRt3Uj1Fa1fOf7P8A4ga18S3WhsJRbXsBliL/AMUidSPqufXpX0ZQAUUUUAFFFFAHnXxi8Tf2L4UXTYLuK2vdWf7OksjELHHj52JAJxjA/wCBVU+EXhOKy0mPXbu2sft00QhhltU2r5S8BvdmPJbuMVw/xcuX1f4vaXo4AaKNIrc74w6hpDk8H2I96+gbK1hsbKG1t4xHDCixxovRVAwB+VAE9FFFABXzn8TdHT4ffEnSfEujqYIrlzM6hjjzA3zj6MG6fWvoyvHvj5e6MfDlnDNcW0mpQ3KvHas2XKEENwDkDpyfSgD1qyuo76xt7uI5jnjWRT6hhkfzqevDNC+K8nhrwlb6Xc6Y/wButIwWa7kEKJG2WTjlzx0GPSs6L4g/FPxTbRXGk6LLDbO5y1tbYBUY+68mR60AfQlFfLGvz/EnSLYXuvXXiKzRp1/0xLw+XEp7GNDjP4j0r2H4ReL7/wAS6Re2mqTi6urCRVF0Fx58bA7WI9eDQB6NRRRQAV5p8RfixB4PuzpNjbrcaoUDO8obybcHoX28n1wK9Lr5a+MxY+MfEBha+DLParNtx5BQwKRu5zuz04x1oAZ/afizx3rJtvtdx4kt5Mg29nJJawx+7EqAB9a6aw+FPjXwtoGo32nazHbTFPNaxswSzgdVDkcHGcdea9p8K6dpmm+GdPh0mGOOzMCMhQffBUHcT3J9a2aAPmH4XWXhDUfEz2muW8V1NfZe0+0uS6uPvK4Hygk5I78e4r6Fs/CXh2wC/ZdD06IjoVtkyPxxmvF/ix8PX0jW4/EOjSLY6deTp9vljX/j2fdnzBjkKTycdwPau++HPxCg8Q2qaZqFyjapCTGs4UrHeBerxkgZPqB+HFAHoKoiLtRVUDsBiszxLosPiHw5f6VOistzCyLns2PlP4HBrVzSZoA+Uvg9rkui/Euztrliq3IaxkQrjac/KD77gB+NfV2Aa+WPiItn4d+IupSRXgjjW5jvYorZAXllJ3HL9grA8E9TwOpr0nU/jnZrpiSaHpc9/N5SmWaT91BC5H3SzdcH8PegCp8bPDPhrSdHh8Sx2NvDqkdzGEjUBY7nnJDoPvcAnjB96pfBuWRfiBq6W1qlna3NjHcXFpFJuSCQn5QPwJ47ZI7Vw93q+q+LPETTSq/iLXwwW2toIg1jbAgcjn5sZxyNuRklu/uvwy8BDwVosrXbJLq98wlu5F6A9kHsMn8SfagDuaKKKACiiigDyT49PPZaNoWpp5nk2uoYk8s4YbkOCPQ4B6+tY37P9xa2d94g0pXcvIYrmBpU2NJHg87T9R+deueKPDtn4r8PXej3wPlTrgMOqMOQw9wa+drqHXvBmv6bpVwYrPVtM8xrHVHJEd7DjKwHjGDyBnoTjjrQB698XPFMmheGTZWqzme8BEr267mggH339s/dBPrntXFfCHwNa63f/wDCYXln5NhExTS7N3LhcHmQk9TnPtkk+lefajrEvxS8bZu47lLy6eK1s4IiDHAmfnLHqeNxxjqevGK+sNPsYNM063sbWNY4LeNY40UYAAGBQBZrF8U+F9O8XaHNpmpRBkYZjkx80T9mHvW1RQB8t3UPiL4Ua5PP9sW1u0x5SiH/AEW/hGBjjow9Dg8nn19V0X406VJHBH4k0+80S4lQMrSxM8TggYZWAzjkdvxrvta0LTPEWnPYatZx3Vs/VXHQ+oI5B9xXmcvwXvLCdW0HxVcQQqCqwXsKzqinGQM8dhzjtQB6PaeKfD9/EJbTW9OmQ90uUP8AWryX9nJ9y7gb/dkB/rXhWo/BXxXd/bUW48Nuty6uZGSVHXGPu4U4zjnr1NVk+E3iTT9chu7nw3pGo2gjaN7fTrtogT2f94V5H1oA+gxLG3R1P0Nef/GnTIdR+G95cHb59g6XMJOOCGAP/jrGvMk+Gni6x0nUhJoM8rTyB7YwaoPOtlDZ24ztbjjjmuU1ux1Kyt7az1bwvq0LzRlPnu5P3ki87lByDxyRj6YoA9N+A+qzXWr+I7XbJFakxzQQSDHl5ZsgfmK9ur480YXcOlQXuhWXiS2uw+y5uLNy0csXfaQAQwOOORXZ6V8XPEmhXtxEL9df062SNnW9jFvcrkhSo7swJwfvevSgD6Qorj/AvxF0rx1BOLWKW1vrb/X2k+Nyj1BHUZ47fSuwoAKKKKACiiigBCwVSzEADkk9q+WviDquk2vxH1LWNFzc2txE1vcz+QHhSZlwdpPDdP59a674p/ES61W7ufDuh3CQadbOE1C8aTYJD3iU8k+h2gk49OtPwd8FRr6pqOtxSaZpj8xWEMrl5PR2LcrnsMZ+lAHDWGh20PjfT9G1PVUtrNpFK6tbEh3R1BRCc4XOQOfu554r6n0Hw7pPh6y8jSrVIlf5nkzueU/3mY8sfc14R4j+GuseCLC9gs7CPXtAuvmkYRf6Ta47gjnp0IyOOQO8PgP4naxoAvIYra81jwzZuAPM2/abZDnHGeRx9B6jNAH0nRWN4c8V6N4rsBeaRexzpgb06PGfRl6g1s0AFY3iXwvpfizSn0/VIN6HmOReJIm/vKexrYzVS51bTrI4ur+1gPpLMq/zNAHzF4g0/W/h74ngWe7ltbm1hI02/ghyL0bidspz745zjjqMGva/h/8AE2z8X7tNvY/sGuwDE1rJxvI4JXP8uo/WqvjzXfh34i0C40vWPEFiCPmjeKTfJE46FduT+HcV8/Wd3p329I4tYg0650ze9prEcEp+1tuBUOACwOCecdBg0AfZNYHjXWbXQPBuq6hduFRLd1UH+N2GFUfUkV5xp3x3jXQLNb7Qr+XWpRtEccYjhlPZwzHgH6GuD17XvEvxD1l9Pu4bn+0IJFNlpdlGrwIeD5krkkHj6j6UAWvg/Dc33xC0Ty7m7uF02yledZU2R26spUKnPPLjnjP4V9MVyPgHwc3hTS5Xvbj7ZrF4wkvLk/xHso/2R2rrqACiiigAooooA+efF02pR/Gi/EYgeyS/sbiRTIokULFGNwXOSPmOeCK+hQeK+fPjnos2m+NNM8S28U7JPH5bmHr5iDj81/QGum1P432htLSPR7RftNxAJWub5vKt4Tj5hn7zlTwQo+maAPWLm6t7OFprqeKCJRlnlcKoH1Neeat8ZdDhvTp2hRNq96VYgq4ih+UEk+Y3BAweRn2ryfSfD/jf4qaoNQ1RZntCSRLds0VsnTGxBy3fgde5r1/w38I9B0eC2OpBtXurddsb3Q/dxgnJCp0xk980AeXXPjD4heP7aWDSftizSShUi02Ly4Ej5yXmbnJ47gf0yda+FviXw34Xl1/WLq2iEE8cjxw/vZizMFzuPcE+tfUsMEVvGI4Y0jReioMAfhWJ430g674K1bTVQO8tuxRT3ZfmX9QKAPPPg/4P0O60qfWr3TnuNTNwcy3/AM7gFVYHB4zyecV7CAAOBXj3wJ1e2lsNT0+MTROkiuI7iTc5+UKxHtkD6ZrW8f8AxUj0OZtE8Ool/rzBtwyPLtsd3J4z7Z4xzjuARfGXx1p+ieG7rQUSO71LUIWTyfvCFD1dh29vfntWJ+ztpM8Ojalq0kJiiuGSGM84k2ZJbn3bHHpXGfDrwJrPjrVp9Z1O4u4LOR2F3dmT5rzPWNcfw+p6dhX0xZWdvp9lDZ2kKQ28KhI40GAoHYUAT0UUUAFfPfxx8Jvb+JofEZRTp9+q211KwYiCQDarkDk8AY9xX0JVPVdLs9a0u407UIFmtbhCkiHuP6GgDyn4NeNMWq+EtTk/fQbv7OuGBVbuEEj5MgZxg49voa9hzXy/4w8B3vw81FLmSe9udFDMNNuoZcSWUxIZSR06jnGAfY0/WvGHizVxcaJrWrNbX1oqRx6dp0Ds9+xGQWdD0II5B78CgD2/xR4+8H6MsunavfwTyOPLks4085jnsyjP5GvmbXpLQ+IUvdElutO0xJALQXc+17Vid2VQFnCd84713Gh/BLxVqiwy38tpoUKuJI1j/eTx/Qg59+Wr0qx+CnhG10+eK5tptQvJ4ysl5dSlnLH+Idgc/wCTQB5Xe/E/xjPJBYReJrViYQRLploZndwMbW3KDkn0GKo6jpHxK8VRoI4fFE0TogmjvpDEgfHzYUkArnocCovDGr33w5+IbrezOZo7j7JfWyQgI0AAAkyPTgjjt15r6rjdZI1dDlWGQR3FAHytq3gHWvDukW39vW2kadZ3cyxNcvmaaF8Z37hzg46ZI9hya6/4XfD3w74s0671HWbi51aW2u2gQvKyo0aqNpxnPc9+1ehfF3TG1DwBdXEcUcsmnul4qSDKkIfmyO425rhfgdq6J4j1nSzdQzC5jS6haCIxRnHDBVIGMZx07GgD2bS9G0zRbUW2l2FtZwj+CCMID7nHU+5q9RRQAUUUUAFFFFABXI/EnQ9I1rwTqLaxC7xWcD3KPFw6Mqk5BrrqxPGUbzeB9fijBZ3064VQOpJjbigD5i0CfUNUe3svC+l6lFHp0BnkNjdBJppSQGkLbenQBQO31rrtC+NHivTpLiDUrW21OO0UGVJm+z3C84I6csD1+Wpfg9qV9D48so9UMQF/o/l2QQj/AFcbfKDjvhXPrXsniLwN4b8VfNq+lwzS4wJlykgH+8MGgDB0j4x+EtSkWC6uJtLuTjMV/H5eD/vcj9a7yKWOeJZYZFkjcbldDkMPUGvGdY+Dmr2cV3HoOqw31lcR+WbPU1+ZRxjEi9xzg4GK852+JPA2sWmn79U8NMWKvK0pltJD/eH8OOmeT/SgD6vorw3QvjFr+lWgn8T6dFqOl+aYv7U00hgrA4+cDjngj7uR69vX9B8Q6V4l01NQ0i8jubdupU8qfRh1B9jQBp0UUUARzzR28Ek8zqkUal3djgKAMkmvmDx1qupeO/Eltcx29wIb5/s2gqjgDCybXkYdeefz9ufRPip4ll1hb3wxo8ymGyjFzrUiyhCsAIzGpJALY5I/Dvio/gx4NRIm8VXUMiJMXTSreVi32aAseRnoW5/DnvQB6X4X8P2nhfw7Z6RZriOCMBm7u/8AEx9ycmuJ+Knw20/XtJutc0+FLXW7OMzrLGNvn7fmw3qcDg9enavTq5f4ia3BoHgHWbydsFrZ4Yh3aRwVUfmc/QGgDxr4bnUm+Lmna3dxCz/tuKcm3BO5lEW4uRjozDP1r6Nr5m+C9haN8QNLNqzT3NvZy3N1MD8iB0Cqg9xv59yR2r6ZoAKKKKACo7gObaUR/fKHb9ccVJRQB8aWl6th4h0+41eOJIrDUiLiAkmRmzlnZfqK+wrG8tdQsobqzmSa3lQPHIhyGB7g15h8TPhPHrt2PEWh2sD6rGwea0l4iuwPXBGG/EZrybw5411z4e3T7Wkj/wBI2z6Dcwum0Nkkxk524wB68jg0AfWNea+L/hFY6tqH9t+Hrj+x9bRvNDxj91I47so6E9yPxBrovCnj3QvFukNf2d2kbRDNxBMwV4PXcD29+lec+K/i3qWtm9sfA32eO3tAPtOqXUqRqATgbN5A69+fpQB53rNjr/hLxEWltpNG195A9rPpoItrhf4lCgHnOOBxzggV0tl8avEs9i9jqF5p2l3dv8r3E1rI8sh9owMA+vT6VkeFfB/ibxzfpe2bXmnkMftWuzXEhaftiIfLlcdufqOldVr/AMHda0DTJ5vD8lprfmKftMF5ap50nqVcnOe/BB9KAOcNh8TvG0L+dFrUqucJK9z9kgdc9WiIGcjuMVPb/s/+KdS8pr670uwUDDBXeRz7kdP1pvgv4mal4KezsL+WXUNPcMs9k8bC408qcEDPVcc49PTFfRelatYa3psOoabcx3FrMoZJEP8APuD7HkUAeRN8BGn0gWM2s6dG2Qxnh0gCXI/2/MH5YxUmveANf0D4e6xE/isajbxWrMI59PUPgckCQuT0r2asTxjc29n4M1me62+StnLuDdD8pA/XFAHzXostxrviLwjo2v395No17EAInu92TllAyOQCygBT0r6c0Xw9pPh60FrpOnwWkXcRJgt7sepPua+VltJoPBWiX9jYrazQXfnpd3BRZLmTIwsQB3FQR6Y75HSvrmIu0KF12uVBZc5wfSgB9FFFABRRRQAVkeI/EumeFtNN7qc+xSdscajc8rf3VXuasa3q9toOiXmq3jYt7WJpHx1OOgHuTgD61886BZ+Ifil4sOpXN7d2skbktLGVaGC2cYCR4+7Ief58Y5AK/ij4ia34uMty1oV0y0aO5t4rchkgbcVVp5OoPJG3jr7V0/wY8P6brp1S/wBdsYLzUbW63xF2EkSK+W+RR8v3g3T+ldd460DSPDPwi1ay0+0hgt1RPvDO5t6/Mx6k1yvwJi8jWtZW3t2tYnt4Wnh3+bGz7n2tG+fu43cEn6nFAHuKqFGAMAdhS0UUAFFFYfjDxDD4V8KahrM2P9Hi/dr/AHnPCj8SRQB81+P9Ls/CnxKntNB1d7OeWXzWnWRkFoHGSmV57k8diBXSfDDwFpvi5pbjV5IYxYv5M2nQ5SaUg/enJ5wSOg9D0xUnwr8HL4wutQ1PXbpr+wlPnTQFWQPcPzkk4LbQT7ZYYrF8XeHvFXw08a2t9pE91PHK4jsJkTeZF/55SAfeYDA5HI6dOAD6dtraCzto7e2iSGGNQqRooCqB0AAqWuU8A+NrbxvoP2xIzb3kDeVd2zdY3x29j2/+tXV0AFFFFABRRQelAHzH478R3fjTxvc2trNFKlvdDTdOtnbK72JVptvOenX3GOlUde8La38M9T003N3EmZBPBrMUbEq4TBhYdSvA4PY/UVteAIbaD4kWNmNDMcumXU1vc6ix+/IQ4UEYwDnpySa9917QNN8TaPNpmq2yz20o6Hqp7Mp7EetAHLeAfiPb+KYlsNSh/s7XERXe1k+XzVIyHTPUEHOK7yvl3xZ8OfE3g25urqKO51PTo1DWl/bt+/tduNpYj5gFGRgfL34xXSeFfij4ulENjDNpWtubYz7pnMMqqq5YP2yOR74zQBD8Z7OW2+IImshdob/Sts/2GPdI5VmHzeikbAT6DvivWfhpqE+qfDnQ7q4yZTb+WSep2EoD+SivnXXPEOra9r/24FZtc1uFYIYbOZgttCflCnByWOCcHoDk9ePqHw3pS6F4Z0zSlx/oltHESO7BRk/icmgC7eWsV9Y3FpOgeGeNopFPQqwwR+Rr5c06TW/Dfj+BGWa5vPD7sjIigCOyUndnGM5Eme55+lfVVeNfGnwfcvJF4q0syxbE+z6p9nYqz2+eWOOoA4Ptj0oA9gtriK7toriFw8UqB0YHggjINS15H8EvGNtf6fc+GmuTI9i7GyaTgyQZ4H1XP5EV65QAUUUUAFFFFABSModSrDKkYIPelooA+a/FPg5Ph34xXUIpbq3tppvN07UE5jtW5JjkXHIyccHoe/Ir1Xwh8VNJ1xEs9VdNL1YAZimb93L/ALUb9CD6ZzXbahp9pqtjLZX9vHcW0y7ZIpFyGFeR+JfgnPJZx2+gahE1jFP56adfKcKcEMFlHzKDx8vTIBzxQB7KDnpUNzaW17CYbq3iniPVJUDD8jXzp9m+IHgW3kksYtct1jl4tsi8tFj4JOeSO+flHGOa0V+OuvQb1FvouoJCBvkSR4Wf6K+OfoDQB1Xjz4f6BouhX3iDSJW0O4tozKRBzDOR0Voj8pyeOAOvOa4n4ZanBH8RdGg0iwe1kurSU6xHHuEYbBK4U8KBtB44+fArP8WeNNZ8c3OlpLZwXtjNuZNFsLlmkDjgGUgZzzx2rpPh/qnhbwO32nxDe38Os3EZOy7t5QkEfA2oSPmHCjd7CgD3iuA+JXjafQLWHRtFKvr+ofLDnGLdDwZGJ4HXjPH5Ul58ZfBcOmXNxbatHcTxRlo4NrK0jdgMj1rx3RbPVPiF4mureS5sb251QCa9uvJ3nTolbAWNz0JBxge3PWgC54R8Ft4y1pbFY9thYyONV1WKV2/tJt+4KCeMcD6dfSvpKCGO2gjghRUijUKiqMBQOAKo6Folj4d0a20vT4hHbQLtUdz6k+pJ5rSoAK+dPit4si8U+Lo9IjupItB0dt13dRwGVTN7gcEAgKM8ZJruPil4/u7HT73RPDEM93qixk3k9upYWUeDkkjo2Onpya8u+H/w8n8YXcawTXkXhyNgb24diovJByVRemAeMnoOevAAPQfgPoVwLLU/FN4v73UpNkLFAm6NTyQBwAT2H92vY6htLSCxtIbW2iWKCFAkaKMBVAwAKmoAKKKKACiiigArjfiNpHhS78OzXviYJbrbjMV4nyzRt22Eck8dK6PWdYsdA0m41PUZlhtbddzsf0A9STxivmnxRr938Q9Uiv5LmTBcppOji0kkWQ5x8zHC7uhJBOKAOTigiEs1zqMl3Dbz8QXaGNmUEnBmjBywPGc/hu6V03w+t/C2la+b3xlbrLBM5NjdqubNmB5yFHB9iMDuBXrvw3+EmmeGNKW41e1gvdXnQiUyqHSIEYKKDx0OCe/PaszxJ8E443a+8JzxQsH8xtLvV8y1lP0PTqcZB/CgD1TTNQ03ULRJNMurae3CjaYHBUDt06Vdr4/1XSL/AMLTyNq2lanoV81wpgvLJz5Cr/EBzyepGG/Kug0/x34ysrmK20rxzY6pDhigvyEYgf3jKAQfbcaAPZ/Hnw0sPGCC8tpTp+sxDEd5EMbh/dfHUfqP0rx6y1rxL8PPEN19rS206e3hDS2ZysGqYbBdD91XwQeAM88ZyK6DTPiv48k0xbuS28NzRtL5QMl4kbbs4+6H9f05rH8d+LPE/iSyOgeIPDOlWsj/AD29w1yE2n++jM2CMZHvQB7n4S8YaT4x0ZNQ02cdP30LH54W7hh/XvXkvxc8fL4jWTwf4c33UYYPqNzAMqqKclQTgcHBJyBxjPWvMbW7uptQmhk1iSzvhALTbpEJke+GMBTsYKxPAJ/ma6D4feDLLxvd/wBlX9zaaV9idvNtY0YXlx0yGLdhj3xzwOtAEvw68LQeMvHFlPY6fcQ6Fo5VpZbiUyGVlOVUn7oyeyjGB3619RVnaJoeneHdKh03S7ZLe1iGFVe57knuT61o0AFFFFABRRRQBzXj/R7nXfBGp2NmqvcmPzIo2GRIyEMEI98Y/GvOPgrr2n2kl7pM9mNLnu5hNBCzkq7YwyqWOQeOAa9sryD4j/Dfyzf+JtBFokxXzrqC4woBXkyRv/A3GT2P8wDa+Nd41v8AD5rWIIZ768gt4g+ME7t3OeMfJ34rL+BumrDputaikAtkuLsQrbI5eOPywc7GJOQWdu56dTXj2v8AxJv9ZtNNi1B11GG3SQeRdw4bcy7dxYcPjs3ByOle1/DzxZ4Y0Lw3YaBdXB0m+hjBkh1AeVuY8llY/KVJzg5oA9PoqK3uYLuFZraeOaJvuvG4ZT9CKloAK8l+PdwF8PaRZy3hs7ae93STiMvsKqSuQOTya9ariPir4Rl8Y+C5bO15u7eQXEKdPMKggrntkE/jigCt8GI2Pw3sruSVppbmWZ2kY5LYcoP0QVf+KdnaXnw31o3brH5EBnhkPVZV5THuTgfjXknws+Kdl4O06Xw94hM0MMDuUPlEtC+75kI7jOTnsc8d6g8S+MdY+LWvN4b0uyu4dOA3xQrgGQ8bZJm5CoM5wM9vXNAHUfs/me6h1rUJLiW4EpiR5JU2kuAcjOTuwCOfcV7XWH4Q8N2/hTwzZ6Rb7T5K/vJAMeY5+8x/H9MVuUAFFFFABRRRQB81/FPStT0D4q2t5pyXcgvHW6sI4idv2nIDcdM5AJHfIr3vwt4gt/E/h611S3+UyLiWPvHIOGUjsQayPiT4Xn8TeF2GnsyapZOLmydW2tvXsD2J/nivG/h/41k8N+IZZLawvY9EkMcWqrPJ5jQ3B4MvqAT1z/hQB9KVz2peBfC2rzGa+0KxllJyz+UFZj6kjGa30dZEV1IKsMgjuKdQBg6P4K8NaBc/adL0a0tp8Y81Uyw+hPIreoooAKjngiuYJIJkV4pFKOrDIYHgipKKAPljxho+tfDTxrajTZWSyhle50t9mQ24jdGcdT0Xntj1r33wN42tPGWltIIza6jbHy7yyk4eF/oecdf8itLxN4a0/wAV6PJp2oRkqTujlXh4nHRlPYivBtW03xP4J8apei5kk1uWZI7SZYwINQixgrIeMPwM55OeOxoA+kaKwPCPii38V6Kt5HG0FzG3lXVs/wB6GQdQfbuD6Gt+gAooooAKKp6tqlnoml3GpX8vlWtum+R9pbA+g5rzjVvjKlrZw3Vj4ev2tZiNt3dYSJRn7zBdzBefTntmgD1OsHxF4z0DwrAZNW1KGF/4YFO6V/og5/HpXjd74z8c+JtZl0+OO5l05ogYm8O4AckjG6VwSMDII45qXQvgtr2qads8R3VraB5PMZ1QTXeM5wZM4H4Z/pQBP4o+Nmpzm6sNB05dOuYh11FSJ3H+xGRgH6kk54GapaH4A8TeLdWGtzRTaBDcwhbqW5IluLg/xMoKgpnjg4/GvWvD/wAPvD/h6QXMNq1zfYGb28YyzHHuen4AV1IGKAPOYPgp4StYWS2XUIGdNkskV46tIOD83bqM4xikPwZ0VGiktNZ123mhQxxSLdhtqnquGUjHtXo9FAHx9q1iPDmqeIrCxnN9DBMLcTXGnpJ5kjHB+c52H72D3xXd2vwi8Rw+HoYDYaLNcbUkik3lHib+JX+UiQHOOvGOKo+MvBsnh7XdbXVIL6bTtWnWa2vYGbyYCXyTIqgklQSOh4PHtHF4i1tppbG38W65qUFtAPsr2dm6JM4/5ZsQA+CON1AEl14c8ZeEVjuprSW0sIIcSyafrJjBYY+ciRiM+2Mc1n3PxL8UQqsEuv6vaadcRlhLdWSGYg/3GGM/XIro4PDPiPxO8TQ+EWhWRHW4l1+7klQZxhkUtvDDnkDvXaeHPg3plhFC3iC9uNcmjA2RXDnyIyPRM8/jx7UAeIWM99daNcRxX5k8MwTedcW8txHa3F3nG7PJLc8ZOR/T1fw78bfCthY22nPot9pkEUYEaxoJECj0I5I9677U/h34R1iMpe6BZN8u3dGnlsB7MuDXFy/AbTLO++2+Htc1HS5uQBkSAA9uxx9SaAO80Pxt4a8SR7tK1m1nbvGX2SD6o2G/St+vnXUfgf4rgS9FtJouovcP5guX3wzxtnJ24+UZ9ORXp3wu0XxhoOjTWXim7hnRSv2UCUyOg5yC2OnTHXvQB3lFFFABTJZUhieWRgsaKWZj0AHU0+uI+LVrrl98Pb610GKWW5lZFlSH77RZ+YL69sj0zQB4x4y8cy+PPEkjJaXc+g2D7LS3gOPPm7MxwewYjg8DHc16h8MvAl7pyr4g8SzT3OsSJtgS4csbWI87fZj39OnrXM/CX4Sz2NxBrviG2kheP5raylbO1/8Anow7ew69zXuYGBxQAtFFFADJYYp4mimjSSNhhkdQQR7g1y178MfBeoSNJP4dsg7dTEnl/wDoOK6yigDz0/BLwGW3f2RIPYXMmP51pWPwt8FaeytDoFqzL0MwMn/oRNdhRQBzuteB/D+t6KdKn02CGBTviNugjMT/AN5cdDXgvi/wprnguS7utWgm1NJHQ2evQSMs1qy4Cl8dRgAYPpwa+nKjnt4bq3kguIklhkUq6OMhgexFAHknh34m3mhPb6f4snivrKREe3120BaMq2dolAHyng+/HTvXrcFxDdQJPbypLE43I8bBlYeoI6147qvwl1Xw7e3eo+CbmCa2nB87R74bopF67QTwfbOCPWuKXXde8D3aiNdQ8NSMSWsrqMz2Ejdwp5Kg+2fqBQB9N0V598MPiSfHttdRXFj9mvLXBdo8mJwe4J6H2Neg0AFFFYni3VdT0bw3dX2kaY2o3sYHlwL3yeuOpA64HNAF7VdXsNE0+W/1K7itbaIZaSRsfl6n2HNfPfjPxzqnxK1eDQNHtbmPS5WUx2wBWS+G77xOMKgwTz0xk+16y8FeOfiBqNvq/iB/s8JyXhv0/dgHoI4hyMDucfU16x4N+H+i+C7TZYxNLdMuJLubmR/b2HsKAMbwl8KdI0vREg1yGLVbtk2EzgukK5z5cYPQD16mqet/AnwtqUbixlvdMds4EMu+PPujZ4+hFeoUUAfPk37Pus2ULrpet2jyBt8dwyyQyD24JGP1qlN4C+LdjcxfZdR1CSEBQ5i1TfyOpAcr+X619IUUAfO95e/Fvw+B5cGv3hZQEZo4pgD3yqB+OncVdlT4s+II49kGq28TwgSebPDbYfJyQAAwGMds9a97xRigD5wt/gf4plsp59QlsZLqRy8oMpeaYdwJGBCnrzjr1rM8JfEHU/hlrN3pGoaCUs2mO+CTiaIA8YkIw4A9eO4IzX1FWVrvhvR/Eti9nq9hDdRMMfMMMvuGHIP0NAFTw1400LxZaLNpd9G74BaBztkT6qefx6V0FfOXi74Ma74auDq3hW5nvrdP+WQbFxCo/un+LHtz7GmeFPjB4m0rUPs2prLqmnJII3WdQLqEZxzjlvxz9RQB9IUUDkUUAFFFFABXnHi/4bXN7qF1q3ha5tbG/vozDfQ3Ckw3KHuQAcN7gc/z9HooAx/CumXui+FtO03UbpLq6toRG8qAgHHQDPPAwM98ZrYoooAKKK5HxN4i1bSPFXhrT7eK1+w6ndGCaRixk4XdgDgD68/hQB11FFFABWZr2gad4l0qTTtSg8yF+QQcMjDoynsRWnRQBg+FfCWneEbCS2sDNI0rbpZpn3O5HAyfYVvUUUAFFFFAEc8EN1BJBcRJLDIpV43UMrA9QQetcrY/DHwfp85mh0WF2PaZmlUf8BYkfpXXUUARxQRQRiOKNI0HAVRgD8KkoooAKKKKACiqeqXF3bafJJY2wuLs4WKNjhSxOAWPZR1PsK4dNe8Y+HPFWk2XiV9NvtP1eY28ctlE0bW8uMgEEnKn1oA9DIDDBAI9DSLGifdRR9BinUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUV5/4v1fxtoVrN4gtv7NOm20i7tNaNmmkjLBc+YDjcc5AA49679TuUHGMjOD2oAWiiigAqG5tbe8haG6ginibgpKgZT+BqaigCtY6dZaZAILCzt7WEHIjgjCL+QFWaKKACiiigAooooAKKKKACiiigAorhfiJ41uvDVpFDpMaS3hmh892GVgjdwoJ925AHsT2ruqACiiigArB1HwX4d1bWLfVrzSoJL+3YMk4yrZHTOPvY981vUUAFFFFABRSMdqk+lRfaP8AZ/WgCaioftH+z+tH2j/Z/WgCaioftH+z+tH2j/Z/WgCauD8ef8jd4E/7Cj/+izXbfaP9n9axNY0Cy1vUbC+unuhNYSebbeXLtCPjGcY549aAOhoqAT4UDBOO5PWl+0f7P60ATUVD9o/2f1o+0f7P60ATUVD9o/2f1o+0f7P60ATUVD9o/wBn9aPtH+z+tAE1FQ/aP9n9aPtH+z+tAE1FQ/aP9n9aPtH+z+tAE1FQ/aP9n9aPtH+z+tAErMFUsxAUDJJ7VzKQrr+u22tz7E0zTd5si3/LWRhtaX2UDIX1yT6Voa3p1tr+kz6ZeGdbacbZPJlKMw9Mjsa5u0+G3h60u7a4D6pMbeRZUjnv5Hj3KcjKk4IyBxQB3dFQ/aP9n9aPtH+z+tAE1FQ/aP8AZ/Wj7R/s/rQBNRUP2j/Z/Wj7R/s/rQBNRUP2j/Z/Wj7R/s/rQBNRUP2j/Z/Wj7R/s/rQBNRUP2j/AGf1o+0f7P60ATUVD9o/2f1o+0f7P60ATUVD9o/2f1o+0f7P60ATUVD9o/2f1pPtH+z+tAHIfErRdRv/AA9NqOn63c2M2mqbtIAEMMjJ8w3gjJ6euPaul0C+uNT8OaZf3UPk3FzaRTSx4xsZkBI/AmsW28IafbrLC93qlxaSyGVrS4vGkiJznGDztz/DnHqK6QTgDATj60AT0VD9o/2f1o+0f7P60ATUVD9o/wBn9aPtH+z+tAE1FQ/aP9n9aPtH+z+tAE1FQ/aP9n9aPtH+z+tAE1FQ/aP9n9aPtH+z+tAE1FQ/aP8AZ/Wj7R/s/rQBNVe+mmt7C4mt4DcTxxs0cIODIwHC59zxTvtH+z+tH2j/AGf1oA8L8Zavri+CTFqPhLUbe5nv4Li5vJJItrybxhQAxIHRV9ABXt+mXc99psFzc2UtlNIuXt5SC0Z9CRxVHXdJsfEWnCx1GJ3gEqS4V9p3Kcjn61p/aP8AZ/WgCaioftH+z+tH2j/Z/WgCaioftH+z+tH2j/Z/WgCaioxLkZx+tFAH/9k=']	['math_484.jpg']
math_485	OPEN	"We stipulate that in a tetrahedron\(P-ABC\), the line between the midpoint of the two edges with different faces is called an ""inner edge"" of\(P-ABC\), and a tetrahedron with three inner edges perpendicular in pairs is called a ""vertical edge tetrahedron"", as shown on the left<image_1>. As shown in the right figure<image_2>, in the spatial rectangular coordinate system, there is an ellipse\(C:x^2+\frac{y^2}{2}=1\) in the\(xOy\) plane,\(F_1\) is its lower focus, the straight line\(y = kx + m\) passing through\(F_1\) intersects\(C\) at two points\(A,B\), and\(P\) is the point below the\(xOy\) plane. If\(P-ABO\) is a vertical prism tetrahedron, its circumscribed surface area is a function of\(k\)\(S(k)\).\ (S(k)The minimum value of\) is ()"		\(\frac{5\pi}{2}\)	math	平面解析几何	['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'math_485_2.jpg']
math_486	OPEN	As shown in the figure<image_1>, in the pentagonal pyramid $S-ABCDE$, plane $SAE \perp$Plane $AED$,$AE \perp ED$,$SE \perp AD$. The quadrangle $ABCD$is a rectangle, and $SE = AB = 1$,$AD = 3$, and $\overriding {BN} = 2\overriding {NC}$. Find the minimum value of the sine of the angle formed by straight line $DN$and plane $SAD$.		$\frac{\sqrt{26}}{13}$	math	空间向量与立体几何	['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math_487	MCQ_OnlyTxt	Let\( f(x), g(x) \) be functions defined on\( \mathbb{R} \), and\( f(1-3x)+g(x)=1 \), then the following statement is correct ()	['A. If\\( g(x) \\) is an even function, then the graph of\\( f(x) \\) is symmetric about the line\\( x=-1 \\)', 'B. If\\( g(x) \\) is a function with a minimum positive period of 1, then\\( f(x) \\) is a function with a minimum positive period of 3', 'C. If\\( f(x) \\) is an even function, then the graph of\\( g(x) \\) is symmetric about the line\\( x=\\frac{1}{3} \\)', 'D. If\\( f(x) \\) is an odd function, then\\[ \\sum_{i=1}^{9} g\\left(\\frac{i}{15}\\right) = 9 \\]']	BCD	math	函数与导数	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFFT2ds9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4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM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math_488	OPEN_OnlyTxt	It is known that\(F\) is the right focus of the ellipse\(C: \frac{x^2}{a^2} + \frac{y^2}{b^2} = 1(a > b > 0)\),\(P\left(1, \frac{3}{2}\right)\) is the point above\(C\), and that the line\(PF\) and the circle\(O: x^2 + y^2 = 1\) are tangent to the point\(F\). If the two points on\(C\)\(A,B\) satisfy\(PA \perp PB\). Find the minimum chord length of the straight line\(AB\) truncated by the circle\(O\).		\(\frac{\sqrt{183}}{7}\)	math	平面解析几何	['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LoBnuZbvy/tYdRzJJwcYzxkd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn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math_489	OPEN	As shown in the figure<image_1>, in the triangular prism $ABC-A_1B_1C_1$, the bottom surface is a regular triangle with a side length of $2$, the side edge length is $a$,$\angle A_1AB = \angle A_1AC = 45^\circ$, and the planes parallel to $AA_1$and $BC_1$intersect with $AB, AC, A_1C_1, A_1B_1$at the four points of $D, E, F, and G$respectively. When the real number $a$changes, find the range of the sine value of the angle formed by the straight line $BC_1$and the plane $ABC$.		\left(0, \frac{\sqrt{3}}{3}\right)	math	空间向量与立体几何	['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math_490	OPEN	<image_1>15. As shown in Figure 1, in the diamond\(ABCD\) with side length 4,\(\angle DAB = 60^\circ\), points\(M,N\) are the midpoints of sides\(BC,CD\),\(AC \cap BD = O_1\),\(AC \cap MN = G\) respectively. Fold\(\triangle CMN\) to the position of\(\triangle PMN\) along\(MN\), connect\(PA,PB,PD\), and get the pentagonal pyramid\(P-ABMND\) shown in Figure 2. If plane\(PMN \perp\) Plane\(MNDB\), there is a point\(Q\) on line segment\(PA\), so that the cosine of the angle formed by plane\(QDN\) and plane\(PMN\) is\(\frac{\sqrt{13}}{13}\), try to determine the position of point\(Q\)		\(Q\) is the three-bisector of\(PA\) near\(P\)	math	空间向量与立体几何	['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math_491	OPEN	<image_1>As shown in the figure, in the quadrangular pyramid\(P-ABCD\),\(PD \perp AB\),\(PB = PD\), and the base\(ABCD\) is a rhombus with side length of\(\sqrt{3}\),\(\angle ABC = \frac{2\pi}{3}\). If the tangent value of the angle formed by the plane\(PAB\) and the plane\(ABCD\) is 2 and the point\(Q\) satisfies\(\overrightarrow{PC} = 4\overrightarrow{PQ}\), find the cosine value of the angle formed by the line\(CP\) and the plane\(ABQ\).		\(\frac{\sqrt{15}}{5}\)	math	空间向量与立体几何	['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math_492	MCQ	"The Lerot tetrahedron is a very magical ""tetrahedron"" that can rotate freely between two parallel planes and always remain in contact with both planes, so it can roll back and forth like a ball (see Figure A<image_1>). Using this principle, scientists invented the rotary engine. Lerot tetrahedron is a geometric body surrounded by the intersection of four spheres with the four vertices of the regular tetrahedron as the spherical center and the edge length of the regular tetrahedron as the radius (as shown in Figure B<image_2>). If the edge length of a regular tetrahedron\(ABCD\) is 3, then the following statement is correct ()"	['A. The maximum distance between any two points on the surface of Lerot tetrahedron\\(ABCD\\) is greater than 3', 'B. The cross-sectional area of Lerot tetrahedron\\(ABCD\\) measured by plane\\(ABC\\) is\\(\\frac{9\\sqrt{3}}{4}\\)', 'C. The sum of the lengths of the intersection lines of the four surfaces of Lerreau tetrahedron\\(ABCD\\) is\\(6\\pi\\)', 'D. The radius of the largest sphere that a Lerot tetrahedron can accommodate is\\(3 - \\frac{3\\sqrt{6}}{4}\\)']	AD	math	空间向量与立体几何	['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', 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math_493	OPEN	In the first National National Fitness Competition (Southwest Region) Basketball Event Guizhou Selection Competition and the 2024 Guizhou Province Basketball Open held in May 2024, the Tongren City representative team stood out from the 42 teams in the province and entered the finals with their excellent technology and tenacious fighting spirit. Affected by this, a school in Tongren City set off a craze for basketball. During a basketball training class, three students A, B, and C conducted passing training. The first time, the ball was passed out by A. Every time, the passer would pass the ball to either of the other two people. Now Ding joins passing training, and the four people A, B, C and D stand at <image_1>the four points of $A, B, C and D respectively as shown in the picture ($A, B, C, D$are the four vertices of the square), and each time the pass is passed, the probability that the passer will pass the ball to the adjacent classmate is $\frac{1}{4}$, and the probability that the pass will pass the ball to the classmate on the diagonal is $\frac{1}{2}$(For example, the probability of A passing the ball to B or D is both $\frac{1}{4}$, and the probability of passing the ball to C is $\frac{1}{2}$); if A still passes the ball the first time, then $n(n \in \mathbb{N}^*) After $passes, try to compare the probability of the ball being in the hands of A, B, C, and D, and explain the reasons.		If $n$is odd, then $A_n<B_n=D_n<C_n$. If $n$is even, then $C_n<B_n=D_n<A_n$.	math	计数原理与概率统计	['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math_494	OPEN_OnlyTxt	A plays the ball touch and jumping game. The picture is marked with the first grid, the second grid,..., the 25th grid, and the chess pieces start in the first grid. There are 5 small balls of the same size in the box, 3 of which are red and 2 of which are white (the 5 balls are the same except for color). Each time A randomly pulls out two balls in the box, writes down the colors, and puts them back in the box. If the two balls are the same color, the chess piece jumps forward 1 square; if the two balls are different in color, the chess piece jumps forward 2 squares until the chess piece jumps to the 24th or 25th square, the game ends, and the probability that the chess piece jumps to the $n$square is $P_n (n=1,2,3,\cdots,25)$. Find the general formula for $\{P_n\}$.		"P_n = \begin{cases} 
\frac{5}{8} - \frac{5}{8}\left(-\frac{3}{5}\right)^n, & 1 \leq n \leq 24 \\
\frac{3}{8} - \frac{3}{8}\left(-\frac{3}{5}\right)^{23}, & n=25 
\end{cases}"	math	计数原理与概率统计	['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HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/Bk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math_495	MCQ	<image_1>In a cube\(ABCD-A_1B_1C_1D_1\) with an edge length of 2,\(M, N, P\) are the midpoints of\(C_1D_1\),\(C_1C\), and\(A_1A\) respectively, then the following is correct ()	['A. \\(PD_1 \\parallel\\) Plane\\(BMN\\)', 'B. \\(B_1N \\perp\\) Plane\\(ABN\\)', 'C. Polyhedron\\(A_1BB_1-MNC_1\\) is frustum', 'D. The area of the cross-section obtained from a plane\\(BMP\\) truncated cube is\\(3\\sqrt{3}\\)']	AC	math	空间向量与立体几何	['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']	['math_495.jpg']
math_496	MCQ	As shown in the figure<image_1>, in the cube\(ABCD-A_1B_1C_1D_1\),\(AB = 4\),\(BC = BB_1 = 2\), and\(E, F\) are respectively the midpoints of the edge\(AB, A_1D_1\), then the following statements are correct ()	['A. Lines\\(CF\\) and\\(A_1B\\) are intersecting lines', 'B. The angle formed by the heteroplanar line\\(DB_1\\) and\\(CE\\) is\\(90^\\circ\\)', 'C. If\\(P\\) is a point above the edge\\(C_1D_1\\) and\\(D_1P = 1\\), then the four points\\(E\\),\\(C\\),\\(P\\), and\\(F\\) are coplanar', 'D. Plane\\(CEF\\) Cutting the cube may have a hexagonal cross-section']	AC	math	空间向量与立体几何	['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math_497	MCQ_OnlyTxt	cube\(ABCD-A_1B_1C_1D_1\) The edge length is 1, and\(E, F\) are the moving points on the edge\(B_1C_1\) and\(AD\)(inclusive) respectively. Demerit\The plane of the three points (C, E, F\) is\(\alpha\), and let\(d_1\) be the distance from the point\(B\) to the plane\(\alpha\), and\(d_2\) be the distance from the point\(D_1\) to the plane\(\alpha\), then\(\alpha\) that satisfies condition () is not unique.	['A. \\(d_1 + d_2 = \\sqrt{2}\\)', 'B. \\(d_1 + d_2 = \\sqrt{3}\\)', 'C. \\(d_1 - d_2 = \\frac{\\sqrt{2}}{2}\\)', 'D. \\(2d_1 + d_2 = \\sqrt{6}\\)']	AC	math	空间向量与立体几何	['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math_498	MCQ	As shown in the figure<image_1>, in the triangular pyramid\(P-DEF\),\(PE = PF = 1, PD = 2, DE = DF = \sqrt{5}, EF = \sqrt{2}\), the point\(Q\) is a moving point on\(DF\), then ()	['A. The area of the section passing through the midpoints of\\(PE\\),\\(PF\\),\\(DE\\), and\\(DF\\) is\\(\\sqrt{2}\\)', 'B. The sine value of the angle formed by straight line\\(PE\\) and plane\\(DEF\\) is\\(\\frac{2}{3}\\)', 'C. \\(\\triangle PEQ\\) The minimum value for area is\\(\\frac{\\sqrt{5}}{5}\\)', 'D. The plane figure obtained by unfolding the four faces of the triangular pyramid in the same plane can be a right triangle or a square']	BCD	math	空间向量与立体几何	['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math_499	MCQ_OnlyTxt	It is known that the radii of the upper and lower bottom surfaces of the round table\(OO_1\) are 2 and 4 respectively, and the bus length is 4. The four vertices of the upper base of the regular four-sided frustum\(A_1B_1C_1D_1\) are on the circumference of the upper base of the truncated cone, and the four vertices of the lower base\(ABCD\) are on the circumference of the lower base of the truncated cone, then ()	['A. \\(AA_1 \\perp BD\\)', 'B. The size of the dihedral angle\\(A_1-AB-C\\) is\\(60^\\circ\\)', 'C. The surface area of the circumscribed ball of the regular quadrangular frustum\\(ABCD-A_1B_1C_1D_1\\) is\\(64\\pi\\)', 'D. Let the volume of the truncated cone\\(OO_1\\) be\\(V_1\\), and the volume of the regular quadrangular cone\\(ABCD-A_1B_1C_1D_1\\) be\\(V_2\\), then\\(\\frac{V_1}{V_2} = \\frac{\\pi}{2}\\)']	ACD	math	空间向量与立体几何	['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TXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hf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math_500	OPEN	<image_1>In the triangular pyramid\(A-BCD\), plane\(ABD \perp\) plane\(BCD\),\(AB = AD\),\(O\) is the midpoint of\(BD\). If\(\triangle OCD\) is an equilateral triangle with side length 1, the point\(E\) is on the edge\(AD\),\(DE = 2EA\), and the volume of the triangular pyramid\(E-BCD\) is\(\frac{\sqrt{3}}{9}\), find the cosine of the dihedral angle formed by the side\(ACD\) and the base\(BCD\).		\frac{\sqrt{21}}{7}	math	空间向量与立体几何	['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']	['math_500.jpg']
math_501	MCQ	As shown in Figure A<image_1>, in $\triangle ABC$,$AB=BC=2, \angle ABC=120^\circ$,$D$is the midpoint of $AC$,$E$is the point above $AB$, and $\overline{DE} \cdot \overline{AB} = 0$is satisfied. Fold $\triangle ADE$along $DE$to obtain the straight dihedral angle $A-DE-B$, connect $AC, F$is the midpoint of $AC$, and connect $BF, BD, DF$(as shown in Figure B<image_2>), then the following conclusions are correct ()	['A. $AD \\perp BD$', 'B. $BF \\parallel$Plane $ADE$', 'C. The tangent of the angle formed by $AD$to the plane $ABE$is $\\frac{\\sqrt{3}}{3}$', 'D. The volume of the triangular pyramid $B-DFC$is $\\frac{\\sqrt{3}}{8}$']	CD	math	空间向量与立体几何	['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'math_501_2.jpg']
math_502	MCQ	<image_1>In the rectangle $ABCD$,$AB = 2BC = 2$, and the point $E$is the midpoint of $CD$. Fold $\triangle BCE$along $BE$to $\triangle PBE$, connect $AP, DP$to get the quadrangular pyramid $P-ABED$. During the process of folding $\triangle BCE$to $\triangle PBE$, the size of the dihedral corner $P-BE-A$is $\theta$. The following statement is correct ()	['A. When the volume of the quadrangular pyramid $P-ABED$is at its maximum,$AE \\perp PB$', 'B. When $\\theta = \\frac{\\pi}{2}$, the circumscribed surface area of the triangular pyramid $P-ABE$is $4\\pi$', 'C. If $M$is the midpoint of $PB$, then there is $\\theta$that makes $EM$non-parallel to the plane $PAD$', 'D. When $\\theta = \\frac{3}{4}\\pi$,$PA^2 = 3 + \\sqrt{2}$']	ABD	math	空间向量与立体几何	['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math_503	MCQ	As shown in the figure<image_1>, in the rectangle $ABCD$,$AB = 2AD = 2$,$E$is the midpoint of edge $AB$, and $\triangle ADE$is folded along the straight line $DE$to the position of $\triangle A_1DE$. If $M$is the midpoint of the line segment $AC$, during the $\triangle ADE$folding process ($A_1 \notin$Plane $ABCD$), the following conclusions are correct ()	['A. The maximum volume value of the triangular pyramid $B-A_1CE$is $\\frac{\\sqrt{2}}{12}$;', 'B. Line $MB \\parallel$Plane $ADE$;', 'C. The angle formed by the straight line $BM$and $A_1E$is a fixed value;', 'D. There is $\\triangle A_1DE$, making $DE \\perp A_1C$.']	ABC	math	空间向量与立体几何	['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math_504	OPEN	As shown in Figure 1<image_1>, there is a regular hexagon ABCDEF with a side length of 4. The quadrangle ADEF is folded along AD to the position of the quadrangle ADGH, and BH and CG are connected to form a polyhedron\(\hat{A}BCDGH\) as shown in Figure 2<image_2>. If the magnitude of the dihedral angle $H-AD-B$is $\frac{\pi}{3}$, and M is a moving point on the line segment CG (M does not coincide with C, G), is the sum of the volumes of the quadrangular pyramid $M-ABCD$and the quadrangular pyramid $M-ADGH$a fixed value? If so, find this fixed value; if not, please explain the reason.		is a fixed value,\(12\sqrt{3}\)	math	空间向量与立体几何	['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']	['math_504_1.jpg', 'math_504_2.jpg']
math_505	OPEN_OnlyTxt	In $\triangle ABC$, it is known that $AB = 4$,$BC = 5$,$AC = 6$, and $D$is a moving point on the line segment $BC$. Fold $\triangle CAD$to the position of $\triangle SAD$, and remember that the size of the dihedral corner $S-AD-B$is $\alpha$. If $\alpha = 120^\circ$, find the minimum area of the circumscribed sphere of the triangular pyramid $S-ADB$.		\frac{553}{12}\pi	math	空间向量与立体几何	['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math_506	MCQ	As shown in the figure<image_1>, the plane quadrangle $ABCD$satisfies $AB=AC=BC=\sqrt {2}$,$DC=\sqrt{2}$,$DA=2$, and $BD$and $AC$intersect at the point $O$. If you fold $\triangle ACD$along $AC$, you get the triangular pyramid $D'-ABC$. It is known that the plane angle of the dihedral angle $D'-AC-B$is $\alpha$, the angle formed by the straight line $AD'$and the plane $ABC$is $\beta$, and $\angle D'AC=\gamma$. Then the following statement is correct ()	"[""A. During the folding process,$AC$and $BD'$are always vertical"", 'B. During the folding process,$\\sin \\alpha=\\sin \\beta \\cdot \\sin \\gamma$is always true', 'C. During folding, the maximum value of $\\beta$is $\\frac{\\pi}{4}$', ""D. When plane $CAD'\\perp$plane $BAD'$, then the triangular pyramid $D'-ABC$is a regular triangular pyramid""]"	ACD	math	空间向量与立体几何	['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math_507	MCQ	As shown in the figure<image_1>, in the isosceles right triangle $ABC$,$\angle A=90^\circ$, point $E$is the midpoint of edge $AC$, and point $D$is the point on edge $BC$(not coinciding with $C$). Fold the triangle $DCE$counterclockwise along $DE$, the corresponding point to point $C$is $C_1 $, connect $CC_1$, and set $\theta$to the size of the dihedral angle $C_1-DE-C$,$\theta \in (0,\pi)$. During the folding process, the following statements are incorrect: ()	['A. There are points $D$and $\\theta$such that $DC_1 \\perp AC$', 'B. There are points $D$and $\\theta$such that $BC_1 \\perp AC$', 'C. There are points $D$and $\\theta$such that $BC_1 \\perp DE$', 'D. There are points $D$and $\\theta$such that $CC_1 \\perp DE$']	B	math	空间向量与立体几何	['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']	['math_507.jpg']
math_508	MCQ	<image_1>In right-angled trapezoid $ABCD$,$\angle ABC=90^\circ$,$AB=4$,$CD=3$,$BC=\sqrt{3}$,$AB \parallel CD$,$F$on $CD$,$E,G$on $AB$,$BE=CF=AG=1$. Fold $\triangle ADG$along line $DG$to the position of $\triangle PDG$, fold $EFCB$along $EF$to the position of $EFNM$, so that $\angle PGE=\angle MEG=60^\circ$, then ()	['A. The angle formed by $PD$and $NF$is $30\\circ $', 'B. Plane $GDP \\parallel$Plane $EFNM$', 'C. The angle formed by line $PF$and plane $PGD$is $45\\circ $', 'D. The volume of the quadrangular pyramid $P-EFDG$is 1']	BCD	math	空间向量与立体几何	['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math_509	OPEN	<image_1>It is known that in trapezoidal $PBCD$,$PD \parallel BC$,$E$is a point on $PD$and $BE \perp PD$,$PE=BE=1$,$BC=\frac{1}{2}ED$, fold $\triangle PBE$along $BE$so that the plane angle of dihedral angle $P-BE-C$is $\theta$, connecting $PC$and $PD$, and $F$is the midpoint of edge $PD$. When $\theta=\frac{2\pi}{3}$, find the size of the angle formed by straight line $PC$and plane $BCDE$.		$\arcsin \frac{\sqrt{15}}{10}$	math	空间向量与立体几何	['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math_510	OPEN	As shown in the figure<image_1>, fold the paper with the function $f(x)=M\cdot\sin\left(\frac{\pi}{3}x+\varphi\right)(M&gt;0,0&lt;\varphi&lt;\pi)$into a blunt dihedral angle along the $x$axis, with the included angle of $\frac{2\pi}{3}$. At this time, the distance between $A and B$is $3\sqrt{2}$, then $\varphi=$()		$\frac{3\pi}{4}$	math	空间向量与立体几何	['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math_511	OPEN	As shown in Figure ①<image_1>, the quadrangle $ABCQ$is a right-angled trapezoid,$AQ \parallel BC$,$AQ \perp AB$, and $AQ=2BC=2AB=2$, and $D$is the midpoint of the line segment $AQ$. Now fold the $\triangle QCD$along $CD$, so that the $Q$point reaches the $P$point, as shown in Figure ②<image_2>; connect $PA$and $PB$, where $M$is the midpoint of the line segment $PA$. If the size of the dihedral angle $A-CD-P$is $60^\circ$, is there a point $N$on the line segment $PC$so that the tangent of the angle formed by the line $PB$and the plane $BDN$is $\frac{\sqrt{15}}{15}$? If it exists, find the volume of the triangular pyramid $P-BDN$; if it does not exist, please explain the reason.		exists, and the volume of the triangular pyramid $P-BDN$is 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'math_511_2.jpg']
math_512	MCQ	As shown in the figure<image_1>, in the straight quadrangular prism $ABCD-A_{1}B_{1}C_{1}D_{1}$, the bottom surface is a rectangle with $AB=8$,$BC=4$, the height of the straight quadrangular prism is 4, and $E$and $F$are the midpoints of edges $AB$and $A_{1}D_{1}$respectively. Then the following statements are correct ()	['A. Line $A_1B$intersects $CF$', 'B. The angle formed by the heteroplanar straight line $DB_{1}$and $CE$is $90^{\\circ}$', 'C. Dihedral angle $D_{1}-The plane angle of CE-D$is $45^{\\circ}$', 'D. The cross-section obtained by cutting the cube in plane $CEF$is pentagonal']	AD	math	空间向量与立体几何	['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']	['math_512.jpg']
math_513	MCQ	As shown in the figure<image_1>, the geometry is a combination of a cone and a hemisphere, wherein the section of the cone axis is an equilateral triangle with a side length of 2, and the point Q is a moving point on the hemispherical surface. Then the following statement is correct ()	['A. The volume of the combination is $\\left(\\frac{\\sqrt{5}+2}{3}\\right)\\pi$', 'B. The range of the angle formed by PQ and planar PAB is $\\left[0,\\frac{\\pi}{6}\\right]$', 'C. The range of the angle formed by planar PAQ and planar PBQ is $\\left[0,\\frac{\\pi}{3}\\right]$', 'D. When $PQ =\\sqrt {7}$, the length of the trajectory formed by the Q point is $\\pi $']	ABD	math	空间向量与立体几何	['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']	['math_513.jpg']
math_514	OPEN	As <image_1>shown in the figure, in the quadrangular pyramid P-ABCD, the quadrangular ABCD is a rhombus with an edge length of 2, ABC=120°, PDC=90°, and PB=PD. If PAC=60°, M is the midpoint of the BC edge, and G is the moving point on the surface of the pyramid with always AP MG, find the trajectory length of the point G.		\frac{7}{10}\sqrt{13}+\frac{2}{5}\sqrt{37}+1	math	空间向量与立体几何	['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math_515	MCQ_OnlyTxt	Given that the cuboid ABCD-A B C D, AB=AD=2, AA =4, M is the midpoint of BB, and the point P satisfies $\overrightarrow{BP}=\lambda\overrightarrow{BC}+\mu\overrightarrow{BA}$, where λ∈[0,1], μ∈[0,1], and MP plane ABD, then the length of the trajectory formed by the trajectory of the moving point P is ()	['A. 3', 'B. $\\sqrt{5}$', 'C. $2\\sqrt{2}$', 'D. 2']	A	math	空间向量与立体几何	['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math_516	MCQ_OnlyTxt	Function\( f(x) = \log_{0.5} \left( x^2 - 3x - 4 \right) \). Then the following conclusions are correct ()	['A. The range of\\( f(x) \\) within its domain is\\( \\mathbb{R} \\)', 'B. The monotonically increasing interval of\\( f(x) \\) is\\( \\left( -\\infty, \\frac{3}{2} \\right) \\)', 'C. For any\\( x \\) in the domain,\\( f(3 + x) = f(-x) \\) always holds', 'D. The image of\\( f(x) \\) is distributed in all four quadrants and has exactly two zero points']	ACD	math	函数与导数	['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math_517	MCQ	As shown in the figure<image_1>, in a cube\(ABCD-A_1B_1C_1D_1\) with an edge length of 2, the points\(M\) and\(N\) are the midpoints of the edges\(CD\) and\(CB\) respectively, and the point\(Q\) is a moving point inside (without boundaries) on the side surface\(ABB_1A_1\), then ()	['A. When the point\\(Q\\) moves, the polygon obtained from a plane\\(MNQ\\) truncating a cube may be a quadrangle, pentagonal or hexagonal.', 'B. When a point\\(Q\\) moves, there is a plane\\(MNQ \\perp\\) plane\\(AA_1C_1\\)', 'C. When point\\(Q\\) is the midpoint of\\(AB_1\\), line\\(AC \\parallel\\) plane\\(MNQ\\)', 'D. When the point\\(Q\\) is the midpoint of\\(AB_1\\), the area of the cross-section obtained by the plane\\(MNQ\\) truncating the circumscribed sphere of the cube is\\(\\frac{17\\pi}{6}\\)']	BCD	math	空间向量与立体几何	['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math_518	MCQ_OnlyTxt	In a cube with an edge length of 1\(ABCD-A_1B_1C_1D_1\), the following statement is correct ()	['A. If the point\\(M\\) is a point (with boundaries, except for point\\(A\\)) inside\\(\\triangle ABC_1\\), then for any\\(M\\), there is a\\(AM \\perp\\) plane\\(DB_1C\\)', 'B. If\\(P\\) and\\(Q\\) are the midpoints of\\(C_1D_1\\) and\\(DD_1\\) respectively, then the section perimeter obtained by cutting the cube by plane\\(BPQ\\) is\\(\\sqrt{13} + \\frac{\\sqrt{2}}{2}\\)', 'C. If the point\\(M\\) satisfies\\(|AM|  = 2| CM|\\), then\\(|AM| The minimum value for\\) is\\(\\frac{\\sqrt{41} - 2\\sqrt{2}}{3}\\)', 'D. If the point\\(M\\) is on\\(AC\\) and the point\\(N\\) is on\\(A_1D\\), then\\(|MN| The minimum value of\\) is\\(\\frac{\\sqrt{3}}{3}\\)']	BCD	math	空间向量与立体几何	['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math_519	MCQ	As shown in the figure<image_1>, in the cube\(ABCD - A_1B_1C_1D_1\),\(AB = 3\),\(AD = 2\),\(AA_1 = 1\),\(E\) is a moving point on the edge\(CD\), and the following propositions are correct ()	['A. The surface area of a cuboid ball is\\(14\\pi\\)', 'B. The minimum value of the perimeter of the section obtained from a plane truncated cuboid\\(ABCD - A_1B_1C_1D_1\\) passing through the three points\\(A\\),\\(E\\), and\\(C_1\\) is\\(6\\sqrt{2}\\)', 'C. There is a corresponding point\\(G\\) on the edge\\(DD_1\\) such that\\(A_1G \\parallel\\) plane\\(AEC_1\\)', 'D. If\\(CE = \\frac{1}{3}CD\\), the point\\(F\\) is moving on the quadrangle\\(A_1B_1C_1D_1\\)(including the boundary), and\\(DF \\parallel\\) is plane\\(AEC_1\\), then the minimum value of\\(DF\\) is\\(\\frac{\\sqrt{6}}{2}\\)']	ABD	math	空间向量与立体几何	['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']	['math_519.jpg']
math_520	MCQ	As shown in the figure<image_1>, in a cube\(ABCD-A_1B_1C_1D_1\) with an edge length of 2,\(M\) is the midpoint of the edge\(BC\), and\(N\) is the moving point (including the endpoint) on the edge\(DD_1\), then the following statements are correct ()	['A. The volume of the triangular pyramid\\(A_1 - AMN\\) is fixed', 'B. If\\(N\\) is the midpoint of edge\\(DD_1\\), then the perimeter of the cross-section obtained by the planar truncated cube\\(ABCD-A_1B_1C_1D_1\\) passing through\\(A\\),\\(M\\),\\(N\\) is\\(\\frac{7\\sqrt{5}}{2}\\)', 'C. If\\(N\\) is the midpoint of edge\\(DD_1\\), then the surface area of the circumscribed sphere of tetrahedron\\(D_1 - AMN\\) is\\(7\\pi\\)', 'D. If the angle formed by\\(CN\\) and the plane\\(ABC\\) is\\(\\theta\\), then\\(\\sin \\theta \\in \\left[\\frac{\\sqrt{3}}{3}, \\frac{\\sqrt{6}}{3}\\right]\\)']	AD	math	空间向量与立体几何	['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']	['math_520.jpg']
math_521	OPEN	As shown in the figure<image_1>, in the box\(ADD_1A_1 - BCC_1B_1\), the bottom\(ADD_1A_1\) is a square with side length of 1,\(\cos \angle C_1AD_1 = \frac{\sqrt{3}}{3}\),\(\overline{AP} = \lambda \overline{AA_1} (0 \leq \lambda \leq1)\). If\(\lambda = \frac{1}{2}\), pass through the point\(P\) so that the plane\(\alpha\) is parallel to the plane\(AD_1C\), and calculate the area of the cross-section obtained from the plane\(\alpha\) truncated cuboid\(ADD_1A_1 - BCC_1B_1\);		\(\frac{9}{4}\)	math	空间向量与立体几何	['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']	['math_521.jpg']
math_522	MCQ	"Lerot tetrahedron is a very magical ""tetrahedron"" that can rotate freely between two parallel planes and always remain in contact with both planes, so it can roll back and forth like a ball (see Figure A<image_1>). Using this principle, scientists invented the rotary engine. Lerot tetrahedron is a geometric body surrounded by the intersection of four spheres with the four vertices of the regular tetrahedron as the spherical center and the edge length of the regular tetrahedron as the radius (as shown in Figure B<image_2>). If the edge length of a regular tetrahedron\(ABCD\) is 3, then the following statement is correct ()"	['A. The maximum distance between any two points on the surface of Lerot tetrahedron\\(ABCD\\) is greater than 3', 'B. The cross-sectional area of Lerot tetrahedron\\(ABCD\\) measured by plane\\(ABC\\) is\\(\\frac{9\\sqrt{3}}{4}\\)', 'C. The sum of the lengths of the intersection lines of the four surfaces of Lerreau tetrahedron\\(ABCD\\) is\\(6\\pi\\)', 'D. The radius of the largest sphere that a Lerot tetrahedron can accommodate is\\(3 - \\frac{3\\sqrt{6}}{4}\\)']	AD	math	空间向量与立体几何	['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', 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']	['math_522_1.jpg', 'math_522_2.jpg']
math_523	MCQ	As shown in the figure<image_1>, it is known that in a straight triangular prism\(ABC - A_1B_1C_1\),\(F\) is the midpoint of\(A_1C_1\),\(E\) is the moving point on the edge\(BB_1\),\(AA_1 = 2\),\(AB = 2\),\(BC = 3\sqrt{2}\),\(AC = 4\), then the following conclusions are correct ()	['A. The maximum distance from point\\(A\\) to plane\\(AEF\\) is\\(\\sqrt{2}\\)', 'B. The surface area of the circumscribed sphere of this straight triangular prism\\(ABC - A_1B_1C_1\\) is\\(\\frac{146\\pi}{7}\\)', 'C. When the radius of the circumscribed sphere of the triangular pyramid\\(A - AEF\\) is the smallest, the cosine value of the angle formed by the straight line\\(EF\\) and\\(AA_1\\) is\\(\\frac{\\sqrt{2}}{4}\\)', 'D. If\\(E\\) is the midpoint of the edge\\(BB_1\\), and the plane passing through the three points\\(A\\),\\(E\\), and\\(F\\) makes the cross-section of the straight triangular prism\\(ABC - A_1B_1C_1\\), then the area of the obtained cross-section is\\(\\sqrt{15}\\)']	ACD	math	空间向量与立体几何	['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']	['math_523.jpg']
math_524	MCQ_OnlyTxt	In the regular quadrangular pyramid\(P-ABCD\),\(AB = 2, PA = \sqrt{6}\), the plane\(\alpha\)(not coincident with the bottom surface) passing through\(AB\) and the lateral edges\(PC\),\(PD\) intersect at points\(E\) and\(F\) respectively, and the volumes of the plane\(\alpha\) dividing the quadrangular pyramid\(P-ABCD\) into upper and lower parts are\(V_1\),\(V_2\) respectively. Then the following proposition is correct ()	['A. \\(AF \\parallel BE\\)', 'B. \\(CD \\parallel EF\\)', 'C. If\\(E\\) is the midpoint of\\(PC\\), then\\(\\frac{V_1}{V_2} = \\frac{3}{5}\\)', 'D. If the plane\\(\\alpha\\) passes through the center of the circumscribed ball of the regular pyramid\\(P-ABCD\\), then\\(\\frac{PE}{EC} = \\frac{3}{2}\\)']	BCD	math	空间向量与立体几何	['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math_525	MCQ_OnlyTxt	In $ABCD-A_1B_1C_1D_1$,$AB = 2A_1B_1 = 4\sqrt{3}$, then the following statement is correct ()	['A. If there is a ball inside a regular frustum that is tangent to all faces of the frustum, the lateral edge length of the frustum is $\\sqrt{30}$', 'B. If each vertex of a regular prism is on a sphere with a radius of $\\sqrt{30}$, the volume of the prism is $28\\sqrt{6}$', 'C. If the lateral edge length of a regular quadrangular frustum is $\\sqrt{7}$,$Q$is the midpoint of $BB_1$, and a plane passing through the line $C_1Q$and parallel to the line $B_1D_1$divides the frustum into two parts of unequal volumes, then the volume of the smaller part is $12$', 'D. If $AA_1 = \\sqrt{10}$, point $P$is within the quadrangle $ABCD$, and $AP = 4$, then the trajectory length of point $P$is $\\frac{3\\sqrt{3}}{2}\\pi$']	AC	math	空间向量与立体几何	['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']	['img_for_onlytxt.jpg']
math_526	OPEN_OnlyTxt	In the regular tetrahedron $ABCD$,$E, F$are the midpoints of $AB, BC$respectively,$\overrightarrow{AG} = \frac{1}{3}\overrightarrow{AD}$, and the section $EFG$divides the tetrahedron into two parts, so the ratio of the volume of the larger part to the smaller part is ()		23：13	math	空间向量与立体几何	['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math_527	OPEN	There are many geometric bodies with beautiful shapes and unique meanings in mathematics. <image_1>The gift packaging box shown in Figure 1 is one of them. The gift packaging box can be regarded as a decahedron, in which the upper and lower bottom surfaces are congruent squares, and all sides are congruent triangles. Rotate the upper and bottom surfaces $A_1B_1C_1D_1 $of the rectangle $ABCD-A_1B_1C_1D_1 $around its center by $60 ^\circ $to obtain <image_2>the decahedron $ABCD-EFGH$shown in Figure 2. It is known that $AB = AD = 2$,$AE = \sqrt{6}$,$P$is the point in the base square $ABCD$, and the distances from $P$to $AB$and $AD$are both $\frac{\sqrt{3}}{2}$. Crossing the straight line $EP$as the plane $\alpha$, then the minimum value of the cross-sectional circle area of the decahedron $ABCD-EFGH$circumscribed by the plane $\alpha$is ()		\frac{39 + 12\sqrt{3}}{30 - 4\sqrt{3}} \pi	math	空间向量与立体几何	['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']	['math_527_1.jpg', 'math_527_2.jpg']
math_528	MCQ	A certain combination consists of a copper ball and a tray, as shown in Figure ①<image_1>. The volume of the ball is known to be $\frac{4\pi}{3}$, and the tray is made of an equilateral triangular copper plate with a side length of 4 along the line connecting the midpoint of each side to fold upwards into a straight dihedral angle, as shown in Figure ②<image_2>. Then the following statements are correct ()	['A. The volume of polyhedron $ABCDEF$is $\\frac{9}{4}$', 'B. The area of the sectional circle of a sphere passing through the three vertices $A, B, C$is $\\frac{\\pi}{4}$', 'C. The cosine value of the angle formed by the heteroplanar line $AD$and $CF$is $\\frac{5}{8}$', 'D. The minimum distance between the ball and the bottom surface of the ball holder $DEF$is $\\sqrt{3} + \\frac{\\sqrt{6}}{3} - 1$']	ACD	math	空间向量与立体几何	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEaAKsDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD27+wNG/6BFh/4DJ/hR/YGjf8AQIsP/AZP8K0aKAM7+wNG/wCgRYf+Ayf4Uf2Bo3/QIsP/AAGT/CtGigDO/sDRv+gRYf8AgMn+FH9gaN/0CLD/AMBk/wAK0aKAM7+wNG/6BFh/4DJ/hR/YGjf9Aiw/8Bk/wrRooAzv7A0b/oEWH/gMn+FH9gaN/wBAiw/8Bk/wrQLBQSxAA6k1kXvizw9prbbzW9Pgb+69woP5ZzQBP/YGjf8AQIsP/AZP8KP7A0b/AKBFh/4DJ/hWI/xL8IIcf2wG947eVx+YU0+L4keEJTj+24Y/eZHjH5sooA2P7A0b/oEWH/gMn+FH9gaN/wBAiw/8Bk/wosdf0fUxmx1SyuR/0xnVv5GtGgDO/sDRv+gRYf8AgMn+FH9gaN/0CLD/AMBk/wAK0aKAM7+wNG/6BFh/4DJ/hR/YGjf9Aiw/8Bk/wrRooAzv7A0b/oEWH/gMn+FH9gaN/wBAiw/8Bk/wrRooAzv7A0b/AKBFh/4DJ/hR/YGjf9Aiw/8AAZP8K0aKACiiigAooooAKKK57xF4pXSZo9NsLVtR1q4XMFnGcYH9+Rv4EHr+VAGrqmrafolhJfandxWttGPmklbA+g9T7CuZXxD4j8RLnw7pS2Vm/wB3UNUUruHqkI+Y+xYj8am0nwc0l3Hq/ia4GqasDuQEf6PbH0iT2/vHk11lAHHQ+AIrtvN8SaxqOtzHkpLL5MCn/ZijwMfXNblj4Z0LTV22WkWMA/2IFH9K1aKAGpGkYwiKo9AMU2SCGYYlijcejKDUlFAGHf8Agzw3qR3XWi2bP/fWMIw+jLgisg+DdV0h/N8MeI7u3Qf8uOok3VufYE/Ov4NXZ0UAccPGtxo0qQeLtMbTFYhVv4iZbRj7v1TP+1+ddfHIksayRurowDKynIIPcGkmhiuIXhmjSSJxtZHGQw9CK4u48Pan4SkN94SHnWIO640WV/kYdzCx+43+z0PtQB29FZeha/YeIrD7XYyE7WKSxONskLjqrr2IrUoAKKKKACiiigAooooAKKKqapqVro+l3Oo3sgjtraMySN7D+tAGR4q8RPpEVvYadELnWr9vLs7ft7yP6Io5J/CpPDXhmLQYpp5pmvNVuyHvL2T70reg9FHQL2FUPBum3Nw8/ijV4THqepKDHC/W1t+qR+x7t7n2rraACiiigAooooAKKKKACiiigAooooA5HxHoN5Zag3ifw3Ev9qogF1ag7Vv4x/C3+2B91vw6Vu6HrVp4g0mHUbJiY5ByjDDRsOqsOxB4NaNcRqKN4M8VJrEJxomrSrDfxdoJzwkw9A33W/A0AdvRRRQAUUUUAFFFFABXGeJWHiDxbpfhdfmt4QNR1EdtinEaH/efnHotdn0rj/AyC+m1zxC4zJqN8yRt/wBMYvkQfTIY/wDAqAOwooooAKKKKACiiigAooooAKKKKACiiigAqnq2mW2s6TdabeJut7mMxuO+D3HuKuUUAcv4F1G7udEk03U336ppMpsrl/8Anpt+5J/wJdp/Guorj2YaP8U41J2w65YsAPWeAg/qjH/vkV2FABRRRQAUUUUAZ3iC/wD7L8N6pqH/AD62ks3/AHyhP9Kp+C7L+zvBWjWx+8tpGW+pGT+pql8SnMfw218r1Noy/geD/Oujs0EVjbxr0WNVH4CgCeiiigAooooAKKKKACiiigAooooAKKKKACiiigDjvH6GD/hHdXVtp0/WIGdu/lyZiYfjvFdjXJ/ElQ3ga8PdJ7Zx+E8ZrrAcjNABRRRQAUUUUAcz8Q4Dc/DrxBGoyRYyvj/dXd/StvS5xc6RZTg5EsCOPxUGn31ql7p9zaSDKTxNGw9QwIP86wfh9cvc+B9MWU5mtozay+zxkof/AEGgDpqKKKACiiigAooooAKKKKACiiigAooooAKKKKAOS+JLE+DJIV5ee7tIlHqTcR/0Brra4zxkWvvE3hDRkJ+fUGvpcdBHBGx5+rMtdnQAUUUUAFFFFABXG+HJP7G8ba74ekG2K5I1SzPYq/yyqPo65/4FXZVyfji1nt4LLxJZRNJd6PIZWRB80kBGJU/Lke6igDrKxrnxPpsF/JYRNNeXkQzLDZwtMYv98qMKfYkGsLx94t/s34a3Gt6PMsj3aRx2cq9MyEAN+AJP4Vt+EtAtvDnhu0sLdcvsDzyn700pGWdj3JOaAJdI8R6brs93BYyyNNZlVuEkheNombOFIYDnj+XrWtVW20+2tLq8uYY9st5Iskzf3iECD9FFWJJEhjaSR1SNAWZmOAAOpJoAdRWHp3izSdaN2ujzNfm2TcxgU7GP91XPyk/jSaXqevagtybnQU01RGTbtPdiRnfsGVR8o/E0AbtFc9o8fjDzLg61caHtMREC2UMvyydixZuR7ACl0aPxfFcTf23c6LcQeUfKFnDLG/mZGNxZmG3Ge2aAOgorC0nUfEMt1JDrGhQWsSoWW4trwTK59NpUEfrRo/i3TNZvXsYvtNveopdra6t2ifaOMjI5H0oA3aa7iONnIYhRkhQSfwA606s7X9Tj0Xw/qGpynCWtu8p/AE0AY0XxG8Mywyz/AGy4S2hmMEtxJZTLFFIMZVnKbVPI6kda6hHSWNZI3V0YBlZTkEHuDXh8k9/pXwv0/wAOXmn/ANnLrxKXOrXLK0SPMxYkqpJyQcDOOgr0jVrkeCvBFtZWJae8SNLGxR/vSykbV/xPsDQBDopGsfEDWtWHzQafEumQN2LZDy4/HaP+AmuwrH8L6Enhzw7aaaJDLKi7p5j1llbl3P1Yk1sUAFFFFABRRRQAUEZGD0oooA8p17w9BZxXXgy9ka20LVpPN0m6Aytncht3lH0BPK/iK6vS7jxnDaRWN9pWmvPGoQ3yXpEbgcbtmzdn2/UVu6xpFlrulT6bfxCW3mXDDuD2IPYg8g14Z4k8U+JvB+pjwhquv3C6dGoeLV7WLdcKpz5SSn6jnHzEDvmgD1/TfEltc6sdFtWudQuIFb7VeRxAQxP/AHS3TPsM470/R/D93aXE93q2s3Op3E6GNo3Gy3VSeixDj8Tk+9QeAvEtp4q8LQahbmETBjHdLFgASj7x/HqPYiumoAZFFHBEsUUaxxoMKiDAA9AKfRRQAUhdQ4QsAzZIGeTUdzcw2dtLc3EixwxKXd2PAArzvQdQ1HVvjFcy3gkht4dG329q4wYRJKpBYdnIXJHbp2oA9JpskayxtG6hkYFWB7g06igDnNN8NHwzDdnRZ7maExH7Pp1zcEwxsOm1iCVHbHSuY8SSa/4+8MyaNY6R/Z9ws8Q1GG/lMfyqwbajKrBw2B8w7dq9Krzj4y+JbHRvCS2Ms0iXl7KggaF2Dw7SGMvykH5ccDucds0AS+IvDWq+KI7OHxB/ZmleHrCRbmaGC4aZ5dnQFiiBV/Ornh+KTxbrw8V3asunW4aLR4GGMqeGnI9W6L6D61wfgm6134mXUOn+JrqRNIsIkuBbPGY5NSQswR5PVfl5A4Jr3CONIo1jjRURRhVUYAHoBQA6iiigAooooAKKKKACiiigA6DJrgvCem2fiqx8QarqdrHc2usXzrGkgyDBF+6Qj0+6T+NdB4z1JtJ8IandR/67yTHEPWR/lUfmRVzQNMTRvD2n6bGPltrdI/qQOT+JyaAPF/EPg7U/hnq51/SNavotGlIjcQRq7wMT8pdDxKvbPB6V2mg/EHUrm0MlzpqatDEdstzo5LOh9JLdvnQ+3Nd1qem2usaZc6dexCW2uYzHIh7g15/oPhvT9VmudL1USQeI9HIiXUbZzFPNAf8AVyFh97IGDnPIoA6jTfHnhjVZvs8Gr28d0Dg21y3kyg+mx8HNdGCCMg5Fefat4T8RmIIzaN4ntl6Q6xbiOYD/AGZVBGfqorEj0izsBi48E+JNIbudFvzJEP8Avlwf/HaAOxvD/wAJTrcuk3FrfQaXZqsju0ckQupM8BW4+VcZPqSOwOcXwhZG0+JPiO4FnqUdrNBbxWs91FKRJtDFsM/uR1ri9T1hbnUYdP0DW/F9qsbsL65milm+z4Hyps2klifwAHvU/h7V7a/tBZaxdeM59ahX9/b2ryqHGcCReFIVuvOMUAe3zTRW8TSzSpHGoyzuwUD6k1zFz8RfDiXBtbG7fVrsf8u+mRm4b8SuQPxNcafDy3sqvY/Du6vJO1x4jv8AAX327nJrpLLwfrlxbLDqWtQ6da97DQYPs6D28w/MfwC0Ac/4o+IOtR7rZFi0RthcwgC6vygGSRGp2RjH8Tk1Q8C/DaPxDcr4v8SG8mS7Ae1sbuYyMU/heVuMk/e2gAc9K3b3QNMk1mHwZoVkkNqwF3rdyvLtGD8kbMeWZ265PQH1r0lVVEVFACqMADsKAOQ1lF0nx94d1CNQkN1FJpsm0YHTfH+qsB/vV2Fcp8RrWeXwZd3toubzTGTUIOP4oWD/AKgEfjXSWN5FqFhb3sBzDcRLKh/2WGR/OgCeiiigAooooAKKKKACiiigDjfF7HU/Evhnw8nKSXLX90P+mUIyAfYuyflXZVyGhgan8QPEGqHlLNI9NhPpj55MfiVH/Aa6+gArjvGlnLptzaeL7CNmu9MBS6jTrPasfnUjuVwGH0PrXY0jKroUYBlYYIPQigCK1uob20huraRZIJkEkbqchlIyCK5/xVr13aPb6LoqpJrl/kQ7uVt4/wCKZ/Ydh3PFc3FrafDi5vvD80Us8EredocKglpN7YNuP91jx/sn2rpvCnh2bTEuNU1WQXGuagfMupuojH8MSeiKOPc5NAF/w7oNt4d0iOxt2aRsmSad+XmkPLOx9SazfFfh+4vJLfW9GYRa7p4JhbOFnQ/ehf1U9vQ4NdPRQBk+HdftfEekR31tuRwTHPA/DwSDhkYdiD/jS+Itcg8O6Hc6lOrSeWuI4l+9LIeFQe5OBWB4hsrnw1q7eLNIt2mhZQurWcQ5mjH/AC1Ud3UfmOPSq+nXkXj/AMVRajbMJfDujnMEg+7c3RGd30QH8yfSgDa8H6Lc6TpclxqRV9X1CQ3N846Bz0QeyjCj6V0VFFADZEWWNo3UMrAqQe4Ncp8O3aHw0+kyHMmk3MtkcnJ2q2Uz/wABKmutrjdPY6R8UdUsW4g1izjvYew82M+XIB7kFD+FAHZUUUUAFFFFABRRRQAVW1C9h03Tbm+uDiG3iaVz7KMn+VWa5L4hsbnQINGQkPq93FZ8ddhOX/8AHVagCT4d2k8HgyzurtcXmolr+4/35SXx+AIH4V1NIiqiKiKFVRgAdAKWgAqrqWo2uk6dPf3syxW0CF3duwqyzBVLMQABkk9q4W3V/H+ti8kJ/wCEY06bNvHji+nU/wCsPrGp6DueewoAbpmmXmuXL+M9WsHa7hVn0fTncqYEwcFvR378HGQK6vQNat/EGiW2pW4KrKp3RsfmjcHDIfcEEVpVzt1qDaH4l06xSxhj0zUjIDLEmCtz975scfMM8+o96AOioopskiRRtI7BUQFmJ7AUAY+va9HpMun2aWz3d5qFwIIoEbB29Xcnsqrkn8q5qCAfDbVViRj/AMIpfyY+c5+wTsepJ/5ZufyP1rd8MXzeI4DrtzpsMAMkiafIy/vTb5ADEnpuIzj0xW1fWNtqVjPZXkKTW06GOSNxkMp6igCxRXFeHr6fwzq6eEtWmeSFlzpF5Ic+dGOsTH++o/MfSu1oAK5Dxsosb3w9ryjBsb9YpGH/ADymHlsPpnYfwrr6x/FeknXPCmp6av8ArJ7dhH7OBlf1AoA2KKxvCWsjxB4S0vVeN9xbq0gAxiQDDj8GBFbNABRRRQAUUUUAFcbcudY+KlnajmDRLFrmT086Y7UB9wqsfxrsicDJrkPAa/bF1rXmGX1O/co3/TGP92g+nysf+BUAdfRRXLeK9cvUmh8PaFtbW75ch25W0i6NM307DuaAKOu3UvjDWJfCunSumnwY/ti7jOMA8iBW/vMPvY6D612VrawWVrFa20SQwRKEjjQYCqOgAqloOiWvh7SYtPtASq5Z5G5aVz952Pck1pUAFRXEby28ixOElKny3K7tjY4OPapaKAMXwtf6jf6Kv9r2zQajA7QT5QqsjKcb19VbgjHrUOsajqh8Q6XpGmW/ySk3F7dSRkxxwLxsB6F2JAx2GTUXiJtasdW07U9KWW8gjWSK705GA8xSMq65/iDAD6NVrwpHqy6GkuuTh9RuHaaWNTlbfcciJfZRgfnQBtKoVQqgADgAdqWiigDK8RaDbeItIksZ2aN8iSCdOHhkHKup9QazvCuvXV29xoutIsWuWAAmC/duEP3Zk9m7jsciumrm/Ffh6fUkg1TSZRb67YEvay/wyD+KJ/VWHHscHtQB0lFY/hvxBb+I9L+0xqYbiJzDdWz/AH4JR95GH+citigDkPBajTdT8RaD0W1v2uYFz0im+cYHoG3D8K6+uOv3GkfFDS7k8QazaSWTnt50f7xCT/u7wK7GgAooooAKKKKAMDxtq76H4N1O9iz9oEJjtwOplf5E/wDHmFXfD2lronh3T9MX/l2gSM+5A5P55rC8VqNT8UeGdE6x/aTqE6/7MIyuf+BstdFq2q2eiaXcajfyiK2gQs7d/oB3J6AUAUfE/iGPw9pokWM3F9cN5Nnar96eU9APbuT2FQ+FfDsmjwT3uoTfatavyJL247Z7Ivoi9APxqh4Y0u71TUT4t1y3MV7NHssbSTk2UB5xjs7cFj+HrXYUAFFVb3UrHTY1e+vILZHYIpmkCgk8ADPesue98RTa+LSz0yCDTYmBlvbmUEyjuI0Xn8WxQBsy3VvDNFFLPGkkpxGjMAXPXAHesTT9Z1jU9akiTRJLPSYtytdXbhZJXHA2RjPy+5I+lTWvhTSbXXbjWzC9xqMzEie5kMhiB/hjzwg9hitqgDjdOh8K+G9auJZ9XE+tyLtlnvZ902zOdoH8K57AAVJplj4bufFUuoaJqpjvWzNeWttP+7nzxudOmckcjBrkLLXrWDx74v8AFd3p9/d21mi6fA1tamVQIxuk5HA52/rXpOmWMbyRaxNaJb6hcWkccyLj5OrFc98Fj+VAFPS9Z1htWm07WdEa2xueG9t5PMt5EHTJOCjY7EfjW5BcQXUKzW80c0TdHjYMD+IqQgEYIyKwLPwnp+jXt7f6JGbO4uYiDCrt9mL9nMQOAc9xjjNAG/RWBper6pDb3h8TWVvp62ihjepODBKpzkjOCuMchh361twTw3MKzQSpLE4yrowYEexFAHI+JNPudB1Q+LtFt2lcKF1SziHN1CP41HeRR09RxXUadqNpq2nwX9jMs1tOgeN17g1arhZw/gDW2u0/5FjUZs3Cf8+M7fxj0jY9fQ89zQBd+ItsT4YGqRj/AEjSLmLUIj6bG+f/AMcL11UMqTwRzRnKSKGU+xGaivLaLUNPntnw0U8TIfcMMVz3w8vXufB1tbTH/StOd7CcZyQ8TFOfcqFP40AdTRRRQAUUVW1G8j07Tbq9lIEdvE0rE+gGaAOV0SVdV8f+I9WYgW2mpHpkTnplR5kp/AsB+FQWCSePNbj1ecY8N2Lk2EJH/H5KD/rm/wBgfwjvyfSuQ0m7g1Lw1FpdzfLZ6QGa88QXzPs82WVi/wBmDdzggNjsMd69Ce7v9S8PWR8Gi0t4JD5Ymu4nUQxDjckeBu6cAkCgDb1TVtP0Sxe+1O8htLZPvSTOFGfT3PtWVql5r98tovhyOyW2uYxI1/d7iEU9NsYwSSPUgCrMfh20nTT5dXSPU7+yUhLqeIZ3HqwUcDoPyrYoAyn8OaXPq0erXdpHcagkaos0gJC47qpJCn6c1q0UUAFVNTubi106aW0tJLq4CHy4UIG5scckgAZq3RQBx/w60O50rwTFYataMl7K8kl2sm0iR3YljwTkc12FFFABRRRQA2SNJo2jlRXRhhlYZBHuKw/+EdXSNLvYvCy22m3U7iQb0Z4dwIz8mRgEZHGOua3qKAOej8RPpOjC88Wra6U4nEBdZS8TE9GDY+UHn73THWtiWK01XT2ikEVzZ3EeCOGSRSP1FTTQxXELwzRpJE42sjqCGHoQetYV5oN1ZaPFaeFLi30p4JDKkTQ74ZM5yrDqASeo6UAZGhXUvhDWIvCupTu9hOT/AGPdSnJIHP2dm/vKPu56j3qfRU/sj4i6/p3SDUo4tShHQB8eXIB75VSfrTPEd1p8/hu0sPGRi0+5u+k0JZooJlPyssmBtPQjOO45rl08RXFp4q8OjWSi6paTmwmmTlLy3nGIpkPoXCbvQ/WgD1uiiigArm/HWnza34R1HRrTULWyuryMRiSdsAKWG735GR+NdJXnHi60i8RfFHwvopiR4rJJdRu8jOVGFRT7FscUAUfCng3xToXhyDSEn8M6nb28xmje4R32P6jC8Hqc9eTzXU7fH4/i8Of+Rv8ACud+Iwi8GSaL4j0aJba4F/HbXEMI2rcxPnKso4J44PUV6dQBye34gf3vDn/kb/Cjb8QP73hz/wAjf4V1lFAHJ7fiB/e8Of8Akb/Cjb8QP73hz/yN/hXWUUAcnt+IH97w5/5G/wAKNvxA/veHP/I3+FdZRQBye34gf3vDn/kb/Cjb8QP73hz/AMjf4V1lFAHJ7fiB/e8Of+Rv8KNvxA/veHP/ACN/hXWUUAcnt+IH97w5/wCRv8KNvxA/veHP/I3+FdZRQBye34gf3vDn/kb/AAo2/ED+94c/8jf4V1lFAHHzW/jq5heGdfDMsTjayOszKw9CCOa4jxn8P/EviefTRPq/h7TBpwAhhty6BRkEYBHAGBx04r2evK/FGoaLL8XrFNVeJbTSNOeeYtGXDSScKGAB6KCfxFAHpdrdRSxxobmCWcKN/luDk45IHpVmub0LSNFurq08T6bZJatNatGoWPYXRmUqxHrhePZq6SgBruscbO2dqjJwCT+Qrzbw7fuPHXibXtQ07UoxMY7WyBs3JaFB1HHdsn8q9LooA4a90a98a+I9Mu7+0kstD0uX7RHBPgSXUw+6So+6i9eeTXc0UUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFADJpVgheV921Bk7VLH8AOTXmPgq8a31DxTrWs6bqcd1qd8fLjNk5P2dFCxjgen8q9RooAxPC97Nf6Y8rafLYWqSeTaW8ybZBEoADMD0yQcD0xW3RRQAUUUUAFFFFABR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'math_528_2.jpg']
math_529	MCQ	"The ancient Greek mathematician Apollonus discovered that by using a plane to cut a cone, different section curves can be obtained as <image_1>shown in the figure. When the plane is perpendicular to the axis of the cone, the section curve is a circle; when the plane is not perpendicular to the axis of the cone, if a ""closed curve"" is obtained, it is an ellipse; if the plane is parallel to a generatrix of the cone, a parabola (part) is obtained; if the plane is parallel to the axis of the cone, a hyperbola (part) is obtained. It is known that a cone $PO$with $P$as its apex has a base radius of $1$, a height of $\sqrt{3}$, a point $A$is a certain point on the circumference of the base, and a moving point $T$on the side of the cone satisfies $TA = TP$, then the following conclusions are correct ()"	['A. The trajectory of point $T$is an ellipse', 'B. Point $T$may be outside a sphere with $O$as its center and $1$as its radius', 'C. $TP$may be perpendicular to $TA$', 'D. The maximum volume of the triangular pyramid $P-ATO$is $\\frac{\\sqrt{6}}{12}$']	ACD	math	空间向量与立体几何	['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']	['math_529.jpg']
math_530	OPEN	As shown in the figure<image_1>, a hemispherical surface $O$with a radius of $2$is set to $\alpha$,$AB$is the diameter of the hemispherical surface $O$, point $C$is on the hemispherical surface, and $\angle AOC = \frac{\pi}{6}$, plane $ABC \perp$plane $\alpha$. The plane $\beta$passing through point $C$intersects with the hemispherical surface $O$to form a circle $S$.$CD$is a diameter of the circle $S$, and $D$is on the plane $ABC$, and the angle between the plane $\alpha$and $\beta$is $\frac{\pi}{6}$. The points $C$and $D$are both on the same side of the plane $\alpha$, remember $\alpha \cap \beta = l$, and $CD \cap AB = T$. Point $P$is on circle $S$, let $\angle CSP = \theta$,$\theta \in [0, 2\pi]$, and $PQ \parallel OD$,$Q$are on plane $\alpha$. When the angle between $DQ$and plane $ABC$is the largest, find $\cos \theta$.		\frac{4\sqrt{7} - 11}{3}	math	空间向量与立体几何	['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']	['math_530.jpg']
math_531	OPEN_OnlyTxt	"Numbers of the form\( z = a + bi (a, b \in \mathbb{R}) \) are called the algebraic form of complex numbers, and any complex number\( z = a + bi \) can be expressed as the form\( r(\cos \theta + i \sin \theta) \), that is 
\[
\begin{cases} 
a = r \cos \theta, \\
b = r \sin \theta,
\end{cases}
\]
Where\( r \) is the modulus of the complex number\( z \), and\( \theta \) is called the argument of the complex number\( z \). We specify that the value of the argument\( \theta \) in the range of\( 0 \leq \theta < 2\pi \) is the principal value of the argument, denoted as\( \arg z \). The complex number\( z = r(\cos \theta + i \sin \theta) \) is called the triangular form of the complex number. From the triangular form of the complex number, it can be concluded that if\( \overline{OZ_1} = r_1(\cos\theta_1 + i \sin \theta_1), \overline{OZ_2} = r_2(\cos\theta_2 + i \sin \theta_2) \), then
\[
r_1|\cos \theta_1 + i \sin \theta_1| \cdot r_2|\cos \theta_2 + i \sin \theta_2| = r_1 r_2 \left[ \cos(\theta_1 + \theta_2) + i \sin(\theta_1 + \theta_2) \right],
\]
Its geometric meaning is to rotate the vector\( \overline{OZ_1} \) counterclockwise around the point\( O \) by an angle\( \theta_2 \)(If\( \theta_2 < 0 \), rotate\( \overline{OZ_1} \) clockwise around the point\( O \) by an angle\(|\theta_2|\)), and then change its modulus to the original\( r_2 \) times. By analogy with the definition of high school functions, a function with imaginary units and complex independent variables is called a complex variable function. The complex function\( f(x) = x^2 + \frac{1}{x^2}, x \in \mathbb{C} \) is known. If there is a complex number\( x \) and a real number\( t \) with a real part greater than 0 and an imaginary part greater than 0, such that\( f(x) \geq t \) holds, the corresponding point of the complex number\( x \) on the complex plane is\( A, O \) as the coordinate origin, and the point\( P(3,0) \) is a square\( PAMN \) with\( PA \) as the edge, where\( M, N \) Above\( PA \), find the maximum value of the segment\( OM \)."		\left| OM \right|_{\max} = \sqrt{11 + 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math_532	OPEN_OnlyTxt	"The complex number\( z = x + yi \)(\( a, b \in \mathbb{R} \) corresponds one-to-one to a point\( P(x, y) \) on the complex plane: the complex number\( z_1 = i \),\( z_2 = -i \),\(|z_3 - z_2| = 4 \),\( z = x + yi \)(\( x, y \in \mathbb{R} \)) is full\( z - z_2 = \mu(z_3 - z_2) \)(\( \mu \in \mathbb{R} \)) and\(|z_3 - z|  = |z_1 - z|\), the trajectory of the moving point\( P(x, y) \) on the complex plane is the curve\( C \). The intersection curve of a moving straight line passing through\( Q(2, 1) \) on the plane\( C \) occurs at two points\( A \) and\( B \), and\( R \) is the point above the line segment\( AB \) and satisfies\(|AQ| \cdot |RB|  = |AR| \cdot |QB|\), then: the point\( R \) is always on a certain fixed curve. Whether the statement is correct ()(fill in ""yes"" or ""no"")."		no	math	复数	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFFT2ds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math_533	MCQ	As shown in the figure<image_1>, in the polyhedron $ABCDEF$, the quadrangle $ABCD$is a square with a side length of 2,$\triangle ADE$and $\triangle CBF$are both isosceles right triangles,$\angle ADE = \angle CBF = 90^{\circ}$, and the plane $ADE$and the plane $CBF$are both perpendicular to the plane $ABCD$. The moving point $G$is on the line segment $AF$, then ()	['A. $ED \\perp$Plane $ABCD$', 'B. The volume of polyhedron $ABCDEF$is $\\frac{16}{3}$', 'C. The minimum value for the circumference of $\\triangle CGD$is $\\sqrt{12-4\\sqrt{6}}+2$', 'D. The cosine of the angle formed by straight line $DF$and plane $ACF$is $\\frac{2\\sqrt{2}}{3}$']	ABD	math	空间向量与立体几何	['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math_534	OPEN	As shown in the figure<image_1>, in the quadrangular pyramid $P-ABCD$,$\triangle PCD$is an equilateral triangle, plane $PAC \perp$Plane $PCD$,$PA \perp PD$,$AB=CD=2$,$BC=AD=4$,$PB=2\sqrt{3}$, whether there is a point $M$on the line segment $BC$, so that the cosine value of the plane angle of the dihedral angle $M-AB-C$is $\frac{8\sqrt{3}}{15}$. If it exists, find the value of $\frac{PM}{PC}$; if it does not exist, please explain the reason.		exists,\frac{PM}{PC} = \frac{1}{4}	math	空间向量与立体几何	['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math_535	OPEN	As shown in the figure<image_1>, in the quadrangular prism $ABCD-A_1B_1C_1D_1$, plane $CDD_1C_1 \perp$plane $A_1B_1C_1D_1$,$AB \parallel CD$,$AD \perp CD$,$AB=B_1C=3$,$AA_1=2AD=2CD=2$. Find the sine of the angle formed by straight line $AB$and plane $AB_1C$.		\frac{2\sqrt{17}}{17}	math	空间向量与立体几何	['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']	['math_535.jpg']
math_536	OPEN	As <image_1>shown in the figure, in the inscribed octahedron $PABCDQ$of the sphere $O$with radius 1, the vertices $P and Q$are on both sides of the plane $ABCD$, respectively, and the quadrangular pyramids $P-ABCD$and $Q-ABCD$are both regular quadrangular pyramids. Let the magnitude of the plane angle of the dihedral angle $P-AB-Q$be $\theta$. Find the value range of $\tan\theta$.		\left(-\infty, -2\sqrt{2}\right]	math	空间向量与立体几何	['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math_537	MCQ	As shown in the figure<image_1>, it is known that $ABC-A_1B_1C_1$is obtained from a regular tetrahedron with a plane truncated edge length of 6.$AA_1=2$, $M, M_1$are the midpoints of $AB, A_1B_1$respectively, and $P$is the moving point (including the boundary) on the side surface $AA_1B_1B$of the frustum. Then the following conclusions are correct ()	['A. The volume of this triangular frustum is $\\frac{38\\sqrt{2}}{3}$', 'B. Plane $MM_1C_1C \\perp$Plane $AA_1B_1B$', 'C. The minimum value of the tangent value of the angle formed by straight line $CP$and plane $AA_1B_1B$is $\\sqrt{2}$', 'D. If $CP=2\\sqrt{7}$, the length of the trajectory of point $P$is $2\\pi$']	ABC	math	空间向量与立体几何	['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math_538	MCQ_OnlyTxt	Given $O$ as the coordinate origin, $\overrightarrow{OA}$ and $\overrightarrow{OB}$ as unit vectors, $(\overrightarrow{OA} + \overrightarrow{OB}) \cdot \overrightarrow{OB} = \frac{3}{2}$, point $C$ lies on the fixed line $l: y = x + 2\sqrt{2}$, and the inequality $|\overrightarrow{OA} + \overrightarrow{OB} + \overrightarrow{OC}| \geq T$ holds for all positions of $C$ on $l$. The range of possible values for the real number $T$ is ( )	['A. $(-\\infty, 2 + \\sqrt{3}]$', 'B. $(-\\infty, 2 - \\sqrt{3}]$', 'C. $(-\\infty, 2\\sqrt{3}]$', 'D. $(-\\infty, \\sqrt{3}]$']	B	math	平面向量	['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math_539	MCQ_OnlyTxt	It is known that $O$is a point within $\triangle ABC$, and $4\overrightarrow{OA} + 3\overrightarrow{OB} + 5\overrightarrow{OC} = \overrightarrow{0}$, and the point $M$is within $\triangle OBC$(excluding boundaries). If $\overrightarrow{AM} = \lambda \overrightarrow{AB} + \mu \overrightarrow{AC}$, then the value range of $\lambda + \mu$is ()	['A. $\\left(\\frac{1}{3}, 1\\right)$', 'B. $\\left(0, \\frac{2}{3}\\right)$', 'C. $\\left(\\frac{2}{3}, 1\\right)$', 'D. $\\left(\\frac{2}{3}, \\frac{4}{3}\\right)$']	C	math	平面向量	['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math_540	OPEN_OnlyTxt	It is known that the center of the circumscribed circle of $\triangle ABC$is $O$,$H$is the center of gravity of $\triangle ABC$and $|\overline{AB}| = 4, |\overline{AC}|= 6$, then $\overline{OA} \cdot (\overline{HB} + \overline{HC}) =$ 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math_541	MCQ_OnlyTxt	Given the sets \( A = \left\{ x \mid x = \frac{k}{2} + \frac{1}{4}, k \in \mathbb{Z} \right\} \), \( B = \left\{ y \mid y = \frac{l}{4} + \frac{1}{2}, l \in \mathbb{Z} \right\} \), then ( )	['A. \\( A \\cap B = \\emptyset \\)', 'B. \\( A = B \\)', 'C. \\( A \\not\\subseteq B \\)', 'D. \\( B \\not\\subseteq A \\)']	C	math	集合与常用逻辑用语	['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']	['img_for_onlytxt.jpg']
math_542	MCQ_OnlyTxt	Set\( M = \{ f(x), f'(x), f''(x), \cdots \} \), then the following can be expressions of\( f(x) \) are ()	['A. \\(\\sin x\\)', 'B. \\(e^x\\)', 'C. \\(\\ln x\\)', 'D. \\(x^2 + 2x + 3\\)']	C	math	集合与常用逻辑用语	['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math_543	MCQ	<image_1>If the Venn graph representing the relationship between sets\( M \) and\( N \) is as shown in the graph, then\( M, \, N \) may be ()	['A. \\( M = \\{0, 2, 4, 6\\}, \\, N = \\{4\\} \\)', 'B. \\( M = \\{x \\mid x^2 < 1\\}, \\, N = \\{x \\mid x > - 1\\} \\)', 'C. \\( M = \\{x \\mid y = \\log x\\}, \\, N = \\left\\{y \\mid y = e^x + \\frac{1}{e^x}\\right\\} \\)', 'D. \\( M = \\{(x, y) \\mid x^2 = y^2\\}, \\, N = \\{(x, y) \\mid y = x\\} \\)']	BCD	math	集合与常用逻辑用语	['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math_544	MCQ_OnlyTxt	"Assuming that ""Physics is good, mathematics is good"" is a true proposition, then the following propositions are correct ()"	['A. Good physics may not necessarily be good mathematics', 'B. Good mathematics may not necessarily be good physics', 'C. Poor mathematics must be bad physics', 'D. Physics is bad, mathematics is bad']	BC	math	集合与常用逻辑用语	['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math_545	OPEN_OnlyTxt	The function\(f(x) = (2-a)\ln x - \frac{2a}{x}\)(\(a \in \mathbb{R}\)) is known. If the function\(g(x) = f(x) + \frac{x^2}{e^x} - x^a + \frac{2a}{x}\) has exactly 2 zeros, find the range of values for\(a\).		\((-\infty, 2-e)\)	math	函数与导数	['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math_546	OPEN_OnlyTxt	Let the function\(f(x) = \sqrt{\ln x + x + a}\), if there is a point\((x_0, y_0)\) on the curve\(y = \frac{e-1}{2}\sin x + \frac{e+1}{2}\) such that\(f(y_0)) = y_0\) holds, find the value range of the real number\(a\) to ().		\([0, e^{2}-e-1]\)	math	函数与导数	['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math_547	MCQ_OnlyTxt	For the function\(f(x)\) defined on\(D\), if there is a real number\(x_0\) such that\(f(x_0) = x_0\), then\(x_0\) is said to be a fixed point of the function\(f(x)\). Then the following conclusions are correct ()	['A. The function\\(f(x) = x^\\frac{1}{2}\\) has and only 1 fixed point', 'B. The function\\(f(x) = 1 - \\lg x\\) has and only 1 fixed point', 'C. The function\\(f(x) = 2^x - 1\\) has 2 fixed points', 'D. The function\\(f(x) = 2 \\sin\\left(2x - \\frac{2\\pi}{3}\\right)\\) has 3 fixed 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math_548	MCQ_OnlyTxt	"For the function\( f(x) = \begin{cases} 
\sin \pi x, & 0 \leq x \leq 2 \\ 
\frac{1}{2}f(x-2), & x > 2 
\end{cases} \), the following conclusions are correct ()"	['A. Any\\( x_1, x_2 \\in [1, +\\infty) \\) has\\(|f(x_1) - f(x_2)| \\leq \\frac{3}{2} \\)', 'B. \\( f(\\frac{1}{2}) + f(\\frac{5}{2}) + \\cdots + f(\\frac{1}{2} + 2k) = 2 - \\frac{1}{2^{k+1}}} \\), where\\( k \\in \\mathbb{N} \\)', 'C. \\( f(x) = 2^k f(x + 2k)(k \\in \\mathbb{N}^*) \\) holds true for all\\( x \\in [0, +\\infty) \\)', 'D. The equation\\( f(x) = k(k > 0) \\) has two different real roots\\( x_1, x_2 \\), then\\( \\frac{5}{36} < x_1 x_2 < \\frac{1}{4} \\)']	ACD	math	三角函数与解三角形	['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math_549	MCQ	<image_1>Given the function\( f(x) = A \sin(\omega x + \varphi) (A &gt; 0, \omega &gt; 0, 0 &lt; \varphi &lt; \pi) \), if the partial image of\( f(x) \) and its derivative function\(f'(x) \) is as shown in the figure, then ()	"['A. \\( f(x + \\pi) = f(x) \\)', 'B. Function\\( f(x) \\) monotonically decreases on\\(\\left( \\frac{\\pi}{12}, \\frac{7\\pi}{12} \\right)\\)', ""C. The image of\\(f'(x) \\) is symmetric about the center of the point\\(\\left( -\\frac{\\pi}{6}, 0 \\right)\\)"", ""D. The maximum value of\\( f(x) + f'(x) \\) is\\(\\frac{5}{2}\\)""]"	AB	math	三角函数与解三角形	['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math_550	MCQ_OnlyTxt	The known point\(M\) is an ellipse\(C: \frac{x^2}{a^2} + \frac{y^2}{b^2} = 1 (a > b > 0)\),\(F_1, F_2\) are the left and right focuses of\(C\) respectively, and\(\angle F_1MF_2 = 60^\circ\), the point\(N\) is on the bisector of\(\angle F_1MF_2\),\(O\) is the origin,\(ON \parallel MF_1\), \(|ON| = b\), then the eccentricity of\(C\) is ()	['A. \\(\\sqrt{6}\\)', 'B. \\(\\frac{2\\sqrt{7}}{7}\\)', 'C. \\(\\frac{2}{3}\\)', 'D. \\(\\frac{4}{7}\\)']	B	math	三角函数与解三角形	['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RzJJwcYzxkd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weO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math_551	OPEN_OnlyTxt	In\(\triangle ABC\), the edges bounded by the angles\(A, B, C\) are\(a, b, c\) respectively, and satisfy\[\frac{\sqrt{3}b \sin A}{1 + \cos B} = a\]. Find the value range of\(\sin A \sin C +\sin B \sin C + \sin B \sin A\).		\[\left[ \frac{3}{4}, \frac{9}{4} \right]	math	三角函数与解三角形	['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math_552	MCQ_OnlyTxt	There is a painting with a height of 1m hanging on the wall. The distance from the upper end of the painting to the ground is 2m. A camera photographed the painting on the ground. Call the angle between the top point\(A\) and the bottom point\(B\) and the line from the camera as the angle of view (the point\(A, B\) is in the same vertical plane as the camera), and call the largest angle of view. Call the best angle of view. If the wall is perpendicular to the ground and the camera height is ignored, the sine value of the optimal viewing angle when the camera moves arbitrarily on the ground is ()	['A. \\(\\frac{1}{3}\\)', 'B. \\(\\frac{\\sqrt{2}}{3}\\)', 'C. \\(\\frac{\\sqrt{3}}{3}\\)', 'D. \\(\\frac{2}{3}\\)']	A	math	三角函数与解三角形	['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math_553	MCQ	Part of the image of the function\( f(x) = \omega \sin\left(\omega^2x- \frac{\pi}{6} \right) + 1 \) may be ()	['A. <image_1>', 'B. <image_2>', 'C. <image_3>', 'D. <image_4>']	ABC	math	三角函数与解三角形	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACSASkDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooACQBknAqE3dsIGnNxF5KnDSbxtH1NPlijniaKWNZI3GGRxkMPQivKtAsrS80vxP4MW3jeOXU5UEWPlhjbDFsdsdvfFAHqjTwpNHE0qCSTJRCeWx1wKkr5v8cfEY6Z8ZtO+ySn+z9DItHAbIbOBJ+XT/gJr6NhlSeGOaNtyOoZSO4NAD6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDM1fUrzT2tFs9KnvzPIUYxsqiIYJDNntnAqvpWgR6YmoXUKxJqmoMZbicLkF8YA+gwK26KAPF7r4Q+GbfxLpGl3ST3kl/HcyXV3LIRJJIACGGOBySf55r1Tw7pDaDoNrpRunuVtV8uOVxhig+6D7gYGfasnV/+Si+G/8Arhdf+giuqoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoqO4Mot5DAFMu07AxwCe2a8u8W6d4k8J2Nv4jtPEl7eXq3MST2cgHkzh2A2KoHHJ4oA6vV/wDkovhv/rhdf+giuqrktZkSP4h+G2dlUeRdck4/hFdb1oAKKKKACiiigAooprusa7nYKPUnFADqKajpIu5GVh6qc06gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAZLLHBC8srqkaKWZ2OAoHUk153J438J61qcV9f65Ypp+nyF7eFpATJIOPMI9udo/GvRZI0miaOVFeNhhlYZBHoRVAaBowORpNj/AOA6f4UAct4j0/TvEPjLwvFqFjHc2stvcSeTcR5wdqkZB7iu4RFjRURQqqMADoBXLav/AMlF8N/9cLr/ANBFdXQAUUUUAFYOueK7HRp0skSW+1SUZisbYbpGHqeyr7ms7UvEV9rV/LovhUqZYztu9TYborX2X+/J7dB3rX0Dw1YeHrd1tleW5mO64u523yzt6sx/l0HagDHXSfFOvfvNW1Q6Rat0tNOI8zH+1KRwf90VKnw28Kbt91pS303eW+led29yXJrq6KAOUf4beEid8Gjx2cvaWzdoHH0KEVE2ieJ9C/eaLrDanbr/AMueqHLEeiygZ/76BrsKKAOf0XxbaapdHTrqGXTtWQZeyueGI9UPRx7iugrJ13w7p3iK0EN7GwkQ7obiJtksLdmRhyDWHY69qPhy9i0jxTIJYpG2Wmrqu1Jj2WUdEf8AQ0AdlRQDkZFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHK6v/yUXw3/ANcLr/0EV1Vcrq//ACUXw3/1wuv/AEEV1RIAyeBQAVxV/qN54w1CXRtDneDSoWKahqSdWPeKI+vq3bp1pt7fXfje9m0nSJ3t9Ehcx32oRnDTEdYoj+jMPoK67T9PtNLsYbKxgSC2hUKkaDAAoAbpmmWej6fFY2ECQ28QwqKP1PqferdFFABRRRQAUUUUAFVr+wtdTspbO9gSe3lXa8bjIIqzRQBw9rfXXga9j03VppLjQJmCWeoSHLWzHpFMfT+6/wCBrtwQwBBBB5BFRXdpb31pLa3UKTQSqUeNxkMD2NcZb3Nx4Bu47HUJXm8NzOEtrtzk2bHpHIf7no3bvQB3NFICGAIIIPIIpaACiiigAooooAKKKKACkJABJOAO9BIAJJwB3riLq7ufHl5Lp2mTPB4ehcpd3sZwbph1jjP931YfQUAdZp2q2WrwST2Fwk8SStEXTpuXggHvVyoLOzttPs4rOzhSG3hUJHGgwFAqegAooooAKKKKACiiigAooooAKKKKACiiszWdf03QLUT6hcrHu4SMfM8h9FUck/SgDG1uRIviD4dkkZURbe6LMxwANo5NUpry98ezPaaZJJaeHFO24vl+V7z1SL0X1f8AKsDUrS98Z+OdBXXbB7HSXjnaG0MhEsoAB/e44Cnj5fzr1WKGOCFIYY1jjQBVRRgKB2AoAisbG202yhs7OBILeFQscaDAUVYoooAKKKKACiiigAooooAKKKZHLHLv8uRH2MVba2dpHY+9AD6iurWC9tZba5iSaCVSrxuMhgexFS0UAcKkt58PZBFcNLd+F2OI5jlpNP8A9lu7R+h6r9K7eGaK4hSaGRZInAZXU5DA9waV0WRGR1DIwwysMgj0rjH0fVfBsz3Ph2M3ujMxebSGb5oT3aAnt/sHj0xQB2tFZWieItN8QQNJYzgyJxLA42yRH0ZTyK1aACiiigApksscETyyuqRoCzMxwAPUms7WvEOm6BbiW/uArPxHCo3SSH0VRyTXNnTdS8XsLrxGp07QkO9NML4efHRp27D/AGB+NADZJ7z4gStb2cktp4ZU4luVysl96qn92P1bv2rtLS0t7C0itbSFIbeJQkcaDAUDsKfEkccSJEqrGoAVVGAB2xT6ACikZlRSzEKo5JJwBQCGAIIIPQigBaKKKACiiigAooooAKKKKAOXm1/xOk8iReC55Y1YhZP7RgG4Z4OCeM0z/hIfFX/Qjz/+DK3/AMa6uigDz3XdW+I16kEOj+GxpyEnz5nureaTHGNgLhQevJB7VW0ew1fSrn7bJ4Ivr/UmHzXt7q1vJKfpzhR7ACt/xn4qm0WXTtH0qNJ9c1aXyrVH+7Go+9K/+yo/P8DTNW8OSQeGby4bWb7+0obd5RemYrh1UnO0cBcjp6UAc/qeueI28c6DK/hCZJkhuAkP2+EmQFRk5zgY966T/hIfFX/Qjz/+DK3/AMa5vwvr9x4ou/AusXaqtxcWd35u0YBZfkJ/Hbn8a9PoA5T/AISHxV/0I8//AIMrf/Gj/hIfFX/Qjz/+DK3/AMa6uigDlP8AhIfFX/Qjz/8Agyt/8aP+Eh8Vf9CPP/4Mrf8Axrq6KAOU/wCEh8Vf9CPP/wCDK3/xo/4SHxV/0I8//gyt/wDGurooA5T/AISHxV/0I8//AIMrf/Gj/hIfFX/Qjz/+DK3/AMa6uigDlP8AhIfFX/Qjz/8Agyt/8a5/wsfGHh9tcM3g+Wf+0dVmv026jAPLVwoCnLdRt/Wu08RxXs2luLXUv7NjUF57pQC6IoydoIxn3PSvNPDn9u6t4g0exbxlqpF1oq6tKAI+8iqqj5ehy35UAdv/AMJD4q/6Eef/AMGVv/jR/wAJD4q/6Eef/wAGVv8A411dFAHKf8JD4q/6Eef/AMGVv/jR/wAJD4q/6Eef/wAGVv8A411dFAHm2s2WrazOt23gW9s9QT7l7Z6tBFMv4g8j2IIqHTdU+K+nzeVc+G7bVbQfdea7hgnx7lWKn67RXp9FAHIf8JF4v8vP/CCSeZ/d/tWDH5//AFq5/UtV+K+oTCK08NWulWp+9JFdwzz4/wBkswUfUqa9PooA810ex1bR7g3n/CDXt7qDffvb3VoJZW/EnCj2AAq54hvvFus+H77TY/Bk0T3MRjDtqUBC579a6DX9CvNemjg/tS5sbFVJcWj7ZJH7ZbsBXNeB9S1DSNQ8V6RreqNeadok0Xk6hcHnY6byrN3Kjb+f0oA07bXPFcFrDCfBE5MaKpP9pW/OBj1qX/hIfFX/AEI8/wD4Mrf/ABqqfi34FBwdfjznH+ol6/8AfNddZ3cF/Zw3drJ5kEyB43wRuU9Dg80AczJrvieaJ45PAszI4Ksp1K3wQfxr54h8d+LvCfi+907QZrhrdLhlXTZmF0q8/dyvp0ypFfWM0QmgeIsyh1KkqcEZ9DXn92ul/DfUdN+y6Bappt9Obd7yMl7gTFSy5BHO4gjrQBueCte17XtLE+u+Hn0mbAxmQESe4X7y/Q/nXT1m6PcatcxTPqthBZnf+5SKbzCUx/FwAD7DNaVABRRRQAUUUUAFFFFABRRRQB5nqUa2Px80y/1M7LW40p7exlfhRPuyVz2JUt9c1o/EHVLjU7CXwloGJ9W1BfKmKcrawnhnkPbjIA6mu0u7K1v7dre8tobmFusc0YdT+B4pLOws9Og8ixtILWLr5cEYRfyAoA4u30a38PeJvBukWmfJtLK4iUnq2EGSfcnJ/Gu8rld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math_554	MCQ	<image_1>As shown in the figure, cube\The edge length of (ABCD-A'B'C'D'\) is 2,\(E\) is the midpoint of\(CD\), and\(F\) is the moving point on the segment\(A'C\). The following four conclusions are given: ① There is a unique point\(F\) such that\(A, B', E,F\) The four points are coplanar;② The minimum value of\(EF+ D'F\) is\(2\sqrt{3}\);③ There is a point\(F\), such that\(AF \perp D'E\);④ There is and only one point\(F\), such that the area of the cross-section obtained from a plane\(AEF\) truncated cube\(ABCD-A'B'C'D'\) is\(2\sqrt{5}\). The number of all correct conclusions is ()	['A. 1', 'B. 2', 'C. 3', 'D. 4']	B	math	空间向量与立体几何	['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math_555	OPEN	As shown in Figure 1<image_1>, fold the regular hexagon\(ABCDEF\) with side length of 2 along\(AD\), so that the plane\(ADE_1F_1\) is perpendicular to the plane\(ABCD\), as shown in Figure 2<image_2>. Point\(M\) is on line segment\(AD\), and\(CD \parallel\) plane\(BMF_1\). Find the cosine value of the dihedral angle\(F_1-BM-D\).		\(-\frac{\sqrt{5}}{5}\)	math	空间向量与立体几何	['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math_556	MCQ_OnlyTxt	It is known that the function $f(x)$is defined on $\mathbb{R}$, and $f(1+x)$is an even function, and $f(2+x^3)$is an odd function. When $0 < x \leq1 $,$f(x) = 2-x$, then ()	['A. $f(3) = 1$', 'B. $f(11) < f(-20)$', 'C. The solution set for $-\\frac{3}{2} < f(x) \\leq-1$is $\\left\\{x \\left| \\frac{5}{2} + 4k < x < \\frac{7}{2} + 4k, k \\in \\mathbb{Z} \\right.\\ right\\}$', 'D. $\\sum_{k=1}^{2025} f(k) = 1$']	BCD	math	函数与导数	['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math_557	OPEN_OnlyTxt	Given that the sequence $\{a_n\}$satisfies $a_1=5$,$a_{n+1}-2a_n = 3^n $($n\in\mathbb{N}^*$), remember $b_n=a_n-3^n$. Let $c_n=\frac{2n+1}{b_n}$, and the sum of the first $n$terms of the sequence $\{c_n\}$is $S_n$. If the inequality $(-1)^n\lambda<S_n+\frac{n}{2^{n-1}}$holds true for all $n\in\mathbb{N}^*$, find the range of values for the real number $\lambda$.		$\left(-\frac{5}{2},\frac{15}{4}\right)$	math	数列	['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math_558	OPEN_OnlyTxt	Given an arithmetic sequence $\\{a_n\\}$ and a geometric sequence $\\{b_n\\}$, with $a_4 = b_1 = 2$, $a_5 = 3(a_4 - a_3)$, and $b_4 = 4(b_3 - b_2)$. For any $m \\in \\mathbb{N}^*$, insert $m$ identical numbers $(-1)^{m+1} \\cdot m$ between $b_k$ and $b_{k+1}$ to form a new sequence. Given a fixed $k$ ($k \\in \\mathbb{N}^*$), the number of terms $n$ in this new sequence satisfies $\\frac{(1+k)(k+2)}{2} < n < \\frac{(k+2)(k+3)}{2}$ ($n \\in \\mathbb{N}^*$). Find the sum of the first $n$ terms $S_n$ of this new sequence (expressed in terms of $n$ and $k$		$S_n=\begin{cases}2^{k+2}-2+(k+1)\left(\frac{k^2+4k+2}{2}-n\right),&k\text{is odd}\\2^{k+2}-2+(k+1)\left(n-\frac{k^2+4k+2}{2}\right),&k\text{is even}\end{cases}$	math	数列	['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math_559	OPEN_OnlyTxt	Given a decreasing geometric sequence $\\{a_{n}\\}$, the sum of the first $n$ terms of $\\{a_{n}\\}$ is $S_{n}$. It is known that $\\frac{1}{a_{1}}$, $2S_{2}$, and $8a_{3}$ form an arithmetic sequence, and $3a_2 = a_{1} + 2a_{3}$. The sequence $\\{b_{n}\\}$ satisfies $b_{n+1} = 2b_{n} - 2n + 1$, with $b_{1} = 3$, $n \\in \\mathbb{N}^{*}$. If $c_{n} = \\begin{cases} a_{n}b_{n}, & \\text{$n$ is odd} \\\\ \\frac{2^{n}a_{n}}{b_{n}b_{n+2}}, & \\text{$n$ is even} \\end{cases}$, find the sum of the first $2n$ terms of the sequence $\\{c_{n}\\}$, denoted as $T_{2n}$.		$T_{2n}=\frac{529}{180}-\frac{12n+13}{9\cdot2^{2n-1}}-\frac{1}{4(2n+5)}$	math	数列	['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math_560	OPEN_OnlyTxt	"It is known that the functions are $f(x)=\frac{x}{e^x}$ and $g(x)=f(x)+ax$. Let $x_n=\frac{1}{2}\times\frac{1}{\sqrt{2n+1}+\sqrt{2n-1}}$, then $\sum_{i=1}^{40}g(x_i)$ ( ) $2e^{-\frac{1}{20}}+2a$ (fill in ""$\geq$"" or ""$\leq$"")."		$\leq$	math	数列	['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math_561	OPEN_OnlyTxt	"The Taylor formula is a very important mathematical theorem. It can expand a function into an infinite polynomial at a certain point. When all the $n$-th ($n\in\mathbb{N}^*$) order derivatives of $f(x)$ at $x=0$ exist, its formula expression is as follows:
\[
f(x)=f(0)+f'(0)x+\frac{f''(0)}{2!}x^2+\frac{f'''(0)}{3!}x^3+\cdots+\frac{f^{(n)}(0)}{n!}x^n+\cdots
\]
Note: $f'(0)$ represents the first-order derivative of the function $f(x)$ at the origin, $f''(0)$ represents the second-order derivative at the origin, and so on. $f^{(n)}(0)$ ($n\geq3$) represents the $n$-th order derivative at the origin. Let $n\in\mathbb{N}^*$, then \(\frac{1}{\tan 1}+\frac{1}{\tan\frac{1}{2}}+\frac{1}{\tan\frac{1}{3}}+\cdots+\frac{1}{\tan\frac{1}{n}}\) ( ) \(\frac{2n^2-2n+1}{2n}\) (fill in "">"", ""<"" or ""="")."		>	math	数列	['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math_562	MCQ	"The Lerot tetrahedron is a very magical ""tetrahedron"". It can rotate freely between two parallel planes and always maintain contact with both planes, so it can roll back and forth like a ball (as shown in Figure A<image_1>). Using this principle, scientists invented the rotor engine Lerot tetrahedron is a geometric body surrounded by the intersection of four balls with the four vertices of the regular tetrahedron as the center of the ball and the edge length of the regular tetrahedron as the radius. As shown in Figure B<image_2>, if the edge length of the regular tetrahedron is 4, the following statement is correct is ()"	['A. The largest cross-section of Lerot tetrahedron is an equilateral triangle', 'B. The volume of Lerot tetrahedron $ABCD$is $8\\sqrt{6}\\pi$', 'C. The radius of the inner sphere of Lerot tetrahedron $ABCD$is $4-\\sqrt{6}$', 'D. If $P,Q$are any two points on the surface of Lerlot tetrahedron $ABCD$, then the maximum value of $PQ$is 2']	C	math	空间向量与立体几何	['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']	['math_562_1.jpg', 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math_563	MCQ	"There are many geometric bodies with beautiful shapes and unique meanings in mathematics, and the ""Lerot tetrahedron"" is one of them. Lerreau tetrahedron is a common part of four spheres with the four vertices of the regular tetrahedron as the spherical center and the edge length of the regular tetrahedron as the radius, as shown in the figure<image_1>. In Lerreau tetrahedron $ABCD$, the edge length of the regular tetrahedron $ABCD$is 4, then the following conclusions are correct ()"	['A. Remember that the intersection line of two spherical surfaces with $C$and $D$as centers on the surface of Lerot tetrahedron $ABCD$is the arc $AB$, and its length is $\\frac{4\\pi}{3}$', 'B. The area of the cross-section obtained by the plane $ABC$Jellerot tetrahedron $ABCD$is $8\\pi - 8\\sqrt{3}$', 'C. The perimeter of the section obtained by passing through the midpoint of edge $CD$and the planar Terrero tetrahedron $ABCD$of $AB$is less than $3\\sqrt{3}\\pi$', 'D. The radius of the inner radius of the Lerlot tetrahedron $ABCD$is $4-\\sqrt{6}$']	BCD	math	空间向量与立体几何	['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math_564	OPEN	"It is known that the Lerot tetrahedron is a very magical ""tetrahedron"". It can rotate freely between two parallel planes and always contact both planes, so it can roll back and forth like a ball (as shown in Figure A<image_1>). Using this principle, scientists invented the rotary engine. Lerot tetrahedron is a geometric body surrounded by the intersection of four balls with the four vertices of the regular tetrahedron as the spherical center and the edge length of the regular tetrahedron as the radius (as shown in Figure B<image_2>). If the surface area of the largest ball that Lerot tetrahedron $$can accommodate is $36\pi$, then the radius of the inscribed sphere of the regular tetrahedron $$$is ()"		\frac{2\sqrt{6}+3}{5}	math	空间向量与立体几何	['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', 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math_565	OPEN_OnlyTxt	It is known that the point $M$is the moving point on the sphere of the cube $ABCD-A_1B_1C_1D_1$inscribed sphere, and the point $N$is the line segment $B_1C_1$and $DM \perp BN$. If the volume of the inscribed sphere is $\frac{32\pi}{3}$, then the length of the trajectory of the point 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math_566	MCQ	As shown in the figure<image_1>, in the right-angled trapezoid $$, we know $AD \parallel BC$,$AD = AB = 1$,$\angle BAD = 90^\circ$, and $\angle BCD = 45^\circ$. Now fold $\triangle ABD$along $BD$to the position of $\triangle PBD$, so that the size of the dihedral angle $P-BD-C$is $45^\circ$, then the circumscribed surface area of the triangular pyramid $P-BCD$at this time <image_2>is ()	['A. $\\frac{8\\pi}{3}$', 'B. $\\frac{14\\pi}{3}$', 'C. $4\\pi$', 'D. $6\\pi$']	D	math	空间向量与立体几何	['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math_567	MCQ_OnlyTxt	"In a cone,$D$is the apex of the cone,$O$is the center of the circle on the base of the cone,$P$is the midpoint of the line segment $DO$,$AE$is the diameter of the base circle,$\triangle ABC$is the inscribed equilateral triangle of the base circle,$AB = AD = \sqrt{3}$
① $BE \parallel$Plane $PAC$;
② $PA \perp$Plane $PBC$;
③ The side area of the cone is $\sqrt{3}\pi$;
④ The inner spherical surface area of the triangular pyramid $P-ABC$is $(2-\sqrt{3})\pi$.
The number of correct conclusions is ()"	['A. 1', 'B. 2', 'C. 3', 'D. 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pXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMMcX2hrUS+bHJFjJaNuT05wSc9vfwSvqP4NfadL+DN1dauGjsw1xcQ+YOlvsBJ+mQ5/GvlygD6b/aA/5JbpX/AGEIf/RMlfMlfT3x3he8+ElhcQKXiiu7eZ2A4CGN1B/Nl/OvmGgD1r9nf/kpFx/2DZf/AEOOsX42/wDJXtd/7d//AERHW1+zv/yUi4/7Bsv/AKHHWL8bf+Sva7/27/8AoiOgDuv2Z/8Aj88Sf9c7f+cleTePWZ/iJ4lLHJ/tS5H4CVhXrP7M/wDx+eJP+udv/OSvJfHf/JQvEv8A2Fbr/wBGtQBz9fTXwP8A+SOar/18XP8A6KSvmWvpr4H/APJHNV/6+bn/ANFJQB8y19SfH0O/wstmhP7sXsJbH93Y+P1Ir5br6v0xLb4q/A2OyWRTdm1WBiT/AKu5iAwT6ZIB+jUAfKFFWtS0290fUJrDUbaS2uoW2yRSLgg/4e/er3hrw1qfizWoNL0u3eWWRhvcD5Yl7sx7Af8A1utAH0R4ZSSP9mCcSnLHSb1h9CZSP0xXy/X2Z4j0y00X4PazpdiQbez0eeBTnJ+WNgc++c596+M6APoX9nWUJ4Z8Tc/dkRv/ABxv8K+eq29G8H+IvENo91pGjXd5bo/ltJDHlQ2AcZ9cEfnWM6NHIyOpV1JBB7EUANooooAKKKKACiiigAooooAKKKKACtnwnrz+GPFmma0iswtJ1d0U4LJ0ZR9VJH41jUUAes/FP4vWvjvQrXStOsbq0iSfzpjMV+fAIUDB9yfwFeTUUUAeh/Cn4kRfD6+1E3lrPc2d5EoMcJGRIp4PPbDN+lZXxI8Zjx14vk1aKGSG2WFIYIpSCyqBk5xx94sfxrkaKACvWfD/AMWNM0f4SXXg+XTruS6mtbqAToV2Ay78HrnjcM15NRQAV6zrHxY0zUvg/H4Mj067S7S1t4PPYr5eY3Rieuedh/OvJqKACvWdY+LGmal8H4/BkenXaXaWtvB57FfLzG6MT1zzsP515NRQAUUUUAFem/Cf4maf8PYdVS+sbq6N60RTyCo27A2c5P8AtCvMqKALmrXi6hrF9eopVLi4klVW6gMxOD+dU6KKACvbvAXx4j8O+F4NI1uxu72S1+SCaFlz5X8Ktk9R0Htj0rxGigDf8b6/B4o8ZalrVtDJDDdyB1jkxuXCgc4+lYFFFAHVeDPiDr/gW5eTSp1a3lOZbWcFonPrjIwfcEGvX7f9oTw1qlkkPiPwzOx/iSNY7iPPqA5WvnaigD6NX4zfDPS3WbTPC0qzjkNDp8ERB+u7Nch4v+P2u63BNZaLbrpNrICplDl5yPZuAv4DI9a8hooAUksSSSSeST3pKKKACvXdF+Lml6Z8IpfB0mnXj3b2VzbCdSuzMpcg9c4G8flXkVFABRRRQAUUUUAafh3UotG8TaVqk0bSRWd5DcOiYywRwxAz34r1HxR8dbi88T6TrHh22ntVs4pIp4LrBWdWKkg4P+yOeorxuigD6E/4XJ8OfECpP4k8Ik3uPmZ7SG4A9g5IY/lTdQ+P3h/R9Maz8H+GzC2Pk86JIIkPrsQnd+Yr59ooAv6zrOoeINWuNU1S5e4u523O7foAOwA4AHSqKsyMGVirA5BBwQaSigD3Dwj+0FNZ6cmneK9OfUY1XZ9qhIMjr0+dW4Y++RnvnrWuvxU+EdrKLy38IkXOdwKaXAGU+ud3H1FfPFFAHq3j/wCN+p+LLGTStLtjpmmyArN8+6WZfQnGFHqB19ccV5TRRQAUUUUAanh7xBqHhfXLbV9MlEd1btkZGVYHgqw7gjivebf49+ENc01LfxP4enL9WiMMdzCT6jcQf0r5yooA98u/jf4S0CzmTwV4TS3upAQZZLeOBB6EhCS/0OPrWD4V+M6aX4W12w1y2vNQ1HVJ5pjcKVC/PGqAH0A29hwK8hooAfDNJbzxzwyNHLGwdHU4KsDkEH1r3XQ/j9YXejLpnjTQjfgKFkmhRJFm92jfAB+h/AV4PRQB9BRfE/4R6VOt3p3hFzdKdyMmnwqUPqCW4/CuA+I3xZ1Px6q2KQCw0mN9626uWaQ9i7d8dgBgZ78GvPKKAFVmRgysVYHIIOCDXt/hH9oKaz05NO8V6c+oxquz7VCQZHXp86twx98jPfPWvD6KAPodfip8I7WUXlv4RIuc7gU0uAMp9c7uPqK47x/8b9T8WWMmlaXbHTNNkBWb590sy+hOMKPUDr644rymigArvfh58VNW8AyNbpGL3SpW3SWkjFdp7sjfwn14IP61wVFAH0VcfF/4Xa4Rdaz4Vklu8fM0+nwysfYNuyR9cVheJPjvbR6O+k+B9G/smFxj7Q0aRsgPXZGmVB98n6V4lRQB6vqvxY0/Uvg+ng1tPu/tot4YjcMy7MxurZ656LXlFFFABRRRQB6z8K/ixpngHw/eade6dd3Mk90Zw0JUADYq45PX5a8moooA9Z8P/FjTNH+El14Pl067kuprW6gE6FdgMu/B6543DNeTUUUAFes+LPixpniD4YWnhWDTruK5hit0MzldhMYAPQ55xXk1FABRRRQAV1HgLxteeA/Ea6pbRCeJ0MVxbs20SoeevYggEGuXooA+ir/41/DfVyl3qnhO4vLxBhTcWNvKR7BmbOK8b8eeIdM8T+KZdT0nTRp1o0aIsAVV5UYzheK5migD0z4efGTVfBNsumXUH9o6SCSkTPtkhz12Nzx32n8Mc13s/wAWfhRqkpvdR8JtLdnlmm02B2Y/727n8a+dqKAPdfEf7Qca6Y2neDtHNguzalxOqL5Q/wBmNcrn3Jx7V4dPPLdXEtxcSPLNKxeSRzlmYnJJPc5qOigD2vwd8ejYaNHo/ivTZNTt0TyxcRlWdk7K6Nw3HfI989a1f+FkfBy3cXcPg4tODkKNNhGD9C2B+FfP9FAHqvxD+NV94u0+TRtLtP7O0p8CTLZlmUfwnHCr7DPTrjivKqKKAPc/Bfx2sLHwzDoXirS57yOCIQLNCqSebGBgB0cgcDAzk59PWl4t+Jfw/wBQ8MajpWgeEFtLi6j2pcfYoIdhyDn5ST2rxmigDtPhh40tPAniqXVr21nuYntXgCQkbsllOee3y1Q8f+Jbfxf431HXbWCWCG68vbHLjcNsaoc446rXNUUAej/Cf4jWHw+n1WS+srm6F4sQQQFfl2ls5yf9quL8RalHrPifVtUiRo4728muER+qh3LAH35rMooAK9Z+H3xY0zwf4GvNButOu5555ZXWSIrtAdFUZyc9q8mooAK6zwJ8QdY8Bak9xp5Wa1mwLi0lJ2SAd/Zh2P8AOuTr6P8Ag/rfh3xZ4Dm8GanHbxXwieGRAqo1xETkMp7sv58A0ARzfHPwDrluh8QeFbieZR9yW1huVX2BZh/IVi6z8erGy0ySw8EeHY9M8wcTyRxpsPqI0yCfcn8DVLWv2dfEdteP/Y97ZXtoSdnmuYpAPQjGPxB/AVc8N/s56rJfJJ4j1G1gs1ILRWjF5H9skAL9efpQB2OjyzQ/sz3lzqEzST3On3krySHJZpXkIJJ6k7h+dfL1e8/G3x/pi6PH4I8PSRNBHsW7aA/u41TG2JfXBAJx02geuPBqAPXvhb8XNL8B+F59KvdOvLmWW8e4DwlcAFEXHJ6/Ka8nu5hcXk86ggSSM4B7ZOahooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAClR2jdXRirKchgcEH1pKKAOtsvih430+MRweJb8qOnnOJcfi4NV9V+IXi7WoGgv/ABDfywsMNGsuxWHoQuAR9a5qigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_568	MCQ_OnlyTxt	"If the line passes through two fixed points $P(x_1,y_1),Q(x_2,y_2)$(where $x_1\neq x_2$), the parametric equation of the line is
\[
\begin{cases} 
x = \frac{x_1 + \lambda x_2}{1 + \lambda} \\ 
y = \frac{y_1 + \lambda y_2}{1 + \lambda} 
\end{cases}
\]
($\lambda$is a parameter,$\lambda\neq -1$) Where point $M(x,y)$is any point on the line, the following statements are incorrect ()"	['A. The geometric meaning of parameter $\\lambda$is that the number of points $M$directed line segments $PQ$is more than $\\frac{PM}{MQ}$', 'B. You can use $\\left(\\frac{x_1+\\lambda x_2}{1+\\lambda},\\frac{y_1+\\lambda y_2}{1+\\lambda}\\right)$to represent any point on a line', 'C. When $\\lambda<0$and $\\lambda\\neq-1$,$M$is the outer point', 'D. When $\\lambda=0$, point $M$coincides with point 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math_569	MCQ	<image_1>As shown in the figure, in the triangular pyramid\(S-ABC\), the plane\(SAC \perp\) plane\(ABC\), and the plane\(\alpha\) passing through the point\(B\) and parallel to\(AC\) intersect with the edges\(SA\) and\(SC\) respectively at\(E\),\(F\). If\(SA = SC = BA = BC = 2\sqrt{2}\),\(AC = 4\), then the following conclusions are correct ()	['A. The surface area of the circumscribing ball of the triangular pyramid\\(S-ABC\\) is\\(12\\pi\\)', 'B. \\(EF \\parallel\\) Plane\\(ABC\\)', 'C. \\(BE \\perp SA\\)', 'D. If\\(F\\) is the midpoint of\\(SC\\), then the cosine of the angle formed by\\(BF\\) and\\(SA\\) is\\(\\frac{\\sqrt{3}}{3}\\)']	BD	math	空间向量与立体几何	['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math_570	MCQ_OnlyTxt	It is known that the edge length of the cube\(ABCD-A_1B_1C_1D_1\) is 2, \(M, N\) are the midpoints of\(AB, CC_1\) respectively, and\(P\) is any point on the inner radius\(O\) of the cube, then ()	['A. The range of angles formed by\\(\\angle AP\\) and\\(AC\\) is\\(\\left[0, \\frac{\\pi}{3}\\right]\\)', 'B. The chord length of the sphere\\(O\\) is truncated by\\(MN\\) is\\(\\sqrt{2}\\)', 'C. The maximum volume of the triangular pyramid\\(P-AB_1C\\) is\\(\\frac{2(\\sqrt{3}+1)}{3}\\)', 'D. The value range of\\(\\overrightarrow{PM} \\cdot \\overrightarrow{PN}\\) is\\([- \\sqrt{2}, \\sqrt{2}]\\)']	BCD	math	空间向量与立体几何	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0do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math_571	MCQ	<image_1>As shown in the figure, it is known that the side length of the diamond $ABCD$is 2, and $\angle A=60^\circ$, and $E,F$are the midpoints of edges $AB and DC$respectively. Fold $\triangle BCF$and $\triangle ADE$along $BF and DE$respectively. If $AC\parallel$Plane $DEBF$is satisfied, then the value range of line segment $AC$is ()	['A. $[\\sqrt{3},2\\sqrt{3}]$', 'B. $[1,2\\sqrt{3}]$', 'C. $[2,2\\sqrt{3})$', 'D. $[2,2\\sqrt{3}]$']	A	math	空间向量与立体几何	['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math_572	OPEN_OnlyTxt	In a cube $ABCD-A_1B_1C_1D_1$with an edge length of $a$, points $E$and $F$are the midpoints of edges $BC$and $CC_1$respectively,$P$is the moving point on the side face $ADD_1A_1$, and $PC_1\parallel$Plane $AEF$, then the trajectory length of point $P$is		$\frac{\sqrt{2}}{2}a$	math	空间向量与立体几何	['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KKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_573	MCQ_OnlyTxt	In the triangular pyramid\(P-ABC\),\(ABC\) is an isosceles right triangle with\(BC\) as the hypotenuse, and\(BC = 2\sqrt{2}\),\(PA = PB = \sqrt{5}\), the projection of the point\(P\) within the base\(ABC\) is outside of\(ABC\), and\(PE = \sqrt{3}\), then the surface area of the circumscribed sphere of the triangular pyramid is ()	['A. \\(\\frac{49\\pi}{9}\\)', 'B. \\(\\frac{49\\pi}{3}\\)', 'C. \\(\\frac{50\\pi}{3}\\)', 'D. \\(\\frac{50\\pi}{9}\\)']	B	math	空间向量与立体几何	['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math_574	MCQ	<image_1>\text{In the regular quadrangular prism} ABCD-A_1B_1C_1D_1 \text{,} AB = 4, AA_1 = 1, \text{ } M \text{is a moving point on the surface of the regular quadrangular prism, and satisfies} DM \perp BD, \text{then the length of the motion trajectory of the point} M \text{is ()}	['A. 16', 'B. 8\\sqrt{5}', 'C. 8\\sqrt{6}', 'D. 16\\sqrt{2}']	B	math	空间向量与立体几何	['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']	['math_574.jpg']
math_575	MCQ	<image_1>As shown in the figure, in a straight triangular prism\(ABC-A_1B_1C_1\),\(AC \perp AB, AC = AB = CC_1 = 1\),\(E\) is the midpoint of the line segment\(AB\), and there is a moving point\(P\)(including the boundary) within\(\triangle A_1BC\), then\(|PA|  + |PE| The minimum value of\) is ()	['A. \\(\\frac{\\sqrt{33}}{2}\\)', 'B. \\(\\frac{2\\sqrt{33}}{3}\\)', 'C. \\(\\frac{\\sqrt{33}}{6}\\)', 'D. \\(\\frac{\\sqrt{33}}{3}\\)']	C	math	空间向量与立体几何	['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']	['math_575.jpg']
math_576	OPEN	<image_1>As shown in the figure, the quadrangle\(A'B 'C'D'\) is the projection of a square\(ABCD\) with side length 2 on the plane\(\alpha\). The rays\(AA'\),\(BB'\),\(CC'\), and\(DD'\) are parallel to each other, and the angle formed by ray\(AA'\) and plane\(\alpha\) is\(60^\circ\), rotate the square\(ABCD\), keep\during rotation (BC \parallel\) Plane\(\alpha\) and\(BC \perp AA'\), if the angle formed by plane\(ABCD\) and plane\(\alpha\) is\(\theta\), and\(BB' = 2\cos\theta\), then the maximum volume of the polyhedron\(ABCD-A'B'C'D'\) is		\frac{16\sqrt{3}}{3}	math	空间向量与立体几何	['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']	['math_576.jpg']
math_577	OPEN	<image_1>In a cube\(ABCD-A_1B_1C_1D_1\) with an edge length of 2,\(E\) is the midpoint of the edge\(DD_1\),\(F\) is a moving point (including the boundary) in the square\(C_1CD_1\), and\(B_1F \parallel\) is plane\(ABE\), then when the volume of the triangular pyramid\(B_1-D_1DF\) is the largest, the surface area of its circumscribed sphere is		\frac{25\pi}{2}	math	空间向量与立体几何	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADYAO8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigA6UwSoejr+dQ6hcwWWm3N1clRBDEzyFum0DJzXn3w38JaZfeBUv9U023kuNWllvGLRgGNXYlQh6qAuMY6ZoA9Korgfhfq13d2+vaTdTy3C6PqUlpBPK25njB+UE9yMdfpXfUAFFFFABRRRQAUUUUAFFFFABRRRQAUUVn67q8GgaDfatc5MVpC0rAdWwM4HuelAF55EjXLuqgdyaFkR/usDxng1xHgnSX13SIPEviNEvL/UF8+KKUbo7WJuVRFPA4wSepz1rf0rw3Z6PrepahaRpEt6sQMUa7VUpu5A6DO7tQBtUUUUAFFFFABRRRQAUUUUAFFFFABRRXLeL/EUunLHpmnTRR6lcq0hmkwUtIF+/O/sB0z1JA9aAKvxNTVb3wddaVo9hcXVze7YmMQGEjJ+ckkjsCMe9XGvdSg0mLTtB0KdHjiWGGS7KxRQgDAJGSxA9AOfaoY/D3iKSNXTxvdsrAEMLKDBB/wCA07/hG/En/Q63n/gFB/8AE0AZsvhpfCHw4vbaC8ne8L/abi7VijyzM43Nx27Y9K7xfuj6Vx934P1u/tmt7vxfczQt96N7GAg/UbalXwz4jVQo8a3gAGB/oUH/AMTQB1lFcp/wjfiT/odbz/wCg/8AiaP+Eb8Sf9Dref8AgFB/8TQB1dFcp/wjfiT/AKHW8/8AAKD/AOJo/wCEb8Sf9Dref+AUH/xNAHV0Vyn/AAjfiT/odbz/AMAoP/iaP+Eb8Sf9Dref+AUH/wATQB1dFcp/wjfiT/odbz/wCg/+Jo/4RvxJ/wBDref+AUH/AMTQB1dFcp/wjfiT/odbz/wCg/8AiaP+Eb8Sf9Dref8AgFB/8TQB1dY3izQ/+El8K6lo/mCJruBo1c9FbsT7ZxWb/wAI34k/6HW8/wDAKD/4mj/hG/En/Q63n/gFB/8AE0AVPCus6npmh2Wi6roGopqFpCsBaGIPDLtGAyyZ2jIHcjFaHiSS9XwuJ53Nvc/aoDiByNoMyjaSOvBwexqL/hG/En/Q63n/AIBQf/E1zfjLT9dstOitB4pnv9QvJAlnZvZQYdxzub5eFXG4ntj6UAen0Vh+Db+51TwZo1/eOJLm4s45JXAAyxUEnArcoAKKKKACiiigAooooAKKKa7rGjO7BVUZJJ4AoAz9e1q28P6RNf3O5tuFjiQZeVycKijuScCuctvDE83hjWrjWZ44tY1i2dbqZjlLZCpCxj/ZQH8Tk07R0bxhrieI7hD/AGTZsy6TE3SVujXBHvyFz25710HiLT5dV8N6np0Lokt1ayQoznCgspAz7c0AXLOIQWNvCHDiOJVDDocDGanqCyhNvYW8DEFo4lQkdDgYqegAooooAKKKKACiiigAooooAKKKKACiiigAooooAq6lqNrpOnT395KsVvAhd3bsB/Wub8OaddX01x4p1iIx3t3EUtbd+tpb9Qvs7feb8B2qEA+NvEWfveHtKm4/u3lyp/VEP5t/u12M3+of/dNAHPfD7/knnh//AK8If/QRXSVzfw+/5J54f/68If8A0EV0lABRRRQAUUUUAFFV7S9tr5JHtZllWORomZegdThh+B4qxQAVxuvSyeKtaPha0ZhYQgPq86HHynlYAfVhycdF+taXinXJtMt4LHTkWbWNQYxWcR6A4+aRv9lRyfwHerfh3Q4PD+kJZxOZZSxluJ3+9PK3LO3uT+XA7UAaUUUcEKQxIqRooVVUYCgdAKzvEllPqXhjVLG1x9ouLWSKPJwNzKQOe1alZfiS3u7rwzqlvYbvtktrIkG1tp3lSBg9ue9AF2xieCwtoZCC8cSq2DnkAA1PUFkkkdhbJNnzViUPk5O7AzzU9ABRRRQAUUUUAFFFFABRRRQAU2RikbMFLkDO1ep9hTqyfFGsJ4f8L6lqzsB9lt3kXPdgPlH4nA/GgDGi+IukvY3N+9pqMVjaztBcXLQZSJ1ODnaScA9wMV1kM0dxCk0Th45FDIynIIPQivEr211Xw/8ADvQNB1Ty7bR9WmSHULuJjJcB5jvIKsAFycgn5selev2kthp0lnoUD7JEtd0MWD/qk2rnPtuX86ANGuT8UahdahexeFtIlaO8uk33dynW0t+hb/fb7q/ie1aniTXU0DTPPERnupnENrbKfmmlb7qj+p7DJqLwvoUmjWUs17KLjVr1/Ovrgfxv/dHoqj5QPQUAaenafa6Vp0FhZRLFbQIEjQdgKnm/1Mn+6afTJv8AUyf7poA574ff8k88P/8AXhD/AOgiukrm/h9/yTzw/wD9eEP/AKCK6SgAooooAK5fxX4ggs8aSl/DaXM0TSSSvIFMMQ6kZ6sTwB9T2weiumuFtZDaRxyT4+RZXKqT7kA4/KuZGgakfCl5DLDYS67erJ507Odm9gQCDtzgDaAMdB170AUPhKqWHwp0mW4kCKySzvJI2BhpHbJJ9jXW6rq9lo2kT6pezBLWFN7OOcjsB6k8Aeua5R9IudD+Dl1o98sDTWulyQ5iYsrkIQCMgck9qq/EHTYNe8IaDpk0ki295f2sTtE2Dgg9DQBseFrGaWebxJrOxNUvlCpCWB+yQZysQ9+7HufoK6jzov8Anon/AH0K8UuNNtfCWq2mk654NtdSt5MpDqVtJsacjoChOA+P4dwz29K9Aj8EeC3eOM6NaJNIgkETkh9v0zmgDq/Oi/56J/30KyvEss58L6qNPkb7b9kl8jym+fftO3b75qh/wrzwl/0A7b/x7/GsvxL4D8OWvhfVbix0OAXcdpK8JRSx3hSRgZ55oA7Cxm/4l9t58g83yl37mGd2BnP41Y86L/non/fQrin8DeGIPDv2t9Hso5kthK7zK20ELkkgMPeuU0Xw42t+DoNeg8M6AklxC00Vq4m3MBnAyG7gA9O9AHsHnRf89E/76FHnRf8APRP++hXKWPw/8NSWFu934ftI7lo1MqKWwrY5A59an/4V54S/6Adt/wCPf40AdJ50X/PRP++hR50X/PRP++hXN/8ACvPCX/QDtv8Ax7/Gj/hXnhL/AKAdt/49/jQB0nnRf89E/wC+hR50X/PRP++hXN/8K88Jf9AO2/8AHv8AGj/hXnhL/oB23/j3+NAHSedF/wA9E/76FHnRf89E/wC+hXN/8K88Jf8AQDtv/Hv8aP8AhXnhL/oB23/j3+NAHSedF/z0T/voVzfjLw+/izSl01dUhtbYypJKDD5hk2tuCn5hxkDNH/CvPCX/AEA7b/x7/Gj/AIV54S/6Adt/49/jQBWuvCZ1nVbC817WheQWEongs4YhDF5o6Ow3MWI7c4q1qVzFbeMrG/lbbZ2+m3QlnI+RCXhYZPQcIx/Ck/4V54S/6Adt/wCPf41zHxD8DeHrLwLqU+n6XBbXQEYjmXOUJkUZ6+9AG94bt5vEWq/8JbqEbJEVMek27jBihPWUj+8/X2XA7muwqhoq3sej2kOpPC1/HEqzmE/KWA5I6dev41foAKZN/qZP900+mTf6mT/dNAHPfD7/AJJ54f8A+vCH/wBBFdJXN/D7/knnh/8A68If/QRXSUAFFFFABRRRQAda5Pxz93w9/wBhq2/ma6yuT8c9PD3/AGGrb+ZoA6HUtMs9Y0+Wxv7dJ7aUYdHH6+xHY9q8/wBU0qHR5YbfxQj3mkIQtlrgYpc2OTwkki4YL6PnH971r0umTQx3ELwzRrJG4KsjDIYHsRQBianca9ZNbTaPaW2p2IjAkhabZOT/AHlc/K3HY4+tM8S+JbbSdJ1BIry3i1aKxkuobaRxvO1SQdueRkfpWS9vfeAnMtlHNfeGicyWy5aWwHdo+7R+q9R2yOKu+KTo2seB73VjbWepwQ2j3NuzDcCVUkEMOR07EGgDM+I2pXDfDqO0h5vtaMNjEBxlpcbv/Hd1aFlokfhm/sZp9VuJbKG2SxtLeXbhZGYKNoVRzgAZOeM+9ZzaYuu67YxeINKllg8pbnTLy1mlVISFGVcBvlcdm7j0PFdDD4Q0eHVLfUjFcTXdsSYZLi6ll2EjBwGYjoTQBu0UUUAFFFFABRRRQAUUUUAFFFFABXKfEn/kQtQ/3of/AEaldXXKfEn/AJELUP8Aeh/9GpQBc/smWy8YPrME8aWl3bCK8jdsZkU/u3X3wSp/4DW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math_578	MCQ_OnlyTxt	When conducting satellite communications, the transmitted information is usually converted into 0,1 signal numbers for transmission and reception. 0,1 signals are transmitted within the channel, and the transmission of signals is independent of each other. When sending 0, the probability that the receiver receives 0 (correct) is\(\alpha\), and the probability that the receiver receives 1 (error) is\(1-\alpha\); when sending 1, the probability that the receiver receives 1 (correct) is\(\beta\), and the probability that the receiver receives 0 (error) is\(1-\beta\). Consider two transmission schemes: single transmission and triple transmission. Single transmission means that each signal is sent only once, and triple transmission means that each signal is sent repeatedly 3 times. Regardless of which scheme, the signal received by the receiver needs to be decoded. The decoding rules are as follows: for a single transmission, the received number is decoded; for three transmissions, the one that appears the most frequently among the received signals is decoded (for example, if 1, 0, and 1 are received in turn, the decoding is 1). The following conclusions are correct ()	['A. When using single transmission, if 1, 0, and 1 are sent in turn, the probability of receiving 1, 0, and 1 in turn is\\((1-\\alpha) \\times \\beta^2\\)', 'B. When triple transmission is used, if a digital 0 is sent, the probability of decoding to 0 is\\(|1-\\alpha| \\alpha^2 + \\alpha^3\\)', 'C. Send 0, if 0.5 < \\alpha < 1, the probability of correct decoding for triple transmission is greater than the probability of correct decoding for single transmission', 'D. When\\(\\alpha = \\beta\\), the probability of correct decoding is independent of the transmission scheme and the transmitted digital 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math_579	MCQ_OnlyTxt	A TV program has a prize-winning activity. A total of three test questions are set up. Players need to answer the questions in turn. After each correct answer, they will receive a corresponding bonus, and the bonus will accumulate. The probability of a player choosing to continue answering the questions or give up answering the questions after answering the questions correctly is the same each time. If he chooses to give up answering the questions, the bonus will be valid; if he chooses to continue answering the questions, the player can use an off-site help opportunity when the answer is wrong. If the answer is correct after asking for help, the bonus will be valid and the answer will end. If the answer is wrong after asking for help, the bonus will be cleared and the answer will end. It is known that the probability that A will answer the questions correctly alone in this activity is $\frac{3}{5}, \frac {1}{3}, and\frac{1}{4}$, and the probability that the answers will be correct after asking for help outside the field is $\frac{2}{3}$, then the following propositions are correct ()	['A. The probability of A using off-site help in the first question is $\\frac{2}{5}$', 'B. The probability of answering the questions twice and receiving a bonus is $\\frac{1}{20}$', 'C. The probability that A does not use off-site help and receives a bonus is $\\frac{29}{80}$', 'D. The probability that A uses off-site help in the last two questions and gets a bonus is $\\frac{25}{48}$']	AC	math	计数原理与概率统计	['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capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTS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math_580	MCQ_OnlyTxt	Xiaoming and Xiaohong play a game and toss a uniform die. The unfairness in the following games is ()}	['A. Throw the die once, and the number of points you roll is 1 or 2, Xiaoming wins; otherwise Xiaohong wins', 'B. Throw the die twice, and the sum of the points rolled is an odd number, Xiaoming wins; otherwise Xiaohong wins', 'C. Throw the dice twice, the sum of the points rolled is 6, and Xiaoming wins; the sum of the points is 8, Xiaohong wins; otherwise, throw it again', 'D. Throw the die three times, and the points rolled are three consecutive natural numbers, and Xiaoming wins; if the points rolled are the same, Xiaohong wins; otherwise, throw it again']	AD	math	计数原理与概率统计	['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math_581	MCQ_OnlyTxt	Suppose that the probabilities of A and B shooting a basketball each time are\(\frac{1}{3}\) and\(\frac{2}{3}\) respectively. The two agree to shoot as follows: one person will shoot each time, and if he shoots, the other person will shoot the next time; if he does not shoot, continue to shoot. The probability of A and B shooting for the first time is the same, so the probability of A shooting exactly 3 times in the first 4 times is ()	['A. \\(\\frac{4}{27}\\)', 'B. \\(\\frac{8}{27}\\)', 'C. \\(\\frac{10}{27}\\)', 'D. \\(\\frac{20}{27}\\)']	C	math	计数原理与概率统计	['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math_582	OPEN_OnlyTxt	Let $A$and $B$be two events in a randomized trial, remember $\overline{A}, \overline{B}$as the opposite events of $A, B$, and $P(A) = 0.6, P(\overline{B}) = 0.3, P(\overline{A}B + A\overline{B}) = 0.5$, then $P(\overline{A}\overline {B}) =$()		0.3	math	计数原理与概率统计	['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eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMM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math_583	MCQ_OnlyTxt	It is known that in the cube $ABCD-A_1B_1C_1D_1$,$M$,$N$are the midpoints of $CC_1$,$C_1D$respectively, then ()	['A. The cosine of the angle formed by the straight line $MN$and $A_1C$is $\\frac{\\sqrt{6}}{3}$', 'B. The cosine of the angle between plane $BMN$and plane $BC_1D_1$is $\\frac{\\sqrt{10}}{10}$', 'C. There is a point $Q$on $BC_1$such that $B_1Q \\perp BD_1$', 'D. There is a point $P$on $B_1D$such that $PA \\parallel \\text{plane} BMN$']	C	math	空间向量与立体几何	['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math_584	OPEN	<image_1>In a cube $ABCD-A_1B_1C_1D_1$with edge length 2, the moving points $M$and $N$are on edges $BC$and $AB$respectively, and $4N=BM$is satisfied. When the volume of the triangular pyramid $D-MNB_1$is the smallest, the sine value of the angle formed by $B_1M$and the plane $A_1MN$is ()		\frac{4\sqrt{5}}{15}	math	空间向量与立体几何	['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']	['math_584.jpg']
math_585	OPEN	As shown in the figure<image_1>, in the planar quadrangle $$,$AB = 8$,$CD = 3$,$AD = 5\sqrt{3}$,$\angle ADC = 90^\circ$,$\angle BAD = 30^\circ $, and points $E$and $F$satisfy $\overrightarrow{AE} = \frac{2}{5}\overrightarrow{AD}$,$\overrightarrow{AF} = \frac{1}{2}\overrightarrow{AB}$respectively. Fold $\triangle AEF$along $EF$to $\triangle PEF$so that $PC = 4\sqrt{3}$. Find the sine value of the dihedral angle formed by plane $PCD$and plane $PBF$.		\frac{8\sqrt{65}}{65}	math	空间向量与立体几何	['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math_586	MCQ_OnlyTxt	In the triangular pyramid $A_1-ABC$,$A_1A \perp$plane $ABC$,$AB \perp AC$,$AA_1 = AB = AC = 3$,$P$is a moving point (including boundaries) in $\triangle A_1BC$, and the angle formed by $AP$and plane $A_1BC$is $45^\circ$, then ()	['A. The minimum value of $A_1P$is $\\sqrt{6} - \\sqrt{3}$', 'B. The maximum value of $A_1P$is $\\sqrt{6} + \\sqrt{3}$', 'C. There is and only one point $P$, so that $A_1P \\perp BC$', 'D. The surface area formed by all line segments $AP$that meet the conditions is $\\frac{3\\sqrt{2}\\pi}{4}$']	ACD	math	空间向量与立体几何	['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math_587	MCQ	As shown in Figure 1<image_1>, in the right-angled trapezoid $ABCD$,$AB \parallel CD$,$AB \perp AD$,$AB = 3\sqrt{3}$,$CD = 4\sqrt{3}$,$AD = 3$, points $E$,$F$are points on edges $AB$,$CD$, respectively, and $EF \parallel AD$,$AE = 2\sqrt{3}$. Fold the quadrangle $AEFD$along $EF$, as shown in Figure 2<image_2>, so that plane $AEFD \perp$plane $EBCF$, point $M$is the moving point in the quadrangle $AEFD$, and the angle formed by the line $MB$and the plane $AEFD$is equal to the angle formed by the line $MC$and the plane $AEFD$, then the following conclusions are correct ()	['A. $AC \\perp BF$', 'B. The trajectory length of point $M$is $\\frac{2\\pi}{3}$', 'C. The maximum distance from point $M$to plane $EBCF$is $\\sqrt{3}$', 'D. When the distance from point $M$to plane $EBCF$is the largest, the surface area of the circumscribed sphere of the triangular pyramid $M-BCF$is $28\\pi$']	BCD	math	空间向量与立体几何	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAD7AIEDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiobu6isrWW5ncJFEhd2PQADJoAmzRXEeCNa1TUvEXia01TKNBPDLDCTnyYpIwVX6/Lz75rtiwHcUALRSbh6j86Nw9R+dAC0Um4eo/OjcPUfnQAtFJuHqPzo3D1H50ALRSbh6j86Nw9R+dAC0Um4eo/OkY4QkEDjqaAHUVwmkeLde1bw7fa5b2FlLBbXEyRQ72Vp4oyQXB5AJwcDH411eh6xba/otpqtmWNvdRiRNwwR7H3HSgDQooooAKwtd0+71W9sbQwRvpW8yXhZ+WwMooHpuwT9APWt2igDj9P8O3mmfEK61O0t449JurFIJR5uXMqOxDY9MMR1qaDR7HVfEGtvfQCdop40Te5+VfKQ4HPqSfxrqqw9H/5DviD/r5j/wDRKUAL/wAIloX/AEDo/wDvpv8AGj/hEtC/6B0f/fTf41t0UAYn/CJaF/0Do/8Avpv8aP8AhEtC/wCgdH/303+NbdFAGJ/wiWhf9A6P/vpv8aP+ES0L/oHR/wDfTf41t0UAYn/CJaF/0Do/++m/xo/4RLQv+gdH/wB9N/jW3RQBhSeEtDCNjToxwedzf41jS6xcaZ8Ire+iEs96dKjEKqpdnlaMbeByeea7ST/Vv/umsbweM+C9D/68If8A0AUActYmXS/htZ6DoNpPeajJaCAERssccjj53dyAAAWJxnJ6AV1fhXQx4a8L6do4k8w2kIRnxjc3Vj+ZNbG0UtABRRRQAUUUUAFYej/8h3xB/wBfMf8A6JStysPR/wDkO+IP+vmP/wBEpQBuUUUUAFFFFABRRRQAUUUUANk/1b/7prG8H/8AIl6H/wBeEP8A6AK2ZP8AVv8A7prG8H/8iXof/XhD/wCgCgDbooooAKKKKACiiigArD0f/kO+IP8Ar5j/APRKVuVh6P8A8h3xB/18x/8AolKANyiiigAooooAKKKKACiiigBsn+rf/dNY3g//AJEvQ/8Arwh/9AFbMn+rf/dNY3g//kS9D/68If8A0AUAbdFFFABRRRQAUUUUAFYej/8AId8Qf9fMf/olK3Kw9H/5DviD/r5j/wDRKUAblFFFABRRRQAUUUUAFFFFADZP9W/+6axvB/8AyJeh/wDXhD/6AK2ZP9W/+6axvB//ACJeh/8AXhD/AOgCgDbooooAKKKKACiiigArD0f/AJDviD/r5j/9EpW5WHo//Id8Qf8AXzH/AOiUoA3KKKKACiiigAooooAKKKKAGyf6t/8AdNY3g/8A5EvQ/wDrwh/9AFbMn+rf/dNY3g//AJEvQ/8Arwh/9AFAG3RRRQAUUUUAFU9U1BdL0y5vnieRLeNpXVCAdoGT1IHT3q5XE/FO7kj8GyadbvtudVni0+LHUmRgD/47uoAtWPjdr+w0/UI/DurLZXzxrHOxhwokYKrMok3AZI7VoaP/AMh3xB/18x/+iUqro1pHomopp82rG6LwJHaW7hA0aoDuICgfL93k+gGelQWzawPEevf2fHZNF58W7z3ZTnyU9AaAOtorE3+KP+eOk/8Af2T/AOJo3+KP+eOk/wDf2T/4mgDborE3+KP+eOk/9/ZP/iaN/ij/AJ46T/39k/8AiaANuisTf4o/546T/wB/ZP8A4mjf4o/546T/AN/ZP/iaANuisTf4o/546T/39k/+Jo3+KP8AnjpP/f2T/wCJoA2ZP9W/+6axPCTFPBGisFLEafCQo7/IKSRvE+xsw6VjB/5ayf8AxNZC6x/YHwdg1Tjfb6RGyA938sBR+JIoAfY+Pzqelz6lZeGtXmtIZJI2dTByUJDEAy5I4PSuxU7lBxjI6VxXgfwreaHpGjpJqc8lvFaF5LVgoAnfDE5ABIGXGCT1HpXbUAFFFFABVDUtD0nWTH/aemWd75WfL+0wLJtz6bgcVfooAy9P8N6JpNybnTtHsLSdlKGS3tkjYqcHGQBxwPyqvo//ACHfEH/XzH/6JStysPR/+Q74g/6+Y/8A0SlAG5RRRQAUUUUAFFFFABRRRQA2T/Vv/umua8P6Vp+reBNDt9Rsre8h+wwHy7iJZFzsHOCOtdLJ/q3/AN01jeD/APkS9D/68If/AEAUAa8EENrAkEESRRIMKiKFVR6ADpUlFFABRRRQAUUUUAFYej/8h3xB/wBfMf8A6JStysPR/wDkO+IP+vmP/wBEpQBuUUUUAFFFFABRRRQAUUUUANk/1b/7prG8H/8AIl6H/wBeEP8A6AK2ZP8AVv8A7prG8H/8iXof/XhD/wCgCgDbooooAKKKKACkZgoJJAA6k0tUdYv4tL0e9v5yBFbQPK+fRVJP8qALEd1BM22OaN29FYE1j6O6/wDCQ+IE3DcLiI4zzjyU/wDr15RpFnINB8JaXdWX9mXOo3ovxqj7SZHLeYI128gspA+bAwO9ev6loFpqciXB8y2vYv8AV3du2yVfbPRh/ssCPagDWormU1nUdDOzxBEJbUdNStkOwf8AXROSn1GV/wB3pXRQ3EVxEssMiyRuMq6EEMPUEUASUUUUAFFFFABRRRQA2T/Vv/umsbwf/wAiXof/AF4Q/wDoArZk/wBW/wDumsbwf/yJeh/9eEP/AKAKANuiiigAooooAKxPFegN4n8P3Oj/AGx7SO5AWSRE3MVzkgZPfFbdFAHMp4RW41fTtQ1O8a6Omr/olukQjijbGN+OSWx05wPSumxiiigBCoI5Ga56Xw5JYXD3fh+dbKRiWktWGbaYnuV/gP8AtLj3BroqKAMKw8RpJdJp+pwNp2pEDEUhykp/6ZydH+nDeoFbgOarX+nWmp2rW17bxzwtyUkXIz2P1rENvrPh9t1o76rpygk28z/6RGPRHP3x7Ng/7R6UAdLRWfpmtWOrRu1pNl4jtmicFZImxnDqeVP1rQHNABRRRQA2T/Vv/umsbwf/AMiXof8A14Q/+gCtmT/Vv/umsbwf/wAiXof/AF4Q/wDoAoA26KKKACiiigAooooAKKKKACiiigAowDRRQBk6p4fs9SljuRvtr6L/AFd3bnZIvsT/ABL/ALLZB9Kof2zqOhkR69EJLUDjUrdDsH/XROSn1GV+ldLSMoYEHkGgBkM8VxEssMqSRuAVdCCGHqDUlc7P4elsJ2utAuRZSMxeS1YbraY+6/wH/aXHuD0qaw8RxSXK2GpwNp2okDEUrZSX/rm/R/pww7gUAbUn+rf/AHTWN4P/AORL0P8A68If/QBWxJ/qn/3TWP4P/wCRL0P/AK8If/QBQBt0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFVb/AE6z1O1a2vbaKeFsEpIuRkdD7EdjVqigDmWtta0CNvsbPq2ngHNvK/8ApEQ9Ec8OPZuf9rtWh4Xt5bTwppFtcRtHNFZxI6N1VggBBqt4v8SJ4Y0X7YIDc3UsqW9rbg4MsrnCrnt6k+gqtNpvidtHDLroXVCVLLHBGIByNwAZS3AzgluoB9qAOoopF6UtABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQByHj3Qb/V7fSLvTolnuNL1CO9+zswXzlXIKgnjODxmtu1v728njC6bPbQjmR7kqD9FCk5P5D61qUUAIKWiigAooooAKKKKACiiigAooooAz9cv30rQdQ1CNA72ttJMqMcBiqk4P5Vz8vjdreXSIJbEPNqNv9oKwyNJ5CbQSzgJkLk4zzzWn40OPA+vH/qHz/8Aos15/rel/bfDOmRzTwWazRW/yx3Kpc3AKBCd74AVQxOwZ3DI4yaAOvtPGD6lrGiRWUdtNp+pR3Decrvu/d46BlHc/wCe+9c63YWeoWthcTNHc3TmOBTG2HYDOA2MdAe9cXb2up2HjXwrbajPYyrHFeJA1pCYgYwiY3LkgH6cVoeMh/xVngr/ALCUn/ol6AO0ooooAKKKKACiiigAooooAKKKKACiiigAooooApaxpyaxot7psjtGl3A8LOo5UMCCR+dY58HQy6Oml3Wo3txarCsJjk8sqVAx0K10tFAHN2/hCG21bS79b+8kGnRSRQwyFSoVlC44APAArQv9AsNTvLa7uo5HmtX8yBhM67GwRkAEDoSK1KKAEVdoxS0UUAFFFFABRRRQAUUUUAf/2Q==', 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'math_587_2.jpg']
math_588	OPEN	<image_1>In the quadrangular pyramid $P-ABCD$, we know $AD \parallel BC$,$BC = 2AD = 2AB = 4$,$\angle BAD = \frac{\pi}{2}$,$PD = CD$, planar $PCD \perp$planar $PBC$. If $PB = 2$, is there a point $Q$on edge $BC$such that the cosine of the angle between plane $PBD$and plane $PAQ$is $\frac{1}{7}$? If it exists, find the length of $CQ$; if it does not exist, please explain the reason.		There is a midpoint $Q$on edge $BC$, so that the cosine of the angle between plane $PBD$and plane $PAQ$is $\frac{1}{7}	math	空间向量与立体几何	['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math_589	MCQ	As shown in the figure<image_1>, in the box ABCD-A_{1}B_{1}C_{1}D_{1}, AB=AD=2, AA_{1}=4, and P is the moving point on the line segment CD_{1}, then the following proposition is correct ()	['A. B_{1}P Plane A_{1}BD', 'B. The minimum value for B_{1}P+PD is\\frac{2\\sqrt{170}}{5}', 'C. The maximum value of the sine value of the angle formed by straight line B_{1}P and plane CDD_{1}C_{1} is\\frac{2}{3}', 'D. The length of the intersection line between the sphere with B being the center of the sphere and 2\\sqrt{2} being the radius and the side surface CDD_{1}C_{1} is π']	ABD	math	空间向量与立体几何	['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math_590	OPEN	As <image_1>shown in the figure, in the combination of a semi-cylinder OOOO_{1} and a quadrangular pyramid A-BCDE, F is the moving point on the semicircular arc BC (excluding B, C), FG is a generatrix of the cylinder, and point A is in the plane where the lower bottom surface of the semi-cylinder is located, OB=2OO_{1}=2, AB=AC=2\sqrt{2}. If DF\parallel plane ABE, find the cosine of the angle between plane FOD and plane GOD.		\frac{\sqrt{30}}{6}	math	空间向量与立体几何	['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']	['math_590.jpg']
math_591	OPEN	As shown in the figure<image_1>, the plane $ABCD \perp$Plane $ABEF$, the square $ABCD$has a side length of 4, the quadrangle $ABEF$is a rectangle,$AF=2$, and the point $G$is on $EF$. If the four vertices of the triangular pyramid $C-ABG$are all on the sphere of the ball $O$with radius $\frac{\sqrt{129}}{4}$, then $FG=$()		1 or 3	math	空间向量与立体几何	['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']	['math_591.jpg']
math_592	OPEN_OnlyTxt	"Define a class of sets: For the set $ \Omega = \{x_1, x_2, \cdots, x_n\} \ (n \geq2, n \in \mathbb{N}) $, if $ \forall x_i \in \Omega $satisfies $|x_i| < 1 $, then $ \Omega $is called a ""unit bounded set""; define an operation in the set $ \Omega $: If $ x_i \in \Omega $,$ x_j \in \Omega $, define $ x_i \otimes x_j = \frac{x_i + x_j}{1 + x_i x_j} $. Now, the unit bounded set $ \Omega $is performed as follows: First, arbitrary two elements $ x_i $,$ x_j \are taken from $ \Omega $.(i \neq j) $, write the set of elements other than $ x_i $and $ x_j $in $ \Omega $as $\Omega_1 $, let $H_1 =\Omega_1\cup \{x_i \otimes x_j\} $; Second, if the set $H_1 $is still a unit bounded set, continue to arbitrarily take two elements $ x_m, x_l \(m \neq l) $, write the set of elements other than $ x_m, x_l $in $H_1 $as $\Omega_2 $, let $H_2 = \Omega_2 \cup \{x_m \otimes x_l\} $; And so on…when $ \Omega = \left\{ \cos \frac{n\pi}{10} \middle| When 1 \leq n < 10, n \in \mathbb{N} \right\} $, perform the above operations in $ k $on the set $ \Omega $, stop when $ H_k $has only one element, and find all $ H_k $that satisfy the conditions."		H_k = 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math_593	OPEN_OnlyTxt	"It is known that the sequence $\{a_n\}$has a total of $n (n \geq2)$items. For the item $a_t (2 \leq t \leq n)$in $\{a_n\}$, if there is $a_k < a_t$for any $k < t$, then $a_t$is called a ""local max item"" in $\{a_n\}$, and $M$is the collection of all ""local max items"" in $\{a_n\}$. If the sequence $\{a_n\}$satisfies $a_1 = 1, a_n$is an even number greater than 1,$|a_m - a_{m-1}|\geq1 (2 \leq m \leq n), n \geq a_n + 3$,$a_n \in M$, find the maximum number of elements in $M$. (The results are expressed in $n$and $a_n$)"		When $n (n \geq5)$is odd, the maximum number of elements in $ M $is $ \frac{a_n + n - 3}{2} $; when $ n (n \geq6) $is even, the maximum number of elements in $ M $is $ \frac{a_n + n - 4}{2} $.	math	集合与常用逻辑用语	['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math_594	OPEN_OnlyTxt	"Given the set $ M = \{1, 2, \cdots, n\} $,$ n \in \mathbb{N}^* $, A and B are non-empty subsets of M. Record the set $ A + B = \left\{ \left( (x + y) \mod n \right) \mid x \in A, y \in B \right\} $. If the positive integer n satisfies: there are non-empty sets A and B, such that the intersection of $ A + B $is empty, and $ A \cup B \cup (A + B) = \{ 0, 1, 2, \cdots, n - 1 \} $, then n is said to be ""good"". Ask for all ""good"" positive integers."		Positive integers other than 1, 2, 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math_595	OPEN_OnlyTxt	The sum of all elements of the number set M is $\Sigma(M)$(when M is an empty set,$\Sigma(M) = 0$is specified). Given the non-empty finite set $ A \subseteq \mathbb{N}^* $, if for any positive integer $ i \leq \Sigma(A) $, there are always two distinct subsets P, Q of A such that $ i = \Sigma(P) - \Sigma(Q) $, then A is said to be an ideal set. The positive integer $ r \geq3 $is known, and the set $ T_r = \{t_1, t_2, \cdots, t_r\} $is an ideal set. Then the maximum value of $\Sigma(T_r)$is ().		\frac{3^r - 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math_596	OPEN_OnlyTxt	Let n be a positive integer and let the set $ A_n = \left\{ \alpha \mid \alpha = (a_1, a_2, \cdots, a_n),| a_i|\leq1, i = 1, 2, \cdots, n \right\} $, for 2 elements in the set $ A_n $$$ \alpha =(x_1, x_2, \cdots, x_n), \beta = (y_1, y_2, \cdots, y_n) $, if $x_1 + x_2 + \cdots + x_n + y_1 + y_2 + \cdots + y_n = 0 $, then $ \alpha, \beta $is said to have property M. Remember that $ S = x_1 + x_2 + \cdots + x_n, T_i = x_i + y_i (i = 1, 2, \cdots, n), M(\alpha, \beta) $is $|S|, |T_i| The minimum value in (i = 1, 2, \cdots, n) $. Given an odd number of n not less than 3, find the maximum value of $ M(\alpha,\beta) $for any 2 elements $ \alpha, \beta $in the set $ A_n $with property M.		\frac{2n}{n+3}	math	集合与常用逻辑用语	['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math_597	MCQ	If $k \in \mathbb{Z}$, then the functional graph of the function $f(x) = x^k e^x$may be ()	['A. <image_1>', 'B. <image_2>', 'C. <image_3>', 'D. <image_4>']	BCD	math	函数与导数	['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', 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'math_597_2.jpg', 'math_597_3.jpg', 'math_597_4.jpg']
math_598	MCQ	As shown in the figure<image_1>, the straight line coincides with the bottom edge of the equilateral line $ABC$in its initial position, and then begins to rotate at a constant speed around the point $A$in a counterclockwise direction on the plane (the rotation angle does not exceed $60^\circ$). The area of the shaded part in the triangle it sweeps,$S$, is a function of time $t$. The graph of this function is roughly ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	C	math	函数与导数	['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math_599	OPEN_OnlyTxt	Given the function $f(x) = ax^2 +| 2x^2 - ax + 1| $has and only 2 zeros, then the value range of the real number $a$is ()		(-2-2\sqrt{3}, -2) \cup (-2, 2-2\sqrt{3})	math	函数与导数	['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math_600	MCQ_OnlyTxt	It is known that the odd function $f(x)$defined on $\mathbb{R}$satisfies $f(x) = f(2-x)$, and $f'(1) =-1 $. When $x \in [1,2)$,$f(x) = \log_2(x-1) + x$, then the number of roots of the equation $f(x)\left[f(x) + \frac{1}{x}\right] = 0$on the interval $[-2,4]$is ()	['A. 9', 'B. 10', 'C. 17', 'D. 12']	C	math	函数与导数	['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math_601	MCQ_OnlyTxt	"Known function $f(x) = 
\begin{cases} 
\frac{1}{e^{|\ln(x)|}}, & x \in (0, +\infty) \\
\ln(1-x), & x \in (-\infty, 0]
\end{cases}$, then the following statements are correct ()
① The function $f(x)$has two extreme points;
② If the equation $f(x) = t$with respect to $x$has exactly 1 solution, then $t > 1$;
③ The image of the function $f(x)$has and only one intersection point with the line $x + y + c = 0 (c \in \mathbb{R})$;
④ If $f(x_1) = f(x_2) = f(x_3)$, and $x_1 < x_2 < x_3$, then $(1-x_1)(x_2 + x_3)$has no maximum value."	['A. ①', 'B. ②', 'C. ③', 'D. 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math_602	OPEN_OnlyTxt	Given that O is the origin of coordinates, the ellipse is $C: \frac{x^2}{a^2} + \frac{y^2}{b^2} = 1 The left and right focuses of (a > b > 0)$are $F_1$,$F_2$respectively,$A$is the upper vertex of the ellipse $C$, and $\triangle AF_1F_2$is an isosceles right triangle with an area of 1. The line $l$intersects the ellipse $C$at the two points $P$and $Q$, and the point $W$is on the line passing through the origin and parallel to $l$. Remember the line $WP$. The slopes of $WQ$are $k_1$,$k_2$, and the area of $\triangle WPQ$is $S$. If $k_1k_2 = -\frac{1}{2}$and $W$is the origin $O$, then $S = 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math_603	OPEN	"<image_1>The curve synthesized from the semi-ellipse $\frac{x^2}{a^2} + \frac{y^2}{b^2} = 1 (x \geq0)$and the semi-ellipse $\frac{y^2}{b^2} + \frac{x^2}{c^2} = 1 (x < 0)$is called a ""fruit circle"", where $a^2 = b^2 + c^2$,$a > b > c > 0$. As shown in the figure,$F$,$F_1$, and $F_2$are the focus of the corresponding ellipse. $A_1$,$A_2$and $B_1$,$B_2$are the intersection points of the ""fruit circle"" and the $x$,$y$axes respectively. The line segment connecting any two points on the ""fruit circle"" is called the chord of the ""fruit circle"". Is there a straight line with a slope of a fixed value of $k$, so that the midpoint of the chord obtained by the ""fruit circle"" cutting the line always falls on a certain ellipse? If it exists, find all possible values of $k$; if it does not exist, explain the reasons."		"When the slope is $k=0$, the midpoint of the chord obtained from the ""fruit circle"" truncation line always falls on an ellipse; when the slope is $k \neq 0$, the midpoint of the chord obtained from the ""fruit circle"" truncation line cannot always fall on an ellipse."	math	平面解析几何	['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math_604	MCQ	As shown in the figure<image_1>, it is known that the upper and lower bottom sides of the regular triangular frustum $ABC-A_1B_1C_1$are 2 and 3 respectively, the length of the side edges is 1, and the point $P$moves in the side face $BCC_1B_1$(including the boundary). If the tangent value of the angle formed by straight line $AP$and plane $BCC_1B_1$is $\sqrt{6}$, then ()	['A. There are points $P$and $Q\\in B_1C_1$, such that $AP//A_1Q$', 'B. Place a sphere in this triangular frustum with a maximum volume of $\\frac{\\sqrt{6}\\pi}{8}$', 'C. The value range for the length of the segment $CP$is $[\\sqrt{3}-1,\\sqrt 7}]$', 'D. The area of the surface formed by all moving line segments $AP$that meet the conditions is $\\frac{\\sqrt{7}\\pi}{3}$']	ACD	math	空间向量与立体几何	['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math_605	MCQ_OnlyTxt	In the spatial rectangular coordinate system, the points $A(1,1,1), B(0,2,0), D(-1,-1,5)$are known. If the distance from point $D$to plane $ABC$is $\sqrt{14}$, then the coordinates of point $C$can be ()	['A. $(2,3,-1)$', 'B. $(2,-3,1)$', 'C. $(-2,3,1)$', 'D. $(2,3,1)$']	D	math	空间向量与立体几何	['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kd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/B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KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_606	OPEN	As shown in the figure<image_1>, in the tetrahedron $ABCD$,$AC \perp BC$,$AC = 2\sqrt{2}$,$BC = 4$,$CD = BD = 2\sqrt{3}$,$\cos \angle ABD = \frac{\sqrt{2}}{6}$,$E$,$F$, and $G$are the midpoints of edges $BC$,$AD$, and $CD$respectively, and point $H$is on line segment $AB$. Find the range of the angle between plane $AEG$and plane $CDH$.		$\left[\frac{\pi}{4}, \frac{\pi}{2}\right]$	math	空间向量与立体几何	['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']	['math_606.jpg']
math_607	OPEN_OnlyTxt	"The function $f(x) = e^{ax-1} - x - a (a > 0)$is known. If the two zeros of the function $f(x)$are $x_1, x_2$, respectively, and $x_1 < x_2$, then $x_2$decreases with the increase of $a$. Is this correct (fill in ""Yes"" or ""No"")?"		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eEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMMcX2hrUS+bHJFjJaNuT05wSc9vfwSvqP4NfadL+DN1dauGjsw1xcQ+YOlvsBJ+mQ5/GvlygD6b/aA/5JbpX/AGEIf/RMlfMlfT3x3he8+ElhcQKXiiu7eZ2A4CGN1B/Nl/OvmGgD1r9nf/kpFx/2DZf/AEOOsX42/wDJXtd/7d//AERHW1+zv/yUi4/7Bsv/AKHHWL8bf+Sva7/27/8AoiOgDuv2Z/8Aj88Sf9c7f+cleTePWZ/iJ4lLHJ/tS5H4CVhXrP7M/wDx+eJP+udv/OSvJfHf/JQvEv8A2Fbr/wBGtQBz9fTXwP8A+SOar/18XP8A6KSvmWvpr4H/APJHNV/6+bn/ANFJQB8y19SfH0O/wstmhP7sXsJbH93Y+P1Ir5br6v0xLb4q/A2OyWRTdm1WBiT/AKu5iAwT6ZIB+jUAfKFFWtS0290fUJrDUbaS2uoW2yRSLgg/4e/er3hrw1qfizWoNL0u3eWWRhvcD5Yl7sx7Af8A1utAH0R4ZSSP9mCcSnLHSb1h9CZSP0xXy/X2Z4j0y00X4PazpdiQbez0eeBTnJ+WNgc++c596+M6APoX9nWUJ4Z8Tc/dkRv/ABxv8K+eq29G8H+IvENo91pGjXd5bo/ltJDHlQ2AcZ9cEfnWM6NHIyOpV1JBB7EUANooooAKKKKACiiigAooooAKKKKACtnwnrz+GPFmma0iswtJ1d0U4LJ0ZR9VJH41jUUAes/FP4vWvjvQrXStOsbq0iSfzpjMV+fAIUDB9yfwFeTUUUAeh/Cn4kRfD6+1E3lrPc2d5EoMcJGRIp4PPbDN+lZXxI8Zjx14vk1aKGSG2WFIYIpSCyqBk5xx94sfxrkaKACvWfD/AMWNM0f4SXXg+XTruS6mtbqAToV2Ay78HrnjcM15NRQAV6zrHxY0zUvg/H4Mj067S7S1t4PPYr5eY3Rieuedh/OvJqKACvWdY+LGmal8H4/BkenXaXaWtvB57FfLzG6MT1zzsP515NRQAUUUUAFem/Cf4maf8PYdVS+sbq6N60RTyCo27A2c5P8AtCvMqKALmrXi6hrF9eopVLi4klVW6gMxOD+dU6KKACvbvAXx4j8O+F4NI1uxu72S1+SCaFlz5X8Ktk9R0Htj0rxGigDf8b6/B4o8ZalrVtDJDDdyB1jkxuXCgc4+lYFFFAHVeDPiDr/gW5eTSp1a3lOZbWcFonPrjIwfcEGvX7f9oTw1qlkkPiPwzOx/iSNY7iPPqA5WvnaigD6NX4zfDPS3WbTPC0qzjkNDp8ERB+u7Nch4v+P2u63BNZaLbrpNrICplDl5yPZuAv4DI9a8hooAUksSSSSeST3pKKKACvXdF+Lml6Z8IpfB0mnXj3b2VzbCdSuzMpcg9c4G8flXkVFABRRRQAUUUUAafh3UotG8TaVqk0bSRWd5DcOiYywRwxAz34r1HxR8dbi88T6TrHh22ntVs4pIp4LrBWdWKkg4P+yOeorxuigD6E/4XJ8OfECpP4k8Ik3uPmZ7SG4A9g5IY/lTdQ+P3h/R9Maz8H+GzC2Pk86JIIkPrsQnd+Yr59ooAv6zrOoeINWuNU1S5e4u523O7foAOwA4AHSqKsyMGVirA5BBwQaSigD3Dwj+0FNZ6cmneK9OfUY1XZ9qhIMjr0+dW4Y++RnvnrWuvxU+EdrKLy38IkXOdwKaXAGU+ud3H1FfPFFAHq3j/wCN+p+LLGTStLtjpmmyArN8+6WZfQnGFHqB19ccV5TRRQAUUUUAanh7xBqHhfXLbV9MlEd1btkZGVYHgqw7gjivebf49+ENc01LfxP4enL9WiMMdzCT6jcQf0r5yooA98u/jf4S0CzmTwV4TS3upAQZZLeOBB6EhCS/0OPrWD4V+M6aX4W12w1y2vNQ1HVJ5pjcKVC/PGqAH0A29hwK8hooAfDNJbzxzwyNHLGwdHU4KsDkEH1r3XQ/j9YXejLpnjTQjfgKFkmhRJFm92jfAB+h/AV4PRQB9BRfE/4R6VOt3p3hFzdKdyMmnwqUPqCW4/CuA+I3xZ1Px6q2KQCw0mN9626uWaQ9i7d8dgBgZ78GvPKKAFVmRgysVYHIIOCDXt/hH9oKaz05NO8V6c+oxquz7VCQZHXp86twx98jPfPWvD6KAPodfip8I7WUXlv4RIuc7gU0uAMp9c7uPqK47x/8b9T8WWMmlaXbHTNNkBWb590sy+hOMKPUDr644rymigArvfh58VNW8AyNbpGL3SpW3SWkjFdp7sjfwn14IP61wVFAH0VcfF/4Xa4Rdaz4Vklu8fM0+nwysfYNuyR9cVheJPjvbR6O+k+B9G/smFxj7Q0aRsgPXZGmVB98n6V4lRQB6vqvxY0/Uvg+ng1tPu/tot4YjcMy7MxurZ656LXlFFFABRRRQB6z8K/ixpngHw/eade6dd3Mk90Zw0JUADYq45PX5a8moooA9Z8P/FjTNH+El14Pl067kuprW6gE6FdgMu/B6543DNeTUUUAFes+LPixpniD4YWnhWDTruK5hit0MzldhMYAPQ55xXk1FABRRRQAV1HgLxteeA/Ea6pbRCeJ0MVxbs20SoeevYggEGuXooA+ir/41/DfVyl3qnhO4vLxBhTcWNvKR7BmbOK8b8eeIdM8T+KZdT0nTRp1o0aIsAVV5UYzheK5migD0z4efGTVfBNsumXUH9o6SCSkTPtkhz12Nzx32n8Mc13s/wAWfhRqkpvdR8JtLdnlmm02B2Y/727n8a+dqKAPdfEf7Qca6Y2neDtHNguzalxOqL5Q/wBmNcrn3Jx7V4dPPLdXEtxcSPLNKxeSRzlmYnJJPc5qOigD2vwd8ejYaNHo/ivTZNTt0TyxcRlWdk7K6Nw3HfI989a1f+FkfBy3cXcPg4tODkKNNhGD9C2B+FfP9FAHqvxD+NV94u0+TRtLtP7O0p8CTLZlmUfwnHCr7DPTrjivKqKKAPc/Bfx2sLHwzDoXirS57yOCIQLNCqSebGBgB0cgcDAzk59PWl4t+Jfw/wBQ8MajpWgeEFtLi6j2pcfYoIdhyDn5ST2rxmigDtPhh40tPAniqXVr21nuYntXgCQkbsllOee3y1Q8f+Jbfxf431HXbWCWCG68vbHLjcNsaoc446rXNUUAej/Cf4jWHw+n1WS+srm6F4sQQQFfl2ls5yf9quL8RalHrPifVtUiRo4728muER+qh3LAH35rMooAK9Z+H3xY0zwf4GvNButOu5555ZXWSIrtAdFUZyc9q8mooAK6zwJ8QdY8Bak9xp5Wa1mwLi0lJ2SAd/Zh2P8AOuTr6P8Ag/rfh3xZ4Dm8GanHbxXwieGRAqo1xETkMp7sv58A0ARzfHPwDrluh8QeFbieZR9yW1huVX2BZh/IVi6z8erGy0ySw8EeHY9M8wcTyRxpsPqI0yCfcn8DVLWv2dfEdteP/Y97ZXtoSdnmuYpAPQjGPxB/AVc8N/s56rJfJJ4j1G1gs1ILRWjF5H9skAL9efpQB2OjyzQ/sz3lzqEzST3On3krySHJZpXkIJJ6k7h+dfL1e8/G3x/pi6PH4I8PSRNBHsW7aA/u41TG2JfXBAJx02geuPBqAPXvhb8XNL8B+F59KvdOvLmWW8e4DwlcAFEXHJ6/Ka8nu5hcXk86ggSSM4B7ZOahooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAClR2jdXRirKchgcEH1pKKAOtsvih430+MRweJb8qOnnOJcfi4NV9V+IXi7WoGgv/ABDfywsMNGsuxWHoQuAR9a5qigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoooo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math_608	OPEN_OnlyTxt	"The function $f(x) = 1 - \ln x - \frac{a}{x} (a \in \mathbb{R})$is known. If $f(x)$has two zeros $x_1, x_2$, and $x_1 < x_2$, then: $x_1x_2^2 < e - a$. Whether the statement is correct ()(fill in ""yes"" or ""no"")."		is	math	函数与导数	['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math_609	OPEN_OnlyTxt	"In the planar rectangular coordinate system $xOy$, the rectangular vertex $A$of $Rt\triangle OAB$is on the $x$axis, and the other vertex $B$is on the image of the function $f(x) = \frac{\ln x}{x}$. Given that the function $g(x) = \frac{e^{ax^2} - ex + ax^2 - 1}{x}$, the equation $f(x) = g(x)$about $x$has two unequal real roots $x_1, x_2 (x_1 < x_2)$. Then: $x_1^2 + x_2^2 < \frac{2}{e}$. Whether the statement is correct ()(fill in ""yes"" or ""no"")."		no	math	函数与导数	['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math_610	OPEN_OnlyTxt	The inequality $e^{2x} +3a^2x\geq ae^x(3 + x)$holds for any $x \in [1, +\infty)$, then the range of values for the real number $a$is ()		\left(-\infty, \frac{e}{3}\right] \cup \left\{\frac{e^3}{3}\right\}	math	函数与导数	['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math_611	OPEN_OnlyTxt	Let the parabolic equation be $y^2=2px$, and find the trajectory equation of the center of the regular triangle inscribed in the parabola.		9y^2 = 2px - 8p^2	math	平面解析几何	['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math_612	OPEN_OnlyTxt	"There are $n(n\geq3)$countries participating in an international conference and voting is required for decision-making. Voting can only be for or against. The number of votes for each country is a positive integer, and the total number of votes for all countries is $10n+1$. In order to prevent one country from becoming dominant, no country has a number of votes greater than $5n$. We call a country ""non-existent"". If the country's choice will not change the outcome no matter how other countries vote, otherwise we call it ""having a sense of existence."" If one vote from one country (vote>1) is transferred to another country, it is called a ""balance."" Question: At least how many balances does it take to ensure that every country has a sense of presence?"		n+2	math	计数原理与概率统计	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+d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math_613	OPEN_OnlyTxt	In the regular quadrangular prism $ABCD-A_1B_1C_1D_1$,$AA_1=4$,$AB=\sqrt{3}$, point $N$is a moving point (excluding boundaries) on the side surface $BCC_1B_1$, and satisfies $D_1N \perp CN$. Record the angle formed by the straight line $D_1N$and the plane $BCC_1B_1$as $\theta$, then the value range of $\tan \theta$is ().		\left(\frac{\sqrt{3}}{4}, \frac{1}{2}\right) \cup \left(\frac{\sqrt{3}}{2}, +\infty\right)	math	空间向量与立体几何	['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xkd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4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fZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/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math_614	OPEN_OnlyTxt	It is known that the complex number $z_1, z_2$satisfies the condition $|z_1| =2, |z_2| =3, 3z_1-2z_2=2-i$, find the value of $z_1z_2$.		-\frac{18}{5} + 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math_615	OPEN_OnlyTxt	It is known that the function f(x) = x^2(\ln x - m) achieves a minimum at x = \sqrt{e}. If f(x) \geq \lambda(x - e), find the value of\lambda.		e	math	函数与导数	['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math_616	OPEN	Figure 1 <image_1>is a square $ABCD$with a side length of $\sqrt{2}$. Fold $\triangle ACD$along $AC$to obtain <image_2>the triangular pyramid $P-ABC$shown in Figure 2, and $PB=\sqrt{2}$. Whether there is a point $M$on edge $PA$such that the cosine of the angle between plane $ABC$and plane $MBC$is $\frac{\sqrt{6}}{3}$, if it exists, indicating the position of point $M$; if it does not exist, please explain the reason.		Existence, point $M$ is the trisection point of line segment $AP$ close to 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math_617	OPEN	As shown in the figure<image_1>, in the quadrangular pyramid $S-ABCD$, the quadrangular $$is a rectangle,$\triangle SAD$is an equilateral triangle, and the projection of $S$on the plane $ABCD$is the midpoint of $AD $$,$AB=1$,$V_{S-ABCD}=\frac{2}{3}\sqrt{3}$. Whether there is a point $M$on the edge $SC$, so that the cosine value of the angle formed by the straight line $SC$and the plane $PMB$is $\frac{1}{5}$. If it exists, find the position of the point $M$and prove it. If it does not exist, please explain the reasons.		When there is a point $M$,$\overline{CM}=\frac{3}{10}\overline{CS}$or $\overline{CM}=\frac{1}{2}\overline{CS}$, make the cosine of the angle formed by line $SC$and plane $PMB$\frac{1}{5}$.	math	空间向量与立体几何	['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math_618	OPEN	The <image_1>geometric body shown in Figure 1 is a star-shaped regular polyhedron, called a star-shaped dodecahedron. It consists of 6 pairs (12) of parallel five-pointed faces. The angular relationship of each pair of parallel five-pointed faces is as shown in Figure 2<image_2>. The ratio of the surface area of the geometry obtained by cutting off all stars along its bottom surface to the star dodecahedron is (). (Reference data: $\tan^2 18^\circ = 1 - \frac{2\sqrt{5}}{5}$)		1 : \sqrt{5}	math	三角函数与解三角形	['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'math_618_2.jpg']
math_619	OPEN_OnlyTxt	Given \sin(2\alpha - \frac{\pi}{12} - \frac{\pi}{3}) = \frac{\sqrt{2}}{3}, find \tan(\alpha + \frac{\pi}{3})\tan(\alpha + \frac{\pi}{12}) = ( )		5	math	三角函数与解三角形	['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math_620	OPEN_OnlyTxt	It is known that f(x) = 2\cos(\omega x + \frac{3\pi}{4}), where\omega > 0. If f(\frac{\pi}{4}) = 0 and the function y = f(x) has a minimum but no maximum in (\frac{\pi}{4}, \frac{\pi}{3}), find the value of\omega.		7 or 15	math	三角函数与解三角形	['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math_621	MCQ_OnlyTxt	Let the function $f(x)=2\sin\left(\omega x-\frac{\pi}{6}\right)-1(\omega>0)$have at least two different zeroes on $[\pi,2\pi]$, then the value range of the real number $\omega$is ()	['A. $\\left[\\frac{3}{2},+\\infty\\right)$', 'B. $\\left[\\frac{3}{2},\\frac{7}{3}\\right]\\cup\\left[\\frac{5}{2},+\\infty\\right)$', 'C. $\\left[\\frac{13}{6},3\\right]\\cup\\left[\\frac{19}{6},+\\infty\\right)$', 'D. $\\left[\\frac{1}{2},+\\infty\\right)$']	A	math	三角函数与解三角形	['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']	['img_for_onlytxt.jpg']
math_622	OPEN_OnlyTxt	If the function $f(x) = \sin(\omega x + \frac{\pi}{3}) (\omega > 0)$has at least two zeros in the interval $(\frac{\pi}{2}, \pi)$, then the range of the real number $\omega$is ().		\left( \frac{8}{3}, \frac{10}{3} \right) \cup \left( \frac{11}{3}, +\infty \right)	math	三角函数与解三角形	['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math_623	OPEN	<image_1>It is known that in $\triangle ABC$, the three points $M$,$N$, and $P$are on edges $AB,BC, and CA$respectively, then the circumscribed circles of $\triangle AMP$,$\triangle BMN$, and $\triangle CNP$intersect at a point $O$, which is called a Mik point. In trapezoid $ABCD$,$B=C=60°$,$AB=2AD=2$,$M$is the midpoint of the edge of $CD$, the moving point $P$is on the edge of $BC$, and the circumscribed circle of $\triangle ABP$and $CMP$intersects at point $Q$(different from point $P$), then the minimum value of $BQ$is ()		\sqrt{7}-1	math	三角函数与解三角形	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADYAQUDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACkJCgknAHUmlrktYvofFF/ceFtN1NYvLjD6hPA6l0Q5AjAOeWwc+g46sKAMey8U32t/Fq2sId0ejw6dLcRDoZyX2eYR/d4O31Bz3Fei15X4WaEfGvWYn1ZL17bSobeNj5anltxUBABxivVKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKhu7u2sLSW7u544LeJS8ksjBVUDuSaAJqo3lzpejwPe3ktpZxDhppSsY/M1zI1zXvFZ2+HIRp2lMP8AkLXkWXk94Yj1H+0+B7Guf8QeE9ON5Z+H4ZJtT8RagC02o37ec9rbA/vJFB+VCfuqAByfagDok8deHJsy6NZ3erOpI3abYM4z6eZgL/49S/8ACY65Jzb+A9aZfWWW3jP5GSql1okngOVNW8OWryaUqKmoaZF3RQB58Y/vgDkfxD3rs9Pv7TVLCC+sZ0ntp0DxyIchgaAOYHjTV4j/AKX4G16Ne5hMEuPwElTr8QvD0bImoXFxpUjnATUrZ7fn/eYbT+BrqajmgiuYWhniSWJxhkdQwI9waACCeG6gSe3lSWJxlZI2DKw9QR1qSuSuvANlDIbnw7dT6BeZ3FrI/uXP+3CfkP5A+9Rx+LL/AEG4W08YWsVtEzBIdWtsm1kJ6B88xMffI96AOxopFYMoZSCCMgjvS0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBT1TVLPRtMn1C/mWG2gXc7n+Q9SegHeuVsNGvPF93FrPiWB4bBG32GjvwFHaScfxP6L0X60lpH/AMJx4kOozBX8P6TMUskzxdXK8NKfVVPC++T6V29AGfrOr2fh/RrnUr1tltbJuIUZJ9FUdyTgAe9ZHg/SbuCG51vVx/xONUYSzL/zwjH+rhHso6+pJNUM/wDCZ+MMKxOh6FNzx8tzeD+axg/99H2rtqACuGvYJvAOoy6rZRvJ4buXL39pGufsbnrNGB/CT95R0+8O9dzSMquhR1DKwwQRkEUAMhniuYEngkSWKRQyOjAqwPQgjqKkrhBv+HeoBTubwndSYXAz/ZsjHofSEn/vkn0Nd0rBlDKQVIyCO9AC1HcW8N3byW9xEksMilXjdQysPQg1JRQBwjpc/DqXzIzLc+E3b95GcvJppJ6qerReo6r16V3EUsc0SSxOrxuAyspyGB6EGlkjSWNo5FV0YEMrDII9DXF6Nu8G+Ik8Nyt/xJr4s+kuxJ8lxy9uT6fxL7ZHagDtqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuY8cahdQaRDpenEjUdXnFlAw6xhsmST/gKBj9cV09chFv1X4p3DtzbaLYLGg/6bTklj+CIo/H3oA6TTNNtdI0u206yjEdtbRiONR2AH86w/GGsXVtDbaLpDEazqjGK3cDPkIPvzN7KPzJAre1C/ttL064v7yURW1vGZJHPZQMmub8H2N1eTXPirVY5I7/UlCwQSdbW2BykfsT95vc+1AG9oukWuhaPa6ZZqRBbptBY5LHqWJ7kkkk+pq/RRQAUUUUARXFvDd20lvcRJLDKpR43GVZT1BFcXYXE3gTUodGv5Hk8PXL7NOu35+yMekEjf3T/AAsfoe1dzVXUdOtNW0+ewv4EntZ0KSRuOGFAFqiuM0XULvwvqsPhnW5nmtpjt0rUX/5aj/nhIf8AnoB0P8QHqK7OgArE8V6Idf0Ce1iIS8jIns5u8U6cow/Hg+xNbdFAGR4Y1r/hIPDllqTReTNKmJoj/wAs5VJV1/BgRWvXIeG1fS/GviXRyf3Ezx6nbj0EoKyD/vtCfx966+gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOM1zxlcaN8QdD8PeTBJb6mG3Pgh4sA7e+Dkg/lW14q8SWnhTw9daveAssKEpGv3pGwSFH5fgAT2rznxgoTUtJ8VTyKqL4nhgV2OBHbqGiOT2G8O3/AqPiCJvEml2KMNkmuXsVhpkRzmO3JDSTMPVgv4LgdzQB6F4R1PU9a8N2WqapBb20t3EsywQ5OxW5GSepxg+1UfBb/AGq88T3p+9LrEsWfaJUjH/oBrp7eCO2tooIl2xxIEUegAwK8z0vW7jR/D+r2lhH52s33iG+trKL/AGzKxLt/sop3H6e9AG3qX/FY+Kxoybjo2kyLNqDD7txP1SD3C8O3/ARXa1leHdDg8O6LBp8LtKy5eaZ+WmkY5Z29ycmtWgAooooAKKKKACiiigChrWjWWv6XNp1/F5kEg7HDIw6Mp7MDyDWB4e1m907Ux4X8Qy779VLWN7jC30S9/aRR94fiOK66snxDoFp4j0w2lyXjdWEkFxEcSQSD7rqexH69KANaiuX8NeILqS8l8P68Ei1y1XduUYS7izgSp/UdjXUUAcnqDi1+KGiP/wA/mnXNufcq0bj/ANm/OtrVPEOi6I0a6rq1lYtIMoLmdY930yRmsHxAC3xI8Hheqresfp5QH8yKwviHfW9z488I6Ncq72lvM2qXISFpSBGMRkhQTjcT2xQB3uma9pGtb/7L1Syvdn3/ALNOsm364JxWhXnC2k/iP4o6Rrul2M9ppem280dxdzQNAbouMBFVgGZR1zjFej0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFR3ETTQPGk0kLMMCSPG5fpkEfpUlNd1jRndgqKMlmOABQBgDwbpb+H7bRLvzb2ytpUlRbghiSrbgGIA3DPXPXJzVPxJo2iR6vY+I9Y1qWzfTtxti80aRpuGDgFeSRx3NQzeJdU8Syy2fhCKMW6nbJrNypMCnuIl6yn34X3NX9L8E6ZZXq6lfNLquqgf8ft83mMv+4v3Yx7KBQBQbx5Jd200+iaBf3ltCpZry7xZ2+0DJbdJ8xHuFNeVeCLnxJrPxL1C5Uw6NPfxm5tzNavcrEsnzHZ8yhS4XdlsZx+Fep+IS3irxBH4UhDf2dbhbjV5VOAV6xwfVjyf9ke9P1OJNE+IWlagreVbarbNpkpHAWRcvCfqfnUfgKAMmy034mvqaw6jrEKWbOQbmzMIKrzg+W8Jz2/ip17H45s9SNvb32r3FvvCrdG0spEIOOSoZGAH07V03hwa9Zz3Wmaz/AKXFD81tqQKgzoSfldR0de5AweK6CgDzHW/E/jbwjfRwXFvb67AybzJb6ZcR9yMFk8xQeOmO4rV/4WVbacbRfEmj6ho/2tN8UrJ50RHHVk5XqPvKCO9dzSFVYYYAj3FAGbB4j0S501NRh1ayeydtqziddhb0znGeOlXLe8tbuEzW1zDNEDgvG4ZfzFcxrXw70fUpZbuxQabfyctLbopjlPbzIiNjj6jPuKyrS5tNCtX8N+LNE0+xs7w7fttlCI7K6Y4GGA/1bnA+9wccHtQB6GCCMg5FFYejeEtE8Pi4/sm0a1Fwu19kzkY9sk4PPUUaV4Yi0i8FxFqusTqFK+Td3zzR898Nk5/GgDcorz60vNW1HxRcf2Brd5qNlaTkXQuFiS2Dd4UcJuJHfAOO5zTYNe8W6n4x1LSLa70rT57MRyGxurZ5t8TAfOkquu4E56qMZAoA6jxL4dj1+0iMczWuo2r+bZXkf3oZP6qehXoRUHhjxHJqnn6bqcS2uu2OFu7cH5WB6SRnujdvToas6rP4ihuI/wCybHTrqDZ84uLp4X3Z7YRhjGK4f4k6ybFdJurG1L+LouYobGUSPGCBuR1wC8R6HgdjxQB0s7Lc/FCIgFxpujvIQvJ3SyAD8cRN+dZvhmz1S5+JXiDXdV0q6to5YYrXT3l2kCFeW6E4JbnFcx4F1nxN4uvNd1rSTpNhPeTxrL9rZ5pII0QBVWMbRj7xDE4OeldzF4W12Zc6j401JnPUWVvDAv6qx/WgDrKK5f8A4Q6ccr4s8RhvX7TGf0MZFQS6B4utG36Z4vE4H/LLU7FJA31aPYR+VAHX0VyD+J9e0Xb/AMJB4deSDo97pLGdF92jIDqPoGrodK1nTdctBdaZew3UOcFo2zg+hHUH2NAF6iiigAooooAKKKKACiiigAooooAjuLiG0tpLi4kWKGJS7u5wFUckk1xEUN18RJBcXPm23hQH9zbjKPqQ7O/cRei9W6njin3Qbx34gl0/k+G9MlxdMrcXtwv/ACy90Q43ep47Gu3ACqFAAA4AFADIIIraCOCCNIoY1CoiKAqgdAAOgrI8U68dA0czwQ/ab+dxBZWwODNM33V+nUk9gDW0zBFLMQFAySegri/DyN4r8QP4suEP2C3DW+jo3Rkzh58erEYH+yPegDa8LaAPD+jiGSTz76dzcXtwes0zcs307AdgBTvFOhr4h8P3FiG8ufiW2l7xTIdyN+DAfhmtmigDmdIu4PG/hCSDUYGhmYNa39uGKtDMv3gCORg4IPoQasaTJPoNha6fr2rw3FxJOYLSeT5XnGMqG7F8A5x1xWVr9rceGdbbxXpkDzW0qqmr2qclo16ToO7qOo7r9K3Ly00jxh4eCOyXdhdIJIpY26d1dGHRh1B7UAa9FYUOqWmh3Ol6Bf3lxLdTxbYLq4Xi4ZeqlhxvxzjvW7QAVDd2lvf2ktpdwRz28ylJI5FyrA9iKmooA4QPd/DudEleW68JuwVZGJZ9M7AMerRds9V+lWfifr0+ifDTVtT0+XExiVIpYz93ewXcCPZsg1180MdxC8M0ayRSKVdGGQwPUEV5lq9vp/hqyvfCniN5X8K6jG/9nzKpZrdupt+ASSMbk69CO1AHZ+DdGg0DwfpWmwKFWK3UsR/E5GWP4kk1x3hVv+Eg+L/iTxNC3/EssbddLilPSVwQzkH0BB/MVl6H4103U/Dy6Pf+ObTTo0Hkhmj8m7MI4AZ3OwOR1Kjjsc81rWEGneJ0j8M+FiIPCVlj7fdWzEfaX6+QrdSD1du+cZ5oA1pdZ1TxlcS2fhqc2WkRtsn1naCZSDhktweD6FzwO2az/Emm2/hzRx4e8MWjHXNeYxNclt82z/lrPI55OAe56sMV1+q6ppnhLQhNKqw20KrFBBEvLt0WNFHUnoBXHeEtH8Q3HxCvfEWuwy27PYqixbsxpvbIiX12Bck92c+goA19T8IPp1tYX/hcLBqel26wRxk4S7gUf6mQ+/UN2PPrW34e8QWviLTRdW4aOVGMdxbScSW8o+8jDsR+vWtauS8Q6NfafqR8T+HYt9+qhbyxBCrfxjt7SKPut+B4oA62is/Rdastf0uLULCXfDJkEEYZGHBVh2YHgitCgArmdY8G293ePqukXD6RrR63duOJsdpU6SD68+hrpqKAOY0PxPNLqJ0PX7ZLDWkBKBTmK7QdXhJ6j1U8iunrI8ReHrXxFp32ednhnjbzLa6i4kt5B0dD2P8APpVLwrrl3efadI1hFi1rTyFnA4WdD9yZP9lsfgQRQB0lFFFABRRRQAUUUUAFc34z1S8s9Mh0/SsHVtUlFra5/wCWeRl5D7IoLfXHrXSVx+kouufEDVdXZ99vpSDTbUdhIcNM31zsX/gJoA6HRdItdB0e10yyTbBboFGerHuxPck5JPqav0VleItch8PaLPqEqGV1wkMC/emkY4VF9ySKAMPxZNLr+pQ+DrJiEuE87VJkbBhts42A9mcjA9smutt7eK1t47eCNY4YlCIijAUAYAFYXhHQptI0+W51ArJrGoSfab+VeQZCOEX/AGVGFA9veuhoAKKKKAAjIwa4q50jUvCN9LqXhyBrvS5n8y80gHBQ95LfsD3KdD2wa7WigDAt7rw9460bA8u8tw4LwvlJIZFOQGHDIwP0NCeIzB4qbQ9RtDamcbtPuA25LlQuWXOPlcc/L3HIpuseD7DU75NTtpZ9N1aP7t7ZsEc+zj7sg9mBrOF94u0bI1TSYNdt4zlLvTiI5h7mFzgn/db8KAOyorzfwx8Trd7u60zxNK1hcROWhury3a1SZCeAQ+ArjoRnB6g12sXiPQ513Razp8gPdblD/WgDTrK8R6HD4i0O406WRoWcBoZ0+9DIDlXX3BwaJ/E+gWqlp9c02JR3e6Qf1rGm+I2htL5GlrfaxOeAmnWryr/33gJ+tAGNP4iN74NV2sLSXxV9pGleXJEp23fQtyPu4zJ9K2FvtH+H+iWOjQiS7v3GIrS3XfcXUh5ZyO2TkljwK84uRqusfGyBhDL4dMkWx3DJcHzjGSDj7iSmJcZ+bAFeuaD4W0vw8sj2sby3cxzNeXDmSeU/7TnnHsOPagDEttIv90vivxOguNQtoXktNOt8vFaAAnCj+OQ9C2PYVu+FRqv/AAjVlJrchfUpU82cbQNhY7tmB/dBC/hUGs6lfJ4i0TStPIX7RJJPdOU3BYIxyPYszKB+PpW/QAUUUUAcZrWnXfhjVJfE2hwPNbykHVdOiH+tUf8ALaMf89FHUfxD3xXU6dqNpq2nwX9jOk9tOgeORDkEH+vtVquG1C3m8CalNrOnxPJ4fuX36jZxLk2znrPGB/D/AH1H+960AdzRUdvcQ3dvHcW8qSwyKHSRDlWB6EGpKACuQ8bWklgLbxbYQs99pOTMidZ7U/61D64A3D3X3rr6R0WRGRwCrDBB7igCO2uIry1huYHDwzIJEYd1IyDUtcj4B86x0/UfD9wxZ9HvXt4iTyYGxJF+SOB+FddQAUUUUAFFFFAEF7dJZWFxdykCOCJpGJ7BRk/yrA+H1g1j4K09pf8Aj4vFN7OT1MkxMhz9N2PwpnxIuGtvh1rrKcGS1MI/4GQn/s1dHZwi2soIFGBHGqD8BigCbpXE6aP+Ey8VnWpAr6LpLtDpwzkTz9JJ/cD7q/8AAj6VZ8YX9zeT23hXSpdl/qKk3Eqnm1tRw7+xP3V9z7V0mn2FrpWnW9hZQrDbW8YjjjXoqjpQBZooooAKKKKACiiigAooooAq6jYRanp9xZys6LNG0ZeNtrrkYyp7GuX0fwnYQ2It/E+l6Fd3azGGG7a0jDXK4ypYEcP1BAz0zXZVm67oVl4h0x7G9Qlch45EOHicfddD2YHoaAG23hrQbJw9rommwMOhitUU/oK01VUGFUKPQDFY9jfJpK6bo2r6qlxqk8bCOV4/L+0FepHbdgjjPqcVs0AeRXfmf8I74m8UKu6ez8RC8jPcx25SMj/vgOPxr1uORZIlkU5VgGB9q4Lw7ZrqPw68QWDDJmudShf6tJJ/Qiri+JZdM+HOg38EAub69htILeFjgPJIFHPsBkn6UAavhbW5vEFvf35RBZC8khsmUcvEmFLE98uHI9sVvU2NFjjVFVVAH3VGAKdQAUUUUAFIyhlKsAQRgg96WigDhCH+HeoblDN4TupPmUDP9myMev8A1xJP/AT7V3SsroGRgysMgg5BFMngiuYJIJ41kikUo6MMhgeCCK4myml8AajFpV27P4auX2WFy2T9hc9IZD/cPRW7dD2oA7qiiigDkbKQ2vxX1W2H3b7S4Ln/AIFG7of0YflXXVx0nPxjt8fw6C+78Z1x/WuxoAKKKKACimTO0ULusbSMoyEUgE/mQK4u3+JljN4YXxJJo+qw6OWKm6ZYmCgNsLFVcttyOoBoAm+KX/JO9SPYPAT9POSuh1rWLTQdHudTvX2wQJuOOrHoFHqSSAB6msfx1Eur/DfWTbMJFksWniK/xbRvXH1wKyNLuB4/1u0u1KyaBpIR17i5vNoOfdY8/wDfR9qANnwfo91bw3OtauijWtUYSzgc+Sn8EI9lH5kk101FFABRRRQAUUUUAFFFFABRRRQAUUUUAZut6HY+ILD7JfxllDCSORG2vE46OjDlWHrVZfEdvF4mOg3cUttO6B7SWUjZdgD5th/vL3B579K26guLO2unhe4t4pWgfzIi6glG9R6GgDkfCgNle+MtMf8A5Y6i9yv+5NGrj9d1V/h7qUepaTpWmGySRNL0y0lNyxBKTPHwqjHBCHOc9GHrXK+JfFepeFvF+qPrFmtsLzSriFJocmKcxhmgYE9G+Z0KnuR6ivR/BWm22m+EtMENoLaSa1hedcYYv5arlvfAA/CgDoKKKKACiiigAooooAKr39ha6nYTWN7Ak9tOhSSNxkMD2qxRQBxWj3114T1SDw3rMzTWM7bNJ1B8kt/0wlP98fwn+ID1FdrVHWNHstd0ufTtQi8y3mGCAcFT2ZT2IPINcxpfiKbw3PLoXim5G+CJ5bPUH4W7gQZO49BIo6jv1FAFjS4/tfxO1696rZ2VtZKf9pt0rD8mT8662uN8IP8A2R4OvPEWsyCF7+SXVLkt/wAs425RfwjCDH4U3w9d654z08axLdzaPplwS1nbW6J50kX8LyOwON3UKoGB3NAHaUVy1jYeI11rUbe51iaTT40iNpK0KB2J3bwxCgEjC84HWigA+I2rPo3gHV7mEn7Q8PkQBfvGSQhFx75b9K8/1vT9U0TQvDHgzXntoPDl9JFYSy6fkzNJkEKxbgKTnJANd14z8Lar4nudLNtqVpbW2n3aXgimt2k82Rfu7sOvAyeKY3gu+1jxBYat4l1aK8XTpPOs7O0tjDCknZ23MxYjtyMUAdUtnBHp62MaBbdYvKVOwXGMflXlvgHwDol14de3nbU4Luxu57S4jh1GaNdySHBCqwAyu08etetVyCM+hfEiSNhix1+EOjdluolwR/wKPB/4AaAG/wDCs9B/5+Na/wDBtcf/ABdH/Cs9B/5+Na/8G1x/8XXY0UAcd/wrPQf+fjWv/Btcf/F0f8Kz0H/n41r/AMG1x/8AF12NFAHHf8Kz0H/n41r/AMG1x/8AF0f8Kz0H/n41r/wbXH/xddjRQBx3/Cs9B/5+Na/8G1x/8XR/wrPQf+fjWv8AwbXH/wAXXY0UAcd/wrPQf+fjWv8AwbXH/wAXR/wrPQf+fjWv/Btcf/F12NFAHHf8Kz0H/n41r/wbXH/xdMl+HHh2CMyS3mrxoOrPrFwAPx312lZviG4W18PX8zxJLtgbbG4BDsRhQQeuSQKAOdT4ceHZYhJHeau8Z5DLrFwR+e+mQ/D7wxcEiDUNUlI6hNZnbH5PWX8Ny3hO71zwVfzlo9LxeWs0nG63cZP4Bs/nXVeDLOCHw/HepapBLqLveyYUBiZGLAH3ClR+FAHBePvhxpL6ZY6XY3Gofb9SvUghNxfzTKgALu5RmwcKp/Eir/hPwjoWuaR/pEmtQajaOba+tzqtwPLlXrj5/unqD3BFbtjs8Q/Ea71EEvaaFEbKE/wtcSYaUj/dUIv1JqXxFpV9p2qjxToMRlvEQR31kGwL2Een/TRf4T9R3oAj/wCFZ6D/AM/Gtf8Ag2uP/i6P+FZ6D/z8a1/4Nrj/AOLrodF1qx1/TI7/AE+YSQvwQRhkYdVYdQw6EGtCgDjv+FZ6D/z8a1/4Nrj/AOLo/wCFZ6D/AM/Gtf8Ag2uP/i67GigDjv8AhWeg/wDPxrX/AINrj/4uj/hWeg/8/Gtf+Da4/wDi67GigDjv+FZ6D/z8a1/4Nrj/AOLo/wCFZ6D/AM/Gtf8Ag2uP/i67GigDjv8AhWeg/wDPxrX/AINrj/4uuT1rwDoWqeLNO8PWg1G4Fuy3uoST380qQxDhY8MxG5z+O0E13XiXxI+mvFpWlRLd69dg/ZrY/dQd5ZCPuoO/c9BVnwz4eTw/p7o8zXN/cuZ726f708p6n2A6AdgKAOb+MlndXHwr1SGxjdtnltIkY58tXUtgegAz9BXV6BeWN34c0+5sJY3sjbIY2QjaFCjj2x+laTKGUqwBBGCD3rnIvAXheG4eaLSIow7b2iRmWJj6mMHYfyoA3rW7hvYBPbvviJIVx0bBxkeo9+9FSqoVQqgADgAdqKAFooooAKw/FmhNr+hvBBKYb6B1ubOYf8s5kOUP0zwfYmtyigDG8L68viHRY7sxNBdRsYbu3b70My8Oh/Hp6gg1s1xuv2d14b1p/FelQyTwSKqatZx9ZIx0mQf31HUd1+ldVYX9rqlhBfWU6T206B45EOQwNAFiiiigAooooAKKKKACiiigArmvE1x9o1DSNL8q4aGW8SW5dIHZFSMF1BYDAy6oPzrpaKAPO/iL4a1DUNb0PUtJVt8rtpmoFB1tJfvE+wPPsSK6PxXrb6Fo6Q6dHHJqt2wttOtz0aQ9CR/dUfMfYVqatqtlomlz6jqEwhtYF3O5/IADuScADuTXPeGtMvdT1R/FWuQmK6lQx2Fm45soD6/9NG6t6cDtQBs+HNEj8P6Fbacj+Y6AtNKessrHLufcsSa1aKKAOV1bwtcxanJrnhq5Sx1SQg3MUgJt70DoJFHRvRxyPel03xvaPcpp+u276JqrHaLe7I2Sn1ik+64/HPtXU1V1DTLHVrRrTUbSG6t26xzIGX8jQBaorj38DTWDh/DniHUtJQdLYsLm3/BJMkfgRUzJ49twFjm8PXwH8UiTWxP1wXFAHVUVyX2n4gNwNK8OL/tG/mI/9FU57DxvfR7Jta0rTQepsrNpXH0aRsf+O0AdLdXdvZWz3N1PHBBGMvJIwVVHuTXJS+KdR8RubTwfbboGGH1m5Qi3j/65g8yt9Pl96sWvgDS/MSfWZ7vXbpW3CTUpfMVT/sxjCD/vnPvXVKqooVVCqBgADAAoAxvD3hm08PxzSI8l1qF0Q13fTnMs7DuT2A7KOBW1RRQAUUUUAFFFFABRRRQAUUUUAFcVd6VqPhC/l1Tw9btd6XO/mXukoeUPeSAf3vVOh7YNdrRQBn6Nrmna/p6Xum3KzQtwccMjd1ZTypHoa0K5nV/B8dxqJ1fRrt9J1jGGnhUGOf2mj6OPfqOxqmPGF/oISLxdpUlsudv9o2KtPbN7tgbo/wDgQx70AdlRVWx1Kx1S3E9heW91CeQ8EgcfmKtUAFFFFABRRVLUtX03R7cz6lf21pEBndNIEz9M9aALtZeu+IdO8O2QudQmK722RQoN0kznoqKOWNYB8Vax4iQp4T0t1hJx/aepI0UIHqkZw8n5Ae9aOi+EbbTb59VvriXVNZkGHvbnGUH92NB8sa+w/EmgChp2iah4h1OHXfE8IhS3cvp+k7tywHtJKRw0mO3Re3PNdjRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABQQCMEZBoooA5q/8BeHr68N6lm1jfHk3WnytbSE+pKEZ/HNV5fDPiO2A/srxndhR/BqNrHc/qNh/MmiigCMWvxGi4Gq+G5x/eksZkP6SUGz+IsvDav4dtx6x2Ern9ZKKKAJIvC2v3Kkat4yv5AeqafBHaj88M35EVb0zwN4e0q7+2R2AuL3r9rvHaeXPruckj8MUUUAdF0ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//9k=']	['math_623.jpg']
math_624	MCQ	As shown in the figure<image_1>, in a cube $ABCD-A_1B_1C_1D_1$with an edge length of 2,$M$is the midpoint of $B_1C_1$, then the following statements are correct ()	['A. If point $O$is the midpoint of $C_1D_1$, then $MO \\parallel$plane $A_1DB$', 'B. Connecting $BM$, the sine value of the angle between straight line $BM$and plane $BDD_1B_1$is $\\frac{\\sqrt{10}}{5}$', 'C. If point $N$is a moving point (including the end points) on line segment $BC$, then the minimum value of $MN + DN$is $\\sqrt{17}$', 'D. If point $Q$is within the lateral square $ADD_1A_1$(including the boundary) and $MQ \\perp AC$, then the trajectory length of point $Q$is $\\sqrt{5}$']	ACD	math	空间向量与立体几何	['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']	['math_624.jpg']
math_625	OPEN	As shown in the figure<image_1>, the isosceles trapezoid $ABCD$is the axial section of the truncated cone $OO_1$,$E$,$F$are points on the circumference of the upper and lower bottom surfaces respectively, and the four points $B$,$E$,$D$, and $F$are coplanar. It is known that $AD = 2$,$BC = 4$, and the volume of the quadrangular pyramid $C-BEDF$is 3. When the angle formed by the bus bar and the bottom surface is minimum, find the sine value of the dihedral angle $C-BF-D$.		\frac{\sqrt{3}}{3}	math	空间向量与立体几何	['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']	['math_625.jpg']
math_626	OPEN	As shown in the figure<image_1>, in the pentagonal pyramid $S-ABCDE$, plane $SAE \perp$Plane $AED$,$AE \perp ED$,$SE \perp AD$. The quadrangle $ABCD$is a rectangle, and $SE = AB = 1$,$AD = 3$, and $\overriding {BN} = 2\overriding {NC}$. Find the minimum value of the sine of the angle formed by straight line $DN$and plane $SAD$.		\frac{\sqrt{26}}{13}	math	空间向量与立体几何	['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math_627	OPEN	<image_1>In the triangular prism $ABC-A_1B_1C_1$, the side surface $ACC_1A_1 \perp$plane $ABC$,$CA = CB = 2CC_1 = 4$,$E, F$are the midpoints of $AC, A_1B_1$respectively. If $\cos \angle A_1AB \in \left(0, \frac{\sqrt{2}}{4}\right]$, find the range of sine values of the angle formed by $AB$and the plane $BCF$.		\left[\frac{1}{2}, \frac{\sqrt{6}}{4}\right]	math	空间向量与立体几何	['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math_628	MCQ_OnlyTxt	There is the following conclusion in the triangle: We know that the edges covered by the internal angles $A,B, and C$of $\triangle ABC$are $a,b, and c$respectively, and the point $P$is any point within $\triangle ABC$, then $S_{\triangle PBC}\cdot\overrightarrow{PA}+S_{\triangle PAC}\cdot\overrightarrow{PB}+S_{\triangle PAB}\cdot\overrightarrow{PC}=\vec{0}$. Based on the above conclusions, the following statements are correct ()	['A. If $P$is the center of gravity of $\\triangle ABC$, then $PA+PB+PC=0$', 'B. If $P$is the heart of $\\triangle ABC$, then $a\\cdot\\overriding {PA}+2b\\cdot\\overriding {PB}+3c\\cdot\\overriding {PC}=\\vec{0}$', 'C. If $\\overriding {AP}=\\frac{1}{4}\\overriding {AB}+\\frac{1}{2}\\overriding {AC}$, then $S_{\\triangle PBC}:S_{\\triangle PAC}: S_{\\triangle PAB}=1:1:2$', 'D. If \\( P \\) is the circumcenter of \\( \\triangle ABC \\) and \\( A = \\frac{\\pi}{3} \\), then \\( \\frac{\\sqrt{3}}{2}\\overrightarrow{PA}+\\sin\\angle APC\\cdot\\overrightarrow{PB}+\\sin\\left(\\frac{4\\pi}{3}-\\angle APC\\right)\\cdot\\overrightarrow{PC}=\\vec{0} \\)']	ACD	math	三角函数与解三角形	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFFT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math_629	OPEN	"<image_1> Please evaluate the following propositions based on the \""Benz Theorem\"":\n① If $P$ is the centroid of $\\triangle ABC$, then $\\overrightarrow{PA} + \\overrightarrow{PB} + \\overrightarrow{PC} = \\vec{0}$;② If $a\\overrightarrow{PA} + b\\overrightarrow{PB} + c\\overrightarrow{PC} = \\vec{0}$ holds, then $P$ is the incenter of $\\triangle ABC$;③ If $\\overrightarrow{AP} = \\frac{2}{5}\\overrightarrow{AB} + \\frac{1}{5}\\overrightarrow{AC}$, then the area ratio $S_{\\triangle ABP}:S_{\\triangle BPC} = 2:5$;④ If $P$ is the circumcenter of $\\triangle ABC$, $A = \\frac{\\pi}{4}$, and $\\overrightarrow{PA} = m\\overrightarrow{PB} + n\\overrightarrow{PC}$, then $m + n \\in [-\\sqrt{2}, 1)$;⑤If the internal angles $A$, $B$, $C$ of $\\triangle ABC$ correspond to sides $a$, $b$, $c$ respectively, with $\\cos A = \\frac{7}{8}$, and $O$ is the incenter of $\\triangle ABC$ such that $\\overrightarrow{AO} = x\\overrightarrow{AB} + y\\overrightarrow{AC}$, then the maximum value of $x + y$ is $\\frac{4}{5}$.Determine which propositions are correct ( )(fill in the numbers)."		①②④⑤	math	三角函数与解三角形	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADDAQgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAY80UTxpJIiNI21AzAFjgnA9TgE/hT68z8W3E0/ifwlrIkcWg1cW1ugb5WVkZTJj/aPT2APc16ZQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVg6/e3Rmg0u3sLySK6YLcXUSApFGevcHJ6cdM57VvVheKfF+j+D9MN7q1yEyD5cK8ySn0Ve/16DvQBzPjvw+y2+hjRdLu7iaz1K3uSsTEqsSH5h8zY6dBXoEMnmwJJsZNyg7XGCPYj1rG8IeIh4r8M2usC1e088yKYHOWQq7IQeBz8tblABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFVtQ1Cz0qxlvb+5jtraIZeWRsKorkPN1rx0cW7XOjeHT1mwUurwf7P/ADyQ+v3j7UAXNU8WXF1fy6L4Wt47/UkOJ7hyfs1p/vsPvN/sDn1xXKWXhS31vxoYLm4fVBprLJquoTjmef70cCDosa8MVHfaDnmuq1qe38H+H7bSPDtnDHfXj/ZtPtkGBvP3pG9lGWJPp71seHdDh8PaLBp8TtIy5eaZ/vTSMcu7H1JJNAGN8P2xp2r246W+sXiY9MyF/wD2auurj/BC+Vqfi2D+7rLv/wB9Rxt/WuwoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKQkKCSQAOSTQAtYPiDxVaaG8dpHFJfarOP9H0+35kk9z2VR3Y8Vl3Xia/8Q3cumeEArLGxS51iVcwQHuI/wDnq/0+UcZPatjw/wCGLHw+krxGS4vrg7rm9uG3zTN7t6egHAoAytP8K3eq30Wr+LZY7q5jbdbafHzbWnpwf9Y4/vkfQCurnnitbeS4nkWKGJS7u5wFUDJJPpUlcV4kdvFPiCLwlbsfsMIW41hx0MfVIM+rkZPT5R70AP8ACkEuv6rP4wvo3RZ08nS4JBzFbZ+/js0h+b6YFdlTURY0VEUKijAUDAAp1AHJeG/3XjjxhB2ae2nA/wB6BV/mhrra5PTT5PxR12P/AJ76daS/irSqf6V1lABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFc1rni1LG+GkaTatqmtuARaxNhYVP8cr9EX9T2FAGrrGtafoGnte6lcrBCDgZ5Lt2VQOWY9gK5cafrPjgiTV0m0nQDymnK22e6X/psR91T/cHPPJ7Vf0fwky6guteIbkanrOPkbGIbUf3YUPT/ePzH17V1NAENraW9jaxWtrDHDBEoWOONQqqB2AFTUUjMFUsxAAGST2oAxvFGvDw9oz3KR+fdyuILS3HWaZuFX+p9gab4U0FtB0fy7iXz9QuXNxe3H/PWZuWP0HQD0ArG0EHxb4kk8UTAnTLPdb6QvaTtJcY9yNq+wPrXa0AFFFFAHH8xfGA+k2hj81mP/xVdhXJ6iBD8UdDl/576bdxf98vE39TXWUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVFNcwW2PPmji3dN7AZ/Opa8++LJgutJ0jR3j8yTUdShiIEZdliU75GAAJ4C9vWgDt/wC07D/n9tv+/q/41arkZLTQvF1jq+kw6dD5cSCBpJbUoVkZc8BgDwCpyPWutUBVAHQDFAC0yaaK3heaaRI4kBZnc4Cj1JrM17xHp3h22SW8kZpZTtgtol3yzt/dRRyT/LvWBF4e1PxbMt54sQQaeDug0SN9yeoadh99v9kfKMd6AGvrWreM3a38NO1jpGdsusunzSeot1PX/fPHpmuj0Pw/p3h2yNtp8O3cd8srsWklY9WdjyxNaSIkaKiKFRRgKowAKdQAUUUUAFcf4tup9Yv4PB+nStHLdp5uoTxnm3tc4I9mf7o9sntW9r+tW/h7RbjUrkMyxD5Y0GWkcnCoo7kkgD61neENEuNOsp9Q1Pa+s6k/n3jjop/hjH+yg4H4nvQBu2trBZWkNrbRLFBCgSONBgKoGABU1FFABRRRQByXiM+V458HzdmmuoCf96Et/wCyV1tcf43bydU8JXH93WFTP+/HIv8AWuwoAKKMj1ooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuB1NdSvfiTpepPoeoHTdLtZhHIojO+ZyF4G/ptB5rvqr31/aaZZy3l9cR29vEu55JGwAKAMGO5vL/AFlLaDRL2wtHkFzd3kxRfNKgBUAViSTtXJOOFI71Bqvi+SfU5NB8LxRahrCcTyM37iyB6GVh1PX5RycdqqfaNa8dHFoZ9H8ON1uCNt1eL/sD/lkh/vH5j2xV25+H2ifZbYaVE2k3touLe8s/lkX/AHv+egJ6hs5yfWgCzoPhODS7p9Tvrh9S1qZcS3045Uf3Y16InsPxzXRVxkPinUfDkyWfjCBEhJCRaxbKfs8np5g6xN9fl68iuxjkSaNZI3V0YZVlOQR7GgB1FFFABRRXK+MdTumFt4c0iQpquqZXzF620A/1kp+gOB6sR6UAU7X/AIrPxgb9sNoeiSlLX0uLscO/uqZ2j/aye1dtVPStMtdG0u206yjEdvbxhEX2Hc+pPUmrlABRRRQAUVhav4x0DRHEV5qMX2g8Lbw5llY+yLlv0rM/4SDxRrBA0Tw59jgYcXesSeX+IiXLH6Hb+FADviAn+gaLP/zw1qzbP1kCf+zV1F20K2U7XIUwCNjIHHBXHOfbFeb+MtA1a38My6vrPiO6vZ7O4t7hLeBBBbrtmQnKDJbAz94muh+IdxenwXqFhplpd3N7eW5hjEELNgNhWJI4Hyk0AZPw28PadeeDIdRvtNtpJtRmlu/3kQO1XclQM9BtxgVd8D3so17xToiySSWOm3iLal2LFFdNxjBPOFOcemcVo2uovYaHb6fo+k3s80ECwwpLC0Ma4AALM+OB3xk+1T+FPDn/AAjunTCaYXGoXk7XV7cAYEkrdcDso4AHoKAN6iiigAooooAKKKKACiiigAooooAKKKKACignAyelcbd+KL7X7qXTPB4jl8tilxq0q7re3PdU/wCej+w4Hc9qANXX/FVloTRWoSS81O44t7C2G6WQ+voq+rHAFZlj4WvNYvYtW8XyR3E8bB7bTIzm2tT2P/TR/wDaPTsK1fD/AIXstAWWVGkutQn5ub64O6aY+57D0UYArboAKKKKAGSxRzxPFNGskbgqyOMhgexFcdJ4Y1TwzI114QmVrXq+iXLnyD6mJuTEfb7vPQV2lFAGDoPiyw1ySS02y2Wpw/66wul2TJ746Mv+0uRW9WPr3hjTPEMafa4mS5h5gu4G2TQn1RxyPp0NYQ1rW/CBEfiNG1LSR93V7aP54l/6bxj/ANDXj1AoA6nVNTtdG0u51G9kEdvbxmR2PoOw9SegHcmsDwdpt2/2jxJq8ZTVNUwwifrawD/Vwj6Dk9PmJ9K5jW/GPhzX/EVvDd6zZr4e01knkPmBvttxgFEQDJdUyGOO5UV0f/CVa3qrmPw/4ZufLP3b3VD9li9iEP7xh/wEfhQB19Y2r+LNC0I7NQ1KCOY/dgU75W+iLlj+ArI/4RXXdXAPiHxLcbM5NppQ+zR/QvzI35itnSPC+iaCCdM0y3t3P3pQuZG+rnLH8TQBi/8ACT+ItYUf8I/4akjiPH2vWH+zp9RGMufxApx8IapqsnmeIvEt5PE33rKw/wBFg+hKnzGH1auvooAy9H8OaNoERj0rTba0DfeaOMBm+rdT+JrUoooA5f4jx+b8OdfUdRZuw/AZ/pXQ2Uvn2NvMP441b8xWZ4wgNz4K12EDJfT5wPr5ZqXwxL5/hXSJc532cTfmgoA1aKKKACiiigAooooAKKKKACiiigAooooAKoavrOn6Dp732pXKQQJxlurHsAOpJ9BWVrvi2PT7waTpds2p65IuUtIjxGP70rdEX3PJ7A1DpHhKQ36a14juhqWrjmIbcQWeeqxJ+m48nHagCiLHWfHJD6os+keHzytiG2XN2OxlYcov+wOT3PauytLO2sLWO1s4I4LeJdqRRKFVR6ACpqKACiiigAorP1TXNK0SHztU1C2s0xkGaQLn6Z6/hXP/APCa3eqqy+GfD19f+lzdr9kt8eoZxub8FNAHYVmav4i0fQYfN1TUra1HZZJAGb2C9SfpWF/wj/inWdr614j+wRH71poybPzmfLH8Ataek+DfD+iTtcWWmxC6b71zKTLK31diW/WgDM/4TDUtVwPDnhu8uo26Xd8fskP1G4b2H0Wuc8X23iqSyisb3xHt1HVH8izsNKj8mMHqzvIcuUVck4K54HfFem3VzBZWkt1cyrFBCheR2OAqgZJNcp4Stp9Yv7jxhqMTRyXaeVp8D/8ALC1ByDjsz8MfwHagDk7Pwv4Z8LvFdeEfEekw6tbxqlzHd3CSx3JA5387o2J7rj6Gux8N+PNO12YWNwFsdUwf9HeRXSXHUxSD5ZB9OR3FYHgfWbR7rxJrktvfStqOpOITBYzSBoYv3aYZVK87SevermjeB01GbxDeeIbFBDqt4txb2hPz24VQofcp+WQ9TtP40Ad/RXE+d4j8GcXIn8QaEvPnqM3tuP8AaUcSqOORhuvBxXU6Vq+n63YJe6bdxXNu/R4znB9COx9jzQBdooooAKKKKAIbuEXNlPA3SSNkP4jFYXgCbz/h/oL9xYxIfqqgH9RXRnpXIfDJyfAtpGesM9xD9Ns7gfoBQB19FFFABRRRQAUUUUAFFFFABRRWVrviLTvDtos19KxeRtkFvEu+Wd+yoo5JoA0pZY4InlldUjQFmZjgKB1JNcZJrmq+MJGtfDDNZ6UDtm1qRP8AWDuLdT949t54HbNEWg6p4vlS78VKbXTVYPBosb5Bx0M7D7577B8o75rtI40hjWONFRFGFVRgAegFAGboXh7TvDtm1vYRENId800h3SzP3Z2PLGtSqt9qVjplu1xf3kFrCoyZJpAgH4muZbx7Hf5Xw1o+oa02cedHH5NuD7ySYB/4CDQB2FUtS1fTtGtTc6nfW9pAON88gQZ9Oe9c6NM8Zaw+dR1i20e1Yc22mR+ZLj0MzjAPuF/xq3pngTw/pk/2n7Gb2873d/IbiX8GfOPwxQBUPjl9RYJ4a0K/1YN926Zfs9t/38fkj/dU0n9i+LtZB/tfXotMgP8Ay76RH8+PeZ8n8lFdgBgYFFAHP6X4J8P6Tci7isFmvupvLpjNMT672yfyroKKKACiisPxXrx0DRjLBF59/cOLeytx1lmbhR9B1J9AaAMbX2bxZ4kj8LwknTbTbcau46P3jt/+Bfeb2A9a6PWvt8ejzxaTbJLdNEyRBnCKjbSFJ9s46VX8L6CPD+jrbyS+fezOZ7y4xzNM3LN9OwHYAVtUAc94I0ifQPB+naVcwiOe2iCyYcMHc8swPoWJroaKKACuW1XwcrX76voF0dI1duXkjXMNz7TR9G788EZ611NFAHJ6d4waC9j0nxPajStSc7IpC2ba6P8A0yf1/wBk4PPeusqrqOm2WrWMllqFrFc20gw0cq5B/wDr+9cn9g8QeDBu0kza3oi9bCaTN1AP+mTn74H91jn0NAHbUVl6H4i0zxFamfTrkOUO2WJgVkiburqeVP1rUoAK474cfJo2qW//ADw1i8jx/wBtWP8AWuxrk/BUfkXnimDpt1qVsf78cb/+zUAdZRRRQAUUUUAFFNcAowb7pHPOK808F6ho9zpGo6rqeuHy7q/ma1jl1JwY4A21AF3552k496APTaK4vwbe3mm+HNTv/EFxLb2C300lm9+5Dx2uRs3lufXGeelcVqnxSbxdfyaZ4fW+XTEbZLcWoCTT+yu5CxKf7xO72FAHf6v4smfUH0Xw1bJqOrL/AK12bFvae8rjv/sD5j7UaboGn+HZJNb13Uku9VdcS6heMqBF/uRgnCL7Dr3Jrn9JttUj09bC01HQvC2mjkRWci3NwfXc7fLuPc4Y1p2nhjwdHMlzqN9DrF4vS41O8E5H0Unav4AUAWW8f2l7M1v4e06/1uYZAe2i2QZ95nwuPoTTRY+NtbT/AE3UrPQYCf8AVWCfaJiPQyOAoP0U/WugGs6QihV1KxVQMACdAB+tH9u6QOuq2P8A4EJ/jQBk2PgLQLS6W8uLaTUr5f8Al61GQ3EmfUbuF/4CBXSgBQAoAA6AVQ/t7R/+gtY/+BCf40n/AAkGij/mL2H/AIEp/jQBo0Vm/wDCRaJ/0GdP/wDApP8AGkPiPQx11nTv/ApP8aANOiss+JdBHXW9N/8AAtP8aT/hJtA/6Dmm/wDgXH/jQBq0Vk/8JR4fH/Md0z/wLj/xpP8AhKvDv/Qe0v8A8DI/8aANZ3WNGd2CqoySTwBXF+HUPirxA/i2dT9hgDW+joe6E4ecj1YjA/2R71Q8X+KdJ1q7tfC9prljFb3YMmo3a3aAR24PKBs43Oflx2GTXTweJvCtpbRW8Gu6PFDEoREW8jAVQMADmgDdorF/4S/wyP8AmYtJ/wDA2P8A+Ko/4TDwwP8AmY9I/wDA2P8A+KoA2qKxP+Ey8Lj/AJmTSP8AwOj/APiqT/hM/C3/AEMmkf8AgdH/APFUAblFYf8Awmnhb/oZNI/8DY/8aT/hNfCv/QyaR/4Gx/40AbtFYX/Ca+Ff+hk0j/wNj/xpP+E38Kf9DJpP/gZH/jQBHrnhC01W6GpWk0mmaygxHf2uA+P7rjo6+zfhiqFv4svdDuY7Dxhbx2pdtkOqQAm1m9Nx/wCWTH0bj0Naf/CceFP+hk0n/wADI/8AGorjxh4NureS3uNf0aWGRSrxvdRsrA9QQTzQB0SOsiB0YMrDIIOQRXKeHZNvjnxfbf8ATa2nx/vQKv8A7Trl31jS/Cjmfwp4p0m50/OX0W6v02qP+mDk/If9k/L9KseAPFOneKvHviDUNNZ/LlsrXzEcYKOpkBB7HtyCRQB6ZRVO91bTdOZFvtQtbVn+4J5lQt9MnmrSyxuxVXVmADEA5OD0P6GgB1FFFAHO+N9XOleFdRMMVxLeSW0i20cELSMzlcD7oOOSKyNMu9N0XwPZaRDYXGpXEFmsP2aOzc+a+3kElcAE55PFdzRQBynhHwzLaeALDQ/EixX8ipmaOYCVB8xZU5znbwPwq4PA/hQdPDWk/wDgHH/hW/RQBg/8IT4V/wChb0n/AMA4/wDCl/4Qrwt/0Lmk/wDgHH/hW7RQBhf8IV4W/wChc0r/AMA4/wDCl/4Qzwv/ANC7pX/gHH/hW5RQBh/8IZ4X/wChd0r/AMA4/wDCl/4Q3wx/0L2lf+Akf+FbdFAGL/wh/hn/AKF7S/8AwEj/AMKP+EP8Nf8AQv6X/wCAif4VtUUAYv8AwiHhr/oX9L/8BI/8KX/hEfDf/QA0v/wET/CtmigDG/4RLw3/ANADS/8AwET/AArmPFtppmhXejQWHhrQpn1K8S0Cy2qgrkEl+B0AHSvQK8+1uCXxB8WdL0+K6ktk0awkvTJGqsfMlPlqCGBH3Qx6d6ALV7oC2JtpD4d8NzxPcxQyhLTayq7hSw4OSM5xXQf8Ir4e/wCgFpn/AICJ/hTtBsLyxs511G5a6uZLmSQysFBK5wnCgAfKF6CtWgDJ/wCEW8Pf9ALTP/ARP8KP+EW8P/8AQD03/wABE/wrWooAyv8AhGNA/wCgHpv/AICp/hR/wjOgf9ATTf8AwFT/AArVooAy/wDhGdB/6Amnf+Aqf4Uf8I3oX/QF07/wFT/CtSigDM/4RzQ/+gNp/wD4Cp/hR/wjuh/9AbT/APwFT/CtOigDN/4R7Rf+gPp//gMn+FL/AMI/ov8A0CLD/wABk/wrRooAzv7A0Yf8wmw/8Bk/wrn/ABlqcXhHRYxoljaxarqVxHY2YSEKDI54ZsdQoya7GuX8a6DdatDpV9YIJbzSr5LyOBmCiYDhkyeASDwfUUAaOieHrPR7IJg3F04zcXc/zSzMepZj/LoOgqDw74eGh3esTAjbe3fmxICSI4wigKPQAhuBwM1OmsT3cZS0028S46H7VEYkQ+pJ+8B/s5rRtIGtrSKF5nmdFw0r9XPcmgCaiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAD0NYVn4b0yz1iXU4Ip1vZgqyytdSsXC/dByxBAyeKKKAN2iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP/9k=']	['math_629.jpg']
math_630	OPEN_OnlyTxt	Point $O$ is a fixed point in plane $\\alpha$, $A$, $B$, $C$ are the three vertices of $\\triangle ABC$ in plane $\\alpha$, where $\\angle B$ and $\\angle C$ are the angles opposite to sides $AC$ and $AB$ respectively. There are four propositions:\n\n① For a moving point $P$ satisfying $\\overrightarrow{OP}=\\overrightarrow{OA}+\\lambda(\\frac{\\overrightarrow{AB}}{|\\overrightarrow{AB}|}+\\frac{\\overrightarrow{AC}}{|\\overrightarrow{AC}|})(\\lambda>0)$, the circumcenter of $\\triangle ABC$ must be in the set of points $P$ that satisfy this condition;\n\n② For a moving point $P$ satisfying $\\overrightarrow{OP}=\\overrightarrow{OA}+\\lambda\\left(\\frac{\\overrightarrow{AB}}{|\\overrightarrow{AB}|\\sin B}+\\frac{\\overrightarrow{AC}}{|\\overrightarrow{AC}|\\sin C}\\right)(\\lambda>0)$, the incenter of $\\triangle ABC$ must be in the set of points $P$ that satisfy this condition;\n\n③ For a moving point $P$ satisfying $\\overrightarrow{OP}=\\overrightarrow{OA}+\\lambda\\left(\\frac{\\overrightarrow{AB}}{|\\overrightarrow{AB}|\\cos B}+\\frac{\\overrightarrow{AC}}{|\\overrightarrow{AC}|\\cos C}\\right)(\\lambda>0)$, the centroid of $\\triangle ABC$ must be in the set of points $P$ that satisfy this condition;\n\n④ For a moving point $P$ satisfying $\\overrightarrow{OP}=\\overrightarrow{OA}+\\lambda\\left(\\frac{\\overrightarrow{AB}}{|\\overrightarrow{AB}|\\sin B}+\\frac{\\overrightarrow{AC}}{|\\overrightarrow{AC}|\\sin C}\\right)(\\lambda>0)$, the orthocenter of $\\triangle ABC$ must be in the set of points $P$ that satisfy this condition.\n\nThe number of correct propositions is ( ).		2	math	三角函数与解三角形	['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math_631	OPEN_OnlyTxt	In triangle $ABC$, $AB=6$, $AC=3\\sqrt{5}$. Point $M$ satisfies $\\overrightarrow{AM}=\\frac{1}{5}\\overrightarrow{AB}+\\frac{1}{4}\\overrightarrow{AC}$. The line $DE$ passing through point $M$ intersects sides $AB$ and $AC$ at points $D$ and $E$, respectively, with $\\overrightarrow{AD}=\\frac{1}{\\lambda}\\overrightarrow{AB}$ and $\\overrightarrow{AE}=\\frac{1}{\\mu}\\overrightarrow{AC}$. Given that point $G$ is the circumcenter of triangle $ABC$, and $\\overrightarrow{AG}=\\lambda\\overrightarrow{AB}+\\mu\\overrightarrow{AC}$, then $|\\overrightarrow{AG}|$ is ( ).		\sqrt[3]{10}	math	三角函数与解三角形	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+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math_632	MCQ	"Benz Theorem: It is known that the point $O$is a point within $\triangle ABC$. If the areas of $\triangle BOC,\triangle AOC, and\triangle AOB$are recorded as $S_1, S_2, and S_3 $respectively, then $S_1\cdot\overriding {OA}+ S_2\cdot\overriding {OB}+ S_3\cdot\overriding {OC}=\vec{0}$. The ""Mercedes-Benz Theorem"" is a very beautiful conclusion in plane vectors. Because the graph corresponding to this theorem is very similar to the logo of a ""Mercedes-Benz"" car, it is vividly called the ""Mercedes-Benz Theorem"". As shown in the figure<image_1>, we know that $O$is the focus of $\triangle ABC$, and $\overrightarrow {OA}+2\overrightarrow{OB}+3\overrightarrow{OC}=\vec{0}$, then $\cos C=$()"	['A. $\\frac{3\\sqrt{10}}{10}$', 'B. $\\frac{\\sqrt{10}}{10}$', 'C. $\\frac{2\\sqrt{5}}{5}$', 'D. $\\frac{\\sqrt{5}}{5}$']	B	math	三角函数与解三角形	['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math_633	OPEN	As shown in <image_1>, let $P$ be an arbitrary point inside triangle $ABC$, with the sides opposite angles $A$, $B$, and $C$ being $a$, $b$, and $c$ respectively. There always exists an elegant equation: $S_{\\triangle PBC}\\overrightarrow{PA} + S_{\\triangle PAC}\\overrightarrow{PB} + S_{\\triangle PAB}\\overrightarrow{PC} = \\vec{0}$. Because the figure resembles the logo of Mercedes-Benz, it is also called the 'Mercedes-Benz Theorem'. Now consider the following propositions:\n\n① If $P$ is the centroid of $\\triangle ABC$, then $\\overrightarrow{PA} + \\overrightarrow{PB} + \\overrightarrow{PC} = \\vec{0}$;\n\n② If $a\\overrightarrow{PA} + b\\overrightarrow{PB} + c\\overrightarrow{PC} = \\vec{0}$ holds, then $P$ is the incenter of $\\triangle ABC$;\n\n③ If $\\overrightarrow{AP} = \\frac{2}{5}\\overrightarrow{AB} + \\frac{1}{5}\\overrightarrow{AC}$, then the ratio $S_{\\triangle ABP}:S_{\\triangle BPC} = 2:5$;\n\n④ If $P$ is the circumcenter of $\\triangle ABC$, $A = \\frac{\\pi}{4}$, and $\\overrightarrow{PA} = m\\overrightarrow{PB} + n\\overrightarrow{PC}$, then $m + n \\in [-\\sqrt{2}, 1)$.\n\nWhich of the above propositions are correct? ( ).		①②④	math	三角函数与解三角形	['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']	['math_633.jpg']
math_634	OPEN_OnlyTxt	In the right angle $\triangle ABC$,$AB\perp AC,AC=\sqrt{3},AB=1$, and the internal point $P$of the plane $ABC$satisfies $CP=1$, then the minimum value of $\overriding {AP}\cdot\overriding {BP}$is ()		4-\sqrt{13}	math	三角函数与解三角形	['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math_635	OPEN_OnlyTxt	Given non-zero vectors $\\vec{a}$, $\\vec{b}$, $\\vec{c}$ satisfying $(\\vec{a} \\cdot \\vec{b})\\vec{c} = (\\vec{b} \\cdot \\vec{c})\\vec{a}$, with $|\\vec{a}| = |\\vec{c}| = 2$ and $\\vec{b} = (-1, \\sqrt{3})$. If the projection vector of $\\vec{a}$ onto $\\vec{c}$ is $-\\frac{1}{2}\\vec{b}$, find the angle between vectors $\\vec{b}$ and $\\vec{c}$.		\frac{\pi}{3} \text{or} \frac{2\pi}{3}	math	平面向量	['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CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_636	MCQ	As shown in the figure<image_1>, in a cube $ABCD-A_1B_1C_1D_1$with an edge length of $2$, points $E$and $F$are on edges $DC_1 and AD$respectively, and $\overline{DE}=\lambda \overline{D_1C_1}$,$\overline{AF}=\lambda \overline{AD}$, where $\lambda \in (0,1)$, point $P$is a moving point in the plane $ABCD$(different from point $F$), and $AC \perp EP$, then ()	['A. $FP \\perp A_1C$', 'B. The cosine of the angle formed by line $AB$and plane $EFP$is $\\frac{\\sqrt{3}}{3}$', 'C. When $\\lambda$changes, the section perimeter obtained from a planar $EFP$truncated cube is constant', 'D. When point $P$is the midpoint of $AB$, the surface area of the circumscribing sphere of the triangular pyramid $C-EFP$is $\\frac{25\\pi}{3}$']	ACD	math	空间向量与立体几何	['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']	['math_636.jpg']
math_637	OPEN_OnlyTxt	"Let\{$a_n$\} be the finite sequence obtained by any permutation of positive integers 1, 2, 3,…, n. If\{$a_n$\} exists for all k \in $N^*$, k \leq n, then\{$a_n$\} is called ""n-ary totally dislocated sequence"". Let $b_n$be the number of ""n-ary totally dislocated sequence"". For example, the ""3-ary totally dislocated sequence"" corresponding to positive integers 1, 2, 3 has 2, 3, 1 and 3, 1, 2,$b_3$ = 2. Find the general term formula of $b_n$(n \geq 2)"		b_n = n! \sum_{i=1}^{n-1} \frac{(-1)^{i+1}}{(i+1)!} (n \geq 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math_638	OPEN_OnlyTxt	The known sequence $\{a_n\}$is an arithmetic sequence,$\{b_n\}$is an equal ratio sequence,$a_1 = b_1 = 2, a_2 = b_2 + 1, a_3 = b_3$.$\ forall n \in \mathbb{N}^*$,$I \in \{0, 1\}$,$T_n = \left\{p_1a_1b_1 + p_2a_2b_2 + \cdots + p_{n-1}a_{n-1}b_{n-1} + p_na_nb_n \mid p_1, p_2, \ldots, p_{n-1}, p_n \in I \right\}$, find the sum of all elements in $T_n$.		\[ 2^{n-1} \cdot \left[ 8 + (3n - 4) 2^{n+1} \right] \]	math	数列	['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math_639	OPEN_OnlyTxt	Known columns $\{a_n\}$,$a_1 = 1$,$a_{n+1} = 2a_n - \cos \frac{n\pi}{2} + 2\sin \frac{n\pi}{2} (n \in \mathbb{N}^*)$. Let the sum of the first $n$terms of $\left\{n(a_n - 2^n)\right\}$be $T_n$. If $T_m = 2024 (m \in \mathbb{N}^*)$, find $m$.		4048 or 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KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/2Q==']	['img_for_onlytxt.jpg']
math_640	OPEN_OnlyTxt	"It is known that all terms of the sequence $\{a_n\}$are positive and satisfy the conditions of $a_1 = 1$,$a_n \neq2 $,$a_{n+1} = \frac{1}{2}a_n(4-a_n)$, remember $b_n = \log_2(2-a_n)$, and the sum of the first $n$terms of the sequence $\{a_n\}$is $S_n$. Is there a $S_n \leq0 $()(fill in ""Yes"" or"" No"")"		Yes	math	数列	['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']	['img_for_onlytxt.jpg']
math_641	OPEN_OnlyTxt	Known function\(f(x) = ax^2 -|x-2| + x - a\), if the function\(f(x)\) has exactly 4 zeros, then the value range of real\(a\) is ()		(1, 2)	math	函数与导数	['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']	['img_for_onlytxt.jpg']
math_642	OPEN_OnlyTxt	Let\(a \in \mathbb{R}\), function\(f(x) = 2\sqrt{x^2 - ax} -|ax - 2|  + 1\)。If\(f(x)\) has exactly one zero point, then the value range of\(a\) is		(-\sqrt{3}, -1) \cup (1, \sqrt{3})	math	函数与导数	['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math_643	MCQ_OnlyTxt	"Known function\(f(x) = \begin{cases} 
x^2 e^x, & x < 1 \\
\frac{e^x}{x^2}, & x \geq 1 
\end{cases}\), the equation\([f(x)]^2 -a^2f (x) = 0\)(\(a > 0\)) has two unequal real roots, then the following options are correct ()"	['A. 2 is the maximum point of\\(f(x)\\)', 'B. Function\\(h(x) = f(x) - x\\) has no zero point', 'C. The range of values for\\(a\\) is\\(\\left(\\frac{2}{e}, \\frac{e}{2}\\right) \\cup [\\sqrt{e}, +\\infty)\\)', 'D. \\(\\exists x_1 \\in (0,1), x_2 \\in (1,3)\\), so that\\(f(x_1) > f(x_2)\\)']	D	math	函数与导数	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFFT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eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXp5VZL4RufibHE0NwvhaW88pRLMVZYz8oYt1ABw3rjjOeaAKXhrxv4j8IyltF1Sa3jY5eE4eJj6lGyM+/WvVvD/AO0hexyJF4h0eGaLo09kSjD32MSD+YqD4pfBaSwe31LwXpkk1j5QWe1hdpZFYZ+cAklgRjgZxj348vsvA/irULtbW28O6m0rHbhrV0APuzAAfiRQB7l8VPBPh3xR4Fk8beHooY7iOEXRlhTYtzF/FuH94DJz14IPt4P4Q/5HXQf+wjb/APoxa+idfhX4dfs9NouozxveyWj2qoG+9LMxLBfXaGY/Ra+cPDt1HY+J9Ju5SBHBeQyuScYCuCf5UAe3ftM/6vwx9br/ANpV8/V9PfH3wnq3iTRdIvdHs5b1rGSQSQwLvcrIF+YKOTgoOnrXz1qHhLxFpOnf2hqOh6hZ2m4J5txbtGMnoOQPSgD6B/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6m1JBrH7MiCA7tmjQk7f+mO0t/6Aa+Wa+hvgH42s7jSZfBeqSIJFLtZiXG2WNuXj56nJJx3DH0rifHfwW8Q6Bqs82i2E2p6S7loTbKXkjU/wsg5JHTIyD7dKAPL69q/ZttJH8W6xeAHy4rERMfd5FI/9ANef6X8NvGWr3SwW/hzUUJODJcQNCi/VnAFfQWi2GlfA74cXFzqNxHPqEx8yTacG4mxhY0zztHr9Tx0oA8L+MFwl18V9fkjYFRKkZI9VjRT+oNexeB/+TY9R/7B2o/+1a+bb+9n1PUbm/un33FzK00rerMSSfzNfSXgf/k2PUf+wdqP/tWgD5looooA+mviX/ybvpv/AF7WP/oK18y19NfEv/k3fTf+vax/9BWvLvgzoPhbxN4ludK8SWzTSvEJLRfPaNWKn5l+UgkkEEc/wmgDM8M/Fnxh4VhS2s9S+0WiABba8XzUUDsD95R7AgV614T+PeneILqLSPE+lRWv2oiLz0PmQMTwA6tyATx1PXnHWvNfH3wl1/w3r90dM0q6vdIkkL20ttG0uxCchGAyQR0yetZvhT4Y+KPEmsW8A0m8tLXepmuriFokjTPJBbG4+w5oA6345/DzTvC13Z61o0K29leu0ctuv3Y5AMgqOwIzx0GOOuB49X0P+0jrdt/Z+j6Ejo10ZjdyKDzGoUqufrub/vmvnigAooooAKKKKAOh8H+M9V8EanNqGkeR580Jgbzk3jaWDdMjnKiqXiPxBe+KNfutZ1Hy/tdyVMnlLtX5VCjA+iisuigDqPBvj/WvAsl4+j/Zs3YQS+fHv+7nGOR/eNYWp6hPq+rXmpXO37RdzvcS7BgbnYscD0yaqUUAFdnP8TvENx4IHhF/sn9mCFIeIj5m1WDD5s+oHauMooAKv6Jq91oGtWmq2Wz7TayCSPzFyuR6iqFFAHSeMfHGr+OL23u9Y+z+bbxmJPIj2DGc88msKyvbrTb2K8sriW3uYW3RyxMVZT6gioKKAPWtN/aG8YWUCRXVvpt9tXBlliZXb3JVgP0rG8VfGXxb4rsZLCaeCxspBtkhskKeYPRmJLY9gQD6V59RQB2L/EzxA/gYeECbX+yxGIv9V+82ht33s+vtXIwwyXE8cMKF5ZGCIq9WJOAKZSglWDAkEHII7UAd/ap8RfhPDFqghuNMtbt9myUo8cjAZwyZODjOCQD1wa3/APho3xf5O3+z9G3/AN/yZP5eZXa+GPif4S8feFl8P+N2t7e7KBJTcnZFKR0kWT+BvqRz0qs/wG8FXcn2mx8UXAtWOQFmikAHs2P8aAPKb7xT4q+J/iHT9M1C8kuBPcKkVrCoSNMnBO0egzyckDPNet/tJX0MXhrRdN3DzZbtpwv+yiFf/ZxV3T4fhb8IYpL2LUY73VQpCt5y3Fycj7qquAgPqQPc14P468ZXvjnxLLq12vlRgeXbwA5EMY6DPc8kk+p/CgDmq6nwn8Q/EvgssukX5W2Y7ntZl3xMfXaeh9xg1y1FAHsv/DSHijycf2To/mf3tkuPy3/1rifFvxM8UeM4zBql8Fs924Wlunlx59+7fiTXIUUAFdp4S+KfinwZbC0067jmsgSRa3Sb0UnrjkMPoCBXF0UAeySftIeKGh2x6VpCSd2KSEflvrgPFnj3xF40mVtYv2eFG3R20Y2RIfUKOp68nJ561zVFABRRRQAV2fhL4n+IfBWkT6ZpP2T7PPMZn86IsdxUKcHI4worjKKACiiigDt/CvxY8W+EbdLSyvluLJPu214vmIo9FOQyj2BArrm/aQ8TmLC6TpAk/vFJCPy3/wBa8aooA6rxX8RfE/jICPVtRY2oORawjy4s+pUfePuc1ytFFAG54T8Wal4M1k6rpXk/aTE0X75Ny7TjPGR6CovE3iO/8Wa9PrOpeV9qnCh/KXavyqFGB9AKyKKACiiigAooooAVWZGDKxVlOQQcEGu/0D40eNdAgEC6it/Cv3Uv080r/wACyG/WvP6KAPYz+0f4pMO0aVo4l/v+XLj8t/8AWuV8RfF7xn4liMFxqhtLYjDQ2S+UG+pHzEexOK4aigAooooA7PTPif4h0rwXN4Utvsn9mywzQtviJfbLu3c56/MccVxlFFABXZ6z8T/EOu+EofDV59k/s+FIkXZEQ+IwAvOfauMooAK7PxZ8T/EPjPRYNJ1X7J9mgmWZPJiKtuVWUZOTxhjXGUUAFegfBrw/qGt/EXTrizZoodOkF1cTAcBAfu/8C+79CT2qz8KvAOgeN49V/trVZrF7UxeSsUsabw27dncDnG0dPWvWLvxN4G+DnhaWw8PzQ3upS5KxJKJZJJMYDSsvCgenHsOtAHLftGeK0nurDwvbSg+QftV2AejkYRT7gFj/AMCFeD1a1PUrvV9TudRvpjNdXMhklc92P8h7VVoAKKKKAO11L4peItV8Fp4Uufsf9mpDDANsJD7YypXnPX5BniuKoooAu6Rqcui6va6lBFBLNbSCSNJ03JuHQkd8Hn8K6Dxj8R/EPjmK2h1eaEQ2zFkigTYpY8biMnJxwPTJ9a5KigAra8L+KdV8H60mq6RMsdwEZGVxuR1PUMO46H6gVi0UAdF4v8Z6n421CG/1WK0W5ij8rfbxbCy5yN3JzjJ/On+D/HmveB7uWbR7hBHNjzreZd8cmOmR1yM9QQa5qigD1y4/aK8Yyx7Y7PSID3ZIHJ/VyK8nuJ3urmW4lIMkrl2wMck5NR0UAFFFFAF7SNY1HQdRj1DSryW0u4/uyRNg49D2I9jwa9Rsv2i/FlvAI7mx0u6YD/WNE6MfrtbH5AV5BRQB6L4l+NnjDxJZSWRnt9PtpF2yJYxlC49CzEsPwIr1Xwl/ya5df9g6/wD/AEOWvmWvpXwncQL+zDdRGaMSf2dfjaWGfvy9qAPmqt3wv4w1vwdqBvNFvWgZwBJGQGSQejKeD9eo7VhUUAeyL+0f4pEG06VpBlx9/ZJj8t/9a4Txd8QvEfjaRP7XvAbeNt0drCuyJD646k+5JNctRQB1/jH4ka/44tLW21g2vl2zl08mLaSSMcnJrkKKKAOp8J/EPxL4LLLpF+VtmO57WZd8TH12nofcYNd5/wANIeKPJx/ZOj+Z/e2S4/Lf/WvGqKAOv8W/EzxR4zjMGqXwWz3bhaW6eXHn37t+JNchRRQB6B4X+Mvi/wALWMdjBcwXtnEAscN7GX2D0DAhse2cCujuP2jvFMke2DTNJibuxSRvy+evHKKANrxJ4s1zxbfC71q/kuXXPloeEjB7Ko4Hb645rFoooA9K8OfHLxf4d0yHTwbO/t4VCRG8jYuigYC7lYZA981R8YfFzxJ410o6ZqUdjFaGRZClvCynI6csxNcHRQB2fg/4n+IfBGmz2GkfZPJmm85/OiLndgDrkcYArjKKKAHRyPDIkkbskiEMrKcFSOhB7V6Zofx48aaPbJbzzWupxqMBr2MlwP8AeUgn6nNeY0UAewXf7RniuaJkttP0q2Yj74jd2H0y2PzBrzXX/E2s+KL/AO261qE13N0XecKg9FUcKPoKyaKACuz0z4n+IdK8FzeFLb7J/ZssM0Lb4iX2y7t3OevzHHFcZRQAUUUUAdnrPxP8Q674Sh8NXn2T+z4UiRdkRD4jAC859q5C3uJrW4juLeV4pomDxyI2GVhyCCOhqOigD1bSf2gvGWnwJDdJYaiFGPMuISrn8UIH6VJqX7Q3jC8heK1g02x3DAkihZnX3BZiP0ryWigCzqGoXmq30t7qF1LdXUpzJLK5ZmP1NVqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK9Q0H4SRaz8Lbrxk+sPE8Ntczi1FuCD5W7jdu77fTvXl9btp4z8R2Ogvodtq9xFpjo8bWykbSr53Dp3yfzoAwq9Q1X4SRab8J4/Gv8AbDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/5NZg/7B1h/wCjIqAPmWvUNV+EkWm/CePxr/bDySPbQT/Zfs4AHmOi43bu2/07V5fX014p/wCTWYP+wdYf+jIqAPmWiiigArrPBfw71zx4t42jm1C2hQSG4lKctnGMA/3TXJ19C/sz/wDHr4l/37b+UlAHi3ivwnqvgzWTperxIs2wSI8bbkkU91PGecj6g1h19YeOPD+n/FrwGbzStp1OyeT7PnG5ZFOJIW+uP/QT0r5RkjeGV4pEZJEJVlYYKkdQRQA2ui8HeC9V8capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTSV8PTeI/BkxMM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math_644	MCQ	"The famous mathematician Descartes listed the equation\(x^3 + y^3 - 3xy = 0\) based on the characteristics of a cluster of petals and leaf shapes that he studied. The curve\(C\) represented by this equation is a beautiful ""Cartesian leaf line""(as shown in the figure<image_1>), which has very perfect symmetry, then the following statement is correct ()"	['A. Curve\\(C\\) Crossing Point\\(\\left(\\frac{3a}{2}, \\frac{3a}{2}\\right)\\)', 'B. Curve\\(C\\) is symmetric about\\(y = x\\)', 'C. If\\(a = 2\\), the maximum value of the ordinate of the point of the curve\\(C\\) in the first quadrant is 3', 'D. If\\(a = 2\\), any point\\((x, y)\\) on the curve\\(C\\) satisfies\\(-2 < x + y \\leq 6\\)']	ABD	math	函数与导数	['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math_645	OPEN_OnlyTxt	Known $f(x) =| x^2 - 4x| $。If $x_1$and $x_2 \in \left[m, m + \frac{3}{2}\right]$are taken, both $f(x_1 + 3) \leq f(x_2)$are true, then the value range of the real number $m$is ()		$\left[\frac{9-\sqrt{15}}{4}, \frac{3}{2}\right] \cup [3+\sqrt{3}, +\infty)$	math	函数与导数	['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']	['img_for_onlytxt.jpg']
math_646	OPEN_OnlyTxt	Let $[x]$represent the largest integer not exceeding $x$, and the sum of the minimum solution and maximum solution of the equation $\left[\frac{x}{2}\right]+\left [\frac{x}{3}\right] + \left[\frac{x}{7}\right] = x$is ()		-85	math	函数与导数	['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math_647	MCQ_OnlyTxt	"It is known that the domains of functions $f(x), g(x)$are both $\mathbb{R}$, and $g(x) = f(4+x)$. For any $x, y \in \mathbb{R}$,$f(x+y) + f(x-y) = g(x-4)f(y)$holds, and $g(-3) = 1$. Then the following numbers are correct ()
①.$ f(1) = 1$ ②.$ f(x)$is an odd function ③.$ The period of f(x)$is 6 ④.$\ sum_{k=1}^{2016} f(k) = -3$"	['A. 1', 'B. 2', 'C. 3', 'D. 4']	C	math	函数与导数	['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math_648	MCQ_OnlyTxt	Bernhard Riemann (1866.07.20-1926.09.17) was a famous German mathematician. He made important contributions to mathematical analysis and differential geometry, pioneered Riemann geometry, and provided a mathematical foundation for the later general theory of relativity. He proposed the famous Riemann function. The domain of this function is [0,1], and its analytical formula is: $L(x) = \begin{cases} \frac{1}{q}, x = \frac{p}{q} (p, q \in \mathbb{Z}^*, p, q are relatively prime) \\ 0, x = 0 or 1 or the irrational number\end{cases}$in (0,1). The following statements about Riemann functions are incorrect ()	['A. $L(x) = L(1-x)$', 'B. The solution set for the inequality $L(x) > \\frac{1}{5}x + \\frac{1}{5}$is $\\left[\\frac{1}{2}, \\frac{1}{3}\\right]$', 'C. $L(a+b) \\geq L(a) + L(b)$', 'D. $L(a)L(b) \\leq L(ab)$']	C	math	函数与导数	['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math_649	MCQ_OnlyTxt	"It is known that\( f(x) \),\( g(x) \), and\( h(x) \) are one-time functions, if\( f(x) + for real number\( x)\) is satisfied| g(x) - h(x)| = 
\begin{cases} 
2x - 1, & x < -\frac{1}{2} \\
6x + 1, & -\frac{1}{2} \leq x < \frac{2}{3}, \\
5, & x \geq \frac{2}{3}
\end{cases} \)

Then the expression of\( f(x) \) is ()"	['A. \\( f(x) = x - 2 \\)', 'B. \\( f(x) = x + 2 \\)', 'C. \\( f(x) = -x - 2 \\)', 'D. \\( f(x) = -x + 2 \\)']	B	math	函数与导数	['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math_650	OPEN	It is known that a truncated cone has a generatrix length of 3, and the side view is a semicircular sector ring with an area of\(\frac{15\pi}{2}\)(as <image_1>shown in the figure). A regular tetrahedron that can rotate freely can be placed in the truncated cone (the surface thickness of the truncated cone is negligible), so the maximum volume of the regular tetrahedron is ()		\frac{64}{81}	math	空间向量与立体几何	['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']	['math_650.jpg']
phy_651	MCQ	In order to explore the working principle of a hand-operated generator, the two students came to the laboratory and designed two experimental devices as shown in Figures A <image_1>and B<image_2>. Because the only slip rings used in the two devices are different, Device A generates DC (as shown in Figure C<image_3>), and Device B generates AC (as shown in Figure D<image_4>). If the coils in the two devices rotate at a uniform speed simultaneously at the same angular velocity and in the same uniform magnetic field. Then the following statements are correct ()	['A. The instantaneous current generated by both devices at the positions shown is zero', 'B. The current generated in the two devices has different periods of change', 'C. Within 0~\\(2t_0\\), the Joule heat generated by the resistor R in the two devices is different', 'D. Within 0~\\(2t_0\\), the amount of electricity passing through resistor R in both devices is the same']	B	phy	电磁学_交变电流	['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', 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'phy_651_2.jpg', 'phy_651_3.jpg', 'phy_651_4.jpg']
phy_652	MCQ	In the <image_1>circuit shown in the figure, the power supply electromotive force $E=12\,\text{V}$, the internal resistance $r=8\,\Omega$, the constant resistance $R_1=20\,\Omega$,$R_2=10\,\Omega$,$R_3=20\,\Omega$, and the value range of the sliding rheostat $R_4$is $0\sim30\,\Omega$. All meters are ideal meters. Close switch S, and during the process of sliding the sliding vane of the sliding rheostat from end a to end b, the changes in the numbers shown in voltmeter $\text {V}_1$, voltmeter $\text{V}_2$, and ammeter A are $\Delta U_1$,$\Delta U_2$, and $\Delta I$respectively. The following statement is correct ()	['A. $\\text{V}_1$The reading becomes smaller, then $\\text{V}_2$The reading becomes larger,$|\\Delta U_1| $is less than $|\\Delta U_2| $', 'B. $\\left|\\frac{\\Delta U_1}{\\Delta I}\\right|=20\\,\\Omega,\\ \\left|\\frac{\\Delta U_2}{\\Delta I}\\right|=25\\,\\Omega$', 'C. The power of $R_4$increases first and then decreases, with a maximum value of $0.36\\,\\text{W}$', 'D. The output power of the power supply first increases and then decreases, with a maximum value of $4.5\\,\\text{W}$']	ABC	phy	电磁学_恒定电流	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADoAP8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACsjWvEul6D5aXs7G4m4htYUMk0p/2UXk/XpSeJtbOhaM1xFF513K6wWsGf8AWzMcKv07n2BrjdVtNW8DaW2vxtaahqEzINRu7hGLjc2PkwfljXPT0FA0dAPFOuTDzLfwVqjQ9jNPBE5H+4XzU1j41064vo9P1CC70i/k4jg1CLyxKfRHyVb8Dn2pNe1XVbDSLCaxkspLm4ljiwyMVkLd1weABk/hWrd6VBrGj/YNZgguRIgEqhfl3Y6r3HPQ9RQBoUVynhy7u9K1afwxqM7TmJPOsbiQ/NLDnBVj3Zeme4xXV0CCiiigAooooAKKKKACiiigAooooAKyda8SaXoCxi9nPnynENtChkmlPoqLyaPEms/2Ho0t2kfm3BIjgi/vyMcKPzrjNVttV8E6O/iUfZb3UHKHUbidGZ0VmwdmDwi5HyigaN4eKdbmHmWvgrVGh6gzTwROR/uF8/nU1l420+W9jsNStrzSL2Q4jiv49iyH0RwSrfgadr+q6np+gWlzZSWkt3M8UQVlO2VnIA288cnP0rTudLi1bSPsOswwXIdcSALhc+ozyPrQBoUVyfhy5u9I1mbwvqE7zhIvP0+4kOWlhzgqx7spwPcEV1lAgooooAKKKKACiiigDlZPGF0+pX9pYeHb6+Wym8iSWKSNV37Q2PmIPRhS/wDCUa1/0Jup/wDf6H/4qk8If8hXxX/2F2/9ExV1VAzlv+Eo1r/oTdT/AO/0P/xVH/CUa1/0Jup/9/of/iq6migR57d6rfat458MW19o1zp0KPcTKLh0YSuseBjaTyNxP412ur6dFq+j3enzKGjuImjIPuKw/G0M1vbWGv2sRlm0e4890UZZoCCsoHvtOf8AgNdHaXdvf2cN3ayrLBMgeORDkMD0NAzzjwNeXOt3dhp94G8zw8kkc5bI3S52of8Avnn8a9NqnZ6XZWFxd3FrbrFLdyebOwJ+dsYz+VZGo7V8faD0BazvAffBhx/M/maAMvxxdzaZ4g8MX1paPdXJuZIfKjIDuhQkgE8dqvf8JRrX/Qm6n/3+h/8AiqhSX/hIfHyPCQ9hoqMHfGQ1w4xgH1UdfrXX0Act/wAJRrX/AEJup/8Af6H/AOKo/wCEo1r/AKE3U/8Av9D/APFV1NFAjlv+Eo1r/oTdT/7/AEP/AMVR/wAJRrX/AEJup/8Af6H/AOKrqaKAPMvHPj/xDonhiW6tvDd3YyF1jFzcNG6R574Un6c8c1l/Db4j+JdbsLxbvSLjVmgdQJrcohXOeG3EZ6dq9duLeG7t3guIUmhkG145FDKw9CD1rmfhtbw2/wAPdF8mFI/Mtld9igbmPUn1NIfQX/hKNa/6E3U/+/0P/wAVR/wlGtf9Cbqf/f6H/wCKrqaKYjlv+Eo1r/oTdT/7/Q//ABVH/CUa1/0Jup/9/of/AIqupooA4C91O81nxX4ctL/QrrT4UuXmVp5EYOyxnA+Un612upWEOqaZdWFwMw3MTRP9CMVh+Nbe4XT7TVrRXefS7hbry16unRx/3yTW9Y31vqVjDeWkqyQTKHRlPUGgZ5t4Fu7nWLvTtEvVbzfDHmpdk9GlBMcP1+TefqBXqNVLXTLKyu7y6t7dY5711kuHHV2ChQfyA6f1rD8SW1tqF9aW0LRx3ySpK1yWw0CKc8H1bpgde9AblPxvNJYaz4X1K1tpLq6jvZIVgiYBpEeF9w54/hU8+lWv+Eo1r/oTdT/7/Q//ABVQeYviL4g25h+ex0FHLyA8PcyDbtHY7U3Z9C1dhQBy3/CUa1/0Jup/9/of/iqP+Eo1r/oTdT/7/Q//ABVdTRQI5GbxpeWTQG/8MahawzTJD5ryREKzHAzhia66uU8f/wDIFsf+wlbf+hiuroGFFFFAjlfCH/IV8V/9hdv/AETFXVVyvhD/AJCviv8A7C7f+iYq6qgGFFFFAARkYPSuQbQNV8OXMs/hl4pLKVi8mmTttRWJyTE38OfTpXX0UAcoPFupp8k3hLVRL6JsZSfY5qpcWviHxPcRu1hFokCgr9okIkutp6hMcJn1rtqKB3KWlaVZ6Lp0djYxeXCnqclierE9yfWrtFFAgooooAKKKKACuZ+Hn/JPdC/69Erpq5n4ef8AJPdC/wCvRKAOmooooAKKKKAAgEEEZB7VyMmg6roF3LdeGXiktZW3y6bcNhNx6mNv4fp0rrqKAOUHi3U4wFn8JaoJemI9jqT7HNZ15per+K7kPLotnpERxuup40luiB2Xj5T754rvKKB3KOkaTZ6Jp0djZR7Ik55OSxPUk9yavUUUCCiiigDlPH//ACBbH/sJW3/oYrq65Tx//wAgWx/7CVt/6GK6ugYUUUUCOV8If8hXxX/2F2/9ExV1Vcr4Q/5Cviv/ALC7f+iYq6qgGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFcz8PP+Se6F/wBeiV01cz8PP+Se6F/16JQB01FFFABRRRQAVkeKdRn0jwtqeoWu3z7e3aRNwyMgdxWvXO+Pf+RC1z/rzf8AlQCKMFh42mgjl/4SDTRvUNj7CeMj/eqT+zPG3/Qw6b/4An/4qulsf+PC3/65L/Kp6B3OT/szxt/0MOm/+AJ/+Ko/szxt/wBDDpv/AIAn/wCKrrKKAucn/Znjb/oYdN/8AT/8VR/Znjb/AKGHTf8AwBP/AMVXWUUBc+fvi7oHjKWawmvbkaha5EafZojGqSE8Ark8n1r2DwPZ6np/gzTLXWHZr6OLEm45I54BPqBgVV8f/wDIFsf+wlbf+hiurpA3oFFFRzzxWtvJPPIscUSl3djgKAMkmmI5nwh/yFfFf/YXb/0TFXVV538PfFmjavr/AIjtrS7DTXN+1zCpGC8flouR+KmvRKBsKKKw/GGo3WleFr28snVLiNRsZlyASQOn40CNyiuUi0jxXJEj/wDCTRDcoOPsQ/xp39jeK/8AoZ4v/AIf40AdTRXLf2N4r/6GeL/wCH+NH9jeK/8AoZ4v/AIf40AdTRXLf2N4r/6GeL/wCH+NZfiJvFXh3R21M6/DcLHNChiNoF3B5FQ85/2qAO9ooooAKKKKACuZ+Hn/ACT3Qv8Ar0StbWtb0/w9pcuo6ncLBbR4BY9ST0AHc1zXwr1qw1XwLp9vaTh5rKFYbhOhRqB9Drb68j0/T7m9mz5VvE0r7RzhQScflXmV/f67P4Ks/EH9sXUGq6vcwrZW0LgQxpI42ptxydmSWPOa9QubeK7tZradd8MyNG6nupGCPyrjH+GtrLYafYyaxqLW+nTrLaKHA8oLnA9+uM9sUAjtwMADOaWuf8V3d/aWVjFptwtvNc3ccHmsm/aDnPH4VW/sbxX/ANDPF/4BD/GgR1NebfGZtWs/CrX+m3DrBg297CRuV434Bx2IPfryK6D+xvFf/Qzxf+AQ/wAaq6l4U8Q6vptxp974jiktrhCki/YhyPzoGh/w1bV7rwjBqet3Ly3d9++RCAqxRYwiqBwBgbvX5ua7CuTh0DxPBCkMXiWFY41CqoshgAdB1p/9jeK/+hni/wDAIf40AdTXI+PdT1DTLXTDpmovaXFxexwYEcbK6k/NncpxxnpioLl/Eeiaxoi3WtRXlve3wtpIxbBDgxu2c5/2BUPjK3h1Xxt4V0q7QNal5bllb7rMi8A/n0oA7aC4huE3QzJKo4JRgefwqWuH8Kxo3jzxJPp0ax6UqwwgRACNplB3kAcenNdxQI5Tx/8A8gWx/wCwlbf+hiurrlPH/wDyBbH/ALCVt/6GK6ugYVS1jTY9Z0a902ZmSO6haJmXqMjGRV2ql/qlhpcPm393Dbp6yOBQI8Y+H/wmtk8Q6tLqV4biLTrhrRY4wY97bFbcSDkDDdK9K/4V74c/59Zv/AmT/Gsfwj4n0RdX8RK+p26G61QyQbn2+YvlRjIz2yCPwrv1ZXUMrBlPIIOQaQ22cx/wr3w5/wA+s3/gTJ/jWB408G6DpXhO9voIJEkhCuGadyB8w7E16PSMqupV1DKeoIyKYXOWt/iF4QW2iU+IbAEIAR5vtUn/AAsTwf8A9DFp/wD39roPsdr/AM+0P/fArF8V3Q0Lw3e6pbWVpI1rGZCkq4DAdhgdaAIf+FieD/8AoYtP/wC/tH/CxPB//Qxaf/39rGv9f1XR/C8fiK+0fS3s/LSWaKJz5iq2OmVwTyO9dpbw2dzbRTpbRbJFDjMY6EZoAxP+FieD/wDoYtP/AO/tc1488X+Gdb8JXGnWWs2lzPPPbqsUUmWYechOPwzXov2O1/59of8AvgUC0tgci3iB/wBwUAc7/wAK98Of8+s3/gTJ/jR/wr3w5/z6zf8AgTJ/jXUUUCucv/wr3w5/z6zf+BMn+NH/AAr3w5/z6zf+BMn+NdRRQFzz7xP8JtG1rRZLWxaWzugweOVpGkXI7EE9DmqPgz4O2OhWc41i4N7czMD+5Zo1QDPHB56969PoosO7OX/4V74c/wCfWb/wJk/xo/4V74c/59Zv/AmT/GuoooFc878R+HvD/hY6Tqqg2yxX8e+WWdiqqQc5ya3v+FieD/8AoYtP/wC/tdI8aSrtkRXX0YZFR/Y7X/n2h/74FAzn/wDhYng//oYtP/7+0f8ACxPB/wD0MWn/APf2tu5tYltpGht7bzQpK+YgC598DpXF6FrWt69oc+qW2k6MEilljWN3Yb9hIyDtwM4oA2f+FieD/wDoYtP/AO/tH/CxPB//AEMWn/8Af2pvCmq2Hinw3aaxFYRwicMDGyA7WVipGe4yDW19jtf+faH/AL4FAHDax4q0HXdd8L22l6ra3cyaqJGSJ8kL5Moz+ZH512eoaVYarEsV/aRXCKcqJFzg+1Tra26MGSCJWHQhACKloEQ2lnbWNutvawRwwr0RFwBU1FFAHKeP/wDkC2P/AGErb/0MV1dcp4//AOQLY/8AYStv/QxXV0DMfxJrR0TS/Nii867mcQ20P9+RuAPp3NUNJ8IW8bjUNa26lqr/ADPLMNyxn+6ingAVHroEvjvw1DLzCvnyqD03hOP5mtvXNSGj6JeX+3e0MZMaf33PCr+LED8aAOf03VdC8S+INc8Pvp1q405lXLRg+YOjEcfwsCtQvDL4F1GB4JZJPD91KIpIXYt9kduFZSf4SeMdq5hLbUvCPiHwxql7YLbQlDp19OLgSec0hL72wBj5yzfjXf8AjaKKXwTrCy42i1dh7EDI/UCkBvA5GR0oqnpEkkuj2UkwxI0CFh74FXKYgrh/itMw8G/Yo32y31zDbrjknLDI/IGu4rE1rwppev3MFxqAune3YPEI7uWNUYZwwVWADcnnrQCOJvLC5k8a6f4V8Q6g91o8tuJbWNUEQkdP4Hx19ce1eoKoVQqjAAwAKx9U8L6XrBsWvY53ksW3W8q3EiSIcYzuBBP4mqPiBTaa3od4EYRm8WKSWOUmUllKKm08eXkgtz2zjuAZ09FFFAgooooAKKKKACiiigAooooAKKKKAMrxLfLpvhjU7x/uxWztx9K8rEGs+H/BnhmC51SSPRtQdYL1Yo1R4hJ0w/XBzya9X1rQrLxBYtZah57WzcPHFO8QcejbSMj2NV5/CmkXfh46FdQy3GnnHyTXDuwwcjDE7hjHY0hpl/S9NtNI0y30+xiEVrAm2NB2H+eat1xHi+8fRdIttOs3vY4omhLTYklLKZANm85zxnOTnGB3rtY3EkauoIDDIyMH8jTEOooooAKKKKAOU8f/APIFsf8AsJW3/oYrq65Tx/8A8gWx/wCwlbf+hiuroGc74u0y6u7K2v8ATl3ahp0wuIV/v44ZfxGahH9m+O9OgkS+u4PIkV5LeJwjRyKQQHBB5BFdRWDqnhDTNTu/tq+fZ32P+PqzlMT/AI46/jQAuveFbTxHp0Njf3d75Ee3IjkCmQqQQzHHXIzxisLVnGttD4R065lu4lZTqN07BtkYOdhYAAscAfSqmh6Bca3ea3a6n4g1i4trG+NskX2jYHTy0b5ioBPLGu503SrHR7RbWwto4IV/hQdT6n1NIC2ihEVFGAowKWiimIKKKKACq4sLUXRufJBmzuDMScHGMjPQ444qxRQAUUUUAFFJkeooyPUUALRSZHqKMj1FAC0UmR6ijI9RQAtFHWigAooooAKKKKAIp7eG6i8qeNZEyG2sMjIOR+tS0UUAFFFFABRRRQBynj//AJAtj/2Erb/0MV1dcp4//wCQLY/9hK2/9DFdXQMKp6tqUOj6Rd6lcBjDaxNK4XqQBnAq5VHUp9M+zyWepXFskc8ZVo5pFXep4PBPSgR4/wCAfixp8mv6xHqFq1rHqFy13HICX2nYq7SAPRc5969G/wCFh+Gv+f5v+/Lf4VyPgDQvCWi6/r93FParJBetb2zS3CnEWxDxk88sRmvUI1tpo1kiWJ0YZVlAIP40kN2Od/4WH4a/5/m/78t/hR/wsPw1/wA/zf8Aflv8K6TyIv8Ankn/AHyKPIi/55J/3yKYHN/8LD8Nf8/zf9+W/wAKP+Fh+Gv+f5v+/Lf4V0nkRf8APJP++RR5EX/PJP8AvkUAc3/wsPw1/wA/zf8Aflv8KP8AhYfhr/n+b/vy3+FdJ5EX/PJP++RR5EX/ADyT/vkUAc3/AMLD8Nf8/wA3/flv8KP+Fh+Gv+f5v+/Lf4V0nkRf88k/75FHkRf88k/75FAHn2g6B4b8ZXmu6tc2pu92olIpDLInyCKLjAI7k1tf8K18I/8AQJ/8mZf/AIqq1tPreh6rrKW/hya8t7q9NxFLHcIgKmONcYPuhq5/wkfiD/oT7r/wLipAM/4Vr4R/6BP/AJMy/wDxVH/CtfCP/QJ/8mZf/iqf/wAJH4g/6E+6/wDAuKj/AISPxB/0J91/4FxUBqM/4Vr4R/6BP/kzL/8AFUf8K18I/wDQJ/8AJmX/AOKp/wDwkfiD/oT7r/wLio/4SPxB/wBCfdf+BcVAamJ4c8R+H/C6alpEs7QCC/lCR7XfauRjnmtv/hYfhr/n+b/vy3+FTeFLO6SyvJtRsBaz3F5LMInZXKqTxyK3vIi/55J/3yKYHN/8LD8Nf8/zf9+W/wAKP+Fh+Gv+f5v+/Lf4V0nkRf8APJP++RR5EX/PJP8AvkUAc3/wsPw1/wA/zf8Aflv8KP8AhYfhr/n+b/vy3+FdJ5EX/PJP++RR5EX/ADyT/vkUAc3/AMLD8Nf8/wA3/flv8KP+Fh+Gv+f5v+/Lf4V0nkRf88k/75FHkRf88k/75FAHN/8ACw/DX/P83/flv8KP+Fh+Gv8An+b/AL8t/hXSeRF/zyT/AL5FHkRf88k/75FAHN/8LD8Nf8/zf9+W/wAKP+Fh+Gv+f5v+/Lf4V0nkRf8APJP++RR5EX/PJP8AvkUAeOfEr4o6YIbKx02JrtlnjuXc5QDY2QOR3r1Hwzr0Hibw9Z6vbxtHHcJnY3VSDgj8xXIfFHwrpGq2On3dzbYnW8hg3odpKO2COK7rTdNtNI06CwsYhFbQKERB2FIHaxbridV0vT9W+J9vDqNjbXkS6SWVLiJXUHzTzgjrXbVykv8AyVWD/sDn/wBG0wRNfeDPC6afcunhzSVYRMQRZxgg4PtTvAP/ACIWi/8AXstbWof8gy6/64v/ACNYvgH/AJELRf8Ar2WgDo6KKKBBRRRQAUUUUAFFFFABRRRQBxfj7UNUsLjw/HperzWUl/qUdnIiRROCjAlmw6E5GB3xz0qLUtR1fw54p0KyXWptUi1Kdopbe6hhDxqBnepjVPpyDWf4r+xa98U/DWkSTjy7K3uLmcpNtILYRACD94MvTrzSeC4bbSPHmu6RqDmbUEYS2VzcuWkaBv4VJPY8celIZ6VRVeC/tLmaSGC5iklj5dFYEirFMQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBynj/8A5Atj/wBhK2/9DFdXXKeP/wDkC2P/AGErb/0MV1dAwrlJf+Sqwf8AYHP/AKNrq65SX/kqsH/YHP8A6NoEdFqH/IMuv+uL/wAjWL4B/wCRC0X/AK9lra1D/kGXX/XF/wCRrD8BsE8AaMzHAFqpJoAy9G1bxJrWua9YxX9hHDpk6wrKbNm8xiCWBG/jHArS8H+JLrXX1W0vooVutMufs7yW+fLk9CAcke4ya86s4Nb/AOFc654p0rVbq2lub6e8e3jVNrxh9rHJUsDtUng9q9P8KW+kWvhq0m0hBHaXKCcsz7mZm5JZj1bPWkNm7RRRTEFFFFABRRRQAUUUUAU/7J077V9q+xQefu3eZ5Y3ZznOafJY2TXQvZLeE3CDiZlG4Ae9WaKAOS0W60zV/Fs2pQTp56Wxt4YFUg+WHBZ246k4wOw+prraKKACiiigAooooAKKKKACiiigAooooAKKKKAOU8f/APIFsf8AsJW3/oYrq65Tx/8A8gWx/wCwlbf+hiuroGFcpL/yVWD/ALA5/wDRtdXXF6lqNlpvxRt5b66hto20gqGlcKCfNPHNAI6vUP8AkGXX/XF/5Guc8HWNvqPw40e2uk3wvbLuXJGfyq5f+KdAbTrlV1mwJMTgATrzwfemeAf+RC0X/r2WgC/p3h3SdJsprOys0itphteIElSOeMH6msjXdH0/Q/A99a6dbrbQKFZUUnCncOnpXV0yaGK4jMc0aSIf4XXIoEEPMMf+6P5U+kVVRQqgBRwAO1LQAUUUUAFFcz4d1G7u/E/ie2uJ2khtLmJIEOMIDGCQPxrfW7t3vZLNZVNxGiyPH3CsSAfxwfyoAnooooAKKKKACiiigAoopCQoJJAA6k0ALRXN3/jTToLlrLT459Vvxx9nsl37T/tN91fxNVTpnirxBzqmojRLI/8ALpprbp2Ho0xHH/AR+NAHXUVXsbOHT7GG0g3+VEu1fMcu2PdiSTVigAooooAKKKKACiiigDlPH/8AyBbH/sJW3/oYrq65Tx//AMgWx/7CVt/6GK6ugYVTvNJ07UHV73T7W5dRhWmhVyB6DIq5RQI8usjoWh634gt9R8MyTB9QMlu0WmCRBH5aDAOOBkHiuih8daTbxLFDpGrxxoMKiaewAHsBXX0UDucn/wALA07/AKButf8AgA9H/CwNO/6Butf+AD11lFAHJ/8ACwNO/wCgbrX/AIAPR/wsDTv+gbrX/gA9dZRQByf/AAsDTv8AoG61/wCAD0f8LA07/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phy_653	MCQ	In <image_1>the circuit shown in the figure, the power supply voltage remains unchanged. The resistance value of the fixed resistor is $R_0$, and the filament resistance is $R_L$. Ignoring the effect of temperature on the filament resistance,$R_0:R_L=1:2$, first turn the single-pole, double-throw switch $S_3$to contact a, and only close the switches $S_1$and $S_4$. When the slider P is at the far right end, the voltage meter value is 6V, the current meter value is $I_1 $, and the total power of the circuit is $P_1$; only close the switches $S_2$and $S_4$. When the slider P moves to the midpoint, the voltage meter value is 2V, the current meter value is $I_2$, and the total power of the circuit is $P_2$. Then turn the single-pole, double-throw switch $S_3$to contact b. When only switches $S_1$and $S_2$are closed, the current meter shows 0.3A. The correct one of the following statements is ()	['A. $I_1:I_2=3:4$', 'B. $P_1:P_2=9:8$', 'C. Power supply voltage is 12V', 'D. $R_0=20\\Omega$']	C	phy	电磁学_恒定电流	['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phy_654	MCQ	It is known that a straight single-core cable parallel to the ground surface is buried underground in a certain area. There is a changing current flowing through the cable and a changing magnetic field around it. Therefore, it is possible to measure the induced electromotive force in a closed probe small coil on the ground to detect the exact position, trend and depth of the cable. When the coil plane is measured parallel to the ground, the electromotive force in the trial coil is zero at two places on the ground,$a$and $c$, and the electromotive force in the coils at two places $b$and $d$is not zero; when the coil plane and the ground form an angle of $60^\circ$, the electromotive force in the trial coil is zero at two places $b$and $d$. After measurement, it is found that $a$,$b$,$c$, and $d$are located exactly at the four top corners of a square with a side length of $1\,\text{m}$, as <image_1><image_2>shown in the figure, based on which it can be determined ()	['A. The underground cable is directly below the two-point connection line of $ac$, at a depth of $\\frac{\\sqrt{6}}{6} \\,\\text{m}$', 'B. The underground cable is directly below the two-point connection line of $cd$, and the depth from the ground surface is $0.5\\,\\text{m}$', 'C. The electromotive force in the probe coil is measured at $a$,$b$,$c$, and $d$on the ground, so the linear cable may be dual core, each with the same direction and equal magnitude of current', 'D. If the electromotive force in the probe coil is measured at $a$,$b$,$c$, and $d$on the ground, it is possible that the linear cable is dual-core, each with opposite directions and equal currents']	AD	phy	电磁学_电磁感应	['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'phy_654_2.jpg']
phy_655	OPEN	As shown in Figure A<image_1>, the number of turns of coil A is $n=100$turns, the enclosed area is $S_1=1.0m^2$, and the resistance is $r=2\Omega$. There is a uniform magnetic field region D with an area of $S_2=0.5m^2$in A, and the change of its magnetic induction strength $B$is shown in Figure B<image_2>. At t=0$, the magnetic field direction is perpendicular to the coil plane and inward. Horizontal smooth metal tracks MN and PO of sufficient length with a width of $L=0.5m$and regardless of resistance are connected to A through switch S. There is a uniform strong magnetic field in the vertical plane of $B_1=2T$between the two tracks (not shown in the figure). In addition, the same metal rails NH and OC are connected to MN and PO through a small piece of smooth insulation located on the left side of O and N (as shown in the figure). The magnetic field existing between the two rails is oriented outward perpendicular to the plane. After establishing a planar rectangular coordinate system xOy with O as the origin, the straight line along OC as the x-axis, and the line along ON as the y-axis, the magnetic induction intensity is distributed along the x-axis according to $B_2=2+2x$(unit is T) and evenly distributed along the y-axis. Now place a conductor bar ab with length L, mass $m=0.2kg$, and resistance $R_1=2\Omega$vertically on MN and PO, and place a square metal frame cdef with side length L, mass $M=0.4kg$, and resistance on each side is $R_2=0.25\Omega$on NH and OC, and the cd side coincides with the y-axis. Close switch S, and after side ab accelerates to the right to reach the maximum speed, give the metal frame a horizontal speed to the left of $v_0= 2m/s$while crossing the insulation, so that it can come into elastic frontal contact with the rod. Remove the conductor rod ab immediately after contact, and make good contact with the track everywhere during the frame movement. Request: The displacement size of the metal frame movement.		4.8m	phy	电磁学_电磁感应	['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'phy_655_2.jpg']
phy_656	OPEN	An interest group designed a model like Figure A to study non-friction forms of resistance<image_1>. The model consists of a large gear, a pinion gear, a chain, a resistance device K and an insulating disk. K consists of two identical annular sector coils $M_1$and $M_2$fixed on an insulating disk. The pinion gear and the insulating disk are fixed on the same rotating shaft. The axis of the rotating shaft is located at the boundary of the magnetic field, and the direction is parallel to the direction of the magnetic field. The magnetic induction intensity of the uniform magnetic field is $B$, and the direction is perpendicular to the paper and inwards, and perpendicular to the plane where K is located. The radius ratio of the large and small gears is $n$and are connected by a chain. The structural parameters of K are shown in Figure B<image_2>. Where $r_1=r$,$r_2=4r$, the central angle of each coil is $\pi-\beta$, the center of the center is on the axis of the shaft, and the resistance is $R$. Regardless of friction, ignore the magnetic field at the boundary of the magnetic field. If the gear rotates at a constant speed at an angular velocity of $\omega$, take the time when the $ab$side of coil $M$enters the magnetic field as the starting point, and calculate that K rotates for one cycle: Average electric power consumed by device K.		\frac{225n^2B^2r^4\omega^2(\pi-\beta)}{2\pi R}	phy	电磁学_电磁感应	['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']	['phy_656_1.jpg', 'phy_656_2.jpg']
phy_657	OPEN	"As shown in the figure <image_1>, two smooth horizontal rails $A_1B_1$ and $A_2B_2$ are placed parallel to each other with a spacing of $L=1\\,\\text{m}$, in a uniform magnetic field of $B=0.4\\,\\text{T}$ directed vertically downward. The left side of the rails is connected to a supercapacitor with capacitance $C=0.1\\,\\text{F}$. Initially, the capacitor carries a certain amount of charge, with the polarity as shown in the figure. A metal rod $ab$ with mass $m_1=0.2\\,\\text{kg}$ and negligible resistance is placed perpendicularly on the rails. After closing the switch $S$, the $ab$ rod starts moving to the right from rest and reaches a constant velocity of $v_1=1.6\\,\\text{m/s}$ by the time it leaves $B_1B_2$. Below, the smooth insulated rails $C_1MD_1$ and $C_2ND_2$ are also spaced $L$ apart and are aligned directly opposite $A_1B_1$ and $A_2B_2$. Here, $C_1M$ and $C_2N$ are arcs with radius $r=1.25\\,\\text{m}$ and central angle $\\theta=37^\\circ$, tangent to the horizontal rails $MD_1$ and $ND_2$ at points $M$ and $N$, respectively. The lengths of $NO$ and $MP$ are $d=0.5\\,\\text{m}$. Taking point $O$ as the origin, a coordinate system is established along the rails to the right. In the region $0\\le x\\le0.5\\,\\text{m}$ to the right of $OP$, there exists a magnetic field with magnitude $B_x=\\sqrt{3x}\\,\\text{(T)}$, directed vertically downward. A \""U\""-shaped metal frame with mass $m_2=0.4\\,\\text{kg}$ and resistance $R=1\\,\\Omega$ is stationary on the horizontal rails $NOPM$. The conductor rod $ab$ is thrown from $B_1B_2$ and just enters the horizontal rails at $C_1C_2$ along the tangent, then undergoes a perfectly inelastic collision with the metal frame at $MN$, after which they form a closed conducting loop and move to the right together. The gravitational acceleration $g$ is taken as $10\\,\\text{m/s}^2$. Please solve the following problem: After the closed loop enters the $B_x$ magnetic field region, it decelerates solely due to the Lorentz force. Discuss whether the loop can pass through the $B_x$ region. If it can, determine the velocity when it exits the $B_x$ region; if it cannot, determine the position coordinate $x$ of the right edge of the loop when it stops."		The wireframe cannot pass through the $B_x$area. The position coordinate of the right border when the wireframe stops,$x$, is $\frac{\sqrt{5}}{10}m$	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEAAncDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigApMjOMjPpS1ytuzf8LSvFydv9lIcZ4/1hoA6qiiigAooooAKKKKAEyM4yM+lLXMagzD4k6GuTtOn3ZIzx96GtHVPEukaLcxW+oXiwSzcRqVJ3H0GB1oA1qKybPxLo9/eCzt71DcsCViYFWYD0BAzWtQAUUUUAFISAQCRk9KWuN8Usy+PPBahiA011kA9f3VAHZUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXKW/8AyVS8/wCwSn/ow11dcpb/APJVLz/sEp/6MNA0dXRRRQIKKKKACiiigDl9R/5KVoX/AGD7z/0KGsXxrcXEvj/wtZ21m901uZbwxoygnaNv8RA71taj/wAlK0L/ALB95/6FDWdJo/iQePJfEIsbCWMW32aCJ7xlKDdkt9w9RjikMz55n8SfE3R4dStW0iXS45LmCCVg0l1uGMgrxtGOmc9a9JrkrPwxfXnjCLxNrcluJ7aAwWlrbMzJEDnLFiBuPJHQda62mDCiiigQVxnir/kfvBP/AF3uv/RVdnXGeKv+R+8E/wDXe6/9FUDR2dFFFAgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAri/FHjCXSfFWi6XbKDDNcol7LjIjVs7V+pwT+FdRqup2+j6Xc39yxEUCFyB1Y9lA7knAA9TXlnizQdcsfCcusX2oWzSG7j1CeBbf5kbI+USbuQo+Xp2oGj1+iq8F3FNZwXJdVSZVZcn1HAqxQIKKKKACiovtMH2r7N50f2jZ5nlbhu25xux1xnvUtABXKW/8AyVS8/wCwSn/ow11dcpb/APJVLz/sEp/6MNA0dXRRUVzcwWdtJc3MqRQRKWeRzgKB1JNAiWisKy8YaLf39vYwTzi4uFLwJJaSx+Yo6spZQCvv0rYe5gjuI7d5o1nlBMcZYBnA6kDqcZFAEtFFFAHL6j/yUrQv+wfef+hQ11FcvqP/ACUrQv8AsH3n/oUNdRQAUUUUAFFRS3MEEkUcs0cbzNtjVmALnrgDualoAK4zxV/yP3gn/rvdf+iq7OuM8Vf8j94J/wCu91/6KoGjptW1a00XT5L69Z1t4xl2VC20epx2rITx1oTW6XLzzxWz4Kzy27rHg9DuxjFVPifeNZ/DzVdibmnRbYDP/PRgn9a5rxTd6rB4IttB1TSBpmnzJFZz6i1wsyxAYGdi88469B3pAkepI6yIrowZWGQR0Ip1VNMtIbDS7W0t2LQwxKiMTnIA4NW6YgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoorD8ZXM1n4O1W4t5Gimjt2ZHU4Kn1oA3KKahzGpPoKdQBS1HSNO1dI11CyguljOUEqBgp9vyFRXWgaRfW0NtdadbTQQrtjjeMFVHoBWlRQBy/iOysdO0awgtoIYIkv4CiKoAX5xnFdRWLrXiPQNInjt9WvII5WG9I3QuceuADiqX/AAsPwp/0F4/+/Un/AMTQM6eiuY/4WH4U/wCgvH/36k/+Jo/4WH4U/wCgvH/36k/+JoFYaP8Akqn/AHBj/wCjlrqa82Hjfw5/wsX7b/aafZv7KMW/y3+95oOOmeldF/wsPwp/0F4/+/Un/wATSHY6euUt/wDkql5/2CU/9GGpP+Fh+FP+gvH/AN+pP/ia5uHxt4cX4i3V6dTT7M2mpGH8t+WD5x0z0phY9Lriviclw/hu22RSSWgvoWvVjBJMIbJ4Hvir3/Cw/Cn/AEF4/wDv1J/8TR/wsLwoeurx/wDfqT/4mgDFtNRh1f4q288MM/2a309kt5fKIR9x+Yj2GBWtrH/JSPDP/Xtefyjp/wDwsLwmOf7XjGB/zyf/AOJrzuP4k2OrfF62uGuUi0WxgmhimZGO8sBk8DPJA/AUgPbKK5j/AIWH4U/6C8f/AH6k/wDiaP8AhYfhT/oLx/8AfqT/AOJpisJqP/JStC/7B95/6FDXUV5vfeN/Dknj7R7xdTQ28VjdI7+W/DM0WB09j+VdD/wsPwp/0F4/+/Un/wATQOx09Fcx/wALD8Kf9BeP/v1J/wDE0f8ACw/Cn/QXj/79Sf8AxNArEXiv/kZfCf8A1/P/AOizXWV5p4j8beHbnXvDU0Opo8dveO8reW/yjYRnp610n/Cw/Cn/AEF4/wDv1J/8TQOx09cZ4q/5H7wT/wBd7r/0VVz/AIWH4U/6C8f/AH6k/wDia5XxH408PXPjTwldQ6kjw20twZn8t/kDR4Hb1pAkdF440DV/EkdlaWf2MWcNxHcTCaRlMu0n5OAcDoc+1N1rw3rPi23hsdZksrXTllWWWK1Z3eXaeFyQMD86tf8ACw/CnfWYlHq0bgD8Stb1hqNlqlqt1YXUNzAxwJIXDDPpkd6YFCO/li8ULpCpGLVbETKRncCG24+lbFZh0uQ+JRq3nDaLb7N5W3tu3Zz65rToEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFc3fa9o2r3lz4Zj1OSO+lBjb7ODuXjJ+YDA44/GgDbsdQtdShea0lWWNJGiLqcjcpwf1BFWaxfC0Wm2uiLY6TE8drZyyWuHHJeNyrH3yQTnvW1QAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUARzwrcW8kLs6q6lSUYqw+hHIrgvGPg+wtPB+q3CXusM0duzBZNTndT9VLYNeg1Wv7GDU7Ceyul3wToUdQcZFAGFD4J05RG4v9ayMHB1W4I/LfXTUgGAAOgrHi8U6RJqkumvdeRdo20RzqY9/upPDD6UAbNV769g06xnvLlwkMKF3Y9gKsVx+vk+I/Edt4biJNnb7brUWHTGfkj/E8/QUAT+D7Ga4S68Q6hHi81Ng6ow5ihH3E/Ln8a6fy0/uL+VKAFUKoAAGAB2paAG+Wn9xfyo8tP7i/lTqKAOUCL/wtPG0Y/sY9v+my11Plp/cX8q5gf8lU/wC4Mf8A0ctdTQAxoo2UqUXBGOleEWVv4oPxgk8PvqM/2dAFafA3taA71Xf1Ppnqea96qmul2a6u2qCFRePCIWk7lAc4/OgaZaEaAYCLge1Hlp/cX8qdVTVNSttH0u51C7kEcFvGXdj6CgRwvxU8SSadpkOgaUofV9VPkxqoGUQ8E/0qvofha38J+IfCGmRqrSi1vHnkx9+QiPJ/p9BVT4c6bc+KvEV5481aMjzGMenxt/Ag4yP8+tdbrH/JSPDP/XtefyjpFeR1Plp/cX8qPLT+4v5U6imSeDeII/FNv8XLbw/aahKsNxu+yTbQXitpSGkAPXC+WQO4A4r3WO3iiiSNEG1FCjPJwPc1Xl0qzm1e31R4Qbu3ieGN/RXKk/8AoP6n1q5QNsb5af3F/Kjy0/uL+VOooEcl4qRR4k8J/KP+P5+3/TM11flp/cX8q5XxX/yMvhP/AK/n/wDRZrrKAG+Wn9xfyrwr4jxeJbD4kaVb6XeyCO7kLWJZQ3kPINkmCRwO+Ow5r3eqd1pdneX1neTwq9xZszQOeqFhg/pQNOw+zso7SwgtSWl8qNULyncz4GMse5Pc0ybTLaWwmso1NtFMDuNs3lMCe4K4IPvVyigRj2Fhe6HpFzGl7d6vKgZ7dLp1Eh44j34GeR94+tTaLq51e0eV7G7spY38uSG6j2srYzwehHPUVpVBeWqX1nNayM6pKpUtGxVhn0I6GgCeisSA/wDCK6DLJqeoT3cFuc+c6bnVCcDOOuO5rWtrmC8to7m2lSWGRdyOhyGFAEtFFF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phy_658	OPEN	"As <image_1>shown in the figure, parallel metal rails of sufficient length are fixed on the insulating slope with an inclination angle of $\alpha=30^{\circ}$, and the spacing between the rails is $l=0.5m$, regardless of resistance; the $x$axis is established along the direction of the guide rail, and the dotted line EF and the coordinate origin O are on the same horizontal line; there is a magnetic field perpendicular to the slope in space, and the upward direction perpendicular to the slope is taken as the positive direction, the distribution of magnetic induction intensity is $B$
\[
= \begin{cases} 
-1(T), & x<0 \\
0.6+0.8x(T), & x\geq0 
\end{cases}
\]
There is an existing metal rod ab with a mass of $m=0.1kg$and a resistance of $R_1=0.2\Omega$placed on the guide rail, and there is also a U-shaped frame cdef with a mass of $m_2=0.3kg$and a side length of $l$below. The resistance of the metal rod de is $R_2=0.20$, the two rods cd and ef are insulated, and the dynamic friction coefficients between the metal rod, U-shaped frame and the guide rail are both $\mu=\frac{\sqrt{3}}$, and the maximum static friction force is equal to the sliding friction force. Give the metal rod ab an instantaneous velocity down the slope $v_0$, and $g$is taken as $10m/s^2$. If the metal rod ab is located at $x=-0.32m$, when $v_0= 4m/s$, the metal rod ab and the U-shaped frame collide completely inelastically. Find the coordinates of the de edge at final rest."		2.5m	phy	电磁学_电磁感应	['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phy_659	OPEN	As <image_1>shown in the figure, a thin-walled narrow strip box with a mass of $M = km$and an internal height of $h$and a small block with a mass of $M$are fixed to a sufficiently high ceiling with an inextensible light rope. Light, smooth fixed pulleys are connected, and their lower ends are $h$above the sandy horizontal ground. There is a smooth ball with a mass of $2m$in the box. An automatic triggering device (not shown) is installed at the bottom of the box: When the compression impulse of the collision of the ball with the box (i.e., the impulse of the elastic force of the interaction between the two objects from the beginning of contact to the maximum compression)$T_e &gt; \frac{3}{2} m\sqrt{2gh}$, the device will automatically trigger to instantly attract the ball and not separate it; otherwise, the collision of the ball with the box will be without loss of mechanical energy and the time will be extremely short. Initially, place the small ball in the center of the top of the box, leaving the entire system at rest. Assuming that the gravitational acceleration is $g$, the collision of boxes or small objects with the sandy ground is completely inelastic and the deformation of the sandy ground is ignored. Regardless of air resistance, the movement of small objects, boxes and small balls only occurs in the vertical direction. Question: If $k = 1$, release the ball at the moment $t = 0$, and find the impulse $I$exerted by the ceiling on the system during the time the entire system stops.		$11m\sqrt{2gh}$, direction vertical 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phy_660	MCQ	<image_1>As shown in the figure, two simple harmonic shear waves A and B propagate in the same medium along the positive and negative directions of the x-axis respectively, and the wave speeds are both 0.5 m/s. The waveform curves of the two waves at $t = 0$are as shown in the figure. The following statement is correct ()	['A. The vibration period of the first wave is 0.5 s', 'B. At $t = 0$, the displacement of the particle at coordinate $x = 300$ cm is 16 cm', 'C. At the moment of $t = 0$, there is no particle displaced by-16 cm from the equilibrium position', 'D. $t = 0.1$ s, the earliest particle with a displacement of-16 cm from the equilibrium position appeared']	C	phy	力学_机械振动与机械波	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAC2AXkDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKAIrm4itLaW4nkWOGJS7uxwFAGSTXP+DPGlh40064urMGNoJmjeJj8wGflb8R/Udqw/ixb+JdU8PppHh6wknFyc3Uquq7UH8PJHU/oPevNPhNpXi3RfEEepW2mSy6VM7W13iRcDBwTjPVT/X1pXGlofRlFFFMRynjfW/EGhabLf6Np9tcwWkLXFyZ3I3KpGUQA5zt3HJ4475ov/FN0y+F7rSYree11e4RJFcnzBGyFty444AJOfSumuoIrq0mt7hQ0MqMkinoVIwR+VeZfCfR757G3utQIa10rzrPTTnIkUyHdL+Iwo9gfWgDrvGurXOnaILXTSP7V1GQWlnn+F343n2UZY/Sub8P6jqjxXWi+EobOLS9BP2N7m8V3a5mUfOFVSMc9STyT0rcsrG71bx5d6vewSRWemIbXT0kGN7sMyyjjpjCg+xrC8PJfeAdU12wuNIv7ywvb6S+s7myh83O/GUYDlSMDk8GgC1q3jPXYPhcviqHTI7K9iTfcWd8jZABKkDBBGTgjPY1n6h498T6JpOia3qWmWT2eqSRxCzgZvPRnXKncTt5x0xxnqav+PP7a1L4XX9vNpU0mpXwKR2tonmGMFsqHIOMhRyRxnpWF4zGoan4Q8IQWmh6tJNa3dvPPGLU7o1jBVsj1z09RQB00fibXtM8ZaRouuQWDR6vHK0JtN2YHQZKsW+8MHqAPpXb15n4nnu7r4keEdRg0bVZLSxSZriRbViE81F2j6jv6V6ZQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRXE6Tq0/iTxZr1hNqElpHpsixRWsBCuwIyZGJBJGemOPXrQB2rfdP0rjvhl/wAirL/1/wBz/wCjDV/wzqtze3OtWFxKbgaddeSlztA8wFA2DjjcM4OMdqofDL/kVZf+v+5/9GGgZ2VFFFAjnNb8LTa5q8NxLrd9Bp4hMU1hAQqz5OeW6jI4OOcdxW/BBFa28dvBGscMahERRgKB0AFSUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFNaREZVZ1DMcKCeSfagB1FYun6xe6nd6hAuk3NnFbsY4bm6ACzOCQSFBzt6YPesfTr/AMY/2hqGlX0Onvcraie2u445Fg3liNhzycYzxzzQB2VeWz+F18e+I9U1q0vH0eWxmewhubTIlldQNzOcjKjOABz79BXZ3GuXOg+H4r7xBb7pg+yf+z43lRASfm6Z2gYJ4rNvX07wvb3Ou2+sJYWd+wneGeEyK8jAfMi5DbiMZH6Uhoz/AIa3l3aPrHhXULeBbvSZFLXEPScSAkM3q3HJ75q/8Mv+RVl/6/7n/wBGGsDw9b+KnkvtQ0fTIrVtQYSzX+tMRLNgYAESfcAHQE1meEovH6eF5ZdDuNIkiS8nJhkRg7tvO4AnjBPTOKBnslFcFaeLNR1bxFaacZk0O7jINzp19Bl5wCMmKQHawxnp9cV0722tnxAk6X9sNJC/NbGE+YTg/wAWfXHamTY1qKyrW31pNcuZrm+tpNMZSIYEhIkQ8cls89/zpmmW2uwzXh1LULWeN/8Aj2WKAoY+v3uee1AGxRWLZWviGPRrqK91K0l1Ft3kTxwFUTjjK555zTRaeIv+EfMB1Oz/ALW3ZFz9nPl4z0259OOtAG5RWLe2niGTRrWKz1K0i1FcefO8BZH45wueOcUupWuvytZf2dqNrAE/4+vNgL+Z0+7zx3/OgDZorKvLfWpNatpbS+totNUDz4HhLO5yc4bPHGKattrg8QtO1/anSCPlthCfMB2/3s+uT0oA16KybG21uPVbuS+v7aaxfP2eGOEq8fPG5s88VFptp4iigvhqOpWc8rj/AEVorcoIzz94Z57fkaANuisS2tPEKaFPDcalaPqjMfKuFgIjUcdVzz3796SS08Rnw/FBHqdmurBsyXJtyY2XJ4C544x37UAblFYmo2niGXTrSPT9StILxAPtEssBZZOOdozxzUmpW2uS39m+n39rBaoR9pjlhLNIM87TnjjNAGvRWVLb602vwzxX1sulBcSW5hJkZsHkNnjnHbtSW9tra69NNPf2z6WQfKt1hIkU8dWzz37UAa1FZOnW+tw3V6+o39tPA5/0ZIoShjGT94554x+VcdrvjDV/CVlFZXsq6tq+o7vsP2C24QADkruy3JyMdaB2PR6K80tp/inPost1ctpFkURnCPEzTMByOFJUfSptJ1/x9Bo9nqeoaNZ6nazwLM6WbGO4jBUHlG4J56Ci4WPRaKxPDnizSvFEEj6fK4lhIWe3mQpJE3oyn/8AVxW3QIKKKKACiiigAooooAKKKKACiiigDPuf7Y+1N9lFj9nwMGUtuz36DFc34k8Ra/pIhsrKGwutWuzttraMuT7u3TCjuTitnxN4hj8P2CMsTXF9cOIbS1T700h6D2HcnsKh8NeH5dN87UtTkW51q85uJwOEHaNPRB+vU0DNqzNybKE3qxLdFB5oiJKBsc4J5xU9MaWNHRHdVaQ7UBOCxwTgevAJ/Cn0CCiiqt/qNnpduJ766it4iwQPKwUbicAZNAFfXtUl0fSZLuCxuL6YELHbwKSzsTgfQep7VANBs73VrPXb22cajDCFSNpiyQkjnAzjPOM+1P0jTb+zu9Rub/Unuzczboo8bY4IxwqqPX1PetagArKjl1c+KJ4ngQaOLVGjl43Gbcdw65xtx2rVrGKanb+Jbq9uLpF0RbNQsZYDbKGYsx9tuO9AEniLX7Pw5pMl9dktyEiiUZeaQ/dRR3JrlNL8H6rqut2HinxBfFL6JiyaeqK8UEZHCDP8ecEsPpUvh+CTxjr/APwlV6n/ABLbYtFpEDDg84acj1JGB7D8a7ugexlaR4gsNcF4lm7iW0lMM8MiFHQ9sqecHqDWF8Mv+RVl/wCv+5/9GGtvX4tUTSppdAFsuoblfbMvEoHVSexI4zWD8LmLeEpN4Af7dcblBzg+YaA6G/4g8Oad4ksDa30WWX5opk4khfsyN2IrD0HXL/SdXTwx4llD3TKTY3+MLeIOx9JB3Hf+fZVj+JfD1r4l0h7K4JjkBEkE6/fhkHKup7EGgDYorl/B+v3OoR3Ok6sFj1vTSI7lR0kH8Mi+zD9a6igQUUUUAFFFFABRRRkCgAooooAKKKKACiiigAoorlfEuq7LOLVbbW4bfS9NmZ9QMJDvIU6RDsCW4I68igDD8V+LE1TS7/RLfTtQF1dT/Y7JQ3ktcuPvkfxCNehJ4I/TZ8F+CLfwzarPdMt1qrRqj3BGRGoGBHHnoo/XvUfg/R7q4uZvFWtRbdUvlxDC3/LpB1WMeh7n3rsaQyC9kmisbiS3j8yZI2aNMZ3MBwKg0W4vLvQ7G41CD7PeSwI88OCNjlQWXB6YOanvRcGxuBakC48tvKJx97HHX3qvoov10OxGqsG1AQJ9pIxgybRu6cdc9KYjA8W+C/7ZzqWjXb6XrqLhLqElfMH92THUfy/Sq3hbx5Z3cltoGszNbeJI1MVxBKhXc69wfund1GDyK7euO8Z+G5p7i28S6NDG2t6b8yqQP9Ij7xn3xnBoGdjRXL+BPEN94l0E31/DDGxmZY2ibhl91ySrDkEH0z3rqKBBRRRQAUUUUAFFFFABRRRQBwd5I1j8SJ9U1Ww1Ce3htFj057a1edELE+YTtBw3AH0ra/4TKw/58Na/8FVx/wDEV0VITgE4zQM4fUvEcuoeINAXTtG1eZIrtnneSykhVFMbpklwB/Hn8K7gEHoa8I+Ivxb162vZ9H02xn0kL8rTTpiZh6r2A9xn8K1/hn4yubPwXBHLoWuajIZZHa5gh8xXJYk/MWyT60rjtoew1zllLYeLbiSe50yTZpd8y20s2QHdBguB7HI59M/TFv8Axnrd+Laz0fw3rFncTXEaPc3loPLijLDcxAPPFd7TEFFFFAgrzTxdZX+sePYtDs9SlFtf2a/boUJxDAjkluuAXyF6dAa9Dvr2HTrC4vbhwkMEbSOx7ADJrhPAFj9o1q98S397/wATbVoRN9hJGYbfdiI469AOaBo763t4rS2itoIxHDEgREXoqgYAqWiigQjfdP0ry3wHDp/hzQdV8VXE90iNcTR3ESfMhCykB9oGcjOM9MV6k33T9K4v4bxRzeELiKVFeN766VlYZDAyHIIoGdjBNFcwRzwyLJFIodHU5DA8gg1JWPYXd6mvXelyaYINPhhje0uIh8jDoUPoR2A7VsUCOM8bWNzp81t4u0uMte6aMXMS/wDLxbfxqfcD5h7iuosdTs9RsIL22nR4J0EiMD1BFWiAQQRkHqK8n0zwP4csPG9/oOqaXFLHdg3mnSszD5P44uMD5TyPY0DPVvOi/wCeifnWF4y8Qv4d8KX2rWoilmtlVlRzw3zAEcexql/wrHwd/wBASH/vt/8AGsDxr8MtDHhK/wD7D0NTqRVRB5bMWzuHqfTNAaGn4O+Keg+LAlv5n2LUG4+zTsPmP+y3Rv5+1XPiGdugWjF2VRqNtuKkg7TIAeRz3rgfBnwMitzFe+J5fMkHzCzhb5R/vMOv0H516D43s7qXQbK3062M0iX1sVjGcbVcHkgHAGOTjikGl9DH8aHTLPw3JNYT3MVwJoQGWaUHBkUHv6ZqPx5FpEfgrUGtXmE21Av72Tu6g9TjpVjx9PrbeE5RcafYJH9ogyyXjsc+auODGO/vVjxlbeJdX8J3ljFpVkzyhABFeMzcODwDGB27kUAdnCgjgjRfuqoAyc9qfSKMIAfSlpiCiiigAoooPAoAyNU1y3sNU07SjDNNcagzKqxfwIBlnY54A4/OuNt9GstV8SweHNPh2eHtCcT3QySLi6PKoxP3sdT78VrX3iHWdF8IXmpataxLqcs7RWFpENxyzbYlJz8x7nHatbwjoP8Awj3h6C0kbzLtyZrqU9ZJW5Yk/Xj6CkM3egooopiIL2OWaxuIoJPLmeNlR842sRwag0W2u7PRLG2vrj7RdxQIk02SfMcKAWyeeTmpr+FbjTrmB5PKWSJkLn+EEYzVbw/ZR6d4e06yiuRcx29tHEs46SBVADfjjNAGjRRRQB5d4q0GHRPEtteG4ntNG1G7SSWSBtv2S7HSQZ42uMg5GM816Bpmt2Gq3F7bWk++axl8mdGBDK2OuD2PY9DUmr6Vba3pNzpt4m+C4Qow7j0I9wea4TQtY1HSrC9sv7LW917TbmK3vmQYlubboko7sdvYnsaQ9z0iikByAcYzS0xBRRRQAUUUUAFFFFABRRRQBk6/4Z0jxPZG01ayjuE/hYjDIfVWHI/Cq/hnw/aeDPD39nRXLNaQM8gkmwCqk55Pt61vVh69d6ZcT23hy/WaRtWWSMJExX5FXLEkEEDHH40AO0iwVtUvtcTVHvIL9Y/IRW/dxRqONuDg5JJzW1UVtbxWdrFbQII4YkCIg6KoGAKloAKKKQkAEnoKAOL8bs+s6lpPhKEnbfSefelR923jOSD6bmwPzrYtodFi8ZT+QxGriwjV4xnaIAzbcduuaxvBSnWtd1zxVJhknm+xWRzkCCI4JHszZP4VtQ3emN43ubRLRhqi2KSSXGOGiLsAuc+oJ6d6Bm5RRRQIRvun6Vx3wy/5FWX/AK/7n/0Ya7Fvun6Vx3wy/wCRVl/6/wC5/wDRhoGbviGy1K+0iSLSb37HfB0eOQ/dJVgdrexxg1owyCSMfOjMOH2HIDdxUlc7aQ6P4X1l7ZbiWOXW7lpo4WBMfmBcttOMLnGeTyelAjoq5Px9ptxPo8WsacudT0iT7Xb4zlwPvpx2ZcjHfiusoIyMGgCnpOp2+saTa6jatuguY1kU/UdPrVyuI8Ht/YPiLV/CTnEMbfbdPBP/ACxc/Mo9lbP5129ABRRRQBzfjuzub/wtJb2kDzTGeAhEGSQJVJ/QV0g6CiigAooooAKKKKACsPWLU63dW9naaybVrK5jnu4oG/eOo5VCQcqCcfUCtHU9Rt9I0u51C7fbb28Zkc98DsPftWE8+k+HdB1XxXFG6G8iF5KZmO5ztAROenYAdiaAKEqjxP8AEhIiN+neH0EjAj5XunHH12rz7E129c14E0mXS/DML3Qzf3rNd3bHqZH5OfoMD8K6WgbCiiigRW1BIJNNukuXKQNEwkYdlwcn8qreHobK38OabDpsxmsUto1t5Ccl4wo2n8RirOoGAabdG6Ba3ETeaB1K4Of0qt4eawfw5praWjJp5tozbK2ciPaNoOeemKANKiiigAriPGkLaFq2n+MrZDi2/wBG1BVH37Zj97/gLYP4129Q3drDfWc1pcIHhmQxup6EEYNAGToyXlnc3hvtViurW8uPNsNx+cKy5Ke4HOMdq3K868N6bDe2zeGtXaX7b4avFktpoztdoeTG3HYrlSPau10bWbLXtOW+sJC8JZk+ZSrBlOCCDyDkUDZoUUyWWOGMySyKiDALMcDk4FPBBGRQIKKKKACiiigArn9Y1vW7C+8mw8MT6jDtB89LmOMZ9MMc10FFAHH/APCUeKP+hFu//A6H/GqyeIfFTXbzT+AJCU4gkF5DvVSOQST6+ldzRQM4/wD4SjxR/wBCLd/+B0P+NH/CUeKP+hFu/wDwOh/xrsKKAOP/AOEo8Uf9CLd/+B0P+NUtX1/xjeaRd21n4LuYLiaJkjla9hIQkYzjPau9ooA8+0HUvEehaDY6XD4FuilrCse4XsI3EDluvc5P41bHiHxKLtp/+FfzBygUyi9g3kZ6Z9Pxrotf1yDw9pM2o3EFxNFChdhCmSAPqQBVix1GG90e31P/AFUM0Cz/ADn7qld3P4GkBzf/AAlHij/oRbv/AMDof8aP+Eo8Uf8AQi3f/gdD/jUx8dWY0v8Atn7Dd/2N5mz7cApGN23ftzu2574z7YrqI5EljWSNgyOAysDkEHvQByB8UeKMH/ihbv8A8Dof8a5nwFr+v2vh6SO18JXN3GbydjIt3EoBLnK4J7dK9Wb7p+leZeHfEkXhj4fSXbQmeeXVJre3gBx5kjSHAz27n8KAN7/hKPFH/Qi3f/gdD/jVW91rXbvyZbr4eTzNbP50Re8hbY4Bww568mrtz4j1PQNU0q311bSS21KXyEntUZPJmIyqsGY7geRnjp0rraAOG0/xv4i1OxivLbwPemKQZUtdxKfybB/SrP8AwlHij/oRbv8A8Dof8a2lOsx+KHDCF9Fe2G0jAeKUH9QQfwx+etTA8l8V654htL/TPFEvhK6tF0tmFw5uYnDwvwykKc9cEHtXUJ4r8TSRrInge6ZGGVIv4cEfnXV3lpBf2U9pcxiSCZDHIjdGUjBFcr4Bu5rS3vPC985a80ZxEjEY82A8xv8Alx+FIBf+Eo8Uf9CLd/8AgdD/AI0f8JR4o/6EW7/8Dof8a7CimBx//CUeKP8AoRbv/wADof8AGj/hKPFH/Qi3f/gdD/jXYUUAcf8A8JR4o/6EW7/8Dof8aP8AhKPFH/Qi3f8A4HQ/412FFAHH/wDCUeKP+hFu/wDwOh/xo/4SjxR/0It3/wCB0P8AjXYUjHAzxntk0AcFd+K/Ek91Hp0vw+uZo5ULyLLcxMhUe/3c5xwTmsLxTr2v6/qOneHf+ETuYmWVL64tvtUTebCjcKTnABbHX0r0DRjqen6Nc3XiO7iaYSSzNsxshiySFBwCQAOp5rH8B28uoNqHiu8QrcatJmBWGDHbLxGPx+975FIB48T+KAMDwLd/+B0P+NH/AAlHij/oRbv/AMDof8a7CimBx/8AwlHij/oRbv8A8Dof8aP+Eo8Uf9CLd/8AgdD/AI12Fch4k0+81zXo7K21680mK2tfOla2YAuWYhc5/wBxqAGP4l8TSxtHJ4DumRhhla9hII9DzTYPEPiO2gjgg8A3EUMahUjS9gCqB0AAPAq7pWmy+FNN1G+vtevtViSIyk3TA+WEBJxgd/6VgaLLq/iLwFceJX1G6t9SnWW4tUjfEcKqTsTZ91gQvJYE80gNb/hKPFH/AEIt3/4HQ/40f8JR4o/6EW7/APA6H/GtPwb4g/4Sjwnp+rlAkk8f7xR0DqSrY9sg1u0wOP8A+Eo8Uf8AQi3f/gdD/jR/wlHij/oRbv8A8Dof8a7CigDzC8uPFj+MLHX7TwZcRPHA9tdobyE+dGSCvOeCG/nWrb694ntLh1tvh88Ns+ZHEd5CrNITyTg459etd1RQFzyvx94g8QXXgbVYbrwjc2cDxAPcNdxOE+Yc4Bya8++HHxF8W2d9DpNvbTa3bMQBbtkvGPUP2H+9x9K9912y07xFY3fh25utrzxK8kcbjzAm772DnAJGM4p+heG9J8N2QtNJsoreP+IqMs59WY8n8aVh3VjShdpIEd4zG7KCUYglT6ccU+iimSFFFFABRRRQAUUUUAFZOteI9P0DyftxuP32dnk27y9MZztBx1rWowD2oA5P/hY3h/11D/wAm/8AiasWPjnRdQvYrSA3vmyttXfZSqM+5K4FdHgegowPQUAc18Qv+Sfa5/16P/KsHxFdzWXwJE0BIc6VBHkdgyqp/Qmt7x6lzc+ENQ0+zsri6ubuBo41hUHBPqSRiorDSjrXw6j0O+tZrWQ2K2sizKMqwQDcMHnB5pDKbW8S/BTyVUeX/Ymcf9ss5/Ornw0uZbv4c6JLMxZxBsyfRWKj9AKxvJ1//hXP/CLf2XKdV8j7B5pI8jy/u+Zvz02dsZz2rs9B0mLQtBsdLhOUtYVj3f3iOp/E5NAGg33T9K8EYyeV4Mz/AMe3/CST7/Td5o2/+zV7233T9K8w8P8AhqPxP8PntfONvcQarNcW04GfLkWQ4OO46j8aGCJvjRu/4R3R/L/1v9rQ7MeuGr0lfuDPpXI3Xh7VPEWqaVPrq2cFppsv2hYLaVpfPlAwrElV2gcnHOc119MDO13ShreiXenGeW3M6bVmiYhkbqCMHsccd6XTb22lMmnrfLdXlkqR3PZgxHUjtnrWhXP65JZ+G0uvEkWlPcXLLHHctB98xBuWx32gk+vH5AjoK4jxpE+harp/jK2QkWn+j6gqjl7Zjyf+A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phy_661	OPEN	The two columns of simple harmonics travel opposite each other along the x-axis, with wave speeds of both $v = 0.4$ m/s and amplitudes of both $A = 2$ cm. The two wave sources are located at $A$and $B$respectively, and the waveform when $t = 0$is shown in the figure<image_1>.$ The abscissa of the two particles M$and $N$are $x_1 = 0.40$ m and $x_2 = 0.45$ m respectively. When $t = 3.25$ s, what are the displacements of the particles $M$and $N$respectively?		The displacements of M and N are-2 cm and-(2 + \sqrt{2}) cm respectively.	phy	力学_机械振动与机械波	['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phy_662	OPEN_OnlyTxt	A series of simple harmonic shear waves propagates along the x-axis. At a certain moment, points A and B on the x-axis that are separated from S are in equilibrium positions, and there is only one wave peak between A and B. After t time, particle B reaches the wave peak. Try to calculate the propagation speed of this wave.		When the wave propagates to the right,$v_1 = \frac{\lambda}{T} = \frac{S}{6t}$($4n+3$); when the wave propagates to the left,$v_2 = \frac{\lambda}{T} = \frac{S}{6t}$($4n+1$), where $n = 0, 1, 2, \cdots$;	phy	力学_机械振动与机械波	['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phy_663	MCQ	As shown in figure a<image_1>, there are two wave sources,$S_1$and $S_2$, in the xOy plane, located at $x_1 =-0.2 $m and $x_2 = 1.2$ m respectively. The vibration direction is in the xOy plane and perpendicular to the x axis. The vibration images of $S_1$and $S_2$are as shown in figures b <image_2>and c respectively<image_3>. At t = 0$, the two wave sources begin to vibrate at the same time, with a wave speed of $v = 2$ m/s. The following statement is correct ()	['A. At $t = 0.2$ s, the particle at $x = 0.2$ m begins to vibrate and the direction is in the negative direction of the y-axis', 'B. At $t = 0.4$ s, the particle displacement at $x = 0.6$ m is 40 cm', 'C. The particle at $x = 0.7$ m is always in equilibrium position', 'D. After $t = 0.5$ s, the particle amplitude at $x = 0.8$ m is 40 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'phy_663_2.jpg', 'phy_663_3.jpg']
phy_664	MCQ	As <image_1>shown in the figure, small balls A and B of equal mass are connected by a light rod, small ball B is suspended at point O on the wall with an inextensible thin wire, and small ball A is moved from the position shown under the action of a vertical upward force F (ABO = 90°). Start moving upward along the vertical smooth wall until the light rod is horizontal, and the thin wire is always in a tight state throughout the process. The following statement is correct ()	['A. If the small ball A moves up slowly, the tension of the thin wire will gradually increase during the upward movement', 'B. If the ball A moves up slowly, the work done by the force F during the upward movement is equal to the increase in mechanical energy of the ball A.', 'C. If the small ball A moves upwards at a constant speed, the work done by the light rod on the small ball B during the upward movement is equal to the increment of the gravitational potential energy of the small ball B.', 'D. Compared with the two processes of moving the ball A up at a constant speed and moving up slowly, in the process of moving up slowly, the force F does more work.']	AD	phy	力学_相互作用	['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']	['phy_664.jpg']
phy_665	MCQ	<image_1>As shown in the figure, the two ends of the rope with uniform mass distribution and inextensible mass are respectively fixed at the P and Q high points of vertical rods M and N, and the distance between the two rods is d, then ()	['A. The tension at each point in the rope is equal', 'B. The lower the point in the rope, the greater the tension', 'C. If d decreases, the tensile force at point P decreases', 'D. If d decreases, the tensile force at the lowest point increases']	C	phy	力学_相互作用	['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']	['phy_665.jpg']
phy_666	MCQ	A classmate made a hand-operated alternator, as <image_1>shown in the picture. The large pulley and the small pulley are driven by a belt (the belt does not slip), and the radius ratio is 4:1. The small pulley and the coil are fixed on the same rotating shaft. The coil is a square with a side length of $L$made of enameled wire, a total of $n$turns, and a total resistance value of $R$. The magnetic field between magnets can be regarded as a uniform magnetic field with a magnetic induction intensity of $B$. The large wheel rotates at a constant speed of $\omega$, driving the small wheel and coil to rotate around the rotating shaft, which is perpendicular to the direction of the magnetic field. The coil is connected to a bulb with a constant resistance value of $R$through wires, slip rings and brushes. Assuming that the bulb can shine when generating electricity and operates within the rated voltage of $U_0$, the following statement is correct ()	['A. The angular speed of rotation of the large wheel,$\\omega$, cannot exceed $\\frac{\\sqrt{2}U_0}{nBL^2}$', 'B. The voltage across the bulb has an effective value of $\\sqrt{2}nBL^2\\omega$', 'C. If a multi-turn square coil with a side length of $L$is rewound with enameled wire with twice the original length, the bulb becomes brighter', 'D. If you only double the radius of the small wheel, the light bulb becomes brighter']	BC	phy	电磁学_交变电流	['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phy_667	MCQ	As shown in Figure A<image_1>, the number of turns in the primary coil of an ideal transformer is $n_1 = 3000$, the number of turns in the secondary coil is $n_2 = 1500$,$R_1$is a fixed resistance, and $R_2$is a sliding rheostat. All meters are ideal AC meters. The variation of the sinusoidal alternating voltage $u$connected to the input terminals $M$and $N$with time $t$is shown in Figure B<image_2>. The following judgments are correct: ()	['A. The expression for the primary coil connected to the alternating voltage is $u = 22\\sqrt{2}\\sin 100\\pi t(\\text{V})$', 'B. Voltmeter $V_2$shows $11V$', 'C. If the sliding blade $P$of the sliding rheostat is slid upwards, the indication of the voltmeter $V_2$becomes larger', 'D. If the sliding blade $P$of the sliding rheostat is slid downward, the number of the ammeter $A_1$will decrease']	AD	phy	电磁学_交变电流	['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'phy_667_2.jpg']
phy_668	MCQ	As <image_1>shown in the figure is a simplified schematic diagram of the principle circuit of a hair dryer. Both ends C and D are connected to an AC power supply of $u = 220\sqrt{2}\sin 100\pi t(\text{V})$. Place the contact switch S in different positions to blow hot air or cold air. The turns ratio of the primary and secondary coils of the ideal transformer is $n_1:n_2 = 5:1$. During normal operation, the power of the small fan A is $55W$, the rated voltage of the electric heating wire B is $220V$, and the rated power is $400W$. The following statement is correct ()	['A. The effective value of the input voltage across C and D is $220\\sqrt{2}V$', 'B. The period of the input voltage at both ends C and D is $50s$, and the frequency is $0.02Hz$', 'C. When only small fan A is working normally, the current through the primary coil of the transformer is $0.25A$', 'D. The internal resistance of the small fan is $60\\Omega$, and the resistance of the heating wire is $55\\Omega$']	C	phy	电磁学_交变电流	['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phy_669	MCQ	As <image_1>shown in the figure, the rectangular coil $abcd$rotates at a uniform speed around the axis $OO'$perpendicular to the magnetic field in a uniform magnetic field. The magnetic induction intensity is $B$, the coil area is $S$, the angular speed of rotation is $\omega$, and the number of turns is $n$. The coil resistance is ignored. The right side is connected to a step-down transformer. The fixed resistance is $R_1 = R_2$, the capacitor capacitance is $C$, and the meters are ideal meters. The following statement is correct ()	['A. Increase the angular velocity of coil rotation by $\\omega$, and the brightness of the lamp remains unchanged', 'B. Increase the angular velocity of coil rotation by $\\omega$, and the voltage indicator becomes larger', 'C. The coil rotates and the angular velocity $\\omega$is constant. When the switch S is adjusted from 1 to 2, the current meter number becomes larger.', 'D. The angular speed of coil rotation is constant, and when switch S is adjusted from 2 to 1, the power consumed by $R_1$becomes larger']	BC	phy	电磁学_交变电流	['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phy_670	MCQ	In the process of creating electrodynamics, Ampere encountered difficulties in facing the problem of electrostatic induction. Later, the famous genius physicist Kelvin came to help and proposed a wonderful electric imaging method. We felt the top wisdom of mankind from a simple example. The two points of point charges\(q_1\) and\(q_2\) are on the same horizontal line, and their distance relationship is as <image_1>shown in the figure. where\(q_1\) is positively charged,\(q_2\) is negatively charged, and\(q_2 =-2q_1\). Taking infinity as the zero potential surface, the potential at\(r\) from the point charge can be expressed as\(\varphi = \frac{kq}{r}\). During the process of moving another positively charged point charge\(q\) from point\(a\) along a circular trajectory through\(c\) to point\(b\)()	['A. The electrostatic force does positive work first and then negative work on\\(q\\)', 'B. The electrostatic force does negative work first and then positive work on\\(q\\)', 'C. The potential at the highest point of the circle\\(c\\) is zero', 'D. The electrostatic force never does work on\\(q\\)']	CD	phy	电磁学_静电场	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADwAXkDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAoqKe6t7ZQ080cQPQuwGaivtQt9PgWa4ZtjHauxCxJ/Cmot7ITkluy1RVUXyNp/2xIpmXbuCBCHP4GvEr34/XkPiF0g0mFtLSXaQ7ESsoOCc9AfbFJq241rse70Vl6VrceqhTHaXcSvGJFeaLapBx3/ABqVtZ09NQ+wPcBbkkAIykZJ6YOMGq5JXtYj2kbXuX6KTcoYLkbjzjNLUlhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFHSgAoqlZapbajLMlqXdYjgy7fkJ9Ae9NsdNNpPLcTXc1zPJwWc4UDsAvQVTja/NoyFK9uXVBBqZuNQe2jtLjy48hp2XamR2GeTQ9ldy6iJ21GRbZSCtvGgGf949SKv0U+a3woOW695la406yu5lmuLWKWRBhWdQcCrOMDFFFS22Uklqgrza8+Cfhe9199Td7tY5JDK9qjgRkk5PbIHsDXpNYtzrUkmvnRNPRGuY4BcXEsmdkKEkKMD7zEg8ZHAJz0yh3NhEWONY0UKigBQOgFKQCRkDiqumTXk+mwS6hbLbXbLmSJW3BT9at0AUb/SLHUmRrqAO6fdcEqw/EU++hvXgQWFxHDIp/5aJuDD09vrVuiq53p5EuEdfMqPdtY6cLjUCu5APNMKlgPcDripbW7t72BZ7aVZYj0ZTU1QyQH7NJFbsIGYHa6qPlJ74o0fqHvJ+RNRVKza7trN21OaAmMk+anygoO5z0PWrcciTRrJG6ujDIZTkGk1YalcdRRRSGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRSEgEAkZPQUAKelUNPl1C4aaS8gSCInEUWcvj1Y9Pwos7O7jvbi6u7oyFztjiTIREzxx6+9X6t2Wi1IV5Wb0GoiRoERVVR0CjAFOooqCwooooAKKKKACsCbwy3/CR3Os2WqXFnJdwpDcxoiMHCE7SNwO0jcR3HtW/RQAiKERVBJAGMk5P50tFFABRRRQAUUUUAIyh1KsAVIwQe9U4bODSrWf7Fbtg5k8pG6nHQZ4FXaKabWgnFPUqadqEOpW3nQ7hglXRxhkYdQR61bqveC4W0lNkI/tGMqHHyk+9FjcSXVnHNNbvBIw+aN+qmm19pbEp2fK9yxRRRUlhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFADJJY4U3yuqLkDLHAqmNMVtXOoSytIyrthQ/di9SPc+tFxZW2qyWs7TeZDC5cIjAo7DgE/Q5q/V35VpuRbmeq06BRRRUFhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFUtUW++yiTT3Xzo2DGNgMSDuue31q7RTTs7ikrqw2Ms0as67WIBK5zg+lOqhPHfJq1vNA++1ZSk0THG3uGHv2q/Q1YUXfQKKKKRQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFQXSLcQyWom8t5EIBUjcB0yPzqeqMWnBdXm1CSUyO6CONcY8te498mqjbcmV9kieztIrGzitYBiONdo/xqeiik3d3Y0klZBRRRSGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFUNLS+hWeG9bzAkh8mYkZdDyMj1HSr9UNWe9ito5bFd7pKpeMAEumcED88/hVx193uRPT3uxfoooqCwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAq6lDcXGnTw2sixzSKVV26DNS20C2trFApJWNAgJOScCqsyXr6zbFCUs442MhBHzscADHXjrV+rekUiFZyb+QUUUVBYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFQ3d1FZWc93O2yGCNpJG9FAyT+Qrj18U6tcN4eaFLWNtan3JayIS8VqFLlyQ33toHbALAc45AO2ooooAKKKKACiiigChpt5PcveRXEYR4JygIBAZeqn8jV+qVxqAt9TtLNozi5D7ZM9GUZxj6VdqpLra1yIPpe9goooqSwooooAKKKKACiiigAooooAKKKxNb1uSy1DTtKskjfUL922eZnbHGgy7nHXGQAOMkjpyaANuiud8Mazeazcax5zQvbWd4bWCWNCpkKgbyeT/ESOP7tdFQAUUUUAFFFFABRUS3Vu1y1ss8ZnVdxiDjcB6464qUnAzQBQ067nu5b3zY9kcU5ii4IJAAyfzq/VPTL9dT0+K8SMxrJnCk56Ej+lXKqekmrWJhrFO9woooqSgooooAKKKKACiiigAooooAKKKKACiiigAooooAr31nDqOn3NjcKWguImikAOMqwIP6GuI0bw8LDxi8hfUDa6bpn2aC8vOSzM3zYYjACqqDpg5J55Ndnqmq2OjWL3uoXKW9unV3PU9gB1J9hXGzfEqSWRhYeHLyeDtJPKkO4eynJ/PFVGEpfCrkynGPxOx0fg+9k1HwfpN3NP580tqjSS5BLNjnOO+a2647R/iDpt3cx2d/aT6TcSNtjFxgxux7B14z7HFdjSaadmNNNXQUUUUhhRRRQBVv57WzgF3dKNkTDDbclSTjI9OtcJ4i8T2dvrXiD+05Fkt9Hs0a30/PzTuyl2kK9wPlAPQfMa72+tre8spYLr/UMvz5OMAc5zSi3tZl8zyopBIgUuVDbl9M9xVaWJV+Z9jI8FWos/BulQ+c07eQGklZi2925Y5PUZJwfSt6kACgAAADoBS1JQUUUUAFFFFABRRRQAUUUUAFc54m0O2u5oNZzffbbCKRYks2IaZWAzGcA8Egc8Y9RTvE3jHTPC8aLcl5ruUZitIRmR/f0A9zXGP8UNckcPb6DaRxf3ZbhmY/iFwP1rOdWEPiZ0UcLWrK9ON0a2lQaz4c8BaWlhFax3mwvLazxMHmndtzRrgjbyW55wBnoK70ZIGetebWXjTQfEmoQWniPS2sbrOyCR5S0TE9gwxgn3AzXpKqqoFUAKBgAelVGSkrpmVSnOnLlmrMWiiiqICiikIyCM4oA80bXb/TdW8UeKU02G4sbe4isQzS7HaOPhtg2ncd8j9SM4A7V1PiTx14d8KSww6vfiKaYbliVC7Y9SB0H1ptj4QS30u00u6uzdWNtObjYybWmfeXBkOfm+c7uAMkD6V5r8V/hp4h1/xQNX0eFbuKWJI3jMqo0ZHH8RAx/wDXpMasew6ReafqGk211pUkUljIm6Jovu4+nY+1Qa54l0Xw3am41fUbe0QDIDv8zf7q9T+ArE8AeFbnw74Eh0e9uD9ofe7tbyf6vd2Vvb19a8x8ZfAXVbq8k1LR9ak1GVzuePUJP3p+knQ/iBTFZdD3axvItQsLe9hDiKeNZE3rtbaRkZB6cVYrz7T/AIezXOnW01x4q8YW07xq0kDamCY2xyuQuDg1Z/4Vt/1Ofi7/AMGQ/wDiKAO4orh/+Fbf9Tn4u/8ABkP/AIij/hW3/U5+Lv8AwZD/AOIoA7iiuH/4Vt/1Ofi7/wAGQ/8AiKP+Fbf9Tn4u/wDBkP8A4igDuKK4f/hW3/U5+Lv/AAZD/wCIo/4Vt/1Ofi7/AMGQ/wDiKAO4orh/+Fbf9Tn4u/8ABkP/AIij/hW3/U5+Lv8AwZD/AOIoA7iiuH/4Vt/1Ofi7/wAGQ/8AiKP+Fbf9Tn4u/wDBkP8A4igDuKK4f/hW3/U5+Lv/AAZD/wCIo/4Vt/1Ofi7/AMGQ/wDiKAN7WvFejeHryzttXu1s/thIhllGIywxkFuinnviteGaK4hWWGRJI2GVdGBBHsRXi3j74T6zq62Gn6Tq+sagC5kml1a+DwwgDAwNuSxyemeB711Xw8+GB8DpvfXb67kYZe3VilvuPfZzk++fwoAydWuX8S+LrqWU7rPT5WtrWPtuXiRz77sr9B71vWukBo87a5rSV+w6xqllLxLDfzbgeuGcup/FWBrvbC9jSLnHSvQu4U48pw2U6kuY5XWdFhlt5IZo1eNhhlI61q+BPEGNHvbDVbxQ+lOENxO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phy_671	MCQ	As <image_1>shown in the figure, the dotted lines a, b, c, and d are four equipotential lines in the spatial electrostatic field. The potential difference between adjacent equipotential lines is constant. A positively charged small ball with a charge of q is sleeved on a smooth insulating horizontal ring centered at point O. When the small ball is at point P, the small ball is given an initial speed to make the small ball move circumferentially along the ring. The ring and the equipotential line are in the same horizontal plane, and the intersection points with the equipotential line are A, B, C, and D respectively. When the small ball moves to point D, the force on the ring is exactly zero. The kinetic energy of the ball at point B is\(E_k\), the kinetic energy at point C is\(nE_k (n &gt; 0)\), and the radius of the ball is R, then the following judgments are correct ()	['A. The potential at point C is higher than the potential at point A', 'B. The speed of the ball at point C is faster than that at point A.', 'C. The absolute value of the potential difference between points A and B is\\(\\frac{(1-n)E_k}{q}\\)', 'D. The magnitude of the electric field force applied to the ball at point D is\\(\\frac{(2n-1)E_k}{R}\\)']	AC	phy	电磁学_静电场	['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phy_672	OPEN	As <image_1>shown in the figure, above the rough insulation horizontal plane, there is a uniform electric field horizontally to the right in the space to the right of the vertical line MN. Multiple identical non-charged insulation sliders are arranged on a straight line in the direction of the electric field, and the numbers are in order. 2, 3, 4... their spacing is L, and the distance between slider No. 2 and the boundary between MN is also L. Another positively charged slider numbered 1 enters the electric field from the left boundary with an initial velocity\(v_0\). The mass of all sliders is m, and the dynamic friction coefficient between them and the horizontal plane is\(\mu = \frac{v_0^2}{250gL}\). The electric field force applied to slider 1 is constant\(F_0 = \frac{mv_0^2}{750L}\). All sliders are on a straight line and can be regarded as mass particles. The sliders will stick together after touching. The gravitational acceleration is known to be g. Possible mathematical formulas are: \[1^2 + 2^2 + 3^2 + \cdots + n^2 = \frac{n(n+1)(2n+1)}{6}\] to find the maximum number of the slider that can collide.		6	phy	电磁学_静电场	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADSAhIDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAoJwMmimSukUTySEBFBLE9AKACKaKYExSI4HXawOKJJooQDLIiAnALHFeXfDS4Ft4s8WecBBDeJb6nEjAKEjkDHkdsDGajnabxr8WtIimB/snTrZ79bdwCrgnZG5HqTkgHooHQk0AerghgCCCD0IpaQAKAAAAOgFLQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFYXi2a6GhTWtlZT3U11iEiFc7EY4ds+ykkeprdqhrd1NZaNdXFucSxplTjPNOMeZpImclCLk+hyF94Vur34gtqmDFoj6XHDcxKvzTlZGYR464xjPqOO9S+C7K/bxV4l1nU9OuLSa8lSO1WVRj7PGMLggnBJJJFdwpyoJ9KWkUFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVR1i8ew0i5uo1VniTcA3Q/Wr1UdZuVs9IurhoVmVEJMb9G9jVQV5LS5nVdoSd7aF1TlQfUUtIpyoPtS1JoFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVR1ieG20i5muIRNEqEtGf4h6VeqjrD2sek3LXqM9sE/eKvUiqh8SIq/A/QuryoI9KWml0SLezBUAySTgAVm/8ACSaF/wBBnT//AAJT/GpLNSisv/hJNC/6DOn/APgSn+NH/CSaF/0GdP8A/AlP8aANSisv/hJNC/6DOn/+BKf40f8ACSaF/wBBnT//AAJT/GgDUorL/wCEk0L/AKDOn/8AgSn+NH/CSaF/0GdP/wDAlP8AGgDUorL/AOEk0L/oM6f/AOBKf40f8JJoX/QZ0/8A8CU/xoA1KKy/+Ek0L/oM6f8A+BKf40f8JJoX/QZ0/wD8CU/xoA1KKy/+Ek0L/oM6f/4Ep/jR/wAJJoX/AEGdP/8AAlP8aANSisv/AISTQv8AoM6f/wCBKf40f8JJoX/QZ0//AMCU/wAaANSisv8A4STQv+gzp/8A4Ep/jR/wkmhf9BnT/wDwJT/GgDUorL/4STQv+gzp/wD4Ep/jR/wkmhf9BnT/APwJT/GgDUorL/4STQv+gzp//gSn+NH/AAkmhf8AQZ0//wACU/xoA1KKy/8AhJNC/wCgzp//AIEp/jR/wkmhf9BnT/8AwJT/ABoA1KKy/wDhJNC/6DOn/wDgSn+NH/CSaF/0GdP/APAlP8aANSisv/hJNC/6DOn/APgSn+NH/CSaF/0GdP8A/AlP8aANSisv/hJNC/6DOn/+BKf40f8ACSaF/wBBnT//AAJT/GgDUorL/wCEk0L/AKDOn/8AgSn+NH/CSaF/0GdP/wDAlP8AGgDUorL/AOEk0L/oM6f/AOBKf40f8JJoX/QZ0/8A8CU/xoA1KKy/+Ek0L/oM6f8A+BKf40f8JJoX/QZ0/wD8CU/xoA1KKy/+Ek0L/oM6f/4Ep/jR/wAJJoX/AEGdP/8AAlP8aANSisv/AISTQv8AoM6f/wCBKf40f8JJoX/QZ0//AMCU/wAaANSisv8A4STQv+gzp/8A4Ep/jR/wkmhf9BnT/wDwJT/GgDUorL/4STQv+gzp/wD4Ep/jR/wkmhf9BnT/APwJT/GgDUorL/4STQv+gzp//gSn+NH/AAkmhf8AQZ0//wACU/xoA1KKy/8AhJNC/wCgzp//AIEp/jVe+8UaXFYzyWep6ZNcIhaOJrxFDsOgznjPrQBuUVwHh34v+F9ddLee4OnXZ4Md1hVz6B/u/nj6V3sciSxrJG6ujDIZTkEUAOooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACqOsi1bSLoXrMtsUO8r1A9qvVR1iK3m0i5jupTFAyEO4/hHrVQ+JGdX4JehbaOOWExuoeNl2lWGQQexrG/4Qvwv/ANC9pn/gKn+Fba42jHTFLUmhh/8ACF+F/wDoXtM/8BU/wo/4Qvwv/wBC9pn/AICp/hW5RQBh/wDCF+F/+he0z/wFT/Cj/hC/C/8A0L2mf+Aqf4VuUUAYf/CF+F/+he0z/wABU/wo/wCEL8L/APQvaZ/4Cp/hW5RQBh/8IX4X/wChe0z/AMBU/wAKP+EL8L/9C9pn/gKn+FblFAGH/wAIX4X/AOhe0z/wFT/Cj/hC/C//AEL2mf8AgKn+FblFAGH/AMIX4X/6F7TP/AVP8KP+EL8L/wDQvaZ/4Cp/hW5RQBh/8IX4X/6F7TP/AAFT/Cj/AIQvwv8A9C9pn/gKn+FblFAGH/whfhf/AKF7TP8AwFT/AAo/4Qvwv/0L2mf+Aqf4VuUUAYf/AAhfhf8A6F7TP/AVP8KP+EL8L/8AQvaZ/wCAqf4VuUUAYf8Awhfhf/oXtM/8BU/wo/4Qvwv/ANC9pn/gKn+FblFAGH/whfhf/oXtM/8AAVP8KP8AhC/C/wD0L2mf+Aqf4VuUUAYf/CF+F/8AoXtM/wDAVP8ACj/hC/C//QvaZ/4Cp/hW5RQBh/8ACF+F/wDoXtM/8BU/wo/4Qvwv/wBC9pn/AICp/hW5RQBh/wDCF+F/+he0z/wFT/Cj/hC/C/8A0L2mf+Aqf4VuUUAYf/CF+F/+he0z/wABU/wo/wCEL8L/APQvaZ/4Cp/hW5RQBh/8IX4X/wChe0z/AMBU/wAKP+EL8L/9C9pn/gKn+FblFAGH/wAIX4X/AOhe0z/wFT/Cj/hC/C//AEL2mf8AgKn+FblFAGH/AMIX4X/6F7TP/AVP8KP+EL8L/wDQvaZ/4Cp/hW5RQBh/8IX4X/6F7TP/AAFT/Cj/AIQvwv8A9C9pn/gKn+FblFAGH/whfhf/AKF7TP8AwFT/AAo/4Qvwv/0L2mf+Aqf4VuUUAYf/AAhfhf8A6F7TP/AVP8KP+EL8L/8AQvaZ/wCAqf4VuUUAYf8Awhfhf/oXtM/8BU/wo/4Qvwv/ANC9pn/gKn+FblFAGH/whfhf/oXtM/8AAVP8Kr33gnQZLGdLLQtIjuWQiN5LRCqt2JGOcdcV0lFAXPOfD3wY8M6MwnvY21S56lrgARg+yDj8816HDDFbwpDDGkcSDaqIMBR6AU+igLhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFUdYto7vSbm3lmWFHTBkbovvV6qOs2jX2j3VsrqjSIQGfoPrVQ0kjOqrwatfQuqMKB7UtIowoHoKWpNAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACqGtWkt9o11aw7fMkQhdxwM1frP1uCe50W6htgTM6EIAcHP1q6fxozqq9OStfRl9RhQPQUtIvCjPXFLUGgUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABWfrn2n+xbv7J5n2jYdnl/ez7VoVn63LcQ6LdyWu4TrGSm0ZOfpV0/jRnV/hy9GX1ztGeuKWkXO0Z64rm9T8YNpuoS2g8Oa9dCMgedbWgeNuM8HcM1BojpaK4/wD4T1/+hR8T/wDgCP8A4qj/AIT1/wDoUfE//gCP/iqB2O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phy_673	OPEN	<image_1>If a rectangular ABCD is symmetrically divided into two left and right squares with side lengths of d with MN as the boundary, and the midpoint of MN is O, there is a uniform strong field in both squares. The direction of the electric field in the left square is horizontal to the left, and the direction of the electric field in the right square is horizontal to the right. The electric field strengths of the two uniform strong fields are equal. MN is an equipotential line with a potential of\(\varphi_0 (\varphi_0 &gt; 0)\), and the potentials of AD and BC are both zero. A charged particle with mass m and charge-q(q &gt; 0) enters the left electric field at a certain speed from the midpoint of AM, perpendicular to the electric field, leaving exactly from point N, regardless of particle gravity. Calculate the speed at which the charged particle enters the left electric field perpendicular to the electric field;		\(\frac{1}{2n+1}\sqrt{\frac{q\varphi_0}{m}}\) (n = 0, 1, 2 stations)	phy	电磁学_静电场	['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']	['phy_673.jpg']
phy_674	OPEN	As <image_1>shown in the figure, the ion source C located below the x-axis emits a beam of positive ions with a specific charge of\(\frac{q}{m}\). The initial velocity range is\(0 \sim \sqrt{3}v\). The maximum velocity of this beam of ions after acceleration is 2 v. It is injected into the area above the x-axis from the aperture O (coordinate origin) at an angle of 30° with the positive direction of the x-axis. There is a uniform strong magnetic field with a magnetic induction intensity of B perpendicular to the paper surface above the x-axis. A sufficiently long detection plate parallel to the x-axis is placed at a distance d below the x-axis. The left edge of the detection plate is aligned with O. In the area below the x-axis and between the detection plate, there is a uniform strong magnetic field with a size of\(\frac{2mv^2}{9qd}\) and a direction perpendicular to the x-axis. Assume that the ions are uniformly distributed when they first reach the x-axis, ignoring ion interactions and ignoring gravity. Calculate the ratio of the number of ions reaching the detection plate to the total number of ions emitted\(\eta\).		\(\eta = 2:3\)	phy	电磁学_静电场	['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']	['phy_674.jpg']
phy_675	OPEN	As shown in Figure A<image_1>, parallel plates M and N with length a are located in the first and second quadrants respectively, perpendicular to the coordinate plane and parallel to the y-axis. The distances between the two plates and the y-axis are equal, and the lower ends of the two plates are on the x-axis. On the same, the rule of the voltage applied to the two plates varying with time is <image_2>shown in Figure B (both\(U_0\) and\(T_0\) are known in Figure B). In the third and fourth quadrants, there is a uniform magnetic field that runs inwards perpendicular to the coordinate plane. Positively charged particles with mass m and charge q are uniformly ejected from point P on the y-axis\(y = a\) along the negative direction of the y-axis. Each particle can enter the magnetic field and the time it takes to eject from point P to enter the magnetic field is\(T_0\). The particles ejected from the moment\(t = 0\) just enter the magnetic field from the lower edge of the N plate, regardless of the gravity of the particles and the interaction between the particles. The magnetic induction intensity of the magnetic field is\(\frac{6am}{qT_0^2}\sqrt{\frac{m}{2qU_0}}\). Find out: If a part of the upper sections of the M and N plates is cut off so that all particles can no longer enter the electric field after being ejected from point P after being deflected by the electric field and the magnetic field, what is the length of the cut off part?		\left(1-\frac{\sqrt{6}}{6}\right)a	phy	电磁学_静电场	['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'phy_675_2.jpg']
phy_676	MCQ	As <image_1>shown in the figure, two regular charges are fixed at two points M and N in the vertical direction, the charge amounts are both Q, O is the midpoint of MN, and an insulated circular coil with radius R is horizontally fixed between M and N, and the center of the circle coincides with O. Put a small ring with mass m and charge q on a circular coil. The dynamic friction coefficient between the ring and the coil is\(\mu\), and the angle between the line between the ring and the point charge and MN\(\theta = 37^\circ\). If a uniform strong electric field in the vertical direction (not shown in the figure) is applied to the spatial area and the ring obtains an initial velocity in the tangential direction of the line, the ring will just make a uniform circular motion. Given that the electrostatic force constant is k and the gravitational acceleration is g,\(\sin37^\circ = 0.6\),\(\cos37^\circ = 0.8\), the following statement is correct ()	['A. The ring must be negatively charged', 'B. The initial velocity obtained by the ring is\\(\\frac{3}{5}\\sqrt{\\frac{2kqQ}{mR}}\\)', 'C. The electric field strength of a uniform strong electric field is\\(\\frac{mg}{q}\\), and the direction is vertical upward', 'D. If the radius of the coil is reduced and the ring still moves in a uniform circular motion, the centripetal acceleration of the ring may not change.']	AD	phy	电磁学_静电场	['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phy_677	MCQ	As <image_1>shown in the figure, the voltage between two parallel metal plates placed vertically at a spacing of\( d \) is\( U \). There are uniform magnetic fields perpendicular to the paper in the I and II areas on the right side of the plate. The magnetic induction strengths are\( B_0 \) and\( kB_0 \) respectively. The width of the uniform magnetic field in area I is\( d \), and the magnetic field range in area II is large enough. Particles with zero initial velocity start from the\( O \) point on the edge of the plate. After the electric field accelerates, they enter the uniform magnetic field of region I in the direction perpendicular to the magnetic induction intensity. It is known that the mass of the particle is\( m \) and the amount of charge it carries is\( q \), regardless of the particle's gravity. The following statement is correct ()	['A. Particles move counterclockwise in the magnetic field of region I', 'B. When\\( U < \\frac{d^2q B_0^2}{m} \\), particles will not enter the uniform magnetic field of region II', 'C. If\\( U = \\frac{2d^2q B_0^2}{m} \\) and\\( k = 2\\sqrt{3} + 3 \\), the particle can return to its starting point\\( O \\)', 'D. The minimum value of the total time it takes for the particle to return to its starting point\\( O \\) is\\( \\left( 2 + \\frac{8\\sqrt{3}\\pi}{9} - \\pi \\right) \\frac{m}{qB_0} \\)']	ACD	phy	电磁学_电磁感应	['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phy_678	MCQ	As <image_1>shown in the figure, a sufficiently long smooth insulating slope with an inclination angle of\( 37^\circ \) is in a uniform magnetic field with a magnetic induction intensity of\( B \). The mass of the small ball that can be regarded as a particle is\( m \) and the charge is\( +q \). It slides upward from the bottom of the inclined plane at an initial velocity\( v_0 = \frac{mg}{qB} \) parallel to the inclined plane, and\( t \) the small ball leaves the inclined plane at the moment. It is known that\( \sin 37^\circ = 0.6 \) that the charged amount of the ball remains unchanged throughout the movement. The following analysis is correct ()	['A. The acceleration of the ball before it leaves the slope is constant', 'B. \\( t = \\frac{v_0}{5g} \\)', 'C. The magnitude of the impulse of the slope on the spring force of the ball before it leaves the slope is\\( \\frac{27mv_0}{10} \\)', 'D. The maximum height at which the ball can rise relative to the separation point after leaving the slope is\\( \\frac{16v_0^2}{25g} \\)']	AC	phy	电磁学_电磁感应	['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phy_679	MCQ	The magnitude of the current in the electrified long straight wire is $I$, and the direction is as shown in the figure. The current in the square electrified coil $abcd$with a side length of $2L$is also $I$, and the direction is as <image_1>shown in the figure. In the figure, the long straight wire is parallel to the coil, and the distance between the edge of $ab$and the wire is $ae = 2L$,$ae \perp ad$, and $O_1O_2$is the central axis of the coil. It is known that the magnetic induction generated by a long straight wire at a point around it satisfies $B = k \frac{I}{r}$,$k$is a known constant, and $r$is the distance from the point to the wire. The correct judgment on the magnetic distance applied to the coil (with the central axis as the reference axis) is ()	['A. Follow $O_1O_2$', 'B. In the direction of $O_2O_1$', 'C. Size is $\\frac{3}{2}kI^2L$', 'D. Size is $\\frac{5}{4}kI^2L$']	BC	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEpAPMDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigApskiRRtJIwVEBZmPQAU6qWr/8AIFvv+vd//QTQA7TNTs9Z02DUNPnWe0nXdHIvRhVuuJ+EX/JLdC/64t/6G1dtQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABVLV/wDkC33/AF7v/wCgmrtUtX/5At9/17v/AOgmgDlvhF/yS3Qv+uLf+htXbVxPwi/5JboX/XFv/Q2rtqACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArP1zW7Hw9pE+p6jL5dvCMnAyzE8BVHck4AFaFeV/GczRN4Xu7jz10S21JZb6SBdzRYxsbGDwPm7elAGxrPjPW9Gt9JvbjSrZF1C7jtk08ys1zh++QNoYDkryP8Aarr9X/5At9/17v8A+gmuY0Gbwzf6rDe6QZ9avMbW1B2MogX/AH2wq/7q8+2Mmuo1YZ0e9GQMwPye3ymgDlfhF/yS3Qv+uLf+htXbV578KNUtIfCGm6J5yNPbwnEisNkuWJ+Q9T19K6ceIJTMI/7E1MZbG4xLj69a2dConZo5li6LipJ6fM26KztR1R7CREXTry63DO6BAwHseadBqTz6fLdmwu42TP7l0AdsegzUezlbm6Gnt4czhfVeTL9FZNlrcl3dJA2k6hAGz+8ljAUfU5ovNbktLp4F0nUJwuP3kUYKnjsc1XsZ83LbUn6zS5ee+nozWoqhPqTwafHdiwu5GfH7lEBdc+ozTdO1R7+R1bTry12jO6dAoPsOan2crc3Qr28OZQvq/JmjRWJ/wkMvnbP7E1PG7G7ylx9etW9R1R7Bowun3d1vBOYEDbfrzVexmml3JWJpuLlfReTNCiqFtqT3FhLdGwuomjz+5kQB2wM8DNV7PXJLu6SFtI1CAN/y0ljAVfrzS9lLXyH9Yp6a77aM16Kyb3WpLO6aBdJ1CcLj95DGCp+hzU02pvFpsd2NPu3ZyB5CKDIv1GaPZS0fcPrFO7V9t9GaFFZ2naq9/I6Np15a7RndOgUH2HNVX8QyrMY/7E1MgNt3CIYPv1pqjNu1hPE0lFSvo/Jm3RWfqOpvYeVt0+7ut+f9Qgbb9eaW11J7mxluTYXcRjziGRAHfAzwM1Ps5cvN0K9tDmcL6/Mv0Vj2uuyXNykJ0jUYQ5x5kkYCr9TmnXutSWd00K6Vf3AAB8yGMFT+tV7GfNy21J+s0uXnvp6M1qKoS6m8empeCwu3ZsfuFQGQfUZpmnas9/M0babe2oVd26dAoPt161Ps5Wb7Fe3hzKN9X5M0qKxZfEEsc7xjRdTcKxXcsQIPuOelWtR1N7Dy9thd3W/P+oQNt+vNP2M7pdyViabTd9vJmhRWJP4osbDSJ9S1RZNNgh4xdlULnHReeSelVvC/jPTvFs12uncpbKhYlhnLZ7Dtgevek6cle/QqNaEmknudJRRRUGoUhAYYIBHoaWigBFVVGFUAewqnq/8AyBb7/r3f/wBBNXapav8A8gW+/wCvd/8A0E0Acf8ACeztp/hn4emlgjeWKJijsoJU726GujvpNbsrx7i3jjvbNsZgHyyJ64PesP4Rf8kt0L/ri3/obV21XCfK9Vf1MqlJSWjs+6/rX5kazIRGGOx3GRGxG78qkqhqej2mrIguFYSR8xyodrIfUGol+0aNpLGZ7jUWjPG1RvK/1xT5YyS5Xr2E6k4yfMvd7/5r/K5qUVR03WLLVYy1rMGZfvxnhl+oq9USi4u0lZmkJxnHmi7oKKKKRQUUUUAFFFFABVbUdQtdK0641C9lEVtbxmSRz2UCrNeV/tAXVxB8O4oIWKx3WoRQzY7ph2x/30q/lQBpeFpNT+IMTa/qctxZ6JI7Cw0+CQxmVAceZKynJyc4Xp9ayvHc/wDwrfVdB1rSJ5YLC5vBa31j5jNHIjDO9UJ4YAHke1emaVZxafpFnZwKFhghSNAB2AAFeVeMg3jv4s6H4bswJLLRH+26jJjKq2QQh9+AP+BH0NAHr4OQCO9LR0FFABWdpZvjLffbQdv2hvIzj/V8Y6Vo1laLfT3s2pLMwIgumiTAxhQBWkU+STMajSqQTb6/l1NWio554baB5p5UiiQbnd2AVR6kmuCu/iPPrF3Jp3gbS21m5Q7ZL18paQn3f+L6Dr2rM2O5vb60020ku725itreMZeWVwqqPcmuCl8fat4nle08BaUbqMEq+r3qmO1T/dzy5+n6ipbL4bvql5HqXjfU31u7Q7ktfuWkJ/2Y/wCL6nr3Fdw8lnplou94LW2jAUZIRFA6D0FAHGaX8NLV75NV8VXsviDVByrXI/cxeyR9APrUXg0Bfif48AAAElpwP+uRrurW6t723S4tZ454H+7JEwZW+hFcL4P/AOSo+Pf+ulp/6KNAHoFFFFABRRRQAVS1f/kC33/Xu/8A6Cau1S1f/kC33/Xu/wD6CaAOW+EX/JLdC/64t/6G1dtXE/CL/kluhf8AXFv/AENq7agAooooAhW0t0uHuEhjWdxtaQKNxHuaybWTXbK8S3u40vrZ2wLmMBGT/eX/AArcorSNSyaauZToptOLat2/VbDFmieV41kQyJjcoPK56ZFPrI1Hw/bX1x9rhkktL0dLiE4J+o7in3+qHR4Lc3EM88e3Es8aZ2kY5IHrT5FKyg7t9CPayhzOqrJdf62/LzNSioLS8t7+3We1mWWI9GU1PWbTTszeMlJXT0CiiikMKy/EXh+w8UaHc6RqUZe2nXB2nDKRyGB7EHmtSigDlLTw74jtdMTSx4nBto08tLgWY+0hB0G8sVzjjOz9ea0vDnhjS/C9i9tpsJBlbfPPIxaSd+7Ox5J/xrZooA5mPVL/AP4WXJpDzqbAaV9pWIIAQ/m7ck9TxXTVzQ0m/X4itrZSH7AdN+yZ83593mb87cdO3Ws/W/iTp1lfNpWiW02u6zyPsllyqH/bfoooA7RmVFLMQAOpNcDf+N7e1vJNP8IaPNrWpXLGVmhOLdSeN7yHgDjt1xVdfBfiHxgwn8b6oYrInI0XTnKRY9JHHL/T8jXWeGtDXQILq1hijitjOWgjj6KmAAP0rSNuWV2Yz5vaRstNfloctD8PtS8SzLeePNVa+UHcmlWhMdrH9ccuR6n9a720s7bT7VLWzt4re3jGEiiQKqj2AqeiszYZLLHBE8srqkaAszMcBQOpJrzT4neK9LvPAt5Y2MiXF7qAW3s1khOJjIQpaMsMNhWPK5xxVnxdNJ4j+ImjeDGbGmiE6jqCA489FOEjPqu4DI71S1+7t/E3xc8PaFAiPZ6Jv1C5k6KHHyoB9GwD78dqAPQtC0uPRdBsNLixstLdIQQMZ2qBn9K4/wAH/wDJUfHv/XS0/wDRRr0CvP8Awf8A8lR8e/8AXS0/9FGgD0CiiigAooooAKpav/yBb7/r3f8A9BNXapav/wAgW+/693/9BNAHLfCL/kluhf8AXFv/AENq7auJ+EX/ACS3Qv8Ari3/AKG1dtQAUUUUAFFFFABQRnrRRQBSnsStjLDp7pZSOdweOMEBu5x0Oar6XPq3mvb6pbR/IuVuYm+V/wAOoNatFWqnutNX/MydFcylFtW6dPu/y1I4Z4rhN8MqSJ03IwIqSsdfDttb6gl5YSy2h3ZliiP7uQehXoPwpbzX4dOvzb30E0MBxsucZjY+hI6VXs1J2p6/mQq7hG9f3fPp/wAD5mvRTUdZEV0YMrDIIOQRXN+JfHmh+GGW3uZ2udQfiKwtF82eQ9htHT8cVkdB01cj4h+ImjaHdDT7fzdU1duEsLFfMkz/ALRHCj6/lWL/AGf448c86ncN4X0V+lrauGvJV/2pOifQc9QRXXeHvCeieFrXyNIsI4N335T80kh9Wc8mgDkR4c8X+N/n8U350bSX/wCYTpz/ALyRfSWX+YHBz2rtdE8P6T4csRZ6RYQ2kA6iNeWPqx6sfc1p0UAFY2g3M1xNqomkZxHeOiZ/hXA4FbNUNNu7a6kvFt4fLMU7RyHaBuYYyeOtaR+CWhjUX7yGtt9O+hfooorM2OY17wLpniDXbPWpbm/tL+1QxCWyuDEXQ5+ViOccnpg80yD4faDbeJf7cjjmEwhSEQeZ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phy_680	MCQ	Magnetic focusing technology is often used in high-tech instruments such as electronic lenses. As <image_1>shown in the figure, the center of a semicircle with radius of\( R \) is\( O \),\( AC \) is the diameter,\( E \) is the midpoint of\( AO \), and\( F \) is the midpoint of\( OC \). There is no magnetic field in the area enclosed by parallel lines\( AB \) and\( CD \) and the semicircle, becoming the incident channel of electrons. There is a large enough space on the outside of the incident channel to have a uniform strong magnetic field perpendicular to the paper and inward. The velocity direction of the parallel electron beam is consistent with\( BA \), the velocity magnitude is\( v \), the mass of the electrons is\( m \), and the amount of charge is\( e \). These electrons will converge at one point after being deflected by the magnetic field. The following statement is correct ()	['A. The convergence point of magnetic focusing is the\\( A \\) point', 'B. To achieve magnetic focusing, the magnetic induction strength must be\\( B = \\frac{mv}{eR} \\)', 'C. The electrons passing through the\\( E \\) point reach the convergence point after moving\\( \\frac{4\\pi R}{3v} \\) in the magnetic field', 'D. The electrons passing through the\\( F \\) point reach the convergence point after moving\\( \\frac{5\\pi R}{3v} \\) in the magnetic field']	AB	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADkAUcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iisfxJa6vc6YG0S7FvewSCVFcZSYDqjegPrQBsUVw//AAsqxXSPntpf7e8z7N/ZAH74zegH93vu6Yrf8N22sQac0muXSzXk7mRo0HyQA/wL649aAsbNFFFABRRRQAUUVBeQPdWU9vHO8DyRsiyx/eQkYyPcUAT0Vwln4zbw15+l+Mp1guLaMyQ3mMJeRjuv+36rWj4Zk1zWL6TXNRMllYypttNOYfME675P9o+nagdjqqKKKBBRRRQAUUUUAFFcRd6nqHgvWpJtUnku/D15LkXL8tZOx6N/se/aiy1TUfGmsx3Glzy2nh2zlz9pUYa9cHouf4PfvQOx29FFFAgooooAKKKKACiuV8TQ63p19Hr+jyS3SQpsudNJ4lTOdyejj9ayp/Fs3jMx6V4SkdVkQNe37IQLRT/AM/8ALTrx2oHY7+iobO3+yWcNv5skvlIE8yQ5ZsDqT61NQIKKKKACiiigAorG8S6Rd6tp6f2ffyWd9buJYJFPylh2cd1Nct/wsG8lgGixaZIPFu/yWs2U7E4z527p5eOaB2PQqKyPDmk3Gj6X5V5fS3t3K5lmlkORvPUKOy+grXoEFFFFABRRRQAVj+JNeXw/pguBby3NxNIIba3iUkyyHoPYcE5PpWxRQB5t/wAILrTSf8JT9vVfFgPmBcfuNmMeQR6Y4z612HhvXv7e05pZLWW0u4HMVzbyqQY5B1APcehrZooHcKKKKBBRRRQAVBeXUdjZT3c27yoY2kfYpY4AycAdanooA85Phi7+IWdU8QefY2gU/wBm2iNteHPSVv8Aa6cdq3PDOq6tFeyaBr0LvewJvivUQ+Xcx9N2egb1FdVRQO4UUUUCCiiigAooooA4W/t7/wAc6rNp0sU9n4ctZdk+4FHvXU/dHcJ796NPt9Q8DapDpsUc974cuZNlvtBd7Jj/AAnuU9D2ruqKB3CiiigQUUUUAFFFFAHK+JrrWr6+j0DRopbbzk33OolflhjzjCHu5/SsiXwpceCCmq+FUlljRAL+wZy32kDrIM/8tP516DRQO5DaXAu7OG4EckYlQPskXay5HQjsamoooEFFFFABRRRQBi+JdR1LT9PRdJsHu764cRRcfJGT/E57AVzf/CuWjshqEWoS/wDCUh/POpEn53xjYR/zzxxiu+ooHcyPDmpX+paZv1Owksr2JzFKjfdZh/Ep7qa16KKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVT1PUYtMsmuJFZ2yFjjX70jnoo9zVqWRIYmkkOEUZJ9BXGoYvFUsmtSX99Y2di7R2yxKEY44aRgynr0HHT60AV/htf6lq1x4ovtUlV511V7UKh+SNYgBtX2Gfx6967yvPPg6GXwndmYTLczajcTyCdCrnc3BOQOoANeh0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcx8RNSg0nwBrN5Oivtt2WJWH/LRvlT/x4ivPvIjtdM8Maf4WvZbjxNHJC15LBOzLs6yedzgjnHPpxXR/EW8hvdb8OaJN5n2L7ct3fOI2KBIxuVWIH8R4qB4n8QfFTR9S0O0lgsdPikF7eGIxrMGBwgzjdzg0AemUUUUAFFFFABRRRQAUUUUAFFRzzLBC8rBiEXcQoyT9BWdZzX2qQ3BuLZrO2kXbD8/733J7CqUW1foRKaT5epoPcRIJCXBMa7mVeSB9Kp2OrjUJmWG0uliC5E0qbVY+gzz+lSafpNnpob7PHh3+/IxJZvqTV2m3FXS1ElUdm3b+u5mWk2sy3Q+1WlrBbc5AlLv7Y4xWVqa+OGvHGkvoCWwJ2/a45SxHb7prqKzLGG4TWdSkkVhDIU8sk8HC84p3Uk9EibODirt6/oc75XxM/wCfnwp/35uP/iqXy/iZ/wA/PhT/AL83H/xVdpRWZvc4vy/iZ/z8+FP+/Nx/8VR5fxM/5+fCn/fm4/8Aiq7SigLnF+X8TP8An58Kf9+bj/4qjy/iZ/z8+FP+/Nx/8VXaUUBc4vy/iZ/z8+FP+/Nx/wDFUeX8TP8An58Kf9+bj/4qu0ooC5xfl/Ez/n58Kf8Afm4/+Ko8v4mf8/PhT/vzcf8AxVdpRQFzi/L+Jn/Pz4U/783H/wAVR5fxM/5+fCn/AH5uP/iq7SigLnF+X8TP+fnwp/35uP8A4qjy/iZ/z8+FP+/Nx/8AFV2lFAXOL8v4mf8APz4U/wC/Nx/8VR5fxM/5+fCn/fm4/wDiq7SigLnF+X8TP+fnwp/35uP/AIqjy/iZ/wA/PhT/AL83H/xVdpRQFzi/L+Jn/Pz4U/783H/xVHl/Ez/n58Kf9+bj/wCKrtKKAucX5fxM/wCfnwp/35uP/iqPL+Jn/Pz4U/783H/xVdpRQFzi/L+Jn/Pz4U/783H/AMVR5fxM/wCfnwp/35uP/iq7SigLnF+X8TP+fnwp/wB+bj/4qjy/iZ/z8+FP+/Nx/wDFV2lFAXOK8r4mf8/HhT/vzcf/ABVdfai4FpCLsxG52DzTECE3Y5255xnpmpqKBBRRRQAUUVj+JdT1DR9LF9Yaf9uEUga4hVsP5X8RQd2HBx9aANiisdPFGjN4cOv/AG6IaaI95lJ6e2Ou7PGOueKb4Z1a+1vTmv7vTzZQyuTaxuf3jRdmYdieuKANqoJruGKZLcyos8oPloe+KZqGoQabaNcTltoIAVRlmJ6ADuajt9Nhj1CbUGLvPMAAX/5Zr/dHpVqKtdmcpO/LHfr6EWm6bPbzSXd7ctPdyjBwSEQeij+tadFFKUnJ3ZUIKCsgoormY/HOlz317ZwW2pzz2Unl3Cw2Uj7G64yBipKOmrLsZbh9Z1NJC5hQp5YPQfLzinaJrlnr9m91ZLOqRytEyzwtEwZeoKsAaZYai1zrOpWpkRktygQDGRkZNXHaX9dUZVPij6/ozVoooqDUKKKKACiiigAooooAKKKbJIkSF5HVEAyWY4AoAdRVHTdZ0/WEmfTrqO6jhfy2kiOU3dcBuh/Cr1ABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABVTU9Ts9H02e/v51htYV3O7fy9yegFW6palpFhq6QJqFqlwkEwnjV+QHGcHHfqetAHkbaBqc17/wmSaKW0YXP2r+wyTudcf6/Z03/AMW2vXNJ1ay1zTIdQ0+dZraZcqw7ex9CPSrtZH2fS/DVtc3FvaiFbmYPIsQ5eRjjgetCi27IJSSV30HxtZ6zeGTY7fYZiqsful8c49cVqVWsbGDTrRLa3BEa5+8ckknJJNWaubTdlsZ04tK8t3uFFFFQaEN3cJaWc1zKQscSF2J7ADNeW+A7nX4tIt7+HTYceINUM73TTZdIiSclNv8AcQgc9cV3XjHStR1zwze6Vps8MEt3GYmllydqnrjHfGRWeumeKrTw7BpWmSaVamKBYVmIdiuBjIHrQBu6paTnQ9Sh0vbDezQS+S/TEpUhT+eK+dvhv4d8V23xIt3ayvrcwSk3skyMBtOchieue3r1r6UtIBa2cNuHZ/KQJvc5LYGMk+tVbOe3k1W/ijg2TRlPMf8Av5HFNRvd9hOfK0u5oUUUUhhRRRQAUUUUAFFFFAAeleQfEL4beLNfeSez8QPewdRYzHywO+Bjg/j+dev0UDTseUeAvCfiCPw1HZya5qmjTWzsklp9nj2g5zuUkfMD65Peun/4RLX/APod9S/78Rf4V2FFFgucf/wiWv8A/Q76l/34i/wo/wCES1//AKHfUv8AvxF/hXYUUBc4/wD4RLX/APod9S/78Rf4Uf8ACJa//wBDvqX/AH4i/wAK7CigLnH/APCJa/8A9DvqX/fiL/Cj/hEtf/6HfUv+/EX+FdhRQFzj/wDhEtf/AOh31L/vxF/hR/wiWv8A/Q76l/34i/wrsKKAucf/AMIlr/8A0O+pf9+Iv8KP+ES1/wD6HfUv+/EX+FdhRQFzj/8AhEtf/wCh31L/AL8Rf4VtaHpV/paTLfa1c6mZCCpnRV2YznG0Dr/StaigVwooooAKKKKACiiigAooooAKzr5LO71CztJ2fzkb7TGg6Hb3P4mtGs5beB9fa5E4aeOAIYsfdBOc/jVw0bZnU1SXdmjRRRUGgUUUUAFFFZ99rmm6dO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phy_681	MCQ	As shown in <image_1>, three nucleons, namely protium \(^1_1\text{H}\), deuterium \(^2_1\text{H}\), and tritium \(^3_1\text{H}\), start from rest and are accelerated by the same accelerating voltage \(U_1\) (not shown in the figure). Then they are deflected by the same deflecting voltage \(U_2\) and enter a bounded uniform magnetic field perpendicular to the plane of the paper and pointing inward. The trajectory of protium \(^1_1\text{H}\) is as shown in the figure. Among protium \(^1_1\text{H}\), deuterium \(^2_1\text{H}\), and tritium \(^3_1\text{H}\), which one has the largest distance between the point where it enters the magnetic field and the point where it exits the magnetic field? ( )	['A. Protium ^{1}_{1}H', 'B. Deuterium ^{2}_{1}H', 'C. Tritium ^{3}_{1}H', 'D. impossible to determine']	C	phy	电磁学_电磁感应	['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phy_682	MCQ	As <image_1>shown in the figure, in the second quadrant of the plane rectangular coordinate system, there is a uniform strong magnetic field along the positive direction of the y-axis. In a regular triangle area in the fourth quadrant, there is a uniform strong magnetic field (not shown in the figure) with a direction perpendicular to the coordinate plane and a magnetic induction intensity of $\frac{2\sqrt{3}mv_0}{ql}$. There is a charged particle (regardless of gravity) with a mass of $m$and a charge of $-q$, which is emitted from the $P$point in the second quadrant (-l, \sqrt{3}l)$is emitted at an initial velocity of $v_0$parallel to the x-axis, and the electric field is emitted from the $M$point $\left(0, \frac{\sqrt{3}l}{2}\right)$on the y-axis. After passing through the first quadrant, it enters the fourth quadrant and passes through the magnetic field of the regular triangle area, and finally leaves the fourth quadrant perpendicular to the y-axis, then ()	"[""A. The angle between the particle's velocity and the negative direction of the y-axis as it passes through the $M$point is $60\\circ $"", 'B. The electric field strength of a uniform strong electric field is $\\frac{\\sqrt{3}mv_0^2}{qL}$', 'C. The minimum area of the magnetic field in the regular triangle region is $\\frac{\\sqrt{3}}{4}L^2$', ""D. The shortest time from the beginning of a particle's movement to the second time it reaches the y-axis is $\\frac{2L}{v_0} + \\frac{\\sqrt{3}\\pi l}{18v_0}$""]"	BC	phy	电磁学_电磁感应	['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phy_683	OPEN	As <image_1>shown in the figure, a sufficiently large baffle is fixed in the planar rectangular coordinate system xOy. The included angle between the baffle and the negative direction of the y-axis is $\alpha = 30^\circ$. The x and y-axes intersect at points P and Q respectively. The length of $OP$is $l$, there is a small hole K on the baffle, and the length of $KP$is $\frac{l}{2}$. There is a uniform strong electric field perpendicular to the xOy plane in the $\triangle OPQ$area. The electric field intensity is $E$, and the direction is as shown in the figure. In the areas except $\triangle OPQ$in the first quadrant and the fourth quadrant, there are uniform strong magnetic fields parallel to the y-axis on both sides of the baffle, with the magnetic field intensity being $B$, and the direction is as shown in the figure. The particle $A$with a mass of $m$and a charge of $+q$is now released from the point $\left(\frac{l}{2},-\frac{l}{2}\right)$. The particle can pass through the small hole K vertically. Regardless of the thickness of the baffle, particles can pass through the small hole K at any angle, and particles that collide with the baffle will be absorbed by the baffle, regardless of the particle gravity and the interaction between the particles. If the above two particles $A$and $B$pass through the small hole K and hit the two points $M$and $N$on the baffle respectively, find the distance $d$between the two points $M$and $N$.		\sqrt{3}l	phy	电磁学_电磁感应	['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phy_684	OPEN	As <image_1>shown in the figure, in the xOy coordinate plane, there is a circular uniform magnetic field area with radius R in the second and third quadrants, the center of the circle is located at the position of $O_1(-R,0)$, and the magnetic induction intensity is $B$, and the direction is perpendicular to the xOy coordinate plane and inwards; in the first quadrant, there are orthogonal uniform electric fields and uniform magnetic fields, and the direction of the electric fields is along the negative direction of the y-axis. The magnitude and direction of the uniform magnetic field are the same as those of the second and third quadrants. There is a P point on the boundary of the circular magnetic field, and the distance between the P point and the y-axis is $\frac{3R}{2}$. A particle with a mass of $m$and a charge of $q(q&gt;0)$enters the circular uniform magnetic field region from point P in the direction perpendicular to the magnetic field, and enters the orthogonal electromagnetic field region from the coordinate origin O in the positive direction of the x-axis. Given that the electric field strength is $E = \frac{\sqrt{3}qB^2R}{2m}$, regardless of the gravity exerted on the particle, find the coordinates of the point where the trajectory of the charged particle in the first quadrant is tangent to the x-axis.		\sqrt{3}n\pi R (n=1,2,3,\cdots)	phy	电磁学_电磁感应	['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l0+6df3ttIQTGwODz3HofSpNV+1jTJ3sX23KLvTIyCRzgj3rmv8AhL/EH/Qj6p/3+i/+Ko/4S/X/APoRtU/7/Rf/ABVA4uzuY/hPXdS1TXp4Io0hSeb7RcsBkgAAYGemSP1r0qvNNGvdY0a+1C5i8EamTdyblHmxfIvXb971J/Stn/hL/EH/AEI+qf8Af6L/AOKpyab0OnF1IVKl6asrI6XVryew0q5urWzkvJ40Jjt4/vSN2FeZxeC/Emj3o8dQyJdeJJSTfaeFAjkgbH7pDjhl2jDdyPwrp/8AhL/EH/Qj6p/3+i/+Ko/4S/xB/wBCPqn/AH+i/wDiqRynW20pntopmieJnQMY3+8pI6H3rn/GeoX+laaLy1CyQHMU8TDs3AYHse341S/4S/xB/wBCPqn/AH+i/wDiqrah4i1vUtOuLObwNqnlzIUP72LjPf73brTW5rRlGFRSkroteAr++1HT90wWOzt0EMSKPvEdWJrsa890XW9c0bSYLGPwRqbeWPmYSxDc3c/erQ/4S/xB/wBCPqn/AH+i/wDiqHuPETjOrKUVobHie+1ay0g/2JYfbNQmYRRBvuRk/wAb/wCyOtcTong3Vvh5qcF/pjSavDqTKurx7VDiUknzo8YwoLHK+lb3/CX+IP8AoR9U/wC/0X/xVH/CX+IP+hH1T/v9F/8AFUjE7KvPPG+sajpWoR28iJNaO63EDMMFSp5XI6jPPrzWj/wl/iD/AKEfVP8Av9F/8VWPr+oazr0NskvgjU1MEwkB82I5Hcfe704uz1OnCVIU6qdRXR2+gy3tzpENzqDDz5/3hVRgID0UfhWnXGL4u15VCr4G1QADAHnRf/FUv/CX+IP+hH1T/v8ARf8AxVIwnLmk2lYseNP7dvreHQ9Ettp1AMlzqEgBjtYv4jju5HAFZPhHw7qPgHV00GzilvvDt1ukiuDjzLWUDkPjGVbHB7Hir3/CX+IP+hH1T/v9F/8AFUf8Jf4g/wChH1T/AL/Rf/FUEnYsNylQSMjGR1FeXP4g1xPFX2MxwnUQPsgl28EE/f29M459Paug/wCEv8Qf9CPqn/f6L/4qsZr7WG8Trrf/AAg+p+YItmzzYvvf3vvenFUmkdeFqwp83Or6aep6TGpSNVZixAALHqfenV5/rHiXWrzR7uCfwdq9tG0TZnS4jVosDO8HdwR1/CvL/AHxb8eT3a6e2lyeI4Fbbv2bZUA9ZANp9fmBJ9ak5D6QoqG0mluLSOWe3e2kZctC7AlD6EgkUUATUUUUAQ3ccc1nNHNnymQh8dcY5qPTXt5NNt2tWLQeWBGW6kVZZQ6FT0IxVHSIre2sBa20/nJAxQnuDnpVr4H6mT0qp+T9en/BL9FFFQakazwtM8KyoZUALIGG5QemRR58Pn+R5qedt3eXuG7Hrj0rzv4kH+wr+w8Q6LJjxIzi3is1Ut9vjzyjKPTqG7VZ+GEVvqOn3HiO7uzd6/eMVvy6lTasD/qAp+6q/r1oA7+iiigAooooAxtR0Dw74klWXUNO0/UZLclA0sayGM9x7fSp73VtM0TSLy6kmhjtdPiLSqhH7sAZxgdD6CvMfHl7eeDfE73Xg+Qy6jqMLvqGnLEZFVQOLnA+6w9P4qdr/huG5+CF6PD1w+pzXZjvLq5HMl2Q6s5PuAPu9sYoA6rwxFf+K7Bde1uSeKC7G6006OVkSKL+EvtI3sevPA4xVbwjql1b+PPEfhh7qa6s7NYp7dpnLvEHHMe48kcZGa1oPFuh2Pha1u4LhZUECLFbQfNKxwAECDnPasPwrpWqeH9E1/xXqdtG2uajvvJLZ5CoijUZWMsAeQB6UAeh0hIUEkgAckmqmk3j6ho1jeyKqvcW8crKvQFlBwPzq2QGBBGQeCDQA2GaK4iWWGRJI2GVdGBB+hFJDPDcx+ZBKkqZI3IwYZHBGRXh3iG+n8K6/f8Ah3w5qckPh64dW1GRIjINILt8wRhwAw7fw17JoOmafo+iWljpaqtlGg8sqc7ged2e5JOc+9AGjRRRQBxd/cMfi3o8CkbBp85cd9wIx+hNRya1eeKvGF1oGl3MlrpemYOo3cJxJLIekKN/CO7MOewIzmqlwYZPjVpkkFwZN2n3IcdkYFBiq3w1eDQJvEmn6rMltqB1OWdvOYL5iMcqwJ6jFXU3t6GVG/K27at7epP4xnfwZq3hu/0y5uQl3qMdldWrztIs6PxuwxPzDrnr616LXnT2k3jvx/p+peU6+H9DYyQyOuBdXPYqP7q8HPqK9FqDUKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAKGtLYPpFyuqDdZFP3y84ZepBxyR7VmaXrXhm1ttMt9Ke2jhvkBtY7aLAK9ug4HBHPpWhqmuafpJjiupl+0Tg+Rbj78xHZR3NcR8LDHpJ1nw3cwrHqFnqMpCICwELAOhye3zECgD0miiigAooooAKzrO1jsdTuwLhSbpvOWHGCMAAn37Vo1m6jYmW8sr9Jlhe0cl2bo0ZHzCtKb3i3a5jWW0krtP/gP8DSopEdZEDowZWGQR0IpazNjLHh7Tv8AhIm114mkv/KEKu7EiNf9kdBnviktvD2nWev3Os20TRXd1GEn2MQsmOjFem73rVooAKKKKACiiigDK03w7p2lX9/fW8JN1fvvnmkYszei5PRR6Uuj+H9P0Frz+zomiS6lMzxbiUVj12joM+1alFAFeKws4ZjNFaQRynq6xgMfxqLV7WW+0a9s4NgluIHiUuSFG4EZOAfWrtFAFHRbSbT9DsbKcoZbeBIWMZJU7VAyMgdcVdZd6MuSMjGQcGlooAxtJ8LaRo2jy6XbWitbTlmn8072mLdS5PLE1Z0TRrTQNKi02x8wW0Jby1kcuVBJOAT2GeK0KKACmTSJDC8kjqiKMlm6Cn1m6tbLqUI09bhI2cq8i9WaMHnA/IZqoJOST2IqScYNxV30OMSxWw+K2gIJfNMmnXchkxjcWdDXez2NpdOr3FrBMy9DJGGI/OuQ1FQvxh8PqowBpVyAP+BJXb0Sk5NthCChFRWyEACgAAADoBS0UVJYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAMaGJ5EkeNGdPusVBK/Q9qFijWR5FjUO+NzActjpk0+igAooooAKKKKACmyRrLG0bgFWBBB7g06igNzN0qAaZCunSXSSMu5oVJwwjzx9cVpVn6lpgvpLeeKUw3Nu4ZJAM8d1PqCKs2t7b3nmeRKH8tyjjBBVh1GDWk/e9/7zCn7j9m9Ettd1/wAAm3AkgEZHUUbhu25GeuK898fzS+Eb+Dxdp1xuuGZLafTmYn7apPAQDOHGeOKsfDpH1u2fxhfX6XV9qK7RDCx8u0jB4iAP8Q7k96zNzu6KKKACiiigBAwbOCDjjigMCSAQSOvtXk/jTWrv4aa497pU6XcOriR5NNlZi0EgXPnrgHCDHzD8vbtPBOkLp+i/bH1H+0rvUCLm4uw2VkYj+EdlA4FAHS0UUUAFFFIyh0KsMqwwRQAAhgCpBB6EUBgwyCCPavFtX1vUfAusyeDtM1WF7K+KmC5uGZm0kO2CHODwc/Lk/wD1/V/D+jW+gaHbadbSySpGCTLI25pGY5ZifckmgDQlljhjaSV1RFGWZjgAVRsdP8vULrUZJVmkuMCMgcJGOgH86iuo7fX0EMV1mCCfFwig4cgZ25/LpWqAFUKBgAYArR+5G3V7mCtUnzNaLZ+ZxWp/8lj0D/sF3X/oSV21cTqf/JY9A/7Bd1/6EldtWZuFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFZ8tlHaXU+p28TvOYiGiQ4EhHT8a0KKqMnHYicFLc5ey0nTNd8QR+JnnluJYI/Kgtpfu2rfxHb2Y+tW9N8L2mkeIb7VbGWSFL4Az2i48ppP8AnoB2Y9/Wr93azJBNJpohiunIYsy8Pjsf8adY3ks1srXkH2WcsUMbMDk/7J7iqlFP3o7fiRCbTUJ79+n9eRcooorM2CiiigDA07wnZWWs6jq07veXt98rST4Plxdo1HZf51J4d8NW/hmK6t7KeY2csxlit3OVgz1VPbPOK26KACiiigApHBZGAYqSMAjtS015EjALsqgnAycc0Ac3pfgbSNP0W90+4Rr9tQZnvbi5+aS4Y9yfbsB0pNAhhtLA+G7a7u72K1Rka8dhlASdqbu5AOPwrUE2p3GqbEhW3somwzyctL/ujsPer8FvDbR+XBEkaZJ2qMDJrWyhvuYXlVdo6Lrdb+n+f3dxlnZwWFqltbptjQcD19zU9FFZttu7NoxUVZbHE6n/AMlj0D/sF3X/AKEldtXE6n/yWPQP+wXdf+hJXbUhhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVVvtPttSt/Juow65yD0Kn1B7GrVFNNxd0TKKkuWSujMaO90zT0S0Vr5kbnzpMOV9Ae5+tSxapD9jS4uwbIM2zbcEKQavVHPbw3MRiniSWM9VdQR+tXzp/EvmZ+zlH4H02e3+Y5HWRA6MGU8gg5Bp1Z40e1isJLS032kbvvJgbaQeOn5UW9hd21pNENRlmkb/VvKoJT8utLlj0Y1OorJx+5/wCdjQorPsrfU4jJ9rvIpgVwm2LaQfU802yttUjuN95fRSx4I2JFt5+uaHBa+8vxBVZO3uvX00/E0qrzX1pbzJDNcxJLIQqIzgFifQVUg0qZL0XM2p3c21iRGSFT6EDrU8Wk2EN090lpELh23GQrls/U9KdoLd3FzVZLSNvXt8v8yCW/vm1D7Nbae5jVgJJ5TtXHfb3NOfRrefUvtty0k7KQYo3b5I/oPWtGij2jXw6B7FS+N31v6f15hRRRWZsFFFFAHE6n/wAlj0D/ALBd1/6EldtXE6n/AMlj0D/sF3X/AKEldtQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBxOp/8lj0D/sF3X/oSV21Z02iWc+v2utOH+2W0LwRkN8u1iCcj8BWjQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf//Z']	['phy_684.jpg']
phy_685	MCQ	<image_1>As shown in Figure A, there is a magnetic field perpendicular to the plane of the coil inside the circular coil. The known coil area is $0.5 $m$^2 $, the number of coil turns is $n = 20$, and the total resistance of the coil is $r = 2 \Omega$. The change of magnetic induction strength in the coil over time is as shown in Figure B. Assuming that the magnetic field direction and the induced current direction shown in the figure are positive, the following pictures of the changes in the electromotive force $E$, induced current $I$, thermal power $P$, and Joule heat $Q$of the coil over time $t$are correct ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	AD	phy	电磁学_恒定电流	['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', 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phy_686	MCQ	<image_1>The circuit used by a student to study long-distance transmission is shown in the figure. Terminals a and b are connected to an AC power supply with a voltage effective value of $U_0$. The step-up transformer $T_1$and the step-down transformer $T_2$are both ideal transformers, and the turns ratio of the two transformer coils is $\frac{n_1}{n_2} = \frac{n_3}{n_4}$. It is known that the resistance values of $R_1$and $R_2$are both $R_0$, and the resistance value of $R_3$is $\frac{R_0}{2}$. The resistance values of $R_1$and $R_2$consume the same power. Both meters are ideal AC meters. The following statement is correct ()	['A. Boost transformer $T_1$turns ratio of coil $\\frac{n_1}{n_2} = \\frac{1}{2}$', 'B. The voltage meter shows $\\frac{3}{4}U_0$', 'C. The current meter shows $\\frac{3U_0}{4R_0}$', 'D. If $R_3$is disconnected, the ammeter number will increase']	BC	phy	电磁学_恒定电流	['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']	['phy_686.jpg']
phy_687	MCQ	As <image_1>shown in the figure, the upper end of a smooth guide rail with an inclination angle of $\theta$and a spacing of $d$is connected to a coil with a self-inductance coefficient of $L$. There is a uniform magnetic field with a magnetic induction intensity of $B$in the space perpendicular to the plane of the guide rail. Now a conductor rod with a mass of $m$is released from rest somewhere on the guide rail. Since the total resistance in the circuit is extremely small, the conductor rod then performs simple harmonic motion on the guide rail. The maximum speed of the conductor rod is equal to the product of circular frequency and amplitude. That is,$v_m = \omega A$, and the gravitational acceleration is $g$. The following statement is correct ()	['A. The amplitude of the simple harmonic motion of the conductor rod is $\\frac{mgl\\sin\\theta}{2B^2d^2}$', 'B. The maximum current in the loop is $\\frac{2mg\\sin\\theta}{Bd}$', 'C. The maximum kinetic energy of the conductor rod is $\\frac{m^3g^2L\\sin^2\\theta}{2B^2d^2}$', 'D. The period of simple harmonic motion of the conductor rod is $\\frac{2\\pi\\sqrt{mL}}{Bd}$']	BCD	phy	电磁学_电磁感应	['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phy_688	MCQ	As <image_1>shown in the figure, two parallel metal rails $MN$and $PQ$are placed on a horizontal plane. The left ends of the rails are curved smoothly upward. The spacing between the rails is $L$, and the resistance is not counted. There are two bounded uniform and strong magnetic fields in the space where the horizontal section guide rail is located, which are separated by a certain distance without overlapping. The left boundary of magnetic field I is at the leftmost end of the horizontal section guide rail, and the magnetic induction intensity is $B$, and the direction is vertical upward; The magnetic induction intensity of magnetic field II is $B$, and the direction is vertical downward. The two magnetic fields are placed along the vertical guide rails of metal rods $ab$and $ef$with a required mass of $m$and a resistance of $R$in the connected circuit. The metal rod $ef$is placed on the right boundary of magnetic field II (there is a magnetic field at the boundary). Now release the metal bar $ab$from rest from a height of $h$on the curved guide rail to move along the guide rail. The metal rod $ab$is uniform before leaving the magnetic field I. Assume that the two metal rods are always perpendicular to the guide rail and in good contact during movement. The gravitational acceleration is $g$, and the following statement is correct ()	"['A. When the metal rod $ab$slides down and enters the magnetic field I, the current direction in $ef$is $f \\rightarrow e$', 'B. The moment when the metal rod $ab$slides down and enters the magnetic field I, the current magnitude in $ef$$I = \\frac{BL\\sqrt{2gh}}{2R}$', 'C. Joule heat generated in the loop $Q = \\frac{mgh}{2}$during the movement of the metal rod $ab$in the magnetic field I', ""D. If the metal rod $ab$enters the magnetic field I at a speed of $v'$and exits the magnetic field I after a time of $t_0$, the amount of charge passing through the cross section of $ef$during this time $q = \\frac{BL(2d-v't_0)}{2R}$""]"	BCD	phy	电磁学_电磁感应	['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phy_689	OPEN	An experimental team designed an <image_1>automatic control circuit as shown in Figure A. When a vehicle passes by at night, the street lights in front will be lit up;$R_{G1}$and $R_{G2}$are photoresistors of the same specification, and the relationship between their resistance values and light intensity is as shown in Figure B<image_2>.$R_1$and $R_2$are resistance boxes with an adjustment range of 0 to 100 kΩ.$D_1 $and $D_2$can be regarded as ideal diodes.$K_1$and $K_2$are coils of electromagnetic relays. When the voltage between the b and c poles of the transistor reaches 0.6V, the transistor is turned on, so that the circuit from the positive pole of the power supply to the negative pole of the power supply through the electromagnetic relay and the e and c poles of the transistor is conducted. The electromagnetic relay attracts the armature (not shown), thereby closing the switch and lighting the street lamp. The purpose of diodes $D_1$and $D_2$is		Prevent the self-induced electromotive force generated by the power failure of the coil from damaging the transistor and provide a path for the release of self-induced current	phy	电磁学_恒定电流	['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'phy_689_2.jpg']
phy_690	MCQ	As <image_1>shown in the figure, an insulated smooth arc groove is fixedly placed on the horizontal desktop. The long straight wire MN is placed on the arc groove parallel to the bottom edge AA'of the arc groove. A current I of M→N is passed through the wire. The entire space area There is a vertical upward uniform magnetic field (not shown in the figure). When MN is at rest, the angle between the MO line and the vertical direction\(\theta=30^{\circ}\). The supporting force of the arc groove for the wire MN is\(F_N\), and PP' is equal to the center of the circle O. The following statement is correct ()	"['A. If the current I is only slowly increased a little, the wire MN moves upward along the arc groove', ""B. If only the magnetic induction intensity is slowly increased, the wire MN may slowly move above the PP'along the arc groove"", 'C. If only the magnetic field direction is slowly rotated by 45° clockwise,\\(F_N\\) decreases first and then increases', 'D. If only the magnetic field direction is slowly rotated by 60° counterclockwise, the maximum tangent value of the angle between the MO line and the vertical direction is\\(\\frac{\\sqrt{2}}{2}\\)']"	AD	phy	电磁学_电磁感应	['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']	['phy_690.jpg']
phy_691	MCQ	As <image_1>shown in the figure, there is a uniform magnetic field perpendicular to the paper in the ABC area of the right-angled triangle (including the boundary). The magnetic induction intensity is B. There is an ion source at the apex A, which simultaneously shoots out a group of positive ions with different speeds along the AC direction. The ion masses are all m and the charge amounts are both q. It is known that BAC=30°, and the BC side length is L. Regardless of the gravity of the ions and the interaction force between the ions, the following statement is correct is ()	['A. Ions ejected from the AB boundary must be ejected in parallel at the same time', 'B. The time for ions ejected from the BC boundary to move in the magnetic field is not less than $\\frac{\\pi m}{3qB}$', 'C. The velocity of ions ejected from the BC boundary is not less than $\\frac{\\sqrt{3}BqL}{m}$', 'D. When an ion is ejected perpendicular to the BC boundary, all ions in the magnetic field are on a straight line at an angle of 15° to the AB boundary.']	ACD	phy	电磁学_磁场	['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phy_692	MCQ	As <image_1>shown in the figure, a positively charged particle with mass m and charge q (ignoring particle gravity) is vertically injected into the orthogonal vertical downward uniform strong electric field E and the horizontal inward uniform strong magnetic field B along the OO'direction at a speed of $v_0$. The rate of passing through the P point in the area is $v_p$, and the amount of lateral shift at this time is s. If $v_0=\frac{2E}{B}$, the correct one of the following statements is ()	"['A. Rate of charged particle at point P $v_p=\\sqrt{\\frac{2qEs}{m}+v_0^2}$', 'B. The acceleration of charged particles is constant at $\\frac{qE}{m}$', 'C. If $s =\\frac {mE}{qB^2}$, the time it takes for the particle to enter the area to point P is at least $\\frac {\\pi m}{2qB}$', ""D. The Lorentz force is always less than the electric field force during the particle's motion""]"	BC	phy	电磁学_磁场	['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']	['phy_692.jpg']
phy_693	MCQ	As <image_1>shown in the figure, there is a uniform magnetic field with a magnetic induction intensity of B perpendicular to the paper and directed inwards. Point O is on the boundary and there is a particle source, which can emit particles with directions perpendicular to PQ and upward and different initial velocities. The maximum value of the initial velocity is v. The particles enter the magnetic field region when emitted from point O. Finally, all particles pass through the horizontal line PQ at an angle of 30° from the left side of point O to the lower left. The mass of all particles is m, and the absolute value of the charge is q. Regardless of particle gravity and interaction between particles, the following statement is correct.()	['A. The greater the initial particle velocity, the longer it takes to reach the horizontal line PQ from point O', 'B. The momentum change of the particle with the largest initial velocity from point O to passing through PQ is $\\sqrt{3}mv$', 'C. The position where the fastest particle leaves from the horizontal line PQ is $\\frac{(\\sqrt{3}+1)mv}{qB}$', 'D. The minimum area of the uniformly strong magnetic field region is $(\\frac{\\pi}{3}-\\frac{\\sqrt{3}}{4})\\frac{m^2v^2}{q^2B^2}$']	BD	phy	电磁学_磁场	['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']	['phy_693.jpg']
phy_694	OPEN	As <image_1>shown in the figure, the researchers set up the following scenarios when studying the controlled trajectory of charged particles. There is an xOy plane rectangular coordinate system in space. In the first quadrant, there is a uniform strong electric field with a direction along the negative direction of the y-axis. The electric field intensity is $E_1$. In the fourth quadrant, there is a dividing line ON. The angle between the x-axis and the positive direction of the x-axis is 45°. There is a uniform strong magnetic field perpendicular to the paper surface and outward. The researchers injected positively charged particles into the electric field perpendicular to the y-axis from point P on the y-axis at a distance of d from the origin O at a velocity of $v_0$. After being deflected by the electric field, they entered the magnetic field through point D on the x-axis (not shown in the figure). After moving in the magnetic field for a period of time, they were ejected from ON at a velocity perpendicular to the y-axis direction. It is known that the specific charge of a particle is $\frac{2}{2Ed}$, regardless of the particle's gravity, if you change the magnitude of the magnetic induction intensity B, the trajectory of the particle entering the magnetic field for the first time is exactly tangent to ON and then enters the electric field again. Find the total time from point P to when the particle enters the magnetic field for the n-th time.		$(16n+3n\pi-3\pi-8)\frac{d}{4v_0}$	phy	电磁学_磁场	['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phy_695	OPEN	As <image_1>shown in the figure, in the rectangular coordinate system xOy, there is a uniform strong electric field in the negative direction of the x-axis in the first quadrant, and the electric field intensity is $E=10^3 \text{V/m}$; In the third quadrant, there are two uniformly strong magnetic field areas bounded by OM, and the directions are both perpendicular to the inward direction of the paper. The magnetic induction intensity of the left magnetic field is $B_1=20\text{T}$, and the magnetic induction intensity of the right magnetic field is $B_2=40\text{T}$. The angle between the boundary OM and the negative direction of the y-axis is 30°; In the fourth quadrant, there are both a uniform magnetic field directed perpendicular to the paper and a uniform strong magnetic field directed outward along the negative direction of the x-axis. The magnetic induction intensity is $B_3=5\text{T}$, and the electric field intensity is $E=10^3 \text{V/m}$. There is an existing charged particle with a charge amount of $q=+10^{-5}\text{C}$and a mass of $m=2\times 10^{-6}\text{kg}$emitted from point A in the first quadrant in the negative direction of the y-axis at a speed of $v_0=100\text{m/s}$. After being deflected by the electric field, it enters the third quadrant from point O at an angle of 30° to the negative direction of the x-axis. Regardless of the gravity of charged particles. Find: The magnitude of the particle's displacement in the y-axis direction from the second pass through the y-axis to the third pass through the y-axis.		$(16-4\pi) \, \text{m}$	phy	电磁学_磁场	['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']	['phy_695.jpg']
phy_696	OPEN	As <image_1>shown in the figure, there are four identical rectangular areas long enough in the vertical plane, all with a height of d. There is a vertical downward uniform strong electric field in area I, and there is a uniform strong magnetic field perpendicular to the paper surface in areas II, III, and IV. The magnetic induction intensity ratio is 6:2:1. A horizontal baffle is placed on the lower boundary of area IV, which can absorb particles hitting the plate. At the zero time, positively charged particles with charge q, mass m, and initial velocity of $v_0$are uniformly emitted from point O in all directions (90° range) on the paper. Among them, the particles emitted horizontally to the right enter Region II for the first time. The velocity direction is 60° from the horizontal direction and just passes through the lower boundary of Region II. Particle gravity and interactions between particles are ignored. Request: The ratio of the number of particles hitting the baffle to the total number of particles ejected $\eta$.		\frac{1}{3}	phy	电磁学_磁场	['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phy_697	OPEN	As <image_1>shown in the figure, the first and second quadrants of the plane rectangular coordinate system xOy have uniform magnetic fields with magnetic induction intensity of B inward perpendicular to the plane. In the third quadrant, there is a circular area with radius a and tangent to the two coordinate axes. There is the same uniform magnetic field. There is a linear particle emitter MN on the y-axis, and the coordinates of the upper and lower ends of the emitter are M respectively.(0, - $\frac{1}{5}a$), N (0, - $\frac{8}{5}a$), the emission source can uniformly emit positively charged particles with charge q and mass m along the negative direction of the x-axis, and all particles enter the second quadrant through the tangent point P. It is known that the upper surface of the particle receiver AB with a length of $\frac{2}{5}a$on the x-axis receives the largest number of particles per unit time. There is a uniform magnetic field (not shown in the figure) with a vertical plane inward in the fourth quadrant. The motion trajectories of any two particles that are not received by the particle receiver in the fourth quadrant have intersections. Regardless of the interaction between the particles, the motion of the particles after leaving the fourth quadrant. Ask: The condition satisfied by the magnetic induction intensity B'of the uniform magnetic field in the fourth quadrant.		The magnetic induction intensity B'of the uniform magnetic field in the fourth quadrant satisfies the condition of $2B \leq B'\leq \frac{3\sqrt{11}-1}{2}B$	phy	电磁学_磁场	['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']	['phy_697.jpg']
phy_698	MCQ	As shown in the figure<image_1>, the vacuum area has concentric squares ABCD and abcd, with their corresponding sides parallel. The side length of the ABCD is fixed, and the side length of the abcd is adjustable. A constant and uniform magnetic field is filled between the two squares, and the direction is perpendicular to the plane where the square is located. There is a particle source at A, which can emit particles with different speeds and equal specific charges one by one. The particles enter the magnetic field in the AD direction. Adjusting the side length of abcd can allow particles with appropriate velocity to pass through the magnetic-free region through the ad edge and then be ejected from the BC edge. For particles that meet the above conditions, the following statements are correct: ()	['A. If the angle between the velocity direction and the ad edge when the particle passes through the ad edge is 45°, the particle must be ejected perpendicular to BC.', 'B. If the angle between the velocity direction and the ad edge when the particle passes through the ad edge is 60°, the particle must be ejected perpendicular to BC', 'C. If a particle is ejected perpendicularly to BC through the cd edge, the angle between the velocity direction and the ad edge when the particle passes through the ad edge must be 45°.', 'D. If a particle is ejected perpendicularly to BC through the bc edge, the angle between the velocity direction and the ad edge when the particle passes through the ad edge must be 60°.']	AD	phy	电磁学_磁场	['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']	['phy_698.jpg']
phy_699	MCQ	An athlete jumps horizontally from a ski jumping platform at different speeds of $v_0$to a slope with an opposite inclination of 45° (as <image_1>shown in the figure). It is known that the height of the jumping platform is h, regardless of air resistance, and the acceleration of gravity is g, then the following statement is correct ()	['A. If the athlete falls on the slope with the shortest displacement, the time spent in the air is $\\sqrt{\\frac{h}{2g}}$', 'B. If the athlete falls on the slope at a speed perpendicular to the slope, the time spent in the air is $\\sqrt{\\frac{2h}{3g}}$', 'C. If the athlete falls to a certain position on the slope at its lowest speed, the time spent in the air is $\\sqrt{\\frac{2h}{5g}}}$', 'D. The minimum speed for the athlete to fall on the slope is $\\sqrt{(\\sqrt{5}-1)}$']	BD	phy	力学_曲线运动	['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']	['phy_699.jpg']
phy_700	MCQ	As <image_1>shown in the figure, the ratio of turns between primary and secondary coils of an ideal transformer is 2:1, the output voltage of the power supply is $u = 30\sqrt{2}\sin 100\pi t(\text{V})$, the constant resistance is $R_1 = 20\Omega$,$R_3 = 2.5\Omega$, and the maximum resistance value of the sliding rheostat is $5\Omega$.$a$and $b$are the two endpoints of the sliding rheostat. Now place the sliding rheostat slide $P$at the $b$end, then ()	['A. The current meter indicates $\\sqrt{2}A$', 'B. The voltage meter indicates $10V$', 'C. The slider $P$slides slowly from $b$to $a$, and the power consumed by $R_3$decreases', 'D. The slider $P$slowly slides from $b$to $a$, and the output power of the transformer decreases']	C	phy	电磁学_交变电流	['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']	['phy_700.jpg']
phy_701	MCQ	As <image_1>shown in the figure, in the triangular ACD area, there is a\quad uniform magnetic field perpendicular to the paper. The magnetic induction strength is B,\angle C=30^{\circ},\angle D=45^{\circ}, AO is perpendicular to CD, and OA length is L. There is an electron source at point O, which uniformly emits electrons with a rate of v_0 in all directions within the magnetic field in the ACD plane. The velocity direction is represented by the angle\theta with OC. The electron mass is m, the electric charge is-e, and v_0=\frac{B e L}{m}, the following statement is correct ()	['A. Electrons ejected from the AC side account for one-sixth of the total number of electrons', 'B. The electrons emitted from the AD side account for half of the total electrons', 'C. Electrons emitted from the OD edge account for one-third of the total number of electrons', 'D. Among all electrons emitted from the AC side, when\\theta=30^{\\circ}, the time taken is the shortest.']	B	phy	电磁学_磁场	['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']	['phy_701.jpg']
phy_702	MCQ	The figure <image_1>shown is a schematic diagram of the particle flow beam expansion technology. The square regions I, II, III, and IV are symmetrically distributed. A proton beam with the same velocity can be expanded after being injected. The distribution of bounded magnetic fields (the boundaries are all circular arcs) in the four regions may be correct ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	C	phy	电磁学_磁场	['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', 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'phy_702_2.jpg', 'phy_702_3.jpg', 'phy_702_4.jpg', 'phy_702_5.jpg']
phy_703	MCQ	<image_1>As shown in the figure, the mass is $m = \frac{\pi}{10} \, \text{kg}$, and the length is $L = 1 \, \text{m}$.(The horizontal conductor bar $ab$with resistance $R_a = 1 \Omega$, and the fixed resistor with $R = 1 \Omega$is connected to the ring with a wire. The entire device is in a uniform magnetic field with a direction vertically downward and a magnetic induction intensity of $B = \sqrt{\pi}$. The conductor bar $ab$rotates at a constant speed around the central axis $OO'$of the two rings at a rate of $v = 2 \, \text{m/s}$under the action of an external force $F$.$ab$is recorded as the moment at the lowest point of the rings as $t=0$. The gravity acceleration $g$is taken as $10 \, \text{m/s}^2$. The ammeter is an ideal AC meter, and other resistances are not counted. The following statement is correct ()	['A. The current meter displays $1 \\, \\text{A}$', 'B. Voltage across the fixed resistor $u_R = 2\\sqrt{2} \\cos \\pi t \\, (\\text{V})$', 'C. During the process from $t=0$to $0.5 \\, \\text{s}$, the amount of electricity passing through conductor bar $ab$is $0.5 \\, \\text{C}$', 'D. In the process from $t=0$to $0.5 \\, \\text{s}$, the work done by the external force $F$is $3 \\, \\text{J}$']	AD	phy	电磁学_恒定电流	['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']	['phy_703.jpg']
phy_704	MCQ	<image_1>As shown in the figure, it is an ideal transformer. The turn ratio of the primary and secondary coils is $k$. The effective value of the sinusoidal AC power supply voltage connected to both ends of the primary coil is constant, and the internal resistance is negligible. The primary coil is connected with a fixed resistor $R_0$, and the secondary coil is connected with fixed resistors $R_1$,$R_2$and a sliding rheostat $R_3$. The connection of four ideal AC meters is as shown in the figure. Now slide the sliding contact of $R_3$downward a little, and the absolute values of the change in the indication of the meter $V_1$,$V_2$,$A_1$, and $A_2$are $\Delta U_1$,$\Delta U_2$,$\Delta I_1$, and $\Delta I_2$respectively, then the following statement is correct ()	['A. The number of indications of voltmeter $V_2$is reduced and $\\frac{\\Delta U_1}{\\Delta I_1} = R_0$', 'B. The number of indications of voltmeter $V_1$increases and $\\frac{\\Delta U_1}{\\Delta I_1} = R_1$', 'C. The number of indications of ammeter $A_2$is reduced and $\\frac{\\Delta U_2}{\\Delta I_2} = \\frac{R_0}{k^2}$', 'D. Ammeter $A_1$increases and $\\frac{\\Delta U_2}{\\Delta I_2} = 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']	['phy_704.jpg']
phy_705	MCQ	<image_1>In the circuit shown in the figure,$MN$is a pencil lead with uniform thickness and texture, the power supply electromotive force is $E = 3\text{V}$, the internal resistance is $r = 0.5\Omega$, and the constant resistance is $R = 2\Omega$. It is known that when the contact $P$of the wire is connected in the middle of the pencil lead, the pencil lead consumes the largest electrical power, regardless of the resistance of the wire. The following statement is correct ()	['A. The total resistance value of pencil lead $MN$is $2.5\\Omega$', 'B. The total resistance value of pencil lead $MN$is $5.0\\Omega$', 'C. As the wire contact $P$moves from $M$to $N$, the power of the resistor $R$keeps increasing', 'D. As the wire contact $P$moves from $M$to $N$, the output power of the power supply keeps decreasing']	BC	phy	电磁学_恒定电流	['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phy_706	MCQ	<image_1>As shown in the figure, half of the single-turn square metal wire frame $abcd$with a side length of $L$is in a bounded uniform magnetic field with a magnetic induction strength of $B$(there is a magnetic field perpendicular to the left side of the vertically fixed shaft $OO'$in the figure. The magnetic field inward of the paper), and the wire frame rotates around the shaft $OO'$at a constant speed of $\omega$. During the rotation of the wire frame, the midpoints of $ab $and $cd$are connected to the right circuit to deliver current to the small bulb. The resistance of the bulb and wire frame is $R$, excluding the contact resistance of $P$and $Q$. Starting from the shown position, then ()	['A. In the illustrated position, the rate of change of wire frame magnetic flux is zero', 'B. The direction of current changes when the wire frame turns over $90^\\circ$', 'C. The maximum EMF generated by the wireframe is $BL^2\\omega$', 'D. The ideal voltmeter in the figure shows $\\frac{\\sqrt{2}BL^2\\omega}{8}$']	A	phy	电磁学_恒定电流	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADJASwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigDmvGXig+HbS0t7SJbjV9SnFtYwMeGc9Wb/ZUcn8B3qj4jsNQ0rwZqWqDXb06nZWkl0JgwEZdFLbdmMbTjGOuD1zVLxhYXNt8RvCniV4pZtLsvPguPLTf5BdCFcgc4yQCe2Kl8Xi78b2qeG9G8xbC5ZTqOobSqJCCCUQn7zNjHHAGc0AdN4Z1V9c8MaZqksflyXVukrJ6EjmtWobS1isrOG1gXZDCixovooGBU1ABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUVSfWNOj1aPSmvIf7QkQyLb7suVHU47D60AXaKrX0lzFbbrSJZJd6ja3TaWG49fTNVNd8Q6X4askvNXufs1qziPzijMqsemcA4+p4p20uK+tjUorN0zxFoutIG0zVrK8B7QTq5H1AORWkSAMmkMKKM0UAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFcD4KurDTta1fTNTZIPEk95LKxm4e5hLHyyhP3lC4GB0wa76s7WNA0rX7ZbfVbCC7jU5XzFyUPqp6g/SgB2rpcyafttN3nebGflODjeM/pmm69Z6Zf6De2mseUNPliKzmZgqhfUk9Mdc1zOoeAoLez/4lWo63C+9AI49RkKhdwzgEnHGaux/Dzw8ZklvYbnU3Q5X+0Ll7gKfZWJH6Vb+FfP9DNJe0b8l6df6fyPOvgl4FtrDUtb1aWCG8s1nWPSr105dVLbnTPY5XnuQcV28s0usfETUra9lI0rRbKKUW2SFlll3He/qFCEAHjnPau2REjRURQqKMBVGABVOfR9Pub4Xs1qjXAUKX5G4A5Ab+8Aemc4qDQ88kvNbTw/4OW4uzPr+o6qk2YjwtsWZ3XjgoIsAj8u1eo1n2mh6ZY3jXdtZRR3BUoHAyVUnO1c/dGewwK0KACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACmugkRkb7rDB5p1NfdsbZjdjjPTNAGFPqMuhMtrNm5WXi1Yths5xtcntyPm/r107C0kt1eS4lMtzKQZGydo9Ao7AVHb6WmyZ73bczzjbKzDK7f7qjsv/wCupNPtrizV4JJRLAuPJZid4HofXHY0zecouNlv18y5UVxAlzbvC5YKwxlSQR7gipajuPO8h/s+zzcfKX6A+9IxW5iPqt1Z3A0pwst8+PImP3WU/wATehGOnft7a9la/ZINjSvK7Hc8jnlif5fSqyaNbGykgmzK8x3SzHh2b1B7Y7Y6VYso7mGDy7qVZmU4WQDBZe2femzWcote7/w/9dv6Vmq95ai7g2CR4nB3JIhwVI6H3+lWKr3iXMkGy1kWJ2ODIwztHcgdzSMo7mQNVup7j+yF2pfjIkmH3Agx8y+pOR8vbvx12ra3S1tkgQsVUdXYsSe5JPeqb6NbGxW2jLI6NvSYHLh/72e59fWrdqLgWyC6MZmHDGPOD702a1JRa93+vP8ArYmqrfWr3CI8ExiniO6Nu30YdwatVzs2rvf+Jrvw0oa1eK3juTLu+aaJiVOzHTDDBPvxSM4aSK95qd9rED2VlE0U8ToLso/I+YAhCOoxk59OOvTqERY41Rc7VGBk5rF1nS2XTYTpUXlXVu6CExHbhdw3A46rjORWwrskAecqrKuXIPA9fwq38K/rsE5Rc3y7aaff/Xl+clFcRZ+NPEOq2wvdK8FzXVhIW8i4Oowx+aoJAYK3IBxmrH/CR+MP+hCk/wDBtBUEnX0VyH/CR+MP+hCk/wDBtBR/wkfjD/oQpP8AwbQUAdfRXH/8JH4w/wChCk/8G0FL/wAJH4w/6EKT/wAG0FAHX0VyH/CR+MP+hCk/8G0FH/CR+MP+hCk/8G0FAHX0Vw+oeI/HB065Fp4HeO48pvKc6nA4VscHb3+leY/CzxR8SZ9a1B7ix1DW7QblliuZ1iEUoOMKz8DHIKigD6GorkP+Ej8Yf9CFJ/4NoKP+Ej8Yf9CFJ/4NoKAOvorkP+Ej8Yf9CFJ/4NoKP+Ej8Yf9CFJ/4NoKAOvorkP+Ej8Yf9CFJ/4NoKP+Ej8Yf9CFJ/4NoKAOvorkP+Ej8Yf9CFJ/4NoK0/C/iCXxDYXE8+ntYT29w9vJA0okwy9fmHBoA3KKKKACiiigAooooAKKKKACiiigAooooAKoa1q1toOiXuq3hIt7SFpXx1IA6D3PSr9Z+uaNaeIdEu9Jv1c2t1GY5NhwwHqD6g4NAHEapqOurF4cB1WS11fWb2PdZxhSsNvgu6gEZ4AALdcnsK9HrlY/AOmrqml6lLe6jcXmnI8aSzTgmQMAPnwB028YwOT1zVM634t1LxLrdho8WirbabNHFuvBLvYtGr5+U4/ioA7auQ8bW01hLp/iuziaS40lm+0Igy0tq+PMGO5GAw+h9ad/xcP/AKlj8p/8aQj4hEEH/hGCD2xP/jQBsXd2dT0KG70ibzknaKSKSFvvIWUkg+mM1h+M7yfVp4fB2lzFLrUFzezJyba1z859mYZUfUntmuTl8FfEHT3nbRtasNLtJ33PZ2Ks6K5P3kEgOwZ5IB9eK2NA8N+NPDsMv2Y+HZrmdt9zd3DTvNO3qzZ/QYA9Kt/Cvn+hml+8b8l+p6Ba2sNlaQ2tvGI4IUCRoOiqBgCpq5HPxC9fDH5T/wCNL/xcP/qWPyn/AMag0Otri/GXjGxsPC2tSwRTXf2eNofNjjLRLORhUJzz8xGcZx0ODS2Wr+I9T0PxRaSxWS61Yb7e3Npu8t5DCHQ/Mc9WFc0bHWLjQPCGl2+gX0VhbXUcl7HKAsjugL5bnhTIBknrmgD0Lwvpcmi+F9N06Z2kngt1WV2YsWfGWOT15JrWoooAKKKKACuS+Hn/ACAr/wD7C17/AOjmrra5L4ef8gK//wCwte/+jmoA62iiigAooooAKKKKACuT8C/6vXv+wxcfzFdZXJ+Bf9Xr3/YYuP5igDrKKKKACiiigAprrvRlyRkYyDyKdTXJVGKruYDIUHGaAMg6nJpX+jagHlcnFvIgyZ/Rcdm/TvV2wiulR5ryTM0pz5YPyxjso/qe9VU0gXitNqgEs7jAUHiEdcKfXp83XNWbBbyLzLe6PmLGR5U+eXX3HqP1ps3m48um/X/gf1+BdqK4iM9u8ayPGWHDocFT61LUVy8sdu7QRebKB8iFsAn3PpSMVvoZX9sTW2LK4gL6keIlXhZh/eB7D19PyrRsoZ4LcC5nM0zHc7YwAT2UdhVIaHHLG0lzIWvnw32leGQjoE9AOeO/ertibvyCl6q+ajFd6dJB2bHb6UzWbjb3fn/wPIs1XvIJZ7crBOYZgdyPjIz6EdxViq9610IMWaI0zEKGc/Kg/vH1x6UjOO6sZp1iab/QYodmqdHQ8rGP7+e6+nrWL4MhNv4p8YxNK8rLewZdzyx+zpzW82hxrEJIZWW+UlxdEZZmPXPqpwOKwPBTzyeKPGLXMSxT/bYA6K24A/Z06H0PX8abNKnLb3P6/wCAdrVS/iuXjWS0k2zRncEY/LIO6n/HtVuql8LuREhtMIZDh5jj92vqB3PpSM4fEY2o6rc6jam10uK4S5EiC4I+VoBuGR7nHp25qL4hajDovw71i4lUSkWxiiWRQ+6RvkTIPX5iD+FWNU0l7KxWfR1kW8R0B2tzMCwzvPfqTnrWT4z0vVvEF34ft49LeTTra+jvL797Hk7OQgBYZ56+1W/hQTced8m2n6nLSaAieHPD2leGbK4i12CSBptQ+zPH5IGDIXdgN3cbec17BRRUEnLeFf8AkYvF/wD2Ek/9J4q6muW8K/8AIxeL/wDsJJ/6TxV1NABRRRQAUUUUAFcl8PP+QFf/APYWvf8A0c1dbXJfDz/kBX//AGFr3/0c1AHW0UUUAFFFFABRRRQAVyfgX/V69/2GLj+YrrK5PwL/AKvXv+wvcfzFAHWUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFch4V/5HLxp/1/Qf+k6V19ch4V/5HLxp/wBf0H/pOlAHX0UUUAUNYN0NPzZ7/O82P7g5xvG79M1fqhrBul0/Nnv87zY/uDJxvG79M1fq38C+f6GUf4svRenX+n8goooqDU5bwr/yMXi//sJJ/wCk8VdTXLeFf+Ri8X/9hJP/AEnirqaACiiigAqrqWo2mkadPf306w2sCF5JG6ACrVcR45I1DxD4V0CUf6Nd3Ul1MOziBQwU+xZlP/AaUpcqbBGdpOveIPH32i503UY9C06GUxCIRLJeHHdw3ypn0wamtfCWu+HrWVtG8WygeY87xX9vG8TMxLMSVAYZOeh49Ks+I9AurW/Pibw9IkGpwpi5gc7Yr2Ifwv6MOzdvpWFZavJ8WM29t5tl4dt2UXy7ws1zJgExcHIQZ5PftXnutUk+ZOyNLLY6XwP49tvFizWkyJb6pbZ8yNCTHMgOPMiY/eQkH6flXY1wPiy0t9Gn8NarZQpA1jfxWirGu0GGU7Cn0yVP4V31dlGp7SPMQ1ZhRRRWogrD8T+Jrfw1YJI0Ul1eXDiK0s4vvzyHoB6DuT2FblcPaINW+KGsXcw3Lo8EVpbg9FaRRI7D3IKj8Kzqz5IuQ0rsjTw74h11BP4h8Q3doH5+w6TJ5CR+xkHzMfXkCmw/DyLTN8mh6/renzsxcn7WZY3Y9SyPkMfeq3xAvL7QLvSNcj1C6i0hLtYtSgjf5fLbgP6jB64xmtzxI81y2mWFjezW9zd3AIkgbBESjc57jGMD6sK891ajs+bc0siDRvE2o2Otx+HvFCwrdzAmyv4QViu8dVwfuyDrt79q7KuQ8b6Suo+D7tUyLq0T7Tayk/NHLH8ykH8MH2JroNEv/wC1dCsNQ/5+bdJf++lBrtw9X2kddyJKxfooorckKa6s0bKrFGIwGAzj3p1NdtiM2C2BnA6mgDLXVxZK8OqERzRrlWUcTjplR6/7PXmrVgbyQPPd/J5hHlwYH7se57k96pHS31U/adR3RuObeNGwYPRs92/Tt9bmnyXZV4LyP97Fgeao+WUdiPQ+opm81Hl93fr/AMD+vwLtRXKSyW7rBL5UpHyvtBwfoe1S1FcStDbvIsTyso4ROrH0pGK30M4a2kUbRXEZW/Qhfsy9ZCehX1U+vbnNXbJboQbrx1MrHdtQcIP7oPf61nHRpbkfbLicpqXWKReVh/2QO49fX8q0bKa4mg/0qDyZlO1gDlSfVT6UzWajb3fn/wADyLNV7xbloM2jqsqncFcfK/8Asn0z61YqveTTQQZggM0pO1VzgZ9SewpGUd9CidbR4ljhiJv2Yp9lY/MrDqW/2R6+49awfBaTR+KfGK3EolmF7BvcLtBP2dOg9O1bR0aaIfbYpw2qdXlPCyDuhHZfT061i+C5nn8U+MZHheFzewbo36qfs6CmzWoo29z+v+B/TO0qpffa0VJrTDlDl4Tj94PQHsfSrdVL+W6WNY7OPM0hwJG+7H/tH1+lIzhuZOqaxJeWKw6OZWvHZC21OYBvAbeD0PUY+vasrVNXvdX8YReENNvHhW2gW51W8iwJFU/djX+6zdSeoB4rS1HS7nTLT7XpUk73RkQ3AHzNcDcMk+h9/TI+mBZxyeG/iTq+pXVrNJb+II4Xt2iTfIjxxhWjZRzjjOelW/hQT5ed8m2n6jvGaw+FZ/D19pTvb3M2qQ2jxiRiLiOQ4ZWBPJA5B65Feg1xTaNf+JvGFlrGqwG00rS8tYWkhHmSzngyuBwABwo69T3xXa1BJy3hX/kYvF//AGEk/wDSeKuprlvCv/IxeL/+wkn/AKTxV1NABRRRQAVxvj+3mtY9K8SW0LyyaNcGWZEGWNu67ZcD1Aw3/Aa7KkIDAggEHgg0mk1ZgeatczfEq48ixmkg8KRPie4UFW1Bh1RT1Eeep79Kv6z4Wn066h1vwpFDb6hboI5LT7kV5EB9xsdGH8Ldu/FWLnwHNY3Elz4U1qXRWkYvJamIT2zE9SIzjaT/ALJ/CsXQbLxh4ts5pNQ8Ux2dpFdTW0iadZhJZPLcqSHYnbnHYVxPDzTtHYvmQi+IIfiBrmjaZp8M6JYzi91VZUK/Z2QkJE3+0XGfoua9PrM0PQNO8O2H2TToPLQtvkdjueRj1ZmPJPvWnXXTpqEeVEt3CiiirEFcPYsNL+J+t2c3yjVoIby3J/iMaiN1HuMKfxruKwfFHhmLxHZxbZ3tNRtX82zvI/vQyf1U9CO4rOrDng4jTsyTW9Itte0S90q7GYLqJom9RkcEe4PP4Vynw40/V0sTPr6EXlkn9m25PeKNjlx/vHb+CLVqLxTrGjILfxNoF55iDBvdNiNxDL/tYX5k+hH40kfxF0++DJo+mavqcykqUgs3VVb0Z2wq/ia872dVJwsaXW5f8camul+Eb9wc3Fwn2a2j7ySyfKqgd+Tn6A1u6FYHStA0/Tz1trdIj9QoFc3o/hzVNW1uLxB4pWJJLck6fpsTb0tc/wAbN/FJjv0Hau0ruw9J0467siTuwooorckKKKKACiiigAooooAKKKKACo52CW8rtJ5QVCTJx8vHXn0qSuS+JVzNF4KurK2YLc6m6afEx6AysEJJ7cE80AP8Ca/Nrfh+3uNQvYJL253zRxDariEsdhKj/ZxzUXhX/kcvGn/X9B/6TpWTN4b0+Pxd4WsNCs44xo++a7u41GVTZsWNm/iLnnHotbt34FsrnV73UotU1mymvGV5ls71okYqoUHA9gKAOoorlP8AhBIv+hl8T/8Ag0eq994SsdNsZ7288VeJYbaBC8kjaq+FAoA6TV3uU0/dabvO82MfKMnG8Z/TNZWr+CdL1nUDqE0+ow3m3aJra8kiKr6DBxj2rgrHwv4j1iyfWk8R+JbCxmdBZ2TXrtM0ZYDzJCfukg52jp61bs/Dt/pXildF13xT4hngvgW069j1F49zAZaJx03Y5BHUVb+BfP8AQzX8R+i9Op32l+HoNMZXa7vr2RPuPeTmQr9B0/GtiuU/4QSL/oZfE/8A4NHo/wCEEi/6GXxP/wCDR6g0HeFf+Ri8X/8AYST/ANJ4q0r7xHY2V3cWo3zz20Xn3CRY/cJgnLkkBcgEgE5OKNB8O2vh6O6W3uLu4e6l86aW7mMrs20Lyx9gK5nwsmr6He6/aXWjXM95eanJcxXYKiCVGChcvnKgAYIwT6A5xQB2mnX8GqaZa6hbFjBcxLLGWXB2sMjI/GrNIOgz+lLQAUUUUAFcl8PP+QFf/wDYWvf/AEc1dbXJfDz/AJAV/wD9ha9/9HNQB1tFFFABRRRQAUUUUAFcn4F/1evf9hi4/mK6yuT8C/6vXv8AsMXH8xQB1lFFFABRRRQAU19xRthAbHBPTNOprusaM7cKoyaAKFvqiBJUvtttcQDMoY/KR/eU9wf/AK1S2FxcXaPPLF5ULn9yhHzbfVvTPpWbNp0uusl3Putlj+a1XaCwPUM4P0+7/Xpo2F5LP5kNzEYrmHAcAHawPRlPcHH4UzecYqN1v18i7Udx53kP9nKedj5d/TPvUlRXNwlrbvPIGKoM4VSSfYAd6Rit9Cmms2/2N5p8xSRHbJCeXDegHfPb1qzZPcy24kuo1idjkRg5KDsCfWsl9Kury4XVXZYr5B+4iIBRV/ut6k569u3vq2N2buAs8Lwyo22SNx91h6HuPemzWcYpe78/L+u/9OzVTUo5JLNhHbxXODloZQMOO454z9at1XvLr7JBvETyuxCpGg5Zj0Ht9TSM476FKPUbC201Hs4AC52R20aBGL/3cdiO/pWhbef9nT7Ts87GW8v7oPoKxhpN3BcHVkKPqBz5kQ4Rk4+UehGPvd+/HTXtLpLy1SdFdQ38LqVZSOCCD6GmzSpGKXu/1/X4k9cH4snl13xNa+Hord59OsFS/wBVC/xjd+6i9ySCxHcL+Fd5VK9nNrgW9v5l1OdqgDAOO7H0FIzirsoaxqx/s6IaVKJLqdk8kIu75dw3E+gxkVD4x0SXXPCs0MThNSt9t1ZyrxsuI/mUj0BIx9Car3unXui2739lK0s8siG6VIslvmGSgHTjIx6c9a6eKRZoUkXO11BGRjg+1W/hX9dgmoqb5dtP1/rbX8FQ8Pasmu+HrDVEG0XMKyFcY2kjkfgc1pVybfDTwo0juLC5Uu5chNQuFGScnAEmBye1J/wrTwr/AM+d5/4M7n/45UEnW0VyX/CtPCv/AD53n/gzuf8A45R/wrTwr/z53n/gzuf/AI5QB1tFcl/wrTwr/wA+d5/4M7n/AOOUf8K08K/8+d5/4M7n/wCOUAdbRXJf8K08K/8APnef+DO5/wDjlH/CtPCv/Pnef+DO5/8AjlAHVSyxwRPLK6pGilmZjgADqTXAfC3xNo2qWep6fZahFNdpqF1OYhkHy3lYqwyOQQR0q/d/C3wrdWk0H2a8TzEK7v7RuGxkdcGQg/jXJeEPgLpug6lcXWqahLfoylIY4neDaM9SUYEn2zigD2CiuS/4Vp4V/wCfO8/8Gdz/APHKP+FaeFf+fO8/8Gdz/wDHKAOtorkv+FaeFf8AnzvP/Bnc/wDxyj/hWnhX/nzvP/Bnc/8AxygDraK5L/hWnhX/AJ87z/wZ3P8A8co/4Vp4V/587z/wZ3P/AMcoA62uT8C/6vXv+wxcfzFJ/wAK08K/8+d5/wCDO5/+OVt6JoOm+HbFrPS7doYGkMjK0ryEsepJYk/rQBpUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBQ1iS5i0/daBjN5sY+VcnBcZ4+mav1Q1eS5isN1oGMvmxj5Rk4LgH9M1fq38C+f6GUf4j9F6df6+4KKKKg1CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooArX63T2uLNlWbehy3TbuG79M1ZrBuvELy662iaRAtzeRIJLqV2xFaqem4jkseyj6kioYfEV1a+LoPD2qx2/m3du1xazwZCvsIDKVJJBGQepzzTvpYXLrc6SisPwxrVzr1pe3U9oLeFL2WC2wcmSNCF3n0ywb8AK3KQwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAPPfhF5snhvU7/UAF1S51O4e+DcFHDY2n0AHA9qXTM+LPihJr0K7tJ0W3eytp8cTzuf3jKe6gDbn1zXM6n/yHvGH/AF1H/oIr03wl/wAinpn/AFwFAGvDDFbxCKGNY4xnCqMAd6fRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf//Z']	['phy_706.jpg']
phy_707	MCQ	A small metal ring moves to the right along the smooth and insulated horizontal desktop. On the right side, there is a sufficiently large uniform magnetic field perpendicular to the paper. The speed direction is perpendicular to the direction of the magnetic field. As <image_1>shown in the figure, the small ring flies away from the desktop and falls to the floor. Set the flight time at $t_1$, the horizontal range at $x_1$, and the landing speed at $v_1$. Remove the magnetic field, and the other conditions remain unchanged. The small ring flight time is $t_2$, the horizontal range is $x_2$, and the landing speed is $v_2$, then the correct one of the following options is ()	['A. $x_1 = x_2$', 'B. $t_1 = t_2$', 'C. $v_1 = v_2$', 'D. ABC options are all wrong']	B	phy	电磁学_电磁感应	['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']	['phy_707.jpg']
phy_708	MCQ	As <image_1>shown in the figure, for a certain type of Hall element (the conductive free charge is electrons), the uniform magnetic field B is perpendicular to the Hall element vertically downward, and when the current provided by the working power supply E to the circuit is I, the Hall voltage generated is U; The thickness of the element is d, and switches K1 and K2 are closed. The correct one of the following judgments is ()	['A. Potential at 4 points is higher than potential at 2 points', 'B. Increase the magnetic induction intensity, and the number of voltage indications will decrease', 'C. The resistance value of the sliding rheostat connected to the circuit becomes larger, and the number of voltmeter indications will decrease', 'D. Only reduce the thickness of the Hall element to d, and the voltage indicator remains unchanged']	C	phy	电磁学_电磁感应	['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phy_709	MCQ	In the report of the 20th National Congress of the Communist Party of China, General Secretary Xi Jinping clearly pointed out the need to implement the strategy of rejuvenating the country through science and technology and emphasized that science and technology are the primary productive force. The following statements about magnetic fields and modern science and technology are correct ()	['A. Figure A <image_1>is a structural schematic diagram of the magnetic fluid generator. It can be judged from the figure that plate A is the positive pole of the generator.', 'B. Figure B <image_2>is a schematic structural diagram of a Hall effect plate. When stable, the relationship between the potentials at points M and N is related to the electrical properties of conductive particles.', 'C. Figure C <image_3>is a schematic diagram of an electromagnetic flowmeter. When $B$and $d$are fixed, the flow rate is $Q=\\frac{\\pi d}{4B}U_{NM}$', 'D. Figure D <image_4>is a schematic diagram of a cyclotron. To increase the maximum kinetic energy obtained by particles, the acceleration voltage can be increased by 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', 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']	['phy_709_1.jpg', 'phy_709_2.jpg', 'phy_709_3.jpg', 'phy_709_4.jpg']
phy_710	MCQ	As <image_1>shown in the figure, there is a uniform magnetic field with magnetic induction intensity of\(B\) and a direction perpendicular to the paper in the first quadrant of the coordinate system. A positively charged particle with a specific charge of\(k\) regardless of gravity is injected into the magnetic field from a point\(M\) on the\(x\) axis (not shown in the figure) in the positive direction of the\(y\) axis, and then leaves the second quadrant from the point\(N\left(-\frac{a}{\sqrt{3}}}, 0\right)\) at an angle of\(\alpha = 60^\circ\) to the negative direction of the\(x\) axis, then ()	"['A. The direction of\\(B\\) is perpendicular to the paper and outward', ""B. The magnitude of the particle's motion velocity is\\(kBa\\)"", 'C. The coordinates of\\(M\\) point are\\(\\left[(2+\\sqrt{3})a, 0\\right]\\)', 'D. The time for a particle to move in the magnetic field is\\(\\frac{5\\pi}{6kB}\\)']"	CD	phy	电磁学_电磁感应	['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phy_711	MCQ	As shown in the figure<image_1>, there is a uniform magnetic field (not shown in the figure) perpendicular to the paper in the area of the right triangle\(ABC\), and the side length of\(AC\) is\(l\),\(\angle B\) is\(\frac{\pi}{6}\), a group of specific charges is\Negatively charged particles of (\frac{q}{m}\) are injected perpendicularly to the\(AC\) edge at a certain range starting from the\(C\) point at the same speed. The injected particles just do not eject from the\(AB\) edge. It is known that the time for particles that eject perpendicularly from the\(BC\) edge to move in the magnetic field is\(\frac{6}{5}t_0\), the time spent by the particle moving for the longest in the magnetic field is\(2t_0\), then ()	"['A. The magnetic induction intensity is\\(\\frac{5\\pi m}{12qt_0}\\)', ""B. The orbital radius of the particle's motion is\\(\\frac{\\sqrt{3}}{3}l\\)"", 'C. The velocity at which a particle enters the magnetic field is\\(\\frac{5\\sqrt{3}\\pi l}{42t_0}\\)', 'D. The area swept by the particle in the magnetic field is\\(\\frac{6\\sqrt{3}+3\\pi}{49}l^2\\)']"	ACD	phy	电磁学_电磁感应	['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phy_712	MCQ	As <image_1>shown in the figure, ABCD is a square with a side length of, and\hat{BD} is a\frac{1}{4} arc centered on point A. The space between BC, CD and\hat{BD}(including the boundary) is filled with a uniform magnetic field with a magnetic induction intensity of B inward in the plane where the vertical square is located. There is a particle source at point A, which can uniformly emit charged particles with equal speeds, mass m, and charge +q into all directions within the square. It is known that particles emitted in the AC direction do not emit the magnetic field from the BC side, regardless of particle gravity and collisions and interactions between particles, then the following statement is correct ()	['A. The particle velocity is\\frac{(3-2\\sqrt{2})qBl}{m}', 'B. The particle velocity is\\frac{(3-\\sqrt{2})qBl}{m}', 'C. If the emission speed of the particle is increased, the time for the particle that can return to point A to move in the magnetic field remains unchanged.', 'D. If the emission speed of the particle is increased, the time for the particle that can return to point A to move in the magnetic field becomes longer']	AD	phy	电磁学_电磁感应	['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phy_713	MCQ	As <image_1>shown in the figure, the radius of the circular area is R, and there is a uniform magnetic field facing outward perpendicular to the paper. The magnitude of the magnetic induction intensity is $B=\frac{mv}{qR}$. There is a particle source located at the lowest point P of the magnetic field boundary. At the same time, n negatively charged particles are uniformly injected into the magnetic field area in all directions on the paper. The particle mass is m, the charge magnitude is q, and the rate is all. A and C are the two ends of the horizontal diameter of the circular area. Elastic baffles M N and M'N' that are long enough are tangent to the circular area at points A and C. All particles collide vertically with the baffles and bounce back at the original rate, regardless of the gravity and air resistance of the particles, and ignoring the mutual influence between the particles. The following statements are correct ()	['A. All particles eventually leave the magnetic field with parallel velocities', 'B. All particles collide with the right baffle and eventually all leave the magnetic field from point D', 'C. The longest time for a particle to move from point P to point D to leave the magnetic field is $t=\\frac{\\pi R}{v}$', 'D. The average force on the baffle during successive collisions between the particles and the baffle is $F=\\frac{2nmv^2}{\\pi R}$']	D	phy	电磁学_电磁感应	['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']	['phy_713.jpg']
phy_714	MCQ	As <image_1>shown in the figure, there is a uniform magnetic field (magnetic field at the boundary) perpendicular to the paper with magnetic induction intensity of B in the polygonal area. The particle source P can emit particles with mass m and charge +q to the right along the bottom edge, with different particle rates; there is a particle source Q at the midpoint of the right boundary that can emit particles with mass m, charge-q, and rate $v_1 = \frac{qBa}{m}$into the magnetic field in all directions in the paper. The following statement is correct ()	['A. Particles emitted by particle source P can reach a boundary length of 3a', 'B. Particles emitted by particle source P can reach a boundary length of 4a', 'C. The shortest time for a particle emitted by the particle source Q to first reach a boundary (other than the boundary where Q is located) is $\\frac{\\pi m}{3qB}$', 'D. The maximum time for a particle emitted by the particle source Q to reach the boundary for the first time is $\\frac{\\pi m}{qB}$']	AC	phy	电磁学_电磁感应	['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phy_715	MCQ	As <image_1>shown in the figure,\(abcd\) is a square with a side length of\(L\). In the quarter-circle\(abd\) area, there is a uniform magnetic field outward perpendicular to the paper. The magnetic induction intensity is\(B\). A positively charged particle with mass\(m\) and charge\(q\) enters the magnetic field from point\(b\) along the direction\(ba\) with an initial velocity and magnitude\(v\)(unknown). The particle can only exit the square area from the side of the square\(cd\)(containing two points\(c\) and\(d\)). The particle's movement time in the magnetic field is\(t\), regardless of the particle's gravity, then ()	['A. \\(\\frac{3\\pi m}{4qB} \\leq t \\leq \\frac{\\pi m}{qB}\\)', 'B. \\(\\frac{3\\pi m}{8qB} \\leq t \\leq \\frac{\\pi m}{2qB}\\', 'C. \\(\\frac{\\sqrt{2}qBL}{m} \\leq v \\leq \\frac{qBL}{m}\\)', 'D. \\((\\sqrt{2}-1)\\frac{qBL}{m} \\leq v \\leq \\frac{qBL}{m}\\)']	D	phy	电磁学_电磁感应	['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']	['phy_715.jpg']
phy_716	MCQ	As <image_1>shown in the figure, in the\(xOy\) coordinate system, there is a uniform magnetic field with the direction perpendicular to the paper and inward in a circular area with\(r, 0)\) as the center and\(r\) as the radius. In a sufficiently large region of\(y &gt; r\), there is a uniform strong electric field along the negative direction of the\(y\) axis. In the\(xOy\) plane, protons are emitted from the\(O\) point towards the first quadrant at the same rate and in different directions, and the radius of proton movement in the magnetic field is also\(r\). Regardless of the gravity exerted on the protons and the interaction between the protons. Then proton ()	['A. The distances of movement in the electric field are equal', 'B. Eventually, they leave the magnetic field parallel to the direction of launch velocity from the intersection\\(C\\) of the magnetic field boundary and the\\(x\\) axis', 'C. The total time spent in the magnetic field is equal', 'D. The total distance from entering the magnetic field to leaving the magnetic field is equal']	ABC	phy	电磁学_电磁感应	['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']	['phy_716.jpg']
phy_717	OPEN	As shown in the figure, in the\(xOy\) plane, there is a uniform strong electric field downward parallel to the\(y\) axis above the\(x\) axis, and there is a uniform strong magnetic field downward perpendicular to the\(xOy\) plane below the\(x\) axis. There is a charged particle with mass\(m\) and charge quantity\(q\)(\(q&gt; 0\)) at the\(y\) axis. <image_1>Enter the electric field parallel to the\(x\) axis at the speed of\(v_0\), and move from the\(M\) point on the\(x\) axis (not marked in the figure) to the\(x\) axis to\(x\) axis. The angular direction of (60^\circ\) enters the magnetic field for the first time. The particle moves in a uniform circular motion in the magnetic field. Then it leaves the magnetic field for the first time from the\(N\) point on the\(x\) axis (not shown in the figure), and can just return to the\(P\) point, regardless of the particle gravity, find: If the magnitude of the magnetic induction intensity is changed, the particle can pass through the\(M\) point again after entering and exiting the magnetic field multiple times. Calculate the possible value of the magnetic induction intensity and the time interval between the particle passing through the\(M\) point two adjacent times.		\frac{4(n-1)L}{3v_0}\left(\sqrt{3} + \frac{2\pi}{3}\right)(n = 2, 3, 4 \cdots)	phy	电磁学_电磁感应	['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phy_718	MCQ	In <image_1>the orthogonal electromagnetic field shown in the figure, the direction of the uniform electric field is horizontal to the right, and the direction of the uniform magnetic field is vertical to the paper along the horizontal direction. A positively charged ball with mass\(m\) and charge\(q\) is thrown out from the\(P\) point at a certain speed. The ball can just move in a straight line. The electric field strength is known.(E = \frac{mg}{q}\), the magnetic induction intensity of the magnetic field is\(B\), and the gravitational acceleration is\(g\), then the following statement is correct ()	['A. The initial velocity of the ball thrown is\\(\\frac{\\sqrt{2}mg}{qB}\\)', 'B. The electrical potential energy increases during the motion of the ball', 'C. Remove the electric field at a certain moment, and then the minimum speed of the ball movement is 0', 'D. When the electric field is removed at a certain moment, the maximum height that the ball can rise in the vertical direction is\\(\\frac{2m^2g}{q^2B^2}\\)']	AC	phy	电磁学_电磁感应	['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']	['phy_718.jpg']
phy_719	MCQ	As <image_1>shown in the figure, three identical vertically placed smooth semicircular tracks are respectively located in vacuum (no electric field, magnetic field), uniform magnetic field and uniform electric field, with both ends of the tracks at the same height. Three identical positively charged spheres move along the orbit from rest at the same time from the highest point on the left end of the orbit.\(P\),\(M\), and\(N\) are the lowest points of the orbit respectively. As shown in the figure, the three spheres never escape from orbit. Then the following relevant judgments are correct ()	['A. Momentum Relationship of a Small Ball Arriving at the Lowest Point of its Orbit for the Second Time\\(p_P = p_M < p_N\\)', 'B. When the ball reaches the lowest point of the orbit for the second time, the pressure on the orbit is greatest at the\\(P\\) point.', 'C. The impulse magnitude relationship of gravity during the process of the small ball starting to reach the lowest point of its orbit for the first time\\(I_P < I_M < I_N\\)', 'D. The three balls all reach different heights at the right end of the orbit, but they can all return to their original starting points.']	B	phy	电磁学_电磁感应	['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']	['phy_719.jpg']
phy_720	MCQ	Magnetic confinement is one of the cutting-edge technologies in current magnetic control. One of the magnetic confinement devices is simplified as shown in the figure<image_1>: There is a\(x\) axis along the horizontal direction. A large number of charged particles of the same kind with a velocity of\(v_0\) are incident along the positive direction of the\(x\) axis at the\(O\) point. The specific charge of the charged particles is\(k\). Due to operating errors, the particles have a slight divergence angle\(\alpha\). A uniform magnetic field with magnetic induction intensity\(B\) can be applied along the\(x\) axis to restrict the particles within a certain range. There is an infinitely large light screen\(L\) away from the\(O\) point, perpendicular to the\(x\) axis and intersecting the\(O'\) point. It is known that when\(\alpha\) is small,\(\sin \alpha \approx \alpha\),\(\cos \alpha \approx 1\), ignore the interaction between particles, then ()	['A. The time for the particle to reach the light screen is\\(\\frac{L}{v_0}\\)', 'B. When the spacing\\(L\\) remains constant, the minimum value of\\(B\\) is\\(\\frac{\\pi v_0}{kL}\\) to obtain a well-focused light spot on the light screen is\\(\\frac{\\pi v_0}{kL}\\)', 'C. When the magnetic induction strength\\(B\\) remains constant, the minimum value of\\(L\\) is\\(\\frac{2\\pi v_0}{kB}\\) to obtain a well-focused light spot for the optical screen is\\(\\frac{2\\pi v_0}{kB}\\)', 'D. Adjust the values of\\(B\\),\\(L\\), and the maximum area of the luminous area on the light screen is\\(\\frac{2\\pi a^2v_0^2}{k^2B^2}\\)']	AC	phy	电磁学_电磁感应	['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phy_721	MCQ	As <image_1>shown in the figure, a smooth, insulating and infinitely long inclined plane with an inclination angle of\(53^\circ\) is in a uniform magnetic field, with a magnetic induction intensity of\(B\), and the direction is perpendicular to the paper and outward. The mass of the small ball that can be regarded as a particle is\(m\) and the charged amount is\(+q\). It is released from rest from the top of the inclined plane, and the small ball just leaves the inclined plane at the moment\(t\). It is known that the gravitational acceleration is\(g\),\(\sin53^\circ = \frac{4}{5}\), and the charge amount of the ball remains unchanged throughout the movement. The following statement is correct ()	['A. \\(t = \\frac{3m}{4qB}\\)', 'B. The length of the ball moving on the inclined plane is\\(\\frac{9m^2g}{40q^2B^2}\\)', 'C. The magnitude of the impulse of the slope on the spring force of the ball before it leaves the slope is\\(\\frac{7m^2g}{40qB}\\)', 'D. The maximum height of the ball rising from the separation point after leaving the inclined plane is\\(\\frac{4m^2g}{25q^2B^2}\\)']	ABD	phy	电磁学_电磁感应	['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phy_722	OPEN	The planar rectangular coordinate system\(xOy\) is as shown in the figure<image_1>. In the\(I\) and\(II\) quadrants, there is a semi-circle bounded uniform magnetic field with the center of the center at the\(O\) point and the radius of\(R\). The direction of the magnetic field is perpendicular to the coordinate plane and inwards, and the magnetic induction intensity is\(B\). Above\(y=R\), there is a uniform strong electric field in the negative direction of the\(x\) axis, and the electric field intensity is\(E\). There is a particle source at the coordinate origin that can emit positively charged particles at the same rate in any direction within the\(I\) quadrant along the coordinate plane. The particle has a mass\(m\) and a charge amount\(q\). It is found that a particle (denoted as particle\(a\)) leaves the magnetic field and enters the electric field from the\(P\) point\((0, R)\) on the\(y\) axis, and the direction of velocity at this time forms an angle of\(30^\circ\) to the positive direction of the\(y\) axis. The particle's gravity is ignored and the interaction between the particles is ignored. Find: The time it takes for a particle that can enter the electric field perpendicularly after exiting the magnetic field to exit from the particle source to pass through the\(y\) axis;		\left(\frac{\pi}{3} + 1 - \frac{\sqrt{3}}{2}\right)\frac{m}{qB} + \sqrt{\frac{Rm}{Eq}}	phy	电磁学_电磁感应	['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']	['phy_722.jpg']
phy_723	OPEN	With the continuous development of monitoring technology, surveillance cameras and other equipment are now installed in streets and alleys and every household. As <image_1>shown in the figure, it is a hemispherical transparent material with a radius of R removed from a monitoring device. The center of the ball is point O, and the point A is the apex of the hemispherical surface, and the AO is perpendicular to the bottom surface coated with the reflective film. A beam of monochromatic light travels parallel to AO towards point B on the hemispherical surface. The refracted light passes through point D on the bottom surface, is reflected by point D and then travels towards point E on the hemispherical surface (not shown in the figure). The speed of light propagation in vacuum is c. It is known that the distance from point B to point OA is\(\frac{\sqrt{3}R}{2}\), and the OD length is\(\frac{\sqrt{3}R}{3}\). Calculate the propagation time\(t\) of the monochromatic light from point B to point E in the hemispherical transparent material.		\(\frac{3R}{c}\)	phy	电磁学_电磁波	['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']	['phy_723.jpg']
phy_724	MCQ	As <image_1>shown in the figure, AB, CD, and DE are fixed on three transparent plates, AB is horizontal, and the inclination angle of CD is greater than that of DE. When a parallel beam of light is incident vertically downward, the image of the following interference fringes may be correct ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	A	phy	电磁学_电磁波	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACWASUDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACqkupWsOqW+mvIRdXEbyxptPKpjcc9B94Vbrl9R/5KVoX/Xhd/8AoUVAHUUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVy+o/8lK0L/rwu/wD0KKuorl9R/wCSlaF/14Xf/oUVAHUUUUUAFcx4zvbqy/sD7NO8XnazbQybDjejE5U+xrp65Dx7/wAy1/2HbX+ZoBHX0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABVTUNTstLhWW9uEhV2CIDyXY9AoHJPsKt15/4bLa/8TvEmo3rF10ZksbGI9Ity7pHA9W4GfQUAdZD4h06bUILDzJY7udWaKKWF0LKoySMjoP6itSoXtYZLuK5ZAZolZUb0DYz/ACFTUAFcvqP/ACUrQv8Arwu//Qoq6iuM1DU7FvH2jXgvIPs0Vhe+ZL5g2ptaLOT2xg5zQNHZ0U2ORZY1kRgyMAykdwadQIK5Dx7/AMy1/wBh21/ma6+uQ8e/8y1/2HbX+ZoBHX0UUUAFUNc1MaLoN/qhi80Wlu8/lhtu7apOM9ulX65/x1/yIPiD/sHz/wDoBoA3Leb7RbRTAbfMQPj0yM1JVbTv+QXaf9cU/wDQRVmgAooooAKKaHUuUDAsBkrnkU6gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArmrrwkV8Qza7o+pTabe3Kql2gjWSG4C5wWQ9GGeoIrpaKAMC51LTPCcMUutaq7TXcnl/aJx94gE4wowigZ7ADqTnJrZtrq3vYFntZ454W5V42DA/iK5bxFp2tR+JbXXrGzttVt7a2aD7A7+XIu4/M6E5UkgAYOOAcdaxrWHw9easW0S+u/C2uvy9k6eUsh6fNC3yP35X3Oc80h2PSK8T8RfDqS++NFkwRv7Ivv9NnA+7lCN6n/eIT/vr2rvh4g17QpDH4i0k3NqPu6jpamRcerxfeX8Nw/nW/pesaZrlsLrTLyC6iHG6Jgdvse4/GgNi+AAAAMAUUUUxBXIePf+Za/7Dtr/ADNdfXjXxe8Ra74f1zSlSKK509rmK8tdy4ZJozzGSOoOQfXk+lJjR7LRWfof286HZtqjh754w8+1doDHkqB6DOPwrQpiCuf8df8AIg+IP+wfP/6Aa6Cuf8df8iD4g/7B8/8A6AaARr6d/wAgu0/64p/6CKs1W07/AJBdp/1xT/0EVZoAKKKKAOW03/kpmv8A/YPs/wD0KauprltN/wCSma//ANg+z/8AQpq6mgGFFFFABRRXK6NdXEnxF8UW0k8rwQ29kYomclULLJkgdBnAzjrigDqqKKKACiiigAorJ0DWTrUF7IYRF9mvZbXAbO7YcZ/GtagAooooAKKKKACiiigAooooAKKKKACqGraJpmu2n2bVLGC7i6gSpkqfUHqD7ir9FAHIvoPiHQ2WTw9qxvLZfvadqjF8j0Sb7y/8C3D+VYl3N4dudXWTWLS88J67Jwt4jiJZT7TD93J24b2yO1ek1DdWlve27W91BHPC33o5FDKfwNA7nKx3nizQQRe28fiCwHK3NkBHcgf7UZO1/wDgJB46HNbGieKNH8QK40+8VpoziW3kBSWI+jIcEc8fhWS/g240qYXHhXVZdNxy1jMDNaSf8BJyn/ACOnSsnV7qxmuEj8b+HmsZl4i1izZniU9iJVw8f/AgBwe3VAeiVj6/4a0/xH9g/tCMuLK6W5jAxyy9j7HjP0rCsf8AhJNMtBPpOoweKdMPzRrPKqXOPQSj5H/4EAeevatTSfGek6nOLSRpdP1Efesr5DFKD7Z4b6qT1FMDoaKKKBBXP+Ov+RB8Qf8AYPn/APQDXQVxfxJ8QafpfhfUdOvZGhlv7C4W2dlOx3CH5M9mOeM9frQNHV6d/wAgu0/64p/6CKs1heFPEFh4g0kSaa7ywW+2AzbcI7hRuC55IHTOMema3aBBRRRQBy2m/wDJTNf/AOwfZ/8AoU1dTXLab/yUzX/+wfZ/+hTV1NAMKKKKACuQ0P8A5Kd4t/69rD/0GSuvrkND/wCSneLf+vaw/wDQZKBnX0UUUCCiiigDlPAf/HlrP/YYuv8A0KurrlPAf/HlrP8A2GLr/wBCrq6AYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFIyhlKsAQeoI60tFAHL3fgiyW9fUNDuZ9Evn5d7PHlSH/biPyN35wDz1rL1OXUEhay8ZeHINX07+G/0+IuU7ZaI/Oh75QnHGK7yigdzgNIjvEsTceCvEcOq2cZ/wCQfqMhk2dtol++nsGBHHbrWtbeOLOKWO11+2m0O8Y7dt5jynb/AGJR8rfofarWqeD9I1O8N+scllqX/P7ZP5Uv4kfe7cMD0rJuIvE2mW8tpqllbeKdJYYJWNY7gL6NGfkk/DB46dqQHaAhgCCCDyCK5D4meFW8W+DLm0t0DX0JE9t7svVfxGR9cVj6RDZTb18Ea/Jpl3Cfn0bUFYxrjqDE+HTr1U4/Gtv/AITObSCkfirS5dNydv22LM1qx/3gMpn0YD6nrQBq+FNCh8NeF9P0iEYFvEA5/vOeWP4sSa2Kit7mC8gSe2mjmhcBkkjYMrD1BHWpaYjI1nxDa6Jc2FvcQXUst9L5MCwR7yz4LEdeOATnpxT7PX7K81JtOxPBerH5vkXERRmTOCy54YA4zjpketc5NKda+L9vbKu620CwMztg8Tz/ACgemQikj/eaoPEEQ1X4s+Gba3iEjafb3NxeSD/lnFJGY1Un/aY8D2J7UAaum/8AJS9f/wCwfZ/+hTV1NeDaBpnif/hcd1oN1qd09nbBJJ5Gbma2jJaJS3U5LgHn1znFe80kNhRRRTEFchof/JTvFv8A17WH/oMldfXIaH/yU7xb/wBe1h/6DJQM6+iiigQUUUUAcp4D/wCPLWf+wxdf+hV1dcp4D/48tZ/7DF1/6FXV0AwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAy9X8OaRrqj+0LKOWRfuTDKSJ/uuuGH4GsP8AsrxRoUbpY3sevWGOLTUSFmVf7qygYb/gY9ORXYUUAeYwLoVxfY0y6vfBuvFiWtZVCRzN7o2Y5B15Xn9K6B/EeuaCwHiLSPPtO+o6WrSIvu8Ry6/UbhXR6hpljq1q1rqFpDdQMOUlQMP/AKx965seF9X0KM/8Ixq7eQvK6dqRMsP0V/voPzHtSGO0fRPDGpXF7q+kX1xLLflWuZrfUZQXK5ChgG+XGSMcYroNO0iw0lJFsrdYjK26R8lnkOMZZjkscdya8x8UXun29hd6lqOk3nhnxLDC7QXds2Ip5APlXzE+VwcDhwD29a6XS4ddvrKObTvHFveOyKziazilCkjp+7K4/GgLHXpZW0d9LepCguZUWOSQDllUkgH6bj+dT1ybv4+tGwsOgahGO/mSwO34YYD86I/E/iGDJ1HwXeovY2V1FcH8iVphY6yiuX/4TrT4gPtmnazZt3E2nyED6soZf1qW28e+FLuTy4tfsQ46rJKEI/76xQKxv3EbTW8saStE7oVWRcZQkdRnjIrxDwfrviu/+K1/pd0YIrgmJNRuIosFo7fcBtzwN+4ZOOh4xXtlteWt7F5tpcwzx/34nDD8xVCz8PWFj4h1DW4Y8Xl8kaSnAwAmen1yM/QUho1qKKKYgrP1zVo9C0e41OaCWaC3G+VYRlgmeWA74HJ9ga0KZNDHcQSQSqGjkUoykZBBGCKAPOPhx4v0zUry/wBM09pLiWa+ubxnVCqxxFhtJJ7kkYH1r0quB+GfgM+DY9WecKZbm6ZYj1IgU4X8+T+Vd9SQ2FFFFMQUVw/xO1J7XSNMsLe7ubW61HUIoEltpXjdEB3SN8hBI2qR/wACq7oenabfXkGq6RqmrvBayyRSJPf3EsU5xg5WRz90+3UGgDq6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAGTQxXELwzRpJE42sjqCrD0IPWueufAHhO7IMmgWKsOhiiEZ/8dxXSUUA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phy_725	MCQ	<image_1>An electron induction accelerator is a device that uses an induced electric field to accelerate electrons. Its basic principle is shown in Figure A. The upper part of the figure is a side view. The upper and lower parts are the two magnetic poles of the electromagnet. There is an annular vacuum chamber between the magnetic poles, and electrons move in a circular motion in the vacuum chamber. The lower part of picture A is divided into a top view of the vacuum chamber. Electrons escape from the right end of the electron gun. When the magnitude and direction of the current in the electromagnet coil change to meet the corresponding requirements, the electrons move along the dotted circular trajectory in the vacuum chamber and are constantly accelerated. If during a certain acceleration, the radius of the circular motion trajectory of the electron is R, the magnetic field on the circular trajectory is $B_1$, and the average value of the magnetic field in the circular trajectory area is recorded as $\bar{B}_2$(Since the magnetic field distribution throughout the circular trajectory area may be uneven,$\bar{B}_2$is the ratio of the magnetic flux passing through the circular trajectory area to the area of the circle). The current shown in Figure B is passed into the electromagnet, and the current direction marked in the device in Figure A is set to be the positive direction. The following statement is correct ()	['A. The acceleration of the electron as it moves always points to the center of the circle', 'B. The electrons in $\\frac{T}{4}~\\frac{T}{2}$in Figure B can move in a circle in the counterclockwise direction in Figure A and be accelerated', 'C. The electrons in $\\frac{3T}{4}~T$in Figure B can move in a circle in the counterclockwise direction in Figure A and be accelerated', 'D. In order for electrons to be controlled in a circular orbit to be continuously accelerated, the value between $B_1$and $\\bar{B}_2$should be satisfied with $B_1=\\frac{1}{2}\\bar{B}_2$']	D	phy	电磁学_电磁感应	['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phy_726	MCQ	As shown in Figure A<image_1>, place a hollow copper tube of sufficient length vertically, and place a cylindrical strong magnet with a cross-sectional diameter slightly smaller than the inner diameter of the copper tube and a mass of $m_0$from the upper end of the copper tube. Release from rest. The friction and air resistance between the strong magnet and the inner wall of the copper tube can be ignored. The strong magnet does not perform free fall, but passes through the copper tube very slowly. The maximum speed when falling inside the copper tube is $v_m$, and the gravitational acceleration is g. The reason for this phenomenon is that the changing magnetic field stimulates eddy currents in the copper tube, which in turn creates a great resistance to the strong magnet. Although the quantitative calculation of the eddy current in this scenario is very complex, we do not need to solve it, but we can still use the knowledge we have learned to analyze the above problems. During the fall of the strong magnet, it can be considered that the magnitude of the induced electromotive force in the copper tube is proportional to the falling speed of the strong magnet. The following analysis is correct ()	['A. If the hollow copper tube is cut into a vertical slit, as shown in Figure B<image_2>, the strong magnet is also released from the nozzle at the upper end of the copper tube from rest, and the strong magnet is found to be in free fall motion.', 'B. If the hollow copper tube is cut into a vertical slit, as shown in Figure B, and the strong magnet is also released from the nozzle at the upper end of the copper tube from rest, it is found that the strong magnet will fall faster than the free fall motion', 'C. In Figure A, after the strong magnet reaches its maximum speed, the thermal power of the copper tube is less than $m_0g v_m$', 'D. If an insulating rubber block with a mass of $m_1$is stuck on the top of the strong magnet in Figure A, the maximum falling speed of the strong magnet is $v_1=\\frac{m_0+m_1}{m_0}v_m$']	D	phy	电磁学_电磁感应	['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']	['phy_726_1.jpg', 'phy_726_2.jpg']
phy_727	MCQ	As shown in the figure<image_1>, two smooth parallel guide rails that are long enough are fixed on the insulating horizontal plane. The distance between the guide rails on the left and right sides is 2L and L respectively. In the figure, the left side of the OO'is a metal guide rail with no resistance, and the right side of the OO' is an insulated track. The metal guide rail part is in a vertically downward uniform magnetic field, and the magnetic induction intensity is B_0; the right side of OO'takes O as the origin, and an x-axis is established along the guide rail direction. There is a vertically downward magnetic field (not marked in the figure) with the distribution rule of B=B_0+kx(k&gt;0) along the Ox direction. A U-shaped metal frame with a mass of m, a resistance value of R, and a length of L on three sides. The left end is placed flat on the insulated track next to the OO'(not in contact with the metal guide rail) in a static state. Conductor rods a with a length of 2L, a mass of m, and a resistance of R are placed on metal rails with a spacing of 2L, and conductor rods b with a length of L, a mass of m, and a resistance of R are placed on metal rails with a spacing of L. Now given the same horizontal rightward velocity v_0 for conductor rods a and b at the same time, when conductor rod b moves to O0', there is no current in conductor rod a (a is always on the wide rail). The conductor bar b collides with the U-shaped metal frame and is connected together to form a loop. The conductor bars a, b, and the metal frame are always in good contact with the guide rail. The conductor bar a is blocked by the column and does not enter the right track. The following statement is correct ()	"['A. After giving conductor rods a and b the same horizontal rightward velocity v_0, conductor rod b moves at a uniform speed', ""B. The speed of conductor bar b when it reaches O0 'is\\frac{6}{5}v_0"", 'C. After collision with the U-shaped metal frame, the conductor bar b is connected together and then performs uniform deceleration motion', ""D. After conductor bar b collides with the U-shaped metal frame, the distance between conductor bar b and OO'when at rest is\\frac{12mv_0R}{5k^2L^4}""]"	BD	phy	电磁学_电磁感应	['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phy_728	MCQ	Teacher Zhang demonstrated the experiment shown in the figure<image_1> in the classroom. The electromotive force of the power supply is 1.5V, the resistance between the hands of the person is set to 200k\Omega, and L is the inductor coil with a large self-inductance. When switches S_1 and S_2 are both closed and stable, the numbers of ammeters A_1 and A_2 are 0.6A and 0.4A respectively. When S_2 is turned off, S_1 is closed, and the circuit is stable, the numbers of ammeters A_1 and A_2 are both 0.5A. Before the experiment, disconnect both switches first. The following operations can make people feel electric shock: ()	['A. Close S_1 and S_2 first, and then suddenly disconnect S_1 after stabilizing', 'B. Close S_1 and S_2 first, and then suddenly disconnect S_2 after stabilizing', 'C. Keep S_2 disconnected, close S_1 first, and then suddenly disconnect S_1 after stabilization', 'D. Since the electromotive force of the power supply is only 1.5V, no matter how you operate it, it will not cause people to feel electric shock.']	C	phy	电磁学_电磁感应	['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phy_729	OPEN	As <image_1>shown in the figure, the center of the semicircular field-free zone with radius r_0=\sqrt{3}a is at the origin of coordinates O, MN is a collection plate located at x=2a that is long enough parallel to the y-axis, and a uniform strong magnetic field is applied outside the field-free zone on the right side of the y-axis and on the left side of MN that is perpendicular to the paper surface and outward. The particle source located at O uniformly emits positively charged particles at equal rates into quadrants I and IV along a plane with an angle of 0 to 150^{\circ} with the +y direction. It is known that particles emitted in the +y direction are deflected in the magnetic field by\Delta t exactly tangent to MN, regardless of particle gravity and interactions between particles. If the right boundary of the magnetic field is adjusted and the direction of the magnetic field in quadrant IV is reversed, so that all particles emitted by the particle source are deflected by the magnetic field and hit vertically on the MN, calculate the length of the area on the MN hit by the particles, and write out the functional analytic expression of the right boundary of the magnetic field.		The analytical expression of the right boundary function of the magnetic field in the first quadrant is\[ (y-a)^2 + x^2 = (2a)^2 \quad (a \leq x \leq 2a) \], and the analytical expression of the right boundary function of the magnetic field in the fourth quadrant is\[ (y+a)^2 + x^2 = (2a)^2 \quad (\sqrt{3}a \leq x \leq 2a) \]	phy	电磁学_电磁感应	['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phy_730	OPEN	As <image_1>shown in the figure, there is a uniform strong magnetic field parallel to the x-axis and with an electric field intensity of E (E unknown) in the xOy coordinate system. The dividing line OP divides the area of x&gt;0 into area I and area II. Area I has a uniform strong magnetic field facing outwards perpendicular to the paper and having a magnetic induction intensity of B (B unknown). Area II has a uniform strong magnetic field facing inwards and having a magnetic induction intensity of B'=\frac{1}{2}B. And a uniform strong magnetic field with an electric field intensity of E'=\frac{2}{3}E in the negative direction of the y-axis. A positively charged particle with mass m and charge q enters the second quadrant from point M(-d,0) at an initial velocity v_0 perpendicular to the direction of the electric field, and enters region I through point N. At this time, the angle between the velocity and the positive direction of the y-axis is 60^{\circ}. After passing through region I, it enters region II from point A (not shown in the figure) on the dividing line OP perpendicular to the dividing line, regardless of particle gravity and boundary effects of the electromagnetic field. Find: The distance s between the positions where the particle passes through the x axis for the first and fifth times when moving in region II.		4\pi d	phy	电磁学_电磁感应	['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phy_731	MCQ	As shown in figure (a)<image_1>, a rectangular coordinate system Oxy is established in a smooth insulated horizontal desktop, and there is a uniform magnetic field perpendicular to the desktop in space. A small ball with mass m and charge q moves in a circular motion on the desktop. Parallel light is illuminated in the positive direction of the x-axis, and a receiver placed perpendicular to the illumination direction records the projection positions of the ball at different times. The curve of the projection coordinate y versus time t is shown in Figure (b)<image_2>, then ()	['A. The magnetic induction intensity is\\frac{2\\pi m}{3qt_0}', 'B. The projected velocity max is\\frac{4\\pi y_0}{3t_0}', 'C. During the time of 2t_0~3t_0, the projection moves in a uniform straight line', 'D. During the time of 3t_0~4t_0, the displacement of the projection is y_0']	D	phy	电磁学_磁场	['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'phy_731_2.jpg']
phy_732	MCQ	There is a uniform magnetic field perpendicular to the paper in the circular area. Two charged particles with the same specific charge enter the magnetic field in the direction of diameter MON from point M on the circumference. If the velocity of particle 1 when entering the magnetic field is v_1, and the velocity direction is deflected by 90^{\circ} when leaving the magnetic field, and the movement time in the magnetic field is t_1; if the velocity of particle 2 when entering the magnetic field is v_2, the deflection is as <image_1>shown in the figure, and the movement time is t_2, regardless of gravity, then the following statement is correct ()	['A. v_2=\\sqrt{3}v_1', 'B. t_2>t_1', 'C. If only the velocity direction of particle 1 when entering the magnetic field from point M is changed, then the particle must be perpendicular to the diameter MON when leaving the magnetic field', 'D. Only the velocity direction of particle 2 when it enters the magnetic field from point M is changed. When the particle exits from point N, the movement time is shortest.']	C	phy	电磁学_电磁感应	['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phy_733	MCQ	As shown in Figure A<image_1>, the smooth parallel metal tracks with inclination\alpha, width l, and constant resistance are long enough for the entire device to be in a uniform magnetic field downward perpendicular to the track plane. The constant resistance at the upper end of the track is R, the resistance of the metal rod MN is r, and the mass is m. Release the metal rod MN from rest, and the rod is always perpendicular to the track and in good contact. The change relationship between current i and time t obtained through the data collector is shown in Figure B<image_2>. When the displacement of the metal rod sliding down is x, the current can be considered to reach a maximum value. It is known that the current at t_0 is i_1 and the gravitational acceleration is g. The following statements are incorrect ()	['A. Size of magnetic induction intensity B=\\frac{mg\\sin\\alpha}{i_1l}', 'B. The acceleration of the metal rod at t_0 a=\\frac{i_1-i_0}{i_1}g\\sin\\alpha', 'C. The maximum speed of the metal rod v=\\frac{i_1^2(R+r)}{mg\\sin\\alpha}', 'D. During the rod sliding displacement is x, the Joule heat generated by the resistance R Q_R=mgx\\sin\\alpha-\\frac{i_1^4(R+r)^2}{2mg^2\\sin^2\\alpha}']	D	phy	电磁学_电磁感应	['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'phy_733_2.jpg']
phy_734	MCQ	The experimental team used the <image_1>device shown in Figure 1 to study the movement of electrons between parallel metal plates. Place the radioactive source P close to the speed selector. The magnetic induction intensity in the speed selector is B (inward perpendicular to the paper), and the electric field intensity is E (vertically downward). P can emit electrons at different rates in the horizontal direction. Particles of a certain velocity can pass through the velocity selector along a straight line, and then exit between the plates along the central axis O1O2 of parallel metal plates A and B. It is known that the length of the horizontal metal plate is L and the spacing is d, and the alternating voltage shown in Figure B is applied between the two plates<image_2>. The charge amount of electrons is e and the mass is m (electron gravity and interaction force are ignored). The correct ones in the following statements are ()	['A. The rate of electrons passing through the speed selector in a straight line is $\\frac{E}{B}$', 'B. By only increasing the electric field intensity E in the speed selector, the time for electrons injected along the central axis to pass through the plates becomes longer', 'C. If $t=\\frac{T}{4}$at the moment, the electrons entering between plates A and B can fly horizontally out of the metal plate must be at the O2 point', 'D. If the electrons entering the metal plates A and B at the moment $t=0$can fly out horizontally, then $T=\\frac{8L}{dE}$(n=1, 2, 3...)']	AD	phy	电磁学_磁场	['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phy_735	OPEN	Figure A <image_1>shows a schematic diagram of a cyclotron. The core part is two D-shaped boxes. There is a uniform magnetic field in the D-shaped boxes, and the direction is perpendicular to the paper and inwards. The magnetic induction intensity is $B_1=1T$. A high-frequency AC power supply is connected between the two D-shaped boxes, and the voltage is as shown in Figure C<image_2>. There is a uniform strong electric field between the two D-shaped boxes. The distance between the two D-boxes is $d=1cm$, the radius of the D-box is $1.2m$, and a particle source A whose position can be adjusted left and right is placed on the edge of $D_1$. The particle is a nucleus with a small initial velocity that can be ignored. On the left side of the $D_1$box, there is a particle extraction device EFHC (partial picture is shown in Figure B<image_3>). In the EFHC, there is only a magnetic field $B_2$perpendicular to the paper. The specific charge of the core is $\frac{q}{m}=\frac{1}{3}\times10^8C/kg$, taking $\pi=3$. The entire device is in vacuum, regardless of the interactions between particles and relativistic effects. The distance from A to F can be adjusted, but the radius of particle movement in the magnetic field cannot exceed 1.0 m. Only particles that have been accelerating every time they pass through the electric field can reach the extraction device, and the distance between the particles returning to the lower boundary of $D_1$for the last two times can they be successfully extracted (take $\sqrt{n}-\sqrt {n-1}=\frac{1}{2\sqrt{n}}}$) Find out what the maximum kinetic energy that the extracted particles can obtain?		The maximum kinetic energy that the extracted particle can obtain is $6\times 10^6eV$.	phy	电磁学_磁场	['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'phy_735_2.jpg', 'phy_735_3.jpg']
phy_736	MCQ	As <image_1>shown in the figure, it is a model of the electromagnetic water pump. The pump body is a rectangular body with a side length of $L_1$, and the left and right sides are squares with a side length of $L_2$. After adding conductive agent into the pump body, the resistivity of the liquid is ρ, and the uniform magnetic field B is perpendicular to the paper surface below the pump body. When working, the upper and lower surfaces of the pump body are connected to a power supply with a voltage of U (internal resistance is not counted). If the height difference between the electromagnetic pump and the water surface is h, the ideal current indicator is I, regardless of the resistance between the water in the flow and the pipe wall, and the gravitational acceleration is g. During the normal operation of the pump, the following statement is correct ()	['A. The upper surface of the pump body should be connected to the positive pole of the power supply', 'B. Electromagnetic pump can pump pure water without adding conductive agent', 'C. The total power supply provides is $I^2\\frac{\\rho}{L_1}$', 'D. If the mass of water extracted during time t is m, the kinetic energy of this part of water when leaving the electromagnetic pump is $UIt-mgh-I^2\\frac{\\rho}{L_1}t$']	AD	phy	电磁学_磁场	['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phy_737	MCQ	As <image_1>shown in the figure, a positive ion with a velocity of $v_0$and a charge of q can just fly straight out of the ion speed selector. The magnetic induction intensity in the selector is B and the electric field intensity is E, then ()	['A. If you change it to an ion with a charge of-q, it will deflect upwards (other things remain unchanged)', 'B. If the speed becomes $2v_0$, it will tilt upwards (other things remain unchanged)', 'C. If it is changed to the ion of +2q, it will deflect downward (other things remain unchanged)', 'D. If the speed changes to $\\frac{v_0}{2}$, it will deviate downward (other things remain unchanged)']	BD	phy	电磁学_磁场	['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phy_738	MCQ	<image_1>As shown in the figure, when the conductor bar $ab$on the metal guide rail makes the following movements along the guide rail in a uniform magnetic field, an induced current will be generated in the copper wire coil $c$and repelled by the solenoid ()	['A. Make a uniform motion to the right', 'B. Accelerate to the right', 'C. Slow down to the right', 'D. Slow down to the left']	B	phy	电磁学_电磁感应	['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']	['phy_738.jpg']
phy_739	OPEN	<image_1>A smooth, horizontal long straight track is placed in a uniform magnetic field $B=0.25\,\text{T}$, the track width is $0.4\,\text{m}$, a conductor bar is also $0.4\,\text{m}$, a mass of $0.1\,\text{kg}$, and a resistance of $r=0.05\,\Omega$. It makes good contact with the guide rail. When the switch is connected to $a$, the power supply can provide a constant $1\,\text{A}$current, and the direction of the current can be changed as needed. When the switch is connected to $b$, the resistance $R=0.05\,\Omega$. If the switching of the switch and the commutation of the current can be completed in an instant, ask: If the rod moves $7\,\text{m}$to the left in the shortest time and comes to rest, what is the Joule heat generated in the rod?		0.4J	phy	电磁学_电磁感应	['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']	['phy_739.jpg']
phy_740	MCQ	<image_1>As shown in the figure, the four areas between the two square dotted boxes have uniform magnetic fields of equal magnitude. The two areas on the left face inward perpendicular to the paper, and the two areas on the right face outward perpendicular to the paper. There is an existing square metal wire frame $abcd$whose size is the same as the outer edge of the magnetic field area and moves horizontally to the right at a uniform speed when the coil passes through the magnetic field area. There are the following four images. Among them,$A$is the current time image in the circuit,$B$is the voltage time image at both ends of the $bc$part of the coil,$C$is the time image of the ampere force applied to the wire frame, and $D$is the time image of the Joule heat power in the wire frame. Then what may be correct is ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	AD	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAB9AR0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiobm4itLaW4ncJFEpd2PYAZND0AmornNE8caLr+oNY2UlwJwpcLPbvFvUd1LAZHPaqR8Yarc6rqVnpPhmS+jsJ/s8s32yOIF9obgMM9CKLBc7CiuT/AOEg8V/9CS//AIM4aP8AhIfFf/Qkv/4M4aAOsork/wDhIPFf/Qkv/wCDOGj/AISHxX/0JMn/AIM4aAOsork/+Eh8V/8AQkv/AODOGj/hIfFf/Qkv/wCDOGgDrM0Vyf8AwkPiv/oSX/8ABlFR/wAJB4q/6EmT/wAGcVAHWUVyf/CQ+K/+hJf/AMGcVH/CQ+K/+hJf/wAGcNAHWUVyf/CQeK/+hJk/8GcNH/CQeK/+hJf/AMGcVAHWZwMnpVOy1Sx1F50s7lJmgcxy7Dnaw7VzR8XapBqWn2Or+GJLKLUJ/s0cv2yOUbipOCFGegNclo8WuaTd+Jo/DMNja2lneySMsse4SAAEqoBG08dT60XV3ftcdrrQ9eorK8O6v/bmh21+U2PIo3r6N3H51qU2rOzJTuri0UVjWWum+8R6npKWbKuniPfOXGGLruAA60hmzRXPLrHiA6l5B8LuLXdj7T9uj6eu3rU+r6nrNlMqadoDaihHLi7SLH4NQBtUVlz32px6StzFo5lvCObT7Qqkf8DPFN0rUNVvIpW1DRG091HyIblJd/4r0oA1qKwLPV9en1EQXPhlre2yR9oN7G/HrtHNN1rXNX0uZjb6B9qtEGWuDexxAfg1AHQ0ViS61fS6Lb6hpmkm+eYBvJFwqYH+8eDU2nX+qXNhLNeaM1ncL9y3Nykm/wD4EOBQBq0VhaZquuXd75V94caxg/57G8jk/Qc0291fXoNRMFr4Za5tsgC4F7GnHrtPNAG/RWTquoarZwRPp+iNfuw+dBcpFs/FutOt77U5dJa5m0dobwDi0+0KxP8AwIcUAalFYekavq95dGHUtB/s0EZRmvI5S30C81uUAFZfiO/XTPD97ePbLcrFEzGJhkNgHr7VqU1lV1KsoZTwQRkGk1dWQ07O7PF9G8SWV58RdDuZfEFldJLZuiRRRJGsDEqRFkdSOn4V3HgjnW/GJ/6i5/8ARSV1K6fZIwZLS3VhyCIwCP0rlvBP/Ic8Y/8AYXP/AKKSqb0SF1udjS0UUgCikooAWkopaAEpaSigAopaSgAopaKAON8bf8hvwf8A9hcf+inqnNofiew1bVYtMtrKWw1SVpJLiWcrJFu4ICbSDge4q542/wCQ34P/AOwuP/RT12NFtR30sUdH0uPRtKgsYmLCJQCx/iPc1epaKbd9SUrKwViAW1xe63BpVwLbVcRiebYH2MV+Q4PXitusCO0t9B1LXtduLn91ciJ5AAWMYRNvQDPNIZFaeK4be1uI9c22V/ZoGnjJ4cE4VkP8SkkDPHPFXNEm1W8M97qC/Z4ZSPs9myYeNR/Ex67j3XtjrWG+hX/ifOrXrtYTBR9ggABMODnc/XLHkY5GD61uaJq818Z7O/g+z6lakCaNQdjA9HU/3Tg4HX1oAqW2sXWl6mdO12RSs7n7HeBQqy552MOgcc4HOQM07TtVvNd1RbiwZY9EiBxMVBN23T5fRBwdw6nIxVK5jk8aXLQANDolvJh3K4a6ccELnkIDkE8HI44qTT9Rl8OSro+svmBUJtL4rgSqMkq2OjgAnoBjGOaAOluLmG0t5Li4kWOKNSzuxwAPWsG/0+y8a6fZypeyHT/M3skZwJgMjBIPTP8AKllhsPG2jxsWl+xednb0EoU9++DW9BDFbQpDCipGgwqqOAKAMDxAdY0u1tJ9Bgjlgt2xNZqgG9P9nA4I5OO9b1tMbi1imMbxmRAxRxhlyM4I9akrnvEMWtW11b6ppLvcJACsthwBKD3B/vDHHOOaAOipKbGxaNGZdrFQSp6iue0HwhDoXiDWNXjv7ud9TkDvFMwKRck4X86AOjpaay7lK5xkYrn/AAh4Sh8IWFzaQ311eCeczFrlgSpIHAx24oANRsL2bxxod9EG+xwQXCzEE4ywXbx+Broq5/UNUurfxroumx/8et1BcPLx3QLt/ma6CgAooooAK43wT/yHPGP/AGFz/wCikrsa47wT/wAhzxj/ANhc/wDopKAOxpaKSgBaSiigAopaKAEooooAWkpaKAEpaKKAON8bf8hvwf8A9hcf+inrsa47xt/yG/B3/YXH/op67GgBaSlpKACuXtpbjSdc8U6lepO1kPIeERoXJAjw21Ryea6isTStWnvfEuvafKoENi0AjPrvTcf1oA1rW6gvbWO5tpVkhkGVdTkGq1pq9pfahdWduzSPa4EjhTsyc/KG6EjHI7VxOoySWWoalB4ekuDYZH9oiFAwtm4z5eejbcZXgAEsOa6/SjpOn+H4ZrCWMaasXmLNuzuXGdxY8k+55oA0bi4itYHnnkWOJBlmY4AFYkMun+NdHfzIJvsRlG3eCvmAEEHBHTNGnX0Hi+wuxLaONPZ9kbPx5w7n6ZFbsUUcESxRIqIowqqMACgAiijgiSKJAkaKFVVHAA7U6iigAoopaAOb1qw1uPWbXU9IuTIg/d3FpK+FZc9V9D/hXR5GcAjI6iiuavdC1GDxJHrGk3XEuEureZzsZM9V64IyenWgDpaWo96Sh0VxkDBx1FYHg/ws/hSwubV9VutRM05m8y5OSmQPlHJ44oAu3ep2kHiXTdOkh3XVzFK8UmPuhQN355Fa1ZN3p9lN4l02/ll23lvFKsMefvBgN35YFa1ABRRRQAlcd4J/5DnjH/sLn/0UldjXHeCf+Q54x/7C5/8ARSUAdjRS0UAFJRS0AJS0UUAFFJRQAtJRS0AFFJRQBx3jb/kN+D/+wwP/AEU9djXHeNv+Q34O/wCwuP8A0U9djQBx/wARIdVTQf7Q0vVbuyNqd8wt8ZePv1B5qey+0arrFhd2ms3Js4bcGaJSuyR/9rjOea6WeCO5geCVQ0bjaynuKxPDmj2HhazXTEuUaZ2L/McM2Se36fhRHS/3/oEtUv68zfrD32mqXmt6baSy2l7GI0nuIcBwWXKkZ4yBW5WVY6bbWet6vfxy75rwxGVAfubEwPzFAFi0srPRtMEEEax28KEnjOe5J9a5jwoI9UvtYmt7WWPQ7ggRRScI7873UdRuyK0dE1m+17UrtzZmHSEHlxtKuGlbucHtXQxRJDEscSBEUYVVGABQARRJDGscaBEUYVR0Ap9JS0AFJS0lABS0lFAC0lLRQBzh8NzWvihdX0678mKXi7t2yVk9x6GtyC7t7kyCCZJDG21wpztPoamrn4PDMWneIZNWsZzbxTAm5twPlkP972PTn2oAdqGk3Nz400bVIyPs9pBcJIM93C4/ka365N9da98aaNBp84lsXiuRcbOQHQLgH0PJrrKACiiigArjfBP/ACHPGP8A2Fz/AOikrsq43wT/AMhzxj/2Fz/6KSgDsqKKSgBaSiigAopaSgBaSiigApaKKAEooooA4X4jW893d+FILa7e0mfVgEnRQxQ+W/IB4NW/+EV8S/8AQ9X3/gHD/hTfG3/Ib8H/APYXH/op67KgDj/+EV8S/wDQ9X3/AIBw/wCFcZ478D+LNTjtbaz8QX9/OG3eaYI4kj+rJzXsdJQBw3gXwx4p0OJRrfiA3aAcQKoK5/3iM1Fdx+IdC8ZatrUMJuNIuGgDwLy+FTBYfT69676sHSdQu7rxT4hs58/Z7VrcQZHHzR5b9aANuHaYUKpsUjIXGMU+ue1h9asNXt72xH2qwYCOe2zgrz95f0roRQAUUUUAFFFFAC0lLSUAFFLRQAlUdU1ay0i2E17MsaMwQZ7knGP1pusa1Z6HYtdXj4UcKijLOfQDqahk0ix1a+tNWuI3d4kzEj9EJ749eaAMSK3sdI+INqLdGDavbyPtAwqeWASR7ndz9K7Ksq6g05vEenTTsBqEcUotx6qQN/8AStWgAooooASuO8E/8hzxj/2Fz/6KSuyrjfBP/Ic8Y/8AYXP/AKKSgDsaWkooAKKKKACilooAKSiloASiiloASlpKKAOO8bf8hvwf/wBhgf8Aop67GuO8bf8AIb8Hf9hgf+inrsaACiiigArEi1/T49S1uOYx2y6b5RuJ3OAQybgSfYVuVkWun6aNW1eRCks90YvtcbDIGFwuR9KANVWV0DqQVIyCO4rl7ltQt/F5bTbuO6jZUF5ZPJ80KnO1x168/lWTe6hceFLmfSbC6jltZAGQy5b+zwxx8xHVc9Op3Hniut0TSbbSrILDIbiWT55rpsFpmPViR6+g49KANKlrnV0jUbDxMb6yuQ9hckfabeUn5CB95fy/WugV0fO1lbBwcHOKAHUlLRQAlLSUtACVna1rVpoVg13dvgfdRB952PRQO5Jp2s6vbaJp0l3cscLwqgZLN2AqCxQa3p9pe6np/kzj50hk5MZOOvbNACpY2us/YtSu7VhLGu6OOT+AnnOPWtWkbKodoyQOBXPeENU8Qarp9zL4h0hdMuEnKRRq2d6YGG6mgCe+0WS68XaRq6uBHZQzxsvclwuP5VuVzepG+HjvQhDv+xG3ufPx93dhduf1rpKACiikNABXHeCf+Q54x/7C5/8ARSVna346tz4p0ex0XxFaSmS7FvdWSIrsRzk56jGMVo+CP+Q34w/7C5/9FJR0uD0djsaWkpaACkpaKACiikoAWkopaAEopaSgBaKKSgDjvG3/ACG/B3/YXH/op67GuO8bf8hvwd/2Fx/6KeuxyKAClpKKAFrmotF1K31bxJe2lxDFNqAh+zPIm5UKJtJYA8810tctbw3Gra34p029edLI+QkLRuUIBjy21hyOfSgDU0vQrTTbGW32mZ7nLXUsnLTsRglj344+gpmi6PNo0k9tFch9LwPssBX5oPVQf7vTAxxWSNfvtB3abq0L3N0flsJYl/4/PQEdmHJIGflGavadolzLa3k2sXMrXuoR7J0hmZUhXBwqYxyMn5sAmgDf68Vz1poFxpXiGW8sbsJp1xl7i2cZAfH3l9O1U11u78MltO1dJrofd0+eJMtcekZH9/8APIBNaWiadfCWXVNWlJvrlAhtkcmKFM5CgdCf9rGecdqANiGeK4TfDKkqg43IwIyO3FSVgWOgx6Hql1fW940djOC8tswyqt/eB7dT0rYtLy3v7dbi1mSWFs7XQ5BwcUATVR1jVYNF0ya+uFkZIxnbGpZmPoAKl1C9XT7GW5ZHfYMhEGSx7AVn6BLqWoaebjWbaKJpH3RQ4yUXtnjrjH0oAXSftGrafDdatZxxybvMijPJjHbPvWxUc8yW1tJM+dkaFzj0AzWR4U8Vad4x0X+1dLEwtjI0X75NrZGM8ZPrQBuUUlYGl+MdL1fxPqnh+2E/23TQDPvTCc46HPPWgCW91p7XxbpOkCMFL2GeQv3GwL/jW3WVdyaYviPTo5wP7RaKU23+6AN/9K1aACsHxlLcw+E9Re0DGUQt93rjBzW9SMoZSrDIIwQamSurDi7O55Ney6HJZeDbm1ktBMt5D5jhgGB2ndnv19a6DwdfWlvrni8T3UERbViQHkC5HlJzzWs/w/8ACEkzTP4c05pGYsWMAySec1Jd+BfCt9cvc3WgafNM/wB6R4QSa0buvmTbbyVjT/tfTf8AoIWn/f5f8aP7W03/AKCFp/3+X/GsX/hXXg3/AKFnTP8AwHWj/hXPg3/oWdM/8B1qRm1/a+m/9BC0/wC/y/40f2tpv/QQtP8Av8v+NYv/AArnwb/0LOmf+A4o/wCFc+Df+hZ0z/wHFAG1/a+m/wDQQtP+/wAv+NH9rab/ANBC0/7/AC/41i/8K58G/wDQs6Z/4DrR/wAK68G/9Czpn/gOKANr+19N/wCghaf9/l/xo/tfTf8AoIWn/f5f8axf+Fc+Df8AoWdM/wDAdaP+Fc+Df+hZ0z/wHWgDa/tfTf8AoIWn/f5f8aP7W03/AKCFp/3+X/GsX/hXXg3/AKFnTP8AwHWj/hXPg3/oWdM/8B1oA2v7X03/AKCFp/3+X/Gj+1tN/wCghaf9/l/xrF/4Vz4N/wChZ0z/AMB1o/4V14N/6FnTP/AdaAMzxjfWtxrfhEW1zDMy6sDtjkDH/VP6Vn2WgWHi+TVb/UrieO+t70rHIkhDQKuCAB09eoNdXY+CPC+m3kd5ZaDYW9zEcpLHCAyn2NQ3PgjTZ9Zk1SO5v7WWUhpo7afZHKQc5Zcc0L4rj6aG/ajbaQqJWlwgHmN1bjqampFVUQKowoGABS0PclbCVzw8ROdS1+0gsWuLjTViKxRkB5y6bsDJroqqJpljFqEt+lrEt3MAskwX5mAGACaBnNW+jWOoC5k1y/t7jU7oAbUmA+zAchIxnPBGeec57VZtNVvtHt7uz1bFzLaR7oLgyohuxg4GCRh+OeAOeKtL4L8NLqH9oLodiLzdu87yRuz65qbVfC2g65Msuq6TaXkijCtNGGIFAGTBokGo20+p+I5oZZbpNqJ5mI7ZDztU568Ak5POcHFW/Dt1eRyzabczpfQW6BotQWRT5i5+6+P4x3wMYxWjNoGk3Olrpk2nW8liowLdkBQfhTdM8OaNosUsWmaZa2iSjDrDGFDfWgCyt/YzSeSl3bu542CRST+FYMVppnhS5v7yK/EcUo3myaRQA3HKg8//AK6uWng3w3Y34v7XRLGG7B3eckQDZ9c07UfCPh7V7sXWo6NZ3VwP+WksQZvzoAraDe301m+pa3LDbR3BzDbu4AjXtk9Cfoa3Yrq2miMkM8Txr1ZHBA/EVTvvD+kanYR2N9p1tcWsf3IZIwVX6Ciw8P6RpdjJZWOnW1vayffijjAVvqKALMd9ZXDmKK6t5W7okgY/lTFutNs2+zrPaQHP+rDqvP0qjp3hHw9pF39r0/RrO1uD/wAtIogrfnTbzwd4b1C/N9d6JZT3ZIPnPEC2frQBqzXdtbqGnuIog3Qu4UH86ZE9jh7uJrfDffmQrz9TVbU/DujazDFDqWmW13HEMIs0YYL9KdBoGk2umNpsGnW8diwwYFQBD+FAFGWxtNU8U6Zq0F/DI1jFNH5ccgbdvA54+lb9ZGleFtB0OZptL0m0s5GGC0MQUkVr0Af/2Q==', 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phy_741	MCQ	<image_1>As shown in the figure, the smooth parallel metal guide rail is formed by smoothly connecting inclined rails on the left and right sides and a middle horizontal rail, and the spacing between the guide rails is $L$. A fixed resistor with a resistance value of $R$is connected to the upper end of the left inclined track. There are two uniformly strong magnetic field areas $I$and $II$with a width of $d$between the horizontal orbits, and the magnetic induction strengths are $B$and $2B$respectively, with opposite directions; the metal rod $ab$with a mass of $m$, a length of $L$, and a resistance of $R$is released from rest at $h$on the left inclined track. After the metal rod enters the magnetic field $I$area from the left for the second time, it finally stops at the boundary line between the two magnetic field areas. Regardless of the resistance of the metal guide rail, there is no mechanical energy loss at the junction of the inclined rail and the horizontal rail, and the gravitational acceleration is $g$()	['A. When the metal rod passes through the magnetic field regions $I$,$II$for the first time, the ratio of Joule heat generated on the constant resistance is $1:4$', 'B. When the metal rod passes through the magnetic field regions $I$,$II$for the first time, the ratio of the change in the momentum of the metal rod is $1:4$', 'C. When the metal rod passes through the magnetic field region $II$twice, the ratio of changes in the kinetic energy of the metal rod is $2:1$', 'D. The second time the metal rod passes through the boundary between the two magnetic fields is $\\frac{2\\sqrt{2gh}}{7}$']	BC	phy	电磁学_电磁感应	['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']	['phy_741.jpg']
phy_742	OPEN	The cross-section of a conveyor belt device in the vertical plane is shown in the figure<image_1>, with the ab section horizontal and the bcd section being the $\frac{1}{2}$circumference. The conveyor belt is driven by a motor to move at a constant speed of $v=4m/s$. Small objects (which can be regarded as particles) with a mass of $m=1kg$are dropped at the left end point a of the conveyor belt without initial speed. When the first object A reaches point b, another identical object B is immediately dropped at point a. When the objects reach point b, they are at exactly the same speed as the conveyor belt, and then it can be ensured that the objects and the conveyor belt pass through the bcd section relatively still. When the block reaches the highest point d, the elastic force between it and the conveyor belt is exactly equal to its gravity. There is also a straight track ef on the left of end point d. A wooden board with a mass of $M=1kg$is parked statically on the track. The object coming out of point d can enter the rightmost end of the upper surface of the wooden board horizontally. The wooden board is long enough. It is known that the dynamic friction coefficient between the object and the conveyor belt is $\mu_1=0.8$, and the dynamic friction coefficient between the object and the board is $\mu_2=0.2$; the dynamic friction coefficient between the board and the track is $\mu_3=0.1$; if the maximum static friction force is equal to the sliding friction force, take $g= 10m/s^2$. Try: Total time spent on board 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phy_743	OPEN	A certain game device designed by a classmate consists of two parts: track ABCD and arc track EF. As shown in the figure<image_1>, the device is placed vertically on a horizontal table with a height of H=0.62m; the dynamic friction coefficients of the tracks ABCD in the device are all μ=0.5, and the friction of the other tracks is not counted. AB and CD are horizontal planes, BC is inclined planes, AB and BC, BC and CD are connected by arcs of unlimited length. There is a small arc-shaped elastic baffle K above point C, and the end of the baffle is horizontal. Point E is directly above point D, and the DE spacing is not counted. The vertical height from point B to point E is h=0.08m, and the horizontal length of the ABCD is L=0.12m; an ejection device is placed on the left side of the horizontal track AB. Consider an object with a mass of m= 1kg that can be regarded as a particle and is ejected from rest release close to the spring. When the compression amount of the spring is d, the object enters the\frac{1}{4} with a radius of R=0.2m from point E. The arc orbit EF moves, and the object is just not squeezed at the highest point of this orbit. Ignore the loss of mechanical energy caused by collisions of small objects at the junction of various orbits. When the compression amount of the spring is d, a small ball of the same mass as the small object is placed at point D. When the small object passes through point D, the small object collides elastically with the small ball. After the collision, the small ball moves vertically downward from point F through the track EF, and collides with a triangular prism G fixed on a straight rod directly below (the position of the triangular prism G can be adjusted up and down). After the collision, the speed direction is horizontal to the right, and the size is the same as before the collision, and finally lands on the ground at point Q. Calculate the maximum value of the horizontal distance x between the landing point Q and the point F x_{max}.		0.8m	phy	力学_曲线运动	['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']	['phy_743.jpg']
phy_744	OPEN	There are three semicircular smooth runners $C_1, C_2, C_3$, and a semicircular smooth round tube $C_4$, connected in the vertical plane to form a track as shown in the figure<image_1>. Their radii are $4R, R, R$and $2R$respectively. The inner diameter of $C_4$is much smaller than that of $R$. There is a small ball with a mass of $m$with an inner diameter slightly smaller than $C_4$. It starts vertically downward at a certain speed from the point $A$, moves along the concave surfaces of $C_1, C_2, and C_3$, then enters the tube of $C_4$, and finally returns to the point of $A$. The gravitational acceleration is known to be $g$. Question: If the speed $v'$when starting at $A$is $\sqrt{6gR}$, where does the ball move and the elasticity of the orbit to the ball is the greatest? What is the maximum value?		When the ball moves to point F, the trajectory has the greatest elasticity on the ball, and the maximum value is $9mg$.	phy	力学_曲线运动	['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']	['phy_744.jpg']
phy_745	MCQ	<image_1>The figure shows the tracks of the disk, which are concentric circles with different radii. For the convenience of data retrieval, disk formatting requires that the bytes stored in all tracks are the same as the bytes of the innermost track, and the arc length of the track occupied by each byte on the innermost track is $ L $. It is known that the radius of the outermost track of a disk is $ R $, the radius of the innermost track is $ r $, the width between adjacent tracks is $ d $, and the outermost track does not store bytes. The motor makes the disk rotate at a constant speed of $ n $revolutions per second. The head remains stationary when reading and writing data. For every revolution of the disk, the head jumps one track in the radial direction, regardless of the time it takes for the head to transfer the track. The following statement is correct ()	['A. The difference between centripetal accelerations of adjacent tracks is $\\frac{4\\pi^2d}{n^2}$', 'B. The time for a byte of the innermost track to pass through the head is $\\frac{L}{n}$', 'C. The time required to read all bytes on the track is $\\frac{R-r-1}{nd}$', 'D. If $ r $is variable and other conditions remain unchanged, the disk stores the most bytes when $ r = \\frac{R}{2} $']	D	phy	力学_曲线运动	['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']	['phy_745.jpg']
phy_746	MCQ	<image_1>As shown in the figure, three containers A, B and C with smooth inner walls are fixed on the horizontal ground, and their central axes are perpendicular to the horizontal ground. Among them, the inner surface of A is a conical surface, the inner surface of B is a hemispherical surface, and the inner surface of C is a paraboloid of revolution (a curved surface obtained by rotating a parabola once around its axis of symmetry). Two small balls in the three containers are stuck to the inner wall and move in a uniform circular motion in the horizontal plane. The small ball can be regarded as a particle. The following statement is correct ()	['A. The linear velocity of ball A in container A is greater than that of ball B', 'B. The angular velocity of sphere A in container B is smaller than that of sphere B', 'C. The angular velocities of the two balls in the C container are equal', 'D. The angular velocity of ball A in container C is smaller than that of ball B']	AC	phy	力学_曲线运动	['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']	['phy_746.jpg']
phy_747	MCQ	As shown in Figure A<image_1>, small blocks a and b (which can be regarded as particles) with masses\(m_1\) and\(m_2\) are connected by thin lines and placed on a horizontal disk along the radial direction. The distances between a and b and the axis of rotation OO'are\(r_1\) and\(r_2\) respectively. If the disk starts to rotate slowly around the axis OO'from rest,\(\omega\) represents the angular velocity of rotation of the disk, and the friction force on block a\(f_a\). The graph of the change with the square of the angular velocity of the disk (\(\omega_1^2\)) is shown in Figure B<image_2>. The slope of the corresponding graph line from 0 to\(\omega_1^2\) is\(k_1\), the slope of the corresponding graph line from\(\omega_1^2\) to\(\omega_2^2\) is\(k_2\), the dynamic friction coefficient between the two blocks and the disk is\(\mu\), the maximum static friction force is equal to the sliding friction force, and the magnitude of the gravitational acceleration is g. The following statement is correct ()	['A. \\(\\frac{r_1}{r_2} = \\frac{1}{4}\\)', 'B. \\(\\frac{m_1}{m_2} = \\frac{1}{3}\\)', 'C. \\(\\frac{k_1}{k_2} = \\frac{2}{7}\\)', 'D. \\(\\frac{\\omega_1}{\\omega_2} = \\frac{7}{8}\\)']	B	phy	力学_曲线运动	['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', 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'phy_747_2.jpg']
phy_748	MCQ	As shown in the figure<image_1>, it is a sectional view of a cylinder placed horizontally, and O is the rotating shaft. Now let the cylinder rotate at high speed in a clockwise direction around the central axis. At a certain moment, gently place a small object on point A directly below the axis of the cylinder. The object moves with it under the drive of the cylinder, and the object moves to the highest point. After point C, it will slide down again and eventually stay at point B. It is known that\(\angle AOB = \theta\),\(\angle BOC = \alpha\), the following statement is correct ()	['A. The ratio of the acceleration of the object at points A and C is\\(\\sin\\theta : \\sin\\alpha\\)', 'B. The friction force experienced by the mass at point A is less than the friction force experienced by the mass at point B', 'C. If the cylinder speed is increased, the mass will still stay at point B eventually.', 'D. If the rotating speed of the cylinder is increased, the maximum height that the mass can reach will be higher than point C.']	AC	phy	力学_曲线运动	['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phy_749	OPEN	<image_1>As shown in the figure, the xOy plane is located in the paper, there is a uniform strong electric field in the positive direction of the y-axis in the second quadrant, and there is a uniform strong magnetic field perpendicular to the paper and inward in the fourth quadrant. There is a baffle EF parallel to the x-axis at y = -\frac{1+\sqrt{2}}{2}d, and the left end E of the baffle is located on the y-axis. An electron is emitted from point A(-d, d) in the second quadrant in the positive direction of the x-axis at an initial velocity v_0 and passes through point C on the x-axis.(0.5d,0) Entering the fourth quadrant, there is just no collision with the baffle EF. The magnetic field boundary in the fourth quadrant is located at the edge of the EF plate but slightly smaller than the EF boundary. The electron mass is known to be m and the charge is e. Find: Keep the original electric field, magnetic field and initial velocity of the electron unchanged, move the starting position of the electron from point A to point D(-d, 12d)(not shown in the figure), and add another uniform magnetic field (not shown in the figure) perpendicular to the paper in the third quadrant. After passing through the magnetic field, the electron enters the second quadrant from point G on the x axis (not shown in the figure) perpendicular to the x axis. Calculate the time t for the electron to move from point D to point G.		\frac{\left(25+11\sqrt{2}\right)d}{2v_0} + \frac{\left(5+\sqrt{2}\right)\pi d}{8v_0}	phy	电磁学_磁场	['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phy_750	OPEN	<image_1>In the rectangular coordinate system xOy, in a cylindrical region I with O as the center of the circle and a radius R, there is a uniform magnetic field that runs inwards perpendicular to the paper. The region II with R \leqslant x \leqslant 3R and y &gt; 0 is filled with uniform electric fields in the positive direction of the y-axis, and the region III with R \leqslant x \leqslant 3R and y &lt; 0 is filled with uniform electric fields in the negative direction of the y-axis. The electric field intensity is E, and other regions are regarded as vacuum. There is a particle source at the coordinate origin O that can emit negatively charged particles with a rate of v in all directions on the paper, with a particle charge of q and a mass of m. The gravity of the particles and the interactions between them are ignored, and the boundary effects of the field are ignored. It is known that a particle can leave the magnetic field in the positive x-axis direction from the N\left(\frac{3R}{5}, \frac{4R}{5}\right) point on the magnetic field boundary, and the electric field strength is E = \frac{9mv^2}{10qR}. Find the coordinates of the position of the particle leaving the magnetic field from point N when it is deflected by the electric field and leaves the right boundary of the electric field;		\left(3R, -\frac{3}{5}R\right)	phy	电磁学_磁场	['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']	['phy_750.jpg']
phy_751	OPEN	In <image_1>the planar rectangular coordinate system xOy as shown in Figure A Within (where Ox is horizontal and Oy is vertical), the rectangular area OMNP is filled with a uniform magnetic field (magnetic field at the boundary) with magnetic induction intensity of B and a direction perpendicular to the paper and inward. In which\overline{OM} = 3d,\overline{OP} = 4d, a fluorescent screen perpendicular to the x axis is placed at point P, and now the mass of m, A positively charged particle with charge q enters the magnetic field from the midpoint A of the OM side at a certain velocity perpendicular to the magnetic field and along an angle of 45° from the negative direction of the y-axis, regardless of the particle's gravity. If the direction of the magnetic field outward perpendicular to the paper is specified as the positive direction, the change rule of the magnetic induction intensity B is as shown in Figure B <image_2>(B_0 in the figure is known), adjust the period of the magnetic field to satisfy T = \frac{2\pi m}{3qB_0}, and let the particles enter the magnetic field at a certain initial velocity from the coordinate origin O at time t = 0 along a direction forming an angle of 60° to the positive direction of the x-axis. If the particles hit the screen vertically, find the possible initial velocity of the particles and the position they hit on the optical screen.		\frac{8\sqrt{3}qB_0d}{3(2n+1)m} \quad (n = 0, 1, 2 \cdots), \quad \frac{4\sqrt{3}}{3}d	phy	电磁学_磁场	['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'phy_751_2.jpg']
phy_752	OPEN	As shown in Figure A<image_1>, a certain ion thruster on the space station consists of an ion source, two parallel metal plates M and N with a small hole in the middle at a distance of d, and a cube with a side length of L. The rear end face P is a nozzle. Taking the center O of the metal plate N as the coordinate origin, the x, y and z coordinate axes are established perpendicular to the side of the cube and the metal plate. There is a uniform strong electric field with a field strength of E and a direction along the positive direction of the z-axis between the M and N plates. There is a magnetic field in the cube. The component of the magnetic induction strength along the z-direction is always zero, and the components along the x and y directions B_x and B_y are periodic changes with time as shown in Figure B, where B_0 is adjustable. A beam of xenon ions (Xe^{2+}) is emitted from the aperture S of the ion source, moves at a uniform speed in the z direction to the M plate, accelerates by the electric field into the magnetic field region, and finally exits from the end face P. After being accelerated by the electric field, the ion is measured at the center point O of the metal plate N. The velocity relative to the propeller is v_0. It is known that the mass of a single ion is m and the charge is 2e, the interaction between ions is ignored, and the total mass of the ejected ions is much less than the mass of the propeller. Suppose that the movement time of ions in the magnetic field is much less than the magnetic field variation period T, the number of ions ejected from the end surface P per unit time is n, and B_0 = \frac{\sqrt{2}mv_0}{5eL}. Calculate <image_2>the component of the force exerted by the ion beam on the propeller along the z-axis at t_0 in Figure B.		\frac{3}{5}mnv_0, direction along the negative z-axis	phy	电磁学_磁场	['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'phy_752_2.jpg']
phy_753	OPEN	A device uses electric and magnetic fields to control the movement of charged particles. The working principle is shown in the figure<image_1>. The emission source $A$(close to the left polar plate) that can move up and down continuously emits particles with a mass of $m$, a charge of $-q$, and an initial velocity of $v_0$, and a direction parallel to the polar plate. The accelerated electric field enters from the small hole on the axis of the vacuum channel $O$. The length of the horizontal channel is $L$. There are uniform magnetic fields with equal magnetic induction intensity, opposite directions and perpendicular to the paper surface in the upper and lower rectangular areas. The distance between the two magnetic fields is $d$. There is a collection plate at the right end of the device.$M$,$N$, and $P$are three points on the plate.$M$is located on the axis $OO'$, and $N$and $P$are located on the upper and lower boundaries of the lower magnetic field respectively. Changing the acceleration voltage of $U$can control the position at which the particles reach the collection plate. When the accelerating voltage $U=U_0$(unknown), the particle enters the channel at an angle of $45 ^\circ $to the axis, passes through the magnetic field area above once, and hits the $P$point exactly vertically. Regardless of the gravity of the particle. If $d=\frac{mv_0}{qB}$($B$is the magnetic induction strength of the two magnetic fields), the accelerating voltage $U=kU_0$. If the particle passes through the upper magnetic field region only once to reach the point $N$, find the value of $k$;		\frac{25}{9}	phy	电磁学_磁场	['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phy_754	OPEN	<image_1>As shown in the figure, in the spatial coordinate system Oxyz, there is a uniform strong magnetic field in the negative direction of the z-axis in the space where z &gt; 0, and there is a uniform strong magnetic field in the positive direction of the y-axis in the space where-0.1m ≤ z &lt; 0. At a certain moment from the point P(0, -0.2, 0.1), a positively charged particle with a specific charge of\frac{q}{m} = 2 \times 10^4 C/kg enters the electric field in the positive direction of the y-axis at a velocity v_0 = 1 \times 10^3 m/s, and then enters the magnetic field just from the coordinate origin O, regardless of the particle's gravity. Find: If B = \pi T, what are the position coordinates of the particle when it crosses the xOy plane for the 100th time?		(\frac{5}{\pi} \text{m}, \ 22.1 \text{m}, \ 0)	phy	电磁学_磁场	['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phy_755	OPEN	To detect radiation, Wilson used cloud chambers placed in a uniform magnetic or electric field to show their tracks. A research team designed the electric and magnetic field distributions as <image_1>shown in the figure. In the Oxy plane (paper surface), there is a uniform strong electric field parallel to the y-axis in the interval x_1 ≤ x ≤ x_2, x_2 - x_1 = 2d. In the interval x ≥ x_3, there is a uniform magnetic field outward perpendicular to the paper. The magnetic induction intensity is B, and x_3 = 3d. An unknown particle enters the magnetic field at an angle of θ = 53° from the coordinate origin, enters the magnetic field perpendicular to the magnetic field boundary at point P with coordinates (3d, 2d) at a velocity v_0, and exits the magnetic field from (3d, 0). It is known that the entire device is in a vacuum, regardless of particle gravity, sin53 ° = 0.8. As shown in the right figure<image_2>, if the magnetic induction intensity in the deflection magnetic field is from the boundary x_3 to x_4 from left to right at a spacing of d_0 (d_0 is very small), the magnetic induction intensity in the first area is B, and the magnetic induction intensity in the following areas is 2B, 3B, 4B... When the particle can reach the boundary x_4 on the right side of the magnetic field (it will be absorbed when reaching the boundary), find out what conditions x_4 should meet. [When n &gt; 1, take n(n + 1) = n^2 ]		x_4 ≤ \sqrt{2dd_0} + 3d	phy	电磁学_磁场	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEQAZUDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAoopGYIpZiAAMkntQAtFcD8O/iJD411HX7ZXTNndH7NgY3254VvfkE/iKv/ABMmv7LwNqGo6bf3FpcWaCYGEgbgGGQcjOMZ6YoA6+iubd7m/wDE2izWl7OsMVs8t5ApHlOrrhN3fduGR7Bvx6SgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACsvxHp95q3h+806xuUtprqMwmdgT5atwxAHU4zj3rUooA8U+F/wAPDoPijUdS0zU5CLC+l0+eGZRieLapzkdGBOfwxxXoniuey1vRNV8N2tzFNqN1C9r5KMGaJmThnA+6oBBJPtjkgGp4C/4/PFn/AGHJv/QUrqobG0t7qe6htYY7i4IM0qRgNJgYG49TgetAFTQdHTQ9KhtBK08oVfNncANKwAGT+AAA7ACtOiigAoqnP9s/tO08n/j12yef068bff16VcptWsSpXbVtgoornX1O7HxHi0oS/wChHSWuDHtH+sEoXOevQ0ijoqKKKACiiuc8W6nd6Y+gi0l8v7Vq0NtN8oO6Nlckc9OgoA6OiiigAooqG8kaKynkQ4ZI2YH3AoAmorA8Eahdat4I0bUL2Xzbq4tUklkwBuYjk4HFb9ABRRTJd/lP5f39p2/XtQDH0VW077T/AGbbfbf+Pny183p97HPTirNNqzsKLukwooopDCiiqVuL3+073zv+PXCeR09Pm9+vrTSumS5WaVty7XHN8UfCK+J/+EeOqr9u83yfuNs8zpt34xnPH1rsa8Dm+AGoS+PG1D+1Lf8Ash7v7ST83nYLbiuMYz2zn39qRR75RQOBiigArkNc+J3hPw5rq6PqWpeVefLvURsyx56biBgV19eGeOvgbqfiXxzcaxY6lax2d46vMJt2+M4AOAAQemRyPSgD3JWV1DKQVIyCO4par2Fmmn6da2URZo7eFIlLHJIUADP5VYoAKxfE/izR/CGmrf6zdeRC77EAUszt6ADk1tV538Wvh1ceP9JslsbqOC9spGaMTEhHVsbgcA4PyjH40Add4c8S6V4r0pdS0e6FxbFihOCpVh1BB5BrWrhvhZ4Fn8BeGZbG7uo57q4nM0pizsXgAAZ68Driu5oAKRmCqWYgKBkk9qWoL60S/wBPubOQsI7iJomKnBAYEHH50ActovxP8JeINeOi6dqYkvMsEBjZVkI67WIwa7CvCvBPwL1Pw545t9XvdStZLKykMkIi3b5DyFyCML1yeT6e9e60AFFFFABRRRQAUUUUAFFFFABRRRQBxvgL/j88Wf8AYcm/9BSuyrjfAX/H54s/7Dk3/oKV2VABRRRQBn3UNy+s2EsZb7OiSiXDYGSF25HfvWhWfdQXL6zYTRk+RGkol+bAyQu3jv0NaFXPaPp+rM4L3pev6LYK5GT/AJK9B/2An/8AR6111cjJ/wAleg/7AT/+j1qDQ66iiigArkfHn+s8L/8AYet//QZK66uR8ef6zwv/ANh63/8AQZKAOurzbVY/7a+MUWmi/vIbCy003F7FDeSRK7scIDtYYwOeMV6O7rGjO7BVUZJJwAK8m8E2OieLE8V+IdVSynXVL6SGCS4CsUgjXYpGen6dBQB2uiaDaRarFrWm6lfy2UtsyCCe7lljYlgRIocnsDz0wRit3UP+Qbdf9cX/AJGs3wvqOnX+lmHSXWWwsWFnFMpysmxQDt9QOmfUGtLUP+Qbdf8AXF/5GgDA+G//ACTfw9/15R/yrqK5f4b/APJN/D3/AF5R/wAq6igApkwZoJFT75Uhfrin0yZWaCRU+8VIH1xTW4nsVtJinh0i0jut3nrEok3Nk7sc896uVT0mGe30i0huc+ekSq+Tk5xzzVyqqfGyKWkI+gUUUVBoFZ9pDdJrOoyy7vs8gi8nLZHCndgdua0KzrS3uY9Z1GaUnyJRF5WWyOF547c1cNpen6oyqL3o+v6Pc0aKKKg1CiiigAooooAKKKKACiignAyaAPO/GbPqPxC8M6HbXd1BuEt3fmC5eIeQgwAdpH3mOM9ab4Xv7r/hZ2raZpV7PfeHILRTI8szTrDdbh8iyMSTxnIyce1UtHbRPEXjnxbr+tGwlsLMpptsLvYUVUGZG+bjlj1qX4OC5+z+ITbiRfDh1F/7IEgP+ry2duedv3cfj70AenUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcb4C/4/PFn/Ycm/8AQUrsq43wF/x+eLP+w5N/6CldlQAUUUUAULm3uJNZsJ4yfIjSUS/NjkhdvHfoav1Qube4k1mwnjJ8iJJRL82Mkhccd+hq/VzekfT9WZwXvS9f0QVyMn/JXoP+wE//AKPWuurkZP8Akr0H/YCf/wBHrUGh11FFFABXI+PP9Z4X/wCw9b/+gyV11cj48/1nhf8A7D1v/wCgyUAdTc2tveQNBdQRzwt96OVAyn8DWcPC/h8DA0PTcen2RP8ACtaigCG1s7axt1t7S3it4VziOJAijPJ4HFM1D/kG3X/XF/5GrNVtQ/5Bt1/1xf8AkaAMD4b/APJN/D3/AF5R/wAq6iuX+G//ACTfw9/15R/yrqKACmTKzQSKnDFSB9cU+mTKzwSKhwxUgfXFNbiexW0mGa20i0huM+ckSq+TnkDnmrlU9JgmttItILj/AF0cSq/OeQOeauVVT4mTSVoRXkFcF8Vru7i0LT7HS7u4tdU1G/itLaWCZkKbjlicHkYHf1rva801mODxV8ZtO0mZhJaaHYvdyoGxmaQhVBx0IGCKgsPFs114V1vwtBoeoX097eXywTWc9y86zQY+dyHJ27eORjrXd2lvcx6zqE8hPkSiPyvmz0Ug8duaZZeH9J068e8trKNbt12tcNl5CPTc2Tj2zT7S2uI9Z1CeQ/uJRH5XzZxhSDx25q4PSXp+qMqi96OnX9GaBOAT6V4vovx+t9X8bwaMdIMdhc3ItobnzsvknarFcdCccZ4z3r2ivO9N+C/hXSvFieIIFuTLHN58VuzgxRvnIIGM8Hkc1BqdqNb0w6yNHF7EdRMZl+z7vm2A4Jx+NPstVsdRmu4bO5SaSzl8m4VTzG+M4P51xPjOdNM+JPg3USjtvW8t2Ea5Z8xgqoHqT/Ouo0y1h0eC81LUZILe5vphPcsXARDgKq5OOgAGe5ye9AG1XjGufH620jxtPoyaQZrG2uPs81z5uHyDhiq46A57847V7MCGAIOQehFeeap8F/CmreKm1+4S5WWSUTS26OBFI+ckkYzyeTzQB6GpDKGHQjIpaAMDA6UUAFedfFT4lW/gS1tLU6auoXF8G/dSNtjEY4O7g5znGPr+Potcn43+Hui+PLe2TVBNHLbEmKaBgGAPUcggg4H5UAZ/w/vPDPjfwzFrNv4c0+1lEhjli+zIdkgx0OORyDmu7VVRQqqFUcAAYArH8L+GNN8IaHFpOlxstvGSxZzlnY9WJ9a2aACqeralBo2kXmp3O7yLWFpnCjJIUZOPerlQXlnb6hZT2d1GJbeeNo5EPRlIwRQB5T4B+N8fjDxWuiXOk/YzcBjbSJLvyVBOG4GOAea9drgfCXwh8NeD9dbV7H7VNcgMsX2hwwiB4OMAc44ya76gAooooAKKKKACiiigAooooAKKKKAON8Bf8fniz/sOTf8AoKV2Vcb4C/4/PFn/AGHJv/QUrsqACiiigDPuraeTWbCeM/uYklEnzY5IXHHfoa0Kz7q1nl1mwuEI8mFJRJz/AHguOO/Q1oVc3pH0/VmcFaUtOv6IK5GT/kr0H/YCf/0etddXIyf8leg/7AT/APo9ag0OuooooAK5Hx5/rPC//Yet/wD0GSuurkfHn+s8L/8AYet//QZKAOuooooAKrah/wAg26/64v8AyNWarah/yDbr/ri/8jQBgfDf/km/h7/ryj/lXUVy/wAN/wDkm/h7/ryj/lXUUAFMmVngkVThipA+uKfTJlZ4JEXhmUgfXFNbiexW0mCa20i0guP9dHEqvznkDnmrlU9Jt5bXSLS3nx5scSq+DnkD1q5VVNZsikrQivIKoQaHpNtdm7g0yziuT1mSBVf8wM1foqDQKxEuYLDXtRe8vbeJJhEYkkmAPCkHgnjmtuubl8I6VqPiDUL/AFXSNPvPOWIRPPAkjAKuD1HFXB6S9P1RnUV5R9f0Zq/25pP/AEE7P/v+v+NI2uaWEYrqNmWA4HnqMn86of8ACDeEv+hZ0f8A8Ao/8KRvA3hQo23w1o4bHBNlH1/KoNDntB+Kvg7xFfxw3M0dhqsDtGsV6ACrdCEfpz04IJ9K2NbLyeNfDQkw1gY7pjnlTNtTZ+O3zcfjXO+Hvgh4V0i4a81CH+1LtnL/AL5QsSknOFjHGPY5r0OWxs57Zbaa1gkgXG2J4wVGOmB0oAwvAJnPgyy8/ON0vk5/54+Y3l/hs249q6WkVVRQqgKoGAAOAKWgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA43wF/x+eLP+w5N/wCgpXZVxvgL/j88Wf8AYcm/9BSuyoAKKKKAM+6tJpdZsLlCBFCkocZ5O4Lj+VaFULm0ll1mwuUZRFCkocE8ncFx/Kr9XN6R9P1ZnBWlLTr+iCuRk/5K9B/2An/9HrXXVyMn/JXoP+wE/wD6PWoNDrqKKKACuR8ef6zwv/2Hrf8A9Bkrrq5Hx5/rPC//AGHrf/0GSgDrqKKKACq2of8AINuv+uL/AMjVmq2of8g26/64v/I0AYHw3/5Jv4e/68o/5V1Fcv8ADf8A5Jv4e/68o/5V1FABTJlLwSIpwzKQPyp9MmQvBIinBZSAfwprcT2K2k20lnpFpbTEGSKJUbByMgVcqnpNtJZ6RaW0pBkiiVGIORkCrlVUd5Nk0laEVa2gUUUVBYVn2lnNDrOo3TkeVOItgB5G1SDWhWfaWcsOsahdOymOcR7ADyNq4OauDspa9P1RlUV5R06/oy+TgE18z+GPi34z1D4nWdrczl7S6vhbyWHlKBGhbBxxkFRznPbmvpms2Lw/o0GptqUOlWUd8xJa5WBRISevzYzUGppUUUUAFfM3ir4ueM9P+Jt5a20xhtLS9MCWJiUiRA2OeMksOc578V9M1mzeH9GuNTTUp9KspL5MFbh4FMgx0+bGaANFSWQEjBIziloooAK8d+OnjnxB4Uj0q10SY2i3W95LkIGY7cYUZ4HXJ79K9iqnqOlafrFuLfUrG3vIQ24Rzxh1B9cGgDkfhH4m1TxX4Eh1DVxm6SZ4fOC7fOC4+bHTuRx6V3VRWtrb2VtHbWsEcEEYwkcahVUegA6VLQAVmeItQn0nw3qeo2sImntraSWOMjIZlUkVp0EZGD0oA+dvhL8T/FuveP4tM1S6N9aXayF1MSjycKWDDAGBkAc+tfRNZ2n6Bo+lXEtxp+l2dpNL/rJIIFRm+pArRoAKKKKACiiigAooooAKKKKACiiigDjfAX/H54s/7Dk3/oKV2Vcb4C/4/PFn/Ycm/wDQUrsqACiiigDPurSWXWbC5VlEcKShwTydwXGB+FaFZ91aSS61YXKsoSBJQwJ5O4LjH5VoVc3pH0/VmdNWlLTr+iCuRk/5K9B/2An/APR6111cjJ/yV6D/ALAT/wDo9ag0OuooooAK5Hx5/rPC/wD2Hrf/ANBkrrq5Hx5/rPC//Yet/wD0GSgDrqKKKACq2of8g26/64v/ACNWarah/wAg26/64v8AyNAGB8N/+Sb+Hv8Aryj/AJV1Fcv8N/8Akm/h7/ryj/lXUUAFMmQyQSIpwWUgH8KfUc6GSCRAcFlIBP0prcT2K+k28lppFpbysrSRxKrFTkEgetXKpaRbvaaPZ28jKzxRKpKnIJA7VdqqjvNkUlanFeSCiiioNArPtLSWHWdRuWZTHOItgB5G1SDkVoVnWlnJDrWo3LMhScRbQDyNqkHNXB6S16fqjKoryjp1/RmjRRRUGoUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBxvgL/j88Wf9hyb/wBBSuyrjfAX/H54s/7Dk3/oKV2VABRRRQBQubN5tZsLpXUJAkoZSeTuC4x+VX6oXNo0us2F0JECwJKCpPLbgvT8qv1c3pHXp+rM4K0padf0QVyMn/JXoP8AsBP/AOj1rrq5GT/kr0H/AGAn/wDR61BoddRRRQAVyPjz/WeF/wDsPW//AKDJXXVyPjz/AFnhf/sPW/8A6DJQB11FFFABVbUP+Qbdf9cX/kas1W1D/kG3X/XF/wCRoAwPhv8A8k38Pf8AXlH/ACrqK5f4b/8AJN/D3/XlH/KuooAKZMhkgkQHBZSAfwp9MmQyQSIDgspGT9Ka3E9itpNs1npFpbOys0USoWU5BwO1XKp6TbNZ6RaWzOrtFEqFkOQcDtVyqqO8mTSVoRVraBRRRUFhWfaWbw6zqN0zoUuBFtUHkbVI5rQrPtLNodZ1G6MiFZxFhQeV2rjmrg7KWvT9UZVFeUdOv6M0CcAmvG9G+Ptlq/jWDRf7IeKyubgW8N152WLE4UlccAnHfivZOted6b8FvCmleK01+3W7MscvnxW7yAxRvnIIGM8Hkc1BqeiUUUUAFeN638fbLSPGk2jLpDzWdtcG3muvOw24HDFVxyAc9+a9krzvVPgt4U1fxU+vXC3ayyS+dLbpIBFI+ckkYzyeTg0AehqQyhh0IyKWgAAYHSigArz/AOJvxPh+HsdlGtg17eXe5kQybFVVxkk4PrwMetegVyfjf4d6J49gtk1X7RHLbE+VNbuFYA4yOQQRwO1AE3gPxlbeOfDMer29u9u29opYWbdscYyAe4wRzXTVjeFvC+m+ENDi0nSo3W3Qli0jbmdj1Zj61s0AFU9W1KDRtHvNTudxgtYWmcKMkhRnA96uVBe2dvqNjcWV1GJLe4jaKRD/ABKRgigDyzwJ8b7fxj4qXRJtIayM+420gm352gnDDAxwDXrVcB4T+EHhnwfrp1ixN3NcgMIvtEgZYgRg7cAc4JHOa7+gAooooAKKKKACiiigAooooAKKKKAON8Bf8fniz/sOTf8AoKV2Vcb4C/4/PFn/AGHJv/QUrsqACiiigDPurRpdasLkSIBCkoKk/M24L0/KtCs+6tfN1qwufNRfJSUbCfmbcF6fTFaFXN6R9P1ZlTVpS06/ogrkZP8Akr0H/YCf/wBHrXXVwcmtaWPidHfnUbUWaaHIGn81dikTqCCc8HPaoNTvKKRSGUMDkEZBpaACuR8ef6zwv/2Hrf8A9Bkrrq4jxzf2b3nh63W6hM1vrtsZo943Rgo5BYdhigDt6KhtLu2vrZbi0njngfO2SNgytg4OCOvNTUAFVtQ/5Bt1/wBcX/kas1n6ze2tpYSJc3EULTo6RCRgu9tpOBnqfagDH+G//JN/D3/XlH/Kuorj/hpfWkngPQrOO5ia5j0+J3iVwWUEcEjtXYUAFMmTzIJEyBuUjJ7cU+o508yCRMgblIye3FNbiexW0i3Npo9nbs6OY4lUshypwOo9qu1S0i3+y6PZweYknlxKu9DlWwOo9qu1VTWbIpK1OK8kFFFFQaBWdaWjQ6zqNyZEYTiLCA/Mu1SOa0azrS08rWtRufNjbzxF8gPzLhSOfrVwekvT9UZVFeUdOv6M0aKKKg1CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAON8Bf8fniz/sOTf8AoKV2Vcb4C/4/PFn/AGHJv/QUrQ8aeIrrwr4em1iCwjvIbcgzq0xRlUkDI+U56+ooA6KisW61q4h1vRrOGzWW11BZC8/mgGLam4fL3B6Z7Ej1raoAz7q183WbC581F8lJRsJ5bcF6fTFaFULm1Eus2Fz5yKYUlAjPV9wXp9MVfq5vSPp+rM4K0padf0QV4He/DNZv2gotsanS5V/taRG6cNgrjvmTHHoa98rkZP8Akr0H/YCf/wBHrUGh11FFFABXh3xy8CyazrmgalYKBPe3CadMc45OSjH6Ddn8K9xrkfHn+s8L/wDYet//AEGSgDotK0230bSbTTbRAlvaxLFGPYDH51coooAK5L4l+Gl8VeA9RsBxOiefbt6SJyPz5H411tVtQ/5Bt1/1xf8AkaAPOfgV4ZGh+Ao7+UA3WqN57HuIxwg/LJ/4FXp9cv8ADf8A5Jv4e/68o/5V1FABTJk8yCRMgblIye3FPpkyb4JEzjcpGT24prcT2K2k2/2XSLS3EiSiOJV3ochsDqKuVT0m3FrpFpbiVZRHEq70PDYHUVcqqjvNkUlaEVtoFFFFQaBWfaWgi1nUbnzkYziL92D8yYUjn61oVn2loItZ1G5EyMZxHmMHlMLjn61cHpLXp+qMqivKOnX9GaHSvMtL+OHhrVvF6aBDDdr5s3kQ3bBfLd84HfIBPAPuOlemkZGK8g0f4CaZpHjOHWxqkslrb3AuIbQxgEMDlQWzyAcducVBqev0UUUAFeZat8cPDWkeLn0GWG6k8qbyJrpAvlxvnB75IB6/Q9a9NryHWvgJper+Mptb/tSaG1uJ/tE1oIwSWJywDZ4BOe3GaAPXgQQCOhopAAqgDoBiloAK47x78R9J8AW9q1/FNcXFyT5UEIGSB1Yk8Acj867GuC+JPwxtPiFFZu169ld2m4JIE3qytjIIyPTg59aAOh8JeK9O8Z6BFq+mlxE7FHjkGGjcdVP6fnW5XN+BvB1p4H8NR6PazPPh2llmcYLuepx2HAGPaukoAKr317b6bYXF9dyCO3t42lkcjO1QMk1YqpqmnW+r6Vd6bdAm3uomhk2nB2sMHFAHCeDvjLoHjLxAdGt7e6tbhwzQGcLiXHJHBODgE8+lejV5V4G+CVj4O8Trrb6pLevCGFvGYwgQsCMnk5OCfSvVaACiiigAooooAKKKKACiiigAooooA43wF/x+eLP+w5N/6ClafjfTptW8Da5YW8RlnmspVijHVn2naB+OKzPAX/H54s/7Dk3/AKCldlQB51fapqXgnwxFqt7pF1qmrpZrH5dqhaK2RVGQz44BI3Me+PQCua+EHifxD498X6trerXBFnZwiKC1j+WKNnPYdyAp5OTzXX63L/wmmvyeHopNuhacwfV5wcCVxytuD6d39sDitbwzb+HbS+1JtFuIWkv5FvHjjIxtKhQy+qkqTkcZJoA1bq2WTWbC4MyK0SSgRnq+QvT6Y/WtCs+6t0k1rT5zOiNEkoWM9XyFzj6Y/WtCrm9I+n6sypr3padf0QVyMn/JXoP+wE//AKPWuurkZP8Akr0H/YCf/wBHrUGp11FFFABXI+PP9Z4X/wCw9b/+gyV11cj48/1nhf8A7D1v/wCgyUAddRRRQAVW1D/kG3X/AFxf+RqzVbUP+Qbdf9cX/kaAMD4b/wDJN/D3/XlH/Kuorl/hv/yTfw9/15R/yrqKACmTKHgkQkKGUjJ7cU+o51D28ilgoZSMntxTW4nsV9JgFtpFpAsqyrHEqiROjYHUVcqlpEK2+j2cKSrMqRKokTowx1FXaqp8bIpK0I+iCiiioNArOtLVYtZ1G4E6O0wizGOqYUjn61o1nWlsketajOs6O8oi3RjrHhSBn61cHpL0/VGVRXlHTr+jNGiiioNQooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDjfAX/H54s/7Dk3/oKVa8X65d2gttE0ba2uakSkBIyLdB9+ZvZR09TgVh6Drlp4ds/GepXhYxx63MFjQZeRyqBUUd2J4ArJ1Dwr4ltrE+PIrqQeK483EtmrExNbcH7Lj2UdepbPsaAJNeisdGvPD3gKCSdbGTdfapKiNJJNGpzhtoJPmP94+nFaEOq2+r/GbT49OL+VZ6PL5+6Jo/vOu0YYA9s03w9qVpeeK7rxhIsrWmp6TB9icRliuwv5sXA+9u28d+2cGtrwboV1b3ur+ItUi8vUtXmDeUxyYIFGI4yemccnHc+1AG9dW0cms2E7TqjxJKFiPV8hc4+mP1rQqhc20cmsWE7TqkkSShIj1fIXOPpj9av1c3pH0/VmcFaUtOv6IK5GT/AJK9B/2An/8AR6111cjJ/wAleg/7AT/+j1qDQ66iiigArkfHn+s8L/8AYet//QZK66uR8ef6zwv/ANh63/8AQZKAOuooooAKrah/yDbr/ri/8jVmq2of8g26/wCuL/yNAGB8N/8Akm/h7/ryj/lXUVy/w3/5Jv4e/wCvKP8AlXUUAFRzqHgkUttDKQSe3FSUyZQ8EiltoKkE+nFNbiexW0mFLfSLSGOZZkSJVEi9GGOoq5VPSYUttJtIYplmjSJVWRejjHWrlVU1kyaStCK8goooqCwrOtLaOPWdRnW4R3lEW6IdY8LgZ+taNZ9pbRR6xqE63CvJKI98Q6x4XAz9auD0l6fqjKoryjp1/RmhRRXzXP8AGvxanxJa2URnT0vvs39niEZZQ+372N27v169scVBqfSlFA5FFABRRXzt8Rvi/wCK9B+Il1pumyR29lYui+S8IbzuASWJ55z2xxQB9E0VW066a+0y0u3iaF54UlaNuqFlBwfpnFWaACiivL/jX451nwZomnjRQIpr2Vla6KBhGFAOADxk57+hoA9Qorzv4OeMdV8ZeEprrVwr3NvcGHzlTb5owDkgcZ5xxXolABRRVe/uWs9OurpImlaGJ5BGvVyATgfXFAFiivnP4ffGHxXrnxEtNP1CSKeyvpWQwLCF8kYJBUjnjHfPGa+jKACiiigAooooAKKKKACmyOkUbSSMFRQSzMcAAd6dXI/FFrlfhl4gNoG837KQdvXbkbv/AB3NAFfQ9Y1Dx41xf2V1Lp/h9JDFbPCB512VOGfJB2pngY5OOo6VFbavqGg/Eu28MXN9Lf2GpWb3Fu1xgywOhOV3ADcpAJ55zW34Mjs7LwFoi2zRrapYRMHBAGNgJJP1yTXJ+FoZvF/xLvvGhDDSLKA2GlsVx5/PzyD2zuAPfPtQBzmlR6ofiHr14+hX2rabY6rLJaxWzRBFuCAC7b2GSFxj0yTXfnxdrTKVPgXWSCMEebb/APxym+Av+PzxZ/2HJv8A0FK7KgDyvwJe+JPCvhiPSrrwZqsrRzSuhjlgwFZywHL9s10v/CX63/0I2s/9/bf/AOOV19RzytDA8iQyTMoyI48bm9hkgfmaAOEuvFGrSazYTN4N1hJI0lCRGS3y+Quf+WnbH61of8Jfrf8A0I2s/wDf23/+OVR/4TbT9Rks9RtrHUpb22nuLV9MjiVpwylVct820AcHr3rvQcjNXN6R9P1ZnBWlLTr+iOQ/4S/W/wDoRtZ/7+2//wAcrmn8T6t/ws2K5/4RDVfNGkNH9n8yHeV84Hf9/GO3XNeqVyMn/JXoP+wE/wD6PWoNBP8AhL9b/wChG1n/AL+2/wD8co/4S/W/+hG1n/v7b/8AxyuvooA5D/hL9b/6EbWf+/tv/wDHK5nxj4n1a4fw95vhDVbfy9YgkXzJIT5jBXwgw55Oe/HFeq1yPjz/AFnhf/sPW/8A6DJQAn/CX63/ANCNrP8A39t//jlH/CX63/0I2s/9/bf/AOOV19FAHIf8Jfrf/Qjaz/39t/8A45UF74u1prC4U+CNYUGJgWMsGBx1/wBZXbVW1D/kG3X/AFxf+RoA848CeKNXtfAmiQQ+D9VuY47RFWaOSEK4x1GXBx9RXQ/8Jfrf/Qjaz/39t/8A45U/w3/5Jv4e/wCvKP8AlXUUAch/wl+t/wDQjaz/AN/bf/45Uc3i3WngkVvBGsqCpBPm2/HH/XSuzrmdR8YWFjrcmiajb3do0ltJNDcSKpjmC4BCbWJLc9CAaa3E9jJ0nxTq9vpFpDF4M1iaNIlVZBJbgMMdf9ZV3/hL9b/6EbWf+/tv/wDHK0vB98L/AMNWrraXdska+UguowjOB0cAE8HtzW7VVPjZFLSnH0RyH/CX63/0I2s/9/bf/wCOUf8ACX63/wBCNrP/AH9t/wD45XX0VBoch/wl+t/9CNrP/f23/wDjlZ1p4n1aPWdRmTwdrDySiLfEJLfMeFwM/vO9d5PI0MDyLE8rKMiOPG5vYZIH5muG0/xrp8l1qt5a2OpXGomcQTaVHApnhMfylj823byDnPfvVwdlLXp+qM5q8o6df0Ze/wCEv1v/AKEbWf8Av7b/APxysYtCdb/to/C69/tLdu+04tt+71zv6+9ekA5GaKg0OQ/4S/W/+hG1n/v7b/8Axyj/AIS/W/8AoRtZ/wC/tv8A/HK6+igDkP8AhL9b/wChG1n/AL+2/wD8crG1BodW1KPUdQ+Ft7c3keNs0otmbjpzv5xXpFFAHIf8Jfrf/Qjaz/39t/8A45R/wl+t/wDQjaz/AN/bf/45XX0UAch/wl+t/wDQjaz/AN/bf/45VHVdXudcsjZ6p8OdTvLYkN5czW7DI7/6zrXe0UAcJpmt3mjWKWWm/DvU7S2TJWKFrdVGevAkq5/wl+t/9CNrP/f23/8AjldfRQByH/CX63/0I2s/9/bf/wCOUf8ACX63/wBCNrP/AH9t/wD45XX0UAeb2DQ6XqkmpWPwtvbe9kzunjFsG5687+M1s/8ACX63/wBCNrP/AH9t/wD45XX0UAch/wAJfrf/AEI2s/8Af23/APjlH/CX63/0I2s/9/bf/wCOV19FAHjvxJ8c+I9M0GHVLTR9V0Se3nUCWeSB4pQ3VGQOc+owMjFaXw1+I/iPxcsa6l4WnjhbpqEHywkeuHI/8dJ+ldl4ot9PFkuo3+iyat9i3SJCiI5XjlgrsFJwOvXnjrUGm+MrDVTpg0qzvLu3vEVmmhjHl2uV3ASHPBx2GcceoyAdLRRRQAUjoroUdQysMEEZBFLRQBzsfgbQIoDbJayiyLF/sf2mTyMk5/1e7bjPbGPat+KKOCJYoo1jjQYVEGAB6AU+igDjfAX/AB+eLP8AsOTf+gpXZVxvgL/j88Wf9hyb/wBBSuyoAKzNZ12z0KKCS8E58+XyoxBA8pLEEgYUHHStOigDyfQLe40j4v6kL6B1l1SNLyCOKD5QWBWQF+nygAk55OcdcV6HbapPL4nvtKkhjWKC2huI5FYktvZ1IIxxjZ+tS3MED6zYTPNtmjSURx4++CFz+XH51Wg068j8X3upsIfss1pDbrhzvBRnbJGMYPmevb3q5bR9P1ZnD4padf0Rs1yMn/JXoP8AsBP/AOj1rrq5GT/kr0H/AGAn/wDR61BoddRRRQAVyPjz/WeF/wDsPW//AKDJXXVyPjz/AFnhf/sPW/8A6DJQB11FFFABVbUP+Qbdf9cX/kas1W1D/kG3X/XF/wCRoAwPhv8A8k38Pf8AXlH/ACrqK5f4b/8AJN/D3/XlH/KuooAZNKsEEkz52RqWbAJOAM9B1ryrxrqI1lfD/iuyt5jpmm3qB3ktX8xklG2RgpG7avy9uT06c+sVHMqtbyKx2qVIJ9BimtxPY5SfVNT0zwfDfaTbW81raWRnZrtyhkRRkBQM7SVGeemQPXHU2k5urKC4MbRmWNX2N1XIzg1zF5YaxNp2mWujf2ddabHEpf7VI6eeR90EBT8vQ4zz9Mg9Tb+cLaL7Rs8/YPM8vO3djnGe2ac/iZNL4I+hJRRRUlmbrOu2WgwwS3vn7Z5RDGIYHlJYgkDCg46Vwfhy6n0f4oa9bXVnI0+sxW94iQJuEJGVZHboCFwxOeecZJAPp1Z1pBbprOozRz75pBF5kePuYXj86qKTTIlJppLq/wBGUV1fUI/FkOlzR2bW88MkoEch82IKQAWB6hs9unv1rfrnTo13qHiOy1O/trOFtPklME0EhaSVGVkCtlRtGDkjJ5ArhJPj7o8fjQ6IdNn+xLcfZ2vvMHDZ252Y+7nvnOO1SWeu0UUUAFFFeUeLvjlpvhXxc+hnS5rpYGVbmdZQuwkA/KuPmwD6igD1eiorW5ivbSG6gcPDNGskbDupGQfyNS0AFFFcb8RfiHZfD7Sre5ntnu7m6crBbq+zdjG4lsHAGR270AdlRXK+APHNp490BtStrd7aSOQxTQu27a2AeD3GD7V1VABRRUVzcRWlrNczsEhhRpHY9lAyT+VAEtFeT+FfjppnifxdHof9lT2sdw5S2uGlDbz23Lj5c49TXrFABRRRQBiavr0Fpero8UM02pXMJeCMQsYyM4yz42gDqcnOPXIzzHwuaXSdPvvCk1rN5mlXs8YnMRVHiLbkbPQk7sYGelehUUAFFFFABRRRQAUUUUAcb4C/4/PFn/Ycm/8AQUrsq43wF/x+eLP+w5N/6CldlQAUUUUAZ91DA+s2ErzbZkSURx4++CFz+XH51oVn3UVu2tWEkk22dEl8uPH3wQufy4/OtCrntH0/VmVP4pev6IK5GT/kr0H/AGAn/wDR6111cjJ/yV6D/sBP/wCj1qDU66iiigArkfHn+s8L/wDYet//AEGSuurkfHn+s8L/APYet/8A0GSgDrqKKKACq2of8g26/wCuL/yNWarah/yDbr/ri/8AI0AYHw3/AOSb+Hv+vKP+VdRXL/Df/km/h7/ryj/lXUUAFMmCtBIrnapUgn0GKfUc4VoJA5wpUgn0GKa3E9ivpMcMOkWkcEvmwrEoSTGNwx1q5VLSI4YtHs47eXzYViUJJjG4Y4NXaqp8bIpfw4+iCiiioNArPtIbdNZ1GWOffNIIvNjx9zCnH5itCs60it01rUZI5i07iLzY8fcwpx+Yq4bS9P1RlU+KPr+jNGvMH+Bnhl/Fx15prvaZ/tBs9w8svnd6Z257Zr0+ioNQooooAK818UfBTw94p8Ttrlzc3kMkxBnihZQshAAzyMjOOa9KooAjggjtreKCFAkUSBEUdFUDAFSUUUAFcr468A6X4+0yG01F5YZLdy8M8JG5CRgjkEEHA/IV1VFAHN+CfBWm+BdEOmac0sgeQyyyzEFnYgDsABwK6SiigApk0MdxBJBMgeKRSjqehBGCKfRQB5p4a+CXh3wz4oTXLe4vJnhYvBDKylYyQR2GTjPH9a9LoooAKKKKACiiigAooooAKKKKACiiigDjfAX/AB+eLP8AsOTf+gpXZVxvgL/j88Wf9hyb/wBBSuyoAKKKKAM+6jt21qwkkmKzokvlR4++CF3flxWhVC5jtm1mwkklK3CJL5UeOGBC7vy4q/Vz2j6fqzOHxS9f0W4VyMn/ACV6D/sBP/6PWuurkZP+SvQf9gJ//R61BoddRRRQAVyPjz/WeF/+w9b/APoMlddXI+PP9Z4X/wCw9b/+gyUAddRRRQAVW1D/AJBt1/1xf+RqzVbUP+Qbdf8AXF/5GgDA+G//ACTfw9/15R/yrqK5f4b/APJN/D3/AF5R/wAq6igAqOcK0Egc4UqQT6DFSUyYK0Egc4UqQT6DFNbiexV0hIY9Hs0tpDLAsShHIwWGODirtU9JSCPSLRLWQywLEojcjBZccGrlVU+NkUvgj6BRRRUGgVnWkdsutajJFMWncRebGRwmF4/MVo1n2kdqusahJFMWuHEfnIRwmF+X8xVw2l6fqjKp8UfX9HsaFFFfNs3xu8Vx/EZrQJCdOW++zfYRCNxXft+997d+me1Qan0lRQORmigAoor55+Ivxi8U+H/iFdaZpzQw2Vk6r5UkIYzfKCSSeec8YxQB9DUVW066a+0y0u2iaFp4UlMbdULAHB9xnFWaACiivMfjR471fwToun/2MqpPeyupuWQOIwoBwAeMnPf0NAHp1Fee/B7xnqnjTwnNd6uqG5t7gw+aibRINoOcDjPPavQqACiiq9/ctZ6dc3SxNK0MTyCNerkAnA+uKALFFfO3gD4y+Kte+IVnp2oGCaxvZSnkpCF8kYJBUjnjHOc8V9E0AFFFFABRRRQAUUUUAFFFFABRRRQBxvgL/j88Wf8AYcm/9BSuyqjp+k2elvePaRlGvLhrmbLE7pCACeenQVeoAKKKKAKFzHbNrNg8krLcKkvlIBwwIXdn6cVfqrNYpNqFreMzB7dXVVHQ7sZz+VWquTTS/rqzOCacm1u/0QVyMn/JXoP+wE//AKPWuurMbRYW8TprvmP562ZtPL427S4fPrnIqDQ06KKKACuR8ef6zwv/ANh63/8AQZK66szWNFh1ltPM0jp9hvEvE2Y+ZlBAB9vmoA06KKKACq2of8g26/64v/I1ZqOaITwSQsSFdSpI9xQBzfw3/wCSb+Hv+vKP+VdRWdoOkRaBoNjpMMjyxWkKxK74ywHc4rRoAKZMFMEgc4Qqdx9Bin02RBJE8Z6MCDj3prcT2KukpBHpFolrIZIFiURuwwWXHBq5VextFsbCC0RiywoEBPU4qxTm7ybRNNNQSfYKKKKksKz7SO1XWdReKVmuGEfnIRwuF+XH1FaFVYLFINQu7xWYvc7NwPQbRgYq4tJP0/VGc024tLZ/oy1WKfCHh464NaOjWX9pA7vtPkjdu/vZ9ffrW1RUGgUUUUAFYuo+EfD2ranFqWoaNZXN5FjbNLCGbjpn1x71tUUAHSiiigAqjq2jabrtibLVbKC8tic+XMgYA+o9D71eooAp6ZpVho1illptpDaWyfdihQKB78d6uUUUAFFFFAGLYeEfD2l6pLqdjo1lb3smd00cIDc9ceme+OtbVFFABRRRQAUUUUAFFFFAH//Z', 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'phy_755_2.jpg']
phy_756	OPEN	<image_1>As shown in the figure, a plane rectangular coordinate system xOy is established in a certain space. The first quadrant has a uniform strong electric field along the negative direction of the y-axis, and the electric field intensity is E. There is a uniform magnetic field inward from the vertical coordinate plane in the fourth quadrant. A particle with a mass of m, and a charge of +q regardless of gravity flies out in the positive direction of the x-axis from point M (d, 0.5d). The position when it passes through the x-axis for the first time is point N, and the coordinates are (2d, 0). If the particle can pass through N points again after passing through the x axis for the first time, calculate the value of the magnetic induction intensity and the maximum time interval for the particle to pass through N points twice in a row.		B = \frac{n}{n-1} \sqrt{\frac{mE}{qd}} \quad (\text{of which} n = 2, 3, 4, 5),\quad t_m = (8 + 6\pi) \sqrt{\frac{md}{qE}}	phy	电磁学_磁场	['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phy_757	OPEN	The rectangular coordinate system xOy is as shown in the figure<image_1>. In quadrant I, there is a uniform magnetic field outward perpendicular to the paper, and the magnetic induction intensity is B. In quadrant IV, there is a uniform magnetic field inward perpendicular to the paper, and the magnetic induction intensity is also B. In quadrant III, there is a uniform strong magnetic field in the positive direction of the y-axis;N, P, and Q are three points on the x-axis, the coordinates of point P are (d, 0), and the coordinates of point Q are (3d, 0). A particle with a mass of m and a charge of q (q &gt; 0) is injected into a uniform electric field region from point N at a velocity of 45° to the positive direction of the x-axis, and then passes through the y-axis at a velocity along the positive direction of the x-axis. At point M of (0, -\sqrt{3}d), the particle just splits into two positively charged particle 1 and particle 2 with equal mass. After splitting, the direction of motion of the two particles is the same as before splitting. During the splitting process, the amount of charge is conserved. At the time when particle 1 passes through point P, particle 2 also happens to pass through point Q. Regardless of particle gravity and particle interactions. Find: The distance between particle 2 when it passes through the x axis for the second time.		6d	phy	电磁学_磁场	['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phy_758	OPEN	<image_1>As shown in the figure, in the region of 0 ≤ y ≤ d of the xOy coordinate system, a uniform strong electric field along the positive direction of the y-axis is distributed, and in the region of d ≤ y ≤ 2d, a uniform strong magnetic field is distributed inward perpendicular to the xOy plane. MN is the interface between the electric field and the magnetic field, and ab is the upper boundary of the magnetic field. Now positively charged particles with a rate of v_0 = 10 m/s, a mass of m = 1 \times 10^{-10} kg, and a charge of q = 1 \times 10^{-8} C are emitted from the origin O along the positive direction of the x-axis and start counting. The particles can just not exit the ab boundary and return to the electric field. The electric field strength is known as E = 15 N/C, d = 0.1 m, regardless of particle gravity. Find: Time t for the particle to reach the x-axis. (\pi, fractions and square roots can be retained)		\frac{n\left(3\sqrt{3} + \pi\right)}{225} \text{s} \quad (n = 1, 2, 3 \ldots)	phy	电磁学_磁场	['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phy_759	OPEN	<image_1>As shown in the figure, there are multiple closely adjacent uniform magnetic fields and uniform strong electric fields on the right side of MN. The width of the magnetic field and electric field is d, the length is long enough, the magnetic induction intensity is the same, and the direction is perpendicular to the paper and inward; The electric field intensity is the same, and the direction is horizontal to the right. A charged particle with mass m and electric quantity +q enters magnetic field 1 at a velocity v_0 perpendicular to MN. When the charged particle exits from the first magnetic field area, the velocity direction is deflected by an angle of 30°. Let both the electric field and magnetic field have ideal boundaries, regardless of particle gravity. Find: If the particle's velocity range is 0 &lt; v ≤ \sqrt{2}v_0, if the particle does not penetrate the right boundary of the fifth magnetic field, find the maximum value of the electric field strength.		\frac{3mv_0^2}{4qd}	phy	电磁学_磁场	['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phy_760	MCQ	<image_1>As shown in the figure, the $\frac{1}{4}$arc groove $AB$with a radius of $R$and a mass of $3m$is placed at rest on the smooth and horizontal ground. The $B$point at the bottom of the arc groove is tangent to horizontal. There is a small ball 2 with a mass of $3m$at a distance of $R$from the $B$point, and a light spring is connected to the left side. Now the small ball 1 (which can be regarded as a particle) with a mass of $m$is released from rest from the $A$point at the upper end of the left circular arc groove, and the gravitational acceleration is $g$, regardless of all friction. Then the following statement is correct ()	['A. Conservation of momentum throughout the system (three objects)', 'B. When the small ball 1 comes into contact with the spring, it is $\\frac{5}{3}R$from the point $B$at the bottom of the arc groove', 'C. The maximum value of spring elastic potential energy is $\\frac{9}{16}mgR$', 'D. The final speed of small ball 1 is $\\frac{\\sqrt{6gR}}{4}$']	BC	phy	力学_动量及其守恒定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACDAS8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKx/EGsHS7VEgjlkupztjWKF5Sg/icqoJwP1JA4zQBpw3MFxJNHDKjvA/lyhTnY2A2D74IP41LXF/DKNP7A1C7RpXS71W7lV5s72AkKAtnnOEFdpQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABms2LSI4dQvb4Xdy090gjJZgRGozgIMYGMn6981zvh/w/pmrR6ldX1sZ5zqVyu9pX6CQgDg9hWv/AMIboH/QPH/f1/8A4qgCokMPgzSYNL0lZry4uZmFrbzSA/OxLuzNjIUZLE8+g6gVTY6k3iCDSbnxPfRalNA1wI7ayjW3CqQCAXUk8sP4ifpVGOw07Qvi9YRQQ+THc6TKkYLEjzPMB7k87VP5Vr6h/wAlR0T/ALBl3/6HDSGXtN1O+g1T+x9ZERuGQyW1zCNqXCjqNpJ2uMjI6YOR3xu1zmv4m8SeG4Ihm4S5knYj+GIROrE+xZ0FdHTEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHO+D/8Ajw1H/sKXf/o1q6Kud8H/APHhqP8A2FLv/wBGtXRUAch4j0mDUPGOkLdIxhuLSeAOjbWjkVo5EZT2YbWI+lSHw1qy3iXP23Sbm5iG2K9u9N3XCr/vK6g/gBVvxcZLaws9TiGTp95FO/8A1zOY5D+COx/Cug60DMnSNDTTZZrue5lvdRnAE11KACQOiqBwqjJ4H45Na1FFAgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA53wf/AMeGo/8AYUu//RrV0Vc74P8A+PDUf+wpd/8Ao1q6KgCC9tIr+xuLOcZinjaNx6gjBrK8KXktxoq2ty5e9sHNpcE9SycBv+BLtb/gVblc3fk6F4nh1PkWOo7bW6wOElHEUh+v3Cf92gDpKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDnfB//AB4aj/2FLv8A9GtXRVzvg/8A48NR/wCwpd/+jWroqACq9/Y2+p2E9ldxiS3nQo6nuDViigDA8P39xFNLoWpvuv7Rcxykf8fMPRZB/tdmHY+xFb9ZWuaP/asEUkEv2bULZvMtbkDPlt6Ed1PQjuPfBpui61/aJltLuL7LqltgXFsTnHo6n+JDjg/gcEEUAa9FFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHO+D/APjw1H/sKXf/AKNauirnfB//AB4aj/2FLv8A9GtXRUAFFFFABWXrGiRaqIpkle1v4Mm3u4sb4z6H+8p7qeD+talFAHP2XiCW2uk03X4ktL1jtinX/UXP+4x6N/sHn0z1roKgvLK11G0ktLyCOe3kGHjkXKsPpWF/Zms6ISdHuRfWeR/oN7IdyD0jl5P4MD9RQB0lFYMHi3TvNFvqIl0q5J2iK+Xywx/2X+634E1uhgwBUgg9CKAFooooAKKKKACiiigAooooAKKKKACiiigCvDewzWq3G7ZGzbQXIHOcfzoN9aBdxuoQuM58wYxjP8ua4fxToev6n4XnmF5GjWjtd29nbWhRmdCSgJ3nPOD05NeVr4J8Zz3C2rpcLCCsO4xnAXmAn/vjn6c05aN2CGsU2fRv2y1Jx9oiyDj749SP5gj8KfFPDOCYZUkA6lGBxxn+RB/Gvm5vC/jhSkqw3RJCyn903X/XEH/gUzD6g13HgHRPGWlG704SxW0Lxea1xcW7Od6kwoijcP4Yg2eeCtTcbR1Gq+INXv8Af/YsUq2omaCOSGFZJrl1zuKbyERBgje2cnoOma+h61rV1YXOoWdzcX4s5mgvNN1CBIriN1wWCsmFJwQRkEH1FXdD13TtB+H2kz3s8UJjhS22O6qTMPlZOSBncDnJ4wSau+FJdONtfS2+pWt7dTzG6vZLdwyK7DAXI7KqhR3wuT1pgbVhfW+p6fBfWj74J0Do3sf5H2qzWB4NKv4e86IYgmurmaDjGY2mdkI9ipBFb9AgooooAKKKKACsKc+KvPk8hNH8ncdm9pN2O2cDrW7RQBz+fF/9zRP++pf8KM+L/wC5on/fUv8AhXQUUAchpWm+LNKgnijOjOJrmW4JZpRguxYjp2zV/Pi/+5on/fUv+FdBRQBz+fF/9zRP++pf8KM+L/7mif8AfUv+FdBRQBz+fF/9zRP++pf8KM+L/wC5on/fUv8AhXQUUAc/nxf/AHNE/wC+pf8ACjPi/wDuaJ/31L/hXQUUAc1PB4puoWhuLfQZYmGGSTzGB+oIrEfwfrsbB9PNhpbDtY3U8af98YKfpXoFFA7nDR6f8RbYk/25o8sYGf8ASICSPxUL/Ko9P8Ra9fXItYNe8IXVwSR5cMj7iR1GAxrsdW1GHR9HvdSuDiG1heZ/ooJ/pXlVjY3q2/hHw9rMUVst/dHUxcwOZJJJlPnFGyF8v72Mjd0x70Ad4114sW5S2MOkF3UuHBl2gDAIPHXkfrUufF/9zRP++pf8KXxFqt3ou2+t7K51BEhfNpa4MjNlcNgnoOckZPPSue8IeP8AUvEVteXU3h68CxzeUsNuEJjwMneXdTk59AOKcraERu2zoM+L/wC5on/fUv8AhRnxf/c0T/vqX/CpP+Eguv8AoW9Y/KH/AOOUf8JBdf8AQt6x+UP/AMcqSyPPi/8AuaJ/31L/AIUZ8X/3NE/76l/wqT/hILr/AKFvWPyh/wDjlH/CQXX/AELesflD/wDHKAI8+L/7mif99S/4UZ8X/wBzRP8AvqX/AAqT/hILr/oW9Y/KH/45R/wkF1/0LesflD/8coAjz4v/ALmif99S/wCFGfF/9zRP++pf8Kk/4SC6/wChb1j8of8A45XJTfErU7Xxo+iHwzfXURCMBCqmaIEfxgMV987hwaAOitP+EqW2UQSaPNHk4d3lyeTnt68VPnxf/c0T/vqX/CtLSHjk0yJ4oWhQlj5bnJX5jnP41eq5/EyKfwI5/Pi/+5on/fUv+FGfF/8Ac0T/AL6l/wAK6CipKPPrrwp4kl1N72FdAVZW3zW00TyxO/8AfCkfKx7kHnvTrnw14suITaLJoNpp7nM1tZRyQ+d7Mw5we+MEjjNd/RQO5zkaeLIYkiii0NI0UKqqZQAB0A4p+fF/9zRP++pf8K6CigRz+fF/9zRP++pf8KM+L/7mif8AfUv+FdBRQBz+fF/9zRP++pf8Ku6adc89v7UXTxFt+X7MXLbvfcOnWtOigAooooAKKKKACiiigAooooAKKKKACiiigAooooAyvEWgw+JNIl0y6ubiG2mwJRAVBcZzgkg8cdqgs/C1nb6nDqVzPdX97boUglunB8lSMHaqgKM+uM+9blFAFGUQ/wBuWxPmed5Em3H3duVzn36frVtYY1laVY0EjgBmCjLAdMn8T+dPopt3sTGNm/MKKKKRRxHxC1IWsug2v2y6tUlvDNcyW8kikW8Sl5M7Odv3QfrVrwU+oXM2rXrSXJ0S5lR9LS7dml2bBubLEsFZuVBOcdhmrL6De3Pjc6xdtbPYLYtZxQZYsNzBmY5GOcAY9qseE9JvtB0OLSryeKdLYslvIhOfKydisCOqjA/CgDcooooAKYkUcZYpGqlzuYqMZPqafRQBXshcC0X7VjzstnGOmTjp7YqxRRTbu7iSsrBRRRSGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB//9k=']	['phy_760.jpg']
phy_761	OPEN	<image_1>As shown in the figure, there is a small positively charged mass with a mass of $m$that can be regarded as a particle and a charge of $q$. It is thrown horizontally from point $A$on the smooth insulating platform. When it reaches point $C$, it enters the smooth insulated circular arc track fixed on the horizontal ground without collision at a speed of $v$. The entire circular arc track is in a vertically downward uniform electric field, and the field strength is $E = \frac{2mg}{q}$. The small piece is then slid onto a long insulated wooden board with a mass of $2m$immediately adjacent to the $D$point at the end of the arc track. It is known that the upper surface of the wooden board is flush with the tangent line at the end of the circular arc track, the lower surface of the wooden board is smooth with the horizontal ground, the dynamic friction coefficient between small pieces and long wooden boards is $\mu$, and the radius of the circular arc track is $r$,$C$The angle between the line between the center of the point and the center of the circular arc and the vertical direction is $\theta = 60^\circ$,$m$,$q$,$v$,$\mu$,$r$and the gravity acceleration $g$are all known quantities, regardless of air resistance. Request: To prevent small objects from slipping out of the long wooden board, the minimum value of the length of the wooden board is $L$.		\frac{3gr + v^2}{3\mu g}	phy	力学_动量及其守恒定律	['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']	['phy_761.jpg']
phy_762	OPEN	<image_1>As shown in the figure, the center of the smooth circular arc track $AB$with a radius of $R=4.9m$in the vertical plane is $O$, the center angle is $\angle AOB=60^\circ$, and the lowest point is $B$and the horizontal conveyor belt with a length of $L=4m$is smoothly connected, and the conveyor belt rotates clockwise at a constant speed of $v= 4m/s$. The right end of the conveyor belt is smoothly connected to smooth horizontal ground, and 2024 small balls with a mass of $m_0=3kg$are standing equidistantly on the horizontal ground. A mass $M$with a mass of $m=1kg$is released from rest from the $A$point. The dynamic friction coefficient between the mass $M$and the conveyor belt is $\mu=0.5$, and the gravity acceleration is $g=10m/s^2$. Elastic positive collision occurs between the mass $M$and the small ball, between the small ball and the small ball. The calculation is: from the time when the mass $M$starts to move, to the time when all objects finally reach a stable state, the motor consumes more electricity due to transporting the mass.		20J	phy	力学_动量及其守恒定律	['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phy_763	OPEN	The vertical section of a fixed device is <image_1>shown in the figure. It consists of a straight track $AB$with an inclination angle of $\theta = 37^\circ$, a radius $R = 1m$, an arc $BCD$with a central angle of $2\theta$, and an arc $DE$with a radius of $R$and a central angle of $\theta$. The rails are connected smoothly. On the smooth horizontal ground $FG$to the right of the point $E $at the end of the track is next to a slide $b$with a mass of $M = 0.5kg$, and its upper surface is flush with the horizontal plane at the end of the track $E$. A baffle $GH$is fixed on the horizontal ground far enough away from the right side of the skateboard, and the skateboard $b$will be locked immediately when it collides with it. The mass $a$with a mass of $m = 0.5kg$slides down from the track $AB $at a height of $h = 0.3m$from the track $B $at an initial speed of $v_0$, and slides onto the track $DE$through the arc $BCD$. The dynamic friction coefficient between mass $a$and track $AB $$\mu_1 = 0.5$, and the dynamic friction coefficient between mass $a $and rail $$$\mu_2 = 0.2$. (Other orbits are smooth, and the mass $a$is regarded as a particle, excluding air resistance,$\sin37^\circ = 0.6$,$\cos37^\circ = 0.8$). If the object $a$can rush onto the skateboard $b$along the track, how long will the skateboard $b$be at least? The object $a$will not touch the baffle 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phy_764	MCQ	"As shown in Figure A<image_1>, the ""L""-shaped wooden board Q (regardless of the thickness of the vertical baffle) is stationary on the rough horizontal ground, and the slider P (regarded as a particle) with a mass of 1 kg slides on the wooden board at an initial speed of 6 m/s. When $t = 2$ s, the slider collides with the wooden board and sticks together. The v-t image of the two movements is shown in Figure B<image_2>. The magnitude of the gravitational acceleration is $g = 10$ m/s$^2$, then the following statement is correct ()"	"['A. The length of the ""L"" shaped wooden board is 9 m', 'B. The mass of Q is 1 kg', 'C. The dynamic friction coefficient between the ground and the wooden board is 0.1', 'D. The ratio of the mechanical energy lost due to the collision system to the internal energy generated by the friction between the wooden board Q and the ground after the collision is 1:4']"	BD	phy	力学_动量及其守恒定律	['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phy_765	OPEN	As shown in the figure<image_1>, the smooth insulated horizontal desktop is located in a uniform electric field horizontally to the right bounded by $ab$and $cd$, and the electric field direction is perpendicular to the boundary. Two small balls A and B are placed on the table, and their positions are connected parallel to the direction of the electric field. The masses of the two small balls are $m_A=m$and $m_B=3m$respectively. The charge carried by small ball A is $q$($q&gt;0$), and small ball B is not charged. Initially, the distance between small ball A and the boundary of $ab$is $L$, and the distance between the two small balls is also $L$. It is known that the distance between the two boundaries $ab$and $cd$of the electric field area is $100L$, and the electric field intensity is $E=\frac{ma}{q}$($a$is a certain value, and the unit is $m/s^2$). Now the small ball A is released from rest. Under the action of the electric field force, A accelerates along a straight line and collides elastically with the still small ball B. There is no charge transfer when two small balls collide, and the collision time is extremely short. The collisions are elastic collisions, and both small balls can be regarded as particle particles. Known: $1+2+3+\ldots+n=\frac{n(1+n)}{2}$. Find: The number of collisions between A and B before B leaves the boundary $cd$.		10	phy	电磁学_静电场	['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phy_766	OPEN	An electronic deflection instrument consists of a cubic space $OABC-O_1A_1B_1C_1$with a side length of $L$, as <image_1>shown in the figure. The electron emitter is located at the midpoint $M$of the top $A_1O_1$and can uniformly emit electrons at a rate of $v$into all directions in the $O_1A_1B_1C_1$plane. Two large metal plates connected to the power supply can be placed on any two opposite sides of the three-dimensional space, so as to generate a uniform strong electric field in the cubic space to control the movement of electrons. It is known that the electron mass is $m$and the charge size is $e$. When electrons hit a metal plate, they will be absorbed and no longer rebound into the electric field, regardless of the electron gravity and the interaction force between the electrons. Question: When two metal plates are placed on the $OABC$surface and the $O_1A_1B_1C_1$surface respectively, if an electron happens to hit the midpoint $Q$of the bottom $BC$, let the angle between the velocity of the electron emitted from the emitter and the centerline $MP$be $\theta$. Find the process of the electron moving from the $M$point to the edge of three-dimensional space, and the functional relationship between the work done by the electric field force $W$and $\theta$.		W = 2mv^2 \quad (0^\circ \leq \theta < 30^\circ) \, W = \frac{mv^2}{2\sin^2\theta} \quad (30^\circ \leq \theta \leq 90^\circ)	phy	电磁学_静电场	['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phy_767	OPEN	It is known that there is a particle source $M$immediately on the left side of the vertical plate, which can emit positive ions with an initial velocity of zero, a charge amount of $q=1.6\times 10^{-5}C$, and a mass of $m=3.2\times 10^{-11}kg$. There is a small hole in the middle of the vertical plate on the right side of the emission source $M$, and $U_1=10V$between the two plates. After accelerating, the particles can be injected into a deflection device $N$through the small hole. The deflection device $N$allows the particles to exit the device within the range of $0\circ\sim180\circ $in the horizontal direction, and enter the horizontally placed square parallel metal plates $ABCD$and $FPQH$from the middle position of the surface $AFHD$at a constant speed. The constant voltage between the upper plate and the lower plate is $U_2$. It is known that the plate side length and the distance between the plates are both $L=20cm$. As <image_1>shown in the figure (regardless of particle gravity), under the case of $U_2=10V$,$F$is the origin $O$,$FP$is the $x$axis, and $FA$is the $y$axis, find the trajectory equation of the point where the particles fly out from the surface $FABP$.		y = -\frac{5}{4}x^2 + \frac{7}{80}	phy	电磁学_静电场	['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phy_768	MCQ	As <image_1>shown in the figure, in the vertical plane, one end of a lightweight insulating thin wire with a length of $L$is tied to the point of $O$, and the other end is connected to a small ball with positive charge. The mass of the small ball is $m$and the amount of charge it carries is $q$. There is a uniform strong electric field in the space where the small ball is located, the direction is parallel to the vertical plane and horizontally to the right. Now straighten the thin line to the upper right, so that the thin line forms an angle of $45^\circ$with the horizontal direction, and release the small ball still. When the small ball moves directly below the release point, the thin line breaks. After a period of time, the small ball falls on the horizontal ground directly below the release point. It is known that the gravitational acceleration is $g$and the electric field strength of a uniform strong electric field is $E=\frac{mg}{q}$, then the following statement is correct ()	['A. At the moment before the thin line breaks, the speed of the small ball is $\\sqrt{2\\sqrt{2}gL}$, and the direction is vertical downward', 'B. The moment before the thread breaks, the tensile force of the thread is $2\\sqrt{2}mg$', 'C. After the thin line broke, the ball took a time of $2\\sqrt{\\frac{\\sqrt{2}L}{g}}$to land', 'D. The height of the ball from the ground when the thin line breaks is $2\\sqrt{2}L$']	C	phy	电磁学_静电场	['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phy_769	MCQ	As <image_1>shown in the figure, there is a homogeneous electric field in a circular area with a radius of $R$. A charged particle with a mass of $m$and a charge of $q$enters the electric field from the point of $A$at an initial velocity of $v_0$. The direction forms a $60^\circ$angle to the diameter of $AB$. The velocity when exiting the electric field is $\sqrt{3}v_0$, and the direction forms a $30^\circ$angle to the diameter of $AB$, regardless of the gravity of the particle. The plane of motion of the particle is always parallel to the electric field, then the following statement is correct ()	['A. The electric field strength is $\\frac{mv_0^2}{qR}$', 'B. If the velocity of the particle enters the electric field perpendicular to the direction of the electric field, in order for the particle to still exit the electric field from the point $B$, the initial kinetic energy of the particle is $\\frac{3}{4}mv_0^2$', 'C. If the velocity of the particle enters the electric field perpendicular to the direction of the electric field, in order to maximize the increase in kinetic energy when the particle exits the electric field, the initial kinetic energy of the particle is $\\frac{1}{4}mv_0^2$', 'D. If a particle enters the electric field at any speed direction, in order to make the increment of kinetic energy when the particle exits the electric field zero, the minimum initial kinetic energy of the particle is $\\frac{\\sqrt{3}}{2}mv_0^2$']	ABD	phy	电磁学_静电场	['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phy_770	MCQ	As shown in the figure<image_1>, in the vertical plane, there is a uniform electric field with a field strength of $E=1\times 10^4 \, \text{N/C}$. In a uniform electric field, there is an insulating thin wire with a length of $L=2\, \text{m}$. One end is fixed at the $O$point, and the other end is a charged small ball with a mass of $0.08\, \text{kg}$. When it is at rest, the hanging wire forms an angle of $37^\circ$to the vertical direction. If the small ball obtains an initial velocity, it can just make a circular motion in the vertical plane around the $O$point. Take the position of the ball at rest as the zero point of potential energy and zero point of gravitational potential energy $\cos 37 ^\circ = 0.8, and g$is taken as $10 \, \text{m/s}^2$. The following statement is correct ()	['A. Charge amount of the ball $q=5\\times 10^{-5} \\, \\text{C}$', 'B. When the ball moves to the highest point on the circular trajectory, the sum of kinetic energy and potential energy is minimum', 'C. When the ball moves to the lowest point on the circular trajectory, the sum of gravitational potential energy and electric potential energy is minimum', 'D. The maximum kinetic energy of the ball is $5 \\, \\text{J}$']	BD	phy	电磁学_静电场	['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']	['phy_770.jpg']
phy_771	MCQ	There is a regular hexagonal area $abcdhf$in the uniform electric field, and the electric field lines are parallel to the plane where the hexagon is located, as <image_1>shown in the figure. It is known that the potentials of the three points $a$,$b$, and $h$are $7V$,$11V$, and $-5V$respectively. Particles with a charge of $e$(regardless of gravity) enter the $abcdhf$area from the $b$point in different directions with an initial kinetic energy of $16eV$. When the particles enter in the direction of $bd$, they can just pass through the $c$point. The following judgments are correct: ()	['A. particles are negatively charged', 'B. Particles can exit the area through the vertices of the regular hexagon', 'C. The kinetic energy of the particle when it passes through the $f$point is $4eV$', 'D. The minimum kinetic energy of a particle after being emitted in the direction of $bd$is $4eV$']	ACD	phy	电磁学_静电场	['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phy_772	OPEN	As <image_1>shown in the figure, a positively charged ball with a charge of $q$is suspended below the non-extensible light thin wire, and the other end is fixed at the point $O$. There is a nail $N$somewhere to the left of the point $O $. There is a vertical uniform strong field $E$above the straight line $ON$. At the beginning, the ball is still at the point $A$. Now give the small ball an initial velocity of horizontal to the right and magnitude $v_0=\frac{3\sqrt{gL}}{2}$, so that it makes a circular motion around the point $O$in the vertical plane. After the thin line encounters the nail on the way, the small ball moves in a circular manner around the nail in the vertical plane. When the small ball moves directly below the nail, the pulling force of the thin line reaches the maximum value and is just broken. Then the small ball will pass through the $A$point again. It is known that the mass of the small ball is $m$, the length of the thin line is $L$, and the magnitude of the gravitational acceleration is $g$. Find: The range of electric field strength for uniform strong electric field.		\frac{11mg}{12q} \leq E < \frac{11mg}{4q}	phy	电磁学_静电场	['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phy_773	MCQ	As shown in Figure A <image_1>is a top view of the core part of the electromagnetic induction accelerator. A circular smooth vacuum insulating tube with a center of O and a radius of R is fixedly placed in a uniform magnetic field on a circular boundary, and the center of the magnetic field coincides with the center of the magnetic field. The direction of the magnetic field is vertically downward. When the magnetic induction intensity B of the magnetic field changes with time, a vortex electric field will be generated in space. The electric field lines are a series of concentric circles with O as the center in the horizontal plane. The field strength of each point on the same electric field line is equal. At a certain moment, a small ball with charge of-q and mass of m is released at point P in the thin tube. The small ball moves in the counterclockwise direction. The image of the change of its kinetic energy as it turns around the central angle θ is shown in Figure B<image_2>. The following statement is correct is ()	['A. The magnetic induction intensity increases uniformly', 'B. The electric field intensity at the location of the thin tube is $\\frac{E_0}{\\pi qR}$', 'C. The rate of change in magnetic induction intensity is $\\frac{E_0}{\\pi qR^2}$', 'D. The first week of small ball sports is $2\\pi R\\sqrt{\\frac{2m}{E_0}}$']	CD	phy	电磁学_电磁感应	['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'phy_773_2.jpg']
phy_774	MCQ	As shown in Figure A<image_1>, two parallel smooth metal guide rails are fixed on the insulating horizontal plane, and the left end is connected to a resistor with a resistance value of $R=1.5\Omega$, and the distance between the guide rails is $L=1m$. A conductor rod with a length of $L=1m$and a resistance value of $r=0.5\Omega$is placed vertically on the guide rail. The distance from the left end of the guide rail is $x_0=16m$. There is a magnetic field evenly distributed inwards perpendicular to the guide rail plane in the space, and the graph of magnetic induction intensity changing with time is shown in Figure B<image_2>. Starting from the moment $t=0$, the conductor bar moves in a uniformly accelerated straight line to the left under the action of external force with an initial speed of zero. The relationship between speed and time is shown in Figure C<image_3>. In the process before the conductor bar leaves the guide rail, the net charge is known. The amount is equal to the absolute value of the algebraic difference between the amount of charge passing in the two directions. The following statement is correct: ()	['A. The current in the loop first gradually increases and then gradually decreases', 'B. The direction of current in the loop changes at a certain time within 2 to 3 seconds', 'C. When $t=1s$, the ampere force on the conductor rod is $\\frac{13}{8}N$, and the direction is to the left', 'D. The net charge amount of the conductor bar passing through the constant resistor R from the beginning to the left end of the guide rail is 0']	BCD	phy	电磁学_电磁感应	['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'phy_774_2.jpg', 'phy_774_3.jpg']
phy_775	OPEN	As <image_1>shown in the figure, two parallel inclined guide rails with a distance of $L=2m$are located in the same plane. The angle between the plane where the guide rail is located and the horizontal plane is $\theta=37^{\circ}$. The upper end of the guide rail is connected to a resistor with a resistance value of $R=3\Omega$. Metal rods a and b with a mass of $m=1kg$are placed at the CD and EF positions of the guide rail respectively. It is known that $AD=DH=L=2m$,$DE=\frac{L}{3}$, and there is a square magnetic field area with a length of $d=0.5m$in the ABCD area. The direction of the magnetic field is perpendicular to the inclined plane upward, and the relationship between the magnetic induction intensity and time t is $B=1.5t$. GH is the dividing line on the guide rail. The guide rail above the dividing line is smooth, the guide rail below the dividing line is rough, and the guide rail below the dividing line is in a uniform magnetic field with magnetic induction strength of $B_0=0.5T$. The direction of the magnetic field is perpendicular to the plane where the guide rail is located and upward.$ At the moment t=0$, rod a is given an instantaneous speed, and at the same time, rod b starts to move from rest. At the moment of $t_0$, rod a collides with rod b at the dividing line GH (the collision time is extremely short) and adheres together. After crossing GH, rods a and b move together at a uniform speed. The metal rod and the guide rail are always perpendicular to each other and in good contact. The resistance of the guide rail and the metal rod is ignored. Known: $g=10m/s^2$, seek: the dynamic friction coefficient between the metal bar and the guide rail below the dividing line (the result retains 2 significant digits)		0.65	phy	电磁学_电磁感应	['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phy_776	MCQ	An insulating string spans two smooth fixed pulleys in the same vertical plane (paper surface). One end of the rope is connected to a square metal wire frame abcd with a mass of m and a side length of L, and the other end is connected to a mass of 2m. block. There is a uniform magnetic field with magnetic induction intensity of B in the dotted area, and its direction is as <image_1>shown in the figure. The magnetic field boundaries I, II, III, and IV are all horizontal, and the distance between adjacent boundaries is L. Initially pull the wireframe so that its ab edge coincides with I.$ At the moment t=0$, the wire frame is released from rest, and the speed of the wire frame is constant at $v_1$during the process of the ab side moving from II to III. It is known that the resistance of the wire frame is R, the wire frame is always on the paper during movement, the upper and lower frames remain horizontal, and the gravity acceleration is g. The following statement is correct ()	['A. During the process of the ab edge moving from Ⅲ to Ⅳ, the frame speed is constant at $v_1$', 'B. $v_1=\\frac{mgR}{2B^2L^2}$', 'C. At $t=\\frac{3mR}{4B^2L^2}+\\frac{B^2L^3}{mgR}$, the ab edge coincides with II', 'D. The movement of the cd side from Ⅰ to Ⅱ takes the same time as the movement from Ⅲ to Ⅳ']	AC	phy	电磁学_电磁感应	['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phy_777	MCQ	As shown in Figure 1<image_1>, a horizontal conveyor belt that is long enough drives at a constant speed in the clockwise direction at a speed v. In a certain area of the conveyor belt, there is a bounded uniform magnetic field with a direction vertically upward, a magnetic induction intensity of B and a width of s. Now place a unit square metal wire frame abcd with a side length of L($L&lt;s$) horizontally and lightly on the left end of the conveyor belt. The wire frame is driven by the conveyor belt through the magnetic field area. The top view of the wire frame is shown in Figure 2. During the movement, the bc side is always parallel to <image_2>the dotted boundary of the magnetic field in Figure 2. It is known that the wire frame is already relatively stationary with the conveyor belt before entering the magnetic field. The speed at which the ad side of the wire frame is about to leave the magnetic field is $\frac{v}{4}$. During the process from the bc side of the wire frame entering the magnetic field to the ad side about leaving the magnetic field, the wire frame always slides relative to the conveyor belt. The mass of the wire frame is m and the resistance is R, the dynamic friction coefficient between the wire frame and the conveyor belt is $\mu$, and the gravity acceleration is g. From the bc side of the wire frame entering the magnetic field to the ad side about leaving the magnetic field, The following statement is correct ()	['A. A stage in the process of entering a magnetic field in which there can be no uniform motion of the wire frame', 'B. This process lasts for a time of $\\frac{2B^2L^3-3v}{\\mu mgR}-\\frac{3v}{4\\mu g}$', 'C. The electrical heat generated in the process frame is $\\mu mg(L+s)-\\frac{15}{32}mv^2$', 'D. Compared with empty load, the conveyor belt consumes $\\frac{2B^2L^3v}{R}-\\frac{3}{4}mv^2$']	BD	phy	电磁学_电磁感应	['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'phy_777_2.jpg']
phy_778	OPEN	As <image_1>shown in the figure, the inclination angle of a sufficiently long smooth slope is $\theta=30^{\circ}$, and the space above the slope is evenly spaced with strip-shaped uniform magnetic fields upward. The magnetic induction intensity is $B=1T$, The width of the strip-shaped magnetic field area and the spacing between adjacent strip-shaped magnetic field areas are both $L= 0.4m$. The existing length of one side is $L=0.4m $, and the mass is $m=0.48kg$. The square wireframe abcd with resistance $R=0.2\Omega$is released from rest on the inclined plane at a distance of $L=0.4m$from the upper boundary of the first strip magnetic field. The time from the moment it first entered the magnetic field is $t=0.96s$, and the wireframe speed reaches $v_1=2.8m/s$. The gravity acceleration $g= 10m/s^2$is known. Find the process from the time the wireframe is released to the wireframe speed reaches $v_1$. Joule heat generated by wire frames passing through a complete strip magnetic field area 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phy_779	OPEN	The figure <image_1>shows a schematic diagram of electromagnetic driving and electromagnetic damping experiments. The dividing line PQ divides the horizontal plane into left and right parts, the left plane is rough and the right plane is smooth. The driving magnetic field on the left side is a uniform magnetic field with directions perpendicular to the horizontal plane and alternately distributed at equal intervals. The magnetic induction intensity is $B=1.0T$, and the width of each magnetic field is $L=2m$. The damping magnetic field farther on the right side is a uniform magnetic field with a width of L and a direction perpendicular to the horizontal plane, and the magnetic induction intensity is $B_0$. The square metal wire frame abcd (connected end to end to form a loop) made of enameled wire has a total of 5 turns, the side length is also L, the mass is $m=40kg$, the total resistance is $r=40\Omega$, and the dynamic friction factor between the wire frame and the rough horizontal plane on the left side of PQ is $\mu=0.25$. Now make the driving magnetic field move to the right at a constant speed of $v_0=13m/s$, and the wire frame starts to move from rest. After a period of time, the wire frame moves at a constant speed. When the ab side moves to the dividing line at a uniform speed, the driving magnetic field is immediately withdrawn, the wire frame continues to move across the dividing line, and then continues to move to the right into the damping magnetic field. Suppose that the ab side of the wire frame is always parallel to the dividing line throughout the entire process, and the magnitude of gravity acceleration $g$is $10m/s^2$. Find the conditions that the magnitude of $B_0$should meet if the entire wire frame does not penetrate through the damping magnetic field.		B_0 \geq 2\sqrt{2} \, \text{T}	phy	电磁学_电磁感应	['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phy_780	OPEN	As shown in Figure A<image_1>, the number of turns of coil A is $n=100$turns, the enclosed area is $S_1=1.0m^2$, and the resistance is $r=2\Omega$. There is a uniformly strong magnetic field region D with a cross-sectional area of $S_2=0.5m^2$in A, and the change of its magnetic induction strength of $B$is shown in Figure B<image_2>. At t=0$, the magnetic field direction is perpendicular to the coil plane and inward. Horizontal smooth metal tracks MN and PO of sufficient length with a width of $L=0.5m$and regardless of resistance are connected to A through switch S. There is a uniform strong magnetic field in the vertical plane of $B_1=2T$between the two tracks (not shown in the figure). In addition, the same metal rails NH and OC are connected to MN and PO through a small piece of smooth insulation located on the left side of O and N (as shown in the figure). The magnetic field existing between the two rails is oriented outward perpendicular to the plane. After establishing a planar rectangular coordinate system xOy with O as the origin, the straight line along OC as the x-axis, and the line along ON as the y-axis, the magnetic induction intensity is distributed along the x-axis according to $B_2=2+2x$(unit is T) and evenly distributed along the y-axis. Now place a conductor bar ab with length L, mass $m=0.2kg$, and resistance $R_1=2\Omega$vertically on MN and PO, and place a square metal frame cdef with side length L, mass $M=0.4kg$, and resistance on each side is $R_2=0.25\Omega$on NH and OC, and the cd side coincides with the y-axis. Close the switch S, after the rod ab accelerates to the right to the maximum speed, it passes over the insulation and gives the metal frame a horizontal speed to the left of $v_0= 2m/s$, so that it can come into elastic frontal contact with the rod. Remove the conductor rod ab immediately after contact, and make good contact with the track everywhere during the frame movement. Request: The power of the metal frame to overcome ampere force immediately after contact.		18W	phy	电磁学_电磁感应	['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'phy_780_2.jpg']
phy_781	MCQ	As <image_1>shown in the figure, there are three bounded uniform magnetic fields, with magnetic induction strengths of $B$, and the directions are perpendicular to the paper outward, inward and outward respectively. The magnetic field width is $L$. At the left boundary of the magnetic field area, there is a square wire frame with one side length of $L$. The total resistance is $R$, and the wire frame plane is perpendicular to the direction of the magnetic field. Now an external force of $F$is used to make the wire frame pass through the magnetic field area at a constant speed of $v$. The initial position is used as the starting point of timing. It is specified that the electromotive force $E$is positive when the current is in the counterclockwise direction, the magnetic flux $\Phi$is positive when the magnetic induction line is perpendicular to the paper and the external force $F$is positive to the right. Then the following image reflecting the changes over time of magnetic flux $\Phi$, induced electromotive force $E$, external force $F$, and electric power $P$in the wireframe is incorrect ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	C	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAD3AVkDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiop7iK2RXmcIrMEBPqTgD86lot1FdXsFFUotX02bU5dNiv7Z76Jd0lssoMij1K5yOo/OrtAwooqm+rafHqkemPfW638iF0tjIPMZfUL1xwfyoAuUUUUAFFU7rVtOsry3tLq+t4Lm5OIIpJQrSH0UHrVygAoqE3MP2r7LvHn7PM2f7OcZ/OuTtfiFY28WpxeIUGk6hpuWmt3fd5kecI8Z/jDcDjnPFNpoSaex2VFZPh3U77V9IS+vtObT2lYtHBI2XEeflLDHysRzjtWtSGFFczceLk0zxW2j6vbiyt51DWF6z/u5yB8yE/wsDng9RUnhrxO3ie4vZ7SzZdHiYR2167Y+1MM7iq4+6OAD35oA6KiisDxT4hm8M29tftYPcaaJNt9NGctbJjiTbj5lB646DmgDforlj4zhvfEVnpGhwrqTOqzXdxG+IraFhlSWwcs3GF/HiupoAKKht7mG6DmFw4RyjY7MOoqam01oxJpq6Ciqdnq2najPcQ2V9b3Ets2ydIpAxjb0YDoeDVp3CIWOcAZOBmkMdRWDH418OSjcuqwBPN8je+VUSf3NxGN3tWlDq2nXGozafDfW8l5CA0sCSgugPQleo6igC5RRRQAUVSOr6cuqDSzf2wv2TeLYyjzCvrt64qzcTxWtu88zhIoxuZj2FCV9EJtJXZJRSAhgCOhpaBhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAFDVpLaK2iN1EZEM8YUDsxYbT+Bq/VHVfsv2aL7Zu8vz49u3+/uG39cVeq38C+ZlH+JL5evU5DT/h1o+m+PLvxdDLdG+uQ26NnBjUt1IGM9u5/+t19FFQahXH3Pw40a6+IEPjF5boX8QH7sSDyywXaDjGenbOP69hRQAUUUUAcf4m+HGj+KvE2ma7fS3S3NhtCJE4CuFbcAeM9T2xXYUUUAZxltf8AhIfK8lvtf2Xd5meNm7p+dcDqPgzWPHV9Jrupn+ybiybGjW7IrmMqwPmTdd24r93oAfWu/wD9E/4SD+L7b9m/Dy93881oVc+noZUvtbb9P63Mnw5e6nfaPG+saebG/QmOaMMGViONyEfwnqK1qKKg1OD8VeHtQ8d6u2iX0DWfhu1KySzDaZLyQjICddir3PUnitPwbHremQTaFq9urx2CqtpfxgKlxFzgFR91lxgjp3rqabJIsUTyOwVEBZiewFAHPP468OxXF1BJfOkloQLndbSgQ56byVwv403xNe6teaVbW3hqGKd9R+T7cxV4beMjJkI/jyOg6E15pba/qFh4J13xG2lYtfEN7I7X0zgrbQP+7jLIMsQB2x3r1bwlo0Ph/wAKabpVvcG5it4QqzH+PPOfpzx7UAcr4b8K3/w81aGz0mJ9Q0K/YfaCQoltptoBkJ43I2OR27V6JRRQBnaRLayx3X2WFogtzIrgnO588mtGs/Sfsnl3P2Pdt+0P5m7+/nn8K0Kup8bMqH8NbfLY5Dwh8OdH8F6nqV/pst08l8fmWaQMEGScDAHc9Tk1ueIdWTQvDuo6o4BFrbvLg9yBwPxOK065Px5oOreJtGXSbA2a20k0b3JuJWUyIrBigCqeuBz+lQanm/l30Xw+0jwdqNidN/t6Qebql0yurSyP5hCqhJ3HoN23pXf+H/hjovh3xbceI7Wa8e7nQoVlkBQE43HpnnHc0ah4U1bxLrGk3GuTWUFhpdwLqK0tNzmWVfulnYDAHoB+NdrQAUUUUAchL8OtIl+IKeM2luv7QRQPKDjy8hducYz07ZxXRaxJbxaPdvdRGW3WMmRAcFh6Vdqlq/2b+yLr7Zu+zeWfM29ce1XT+NGdb+HL0e+xbQgxqVGBjgU6mpjy12/dxxTqhlrYKKKKBhRRRQAUUUUAFFFFABRRRQAUUUUAUdVjtpbaIXUpjQTxlSO7BhtH4mr1UNWt4ri2iWacQqs8bhj3IYED8elX6t/AvmZR/iS07fqcHpXxButR+J+oeEX0WWKG1QsLssecY5IxwDnjn+fHeUYGc4oqDUK4O8+IN1a/FS18HjRJ3gmjDG8ye6k7gMYKjoTnrn057yjAznHNABRRRQBwfi/4hXXhjxloehQ6JNeR6iRunRiNuW24UYOSOp9iK7yjA9KKAM8x2o8Qeb5p+1/Ztvl9tm7r+dP0zVrDWLP7Xp91HcQbmQuh4BBwQfQiozbw/wDCQ/aftC+d9l2eT327s7v6V5H4lhutS17WJ/BcN42kjC679jkCLdMGG9YOP9aFzuI69OvW59PQypfa06nsOm6tYaxbvcaddR3MKSNEZIzldynBGe9XKx/C1xo1z4bsX0DyxpnlhYVjGAoHBBHY5znPOa2Kg1Kdvq1hdajdafDdRveWm3z4QfmTcMgkehHesXxJcTa7p+q+HtCvbMan5HlzmV2/0dZAQDhQecZwOPWuY8fCS98UWNv4T3L4whQs9xGQI4bc9p+DkH+Edc8/XW+Gb6WmhTWtvDNBq0Mh/tSO6Objzz1Zz/ED1B6YoApz+BtZ1bwvY+Fr67sbLRII4o5ltN7yzqmMLuYALkgEnBrs5tQ0zSJLDT5riK3a4/c2sbHG8qPuj3xWhXJfESXRV8MPDrEMk7TOEs4bf/XvP/B5XcNnv2oA6C91aw064tLe7uo4pruTyreNj80jdcAVdryfwOl3p/i5U8ceY3iOa3VdOuJWDRGIKNyR4AAkBzu9e3FesUAZ+kx2scdyLWVpA1y7SE9nzyK0KztIt4reO6ENwswe5kdiv8LE8r+FaNXU+NmVD+GrqxwfgT4g3XjHWtasJ9EmsF0+TaruxOeSMNwMNxnFd5RgDtRUGoVweh/EK61f4k6r4VfQ5oIbIMRdEnnBAyRjgNnI5rvKMDOcUAFFFFAHCTfEG6i+K0Xg0aLK0DxB/tm4/wB3duxj7v8ADnPWuu1eO3l0i6S7kMdu0ZEjjqo9au4Gc45qlrEEdzo93DNMIY3jIaRuij1q6fxozrfw5aX0ZbjAEahemOKdTYwBGoByAOtOqC1sFFFFAwooooAKKKKACiiigAooooAKKKKAKOq2n2y2ij8xY9s8cmW77WBx+NXqoavZyXtrFHEVBWeOQ7jjhWBP8qv1bfuLXuZRX7yTt21+8MiiuD0rwRrNj8UNR8TTa882nXMZVLMs3GcYUjphccYrvKg1CjIzRXB3ngjWbj4qWvimPxBImmxR7Wsst/dxtA+7tJ5J65/OgDvKKKKADIorg/F/gjWfEPjLQ9YsNfksbSwI863UsM4bJKgcEsPlOew79K7ygDPNn/xUH23zV/49vK8vv97OfpVm0srWwtlt7O3it4FJIjiQKoJOTwPeqv2KX/hIvt2V8r7L5WM853ZrRq5u9tehlSVubS2r/wCHILWytbFHS0t4oFkcyOIkChmPVjjqT61PRRUGpBFZ2sFzPcRW8Uc85BmkVAGkIGBuPfA4oSytY7yW7S3iW5lUJJMEAdwM4BPUgZP51PRQAVBNZWtxcQXE1tFJNbkmGR0BaMkYO09sj0qeigCC4srW7aFrm2imaBxJEZEDFGHRhnofep6KKAM/SbP7HHcr5qyeZcPJle2T0+taFZ2kWUtlHdLKVJluZJV2nPBPFaNXUd5vW5lQVqaVreQZFFcH4E8Eaz4W1rW73U9fk1GK+k3RRsWOOSdzZ6Nzjjjj8u8qDUKMj1org9D8Ea1pnxJ1XxHc+IJLjT7sER2ZLcZOQCOgC9Bj9O4B3lFFFABkVS1e1+26RdW3mLH5sZXe3Qe5rkZvBOsyfFeLxUuvOumLDsNlub+7jbjptz8317d663WLWS+0e7tYiokljKruOBmrpu0072M6yvTkrX0ehcjG2NVznAxTqbGu2NVPYYp1Qy1sFFFFAwoorjZPij4Wjnmh+03btDI0TmOymddynBGQuDyKAOyori/+Fp+F/wDnrf8A/gun/wDiKP8Ahafhf/nrf/8Agun/APiKAO0ori/+Fp+F/wDnrf8A/gun/wDiKP8Ahafhf/nrf/8Agun/APiKAO0ori/+Fp+F/wDnrf8A/gun/wDiKP8Ahafhf/nrf/8Agun/APiKAO0ori/+Fp+F/wDnrf8A/gun/wDiKP8Ahafhf/nrf/8Agun/APiKAOk1i3nubWJLcEstxE5wcfKHBP6VoVwN78SNC1CSxsrK5vEubi8hjTfaSxhiXHG4qBzXfVbfuL5mUV+8k7dF+oUVylh8QtD1HxvdeE4DP/aNsCWZo8RsR1AOc5GfSurqDUKKK5S5+IehWvjqHwhI8/8AaUoGGEf7tWI3BSfUj2x70AdXRRRQAUVyniL4h6F4Y8R6doeotOLu/wAeWY49yoC20Fj7kEcZrq6AMw2058S/acH7N9k8vOf4t2en0rzfWvFuq/DvU38Pm5j1Mah8+mz3U432pZ8ETk8+WCchvbH09IKXP/CS7/3n2X7Jjr8u/d6euKytM8DabbWupLqROqXWqFvtlzcqC0ik8IB/CqjGAOmK0qdPQxopLmt3Zo+G9KuNI0eO3vNRm1C7djLPcStnc7cnaP4V9AOgrXrJ8O6K/h/SU043895FEzCF5+XSPPyoT3wOMmtaszY878aa3e/D/Vv+Ek+1PeaVessNxpryfOjhcK8AJ9vmX8fpr+Bk1G/spPEep6iLiXVFWSK2gk3QW0Y+6i9i3PzN3P0q8PCttL4sl8QX08l5MIxFaQygeXarj5io/vMc5brjil0HwvB4cv8AUHsLiRLC7YSrYn/VwSc7inoG4+XoMe9AG9XNeM7LUJNNTU9L1MWN5ppadfOfbbyrj5klH93Hfsea6WsLxL4Zj8TrZ215dzJp8UvmXFpHwt1gfKrnrtB5x3oA4/wj4kvfiVq8eopO+m6VphUtZRyjzbiYrnL4/wCWQycD+LrXptc9d+ErSTxBYa3YytYXdsBFL5CgLcQ4/wBW69CBxg9RiuhoAzNFtri2iuxcKQXupHTJz8pPFadZmipcpFd/at+TdSFN5z8meMe1adaVfjZjh0lSVvxCiuU8K/EPQ/GOpajYaW05lsThzLHtDjJG5fbI74NdXWZsFFFcnpfxE0LV/Gd74WtXn/tC03by0eEYqcMFPqD6ge1AHWUUUUAFUNagmutFvILcEzSRFUAOMn61iS/EHRIvHieD2M/9puoIPl/u8ld23OeuOemPetvWkuJNFvFtd/nmIhNhw2farp/GvUyrq9KV+zLsYIjUHqBzTqbHkRru645p1QzRbBRRRQMD0rjfhmB/wi9zx/zE7z/0c9dkelcb8M/+RXuf+wnef+jnoA7LA9KMD0oooAMD0owPSiigAwPSjA9KKKADA9KMD0oooA4v4j5Fp4eKjn+3rLGP9+u0ri/iOxW08PEdRr1l/wCh12lPoLqZ0OgaRb6zNrEOnWyajMu2S5WMB2HufwH5Vo0UUhhWc+g6TLrUesvp1u2pRpsS6MY8wDpjP4n860aKACiiigDOvtA0nUr+1v77Tra4u7Q5gmkjDNGevB+vNaNFFAGb5tz/AMJKIsv9l+ybuny793r64rSrNN3P/wAJJ9jyPI+yebjH8W7HX6VzUPxFtNOTUbbxRGumalYZcwg7hcRk4R4u7Z4GOoPFaVFt6GNFp81n1Z29FZPhy/1LVNIS91TTxYSzMWjty25kjz8u/wBGx1HataszYKK5a88XjRPFLabrkCWWn3Cg2GoF/wB3IwHzRuT91hyR2I96m8L+JZ/E815eQWXlaKpCWdy5Ia5IzucL2Tpg9+aAOjoorn/FWvXnhu2t9RSwN3psbn7e0Z/eQR4/1ir/ABAHr3xQB0FFcknjWPV/ENppfhyOPUY9qzX12r/ureJhlRkdXPGF/OutoAzdGluZYrs3JclbqRU3DHyA8Y9q0qzdGu57uK7acgmO6kjXjHyg8VpVpVVpsxw7TpJp39TO07QdJ0i4urjTtOtrWW6bfO8UYUyH1P5n860aKKzNgrOt9B0m01e41a3062i1C4G2W5WMB3HufwH5Vo0UAFFFFAGc2gaQ2trrLadbHU1TYLoxjzAOnX6cU7WpJ4tFvJLXcJ1iJTYMnPtV+qGtXMtnot5cQHEscRZSRnBq6fxr1Mq7tSk27aMux5MaluuOadTYyWjUnqRzTqhmi2CiiigYHpXG/DP/AJFe5/7Cd5/6OeuyPSuN+Gf/ACK9z/2E7z/0c9AHZUUUUAFFFFABRRRQAUUUUAcX8R2KWnh5h1GvWX/oddpXF/EZtlp4ebGca9Zcf8DrtKBdTg9LHj7/AIWfqH9oNF/wiuw/Z8BPbbjHzZ65zx+ld5RRQMK4O8Hj/wD4Wna/Zng/4RLYDICF/u85/i3bumOMY960fGGoalo9/oN7a3jLZzajFaXdsUUqyyZUNnG4EMV74rT01r2XXNVle7M2n5jS3QxgeW4B8wAj7w+7ye+R2oA2KKKKAOD8Xjx+fGOif8I00I0XK/bd4T+9827PONuMbec5rvKKKAM43sn/AAkX2HavlfZfNzj5s7sflXCX3gnVvG95LretSvpd3asf7Gt02t9mKtkSSEcOWKj5egHvXefax/wkH2PyV3fZvN83v97GPpWhVzVradDKk782t9X/AMMZPhu61a60dDrlktrqEbGOUIwZJCON6f7LdQDyK1qKKg1OF8TeHNR8c6y+kanG1r4YtdrsUYeZey4yMEcoi5+pNaXg631zSY59D1ZBPbWQVbLUFwPPi6BWXs64wT0PFdRRQAVz3i1tems4NO0CJUmvGMct9JgraJjl9p+8T0A9etdDRQB59oHhK/8Ah/q8FtoaPfaBesBdRSMPNt5cY84E9VOOV7Hp6V6DRRQBnaReyXsd00iqDFcyRDaMcA8fjWjWfpN2LyO5IhSLy7h48L/Fg9fqa0KuorTeljKg700738zg/Ag8fDWta/4S5oTZBx9j2BPU/d287cY+9z+td5RRUGoVwehjx/8A8LI1T+1WgPhjDfZdoT1GzGPmzjOc8fpXeUUAFFFFAHCTDx7/AMLVi8pov+ER8sbhhOu3n/a3bvwxXW6xdvY6Pd3UQUvFGWUMMjPvV6qWr3Is9IurkxLKI4yxRujexq6avNaXM6ztTk720epbjbdGrHqRmnU2M7o1bGMjOKdUMtbBRRRQMD0rjfhn/wAivc/9hO8/9HPXZHpXG/DP/kV7n/sJ3n/o56AOyooooAKKKKACiiigAooooA4X4pSzQaPosttbrcTprdo0cLPsEjBjhd3bJ71N/wAJB46/6Ei2/wDBuv8A8RR8RiotPDxYZX+3rLP/AH3XaUC6nnEHxB8RXOtTaND4a02TUoV3SWy62hdR7jZ7isL4leI/GNt4Ue+n0UaJJbyK0N5b6uGYMTjbsCjeCO349q7ux+H+haf40uvFcEUw1K5BD5kygJxkgepxXQXen2d+0Ju7WGcwtvj81A2xvUZ6H3oGeKeEdY8d+PtPtNP1/RJG01J4Z/7TB+zyfI4cEAjDZx/CBXrya3odlqsHh5b61ivzHmOzDgPtAz0+nNa3TpXLXHw+0G68bw+LZIZTqcQGP3h2EhdoYr6gfyoA6miiigDMv/EWj6XqFrYX2pW1vd3ZxBDI4DSc44H14rTrlvEHw+0HxN4h07W9Rhla7sceXskKqwDbgGHcA5/OupoAzzcQf8JB9n8gfaPsu/zu+3djb+fNGla3p2t2TXmnXSTwK7RswyNrKcEEHkEe9IXtP+Eh2eU32v7LnzM8bN3T65ryPxJaXXiDXdWvvB1tdNpSAR6z9lm8tdRKsNyQ8ffC5BYYz05zzc+noZUvta9Wev6VrFhrdo11ptwtxbrI0XmKDtLKcHBPUZ7jir1Y/ha+0fUPDlnNoQjXTwm2ONF2+XjgqR2IPUVsVBqULfWdPutVu9LhuUa+tApmhOQyhhkHnqOeoottZ0+81S7023uVlu7NVNxGoJ8vdnAJ6Z4PHWuB8epJrHieysPCuU8V2y7pL6NtqWsJH3Zjg7g3ZevfjvrfDOXTYtDl02C1ltNWtZP+JnBcNumMx5Ls38YbqG6YoA7eqF/rWn6Zd2Vre3KwzX0hitwwOHcDO3PQH0z1q/XJ/EO50ZPDL2erWr3kl2witLSH/XSzfw+WexHXd2oA3b7WtP027srW7uVjuL2TyreLBLSNjJwB2Hc9BV+vJ/BMN1oXixYPG2+XXruBE0++lffG0YUZhQ4G1xzu/vda9YoAz9JnguI7kwQCEJcujAfxMDy341oVnaQ9o8d19kjaMC5kEm49XzyfpWjV1PjZlQd6au7+hmaZ4h0fWbi6t9N1G2uprVts6ROGKH3/ACNadct4X+H+g+ENR1C+0mGVJr45k8yTcFGSdq+gya6moNQrMtvEWj3msT6Rb6lbS6hbjMturgug9x+Nadctpnw+0HSfGF54ntYZRqN3u37pCUBY5YgdiTQB1NFFFAGY3iLR01xdEbUbcamy7halxvIxnp9Oam1eaG30i6muIRNEkZLxn+IelYkngDQ5fHCeL2jm/tRVAB8z5MhduceuOK29Ye2TR7truNpLcRkyIp5I9qun8aM638OXoy3GQY1IGARwKdTY8GNSowMcU6oZa2CiiigYHpXG/DP/AJFe5/7Cd5/6OeuyPSuN+Gf/ACK9z/2E7z/0c9AHZUUUUAFFFFABRRRQAUUUUAcX8Rtv2Tw9u+7/AG9ZZ/77rtK4v4jAG08PBjgf29ZZP/A67SmLqFFcJpfjLX734m3/AIduNAeHSoEYx3pVvmxjByflIOegru6Qwoorg7zxl4gg+KVt4ai8PO+kyIC1/tb+7ktn7oAPGDzQB3lFFFABRXB+L/GXiDQfGGi6Tpnh57+yvSvn3IVjsy2CARwMDnn1rvKAM8iz/wCEgzub7Z9mxt7eXu/nmrdvbQWkIhtoY4YhnCRqFUZ56Cqnk23/AAkIm84/avs23yv9jd1/OtCrn09DKl9r1IoLaC2VxBDHEHYuwRQu5j1Jx3PrUtFFQakUdtBFNLNHDGkspBkdVALkDAye/HFC20CXL3Cwxid1CvIFG5gOgJ6kDJ/OpaKACopLaCaaKaSGN5YiTG7KCUzwcHtUtFAEU1tBcGMzQxyGJg8ZdQdreoz0PvUtFFAGfpItBHc/Y2Yr9ocybv7+efwrQrP0mG2hjuRbTGUNcuzk/wALE8j8K0Kup8bMqH8NfoFFcJ4E8Za/4l1nWbTV/D76bBZuBDIysN3JG07upwM5HFd3UGoUUVweieM/EGo/EjVPD934ee20y1D+VelW+bBABJPykN1AFAHeUUUUAFUtXFsdIuheFhbGM+YV6ge1cjN4x1+P4qR+GV0B20howxv9rf3N2c/dxn5cV12rxQTaRdR3MvlQNGQ8g/hHrV0/jRnW/hy9HvsW0x5a7fu44p1NjAEagHIA4NOqC1sFFFFAwPSuN+Gf/Ir3P/YTvP8A0c9dlXAWXgrxXpAuINJ8Xw29nJcyzpE+mK5Uu5YjcW560Ad/RXE/8I/48/6He2/8FCf/ABdH/CP+PP8Aod7b/wAFCf8AxdAHbUVxP/CP+PP+h3tv/BQn/wAXR/wj/jz/AKHe2/8ABQn/AMXQB21FcT/wj/jz/od7b/wUJ/8AF0f8I/48/wCh3tv/AAUJ/wDF0AdtRXE/8I/48/6He2/8FCf/ABdH/CP+PP8Aod7b/wAFCf8AxdADviMoa08PAnAOvWXP/A67SvPr3wZ4q1KfTjqvi23ura0vobvyRpyxbijZxuDGvQafQXUKKaHUuUDDcOSM806kMKKKbvUOE3DcRnGeaAHUUUUAFFNLqrBSwBPQE9adQBnG1j/4SH7V9oXzPsvl+T/Fjdnd9O1eZa54o1T4earNoFvexX8V9iSymu5iW07e4UmY948tlSeeMV6cbJv+Eg+3eYu37N5WzvndnP0rM0rwXpen2moxXKtqE2pOzXlxd4d5gein0UDgAcCrm7216GVJW5tLasu+G9IfRdGitZr+e/uGJkmuZnJMjtySB2HoBwBWtWV4e0RPD2kppsV3cXEETN5PnsGaNCeEz3A6DPNatQannXjbVrzwHrCeI7e5e8tL5lhuNJeQlmYDCvAOxAHzDoRz1rW8BxXd9YP4k1DU1vLnVFVxHBITb26DO1EHqMnJ6k1pp4Xsz4pm8QXMkt1dmMRW6ykFLZMciMY4LHknr26Uui+GLTw/qGoT6fLLHbXrCQ2eR5UUnO5kH8O7jI6cUAbdcz41sLmXSl1Ox1X+zbzTSbiOSWQiBwB8yyjupH4jqK6asTxD4atvEv2KK+nm+xW83nSWqHEdwR90Seqg846HvQBxfg/X734kaympTztp1jpexhpsUpEk0rKD5knTMfJ2jv1Nen1hXvhWyudesNat3ks720Gwvb4UTRY/1bjHK+np2rdoAztIto7WO6Edwswe5kclf4STyv1FaNZ+k2TWUdyrSK/m3Dyjb2BPT61oVdR3m9bmVBWppWsGKKarqxIVgSOCAelOqDUKKKaHUsVDAsOozyKAHUUUUAGKpaxbpdaRdwSTLCjxlTI3RR6mre9d+zcN2M4zzVTV7Rr7SLq1V1RpYyoZug+tXTdpp3sZ1lenJWvo9C2gCxqAcgDrTqbGu2NV64GKdUMtbBRRRQMKKKKACiiigAooooAKKKKACiiigDP1e0lvLWKOHG5biKQ5OOFYE/yrQrP1iG4ntYltgS4uImbBx8ocE/pWhVt+4vn+hlFfvJO3RfqcLpfw7bTfiXf+LzrM8oulYfZCmAuQOC2eQMcDFd1RRUGoVwt38O2uvifbeMv7auUWFAv2MLxwu3AbPCnOSMevrXdUUAFFFFAHC+Lvh03inxdo2ujWrizGnFcwIuQ+G3ZByNpPQnB6Cu6oooAzfsc3/CR/bePJ+y+V153bs9K0qzDBc/8ACSfaMH7N9k2Zzxv3Z6fSuYT4iw6ONQs/FcS2Gp2mXjjiyy3iE4Qw92J4BHY1pUe2vQxoq3NpbVndUVk+HLzVtQ0dLvWLKOyuJmLpbIxYxxn7oY/3sdcVrVmbBRXJ6h4vfw/4nNlr8UVrpFyB9h1Hd8m8Llo5M/dbgkHoR71Y8LeIb3xNJd36WQg0QkLYSyZElwBndJjsh4x3PWgDpKKK5/xXrWpeH7W31K2sBeafE5N+qZMqRY++g74PJHpQB0FFcdb+Nhr3iC00/wAMJDf2qhZr++LHyoYyMhFI6yHjjt39uxoAzdHs5rKK6WbGZLmSVcHPyk8VpVmaNBcW8V2LkMC91I6ZOflJ4rTrSq7zepjh1amklY4bwN8O28Gaxq9+dauL4ag4YRyLjbyTknJ3Nz14ruaKKzNgrhdF+HTaP8RdS8VnWrmcXocfZWXAXcQcFs8gY4GBjiu6ooAKKKKAOGm+HbS/FGPxn/bE6qiBfsYTj7m372enfGOtdXrNrLe6Nd20OPMljKrk4GavVQ1qGe40W8htgTM8RCAHBJ+tXT0mvUyrq9KStfRl2MFY1U9QMU6mxgiNQ3XHNOqGaLYKKKKBhRRRQAUUUUAFFFFABRRRQAUUUUAZ+sC5NrF9l37/ALRFu2ddu8Z/DFaFZ+sTXEFrE1sWDm4iVsDPylwD+laFW/gXz/Qyjb2svRfqcZp3xH03UviDeeD4rW5W6tVYmZgNjFcZHXPfrXZ1WTTrKK+kvo7OBbuRdrzrGA7D0LYyRVmoNQrjLr4kaXa/EWDwY9tdG7lA/fhRsViu4D16d/euzqs2n2T36XzWkBvEXYs5jHmKvoG64oAs0UUUAcZ4o+JGmeFPFOlaDd2t1LPqG3EkSgrGGbaCcnnnPSuzqtPp9ldXMNzcWkEs8BzFJJGGaM/7JIyPwqzQBmEXX/CS5/efZPsn/Ad+7+eK4m68Dan4zuZta8Q3EmnX0DEaPBbvn7DtbIkYjh2YgEjpjj6duZ7j/hJRb5b7N9k34xxv3Y6/StKtKl9PQxo2963dmT4bm1mbSEXXraOHUImMcjRMCkuDgSL6BuuDyK1qKKzNjh/EXhnUPG2tyadrCm38L2u1hFHJiS+lxnJIOVRc9OpIz6Vo+EbPXNGFxoupsLqxtAosL/cN8kXICOP7y4HzdCCPeunooAK53xaniC7tINN0HbA125S4v2IP2WPHLKvVmPQeldFRQBwOieEL3wJrFvF4dD3Og3jBb21mly8EmMeepPUHA3L+Xt31FFAGZoouhFd/avMz9qk2b/7meMe1adZujT3E8V2bksSt1IiZGPlB4rSrSrfndzHD29krficZ4M+JGmeNdV1SwsbW6hewYZaZQBIuSMjHTp0NdnVa206yspZpbW0ggknbdK0UYUyH1YjqfrVmszYK4zSPiTpes+PNQ8Jw2t0l1Z78zOo2OUIDAdx14PeuzqtHp9lDey3kVpAl1KAJJljAdwPVupoAs0UUUAcbL8R9Nh+I8fgtrW5N26g+eAPLBKb8dc9O/rXR60Lg6LeC13+f5R8vy/vZ9qmOnWRvxfmzgN4F2Cfyx5gX03Yziodamng0W8ltiROkRKFRk5+lXT+NW7mVe3spX7Mux58td3XHNOpsZJjUnrjmnVDNFsFFFFAwooooAKKKKACiiigAooooAKKKKAM/V7uWztYpIcbmuIozkZ4ZgD+laFVNQlnigja3hErmVFIIzhSwyfwFW6t/CjON/aPXt+oUVwelaP42h+J+oajfaoknhuRCILYPnHTaAuOCMHJ713lQaBRRXB3mj+N5Pipa6lb6rGvhlY8Pbbv9nBBXHJLchu34YIB3lFFFABRXB+L9H8b33jLQ7vw/qsdrpEBH2uJmxu+bLEjHzArgAdj6da7ygDNN5N/wkf2LjyPsvm9Od27HX6Umj+INM12xkvLC5DxRO0cu4FWjZThgwPII96nMtx/bHleQPs3kbvNxzu3dM/SvH/Emn3fi3W9T1TwjaynSolWLVPKmMS6vtYbo4+OoAYb++cVc+noZUr+9d9T1zRtbsNfsmvNNmM1sJGjEm0hWKnBKk9RnuOK0KxvC2qaVq3h61uNGVY7NV8sQhdphK8FGXsR0xWzUGpnW2u6dda1eaPFcD7faKrywspU7WGQwz94dsjvxRZ67p1/q17plrcebc2QX7QFUlULZwpbpnjp1FcF49ik8R+JbTSfDGYvEtkPMm1NG2rZRMPuucfNv7L+Na/w1uLCDRpNFSyaw1awbGoW0rbpGkb/lqW/jDdQ34dqAO3rN1LXdO0i7sLa+n8l76UwwMynaz4ztLdAT2z1rSrk/iFe6VF4cfT9Rsm1Ca/Pk2ljHxJPJ22n+HHXd2xQBtahrunaZfWNjdT7bq+k8u3iVSzOcZJwOgHcngVpV5N4Jtrrwp4pW18ZZn1i/hSOw1R33oyqo/wBHBI+Vgcn/AGuvWvWaAM3Rrya8iummxmO5kiXAx8oPFaVU9OluJUnNxAIiszqgAxuUHg/jVyrqfE7GVG/s1d3CiuD8CaP4203Wtal8UarHeWc0mbVFbdjk8gY+UYIGP8nvKg1CiiuD0PR/G9v8SdV1DU9Vjl8PShvs9uGzjJG0BcfKQOp7+/YA7yiiigAqjrN1LZaNd3MOPMiiLLkZGa5KbR/GrfFaPU49UQeGBEA1rv8A9nBG3HXdzn0/Kux1GSeLTriS2iEsyoSkZGdx9KqHxIzq39nKztoyxGS0ak9SM06moSUBIwccinVJa2CiiigYHpXMeA9TvNW0Ce4vpjNKt/dRBiAMKsrBRx6AAV056V4QnxD1nwZ4UuBpvhm4vEOo3jG9fmBP3zdQuT+e38aAPd6K8U+GnxD8Q61aX+qahpmq6xK83lolkIlht1ABwFLg5OepzwBz1rvP+E01P/oSNf8Ayg/+OUAdfRXIf8Jpqf8A0JGv/lB/8co/4TTU/wDoSNf/ACg/+OUAdfRXIf8ACaan/wBCRr/5Qf8Axyj/AITTU/8AoSNf/KD/AOOUAdfRXIf8Jpqf/Qka/wDlB/8AHK4P4l/EPxFottp+q6fpmq6PIk3lul6ImguFIzgqHJyMdRjgnnpQB6N421K70vSLOazmMUkmpWkLMADlHmVWHPqCRXS14U3xE1rxf4Xs3v8Awrd2wTU7J1uYuIpT5y8LvI5PbBI9SKzvHHxp8W2t82mWuiS6CGfaJrmPdMRnqucIP1+tAH0NRXD6f4s1S1063gPhDxJclIwpnlMDNIcfeJ8zqetWf+E01P8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phy_782	MCQ	There is a uniform magnetic field (not shown) with a magnetic induction strength of $B$in space. Two identical polar plates A and B are placed vertically in the magnetic field. The voltage between the polar plates is $U$and the spacing is $d$. Among them, polar plate A is positively charged. A charged particle moves in a straight line from point M near plate A to point N near plate B, as <image_1>shown in the figure. The following statement is correct ()	['A. The particles are negatively charged', 'B. The magnetic field direction is perpendicular to the paper and inward', 'C. The speed of particle movement $v=\\frac{U}{Bd}$', 'D. At the same time, the velocity of the particles and the distance between the plates are reduced. Other conditions remain unchanged, the particles may still move in a straight line between the A and B plates.']	B	phy	电磁学_电磁感应	['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phy_783	OPEN	As <image_1>shown in the figure, the second quadrant of the planar rectangular coordinate system xOy in the vertical plane is filled with a uniform strong field, whose direction is at an angle of 60° from the positive direction of the x-axis. The other three quadrants are filled with uniform strong fields with an electric field intensity of $\frac{mg}{q}$and a direction vertically upward. Point A on the x axis of a positively charged particle with mass m and charge q $(-\sqrt{3}L,0)$is released from rest. It will start to move under the action of a uniform strong electric field above, and will enter the first quadrant from point P on the y-axis $(0,L)$. The first quadrant and the fourth quadrant are covered with uniform strong magnetic fields, and the direction is perpendicular to the plane of the coordinate system inward. Later, it is observed that the particle will pass through point C at a speed perpendicular to the x-axis direction, g is the gravitational acceleration, find: If there is a rectangular magnetic field area somewhere in the third quadrant whose direction is perpendicular to the plane of the coordinate system and whose boundaries are parallel to the x and y axes respectively, the minimum area of the area is S, and it is observed that the velocity direction of the particles can be adjusted to the direction perpendicular to the x axis through the area and then ejected out of the area, what is the ratio of the magnetic induction intensity of the rectangular area $B_2$to the magnetic induction intensity of the first and fourth quadrants $B_1$?		\frac{\sqrt{2S}}{S}L \text{or} \frac{\sqrt{3\sqrt{3}S}}{3S}L	phy	电磁学_电磁感应	['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phy_784	OPEN	As shown in the figure <image_1>, a certain ion twister can direct particles that are shot in different directions and pass through the same point by changing the size and direction of the electric or magnetic field. The device consists of three parallel metal plates M, N, P with small holes with a spacing of L. The central holes $O_1$and $O_2$of the three metal plates are connected vertically to the three metal plates. Particles can pass through the central hole O on the M plate and emit in all directions. Let the particles pass through the small hole a on the N plate and finally eject from the small hole $O_2$on the P plate. It is known that the small hole a is directly above $O_2$and the distance from $O_2$is $d=(\sqrt{2}-1)L$. A rectangular coordinate system is established with the center O of the metal plate M as the coordinate origin, the horizontal right is the x-axis, the vertical upward is the y-axis, and the rightward direction perpendicular to the metal plate is the z-axis. The area between the M and N plates is Zone I, and the area between the N and P plates is Zone II. The particles ejected from the positive ion source have a mass m and a charge q, and are injected into the small hole O of the metal plate at a velocity of $v_0$(regardless of particle gravity). If the incident direction of the particle is in the xOz plane and has an angle of $\alpha$(an acute angle) with the positive direction of the x-axis, add a uniform magnetic field $B_2$along the negative direction of the z-axis to zone I, and adjust the distance between M and N to minimize the width of zone I, and add an electric field $E_2$parallel to the metal plate to zone II. Ask for the size of $E_2$.		\frac{2mv_0^2\sin\alpha}{qL}\sqrt{(3-2\sqrt{2})\sin^2\alpha+\cos^2\alpha}	phy	电磁学_电磁感应	['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phy_785	MCQ	As <image_1> shown in the figure, a smooth, insulated and infinitely long inclined plane with an inclination of 53° is in a uniform magnetic field. The magnetic induction intensity is B, and the direction is perpendicular to the paper and outward. The mass of the small ball that can be regarded as a particle is m and the charged amount is +q. It is released from rest from the top of the inclined plane, and the small ball just leaves the inclined plane at time t. It is known that the gravitational acceleration is g,$\sin 53° = \frac{4}{5}$, and the charge amount of the ball remains unchanged throughout the movement. The following statement is correct ()	['A. $t = \\frac{3m}{4qB}$', 'B. The length of the ball moving on the inclined plane is $\\frac{9m^2g}{40q^2B^2}$', 'C. The magnitude of the impulse of the slope on the spring force of the ball before it leaves the slope is $\\frac{7m^2g}{40qB}$', 'D. The maximum height of the ball rising from the separation point after leaving the inclined plane is $\\frac{4m^2g}{25q^2B^2}$']	ABD	phy	电磁学_电磁感应	['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phy_786	OPEN	As shown in <image_1>, in the plane rectangular coordinate system xOy, there is a uniform magnetic field perpendicular to the xOy plane and directed outward between the y-axis and the straight line \( y = \frac{\sqrt{3}}{3}x \) in the first quadrant, and also in the fourth quadrant, with the magnitude of the magnetic induction intensity being B. Meanwhile, there is a uniform electric field in the fourth quadrant along the positive x-axis direction, with the magnitude of the electric field intensity being E. An accelerating electric field exists between the two metal plates MN and PQ located in the second quadrant, and the voltage between the two plates is \( U_0 = \frac{2E^2m}{B^2q} \). A particle with mass m and electric charge q ($q>0$) starts from rest at the midpoint of MN, accelerates, enters the first quadrant perpendicularly to the y-axis at point a on the y-axis, passes through point b on the straight line \( y = \frac{\sqrt{3}}{3}x \) and a point on the x-axis (both point b and this point are not shown in the figure), and then enters the fourth quadrant. It is known that the distance between O and a is \( L = \frac{(6 - 2\sqrt{3})Em}{3B^2q} \), and the gravity of the particle is ignored. Find: the coordinates of the position where the particle is closest to the y-axis during its movement in the fourth quadrant.		\left[(2-\sqrt{3})\frac{Em}{B^2q}, \left(\frac{3\pi}{2} + \sqrt{3} + 2n\pi\right)\frac{Em}{B^2q}\right] (n=0,1,2,3,\cdots)	phy	电磁学_电磁感应	['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phy_787	OPEN	For example, Figure A shows a vacuum oscilloscope tube. Electrons are emitted from the hot filament K (the initial speed is not counted), accelerated by the accelerating voltage between the filament and the plate, emitted from the center hole of the plate along the center line, and then entered two parallel metal plates. In the deflection electric field formed by the plates, the distance between the two plates is d and the plate length is L. The voltage between the plates changes with time as shown in Figure B, where T is much greater than the time from spontaneous emission to hitting the fluorescent screen.<image_1><image_2>The speed of electrons when entering the electric field is perpendicular to the direction of the electric field. The distance from the right end of the metal plate to the fluorescent screen is z (its size can be adjusted). There is a uniform magnetic field parallel to the metal plate between the metal plate and the fluorescent screen. The magnetic induction intensity is B. When the voltage applied to the metal plate is zero, the electrons hit point O on the fluorescent screen. Taking the O point as the coordinate origin, a rectangular coordinate system xOy is established. The coordinate plane is perpendicular to the direction of magnetic induction intensity. Looking from left to right, The vertical metal plate is upward in the positive y-axis direction, and the horizontal to the right is the positive x-axis direction. It is known that the mass of electrons is m and the elementary charge is e, and electrons can be ejected from between metal plates. Request: Take $z =\frac {\pi}{2B}\sqrt {\frac {2mU_0}{e}}$, and the voltage will return to a sawtooth wave. After a long time, electrons will hit the screen. Please write down the functional relationship between the abscissa x and the ordinate y of the position where the electrons hit.		$y=(1+\frac{BL}{4}\sqrt{\frac{2e}{mU_0}})x$（$-\frac{L}{Bd}\sqrt{\frac{mU_0}{2e}}\leq x \leq \frac{L}{Bd}\sqrt{\frac{mU_0}{2e}}$）	phy	电磁学_电磁感应	['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'phy_787_2.jpg']
phy_788	OPEN	<image_1>The guide rails $a$and $b$are composed of a quarter-smooth arc parallel guide rail with a radius of $r=0.4\,\text{m}$and a horizontal guide rail. The right end of the guide rails $c$and $d$are well connected. The width of the guide rails $a$and $b$is $L_1=2\,\text{m}$, and the width of the guide rails $c$and $d$is $L_2=1\,\text{m}$. The metal rods $P$and $Q$are perpendicular to the guide rail, and the masses are $M=1\, respectively.\text{kg}$and $m=0.5\,\text{kg}$, the resistance of the two bars between the rails is $R=1\,\Omega$, the metal bar $Q$is stationary on the $c$and $d$rails and is locked, the entire rail is in a vertically upward uniform magnetic field, and the magnetic induction intensity is $B=1\,\text{T}$. Now release the metal bar $P$from the center of the arc guide rail without initial velocity. After $t=1\,\text{s}$, the metal bar $P$reaches the lowest point of the guide rail. At this time, the pressure of the metal bar $P$on the guide rail is twice its gravity. At the same time, the metal bar $Q$is unlocked. The movement process of the two bars is always parallel. The horizontal guide rail is long enough, and the metal bar $P$always moves on $a$and $b$, and the metal bar $Q$always moves on $c$and $d$. The metal rod has good contact with the guide rail, regardless of all friction, the gravitational acceleration $g$is $10\,\text{m/s}^2$. After a long enough time, determine the final speed of the two metal rods.		The speed of metal rod $P$is $\frac{2}{3}\,\text{m/s}$, and the speed of metal rod $Q$is $\frac{3}{4}\,\text{m/s}$	phy	电磁学_电磁感应	['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phy_789	MCQ	<image_1>The two long enough guide rails are composed of smooth metal guide rails with no resistance to the upper and lower sections. They are insulated and connected at two points,$M $and $N$. The height of $M$and $N$is the same, and the spacing is $L=1\,\text{m}$. The connection is smooth. The angle between the guide rail plane and the horizontal plane is $30^\circ$. Both ends of the guide rail are connected to a resistor with a resistance value of $R=0.02\,\Omega$and a capacitor with a value of $C=1\,\text{F}$. The entire device is in a uniform magnetic field obliquely upward from the vertical guide rail plane with $B=0.2\,\text{T}$. Two conductor rods $ab$and $cd$are placed on both sides of $MN$respectively, with masses of $m_1=0.8\,\text{kg}$and $m_2=0.4\,\text{kg}$respectively. The resistance of $ab$rods is $0.08\,\Omega$, and the resistance of $cd$rods is not counted. Release $ab$from rest, and at the same time,$cd$starts to move from rest from a distance from $MN$of $x_0=4.3\,\text{m}$under the action of a force with a magnitude of $F=4.64\,\text{N}$and a direction upward along the plane of the guide rail. The two rods collide elastically just at $M$and $N$, and $F$is removed immediately before the collision. It is known that the speed of $ab$at the moment before impact is $4.5\,\text{m/s}$, and $g=10\,\text{m/s}^2$.（ ）	['A. $ab$Time from release to first collision is $1.44\\,\\text{s}$', 'B. $ab$The Joule heat consumed on $R$from release to before the first collision is $0.78\\,\\text{J}$', 'C. Immediately after the first collision between the two rods, the speed of $ab$is $6.3\\,\\text{m/s}$', 'D. Immediately after the first collision between the two rods, the speed of $cd$was $8.4\\,\\text{m/s}$']	BD	phy	电磁学_电磁感应	['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phy_790	MCQ	As shown in Figure A<image_1>, two smooth metal guide rails that are long enough are fixed in the same horizontal plane and placed in parallel. The spacing between the guide rails is $L$. There is a uniform magnetic field downward vertically in the horizontal plane. The magnetic induction intensity is $B$. The left side of the guide rail is connected to a resistor with a resistance value of $R$. A metal rod with a mass of $m$moves to the right along the guide rail under the action of an external force of $F$. The relationship between the external force of $F$and the movement time of the metal rod is as shown in Figure B<image_2>. The image slope is $k$, and the other resistances are ignored. The metal rod is always perpendicular to the guide rail and in good contact. The following statement is correct is ()	['A. When $F_0=\\frac{k R m}{B^2L^2}$, the metal rod moves in a straight line at a uniform acceleration of $\\frac{F_0}{m}$', 'B. When $F_0=\\frac{k R m}{2B^2 L^2}$, the metal rod performs acceleration with reduced acceleration, and the final acceleration is $\\frac{F_0}{2m}$', 'C. When $F_0=\\frac{k R m}{2B^2 L^2}$, the metal rod performs acceleration with increasing acceleration, and the final acceleration is $\\frac{F_0}{2m}$', 'D. When $F_0=\\frac{3k R m}{2B^2 L^2}$, the metal rod performs acceleration with reduced acceleration, and the final acceleration is $\\frac{F_0}{m}$']	AD	phy	电磁学_电磁感应	['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', 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'phy_790_2.jpg']
phy_791	MCQ	<image_1>As shown in the figure, a mass spectrometer consists of an accelerating electric field, an electrostatic analyzer, and a magnetic analyzer. The radius of the center line of the $\frac{1}{4}$arc of the electrostatic analyzer channel is $R$. There is a uniform radial electric field in the channel, and the direction points to the center of the circle $O$. The electric field strengths at each point at the center line are equal. There is a bounded uniform magnetic field with a direction perpendicular to the paper surface distributed in the magnetic analyzer. The boundary is rectangular $CNQD$,$NQ = 2d$, and $PN = 3d$. Particles with a mass of $m$and a charge of $q$(regardless of gravity) start at rest from the $A$plate, are accelerated by an electric field with a voltage of $U$, pass through the electrostatic analyzer along the center line, and then enter the magnetic analyzer perpendicular to the magnetic field boundary from the $P$point, and finally hit on the film $ON$, then ()	['A. The magnetic field in the magnetic analyzer is oriented perpendicular to the paper and outward', 'B. Electric field strength at the center line of the electrostatic analyzer $E = \\frac{U}{R}$', 'C. By changing the specific charge of the particle, the particle can still hit the same spot on the film', 'D. For particles to reach the boundary of $NQ$, the minimum value of magnetic field induction strength $B$is $\\frac{1}{2d}\\sqrt{\\frac{2mU}{q}}$']	D	phy	电磁学_静电场	['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']	['phy_791.jpg']
phy_792	MCQ	The schematic diagram of the working principle of a medical cyclotron is shown in Figure A<image_1>. Its working principle is: under the action of the magnetic field and the alternating electric field, charged particles repeatedly perform cyclotron motions in the magnetic field, and are repeatedly accelerated by the alternating electric field to achieve the expected needs. The energy of the particles is extracted through the extraction system and bombarded on the target material to obtain the required nuclide. When t=0$, the orbit in the cyclotron of charged particles released by the filament at $O$in the center of the cyclotron and the high-frequency AC voltage applied between the gaps are as shown in Figure B <image_2>($t_0$in the figure is a known quantity). If the specific charge of a charged particle is $k$, ignoring the time and relativistic effects of the particle passing through the gap, then ()	['A. The accelerated particles are positively charged', 'B. The magnetic induction intensity of the uniform magnetic field between the magnets is $\\frac{\\pi}{2kt_0}$', 'C. The maximum momentum of the particle being accelerated is independent of the radius of the $D$box', 'D. the numb of times a charged particle is accelerate in a $D$box is related to that AC voltage']	BD	phy	电磁学_静电场	['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'phy_792_2.jpg']
phy_793	MCQ	As shown in Figure A<image_1>, the trajectory of a particle point $P$on the edge of a known wheel can be regarded as the particle point $P$making a uniform circular motion at a rate of $v$relative to the center of the center $O$, and at the same time, the center of the center $O$is facing the ground to the right at a rate of $v$. This trajectory is called a circular rolling line. As shown in Figure B<image_2>, there is a uniform electric field with a magnitude of $E$vertically downward and a uniform magnetic field with a magnitude of $B$in the horizontal direction (perpendicular to the paper inward). It is known that a positive ion with a mass of $m$and a charge of $q$moves from the point $A$under the combined action of the electric field force and the Lorentz force, starting from rest along the curve $AC$(this curve belongs to a circular rolling line). When it reaches the point $B$, the velocity is zero, and $C$is the lowest point of motion. Regardless of gravity, then ()	['A. The time from point A $to point B$is $\\frac{\\pi m}{qB}$', 'B. The distance between $A$and $C$increases with the increase of electric field $E$', 'C. The ion potential energy first increases and then decreases', 'D. The ion velocity is maximum when reaching the $C$point']	BD	phy	电磁学_静电场	['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ARa10Fc/4E/5J94c/7Blv/wCi1roKAM3X9Gh8Q6Jc6VcT3EENwArvbvtfbkEjPocYPsTVa48JaHc+GP8AhHX0+IaWI/LWFRjbjoQeoOec9c1t0UAUtH01dH0i105Lie4W3jEYluG3OwHqe5oq7RQAUUUUAFFFFAFDW/8AkAaj/wBesv8A6Cawvhl/yTXQP+vRf61u63/yANR/69Zf/QTWF8Mv+Sa6B/16L/WgDrKKKKAMy60nzNWttSgl8maP5ZcDIlT0P+NXLS8t76ATW0qyxkkblPcVPWTHpsWl391qMU7R2siF5oAuV3DnePQ47d61T51aT1W3+X+RzuLpy5oLRvX/AD/z+81qKhtbuC9tkuLaRZInGVYVNWbTTszdNSV1sFcBc/8AJerL/sX3/wDR9d/XAXP/ACXqy/7F9/8A0fSGd/RRRQAVDc3UFnbvcXEixxIMszdBTp54raB5p5FjjQZZmPAFZc1hDr0tnetcNJYoPMSDZgO3Zjn+VaQinrLYxqzklyw1l2/X0JItKV9afVZ5vOO0LbrjiJcc49z61qUdKKmU3LcuFOME+XrqFc749/5J74i/7Btx/wCizXRVzvj3/knviL/sG3H/AKLNSWO8Cf8AJPvDn/YMt/8A0WtdBXP+BP8Akn3hz/sGW/8A6LWugoAKKKKACiiigAoormtc8Y23hzX7Cw1O2lhsb0bY9RJHlLLniNv7uRg5PHPscAHS0VzOoeM7W28U2Xh2xtpdQv5iGuFgI22sX99yePw6n8s9NQBQ1v8A5AGo/wDXrL/6Cawvhl/yTXQP+vRf61u63/yANR/69Zf/AEE1hfDL/kmugf8AXov9aAOsooooAKKK5mz8Z2svi278N31tLYX0fz2xmI23cf8AeQ+o5yOv64ANGPTodG+2XdlHMwkG82sZ+Xd6qOxNT6Zq9pq0Je3f514eJuHQ+hFZGjeMbbX/ABHfabpltLPZ2S4l1Ef6ky5x5a/3jjnI44+lbjWUQkmngRIrmVNpmCDPtn1xWvOpJ8+/f/MwVOVNr2fw9V/l/VizXAXP/JerL/sX3/8AR9dRYNrkF2Le/S3uIMcXUR2kfVfX6Vw15rCJ8drV/sd6dmjPBtEOST533hz933pOlK9lr6BHERcbyuvU9QqnqOp2mlW/nXUoQHhV6sx9AO5qtqUmsyXCwadFBHGVy1zM2cewUd6tR2KMls15submAcTMgByepA7ZoUYqzk9Oy3CVScrxpqzXVrT/ADf5eZTksovEFrZz3kM8UanzDaucBj23D+nvWsAFAAGAKSRmSJ2RC7BSQoONx9K5jQfHmlaxpt7cXR/sy504sL+1umCvb47n1B7HvUym3p0LhTUder3fc6misLwr4lXxVp0uowWNxbWZmZLaSYYNwg6SAdQDzjNbtSaBXO+Pf+Se+Iv+wbcf+izXRVzvj3/knviL/sG3H/os0AO8Cf8AJPvDn/YMt/8A0WtdBXP+BP8Akn3hz/sGW/8A6LWugoAKKzdf1SbRdDutRgsJr97dQ5t4SN7LkZx9Bk49qx7j4h+HYPCK+I1vBLaSDEUaf62ST/nmF67s8Y7fSgDqqKpaRez6jpNteXNlJZTTRh2t5CC0ZPY470UAXa4L4jX82owp4N03S0v9R1OPcxnjJhtos4MrH1BBxjnI+gPe0Y5zQB5J4L064+FuujQNTtxd2mrSKLbWIYTuaXH+ql5JHt26++PW6MZooAoa3/yANR/69Zf/AEE1hfDL/kmugf8AXov9a3db/wCQBqP/AF6y/wDoJrC+GX/JNdA/69F/rQB1lFFFABXlHjayuPiZrv8AwjemW32a20uXddaxLEcxSf8APOHpk9Mnp09s+r0YoA8/+G93No8beCdS01bPUNNi3pLAh8m7izjzVP8AeJIyDzk/UD0CjHOaKACuAuf+S9WX/Yvv/wCj67+uAuf+S9WX/Yvv/wCj6ANbxz4wTwlpcBhg+1anfSi3sbUH/WSH19hkZ/8Ar0un+F7y4tln8QaxfXN/IMuLW5e3hiP91FjK5A9WyTXH+M96fHTwXJekrp3kyrCXPyedhsj6/c/SvVndI42kdlVFGWZjgAetAHOeF7LU9Ji1g6vf3N3Gt0xtpJyCwgVRjoOe/OMmvM9a8Map8U9RuPE2nWUFhZ2yCOzS5jIbU9rA/vRxiM4wM17ZbXMN5bR3MDiSGVQ6OOjA9DUuMUAc94O8Qr4g0Yu2ny6fdWrm3ubORceTIo5A7EdMEV0NGKKACud8e/8AJPfEX/YNuP8A0Wa6Kud8e/8AJPfEX/YNuP8A0WaAHeBP+SfeHP8AsGW//ota6Cuf8Cf8k+8Of9gy3/8ARa10FAGbr+tW/h7Q7rVbpJZIoFB2RLuZySAFA9SSBXjcfg/xBpmpj4ivo1tJIbhrqTQUUkwxsB86dvNwMnj9eK9260UAUtJ1O21rSbbUbQuYLiMOm9SpwfUHpRV3pRQAUUUUAFFFFAHFeP8AxrZeFLYWuqQypa6hbzRxXSDcElC/dYYyAcjBGe/TrXP/AAo8c2GpaVovhjToZri4tbLfeTY2xwY6DJ+8SSOnv6V0fxR8Mf8ACV+AdQskUG5hX7Tb8ZO9OcD3Iyv41zHwD8K/2N4NfVp4it3qb7wT1ES8KPxO4+4IoA9ZooooAKKKKACiiigCC8mlt7KeaGHzpY42ZIgcbyBkDPbNeGSfFvwy/wASLbxI8lxHbxaK9s8BiPmCbzd2z06d849696r511X4Ymf4/RWohJ0u5b+03IHAQH5l/Fxj6MKAPZ7rR9P8c+GbQ65pbR+aizpEzES27EZGGGCGFRQ+B7YLHFe6vrGoWqf8u13dbo2/3sAFh7MSK6gDAwKKAAAAYAwBRRRQAUUUUAFebfFLxvY6HpWqaDqUM0J1HTJhZ3IG5JHKsuw46HOPbntXpNebfG7wv/wkPgCe5iQtd6YftMeBklR98flz/wABoAd8LPGtlr2kadomnQzSDTNMgW7uWG1Fl2hdgHUnhuenHevR689+DHhj/hG/h9aNKhW6v/8ASpsjBG4fKPwXH4k16FQAUUUUAFFFFABRRRQAUUUUAFMihjghSGGNY40AVUUYCj0Ap9FABRRRQAUUUUAFFFFABTTGhlEpRTIoKhscgHqM/gPyp1FABRRRQAUUUUAFFFFABTXRZEZHUMjDDKRkEelOooAQAKAAAAOgFLRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAFa+e9SAGwggmm3DKzymNcdzkK3P4Viarruq6Jpk+o6ha6XDbQLud2vX/ACH7rknoB3Nb9zcw2drLc3EixQxIXkdjgKoGSTXD6PbzePNTh8RalEyaJbvu0mykH+tP/PxIPU/wg9Bz3oA3PB+ra3rWjm+1vSU015XLQQhyW8o/d3g9G/zgdK6GmySJDE0kjKiIMszHAA9TTqACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOR+I2majq/huG1sLZruL7bDJe2yMFea3Vsuq5wMnA4yM81NH4rljiVE8J68iqAAot48Aen366iigDhPE3iHV9S8O3tlpfhTWTe3CeXH58caIMkZJO/jjNdnYvcSWFu93AILho1MkSvvCNjkbu+PWrFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH/9k=']	['phy_793_1.jpg', 'phy_793_2.jpg']
phy_794	MCQ	<image_1>As shown in the figure, there are uniform magnetic fields and uniform strong electric fields in space. The magnetic field direction is perpendicular to the paper and inward, and the electric field direction is along the negative y-axis. At t=0$, positively charged particles enter the electromagnetic field from point $A$along the positive direction of the x-axis. After passing through the highest point of the trajectory,$P$, they exit from point $B$. The two points $A$and $B$are on the x-axis,$P$is on the positive half axis of the y-axis,$A$,$B$, and $P$are exactly on the same circle, and the coordinate origin $O$is located at the center of the circle. Ignoring the gravity of the particle, write the horizontal velocity of the particle as $v$, the horizontal displacement as $x$(the $A$point is the displacement 0 point), the kinetic energy as $E_k$, and the electric potential energy as $E_p$(the x-axis is the zero-potential surface), the following image may be correct ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	BD	phy	电磁学_静电场	['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phy_795	OPEN	As shown in figure (a)<image_1>, a planar rectangular coordinate system $xOy$is established in a space where electric and magnetic fields coexist. There is a charged small ball with mass $m$and charge $+q$at the origin. The changes of magnetic and electric fields in space are shown in Figure (b) <image_2>and Figure (c)<image_3>. At t=0$, the ball is released at a speed of $v_0$and moves in a straight line in a direction at an angle of $45\circ $to the positive direction of the x-axis.$\ At frac{3}{4}T$, the ball moves in a straight line again and reaches the receiving device at $T$(which can be regarded as a point in space). It is known that $E_0 = \frac{mg}{q}$, where $g$is the acceleration of gravity, the positive direction of the x-axis is the positive direction of the electric field strength, and the inward direction perpendicular to the paper is the positive direction of the magnetic field. If the magnitude of magnetic induction intensity and the direction of the electric field of the magnetic field in space are changed and the electromagnetic field always exists, so that the charged ball moves in a uniform circular motion from the origin to reach the receiving device after being released, the time for which the ball's motion is shortened is calculated.		\frac{\sqrt{2}v_0(4-\pi)}{2g}	phy	电磁学_静电场	['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phy_796	MCQ	As shown in the figure<image_1>, two smooth parallel rails that are long enough are fixed on the insulating horizontal plane. The distance between the rails on the left and right sides is $2L$and $L$respectively. In the figure, the left side of $OO'$is a metal rail with no resistance, and the right side of $OO'$is an insulated rail. The metal guide rail part is in a vertically downward uniform magnetic field, and the magnetic induction intensity is $B_0$; the right side of $OO'$takes $O$as the origin, and a $x$axis is established along the direction of the guide rail. There is a vertically downward magnetic field with a distribution rule of $B = B_0 + kx (k &gt; 0)$(not shown in the figure). A $U$-shaped metal frame with a mass of $m$, a resistance value of $R$, and a length of $L$on three sides. The left end is placed flat on the insulated track next to $OO'$(not in contact with the metal guide rail) and is in a static state. A conductor bar $a$with a length of $2L$, a mass of $m$, and a resistance of $R$is on a metal guide with a spacing of $2L$, and a conductor bar $b$with a length of $L$, a mass of $m$, and a resistance of $R$is on a metal guide with a spacing of $L$. Now the conductor bars $a$and $b$are given the same horizontal rightward speed $v_0$at the same time. When the conductor bar $b$moves to $OO'$, there is no current in the conductor bar $a$($a$is always on the guide rail). The conductor bar $b$collides with the $U$-shaped metal frame and is connected together to form a loop. The conductor bars $a$,$b$, and the metal frame are always in good contact with the guide rail. The conductor bar $a$is blocked by the column and does not enter the right track. The following statement is correct ()	"['A. After giving conductor rods $a$and $b$the same horizontal rightwards $v_0$, conductor rod $b$moves at a constant speed', ""B. The speed of conductor bar $b$when it reaches $OO'$is $\\frac{6}{5}v_0$"", 'C. After collision with the $U$-shaped metal frame, the conductor bar $b$is connected together and then performs uniform deceleration motion', ""D. After the conductor bar $b$collides with the $U$-shaped metal frame, the distance between the conductor bar $b$and $OO'$when at rest is $\\frac{12mv_0R}{5k^2L^4}$""]"	BD	phy	电磁学_电磁感应	['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phy_797	MCQ	<image_1>Two smooth parallel long straight guide rails, with a spacing of $d$, are fixed on the horizontal plane, and a uniform magnetic field with a magnetic induction strength of $B$is perpendicular to the guide rail plane. Two conductor bars $L_1$and $L_2$with a mass of $m$and a resistance of $r$are placed vertically on the guide rail and are in good contact with the guide rail. The distance between the two conductor bars is far enough,$L_1$is stationary, and $L_2$initial speed $v_0$moves to the right, regardless of the guide rail resistance and ignoring the magnetic field generated by the induced current, then ()	['A. The conductor bar $L_1$will move in a straight line with uniform deceleration', 'B. The speed of the conductor bar $L_2$gradually decreases to $0.5v_0$, and the Joule heat generated by $L_2$during this process is $\\frac{3mv_0^2}{8}$', 'C. When the speed of conductor bar $L_1$is increased to $0.5v_0$, the potential difference across conductor bar $L_1$is $0$', 'D. When the speed of conductor bar $L_2$is reduced to $0.6v_0$and the speed of conductor bar $L_1$is increased to $0.4v_0$, the potential difference across conductor bar $L_2$is $0.1Bdv_0$']	D	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACBANgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKK5P4geIdS8N6LbXGk/ZZL65u4rS3triJmE8kjAAAhhtwNxyc9O1dLZrdpaoL2WGW4/iaGMxr+ALMf1oAnooooAKKKKACiiigAoopCQFJPSgBcj1orzj4Safa3Wlaj4lEKk6lqNxLaE8+TAHKqiZ+6OG6AdvQV6PQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHA6//AMT34seHdITmHSIJNUuc9Cx/dxAehByee1dZe65ZWLXEbGSaaBFd4beMySfMSFAUc5OD+WenNUpvB+gtqE2pyW8q3cqhZbgXcqsyjoCQ3T2pFsbTw5pl7c+H9La7up3DOkcwd5XwACzyNyAPf6UAaGjaxa65p4vLUSqu9o3jmQpJG6nDKynkEVoVkeHBIunSCWwurNzM7sLkxl5Wb5i/yMwAJJAGeAPTFa9ABRRRQAUUUUAFcp8Rr66tfBOp2+n2l5dX93bvBBHawPIct8pJKjC4BJySOnGa6ukJCgkkADkk0AcPpmuLo/hjSNF0fSdSnvI4YbRBLp88UURwFLyMyKNo5Jxyce9dIuoXH/CUtpreUbf7GJ1IU7w2/acnOMfhWkkscufLkV8ddpziqf8AZY/t46r577vs/wBn8rA243bs+uc0AX6KKKACiiigAooooAKKKKACiiigAooooAKxde0zW9QaA6Rr/wDZQQN5g+yJN5mcY+8eMc/nW1SHODjr2oA47/hG/Gf/AEPf/lKi/wAaP+Eb8Z/9D3/5Sov8apt8QL6O7bw++jE+KjJsjtQx8h06+d5mPubRn1zxXfDpz1pDOLk0LxVbIZr3xh9stk5kg/s6OPePTcDkU2HSfEF+hl0rxL/ZkAO1ofsSTbm/vZY56EDHtXVar/yDJ/8Adqp4d/5B8n/XU/yFAdDE/wCEb8Z/9D3/AOUqL/Gj/hG/Gf8A0Pf/AJSov8a39fGp/wBjTvpFxBBeR4kQ3C5RgvJU88AgYz2zmuW8J+Mr/wAa6yslmsFnptimLyNnWSSaUjgLg8RjqH/ixxxmgC1/wjfjP/oe/wDylRf40f8ACN+M/wDoe/8AylRf412VFMLnG/8ACN+M/wDoe/8AylRf40f8I34z/wCh7/8AKVF/jXZVx3j3Vr7w9DY6tp93vmSXyv7LIz9u3EDauBuDjqCM980gE/4Rvxn/AND3/wCUqL/Gmt4f8WwoZbjxp58CDdJD/Zka+Yo6rkHjI4zU/gHUrvW9Kn1e91ATT3Up3WaDC2O3I8rB53epPX6V017/AMeFx/1zb+VAHHQ6brWobjpGvf2UE/1g+yJN5men3jxjB/Opv+Eb8Z/9D3/5Sov8a1PDX3bn6r/WtyQO0TiNgjkEKxGcH1xQD3OP/wCEb8Z/9D3/AOUqL/Gj/hG/Gf8A0Pf/AJSov8axY/GWvz6qvg1ZLNNfSUrLqO5TEYRglwmf9YQf9X269K9M7UAcb/wjfjP/AKHv/wApUX+NH/CN+M/+h7/8pUX+NdlRTC5xv/CN+M/+h7/8pUX+NH/CN+M/+h7/APKVF/jVrxj4gvfC0VrrG2CXSImKXsRO2XDEbXQk4JHPy981L4O1fUvEGnSaxdi3js7tg1jBEwZki9XYHG49x/D065wgKH/CN+M/+h7/APKVF/jR/wAI34z/AOh7/wDKVF/jXZUUwucb/wAI34z/AOh7/wDKVF/jR/wjfjP/AKHv/wApUX+NdlXnHiPx1q3hPXJ9JuYrS8lv2DaTJ5ixrFkhds4zkKCSQ38WMeuEB3Gj2moWWnrDqepf2jchiTP5KxZHYbV44oqXTY7yHTLWPUJ0nvFiUTSou1XfHJA7DNFMRaoPIODiiigDjT8OdPeB53vLo620/wBo/tcECdX7AdgmPl29MV2Q6UUUAU9V/wCQZP8A7tVPDv8AyD5P+up/kKt6r/yDJ/8Adqp4d/5B8n/XU/yFA+hPrOj22vaZJp940wt5CpkWKQoXAOSpI6qehHoarjwzpcesWWqW8Btrm0iMC+QdivFjARwPvKOo9CK2KKBBRRWZFr+mza/NoaTONRig+0NC8TrmPdt3AkYYZ44JoA06rS6dZz38F9LbRPdW6ssMrLlow3XB7ZxUWlavZa3aNdWEpkiWV4WLIyEOjFWBDAHgir1AFW202ytLu6ure2jinuirTugwZCBgE/hT73/jwuP+ubfyqeoL3/jwuP8Arm38qAMjw1925+q/1rckQSROhLKGBGVOCPoaw/DX3bn6r/Wt6gb3Ob/4QXQxocelrDIqxyi4W5V8TibOfN39d57n8OldJRRQIKKKKAMvUPD9hqmq2GoXqPNJYlmgjZv3aucYcr3YY4PbJ74wmkeHrDQp759PV4o7yUStAG/do2MEov8ADnqa1aKACiiigArB/wCEN0N21Z7izF0+qtm6ac7iw4woPUKMDAHTA9BW9RQBV02xj0vTLawheV4reNYkaVtzEAYGT3NFWqKACiignAyelABRWZ/wkWj/ANjHWP7Rt/7PHW4L/KDnGPrnjHWtMHIyKAKeq/8AIMn/AN2qnh3/AJB8n/XU/wAhVvVf+QZP/u1U8O/8g+T/AK6n+QoH0Neis7W9atfD+mPqN6Jvs0ZAkaKMuUBP3iB2Hc1CPE2lyatZaZb3H2m4u4jOnkDeqxgZDsRwoPQE9TQI164HxDDqkXxU0a8021Mpk0y4gZyPkT50OXPoM5x1OMCu+qGS7t4rmK3knjSeYExxswDPjrgd8ZFAGYl3pXhu2jsri8CMFM0juMk7nG6R8DCgu+STgcnsDjZrg/Fek30t94g8m1kuP7X0YWNsyKSElzIMMf4QfMDZPHymtjUfEMPhMaTbanHL9jmQQSah/wAs4pAFC7/QNzz0GPyAOkqC9/48Lj/rm38qzPD/AIii8Ri7ns7aYWEUnlw3TjC3JH3ig67QeM9/wrTvf+PC4/65t/KgDI8Nfdufqv8AWt6sHw1925+q/wBa25ZBFE8hVmCqWwoyTj0Hc0De4+iuaXx3oT6HHqiXDuskvkLbLGTOZc48vy+u72/HpXS0CCiiigAorMvte0/TdWsdNu5jFPfbhAWU7GYY+Xd03HPA74+lGl6/p+tXV9BYSmb7FIIpZFX5C+MkK3Qkd8dKANOiiigAoorBHjLQ1fVkuLwWz6U2LpZxsYLxhgOrKc8EdfxFAG9RVbT72PUtOt72JJEjnjWRVlXawBGeR2NFAFmkJwCcZ9qWigDyCTwtrU+tv4t/sRBZC887/hHyx3SYBXzyM7PN/iAxz65r18dBRRQNsp6r/wAgyf8A3a5C2t/GMhmbRr/SIbPf8qXMLs+cDPIOK6/Vf+QZP/u1U8O/8g+T/rqf5CkHQ5m+s/iV9lKx3nh653kI0ZgcDaTgnk4IAOcd6wPDXgTxz4Omkj0u/wBElivX3zyyQEGLAOMYwSD0wOB2A5r1yiiwXOL+x/Ef/oK+H/8AwGl/xrgfipZ+LpNK0221K5028upboGzh0+3kFwWCnJXnOAOv1Fe5U0ohcOVUsAQGxyAf/wBQosCZ5b8N9N+JVqIjrd7Emm7uYL797Pt/2SDkf8CPHp69l4n8Ny+KGtbK5u/L0YEveWyZD3JBG1dw6LnJOOeldFRTC5geFtBu/DltPpzX/wBq02Nh9gWQfvIY8cozfxAHp7VsXv8Ax4XH/XNv5VPUF7/x4XH/AFzb+VAjI8Nfdufqv9a3HLCNiihnAO1ScZPpmsPw1925+q/1reoG9zzGLwTr8Gsp4yjWxOvvMWm07aohEJABQPjPmAfx9+R06+nUUUCuFFFFAHJ+N9Av/FUNposaQR6bK/m3l2+GkjCkYWMHozZPzdgD64MngjSdT8P6ZNol7DAbWzfbZ3UIC+fGecso6MD1PfPfqeoooHcKKKKBBXnPiPwLqnivXZdXuJbS0m09gulR+WJBJtIbdOccgnoo6Z+ufRqKAuVtOe7l062e/hSC7aNTNHG25VfHIB7jNFWaKACiikJwCcZ9hQAtFcofiFoa6W927TrcJP8AZjYFP9J87OAmzPU9R2xXVjkZoAp6r/yDJ/8Adqp4d/5B8n/XU/yFW9V/5Bk/+7VTw7/yD5P+up/kKB9DXorO1zULvStJlvbPTpNQkiwTbxOFdlz8xXjkgZOO+M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phy_798	MCQ	In <image_1>the circuit shown in Figure A, the number of solenoid turns is $n=1500$turns, the cross-sectional area is $S=20~\text{cm}^2$solenoid wire resistance is $r=1\Omega$,$R_1=4\Omega$,$R_2=5\Omega$,$C=30~\mu\text{F}$. Over a period of time, the magnetic induction strength $B$of the magnetic field passing through the <image_2>solenoid changes as shown in Figure B, then the following statements are correct ()	['A. The induced electromotive force generated in the solenoid is $1~\\text{V}$', 'B. After the current in the circuit stabilizes, the electric power of resistor $R_1$is $5\\times 10^{-2}~\\text{W}$', 'C. Close $S$, and the upper plate of the capacitor becomes positively charged after the current in the circuit stabilizes', 'D. After $S$is disconnected, the amount of charge passing through $R_2$is $1.8\\times 10^{-5}~\\text{C}$']	D	phy	电磁学_电磁感应	['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']	['phy_798_1.jpg', 'phy_798_2.jpg']
phy_799	MCQ	As shown in Figure A<image_1>, there are uniformly strong magnetic field areas I and II perpendicular to the horizontal plane on the smooth and insulated horizontal plane. The magnetic field direction is as shown in the figure. The width of both magnetic field areas is $l=0.1 ~ m $, the side length is $0.1~ m $, and the square wire frame $abcd$with a total resistance of $0.005~\Omega$is located on the horizontal plane, and the edge of $cd$is parallel to the magnetic field boundary. The wire frame passes through the magnetic field area at a constant speed under the action of a horizontal external force $F$perpendicular to $cd$. At the moment $t=0$, the edge of $cd$enters the magnetic field area I. The relationship between $F$and time $t$is shown in Figure B<image_2>. The following statement is correct ()	['A. Within $0\\sim 0.2~s$, the direction of the induced current in the lead frame is $a\\to b\\to c\\to d\\to a$', 'B. The magnetic induction intensity in magnetic field region II is $0.4~T$', 'C. Within $0.2\\sim 0.4~s$, the magnitude of the induced current in the lead frame is $2~A$', 'D. Within $0\\sim 0.6~s$, the Joule heat generated in the lead frame is 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'phy_799_2.jpg']
phy_800	OPEN	As <image_1>shown in the figure, a square single-turn conductor frame $MNPQ$with a side length of $2L=0.2~m$, a mass of $m=0.8~kg$, and a total resistance of $R=1\times 10^{-4}~\Omega$is placed vertically on the horizontal ground. There are two rectangular uniformly strong magnetic field areas $abcd$and $efgh$in the vertical plane, both of which are $3L$and high enough, and the magnetic induction intensity is $B=0.1~T$, and the directions are perpendicular to the paper and inward.$cd$is horizontal and below the ground,$gh$is horizontal and $L$away from the ground, and the horizontal distance between $bc$and $eh$is $2L$. The $MQ$edge of the conductor frame coincides with $ad$. Apply a horizontal pulling force to the right to the conductor frame, so that the conductor frame starts from rest to make a uniform acceleration with an acceleration of $a=0.6~m/s^2$until the conductor frame just leaves the magnetic field area $abcd$, and then it is ordered to make a uniform linear motion. It is known that the gravitational acceleration is $g=10~m/s^2$, the plane of the conductor frame is always perpendicular to the magnetic field, and the dynamic friction coefficient between the conductor frame and the ground is $\mu=0.1$, and $\sqrt{3}=1.7$. Ask: The heat generated by friction with the ground during the conductor frame's movement from the beginning to the $NP$edge to the $fg$edge is 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']	['phy_800.jpg']
phy_801	MCQ	As shown in the figure<image_1>, there is a uniform magnetic field inward perpendicular to the paper in the isosceles right-angled triangle area $efg$with a right-angled side length of $L$. The square wire frame $abcd$with a resistance of $R$and a side length of $L$moves at a uniform speed to the right on the paper, and $cd$and $ef$are always on the same straight line. Taking the current in the counterclockwise direction as positive, when the wire frame passes through the magnetic field, the image of the potential difference between the induced current $i$and $bc$varying with the displacement $x$may be correct ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	B	phy	电磁学_电磁感应	['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'phy_801_2.jpg', 'phy_801_3.jpg', 'phy_801_4.jpg', 'phy_801_5.jpg']
phy_802	MCQ	As <image_1>shown in the figure, in the coordinate system xOy, there is a square metal wire frame abcd with a side length of L, one diagonal ac of which coincides with the y-axis, and the vertex a is located at the coordinate origin O. On the right side of the y-axis, there is a uniform magnetic field perpendicular to the paper in the I and IV quadrants. The upper boundary of the magnetic field exactly coincides with the ab side of the wire frame, the left boundary coincides with the y-axis, and the right boundary is parallel to the y-axis.$ At t=0$, the wire frame passes through the magnetic field region at a constant speed v in a direction perpendicular to the upper boundary of the magnetic field. Taking the induced current in the direction a→b→c→d→a as positive, then the wire frame passes through the magnetic field region. In the process, the plot of the potential difference $U_{ab}$between the induced current $i$and ab versus time $t$is shown in the following figure ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. 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'phy_802_2.jpg', 'phy_802_3.jpg', 'phy_802_4.jpg', 'phy_802_5.jpg']
phy_803	MCQ	"As shown in Figure A<image_1>, the upper end of a fixed and vertically inverted ""U""-shaped metal guide rail is connected with a certain value of resistance $R$, and the entire device is in a uniform magnetic field directed inward perpendicular to the track plane. Now throw a metal rod with a mass of $m$vertically upward from a place on the guide rail far enough away from the resistor $R$with an initial momentum of $p_0$. The image of the momentum of the metal rod changing with time is shown in Figure B<image_2>. During the entire process, the metal bar and the guide rail were in good contact and remained vertical. Regardless of air resistance and resistance of the metal bar and guide rail, the gravitational acceleration was $g$. Regarding this process, the following statement is correct ()"	['A. $t_0$The acceleration of the metal rod is zero at the moment', 'B. The maximum acceleration of the metal rod is $2g$', 'C. The impulse of ampere force during the rise of the metal rod is $p_0 - mgt_0$', 'D. The Joule heat generated by the constant resistance during the rise of the metal rod is equal to $\\frac{p_0^2}{2m}$']	C	phy	电磁学_电磁感应	['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'phy_803_2.jpg']
phy_804	MCQ	As shown in Figure A<image_1>, two smooth metal rails with a distance of $L$are placed horizontally, and a resistor with a resistance value of $R$is connected to the right end. There is a uniform magnetic field with a magnetic induction intensity of $B$and a vertical upward direction between the rails. A metal conductor bar $ab$with a mass of $m$moves to the left from rest under the action of a horizontal pulling force $F$. The internal resistance of the metal bar is $r$, and the rest of the resistance is not counted. The metal bar is always perpendicular to the guide rail during movement and maintains good contact. Its speed-time image is shown in Figure B<image_2>, and $v_m$and $T$are known quantities. then ()	['A. $0 \\sim \\frac{T}{2}$During time, the relationship between tensile force and time is $F = \\frac{2B^2L^2v_m}{(R+r)T}t + \\frac{2mv_m}{T}$', 'B. During $0 \\sim T$, the impulse of ampere force is $\\frac{B^2L^2v_mT}{R+r}$', 'C. The pulling force does equal work between $0 \\sim \\frac{T}{2}$and $\\frac{T}{2} \\sim T$', 'D. The heat generated by the loop is not equal between the periods of $0 \\sim \\frac{T}{2}$and $\\frac{T}{2} \\sim T$']	A	phy	电磁学_电磁感应	['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'phy_804_2.jpg']
phy_805	MCQ	As shown in the figure<image_1>, smooth parallel rails that are long enough are fixed on the insulating horizontal plane. The distance between the rails on the left and right sides is $2L$and $L$respectively. In the figure, the left side of $OOO'$is a metal rail with no resistance, and the right side of $OOO'$is an insulated rail. The metal guide rail part is in a vertically downward uniform magnetic field, and the magnetic induction intensity is $B_0$; the right side of $OOO'$takes $O$as the origin, and the $x$axis is established along the direction of the guide rail. On the right side of $OOO'$, there is a vertically downward magnetic field with a distribution rule of $B = B_0 + kx (k &gt; 0)$(not shown in the figure). A U-shaped metal frame with a mass of $m$, a resistance value of $R$, and a length of $L$on three sides. The left end is placed flat on the insulated track next to $OOO'$(not in contact with the metal guide rail) and is in a static state. The conductor bar $a$with a length of $2L$, a mass of $2m$, and the resistance of $R$connected to the circuit is on the metal guide with a spacing of $2L$. The conductor bar $b$with a length of $L$, a mass of $m$, and the resistance of $R$connected to the circuit is on the metal guide with a spacing of $L$. Now, given the same horizontal and right-wing initial velocity of $v_0$for the conductor rods $a$and $b$, when the conductor rod $b$moves to $OO'$, there is no current in the conductor rod $a$. The conductor bar $b$collides with the U-shaped metal frame and is connected together to form a loop. The conductor bars $a$,$b$, and the metal frame are always in good contact with the guide rail. The conductor bar $a$is blocked by the column and does not enter the right track. The following statement is correct ()	"['A. After the conductor bars $a$,$b$obtain the same horizontal and right-hand initial velocity $v_0$, the conductor bar $a$performs uniform deceleration motion', ""B. The speed at which the conductor bar $b$moves to $OO'$is $\\frac{4}{3}v_0$"", ""C. Before the conductor bar $b$moves to $OO'$, the heat generated by the circuit formed by the conductor bar $a$and the conductor bar $b$is $\\frac{mv_0^2}{6}$"", 'D. During the process from the collision of conductor bar $b$with the U-shaped metal frame to the stop, the amount of charge passing through the cross-section of conductor bar $b$is $\\frac{4mv_0}{3kL^2}$']"	BCD	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAD+AcgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKasiMzKrqWXhgDyPrWLreoaxp5861g0s2Y2hpLu5eMhicdFjYY5HOa526t/E+l61deKJYtGht1silzCL6XY207hIf3XUAEfQ0Ad9VaLULSa/uLGOZWubdVaWMdVDZ2n8cGsLw7f8AiTVI2vrsaSmn3EIktBAZS4JxjduVeOvYGuH07WtWuviXrNnFrOl2t8TbwHdaOVmCBiypl8Z+Y988cUAesLd27XT2qzRm4RQzR7vmAPfFTV5rqlhrT/FLRVGq2SzixupVnFiRhMouxh5nzfeyOeK7nRrW+tLHy9Q1NdRl3EiZYRFx2GAT09aANGiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooqjrGr2mhaZLqN87JbRY8xlUttBIGcDsM0AXqKqjUrE6cNRF3D9jKb/P3jZt9c1BomuWHiHT/t2mymW2LsgkKlQxBwSM9R70AaNFFFABRWV4g8RWHhnT1v8AUndLYyrEXVCwQsepx0HvU9zrOm2elNqk97Aliq7zOXG3H1oAvUVR0bVYNc0m31K1WVYJ13IJU2tj6VeoAKKKxdR8U6XpOuWOk30rQTXoJgkdcRsw/h3dM+1AG1RWH4j8W6T4WgifUZyJJmCQwRrukkP+yo61tq25Q2CMjPNAC0UUUAFFYtz4n0+y8SRaJds0E88QkgkkGElOcFVP94cce9Ra94tsNCv9P09g1xf30yxx20PLhScFyPQDmgDfooooAp6rZpqGk3dnIMrNEyEfUV5xDJrOsfDzR/D+pCRdQv7v7JMxyrfZ42JdznnBVcf8CHrXbaroWgDz9R1KJEX70sryMoH61gT23ga38TLpF1AkF/8AZ/OiaVmVXQ9QrE4PQEigDsJHSC2NnatH9oWH91FvAOAMDj0rhfDWjWlh441azu/KlaCys5TJIB/rSZSWHoea4vX/ABjoNr4utNO8E6ZBNrMzLCmqnc6w7jhtq/xYHvivX4fDGnt5099BFd3l0kYupmXAlKDAO3OB1PA9aAOKvfDegp8TNFtj80LaddSPuuCd7b48ZOfc8f4V32hx6VDp4g0d4mtY3K4ifcFbPIqsfCHh0uHOj2ZdeAxjGRV/TtKsNIgaHT7OG1iZt7LEoUE+tAFyisaLxRpUviS40Bp/K1GFVcRSjb5ikZymfvfhTNQ8V6Xp2v2OiPI8uoXh+SGFd5Rf7zY+6PegDcooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiikZlUZYgD1JoAWqerXlhYaVc3OpyRR2UaEzNL93b71Z86L/nqn/fQqjqun6XrmnvYalHDcWshBaJ24ODkfqKAPA2tnZJNYutP1T/hW7Ts62CSnIBHEm3giPPOM177ol1pl5o9tNo7wtYMg8kxfdA9Km8qxNn9k2wfZtnl+Vxt24xjHpivBfEVzN4T+MXh7QNAvZ7PR5bmB3tYpj5ZMkvz8Zxg+lAH0JRUfnxf89U/76FL50X/PVP8AvoUAZfiXUNH03QbqfXGi+wFSsiyDIfP8IHcn0rwq30a70q5ttW1nSNRj8Bx3Jlj0+abebfONsjr3TPb/ACffdQsdM1aKOK/it7iOKRZUWTBAdeh+tTXCWd3bSW1wIZYJFKPG+CrA9QRQA6yuLa7sobizkjktpEDRtGflK9sVPWdpOn6Zoemxafpyxw2sWdkYfOMnPc1e86L/AJ6p/wB9CgB9cH8UdQ0b+who95YtqWpXx22NnEcS+Z2cH+EDrmu586L/AJ6p/wB9Cqcljpc2qQ6nJDbtewoUjnONyKeoBoA8i8GFvBniZLXx+Gk1S7VFsNSncyRhcD92CfukHv3r2zrWTrWjaL4isxa6tb291CrBlDnlSO4PUVopJBGioskYVRgDcOBQBLRTPOi/56p/30KPOi/56p/30KAOB+J13ZXtgnh6HS21XW7geZbQRkq0GP8AlqXH3QP16VzvgW2l8EeJ2tfGQMuraiqi01WRy6OMAeSGPRs/nXrAgsFvWvQkAumQRtNxuKjnGfSodS07StYiii1CG3uUikWWMSYO1x0I96ANGiub8b+I38NeDNU1az8qW4tocxqxyNxIAJx2Gc185eHfiz45uteSz/tYz/2g/kBZYgwjLcBlAxjGc49qAOh+OHxEe/1VPDmmS4tbOQPcup/1kg6L9B/P6VQ1bXJPiXZWT3l0H1HJt9N0ixA8wSYGZZZCPu8E4A/Ku4079njSTO1zretXt9M7b38oLEGJOTnOSf0rtfD/AMLPCPhq8ivNP0z/AEuIkpPNIzsPpk4H5UAcP8MrXTvCfiR9H8SWJt/E8oIgvJSDFOnZYj0U+3evaqzNX8PaVrptTqVmk7WsomgYkhkYdwRz+FadABRRRQB5Z8SptN13VYNA0ywnu/FMQElvc27bPsROMNI47d8c9KT4bJDoWuXuk+IkdfFs5MjXc77/ALZFngxsew9K9Jt9LsbW/ub6C1ijurrb50qr80mBgZNRX2h6bqV9Z3t3aRyXNm++CUj5kP19OelAGhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFYvibwvp/izTVsdSNwIVcODBMYzn6itqigDzf/hSHhL/AJ6ar/4HNR/wpDwl/wA9NV/8Dmr0iigDzf8A4Uh4S/56ar/4HNXkPjLwZpei/GHQ9AtGuvsdzJbhy85ZxvfBw3UV9TV89fEj/k4fwz/12s//AEbQB3v/AApDwkesmq/+BrUf8KQ8Jf8APTVf/A5q9IooA83/AOFIeEv+emq/+BzUf8KQ8Jf89NV/8Dmr0iigDzf/AIUh4S/56ar/AOBzUf8ACkPCX/PTVf8AwOavSKKAPN/+FIeEv+emq/8Agc1H/CkPCX/PTVf/AAOavSKKAPN/+FIeEv8Anpqv/gc1H/CkPCX/AD01X/wOavSKKAPN/wDhSHhL/npqv/gc1H/CkPCX/PTVf/A5q9IooA83/wCFIeEv+emq/wDgc1H/AApDwl/z01X/AMDmr0iigDybX/gx4Us/D2o3UbamZIbaSRQ94xGQpIyO9XfhZ4A8N6Z4e0vXobAPqVxbrI08rFyhP90Hhfw5rtfFX/Ipax/15y/+gGqPw9/5J7oX/Xmn8qAOlooooAKKKKACiiigAooooAKKKKACiuOvfF15feKbjw14ct4ZL21QPd3V0G8mAHGBheWY5PGR0NVYfFGtaL450/w1rzWd0mpRPJbXVtGYirL1VlJP4HNAHd0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFQXd5bWFuZ7u4jghBAMkjBVBJwOT70AT189fEj/AJOH8M/9drP/ANG19C54zXzp8QLq3u/2hPDT208cyrcWiExsGAYS8jjvQB9F0UUUAFFV7u/tNPSN7y5igWSQRoZGChmPQDPc1M7rHGzuwVFGSxOAB60AOoqvY39pqdol1Y3Edxbv92SNsqfxqxQAUUVWfUbOPUI7B7mJbuRDIkJYbmUdSBQBZoqtf6jZ6Xatc311FbQLgGSVgo5qwCGAIOQelAC0UUUAFFVP7UsTqp0v7VH9uEXneRn5tmcZx6UX2qWGmeT9uu4bfz5BFF5jY3uegHqaAKfir/kUtY/685f/AEA1R+Hv/JPdC/680/lWh4nRpPCurIilma0lAAGSTtNcF4L+Jvg/TfBmk2V5rUMNzBbrHJG6NlWHUdKAPUqK4l/i34HEbFfEFuWAOBtb/CuD+HnxkiuNT1z/AISvWYo7cyhrHdFgBcsCBgem3rQB7lRXF/8AC2vAw/5mC3/75b/Cj/hbXgb/AKGC3/75f/CgDtKK4v8A4W14F/6GG3/75f8Awo/4W14F/wChht/++X/woA7SiuL/AOFteBv+hht/++W/wo/4W14G/wChht/++W/woA7SorlnW1laIZkCEqPU44rkP+FteBv+hht/++X/AMKT/hbXgX/oYbf/AL5f/CgDJ+C8Ua+FtRv55Fa/udQma8LH5kYHAVj7Dn8agtY5fG3xfh1u2G7RNBiaCOfHyzTnO7ae4HH5V5r8UfFnhEXzP4Xt1ubm+/eXk63E0cR9iisoJNdF4G+O+jWOgJY65Y/Y5IMLH9iizG6/TPBoA96oryz/AIaA8E/377/wH/8Ar0f8NAeCf799/wCA/wD9egD1OivLP+GgPBP9++/8B/8A69H/AA0B4J/v33/gP/8AXoA9Toryz/hoDwT/AH77/wAB/wD69H/DQHgn+/ff+A//ANegD1OivLP+F/8Agr+/ff8AgP8A/XrYtPjH4HurZZjrKQFv4JY2DD9KAO7ori/+FteBf+hht/8Avl/8KP8AhbXgX/oYbf8A75f/AAoA7SiuL/4W14F/6GG3/wC+X/wo/wCFteBf+hht/wDvl/8ACgDtKK4v/hbXgX/oYbf/AL5f/Cj/AIW14F/6GG3/AO+X/wAKAO0ori/+FteBf+hht/8Avl/8KP8AhbXgX/oYbf8A75f/AAoA7SiuGuPin4CuraW3l8QQGOVCjABxkEYPIHFePD4uaj4I16bTdK1CHXPDyNuthLnekZOdu885HTnNAH01RXmnhT42eG/Et3FZSJPY3chCokq7gxJ6AivSXLBGKLuYDgZxk0AOorhbDx/e6hqt3pEXh+c6nZ3IjuIvNG2OM4w+7ocg5xXddqACiiigAooooAKpatpVjrel3GnajAs9pOu2RG9PXPYj1q7WZ4g0f+3tEudM+2T2i3ACvLAcOFzyAfcZH40AeJReI9Tl1r/hB/8AhIzH4bWdoP7byRIyhc+V5p4z2z6Vj+KdB03w58cPCenaVAIrVJbQjncWJl5YnuT617w3gnw8/hYeG206M6YF2iPvn+9nru75rwLxHos3h/43eFtOl1G4v1iuLXypLjllTzflXPfA70AfTtFFFAGT4k0LTPEWh3Gn6tGrWrLuLE4MZHRwexHrXhdjreoa5qdv4K1DxE8vhc3JhGrAFWuwACId5/LNe6+IdBt/EmlnTbue4jtndWlWF9plUHlCf7p71DqPhLQ9T8OvoUunwx2BXCxwqE8s9mXHQ+9AGlYWFppdhDZWMCQW0KhI40GAoFWaztD02XSNHtrCa+mvWgXYJ5sb2HbP4cVo0AFcL8UNL0iXw8dZvL06bf6d+8sr6M4dZOyD+8CeMV3VYWseE9N17WtO1HUVkn+wZaK3Zsxbz0cr3I7UAeY+CW/4WPq/meOJN2oWAR7XSnUxJjAPmlf4yfyr2sAAYAwK5fxT4G07xPPaXpklstTs3DQXtsdsi4PQ+orp1BCgE5IHWgBaKKKAPPvitaaPDoiazc6hJpmq2pxY3Vv/AK1mP/LMAcsD6VzPw6ll8V+LJL/xq7/8JDYxqbPT54/LSJCB+9Ve7H17fy9PufDGl33iCHWryE3F1BH5cKyndHFzksqngN71X8QeENO8QXthfyGW2v7CUSQXVudsgHdSe6n0oA6DGRg9Kg+xWn/PtD/37FT0UAVZbK08l/8ARYfun/lmK+UvDdvbWzeKNfS/Fnqml3atZA8ics0gMRX+LdgV9aS/6l/90188fBPw1pmseNvEGpX0Amm064Bt1blVZmf5iO5G3igDpvh1b2/jbWptc8STo+qWch8rRimxLToA+w9SfU1679htP+fWH/v2K53WvAthqev2evWssmnatbuC1zb9Zk7o46EEV1NAEH2K0/59Yf8Av2KPsVp/z6w/9+xU9FAHmHxN0zSdJ8nxHYzpZeIohstYowD9s9Imj/iHv2qn8NNPtvEmq3fiPxD5MniKJjCNPZAgsUHoh7nPX3ru4/B2lDxXP4knja51B1VYmnO4W4AxiMfw5ov/AAjZXniWz8QQyzWd/B8kr27bftEf9yQdxnBoA2fsNp/z6w/9+xR9itP+fWH/AL9ip6KAOP8AGfw18P8Aja3gS+haCaAny57bCsAeoPGCKXw18M/C3hnTPscGmQXRLbnmvIlldj9SOB7CuvooAyf+EW8Pf9ALTP8AwEj/AMKP+EW8Pf8AQC0z/wABI/8ACtaigDJ/4Rbw9/0AtM/8BI/8KP8AhFvD3/QC0z/wEj/wrWooAyf+EW8Pf9ALTP8AwEj/AMKP+EW8Pf8AQC0z/wABI/8ACtaigDhvH3h3Q7bwFrc0GjafFKlo5V0tUUqfUECsH4B20E3w0V5IY3b7ZKMsgJ7V2PxE/wCSd69/15vXJ/s/f8kxT/r9m/8AZaAPS/sVp/z6w/8AfsUfYrT/AJ9Yf+/YqeigCD7Faf8APrD/AN+xR9itP+fWH/v2KnooAg+xWn/PrD/37FH2K0/59Yf+/YqeigCD7Faf8+sP/fsUfYrT/n1h/wC/YqeigCpNaW6QSNHZQySBSVTYBuOOBXkFv8FrjxT4gute8Y3RiaeQsljaMMRp/Cu7tgegr2qigDE0Hwh4f8Mw+XpGlW1txguq5dvqx5P50eKNQ1rTdMWfQtLTUroyqrQtJswp6nNbdFAHmWj+G/FWi/EKTVFWCeDVoEfUZWfCxSA8hF6nC4UfTJr02iigAooooAKKKKACiq99f2umWU17ezxwW0KlpJJDgKKw7DxzoWo61DpEE04v5YzKsMls6HZjO47gMA+tAHSV89fEj/k4fwz/ANdrP/0bX0LXz18SP+Th/DP/AF2s/wD0bQB9C1xfjbxlfeEL7SXOnxTaZd3SW805kO6MseuMemfyrtK4v4l+FdQ8W6DZ2WmyRRzRX0U5aXoFXOT74znFAGxYa1d3XirU9KktUW2tI43SdHzuLZypHYjFblcHf2l3o39j+HNPv3hutTeWS61LYGldkXcTg8ZJwPYcU7wh8Q7HUtD01tau4LPUbssiLJlFlKtt+UnjJ44zQB3VFICCMggg9xS0AFFFFABRRRQAUUUUAFFFFABRRRQAyX/Uv/umvD/gB/yHvGf/AF8R/wDoUte4S/6l/wDdNeH/AAA/5D3jP/r4j/8AQpaAPZtXjuZdJultLlra48slJVUMVI56HivOdI8R694j8K+HEsNU8vWnuG+1fuQQ0SEq5fj5R0x6nFepMNylfUYrj4PDC+DvB2rJoUQm1CVZZvMfhpHOSOR2GeKAOvV1fO1gcHBwehp1eX/DnyoPEKQ2PMNxokFxebckfad7DJP94jdn6e1dzY+KNE1LUp9OtdRga+gJElsTtkXH+yeSOeooA16KKKACiiigAooooAKKKKACiiigAooooA5n4if8k717/rzeuT/Z+/5Jin/X7N/7LXWfET/knevf9eb1yf7P3/JMU/6/Zv8A2WgD1KiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAPO/iNdwxeIPC1vqZkXRmu2lnKxsytIozGpwD/F2rH8E3p174s67q97YXdvdQqLSGKWLHkxjnLHsT6V64QD1FQXd3a2Fu1zdzxW8KkBpJWCqMnA5PvQBPXzh8W5LuH45aJLYQrPep9maCJjgO4f5QT2ycV9HggjIPFfOXj2+tL/9oTw49pcxTrHc2sbmJwwVxLgqcdCPSgDtj4g+MPbwnp3/AIEL/wDFUn/CQfGH/oU9O/8AAhf/AIqvWKKAPGb+f4p6pLbyXfhCy8y3YtFJFeKjpkYODu6Eda4X4gQeKrLwLa6frPhjT9O062lAt5I5w0isc5x8xJzzmvpm6vbWyWNrq4igWRxGhkcLuY9FGepPpWH4l8G6L4ontp9bR54LQErC0hWPJ6sQKAPl7wP4r8f2t5FY+Gpr28GeLXaZUA/H7o/EV9WeGLjW7rRIZvEFnBaX7feihfcB9fep9EXSBpcR0QWn2HGIza7dhxxwRwa0aACiiq7X1ol8li1zEt3IhkSEuN7KOpA6kUAWKKq3+pWOl2/n6heQWsOcb55Agz6ZNWQQQCDkHoaAFooooAKKp/2rYf2qdL+1xfbxF532fd8+zON2PSq3iDX9P8O6Y95qFykIPyRBskyORwqgckn2oA89XxXpVh8W9Xn1HxA9tp9lbrbrBNO2xpnOSQnsB1xjnrXqkUsc8KSxOskbgMrqchgehBrwvQGtG8BaxbxGC/8AFXiN5C1pGA0kW44w/wDdCjk5x09a9j8OaUdE8OafpjSeY1rAsZb1IFAGjL/qX/3TXzJ8NNQ8X2Ou+J/+EU0m3vy9wPtHnSBNmGfbjJHXn8q+m5f9S/8AumvDfgA6jxD4yQsNxnQgZ5IDyf40Abv/AAkHxh/6FPTv/Ahf/iqP7f8AjD/0Kenf+BC//FV6feahZackb3t1DbpI4jRpXChmPRRnufSrNAHj9rqHxVsfM+yeCdHg8xtz+VKi7m9ThuTXkvxWuvEUviO0u9f0y30zVTDkfZZgxZQflY4JwRyP/wBVfXVcofh14euNfl1vULVtQvnbcr3bb1QDoAvTAoA8V+HPi34p3QiTT7WbVdPVghe8XCgf9dDj+tfSFuZmtozcKizFRvVDkA98VDa32nyXM1ha3Fu09qFEsEbDdFnplR0zTrnULKylt4rq7hhkuH8uFJHCmRvRQepoAs0UUUAFFFFABRRRQAUUUUAFFFFAHM/ET/knevf9eb1yf7P3/JMU/wCv2b/2Wus+In/JO9e/683rk/2fv+SYp/1+zf8AstAHqVFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFZuv6HY+I9FudK1GPfazrhgDgjuCD6g81pVn63pY1rSLjTmup7ZZ12tJA21wM8gHtkcfjQB4cPFWsPfjwF/wkccWnLcG2GvjIYqBxEG6b+2c1i+JdAsPDXxu8J6dpyERLNaMzsctIxl5Zj3Jr3qbwP4en8Mf8I82mxDTscRqMEH+9nru968A17Q5/Dvxr8K6bPqEt8Iri18qSUfMsfm/KpPfA70AfUFFFFAGP4o0PTPEGg3Flq2FtQPM83dtMRXkOD2I9a8Wi8W6t4jmg8Iz63jQbiZoDr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phy_806	MCQ	Engineers designed an electromagnetic transportation control system. The principle is simplified as shown in Figure A<image_1>. Two smooth metal guide rails are fixed on the insulating horizontal plane. The two guide rails are parallel and long enough, with a spacing of $1m$. The left end of the guide rail is connected to a fixed resistor with a resistance value of $R_1 = 3\Omega$. There is a rectangular area $abcd$between the guide rails, and the distance between $ab$and $cd$is $2r$. There is a vertical upward magnetic field in the rectangular area, and the change relationship between the magnetic induction strength $B$and time $t$is shown in Figure B<image_2>. Place a conductor rod on the right rail of boundary $ab$, with conductor rod resistance $R_2 = 1\Omega$and mass $m = 0.5kg$.$ When t = 0$, the conductor bar moves to the left at an initial speed of $v_0 = 3m/s$, and at $2 s $, it just enters the magnetic field area. The conductor bar is always perpendicular to the guide rail and in good contact. Regarding the process of moving the conductor rod to the left, the following statement is correct ()	['A. $0 \\sim 1s$The ampere force applied to the inner conductor rod horizontally to the right', 'B. In the magnetic field, the rate of change of the momentum of the conductor rod gradually decreases', 'C. During the entire process, the total amount of charge passing through the conductor rod was $1C$', 'D. The total Joule heat generated in the loop throughout the process was $2.25J$']	BCD	phy	电磁学_电磁感应	['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'phy_806_2.jpg']
phy_807	OPEN	"As <image_1>shown in the figure, there are two smooth parallel metal straight guides long enough in the horizontal plane. On the left side, there is a illustrated circuit composed of a DC power supply with EMF $E = 36V$, a capacitor with $C = 0.1F$and a constant resistor with $R = 0.05\Omega$. The right end and the two vertical in-plane $\frac{1}{4}$smooth arc rails with radius $r = 0.8m$are smoothly connected at $PQ$,$PQ$is perpendicular to the guide rail, and there is a vertically upward uniform magnetic field with a size of $B = 1T$in the left side of $PQ$. Place a metal rod $M$with a mass of $m = 0.3kg$and a resistance of $R_0 = 0.1\Omega$on a horizontal straight guide rail. In the figure, the rod length and guide rail spacing are both $L = 1m$.$M$is far enough away from $R$, and the resistance of the metal guide rail is ignored. At the beginning, the single-pole double-throw switch $S_1$is closed, and the switch $S_2$is closed to fully charge the capacitor; then the $S_1$is disconnected, and at the same time, the $S_2$is connected to ""1"", and the $M$starts to accelerate from rest until the speed is stable; When $M$moves at a constant speed to a distance of $d = 0.405m$from $PQ$(the speed has stabilized), immediately connect $S_2$to ""2"" and release the insulating rod $N$with a mass of $m_2 = 0.1kg$that is stationary at the highest point of the circular arc track. The first elastic collision occurred at $PQ$. It is known that after the collision between $N$and $M$,$M$has been stationary before each collision. All collisions are elastic collisions and the collision time is extremely short.$M$and $N$are always perpendicular to the guide rail and in good contact. Gravity acceleration $g = 10m/s^2$, find: the total displacement of the metal rod $M$from the first collision to the end when both rods are stationary."		0.18m	phy	电磁学_电磁感应	['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phy_808	MCQ	<image_1>There is a square wire frame with a number of turns of $n$, a side length of $L$, a total mass of $m$, and a total resistance of $R$. It falls freely from somewhere above the magnetic field, as shown in the figure. The magnetic induction intensity of uniform magnetic fields in regions I and II is both $B$, and the widths of both are $L$and $H$respectively, and $H &gt; L$. The wire frame enters Area I at a uniform speed, and leaves Area II at a uniform speed after a period of time. It is known that the plane of the wire frame is always perpendicular to the magnetic field, and the lower side of the wire frame remains horizontal, and the gravitational acceleration is $g$. The following statement is correct ()	"['A. The speed at which the leadframe leaves magnetic field region II is equal to $\\frac{mgR}{nB^2L^2}$', 'B. The acceleration when the lead frame first enters Area II is $g$, and the direction is vertical and upward', 'C. The elapsed time for the lead frame from the beginning of entering Area I to the time it completely leaves Area II is $\\frac{6n^2B^2L^3}{mgR}$', ""D. Minimum speed of the wire frame after entering the magnetic field $v' = \\sqrt{\\frac{m^2g^2R^2}{n^4B^4L^4} - 2g(H-L)}$""]"	CD	phy	电磁学_电磁感应	['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']	['phy_808.jpg']
phy_809	MCQ	The <image_1>device shown in the figure is horizontally placed in a uniform magnetic field with a vertical downward direction and a magnetic induction intensity of $B$. The power supply electromotive force is $E$, the internal resistance is $R$, and the spacing between two parallel and smooth guide rails is $d$and $2d$respectively. The conductor rods $b$and $c$of uniform material are both $2d$in length,$R$in resistance, and $m$in mass. They are placed vertically on the guide rail, which is long enough and does not count resistance. During the entire process from closing the switch to reaching a stable state between the two conductor rods, the following statement is correct ()	['A. Before stabilization, both the $b$and $c$rods perform accelerated motion with reduced acceleration', 'B. The accelerations of the $b$and $c$rods are always the same before stabilization', 'C. When stable, the speed of the conductor bar $b$is $\\frac{2E}{5Bl}$', 'D. The Joule heat generated in the conductor bar $b$is $\\frac{mE^2}{50B^2d^2}$']	AD	phy	电磁学_电磁感应	['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phy_810	MCQ	As <image_1>shown in the figure, there is a uniform magnetic field with a width of $d$between the two parallel boundaries. The magnetic field area is long enough. The magnetic induction intensity of the uniform magnetic field is $B$, and the direction is perpendicular to the paper and inward. On the left side of the magnetic field, there is a square metal conductor wire frame with a length of $d$. The mass of the wire frame is $m$and the resistance is $R$. The wire frame is in the paper, and the $CD$edge is parallel to the left boundary of the magnetic field. Now external force is used to make the wire frame pass through the magnetic field area at a constant speed of $v$. The angle between the direction of velocity $v$and the left boundary is $\alpha$. When the wire frame passes through the magnetic field region at a constant speed, the following statement is correct ()	['A. The ampere force applied to the wire frame as it passes through the magnetic field is in the opposite direction to the speed $v$', 'B. The amount of charge passing through the cross-section of the conductor of the wire frame as the wire frame moves from the $CD$edge to the left boundary of the magnetic field to the $AB$edge to the left boundary of the magnetic field is $\\frac{Bd^2}{R}$', 'C. The heat generated in the wire frame during the entire process of passing through the magnetic field is $\\frac{2B^2d^3v\\sin\\alpha}{R}$', 'D. If you only give the wire frame an initial velocity of $v_0$, the velocity direction is still at an angle of $\\alpha$with the left boundary, and the $CD$side of the wire frame just does not pass through the magnetic field. During this process, the impulse of the wire frame subjected to ampere force is $mv_0$']	BC	phy	电磁学_电磁感应	['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9OudRTUJ7OGW6jXbHLIu4oOvGelAHjQ8YeKfE+jaMde8NPYxjUrcrehtiSfN2RufxGRXudZet6Hb65DbRXDuot7hLhdndlOQPpWpQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf//Z']	['phy_810.jpg']
phy_811	MCQ_OnlyTxt	New energy vehicles are increasingly favored by consumers because of their advantages in environmental protection and intelligence. New energy vehicles will gradually replace traditional fuel vehicles and become the mainstream of family vehicles. The relevant data in the manual of a domestic pure electric four-wheel drive SUV is as follows: it weighs $2440\,\text{kg}$, is equipped with a $108.8\,\text{kWh}$large-capacity battery, and has a battery energy density of $150\,\text{Wh/kg}$. The cruising range (the maximum distance the car can travel when fully charged) is $635$kilometers, and the power consumption per 100 kilometers is $17.6\,\text{kWh}$. The top speed reaches $180\,\text{km/h}$. Zero to $100\,\text{km/h}$Acceleration time $4.4$seconds. Which of the following situations can a car be regarded as a particle ( )	['A. When reversing into the warehouse', 'B. When checking the speed on the highway', 'C. When avoiding obstacles', 'D. When determining liability in a traffic accident']	B	phy	力学_运动的描述	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAGoA3YDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD5/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA7r4V+BrPx94kutNvrue2igtGnDQAbiQ6rjkHj5qyfH3hy38JeNtR0O0mlmgtTGFklxuO6NWOcADq1d/wDs3/8AI96n/wBgxv8A0bHXM/Gn/krmu/70P/oiOgDgqKKKACipntLmOISyW8qRno7IQD+NQ0AFFOjikmcJEjO56KoyTT5ree2fZPDJE3o6lT+tAEVFFFABRSqjOwVFLMegAyammsru3QPPazRKejPGVH60AQUUUUAFFFTrZXbw+ctrM0X98Rkj86AIKKKKACiiigAoqdbG7aHzltZzF/fEZ2/nUFABRRRQAUVP9huzB5/2Wfyf+enlnb+dQUAFFFFABXe/C34dP8QNanS4mkt9Ms1VriWMfMxJ4Rc8AnBOecY6VwVfS/7OMSReCNWuv4m1AqfosaEf+hGgCtqei/AvwzfSaTqYQ3cZxKPNupSh9CUJAPtXz7qosxrF6NPObEXEn2fr/q9x29eemOvNQ3d1Le3k93O5eaeRpHY9SzHJP5moaACigDJwOtWTp96sfmNZ3Aj/ALxiOPzxQBWooooAKKKKACipmtLlIBO1vKsR6SFCFP41DQAUUVJb28t3cxW0EbSTSuI40XqzE4AH40AaXh3wzq/ivVU03RrN7i4I3NjhUX+8zHgCvbtH/Zz0+1tBc+JvEEgwuZEtAsaJ/wBtHByP+AiuvtodG+CHwyM8qJNekDzCOGu7kjhQeyjn6AE9evzX4p8Z674x1BrrV715F3Ex26kiKIeir0H16nuTQB7cfhX8In/0dfFKCb1XVoC/5Yx+lZ+u/s4o9sLjwxrnm5GVivgCH+kiD/2X8a8CrqPBvj/XfBN+k2m3Tta7szWUjExSjvx2PuOf5UAY2s6LqPh/VJtN1W0ktbuI4aNx+RB6EHsRwaoV9W+LNF0v4x/DWHVtKVRfpGZbRiPnRx9+FvqePrg9K+UiCDgjBFABRRSqpZgqgknoBQAlFTzWd1bqGntpolPQuhUH86goAK93+MvgPwz4Y8A6bf6NpaWt1JexRPKJHYspikJHzEjqoP4V4RX01+0J/wAkx0n/ALCMP/omWgD5looooAKKKKAPYvh38JfDvi3wjDq+pa5cWtxJK6GKN41ACnA+8Ca6v/hQHg7/AKGe8/7+w/4V85UUAfSbfs6eF0h85te1FYsA7y0QXB6c7ah/4UB4O/6Ge8/7+w/4Vp+N/wDk2O2/7Bmnf+hQ18v0Aeq/FD4ZaD4J0C0v9K1ee9mmuhCySOjALtY5+UZ6gV5VRRQAUUUUAFFFe/fDPRbUfATxTfz2sMk00V60cjxgsqrBgYJ6chqAPAaKKKACiiigAooqWC1uLkkQQSykdo0LfyoAiopzxvE5SRGRh1DDBFNoAKKKKACiiigAooooAKKKnWxu2h85bWcxf3xGdv50AQUUUUAFFFTyWN3FCJpLWZIj0doyB+dAEFFF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phy_812	MCQ	A student designed a voltage stabilizing circuit as shown in the figure<image_1>. The primary coil of the ideal transformer is connected to a sinusoidal AC power supply with a voltage of $U_0$through a transmission wire. The transmission wire has a certain resistance value of $r$, and connected in parallel to the secondary coil. Electrical appliance $R_0$, sliding rheostat $R$, and $P$are the sliding blades of the sliding rheostat. By adjusting the sliding piece $P$to simulate the change of the power grid load, the number of turns connected to the circuit by the sliding contact $Q$can be adjusted. Adjust $Q$to change the number of turns connected to the circuit according to the change of load, realizing the electrical appliance. The voltage is stable and the effective value of the power supply voltage remains unchanged. When only the sliding blade $P$of the load-sliding rheostat is moved upward, the following statement is correct ()	"[""A. The voltmeter's $V$indication becomes larger"", 'B. Reduction in efficiency of transmission line transmission', 'C. The frequency of magnetic flux changes in the transformer core becomes larger', 'D. In order to ensure that the voltage across the appliance $R_0$remains unchanged, the contact $Q$on the secondary coil can be moved down']"	B	phy	电磁学_交变电流	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAC/AX8DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiik3L/eH50AJJu8p9hUPg7S3TPvXDeG/E/ijxFAl3Bp2niyW+aB5S7KZIlJBdBntj3z+FddqpvG02ddOEDXTLtTznKqM98gHpWV4J0i68PeFbTSb37OJLYFQ0MhYPk5JOQMEknigZ0VFJuX+8Pzo3A9xQIWiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKQkDqQKWuF8TaTaa58QtFsL9ZJLY2NxIUWRkywZMH5SPU0Aa3j5lPgDXeR/wAecnf2qrYeAPCUmnWzv4e09maJSSYRycCsbxh8P/D9l4O1a5tLKYXEVs7R/wCkSNyBxwW5rSsfiR4Ui0+2jfU3DpEqsPss3BA/3KQ/Q0P+Fe+EP+hc07/vwKP+Fe+EP+hc07/vwKr/APCzPCX/AEFH/wDASb/4ij/hZnhL/oKP/wCAk3/xFGgalj/hXvhD/oXNO/78Cue1zRvDXhLxR4Zv7e0sNLjNzKss+FiXHlNgEn3rZ/4WZ4S/6Cj/APgJN/8AEVjal4h0Hxb4r8NWtlIL1Y7iV5UktnCgeU2Cd6gdaA1Og1D4g+FNO0+e7bXbCcRLu8q3uEkkf2VQeTVDw58VPC3iC0kma/i05422mK+lSJj6Ec4IrZ1Pwf4f1TTZ7K40q0WKZdpaKJUYe4IGQa5T4X+DtCtfCEV2bCKee6dzI9wgkPyuygDI4GBQGh1f/CaeFv8AoY9J/wDAyP8Axo/4TTwt/wBDHpP/AIGR/wCNWv8AhHtF/wCgRYf+Ayf4Uf8ACPaL/wBAiw/8Bk/wpgVf+E08Lf8AQx6T/wCBkf8AjW0jrJGrowZGAKsDkEHvXJ+NND0mHwTrUsWl2SSLZSlWWBQQdp5BxXQ6N/yA9P8A+vaP/wBBFAi7RRRQAUUUUAFFFFABRRRQAUUUUAFZFz4q8PWVzJbXWu6bBPGcPHJdIrKfQgniteuH8K6Xp99q3imS7sbadxqzgNLErEDYnGSKANz/AITTwt/0Mek/+Bkf+NH/AAmnhb/oY9J/8DI/8atf8I9ov/QIsP8AwGT/AAo/4R7Rf+gRYf8AgMn+FAyr/wAJp4W/6GPSf/AyP/Gj/hNPC3/Qx6T/AOBkf+NWv+Ee0X/oEWH/AIDJ/hR/wj2i/wDQIsP/AAGT/CgCr/wmnhb/AKGPSf8AwMj/AMaP+E08Lf8AQx6T/wCBkf8AjVr/AIR7Rf8AoEWH/gMn+FH/AAj2i/8AQIsP/AZP8KAOf8QfFDwtoOni6GpQag5YKsNjMkjn3PPA96s6T8RfCurabDerrVla+YMmG6nSORD6FSayfiT4Q0K78E38/wDZ8EE1pGZopIECEMPXA5HtW34f8G+H9K0O0tYNLtnVYwxeaJXdieSSSKQaWLH/AAmnhb/oY9J/8DI/8aP+E08Lf9DHpP8A4GR/41a/4R7Rf+gRYf8AgMn+FH/CPaL/ANAiw/8AAZP8KYFX/hNPC3/Qx6T/AOBkf+NH/CaeFv8AoY9J/wDAyP8Axq1/wj2i/wDQIsP/AAGT/Cj/AIR7Rf8AoEWH/gMn+FAFUeM/C5OB4j0nP/X5H/jW2CGAIIIPIIrj/HGiaTB4J1eWHTLOORbclXSBQQfY4rrLX/jzh/65r/KgRLRRRQAUUUUAFFFFABRRRQAVyeof8lS0X/sG3X/oUddZXJ6h/wAlS0X/ALBt1/6FHQNHWUm1f7o/KlooEJtX+6Pyo2r/AHR+VLRQAm1f7o/KgKB0ApaKAA9K5b4c/wDIiaf9Zf8A0a9dSelct8Of+RE0/wCsv/o16AOpooooAwPHH/Ii67/14y/+gmtLRv8AkB6f/wBe0f8A6CKi8Q6bJrHh3UdNidUkurd4lZugLDGTWDpuu6joU1hpHiOxigSQLb21/bSFoZHxgIwPKMccZ4NAzsKKKz9b1eHQtIm1G4R3ii25VMZOSB3+tAjQooooAKKKKACiiigAooooAK5LwX/yEvFX/YXf/wBFpXW1yXgv/kJeKv8AsLv/AOi0oA62iiigAooooAKKKKAOc8ff8iHrX/Xq1bll/wAeFv8A9cl/kKw/H3/Ih61/16tW5Zf8eFv/ANcl/kKAJ6KKKACiiigDnPHv/Iiaz/17NW9a/wDHnD/1zX+VYPj3/kRNZ/69mretf+POH/rmv8qAJaKKKACiiigAooooAKKKKACuT1D/AJKlov8A2Dbr/wBCjrrK5PUP+SpaL/2Dbr/0KOgaOsooooEFFFFABRRRQAHpXLfDn/kRNP8ArL/6NeupPSuW+HP/ACImn/WX/wBGvQB1NFFFABXN+P0gfwJrBnwAtuzofSQcpj33YrcvpbiCwnltLb7TcIhaOHeE8xscDJ4GfWvO7XUb/wAU+JYNM8WQf2PHC4lg0sgsLxl5BMv3XCnB2j8aBo9D09pX021abPmmFC+f72Bmuf8AiL/yI2ofWP8A9GLXU1y3xF/5EbUPrH/6MWgSOpHSigdKKACiiigAooooAKKKKACuS8F/8hLxV/2F3/8ARaV1tcl4L/5CXir/ALC7/wDotKAOtooooAKKKKACiiigDnPH3/Ih61/16tW5Zf8AHhb/APXJf5CsPx9/yIetf9erVuWX/Hhb/wDXJf5CgCeiiigAooooA5zx7/yIms/9ezVvWv8Ax5w/9c1/lWD49/5ETWf+vZq3rX/jzh/65r/KgCWiiigAooooAKKKKACiiigArk9Q/wCSpaL/ANg26/8AQo66yuT1D/kqWi/9g26/9CjoGjrKKKKBBRRRQAUUUUAB6Vy3w5/5ETT/AKy/+jXrqT0rlvhz/wAiJp/1l/8ARr0AdTRRRQAVzfjyyiuvB2ozsQk9nE13byj70ckY3KQe3TH41uX15Hp9hPeSrI0cKGRljXcxAGeB3Nefp4h/4WZPJo9gjWelRMDfNcMFnmXOdipnKg45Y9qBo77Tbh7vS7S4kGHlhR2HoSAawPiL/wAiNqH1j/8ARi11CIsaKigBVGAB2Fcv8Rf+RG1D6x/+jFoBHUjpRQOlFAgorH/4SnRTrS6Ol8kl+TtMUal9p/2iBhfxNbFABRRRQAUUUUAFcl4L/wCQl4q/7C7/APotK62uS8F/8hLxV/2F3/8ARaUAdbRRRQAUUUUAFFFFAHOePv8AkQ9a/wCvVq3LL/jwt/8Arkv8hWH4+/5EPWv+vVq3LL/jwt/+uS/yFAE9FFFABRRQTgZPSgDnPHv/ACIms/8AXs1b1r/x5w/9c1/lXF+N/FGg3PgzV7eDWLGSZ4GVY0nUsT6AZrd0/wAUaDcJbW8OsWMkzqqLGs6licdAM9aBm5RRVW/1Kx0uETX93DbRsdoeZwoJ9MmgRaorOtPEGj38whtNUs55T0SOZST+Ga0aACiiigAoozRmgAriNT1Owj+K2jxve2yuthcRsrSqCGZo8KeepwcCu1bJQhTg44NeSW8+h2fg+90LWNOeXxJJ5oliNqzy3M5J2yK+ORyMNnikNHrtFZ+hRXdvoGnw37F7xLeNZmJyS4UZ5781oZpiCijNGaACijNGaAA9K5b4c/8AIiaf9Zf/AEa9bmoavpulRh9Qvre1U9DNIFz9M1yfw01zSpvCdjYx6jatdqZcwiUbxmRiOOvQ0D6Hc0UZozQIK5TxxpSf2RNr1mqw6rpcbXME6jBIUZZG9VIBGDXTXFzDaW0lxcSrFDEpZ3c4CgdSTXE6zr8XjK3k8P8AhtzdR3P7u8v0B8mCI/eAbozEcAD1oGjs7G5F7YW10owJolkA9MjNc98Rf+RG1D6x/wDoxa6WCFLe3jgjGEjUIo9gMCuZ+Iv/ACI2ofWP/wBGLQJHVDpXOeNr26tdCjt7KUw3N/cxWaSjrHvOCw9wuce9dEDxWT4l0b+3tFks0mME6sssEwGfLkQ7lP5j8qALGkaPY6Hp8dlYQLFEg7Dlj3JPcn1q/XE2fxEs7TUYdE8Rxtp2ssVj2qpkilYnAKMucA++MV22aACijNGaACijNGaACuS8F/8AIS8Vf9hd/wD0WldbmuS8F/8AIS8Vf9hd/wD0WlAHW0UZozQAUUZozQAUUZozQBznj7/kQ9a/69Wrcsv+PC3/AOuS/wAhWH49/wCRD1r/AK9Wrcsv+PC3/wCuS/yFAE9BIAyTgDvRmquo/Z/7MujdosluImMqMOCuOQfwoAnE0ROBIhPswom/1Mn+6f5V4t4S/wCENT4fLcaobSfVp/NkEMT5uASx2IgB3A4xj0r0XwRDrFv4FsY9deR9Q8ol/MOXAOdoY+oGM0DaM/4f6Lpdx4G0yWfTbOWRkYs7wKSfmPUkUnjLStOsn8PS2thawSf2xbjdFCqnGT3Aq/8ADn/kQdK/65t/6Eaj8d9PD3/YZt/60g6nW1wvxcnSPwFPAxwbqeKAcZPLgnH4A11Wp65pmjqjahewwFzhFZvmc+iqOSfoK5nxlp+razq+g/ZdMkmsLC9W8mPmopkKj5QAT6k5zTBGL4qW28W2Gn6T4bsZXu0nif7f9laJLVF6newHPsOtenjgAUA5AJGPaloEFcTHqmtXXxLutEh1BV061tUuZf3ClgzNwmfTHfrXbVwXhCWOTx940nmZUnW4hiCscERqnB+hoGa93c6o/je3062vxHaG1a5mj8lSRhlUAH3y35V0tchbatbLqmveISGks4VisoXTnzSpO4J65dwv1Fb+naot9cXds8RhurRlWWMtu4ZQykHuCP1BoA0KTAznAzVa+W8kjWOzdImY/NMw3bB7Duf0/lVTGs2SdYdRUdj+5kx9eVJ/75oEatFUbG5vrqR3uLI2kIGFSR1Z2Pr8pIA/HP0q9QAUUUUAFc94n1m7svsml6UqNq2oMUg3jKxKOXkYeijt3JFdDXKwATfFG8aXk2+lxCHPYNI24j/vlfyoAzobbwb4dvzFrF9Bd60+DLPf/vJXOM/KDwo9l4rQ8SQeDIwlrrkVjC8ozGSmx/Yqy8g8djVf4k2kqaHb67ax7rvRrlLxcdSg4dfoVP6VZa5t/EXirSlgPmWllbf2gW7F5Bti/wDHfMP5UhkOj3d54f1uDQNQunvLG7Qtpt5KcvwMmJz3IHIPcA12Fcp49ATS9OuU/wBfBqds0RHXJcKR/wB8k11dMQyaGO4heGaNZInBVkcZDD0Iri/EPh6Dw5bTeJPDkK2V1Zr5txbw/LFdRLyyso4zjJBHOa7euS8Z6zG+nS+H9OdbjV9Sja3jhQ5MasMM7f3QASeaBo6e0uUvLOG5i5jmjWRfoRkVznxF/wCRG1D6x/8Aoxa6GwtFsNOtrNDlYIljB9gMVz3xF/5EbUPrH/6MWgEdSOlc/wCMdSu9O0MLYMEvbyeO0gcjIRnbG78Bk/hXQDpWL4p0eXW9De3tpRFeRSJcW0jdFkQ7lz7HGPxoELonhjS9CgC29ur3B5lupRvllbuzMeSa2a5XTvHemyXMWm6wTpOsEhWtLn5QzZx8jdHBPTBrob7ULPTbZri+uobaFeryuFA/E0AWaKw/D/izS/E73J0l5J7e3YI1yUKozei55PH8xW3keooAWikyPUUZHqKAFrkvBf8AyEvFX/YXf/0WldZkeork/Bf/ACEvFX/YXf8A9FpQB1tFFFABRRRQAUUUEgDJ6UAc749/5ETWv+vVq27L/jwt/wDrkv8AIVxXjXxf4cu/Bmr29vrlhLNJbsqRpOpLH0AzW5pfi3w7cx2lrBrdhJcOqosSTqWLY6AZ60hnQVzfju6uIfCOowWdpdXN5c27xQx28LSHJGOcDjr39K6SimI8u1XQ7iDwZ4Z1TSNNnk1LQ3hLQeQySyLgLIuCMn/9dekQ3IvNOFwscsYkj3bJUKOvHQg8g1Zpk3+pk/3T/KgDmfhz/wAiDpX/AFzb/wBCNVviHB9ptNDg82SLzNXgXzIzhlznkHsas/Dn/kQdK/65t/6Eaj8ddPD3/YZt/wCtLoPqcFqvwd1W28RQ6zY6vcaikcqyMk0uy5AB52ueCR2ziu/HgkFQf+Ei8QDI6G9/+tXV0UWC5554l0O48P6fb39r4g1qSQXtvGUmutysrSqpBGPQ16IOlcn8Qv8AkW4f+whaf+jlrrB0pgFZGo+GND1e5W51DSrS5nUYEkkYJx6Z71r0lAjI1rRVvvDsmmWaRQbfLaFQNqKyOHUcdBlRSaVpk0Gq6nqdyFSW9MaiNW3BURcDn1yW/StiigAopGJCEqMnHArym2trLUPBl54m1LWLqHXI/MaSQXTJ9llUnEQTOAOANpHNAHq9FUNDuLq70HT7m9TZdS26PKuMYYqCeO3NX6ACiiigArlPFEVxpWrWXii0heZbVGt76GMZZ7djncB3KkZx6E11dFAFKGew17SS8Esd1ZXUZXchyGUjBFc/4C8MXHhXRZ4L6cTTtMcSE5xCvyxj8FGfxNT3XgmwN293pl3e6RPId0n2CXYjn1ZCCpPvisHwv4fk8U+HbTUNe1rVL1ZS4e1MwjiYK5XBCAEjjuaQzRe4HjDxTaJZnzNG0iUzSzjlJ7gAhUU9wuSSfXFdnUNpaW9jax21pBHBBGNqRxqFVR7CpqYiG7tIL+zmtLqMSQTIUkQn7ynqK4S98NwfD9pfEPh1Gjs0wdQsSdyvEOroTkhlznGcHFeg1zHjvUUg8N3GmRYl1DVEa0tYB952cbScegByT7UDR0kUqTQpLGco6hlPqDXM/EX/AJEbUPrH/wCjFrodPtvsenWtqTu8mJY8+uABXPfEX/kRtQ+sf/oxaBI6kdKw/Fmr3Gj6GZLJFa9uJUtrYN08x2wCfYcn8K3B0rC8XaVc6toZWxKi+tpo7q23dC6NkA/UZH40AQaV4I0iwdLu7gXUdUyGkvrsb5Gb1GeFHoB0pvivwHofjGMf2lDILhV2xzxOVZP6H8RU2j+MtI1UrbvcpZ6iuFlsblgksb+mD1+o610FAzzXw18INI0c3VvqUFvqduzB4JpAySr2KsAcEcZB+tb/APwrXwf/ANAK3/76f/Glu/EF9qXiiXw/oZija0RZL68lTeIt33UVcjLEc88AetRR61qejeM7HQdUuYry31KJ3tbgRCN0dBllYDgjHQjFINST/hWvg/8A6AUH/fT/AONH/CtfB/8A0AoP++n/AMa6uinYVzlP+Fa+D/8AoBQf99P/AI1taPoWmeH7V7bSrNLWF33siE8tjGefoK0aKACiiigArL1PxFpOjTRQ6heJBJLgRhlPzE9hgdfatSvO/HV4W8c+ErNbae5WCSW9lit03Odq4U4+pNAI7Cy8R6RqF39ktr+J7nG7ySdrkeoBwTWjL/qX/wB0155ZTSfEDxbpWuWds9ppeiySq0k+BLNKQAU2gnaB3z616HL/AKl/900AzkvhxaW7/D3RmeCJmMJySgJPzGl8Z28EUvh1o4Y0b+2IOVUD1qT4a/8AJO9F/wCuJ/8AQjR42+/4d/7DNv8A1pD6nV0UUUxBTZAWicDqQQKdRQB5zo+saz4N8HRQ6h4YumisY2MkyXEWMbicgZz3q1qs2u+I59FQeHLi0hg1CG6kmkuImARc54Bz3ra8e/8AIiaz/wBezVu2v/HpD/1zX+VIZLRRRTEcp8Qv+Rbh/wCwhaf+jlrrB0rk/iF/yLcP/YQtP/Ry11g6UDCkpaSgQUUUUAFcJqmi6XN8VtIkk0+2Z5LK4lcmIHc6sm1j6kZPNd3XJ6h/yVLRf+wbdf8AoUdA0dZRRRQIKKKKACiiigAPSuW+HP8AyIun/WX/ANGvXUnpXLfDn/kRdP8ArL/6NegDqaKKKAILy2F7ZTWzSyxCVCheJtrrnuD2NefPoDfD7VG8QxzS6nYSFY7t7w+ZcWyE43o/dRnkelekVzfjy8itfBupROA8t3C1rBEOWkkcbVAHc5OfwoGjo1ZXQMpBVhkEdxXL/EX/AJEbUPrH/wCjFrf0yB7XSrS3kOZIoURj6kAA1gfEX/kRtQ+sf/oxaBI6kdKxvE+svoeiSXUEQmundILeInh5XIVQfbJyfYVsjpXPeM9Ou7/QlksIxJeWVxHdwxk48wo2Sv4jIoApWPgDT3vIdW15n1XWVIc3EzEJGwOcIg4UA9K66srRPEWm6/aLPZXCl+kkD/LJE3dWU8gitWgDy/wlq9l4V1PxbFrAnS8bVJLmR1gZ/wBwQCjkgHC/erSj2+LfiTYapZMJdK0WBwLleVlmkGNqnvgYJPrXXahoelaq6vf6dbXLqNoaWIMQPTPp7VU8OeGbbwxBNbWNzdPaO5aK3mcMkGSSQnGcc9yaQ7m3RRRTEFFFFABRRRQAVxi6Lrz/ABGXxBNbWP2NLT7Iii6YuoL5L42Yzjtn8a7OigDg49E1vwvqvii+01beTS76NruKIyHzIrgIc4Xbghm9/SrWhySRatbQQyPJbTaIk8zMxbMm4AMfdgWye+PauyIyMHpVSKwtLGKX7LbRQ7lwdigZAzgfQelA7nP/AA1/5J3ov/XE/wDoRo8bff8ADv8A2Gbf+tHw1/5J3ov/AFxP/oRo8bff8O/9hm3/AK0g6nV0UUUxBRRRQBzvjz/kRNZ/69mrdtf+PSH/AK5r/KsLx5/yIms/9ezVu2v/AB6Q/wDXNf5UAS0UUUAcp8Qv+Rbh/wCwhaf+jlrrB0rk/iF/yLcP/YQtP/Ry11g6UDCkpaSgQUUUUAFcnqH/ACVLRf8AsG3X/oUddZXJ6h/yVHRf+wddf+hR0AdZRRRQAUUUUAFFFFAAelct8Of+RF0/6y/+jXrqT0rlvhz/AMiLp/1l/wDRr0AdTRRRQBBeRTT2c0VvcG2mdCqTKoYxnscHg49687fTNR8K+Iodc8SXja7ZbhGl5IuxrAtxu8sfLtPALDkV6XWB43mt4fBGsm5wUa0kQA92ZSFA98kUDRvAggEHINcv8Rf+RG1D6x/+jFrc0aOaHRLCK4z5yW8ayZ/vBRmsP4i/8iNqH1j/APRi0AjqR0ooHSigRw3xI0HSpPDd7qzWEH9oRGIpchMOD5ijqOvBrt0/1a/QVzPxE/5ETUv+2X/o1K6ZP9Wv0FAx1FFFAgooooAKKKKACiiigAooooAKbIC0bAdSCKdRQB5vpOpeI/BPgqGC98M+ZDp8J8yZL6PkZJyB171evj4j8RXOimTw8LO3t76K6eU3kb/IvsOe9bHj3/kRNa/69Wrbsv8Ajwt/+uS/yFIZPRRRTEFFFFAHO+PP+RE1n/r2at21/wCPSH/rmv8AKsLx5/yIms/9ezVu2v8Ax6Q/9c1/lQBLRRRQBynxC/5FuH/sIWn/AKOWusHSuT+IX/Itw/8AYQtP/Ry11g6UDCkpaSgQUUUUAFcnqH/JUtF/7Bt1/wChR11lcnqH/JUtF/7Bt1/6FHQB1lFFFABRRRQAUUUUAB6Vy3w5/wCRF0/6y/8Ao166k9K5b4c/8iLp/wBZf/Rr0AdTRRRQBieLdWudE8M3WoWaxNcRmNUEoJXLOq84I9aoW/hi/wBQv7e+8Saml6LdhJBZwReXAjjoxBJLEdsninfEP/kSb3/rpB/6OSunX7g+lAxao6vpVtremS6fd7/Ilxu2HB4II/UVeooEFFFFAHL/ABE/5ETUv+2X/o1K6ZP9Wv0Fcz8RP+RE1L/tl/6NSumT/Vr9BQA6iiigAooooAKKKKACiiigAooooAKKKKAOd8e/8iJrX/Xq1bdl/wAeFv8A9cl/kKxPHv8AyImtf9erVt2X/Hhb/wDXJf5CgCeiiigAooooA53x7/yIms/9ezVu2v8Ax6Q/9c1/lWF49/5ETWf+vZq3bX/j0h/65r/KgCWiiigDlPiF/wAi3D/2ELT/ANHLXWDpXJ/EL/kW4f8AsIWn/o5a6wdKBhSUtFAhKKWigBK43xImrWfjLStY0/R5tShhtJ4ZFikRCpZkI+8R/dNdnRQByH/CVeIf+hI1H/wJh/8AiqP+Eq8Q/wDQkah/4Ew//FV19FAzkP8AhKvEP/Qkah/4Ew//ABVH/CVeIf8AoSNQ/wDAmH/4quvooA5D/hKvEP8A0JGof+BMP/xVH/CVeIf+hI1H/wACYf8A4quvooEeeeIvFXjD/hH7z+zPCN9bXfl/JM0kUmz1O0EknGcVy/wt1/xhZaDNbz+Hb3UbJJP9HcFIihJJYfMRkZP869ropWHc5D/hKvEP/Qkah/4Ew/8AxVH/AAlXiH/oSNQ/8CYf/iq6+imB534i1HxH4g0WXTE8IXsBmkiPmvcREKFkViThvQV6EowoHtTqKBCUUtFACUUtFAHPeN7G71LwdqFpYwGe5cIUiBALYdTjJ46A1QXxT4hCgf8ACEahwP8An5h/+KrsKKAOQ/4SrxD/ANCRqP8A4Ew//FUf8JV4h/6EjUP/AAJh/wDiq6+igDkP+Eq8Q/8AQkaj/wCBMP8A8VR/wlXiH/oSNQ/8CYf/AIquvooGch/wlXiH/oSNQ/8AAmH/AOKo/wCEq8Q/9CRqH/gTD/8AFV19FAHIf8JV4h/6EjUP/AmH/wCKo/4SrxD/ANCRqH/gTD/8VXX0UCOQ/wCEq8Q/9CRqP/gTD/8AFUf8JV4h/wChI1H/AMCYf/iq6+igZyH/AAlXiH/oSNR/8CYf/iqP+Eq8Q/8AQkah/wCBMP8A8VXX0UAeO/EzxD4vu/Cz29t4avrC3kbbcylklJT0wpJAz3rX8IeKPGK+GLNdS8KX15OFwJ1kji3r/CSrEEHHtXpdFILnIf8ACVeIf+hI1D/wJh/+Ko/4SrxD/wBCRqH/AIEw/wDxVdfRTA5D/hKvEP8A0JGof+BMP/xVH/CVeIf+hI1D/wACYf8A4quvooA8d+JniHxfeeFmt7bw1e2FtI225lZklJT0wpJAz1Na/hDxT4wHhmzGpeFL68n28TrJHHvX+ElWIIOPavS6KVguch/wlXiH/oSNR/8AAmH/AOKo/wCEq8Q/9CRqH/gTD/8AFV19FMR55r174i8RWdvYDwle2o+2QStNJPEQqpIrHgNnoK9DHSiigD//2Q==']	['phy_812.jpg']
phy_813	MCQ	The turn ratio of the primary and secondary coils of an ideal transformer is 1:3, and the line is connected with five fixed resistors R_1, R_2, R_3, R_4, and R_5 with the same resistance value. As <image_1>shown in the figure, a sinusoidal alternating current is connected between A and B, then the following statement is incorrect ()	['A. The ratio of the voltages across R_1, R_2, and R_3 is 7:1:2', 'B. The ratio of currents passing through R_1, R_2, and R_3 is 7:1:2', 'C. The power ratio of R_1, R_2, and R_3 is 49:1:4', 'D. The ratio of input power between A and B to transformer input power is 28:3']	B	phy	电磁学_交变电流	['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phy_814	MCQ	As <image_1>shown in the figure, there is a uniform magnetic field with a radius R=a in the xoy plane. The magnetic induction intensity is B, and the direction is perpendicular to the paper. There is a particle source at the center of the circle. The particle source emits positively charged particles of the same kind in all directions along the xoy plane. The number of particles emitted by the particle source in all directions is evenly distributed, and the velocity of the emitted particles is equal, the amount of charge is q, and the mass is m. There is a vertical baffle placed parallel to the y-axis at x=\frac{a}{2}. The baffle is long enough to intersect with the circular magnetic field area at points A and B respectively. The coordinates of point C on the baffle are\left(\frac{a}{2},\frac{a}{2}\right). The particles emitted from the particle source just hit the baffle, and it was found that particles from two different directions hit the same position on the baffle. If the gravity of charged particles is ignored and the particles are absorbed when they hit the baffle, the following statement is correct ()	['A. The corresponding velocity of the particle is v=\\frac{qBa}{m}', 'B. The length of the area on the baffle where particles in two different directions hit the same position is\\frac{\\sqrt{3}-1}{2}a', 'C. If the baffle can rotate around point C, ensure that all particles hit different positions on the baffle, the baffle must be rotated counterclockwise at least 45^{\\circ}', 'D. If the radius of the area of the circular magnetic field is set to R=\\frac{a}{2} and the center of the circle is moved to\\left(0,\\frac{a}{2}\\right), the particles that can hit the baffle will hit the vertical baffle vertically, and the number of particles hitting the AC area is less than the total number of emitted particles\\frac{1}{2}']	BC	phy	电磁学_电磁感应	['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phy_815	MCQ	As shown in Figure A<image_1>, the angle between a smooth and long enough fixed slope and the horizontal plane is 30^{\circ}. There is a uniform magnetic field perpendicular to the slope and downward between two parallel horizontal dotted lines MN and PQ on the slope; there is a uniform magnetic field perpendicular to the slope and upward in the area below PQ, and the magnetic induction intensity of the uniform magnetic field on both sides of PQ is equal. The resistance values of the four sides of the square lead frame abcd are equal. At the moment t=0, the lead frame on the inclined plane is released from rest. When the release starts, the ab side coincides with the dotted line MN. After that, the direction of movement of the lead frame is always perpendicular to the two dotted lines. The v-t image of its movement is as shown in Figure B<image_2>. During the time from t_1 to t_2, the speed of the lead frame is v_0, and the acceleration of gravity is g. The following statement is correct is ()	['A. During the time from 0 to t_1, the ab side of the lead frame must not pass through the dotted line PQ', 'B. During the time from t_3 to t_4, the speed of the wire frame is\\frac{v_0}{2}', 'C. During the time from t_3 to t_4, the potential difference between points a and c on the wire frame is 0', 'D. During the time from t_2 to t_3, the displacement of the lead frame is\\frac{v_0}{4}(t_3-t_2)+\\frac{3v_0^2}{8g}']	CD	phy	电磁学_电磁感应	['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'phy_815_2.jpg']
phy_816	MCQ	In <image_1>the circuit shown in the figure, the turns ratio of the ideal transformer is n_1:n_2:n_3=4:2:1, the constant resistance R_1=4.8\Omega, R_2=R_3=1\Omega, and the maximum resistance value of the sliding varistor R is 3\Omega. Input a sinusoidal alternating current across c and d, and the expression of the voltage is u=8\sqrt{2}\sin100\pi t (V). When the slide P slides from end a to end b, the following statement is correct ()	['A. The power of resistor R_1 keeps increasing', 'B. The maximum output power of an ideal transformer is\\frac{10}{3}W', 'C. When the slider P slides to the b terminal, the power of the entire circuit reaches its maximum', 'D. The minimum value for ammeter indication is\\frac{5}{23}A']	BC	phy	电磁学_交变电流	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAD4ATADASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAorH8VX9xpfhPVr+1YLcW9rJJGxGcMFJHFcvYaZ4uvNOtbo+M3UzRJIVGnxnGQDjr71E6kYfENK56BRXD/2H4t/6HV//BfH/jR/Yfi3/odX/wDBfH/jWf1mn3Hys7iiuH/sPxb/ANDq/wD4L4/8a0Ph9ql/q/hRLnUrgXF0tzPC0oQLuCSMoOB7CrhVjP4RNWOoooorQQUUUUAFFFFABRRRQAUUUUAFFFFABRXLfEmWSH4c67JFI0bi1bDIcEcjuKyLX4eeHZLOF2guSzRqSftcnXH+9WVSqqdrjSuegUVwv/CufDf/AD73P/gXL/8AFUf8K58N/wDPvc/+Bcv/AMVWX1uHYfKd1RXC/wDCufDf/Pvc/wDgXL/8VR/wrnw3/wA+9z/4Fy//ABVH1uHYOU7qiuF/4Vz4b/597n/wLl/+KrB8T+FNL8PppF7pouYZ/wC1rWPd9pkbKtIARgmqjiYyaSDlPWKKKK6CQooooAKKKKACiuV+Ic0sHhQPDI8b/brQbkYg4M6A9K6qgDlfiRcT2vw/1aW2nlglCIokiYqy5kUHBHTgmqa/DTTCik6z4h5H/QUkqx8T/wDknWrfSL/0aldYn+rX6CgDjf8AhWemf9BnxD/4NJKP+FZ6Z/0GfEP/AINJK7SigDzHxf8AD3TrLwdrF0mq667xWkjhZdRkZSQp4IPUV0uianp66DpytfWwItYgQZV4+Ue9dLcW8N3bSW9xGssMqlHRxkMD1Brnf+Fd+D/+hc0//vyKxq0vaW1GnYuf2rp3/P8A2v8A3+X/ABo/tXTv+f8Atf8Av8v+Ncl4i0Xwb4ev9Msz4KgvJdSlMMHkJGPnAzg7mGBjv0qXQ9D8C61qGoad/wAInBZ6jp7KLi2uYE3KGGVYFSQQR3BrH6ou5XMdR/aunf8AP/a/9/l/xrz/AMC+CrDXPD0moS6nq8TSX1z8trfvHHgSsOFHFdp/wrvwf/0Lmn/9+RW5p2m2Wk2SWen2sVtbJkrFEuFGTk8fWtaVH2beom7nK/8ACs9M/wCgz4h/8GklYfivwjD4a0eLVNP1jXDcR3lsgEuoyOpDTIpBBPPBNeoVx/xM/wCRP/7f7P8A9KI63JOwooooAKKKKACsbxdPNa+C9duLeR4potOuHjkQ4ZWEbEEHsQa2awvG3/IheIv+wZc/+imoA5rR/AEd9olhdzeKPFHmz20cr7dTYDLKCcce9Xf+FbW//Q0eKv8AwaN/hXReG/8AkVtI/wCvKH/0AVp0AcV/wra3/wCho8Vf+DRv8KP+FbW//Q0eKv8AwaN/hXa0UAeUePPAcOm+BtYvF8Q+Irgw25YRXGoF425HDLjkV6DZf8eFt/1yX+QqTxBo0PiHQL3SLiSSKK7iMbPHjcue4zXOp4I1aNFRfGurhVAAHlQ9P++K569J1LWKTsdLRXOf8IXrH/Q7av8A9+of/iKT/hC9YAyfG2r/APfqH/4iuf6pPuPmR0lFc0PB+qscL451Un2jh/8Aiad/whesf9Dtq/8A36h/+Io+qT7hzI6OuL+JluLvQdOtjJLEJdVtEMkTbXXMgGVPY+9aP/CF6x/0O2r/APfqH/4iopfh9dXk9o2oeKtTu4ba4juRC6RBWZG3DOFz1FXDDSjJNsHJDv8AhW1v/wBDR4q/8Gjf4Uf8K2t/+ho8Vf8Ag0b/AArtaK7SDiv+FbW//Q0eKv8AwaN/hSH4bQY48U+KwfUao3+FdtRQBwttda14N1ux07VdSk1bRtQl8i2vJ1Ant5cZCSMMBlODhuufwruq4PxfeweIta0nwvp0guJ1vYry9eI5FtFE24Fj0BZgAB9a7ygDkviR/wAij/2/Wf8A6UR11tcl8SP+RR/7frP/ANKI662gDgfG1zqPiS4u/Bmj2cbyeTFPeXU8mxIUL5UKMEsx2Gu9UYUD0Feb6lY6hqvxcnTR9SGkSWmnxNeShfMa7Vmbauw8ALg8+9ek0AFFFFABRRSEZBGce9AHmHiO51LUPiLeXelLBKfC2ltKsc4JVp5gTjgj+BP0rf8AAWn2kmnv4oN293qGuqk887gLtwuBGqjoFxjGSeOTWto3hiz0S/1G8gmuJZdRk8y4859wZsYz0444rk9Y8LeGNF0Y6GbkRvcFzatdSg/YtzbmljPVSDyMd8DpmgD0eimRMrwoyNuUqCD6in0AFeU/GzxtY6BpdlpEkMst1dTRXIC4AVI5VY5PqdpAr1avO/i/4c0rWPDdvd3tqslzb3dvHHKDhgkkyKy/Qg0AWrL4weB7uxguH1yG3eRAzQyq25CexwOoqx/wtjwL/wBDJafk/wDhXUWOnWem2MFlaW8cVvAgjjjUcKo6CrHlp/cX8qAOP/4Wx4F/6GS0/J/8K6LRtd0zxDYfbtJvI7u13lPMjzjcOo5+tXvLT+4v5Vxfw2GLfxOB/wBDHf8A/oygDtqwvG3/ACIXiL/sGXP/AKKat2sLxt/yIXiL/sGXP/opqALXhv8A5FbSP+vKH/0AVp1meG/+RW0j/ryh/wDQBWnQAUUUUAFFFFABVbUbmGy0y6urgqIYYXkk3dNoBJzVmuR+I1trGpeE7jStFsJbma9KxSssiKEiLDf95hklQRgetAHmmn29ve+B7aw0eCZ/F93ML5GiR1e0R5MhmcjAQLgY6Gvd4wwiQOcuFG4+pritT0O+0/xd4e17RrCSaKK2bT76BXRXEHBQ8sAdrA8A9xXQ6JqVxqL6mlykataXrW6+XnlQqMCc9/moA1qKKKACiiigAqhrGjWOv6ZJp2oxPLayEFlSVoycHI+ZSD1HrV+mSzRQRmSaRI4x1Z2AA/E0Aecado7fC/W7aGylafw3q1yInE4BltJ2+6fMxlkY8YbJBx759Krz/wAQanbeMtd0zw5pEi3cNtdx3mo3MXMcKxncqbhwXLAcegOcZFegUAcl8SP+RR/7frP/ANKI662uS+JH/Io/9v1n/wClEddbQB5f4g0/T9a+LcdvrGovpi2lij2JhkED3TMx3jzOrBcD5R616gOleX+Jm0EfE+MeMthsDZp/ZIuMmHzdx8zgcbvuda9KubqCytJLmdwkMalmbHAA70ATUVgReNfD876akeoAtqRxagxuPMznHbjOOM4z2rfoAKKKKACo5LeGYgyQxuRxllBqSigArDuteeTX20PS4o57yGJZrp5GIS3Vs7QcclmwcD0Ga3K4M+FfEtvqHio2V9YJDrDebDcsz+fG3l7QhGMBR2IJI54oAv8Ah7xk+qeENR8R39mLa1tGnKiJ95eOLO5h06lWwPauX8WeL5PEvhpLfT/DWvsZLi2uEc2R2siyo5IP0HFbUuiXHh34K6lpNy0DSW2izxnyM7ciFtxyQCcnJzgda2fDn/Ir6T/15Q/+gCsK9V00rFRVynYeP7W81iz02bR9YsZbtikL3dqY1YgFiM59BXXVw/iP/kcfB/8A1+y/+iWruKulNzjzMTVgrivhv/x7+J/+xkv/AP0ZXa1xXw3/AOPfxP8A9jJf/wDoytBHa1heNv8AkQvEX/YMuf8A0U1btYXjb/kQvEX/AGDLn/0U1AFrw3/yK2kf9eUP/oArTrM8N/8AIraR/wBeUP8A6AK06ACiiigAooooAKKKKACs3SNKfTJNQd7gTG8ujcnEe3YSqrjqcjCj9a0qKACiiigAooooAKp6npdhrNi9jqVrFdWr43RSrlTjkVcqC8vrXTrZrm9uIreBfvSSsFUfiaAOA/shPhprdjPo8jx+G9RuFtrqwkYsttK/CSRk8gFuCOev0x6NXneoatB8QNd07StFDXWj2Vyl5f6go/clkOUiRv4m3AEkcDHfnHolAHJfEj/kUf8At+s//SiOutrkviR/yKP/AG/Wf/pRHXW0AeZ63qljoXxbWXVrKW+F/YpHYrBF57wlWO/92OQDkcj+7XT+PGv28G31vpkM0l5dqttH5SFinmEKWIA6AEk+1c1quoaho3xalfRtL/tqa+sIkuoEfymtFVm2uXYbcNk8cE4r0rtQB5ncaUdH8TeFtKtNOvLq10m0efekZxJNtEa7nxtHBY44xxjArt9G1h9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phy_817	OPEN	As <image_1>shown in the figure, in the plane rectangular coordinate system xOy, the quadrangular OADC is square with a side length of L. The isosceles right-angled triangle ADC area has a uniform strong magnetic field perpendicular to the paper. In the first quadrant, there is a uniform strong magnetic field in an isosceles right-angled triangle MCN area, OM=L, and MN is parallel to the x-axis. Particles with positive charges enter the magnetic field from point A in the positive direction of the x-axis. The air resistance and the gravity exerted on the particles are negligible, and the magnetic induction strength and electric field strength remain unchanged. If the velocity of the particle becomes kv_0 when it enters a uniform magnetic field, where k&lt;1, and the direction of the uniform electric field is the negative direction along the x-axis, the minimum distance from the position where the charged particle hits the y-axis after being ejected from the electric field is calculated.		\frac{7}{8}L	phy	电磁学_电磁感应	['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']	['phy_817.jpg']
phy_818	OPEN	"As <image_1>shown in the figure, in the semicircular boundary area with point O as the center of the circle and radius R, there is a uniform magnetic field perpendicular to the paper and inward, and the magnetic induction intensity is B. Outside the semicircular boundary region, there are uniform magnetic fields of equal magnitude, opposite direction, and large enough range. Currently, two positively charged particles a and b of the same kind are injected into the area of the semicircular boundary from point P along the direction of diameter PQ. Particle a reaches Q from P through S, which is the highest point of the semicircular boundary. The mass of the particle is m and the amount of charge is q. Regardless of the gravity of the particle and the interaction between the particles, the calculation is as follows: If two particles can ""collide"" at point Q, then the time difference between the two particles starting from point P is\Delta t."		"\Delta t = 
\begin{cases} 
\left(n-\frac{1}{n}-2\right)\pi m / qB & (n is odd, n=3,5,7\cdots) \\
(n-2)\pi m / qB & (n is an even number, n= 4, 6, 8\cdots)
\end{cases}"	phy	电磁学_电磁感应	['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phy_819	MCQ	Smooth parallel shaped guide rails abcd and a'b 'c'd' are <image_1>shown in the figure. The horizontal parts of the track bcd and b'c'd 'are in a vertically upward uniform magnetic field. The track width of the bc section is twice the track width of the cd section. The track width of the bc section and the cd section are both long enough, but the resistance of the abcd and a'b'c'd 'track parts is ignored. Now place metal rods P and Q of the same mass (P and Q both have resistance, but the specific resistance is unknown) in the ab and cd sections of the orbit respectively, and place the P rod at a height of h from the horizontal orbit and released from rest. Let it slide freely, with a gravitational acceleration of g. then ()	['A. When the P rod enters the horizontal part of the track, the P rod first makes a decelerating linear motion with gradually increasing acceleration', 'B. When the P rod enters the horizontal part of the orbit, the Q rod first performs uniform acceleration and linear motion', 'C. The relationship between the final speed of the Q rod and the final speed of the P rod v_P=2v_Q', 'D. Final speed of P rod v_P=\\frac{1}{5}\\sqrt{2gh}, final speed of Q rod v_Q=\\frac{2}{5}\\sqrt{2gh}']	D	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEdAfwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKrX9/a6XYzXt7MsNvCu53Y4AFAFmiuKu/HstnoU3iCXRp00aNdwmdwJGHZtnXBOB+NbHh7XZfEvhKHWIrR7drqJnihc5OOdv58UAZ3g7x3b+MdR1iC0s5Y4NPmEQncjbKec4/L9a66uX8AeFh4T8LQ2TqPtUjNNcsO8jHJ/Lp+FdRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXl/j64bXviF4b8HsxFk5N5dr/AM9AvRT7cVqr4k1JPjM/h+SYf2c+n+dHHt/jHU5qx4s+H0HiXXLDWodTu9N1GzXYs1tjJX05oA534za1Euh2fhCzIN5q08cGxf4I9w6/p+Vek6TaQ6fpNpZ2+3yreJYwFPAwMVx2q/C2w1K70q6GpXsVxYyGRpgwaSZj1JJ7121lZw2FpHa267YoxgAnJoAnooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiqupaja6Rp1xf3sqxW0CF3dj0AoA838Uf8S745eFrzot3bSW7H35P9K9Sr5q1/Udd13VdO+Itzut9Ig1GOCygYc+UTy/4819JxyLLEki/ddQw+hoAdRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABWNceJtPtvFNr4ekkxe3MDTIM8YBxj61rySLFG0jsFRQWYnsBXx/wCIfH1xc/FhvE8DtstrkCEA/wDLJTjH4jNAH2FRVXTr6HU9Ntr63YNDcRrIhHcEZq1QAUUUUAFFFFABRRRQAVjaZ4m0/Vde1XR7aTdc6aUEwz/eGePp3qXxHrMHh7w7f6tcHEdrC0mPUgcD8TgV8s/DHxtPpfxRTUr6Y+XqkrR3bE8fOcg/g2D+FAH11RRRQAUUUUAFFFFABRRRQAVj+I/Elh4Y0+K81B9sck6QL/vMcfp1rYr5q/aF8UfbfEFroFvJmKxXzJcH/lo3+AxQB9KKwdQynIIyDS1w/wAJvE//AAlHgKynkfddWw+zz887l6H8Rg13FABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRUTXNurFWnjBHUFxQBLRTEmil/1ciP8A7rA0+gAooooACcDJ6V49rtzP8VvGX/COWEjL4a0yQNqE6Hidx/ADWv8AEnxTeyXVv4K8Ntu1rURiWRf+XaI9WPocV1vhHwtZeEPD8Gl2a52jdLKfvSuerGgDH+Ivh6G9+GOpaZaQqi29uHgRRwuznj8M1f8Ah9rA13wJpF9uy7W6rJ7MOCP0ro5oknhkhkG5JFKsPUHg15f8Ipn0i/8AEfhCc4fTrxpIQe8bnPH40Aep0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBgeMrLVdT8MXWnaOyJdXY8nzZGwI0P3m9+O3vXgVz8HdOtPiBpnhaXULhzdWDzyXAAGJAeMD09q+nK8u1n/k4LQv+wZJ/6FQB0fw80HVvC3h46Hqc0dwlpIVtrhD9+M8gEdiOlddRRQAUUUUAFFFFABRRRQBxHxI8K6r410+00KzuUtLCSXzb24bk7V+6qr3JPP4V4zpXwfstY8XeKNDs9Qnt5dJMX2WZwGDEqCdw47+nSvp2vLvAv/JYfHv+9B/6AKAO98OpqUXh+yh1cJ9vijEczI24OV43A+4GfxrUoooAKKKKACiiigAooooAZM0iQSNEnmSKpKpnG444FfNXj34Yz6Zp3/CR65fmfVNR1JEkji+5Grk5GTyTX0xXmfxv/wCRT03/ALCkH8zQAfD74fX/AIB125Fnefa9Dv4gxWTiSGQdOOhBBxkeg4r0yorb/j1i/wBwfyqWgAooooAKKKKACiiigAooooAKKKKACiiigArw3xroWl+JvjnoejR2FvshiNxflIwPNGc4fHXhe/8Aer3FmCIzMcADJrw/4fWmq+KvHPirxdp+oQ2mbj7LC81t5yug9BuXHCr+dAF/4s+GNB8LeEf7d0O1i0fVbWaMW81l+6LZYAqQuM8V6X4WvrvUvCul3t8u26ntkeQYxkkdfx6/jXO3Hw7fXdUt73xXrMmqx2zb4bKOEQQK3qVyS34mu4VVRQqgBQMAAcAUALXLePPGVv4N0B7tl829mPlWluOskh6celbuqanaaNplxqF9KsVtAhd2J7CvMPBmmXfj/wAUt461yJlsISU0m0ccBR/y0IoA3Phr4NuNHt59e1xvO8QaofNuHbkxKeQg9K7+iigAryjxfnwh8WtD8TL8tlqi/Ybs9g38JP6frXq9ct8Q/DQ8VeDL6wQf6Sq+dbsOokXkY/l+NAHUgggEcg0Vx3wy8THxN4NtpZz/AKda/wCjXSnqHXj9etdjQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXl2s/8AJwWhf9gyT/0KvUa8u1n/AJOC0L/sGSf+hUAeo0UUUAFFFFABRRRQAUUUUAFeXeBf+Sw+Pf8Aeg/9AFeo15d4F/5LD49/3oP/AEAUAeo0UUUAFFFFABRRRQAUUUUAFeZ/G/8A5FPTf+wpB/M16ZXmfxv/AORT03/sKQfzNAHo9t/x6xf7g/lUtRW3/HrF/uD+VS0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcv451HUrbw5e22j6bd3moTwskPkxkqpPGS3TjrWN8H9LuNB8FQ6Xe6ddWd6jvJP50eAzE9Qe/AFeg0UAFISFBJOAOpNLXmfxH8T3t3eweCfDbFtXv+J5VP8Ax7xHqT6HFAGTq88/xZ8Z/wBhWTsvhjS5A19MvS4kB+4D6V67b28NpbR29vGscMShERRgKB0FZPhPwxZeEvD9vpVkoxGMySY5kfuxrboAKKKKACiiigDyK6J+G3xXW6+5oHiI7ZP7sVx6+2f6166CCAQcg1z/AIz8L23i/wAM3WlT4V3G6GTvHIPumuc+F/iu5v7Sfw1reY9d0k+VKr9ZUHAcetAHodFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV5drP/JwWhf9gyT/ANCr1GvLtZ/5OC0L/sGSf+hUAeo0UUUAFFFFABRRRQAUUUUAFeXeBf8AksPj3/eg/wDQBXqNeXeBf+Sw+Pf96D/0AUAeo0UUUAFFFFABRRRQAUUUUAFeZ/G//kU9N/7CkH8zXpleZ/G//kU9N/7CkH8zQB6Pbf8AHrF/uD+VS1Fbf8esX+4P5VLQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUVR1fVrPQ9KuNSv5VitrdC7sf5fWgDC8feMofB2gtOq+bqFwfKs7cdZJD049BWd8NvBs2hWU2s6y3na/qR825lbkoDyEHpisHwRpN5458St4816JltUJXSbR+iJ/fI9a9aoAKKKKACiiigAooooAK82+JHhW+S7t/GfhpdutaeMyxr/wAvMQ6qfU4r0migDnvBvi2x8Y6DFqNo22T7s8J+9E/cEV0NeUeKvDOqeC9ek8Z+EIS8T86lpi/dlXuyj1ruvCvizS/F+kJqGmzBh0kiPDxN6MKAN2iiigAooooAKKKKACiivO/ivr2teHtMs5dH1Hybi7uEto4PJDFiTyQevSgD0SioLKOWGxt4riQyzJGqyOf4mA5P51x/xQ8V6j4U8MxT6SiNqFzcJBDvXcAT7d6AO3oqrphuzpdob/b9rMSmbaMDfjn9atUAFFFFABXl2s/8nBaF/wBgyT/0KvUa8u1n/k4LQv8AsGSf+hUAeo0UUUAFFFFABRRRQAUUUUAFeXeBf+Sw+Pf96D/0AV6jXl3gX/ksPj3/AHoP/QBQB6jRRRQAUUVU1S+XTdKur5xlYImkI9cDNAFuiuM+GXiPWPFfhc6vq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phy_820	MCQ	<image_1>A ring with a mass of m and a charge of-q is sleeved on a rough thin rod long enough at an angle\theta to the horizontal plane. The diameter of the ring is slightly larger than the diameter of the rod. The thin rod is in a uniform magnetic field perpendicular to the paper. Now, given the initial velocity v_0 of the ring along the upper left of the rod, the direction of the initial velocity v_0 is the positive direction. The v-t image of the ring motion in subsequent movements cannot be ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	A	phy	电磁学_电磁感应	['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'phy_820_2.jpg', 'phy_820_3.jpg', 'phy_820_4.jpg', 'phy_820_5.jpg']
phy_821	MCQ	When launching a geosynchronous satellite, the satellite is first launched into a low-earth circular orbit 1, then ignited to make it travel along an elliptical orbit 2, and finally ignited again to send the satellite into a synchronous circular orbit 3. Orbits 1 and 2 are tangent to point Q, Orbits 2 and 3 are tangent to point P, as shown in the figure<image_1>. Then when the satellites are operating normally in orbits 1, 2, and 3 respectively, the following statement is correct ()	"['A. The angular velocity of the satellite in orbit 3 is less than the angular velocity in orbit 1', ""B. The satellite's velocity in orbit 3 is greater than the velocity in orbit 1"", ""C. The satellite's speed when passing point P on orbit 2 is less than its speed when passing point P on orbit 3"", 'D. The acceleration of a satellite as it passes point P on orbit 2 is equal to its acceleration as it passes point P on orbit 3']"	ACD	phy	力学_万有引力与宇宙航行	['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']	['phy_821.jpg']
phy_822	MCQ	Two identical molecules A and B with both masses m are released from rest from the origin of coordinates on the x axis and at $r_1$, as shown in Figure A<image_1>. Figure B <image_2>is an image of the molecular potential energy of these two molecules changing with the distance between molecules. When the distance between molecules is $r_1$,$r_2$and $r_0$respectively, the potential energy of the two molecules is $E_1$, 0 and $-E_0$. When the distance is infinite, the potential energy is zero. The entire movement does not consider other external forces except the intermolecular force. The following statement is correct ()	['A. When molecule B reaches the coordinate $r_0$, the molecular force between the two molecules is zero', 'B. The maximum kinetic energy of molecule B is $E_1 - E_0$', 'C. As the two molecules are released from rest to infinite distance, the molecular potential energy between them first decreases, then increases, and then decreases.', 'D. When the two molecules are infinitely far apart, the velocity of molecule B is $\\sqrt{\\frac{E_1}{m}}$']	D	phy	热学_分子动理论	['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', 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'phy_822_2.jpg']
phy_823	OPEN	<image_1>Three small balls A, B, and C that can be regarded as particle particles are connected by hinges by two light rods with a length of $L$and erected on a sufficiently large horizontal ground. The masses of A, B, and C are $m $,$\frac{1}{4}m$respectively. Due to the slight disturbance, the A ball drops, the B ball moves to the left, and the C ball slides to the right. If the three small balls only move in the same vertical plane, regardless of all friction, the gravity acceleration is $g$, and the A ball starts from the beginning. During the process of descending to before landing, find out how high the A ball is from the ground when its mechanical energy is minimum during the process.		\frac{2L}{3}	phy	力学_动量及其守恒定律	['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phy_824	OPEN	As <image_1>shown in the figure, a wooden board with a mass of $3m$, a smooth upper surface and a baffle on the left end slides down at a constant speed of $v_0$on an infinite slope with an inclination of $\theta= 30\circ $. At a certain moment, a small slider with a mass of $m$is placed on a certain point on the wooden board at the same speed as the wooden board. When the speed of the wooden board is reduced to $0$for the first time, the slider just moves to the baffle, and then the slider and the baffle collide elastically (Very short time). It is known that the slider has never separated from the wooden board during the movement, and the gravitational acceleration is $g$. Calculate: starting from when the slider is placed on the wooden board, the time of the $N$collision and the heat generated by the system during this process are $Q$.		6mv_0^2 + 24(N - 1)mv_0^2	phy	力学_动量及其守恒定律	['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phy_825	OPEN	As shown in Figure A<image_1>, the wooden board A on the smooth horizontal surface is released from rest by being compressed by a light spring by $4L_0$. After being pushed away by the spring, it moves to the right and elastically collides with the fixed baffle on the right side. The $x-t$image of the wooden board A starting from release is shown in Figure B<image_2>, where $0\sim2t_0 $and $6t_0\sim10t_0 $are part of the sinusoidal curve. As shown in Figure C<image_3>, if the spring compression of $4L_0$is still released from rest after stacking another small object B on the left side of A, A and B remain relatively static during the ejection process. It is known that the mass of wood board A is $m_A = 3m_0$, the length of wood board is $L = 5.5L_0$, the mass of mass B is $m_B = m_0$, the dynamic friction coefficient between A and B is $\mu = \frac{4L_0}{gt_0^2}$, and the gravitational acceleration is $g$. Request: From release to B sliding away from A, the distance A moves is $s$.		32.625L_0	phy	力学_动量及其守恒定律	['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phy_826	OPEN	The dual focusing analyzer is a mass spectrometer that can simultaneously realize velocity focusing and directional focusing. Its principle is as <image_1>shown in the figure. The electric field analyzer has a radial electric field pointing to the center of the circle O, and the magnetic field analyzer has a uniform strong magnetic field perpendicular to the paper.(not shown in the figure). Ion beams composed of different positively charged ions can enter the electric field analyzer at different speeds, pass through the electric field along a circular arc trajectory with radius R and enter the\frac{1}{4} circular magnetic field area vertically from point P, and then exit from the lower boundary of the magnetic field and enter the detector. The detector can move left and right between M and N and the distance from the lower boundary of the magnetic field is constant equal to 0.5d. A positively charged ion A with a mass of m and a charge of q passes through the electric field region and the magnetic field region, then exits just perpendicular to the lower boundary of the magnetic field, and enters the detector from point K. It is known that the magnetic induction intensity in the magnetic field region is B, PO_1=d, ignore the interaction between ions, and find: the maximum value of the specific charge in the ion that the detector can receive.		\frac{25q}{9m}	phy	电磁学_磁场	['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phy_827	OPEN	There is a device in the laboratory that can be used to explore the properties of atomic nuclei. The main principle of the device can be simplified as follows: there is a rectangular coordinate system O-xyz in space, and there is a particle source P on the underside of (-0.2m,0,0). It can continuously emit a certain atomic nucleus with a specific charge of\frac{q}{m}=5\times10^7 C/kg in the positive direction of the x-axis at a speed of v_0=1\times10^6 m/s. The xOy plan is shown in Figure A<image_1>. In the space where x&lt;0 and y&lt;0, there is a uniform electric field in the →y direction E=1\times10^5 V/m. In the space where x&gt;0, there is a uniform magnetic field perpendicular to the xOy plane. The magnetic field area is large enough, and the magnitude of magnetic induction is B_1=0.2T. Ignore interactions between atomic nuclei and gravity. If a sufficiently large absorption screen is placed in the area x&lt;0 in the xOz plane, a uniform magnetic field with the magnitude of B_2=\frac{\pi}{5} T in the →y direction is applied above the screen, as shown in Figure B<image_2>. When the atomic nucleus hits the absorption screen, it is absorbed and leaves a mark. Please determine the position coordinates of the mark.		\left(0,0,\frac{2}{\pi}\times 10^{-1}\text{m}\right) \text{or} \left(0,0,\frac{1}{5\pi}\text{m}\right)	phy	电磁学_磁场	['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']	['phy_827_1.jpg', 'phy_827_2.jpg']
phy_828	OPEN	In <image_1>the square plane\( Oabc \) shown in Figure A, there is a uniform magnetic field perpendicular to the plane, and the variation law of magnetic induction intensity is shown in Figure B<image_2>. A particle with mass\( m \) and charge\( +q \)(not counting gravity) is injected into the magnetic field parallel to the\( Oc \) edge at\( t=0 \) from\( O \). Given that the length of the square is\( L \), the magnitude of the magnetic induction is\( B_0 \), and the direction perpendicular to the paper outward is the positive direction of the magnetic field. To make charged particles emit a magnetic field from point\( b \) in the\(ab \) direction, find the velocity at which particles satisfying this condition enter the magnetic field.		\[ qB_0Lnm (n=2, 4, 6, \cdots) 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'phy_828_2.jpg']
phy_829	OPEN	As shown in Figure A<image_1>, there are changing electric fields and changing magnetic fields in the\( xOy \) plane. The change rules are as shown in Figures B <image_2>and C<image_3>. The positive direction of magnetic induction intensity is perpendicular to the paper and inward, and the positive direction of electric field intensity is the\( +y \) direction.\ At the moment ( t=0 \), a particle with a charge of\( +q \) and a mass of\( m \) is incident in the direction of\( +x \) from the coordinate origin\( O \) at an initial velocity\( v_0 \)(regardless of particle gravity).\ ( B \)-\( t \)\( B_0 = \frac{2\pi m}{qt_0} \) in the image,\( E \)-\( t \)\( E_0 = \frac{mv_0}{qt_0} \) in the image. Find: The maximum value of the particle trajectory ordinate during the time period\(0\sim7t_0\).		\[ \left( \frac{\sqrt{3}}{2} + \frac{\sqrt{2}}{2\pi} + \frac{1}{2\pi} \right) v_0 t_0 \]	phy	电磁学_电磁感应	['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', 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phy_830	OPEN	<image_1>In the area of the spatial coordinate system $x<0$, there is a vertically upward uniform strong electric field $E_1$, and in the square areas $CDEF$in the first and fourth quadrants, there are orthogonal uniform strong electric fields $E_2$and uniform magnetic fields $B$with the directions shown in the figure. It is known that $CD2=L$,$OC=L$, and $E_2=4E_1$. On the negative $x$axis, there is a metal $a$ball with a mass of $m$and a charge of $+q$moving at a constant speed to the right along the $x$axis at a speed of $v_0$, and elastically collides with a non-charged metal $b$ball with a mass of $2m$supported by an insulating thin pillar (the pillar does not adhere to or friction with the $b $ball) at the coordinate origin $O$. It is known that the $a$and $b$balls have the same size and material and can be regarded as point charges. After impact, the total amount of charge is equally divided. The gravitational acceleration is $g$. The electrostatic force between the $a $and $b $balls is not counted. Regardless of the influence of the field generated by the $a$and $b$balls on the electric and magnetic fields, we must calculate: After $a$and b$$$collide, the value of the magnetic induction intensity $B$is calculated.		0<B<16\pi v_0/5qL \quad \text{or} \quad B>16\pi v_0/3qL	phy	电磁学_电磁感应	['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phy_831	OPEN	As shown in Figure A<image_1>, an xOy plane rectangular coordinate system is established. The two parallel polar plates P and Q are perpendicular to the y-axis and symmetrical about the x-axis. The length of the polar plates and the spacing between the plates are both l. The first and fourth quadrants have sufficiently large uniform strong magnetic fields, and the direction is perpendicular to the xOy plane and inward. The particle source located on the left side of the polar plate successively emits charged particles with a mass of m, a charge of +q, the same velocity, and regardless of gravity to the right along the x-axis. The voltage shown in Figure B is applied between the two plates within 0 - 3t_0 <image_2>(regardless of the influence of edge effects), and the negative direction along the y-axis is defined as the positive direction of the electric field. It is known that the charged particles entering between the two plates at time t=0 enter the magnetic field through the edge of the plates at time t_0. The above m, q, t_0, and B are known quantities. (Regardless of the interaction between particles and the situation of returning between plates) When does a charged particle entering between two plates have the shortest movement time in the magnetic field? Ask for the shortest time.		\frac{\pi m}{2Bq}	phy	电磁学_磁场	['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phy_832	OPEN	As <image_1>shown in the figure, a square wire frame connected to a constant current source has side length of\(\sqrt{2}L\), mass\(m\), and resistance\(R\), and is placed on a smooth horizontal ground. The wire frame part is in a uniform magnetic field with vertical ground downward and magnetic induction intensity of\(B\). Taking a point above the magnetic field boundary\(CD\) as the coordinate origin, the\(Ox\) axis is established horizontally to the right, and the center of the wire frame and a diagonal line are always located on the\(Ox\) axis. Switch\(S\) is turned off and the wire frame remains stationary regardless of air resistance. The center of the wire frame is located at\(x = 0\) and\(x = \frac{L}{2}\) respectively. After closing the switch\(S\), the current in the wire frame is\(I\), and the time required for the center of the wire frame to move to\(x = L\) respectively is\(t_1\) and\(t_2\) respectively. Find\(t_1 - t_2\).		0	phy	电磁学_电磁感应	['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phy_833	OPEN	"""Maglev train"" uses electromagnetic force to achieve contactless suspension and guidance between the train and the track, and then uses the electromagnetic force generated by a linear motor to pull the train. A simplified model designed by an experimental team is shown in figure (a)<image_1>. If the total mass of the maglev train model is\( m \), a rectangular metal wire frame\( abcd \) insulated from it is fixed at the bottom of the model, and the total resistance of the wire frame is\( R \). Use two long enough and fixed horizontal spacing\( L \) Parallel metal guide rails\( PQ \) and\( MN \)(equal to the side length\( ab \) of the rectangular wire frame) simulate the track on which the train is running. There are alternating uniform and strong magnetic fields at equal intervals perpendicular to the guide rail plane between the guide rails. The directions of the adjacent uniform and strong magnetic fields are opposite, and the magnetic induction intensity is both\( B \). The width of each magnetic field is equal to the side length\( ad \) of the rectangular wire frame, as shown in figure (b)<image_2>. Place the train model on the guide rail. When the alternating magnetic field moves to the right at a constant speed of\( v_0 \), the train model starts to move from rest due to the force of the magnetic field, and starts to move at a constant speed when the speed reaches\( \frac{3v_0}{4} \). It is assumed that the resistance faced by the train model during the movement is constant, and other effects caused by the movement of the magnetic field are not considered. After the train model moves at a uniform speed, at a certain moment, the magnetic field will uniformly accelerate and linearly move to the right at the acceleration\( a \). After time,\( t \) the train model will also start to uniformly accelerate and linearly move. If the speed at which the train model starts to uniformly accelerate is\( v \), calculate the work\( W \) done by the ampere force applied to the train during\( t \) time."		\[ W = \frac{1}{2}mv^2 + \frac{3B^2L^2v_0^2t}{4R} + \frac{B^2L^2v_0at^2}{2R} - \frac{mvv_0}{4} - \frac{3}{32}mv_0^2 \]	phy	电磁学_电磁感应	['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On74o7yWEiW6k5DJg4Pkf3s/eI44Ga5b4sX9zd/C6G3vdMbTryzv44JYVH7rhGw0TdGQjGPToeRUM0W57Bov/ACAdO/69o/8A0EVHrmpzaPpjX0VhNerGymWOEjesefmYD+Igc4HJqTRP+QDp3/XrH/6CKZrl/dabpck9lYS310SEhgj7seAWP8KjuewpiM2/8Z6dBp1hcabnU7jUv+PC2tz80/qc/wAKqOWJ6fXitKUWx1+1ZzILr7PIEAxt25XOffOP1riNP8L6t4Nv/wDhIoI49TuLzjVbW3iC+WCxbNsMZwpPKn73XrXbyyQ/2/axtBmZreRkl3H5RlcjHvxz7VUNyKmy9V+ZW8W+I4fCfhm81qeBp1t1GIlOC7EgAZ7ckc1jfDrx9H490q5ufsLWc9tKI5I9+9TkZBBwK6u+sLXU7GayvreO4tpl2yRSDIYVV0Xw/pPhyzNppFjDaQM29ljH3j6knk/jUlnlsh/4ydUf9OY/9E17JXjUn/Jzy/8AXmP/AETXstJDZx/jf4jaR4ENpHfxXFxPdZKxW4UkKOrHJHrx610ml6lbazpNrqVmxe2uolljJGDtIyMjsayPFfgbQvGaWw1i3d2tyTHJG5RgDjIyOxwK27Kyt9NsILGziEVtbxrHFGvRVAwBTEVfD4tRoFiLIyG2EQ8sy43bffHesG88Xy+GdRuLbxLHi3lYtp11bRM32jPSEqM4lHQD+Lt3Fb3h+SCXw/ZSWsHkQNECkW4tsHpk9aw5vB39v393eeKGjul+eKytYiRHbR54cHgmUjB3fw9B6mp/GzOjb2cfRGv4el1m6s5LvWYord533w2iD5rePHCu2fmbuccDOOcZrXrH8PWmr2FrLZapcx3aQPttbrJ82WPAx5gxjcOmR1xnitipNDI8QXmqadbRXmm2iXkcT5urYf614+5jOcbh1wevTisq08Wv4j1S2g8MrHPYoQ99fyofLjGM+UgyMyHPP93vk8Vp+IrTWNRt4bHS7lLOKdit3dg/vYo8dIxjG49NxPy9QCemXa+FZfDOoW03hkItlIUivbGWQhGXp5ynBxIB1/v9+eaANvQVtV0tRZmUw+Y+PNxuzuOenvmvOtQ+L1zZfE4eFxpCNaC5S1aUuRIS2PmAxjHPTuK9F0KSCXS1a2g8iPzHGzcW53HJyfU8099E0qTVF1N9OtWv1GFuTEpkH/AsZqqnxMzo29nH0L9FFFSaFXUr+DStLu9Ruci3tIXnlKjJ2qpY4H0FcR8PvipaeO9SvNPXTpbK4hj8+MNIHDxghSc4GCCy8e9d/JGk0TxSorxupVlYZDA9QRWNoPhDQPDD3D6NpkVo9wcyMpJJ9sknA9hxQBb1MW5ex+0GQEXS+Vsx9/Bxn261oVn6m8KSWAmh8wtdKEO4jY2Dg+/0rQqnsiI/EwoooqSwooooAKKKKACqdnNJJdXyOgVY5gqELjcNinPvySPwq5VS0Nybm9E4PliUCHIH3di/+zbqa2ZEt1/XQt0VzXijx74e8HTW0Os3hiluAWSOOMyMFBxuIHQfzwcZwa6GCeG6t4ri3lSWGVA8ciNlXUjIII6gikWSUUUUAFMlO2F2wDhScHvWXH4p0KXXW0OPVrVtTXObYSDcCOo+vt1rUlLCJyv3gpx9aAZW0mY3Gj2UxjSMyQIxRBhVyoOAPSrlZsF5PB4cjvbi3lkuEtRLJBGmHZguSoU45z2qA+KtGHhz+3/tqf2fs3b/AOIn+5t6788beueMZqpfEyKfwI2aKr2Nyb2wgumt5bczRh/JmADpkZwwHQ1YqSworDk8Rx2niYaPqFubVbhQbK5Z8x3Jx8ydPlcc8HqOR6U7RvEUeu396llbSPYWx8sXxOEmk/iVB3A/vdM0AX4Zd2p3MXlqNkcZ3gctndwT7Y/WrdVYpJjqVzGyEQqiFG28Endnnv0FSXl3BYWU95dSCK3gjaWVz0VVGSfyFOW5Mdiaiuc8K+OdB8Zrc/2PcvI9sQJI5IyjAHo2D1Bwa6OkUFFFZ2s69pXh6yF5q9/DZwFtqtK2Nx9AOpP0oA0aoaXP54u/3SR7LmRPkGN2D1PvU9lfWupWMN7ZTxz20y7o5YzlWFRabLcSi6+0IUKXDqmV25QdD7/WqWzIl8SLteV/H3/kQIf+v6P/ANBavRdM1mx1c3S2kxaS1maGeN1KPGw9VPOD1B7ivLPjbrFjqvgSVLGcT/ZdTSGV0B2h9jEgN0OM4OOh461D2NFueqaL/wAgLT/+vaP/ANBFXqo6L/yAtP8A+vaP/wBBFJrGr22h2BvrwS/Z1dVkeNC3lgnG5sdFHc9hTEX6oS3BXXba38qMh4JG8wr8y4K8A+hz+lR6t4g07RtNS+uZ90cpVYEhG952b7qoo5Yn27c9KlkluBrNtGqH7M0Ds7bOjArgZ7dTxVR3IqbL1X5l6iquo6jZ6Tp89/f3CW9rApeSRzwo/wA9qp+H/E2jeKbFr3Rb5LuBX2MQrIVPoVYAj8RUlnmMn/Jzq/8AXmP/AEVXsleNSf8AJzy/9eY/9E17LSQ2FB6VS1HWNM0eNJNT1C1skkbajXEyxhj6DJ5q2rrJGrowZGAKspyCPUUxFDQbj7XoVlceTHD5kQby41wq+wFaNUNEmuZ9FtJbxCly0YMilNpB+naslPF9vZajfWGvImmS26tNFJJJmO4gB++jeoHVeoPqMVU/iZFL4I+h0tFY/h7VrzWrOS+nsDZ2sj5sxI37ySLHDuuPlyckDrjGcVsVJYUVj+INbfQLaG9exkuLEPi6kiOWgT+/txlgD1x0HPNVpvFUM2r2emaPEupTzBZp3jkxHbwH+NmAIyf4V6n2HNAGholwbrTRKYY4T5jjZGuBwxGa0aoaPLczaer3aFJt7ggpt4DHHH0rBufiR4atfF6+GZbuQagziMnyz5aueilvXke1VP4mZ0tYL0OtoooqTQKKa7pFG0kjKiKCzMxwAB1JrH0LxboPiZ7hNG1OG7a3bbKqZBX35AyPccUAW9Sn8iSxHlJJ5lyqZcZ25B5HvV+qWoS3Eb2YgQsHuFWTC5wmDk+3bmrtU9kRH4mFFFFSWFFFFABRRRQAVUs45kub1pHDI8waMbs7V2KMe3IJ/GrdUrKERXV+4lV/MnDFV6p8ijB/LP401syJbr+uhy3jb4YaP441C1v72e5t7mBBEzwkfvIwSdpBBxyTg+56111hZQaZp1rYWqlLe2iSGJSc4VQABn6CrFFIsKKKKAPMNN+D8Om/EY+J01VmtxO9ylt5fzB2zwXzyMknp7e9emShjE4T7204+tPpko3QuMgZUjJ7UIGUIbl9N8OJdal5hkt7UPcYG9yVXLYAzk8Hp1rz5fD2sDVv+E3bS1MfnG4/4R8nkLtx53Xb9o6HGOny5zzXo+lRGDSLOFpFlKQIpdDkNhRyD3FXKct2TT+BENpdRX1lBdw7vKnjWRN6FTtYZGQeQeeh5qaiikUcb4l0m88ZX7aDPbva6FAyPdXDKN9y2AypEf4QO7dc8DvV3wnBqekRt4fv7YPb2UaizvowAk0XQKw7SDHOOD1rpaKAKsQuBqNyXz9nKJ5fPGfm3cflRqenW+r6Vd6ddqWt7qJoZADg7WGDg9jzRFEy6lcyGRSrIgCA8rjdyR75/SrVOW5MdjjvBHw30jwK93NYy3FxcXOFaWcjKoDkKMAfj64rsaKKRQVxnxG8Ap490q1txfGzuLWUyRuU3qcjBBGR7c12dFAGL4S8OxeE/C9lokM7TrbK2ZWGNzMxZjjnAyx4q7py3Si6+1bubhzFlgf3fbpV2qOmQtCt0GlSTfcu42tnaCeh9xVLZkS+JHA+JrS88Va/cHwixtrqzja3vtSWYxpOP+fYYHLf7Y+4eOp45j4nXum3PwjtLbTbM2As79Leaxddr27hWyrevrnvnPevcURIwQiqoJJwBjknJP515Z8fVA8AxEAAm+jyfX5WqGaLc9H0X/kA6d/17R/+gima7qtto2kTXd1FJMnCLDGm9pWY4VAO5JOPT1p+i/8AIB07/r2j/wDQRV6mI8s0nRb3whqVvr2s2SPpzBkitYWMg0QOxPy84ZTkBmUDHb5eno0i3R1i3dC32QQuJPmGN2V28fTNXaoSwM2uW04mQKsEimMt8zZK8gegx+tVHcipsvVfmVvFPh238VeHLzRrqR4o7hRiROqMCCDjvyBxWR8PvAVv4C0q4tY717ye5kEksxj8sHAwAFycfma6+ipLPG5P+TnV/wCvMf8AoqvZK8bf/k51f+vMf+ia9kpIbPO/id8Nrjx5Jp09rqKW0toHQpMCyMrYORjoePx49K7LQNJGheHdP0lZmmFnbpD5jDBbaMZx2+laVB6UxFHRUu49GtEv932sRgS7mDHd9R1rldV8KXvjXUJZdcL2NjZSH+zYYXBk8wcC4c8j/dXpjrz06jQoGtdDs4HmSZkiCmSNtyt7g960KqfxMil8EfQx/Ds2sNZyW+t26rd2z+X9pjI8u6XGRIozlfcHoc4yK2KKKksxvEcusfZI7TRLZGubpjGbqbBitlxy7LnLHHQDjPXjrz+jeG7vwJfQw6THJf6PeOq3UZCiWGY4HnA8ZQ917dRxxXc0UAUdIS7TTwt8WM+987mDHG445HtiuVuvhV4evPGY8TyNdi681Z2gEi+U0gxhiNue2etdRotu1tpqxPMkxEjnejbhyxOM1oVU/iZFK6gvQKKKKksq6nYQ6rpV5p1zu8i7geCTacHaylTg+uDXD/D34V23gTUrzUDqT3txNGYIz5XlhIyQxBGTkkqvPtXoVFAFLUFumez+zbsC4Uy4YD5MHOfXtV2snX4b2W1tzp8lsl1HOrxi5cqjkA8HHNZnmePP+eHh3/v7N/8AE1T2REfiZ1NFctv8ef8APDw7/wB/Zv8ACjf48/54eHf+/s3+FSWdTRXm/jSTxwvhS/aSPSkKqDE1hJP9oEmRt8vA+9nH654qP4ayfE14A3ilLT7GR8n2r5bnpwfk4x/vc0AemUUUUAFUrJIVu78xyF2aYGQEY2NsUY9+MH8au1SsTAbu/wDKVw4nHm7jwW2L09sYprZkS3j/AF0ZbeWOLb5jqm4hV3HGT6D3p1eTfFv4d+IfGOr6bd6RcxPBDF5TW80pQRNuJ8wdc5BAPf5R17em6RaTafotjZXNy1zPb28cUk7dZWVQCx+pGfxpFlyiiigApkwBhkBOAVOT6cV47pPhzx/D8YH1G8uLl9J+0OzSmf8AdNCQdqhM+44xwa9im2+TJuzt2nOPTFCB7GfZzWul+GoJnuA1pbWqsZlUkFFX72Bz0Gas/wBo2X9mf2l9qi+w+V532jeNmzGd2fTHNV7OexsvDcFw02ywhtVcyzkDEYXq3bp1ry8WEvn/ANstp92fAX2nzxpfccZ+0+XjPlbvm8vP+1jtVS+JkU/gXoet2d5BqFlBeWzl4J0EkbFSuVIyDg8ip6htbmC8tIbm1lSW3lQPHJGcqykZBB9KmqSzMi16zk1+fRXEkN5GgkQSrtWdCOWjP8QB4PcH25ostesdR1e8020Z5pLMDz5VXMaOf4N397HJHauY8W283ivVYtB0yMw3Fk6yz6sVINkSAQsZ43OwI4zgA89qveCGbTbN/Dl1p/2S9sFBZ0UmO6UniZW7liDkHkHNAHQxRoNTuZBIC7JGCn93G7B/HP6VbqpCIf7UuirOZdkYcHoB82MfrUOvWE+qeHtR0+1uDb3FzbSRRzD+BmUgH9e1OW5MNvv/ADL0U0U6loZUkUEqSjAgEdRxT68t+EPw/wBc8FyanLq1xEqXAVEtoZN6kgn5zxwew/HPavUqRQUUV558XdF8T61oNpF4bebKTE3MUM3lu6447jIB7Z7igD0OqGlQxxLd+XOJQ91I5wMbCTyv4VmeBbHV9O8Fabaa9M0upRo3ms77mALEqCe5CkDPtWlpS26rd/Z3kbN1IZN/Z88ge1UvhZEvjXzLNpe2t9G8lpcRTojtGzRuGAZTgg47g15Z8eLu3uPA3kwzxySQX8ayorAmMlGIB9Dgg/jVvxW+oWniW7HgVZX1R4S2rxQopiQEfK/JAFxjlR/EOvvzPxJj0VPg5ZNoTmSCS/VpZXJMry4beZM8789c/wAqhmi3PZ9G/wCQFp//AF7R/wDoIqW+1Cz02FJr24jgieRYg8hwNzHAGfc1Fov/ACAtO/69o/8A0EUzXp9Lt9CvJNaMQ07yyJxKMqVPGMdySQAOpJGKYizfX9ppllJeXtxHb20YBeSQ4AycD9SBVeWKJtetZjMBKtvIFixywJXJ/DA/OvNtHhu7bVdNn8Wx3g0IPjRkvG3G2kLHZ9p/6abSApYkDofm5PpMwt/7etSzSC5EEmxQPlK5XOffpVQ3IqbL1X5mhRXO+O9M1TWfBmpWGjTGK/ljAjIfYW5BK57ZGR+Nc78IfDfiHw34fu4Nfd1Ms26CB5fMMa457kDJ7VJZz7/8nOr/ANeY/wDRVeyV42//ACc6v/XmP/RVeyUkNhSHpXl/xgt/Gtx/Zf8Awi5vDbAv562TESb+NpbH8OM/rntXe+HF1KPw1pq6w27UhbILk5BJk2jOccZz6UxD9Bhit9CsoYZ1niSIBZVGAw9ag03xJZX95f2Th7S8sWPnQ3GFPl54lHYoRzn8Dg1NoC2y6DZLZvI9uIh5bSD5iPfFcX4k8N33j7VXZIjpdrpu+OG4mi+e8fupXr5GRyP4u1VP4mZ0f4cfRHb6TrFrrdq11ZeY1tvKRzMm1ZQP4kz1XPGe+OOOav1jeGtRnvtNMV3pr6fd2jeRNBsIjBAGDG3RkIwRj6HmtmpNDL1nX7TQfsr34kS2nl8prkLmOEn7u89gTwD0z1xTdR8QWmn6hY6eFkub28cCOCABmVM8yNyMIPX8Bk1B4qvpLfS/sdvpZ1O5viYIrdlPlHI5MjdFUDJ9+grmPDekXXgLVY7e+jOoW+ohIl1JEZpIJAAFhYckRZ+6e3f1oA7PQ4YoNMVIZ1nTzHIdRgcsSR+HSrpuIRcC3M0YmK7hHuG4j1x1xVLQ1tl0xRaPI0PmPgyDBzuOf1ry/UvhZr158XF8Sx38AsPtKXPmFz5qBcfuwuPbHXGD+FVU+JmdFfu4+h7DRRRUmgUVT1eC7udFvrfT5xBey28iW8x6RyFSFb8Dg15h8IvC3jLQdW1KfxBNMlnJHtEEs/mmSXcD5g5OMAMPfd7UAemalFHLJYmSYRlLlWUEffOD8tX6z9TFuZLHz2kUi6Ux7B1bBwD7da0Kp7IiPxMKKKKksKKKKACiiigAqlYyxyXd+qRKjJOFdh/GdinJ/AgfhV2qdlM0t1foY1URzBQQMbhsU5Pr1x+FNbMiW8f66FyiiikWFFFFABTJiBDIWGV2nI9afTJjthkbAOFJwe/FAnsU9MW1utBtFS3AtZbdAsL/ADAIVHynPXjir20bduBtxjFUNOvIR4ftb2YQ2sP2ZJX5CpEu0E9egFXt67N+4bMZ3Z4x61UviZNP4F6CRQxW8SRQxpHGgwqIoAUegAp9RwTw3MEc9vKksMihkkjYMrA9CCOoqSpLCiqcGqWVzqN3p8NwjXdpt86HoyBhlT7gg9RSx6lZy6nLp0dwj3kMYlkiXkopOAT6ZweOtABCYf7TulWMiUJHvfP3h82OPzq3VSGUNqdzH5aAqkZLgctndwfpj9at05bkw2+8KKKKRQUUUUAFUNKa3ZbswRGPF1IJMsTufPJ9s+lX6z9KuFnF5thSIpdSIdgxuIP3j7mqXwszl8a+ZNZadZ6csy2dtHAJpWmk2DG92OSx9TXlvx1sLSz8CmW2t4oXudRjkmKLjzH2MNx9TgDmvWwQehBryv4+kf8ACAQjPIvo8/8AfLVD2NVuej6L/wAgLT/+vaP/ANBFWLm0t7xES5gjmVHEiiRQwDA5BGe4qvo3/IC0/wD69o//AEEVceRIwC7qoJAG44yT0FMQy5toLy2e3uYY5oJBh45FDKw9waqSvbjXrWNoSZzBIUk3cKuVyMe/H5Ved1jQu7BVAySTgCqMtwF161g8mMl4JGEpHzLgrwD6HP6VUNzOpsvVfmaFFFFSaHjcn/Jzq/8AXmP/AEVXsleNSf8AJzq/9eQ/9FV7LSQ2FB6UUHpTEZ2gPbyaDZPaQmG3aIGOMsWKj0yetaNZ2gXC3Wg2U6wRwCSIN5UYwq+wFO03WbDVmuks5w8lrM0E8ZBVo3HYg889Qe46VU/iZnS1px9EX6KoabrNjq73a2MxmFrMYJHCnZvABIVujYzg471fqTQKKpXurWOnXVnb3dwsMl5IY4NwOGYDOM9AfQHr2o1DV7HS3tUu5wkl3MsECAFmdz2AHP1PQd6AI9De3k0wNawmGLzH+QsW53HPJ960aztDuBdaYsogjgzI42RjA4YjP41o1c/iZnS1px9AoooqDQKKKKAKGpvAj2PnxGQtcqIyGI2tg4Pv3q/VDU5xDJYgwpJ5lyqAuM7eDyPer9U9kRH4mFFFFSWFFFFABRRRQAVTs3uWur0TAiNZgISRjK7FP4/Nuq5XIS+J7qw8R6rpsOj6jqTxGKfNuybY0dMKPmYdSj9Ka2ZEt0cn8XvFnjXw7q2mReHo3jsZo9xmjt1maSXccxkEHAA2kcAnceeOPT9IlvZ9FsZtRhWC+kt42uYl6JIVBZRyehyOtYg8U6o3TwbrP4vbj/2pS/8ACT6r/wBCdrH/AH9t/wD47SLOmormf+En1X/oTtY/7+23/wAdo/4SfVf+hO1j/v7b/wDx2gDgtJ+KHiK/+LreG5rCGPT/ALTJB5RjPmIqg4cnPsD6c17BKSsLlRlgpI+tcx/wkWoCUzf8ITqvmEYLhrbJH18ylbxRqzIwXwfrCsRgEvb8H/v5QDNmyAvvD8A1CJCJ7ZfPjdMLyvzAg9uvFeUC5ZSdM+23n/CvDdeR9tGd2f8Anj5mc/Z93G/HPTOOa7NtY1K40c6ZqXhDV7wPB5NwweHbLlcMc+YDzz6VN/bV0bD7D/wgup/ZPL8ryc22zZjG3HmYxinLdk078iudTbxQQW0cVtHHHAihY0jAChewAHapa5Gx1q902xgsrTwVrEdvAgjjTzrc7VHAGTLmrH/CT6r/ANCdrH/fy3/+O0ijJ8ZiTUdcs7Tw5x4otl8wXatiO2hPUTcHcrdkxknkYAJq74Bks4dOuNOMMkGtW751NJzmWSU/8tC38at/CRxjA4xipE8QX8UsssfgjVUklIaRla2BcgAAk+ZycAD8KX/hI9QE5nHgrVvNK7S+633EdcZ8zpQB0EUkjajcxsuI1RCp29Sd2ee/QVBr9xfWnh3UrjTIvOv4rWR7ePGd0gUlRjvzjjvWGPEuspcySP4T1honVQiB4CVIzkn953yPyqYeKdUP/Mm6z/33b/8Axym9yY7HJfB7xP4w8Qvqg8RrJJbRbPJnltxCQ5JygwoDcflx616pXMf8JRqv/Qnax/38t/8A47S/8JRqv/Qm6x/38t//AI7SKOmrz34t+NNX8F6JZXGkQRM9xOUkmlQssYAyBj1Pv6Gtv/hKdV/6E3Wf+/lv/wDHKa/iTUpU2yeC9XdfRntyP/RlAE/gXXL3xH4L03VtRtxb3VwjF0AIBwxUMAexAB/GtTTZppluvOTaUuXRPl25UHg+/wBaxR4o1QAKPBusADgAPb8f+RKhg8Sa3biQXHhXV5i8jOhRoTtU9FPz9RTWzIfxI5zxTqt14C1iYeHR9t/tBJLm40wq8n2Ru9yNoO1M9V4z274534oaba2PwoguYNQbUpb+/juZ75n3ec5RuR2VQOAo6AYrudLvZtKnvbm38F669xeymWeaWWBnc9lyZPugcAdAK86+KQW08FSW1v4b1LSre41Jbg/aHjMSuVbIRVc7c9cAY61LNFue46L/AMgLT/8Ar2j/APQRUev6bp2q6Lc22q7VtNu9pC+wxEchw38JHXPauJ034m21vpNnE2j3ZKQIpIubbBwo9ZKi1bx7o+tWQs9Q0G8lt/MWQx/bLcBipyAwEvzDI6HimIo6PqN14m1LT9K8S3kraG2ZNOmkiMP9sFGO3zfoAG2YG/73tXpks0663bQKn+jtBIzNt6MCuBnt1PFcBqvj3RNZ09rG+8P3UkBIIAurZShByCpEuVI7EVO3xMjN7FcLp90LZI2RoTc2+5mJGG/1nbB796qO5M7207r8zpfHes6joHgzUdT0q3E95AgKKVLAZIBYjvgEn8K574ReLdd8W6FeXGuRLvgnCRTrF5YkGMnjpx7etOPxVsiMHRrwj/r4tv8A47QvxSskUKuiXYHoLi2/+O1JZzcn/Jzy/wDXmP8A0TXstfPtv4ke/wDj3Hq9ppN3MxtdotUeIyHEeM53bf1r1oeKtUP/ADJutf8AfcH/AMcpIGc58V/iPqXgV9Ng02xile6Du81wrFAFx8owRk88+gx613Hh7VW1zw5p2qvbm3a7t0mMROdhYA4z3rCvNYn1GNY77wDqN0iNuVZxbOAfUAydasDxPqgUKvg3WABwAHt+P/IlMRsaHPPc6JZzXUflzvEDIu3bg/TtXn/iiwvvFev3UnhHdbTWcbW2oXokMSXn/TuCOpHOX/h6CugsfEWuWllDb3fhbV7m4jXa8yPDhz6jMgqwnibU1GF8GauBnPD24/8AalVP4mRSvyK/YteEdQ0290KOHTbU2S2Z+zy2TDD2zr1Rh+ue+c963q5dfEepozMvgvVgWOWIktufr+9p3/CT6r/0J2sf9/Lf/wCO1JY/xrc6VHoD2mqWrXpvG8m3s4hmWaQ9NnoR13fw4zXM+FoLzQPEcCeMSZ9Uu4Vh0/UGk3xqoUZgzgbZPU/x/hiugfxHqLujv4K1ZmTJVi9uSufT95xSP4k1CYASeCtXcKwYbmtzgjof9Z1oA2tFnuLjTVkuk2S73BGzbwGIHH0rynUvE/xBi+MkelW0U/8AZBuEVYRbAxNAcbnL7c+pzng8V21n4j1y1txFd+FtXuZckmRGgxgnIH3x0HH4VZ/4SjVf+hN1j/v5b/8Axyqn8TsRSvyK/bqdPRXM/wDCT6r/ANCdrH/f23/+O0f8JPqv/Qnax/39tv8A47Ulmzq93PYaLf3ltbm5uLe3kligXrIyqSFH1Ix+NeZ/CT4h+I/GOrajaaxaxG3hi8xbiKMoI33AeWfUkEn1+U12f/CUar/0J2sf9/Lf/wCO1GviXUYgdngrV1ycna1vz+UlAG5qM00L2QhTcHuFR/lzhcHn27c1erj5fFN9LqGmW8+h6lpkc92sZluDEVbIPy/KxPP07V2FU9kRG/MwoooqSwooooAbIzJE7KhkZVJCAgFj6c8VheFPFtj4ttr2WziliazuWtpo5duQy/QkYq54h1CbS9Avby2i866SMi3iwT5kzfLGvHqxUfjXnPhCSLwj4g8XeHNOjNxfC7tDbpI2BJJNAGZieSFBV2J549TigDtr/wAY2lr4stvDVtbTXupSwmeRISoEKDu5YjGew6/nUEthrth4u1PVdPsrG7gvre2ixNdtEyGIyZ4EbZz5g/Kue+HemRTeNfFWt75JzDKumJcSbt0roAZ3OTggyYAx0VQBgV6XQBz/ANu8V/8AQC0v/wAGb/8Axmj7d4r/AOgFpf8A4M3/APjNdBRQBz/27xX/ANALS/8AwZv/APGaPt3iv/oBaX/4M3/+M10FFAHP/bvFf/QC0v8A8Gb/APxmj7d4r/6AWl/+DN//AIzXQUUAc/8AbvFX/QC0z/wZv/8AGaPt3ir/AKAWmf8Agzf/AOM10FFAHP8A27xX/wBALTP/AAZv/wDGaPt3iv8A6AWl/wDgzf8A+M10FFAHP/bvFf8A0AtL/wDBm/8A8Zo+3eKv+gFpf/gzf/4zXQUUAc/9u8Vf9ALTP/Bm/wD8Zo+3eKv+gFpn/gzf/wCM10FFAHPfbvFf/QC0v/waP/8AGaBfeLP+gFpf/g0f/wCM10NFAHP/AG7xX/0AtL/8Gb//ABmk+3eK/wDoBaX/AODN/wD4zXQ0UAc99u8V/wDQC0v/AMGb/wDxml+3eK/+gFpf/gzf/wCM10FFAHPfb/Fn/QC0r/waP/8AGawvFeg654y0ldN1PRLJYFlEoMGrsrZAI6mA+td9Xns3iS2sfibrMuoatNb6ZptjDG8GZGTzpPnLlRkAKm3Jxj5/WgDjj8EUP/MI/wDK3/8Ac1H/AApCP/oEn/wd/wD3NXt8E8VzbxzwSLJDKodHQ5DKRkEH0xUlKyHdnhn/AApCP/oEn/wd/wD3NS/8KQT/AKBR/wDB3/8Ac1e5UUWQXZ4Z/wAKQT/oEZ/7jf8A9zUn/CkV/wCgOP8AweH/AORq90qG7uobGynu7hwkEEbSyMf4VUZJ/IUWQXZ5T4a+Gl34V1uLVtP0aFrmJWVRNrRZcMMHgW4ru/t3i3/oA6V/4NH/APjNZGnnxL4n8NQ63bailhcXrRz2kGCY4LcsCNwxl3ZOueMnjGM13FMRz327xX/0AtL/APBo/wD8Zo+3eKv+gFpf/gzf/wCM10NFAHP/AG7xV/0AtM/8Gb//ABmj7d4q/wCgFpn/AIM3/wDjNdBRQBz/ANu8Vf8AQC0z/wAGb/8Axmj7d4r/AOgFpf8A4M3/APjNdBRQBz327xX/ANALS/8AwZv/APGaX7d4r/6AWmf+DN//AIzXQUUAc/8AbvFX/QC0z/wZv/8AGaPt3ir/AKAWmf8Agzf/AOM10FFAHP8A27xX/wBALS//AAZv/wDGaPt3iv8A6AWl/wDgzf8A+M10FFAHPfbvFf8A0AtL/wDBo/8A8Zo+3eLP+gFpf/g0f/4zXQ0UAcleWviTV73ShdaZp1rb2t6lzI8d+8jEKCMBTEvr61m/E261axtbS70O5uEvbbdeSwpKQstvFgyKV6H7w/lXfngZrmdNMGreKdZuZEkaOOCOxjWWJlBTBd2Ukchi4U/9c6AItUu/7fXw1/Zl9PFDfyi5aW3lZC1uIyxBx6kovturqlUKoUZwBjk5P51558OtB1TR9T1OxvsnT9Id7PTGIOXjkbzWP5GNfwNeiUAFFFFAGTrWivrJth/aNxax28yThIkjYO6Hcud6ngEA8Y6VG3hmxXWr7WrfMGqXcCQNdKqllRfTII54zx2HoK2qKAOe8IeEoPB+nT2NrfXV1DLM05Nxs3B2+8cqo68flXQ0UUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFACM21S2CcDOB1NeTeHpmk8Da8sMIn8Ta9cXLS2QA82AyMyJ5o52Kq4b5sccda9aooAz9C0xdE8P6bpSuXFnbR24c/xbFC5/HFaFFFABRRRQAVDd2sN9ZT2dygkgnjaKRD/ErDBH5GpqKAOa0Dwi2h29taPreoXtjaALa20wjVYwPu5KqGfHbJx7dMdLRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFcdcazdQ+MNegm1CaGwsdPtrhI41QkuxkBA3KSSdqgD1+tdjXCMLlviXrotba3mlGn2TK9y+EiIab5zgEkjqAMfUdaAIdI8T6pNbaNb30eqPqWoSNG6wraqsWwnzCRksAn3SSBz6EgV0Phu5u5r/xDHdXstwlrqIgh8xUGxPIif8AhA7ua5OzsNUj8UahfaHe2dxqk8QaS5laOW1uApHyYTDwNz23AgcliMhuo3t9p/gb4i3T7RepcSbjb5wrG0gGRnnAzn8KANzxB48/snwjqHiWy077dp9tgRSCcKJjv2FhwfkyRg8k88AYJ7KvMviHZQ6b8ALqxgJMNvYWsSE9SFeMAmpdZtNT8J+MfD+oWuuajeQ6tf8A2K9tbubfGdylg0aYwmNp6e1AHbaZq631xc2c0Rt7+02+fATkYYZVlbA3IecHHUEEAgitKuC1m6ksvjT4aWEgC/065t5x/eVP3i/kQfzPrXe0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVzyaBdp4x1LWUvfJhurWCBURQWyhckncCMfOMY966GigDCl8L282rW2qvM32+23eXcLFGr4ZSpBIXkYPQ5GcHqKhg8Lh7DxFY6hcfaIdYnd2IG1lRoY4iDjjPyE/jXR0UAcdYeH01XwJ/wAIb4gSRjbW8drM6EqJkTGyRG99oJ9DkGteDw5EL+0vr+8udRubMMLZ7kIPLLDBYBFALEcZPbPrW1RQBzNnpjap40bxHNEyQWtqbOxDjl9zZklx1AOFUZ7AnowrpqKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/9k=']	['phy_833_1.jpg', 'phy_833_2.jpg']
phy_834	OPEN	As <image_1>shown in the figure, the horizontal conveyor belt rotates clockwise at a constant rate of\( v_0 \), a rectangular uniform magnetic field area\( MNPQ \) with a width of\( 4L \) and high enough, with a magnetic induction intensity of\( B \), and the direction is vertical to the paper and inward, and the lower boundary of the magnetic field\( QP \) is horizontal. The rectangular conductor frame\( abcd \) is placed on the conveyor belt with no initial speed and\( ad \) coincides with\( MQ \). When\( bc \) moves to the right to\( NP \), it is exactly at the same speed as the conveyor belt. At this time, a horizontal rightward pulling force is applied to keep the conductor frame at the acceleration before being synchronized away from the magnetic field.\ ( ad \) Remove the pulling force when leaving the magnetic field and simultaneously raise\( QP \) above the conveyor belt\( L \) from the upper surface. The conductor frame continues to move to the right and comes into elastic frontal contact with the vertical fixed baffle at the right side of\( NP \)\( 4.5L \). When\( ad \) returns to\( NP \), apply a horizontal pulling force to the left, so that the conductor frame passes through the magnetic field at a constant speed at this time. It is known that the mass of the conductor frame is\( m \), the total resistance is\( R \), the length of\( ab \) is\( 3L \), and the length of\( ad \) is\( 2L \). The plane of the conductor frame is always perpendicular to the magnetic field and does not leave the conveyor belt, and the gravitational acceleration is\( g \). When the conductor frame passes through the magnetic field to the left, let the distance from\( ad \) to\( NP \) be\( x \), and find the relationship between the magnitude of the friction force\( F_f \) and\( x \) applied to the conductor frame.		"\[ F_{f1} = \mu (mg + F_{ab}) = \frac{mv_0^2}{2L} + \frac{B^2v_0^3x}{2gR} \quad (0 \leq x \leq 3L) \]
\[ F_{f2} = \mu mg = \frac{mv_0^2}{2l} \quad (3L < x \leq 4L) \]
\[ F_{f3} = \mu (mg - F_{ab}') = \frac{mv_0^2}{2L} - \frac{B^2v_0^3(7L - x)}{2gR} \quad (4L < x \leq 7L) \]"	phy	电磁学_电磁感应	['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']	['phy_834.jpg']
phy_835	OPEN	As shown in the figure<image_1>, two smooth parallel arc-shaped guide rails are placed vertically, and the lower ends are smoothly connected to two smooth parallel horizontal guide rails with a spacing of\( L \). The horizontal guide rails that are long enough are all in a vertically downward uniform magnetic field, and the magnetic induction intensity is\( B \). Place conductor rods\( a \),\( b \), and\( c \) with a length slightly longer than\( L \) on the guide rail.\ The mass of ( a \) the rod is\(2m\), the resistance connected to the circuit is\( R \), the mass of\( b \) and\( c \) the rod is\( m \), and the resistance connected to the circuit is\(2R\). It is known that the distance between the\( a \) rod and the\( b \) rod is\( d \) at the beginning, and both are in a static state. Now let the rod be released from rest from the height of\( h \) on the circular guide rail. If the rod and\( b \) rod collide, they will stick together. It is known that the magnitude of the gravitational acceleration is\( g \), the resistance of the guide rail is not counted, and the conductor bar is always perpendicular to the guide rail and in good contact during movement. If the initial distance between the\( b \) rod and the left boundary of the magnetic field\( x_0 = \frac{mR\sqrt{2gh}}{B^2L^2} \) and the\( b \) rod and the\( a \) rod do not collide, try to calculate the Joule heat generated by the\( a \),\( b \), and\( c \) rods during the entire process.		\[ \frac{5}{8}mgh \]	phy	电磁学_电磁感应	['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phy_836	OPEN	An experimental team designed an electric car to study electromagnetic drives. The principle is that the in-wheel motor forms a rotating magnetic field by controlling the energization sequence and time of the stator windings, and drives the rotor windings to drive the contour wheel to rotate. The simplified model is shown in the figure<image_1>. The stator generates multiple horizontally arranged bounded uniform magnetic fields with square boundaries, and the two adjacent magnetic fields have opposite directions. The rotor is a square wire frame placed horizontally. The magnetic field moves to the right at a constant speed of\( v \). After a period of time, the wire frame moves to the right at a constant speed of\( \frac{3}{4}v \). It is known that the magnitude of the magnetic induction is all\( B \), the side length of the magnetic field and the wire frame is both\( l \), the mass of the wire frame is\( m \), the resistance is\( R \), and the resistance is constant. A certain moment when both the magnetic field and the wire frame move at a uniform speed is recorded as the 0 moment. After that, the magnetic field moves uniformly in a straight line to the right at the acceleration\( a \). At the moment\( t_2 \), the wire frame also moves uniformly in a straight line. Find the amount of electricity\( q \) passing through the wire frame in the\( 0 \sim t_1 \) time.		\[ \frac{Blvt_1}{2R} + \frac{mat_1}{2Bl} - \frac{m^2aR}{8B^3l^3} \]	phy	电磁学_电磁感应	['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phy_837	OPEN	There is a groove $A$on the smooth horizontal ground, and a small object block $B$is placed in the center. The distance between the object block and the groove walls on the left and right sides is as shown in the figure<image_1>.$L$is $1.0\,\text{m}$. The masses of the groove and the object block are both $m$, and the dynamic friction coefficient between the two is $\mu$is $0.05$. At the beginning, the object block is stationary, and the groove moves to the right at an initial speed of $v_0=5\,\text{m/s}$. It is assumed that there is no energy loss during the collision between the object block and the groove wall, and the collision time is not counted. g$takes $10\,\text{m/s}^2$. Find: The time from the beginning of the groove movement to the moment when the two just stand still relative to each other and the displacement of the groove movement during this time.		5s, 12.75m	phy	力学_动量及其守恒定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCABkAU0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAGySJDG0kjbUUZJ9KrWWp2WpIz2VzHOqnBZDkA/Wq/iS7+weGNVuwVDQ2krqW6ZCnH61z/wAKrFbL4caQdpWW4i+0S56l2OTQB2dFFFABRRRQAUUUUAFFcT421rU9P1zw9p+l3G2TUboxzLtyVjA5YU2213VrH4lxeGZp0vrWaxN0zhcPAQ2Bu7YNAHcUUUUAFFFFABRRRQBTk1WwivVspLqNblukRPzH8KuV5zbquqfHC6mUApp1gI2z/fY16NQAUUUUAFFFFABRRRQAUUUUAFFQLe2z3r2SzIblEEjRA8hT0JqegAooooAKKKKAOO1i5vj4/wBFsor2RIBHPdXEaNhRCqhRu9yz5/4DWxpNwllpafarxnDu7RNM2XKdefpU9zoWn3eqLqUsTfahF5JdZGXcmc7WAOCM+tZGu6dctrEd1Gpa3+xTQBAOA7L8v59KAOkluYorV7lnHkohcsOeAM5rnYfGtvcQRzw6PrbxSKGR10+QhgeQRxU8NpPY+Bmtrli00dmwYn12mrfhn/kVdJ/684v/AEAUAP0fWrbWoZZII54mify5I54jG6n3BrSrnPDhA1LXSSAPtn/soroI5Y5lLRyK4BxlTnmgB9FFFABRRRQByvxD0rVde8HX2jaTEpnvFCGR5AoQZBPvzjFIsnia00WCy0/RbaOWOJYg8lwu1cDGcCtbW7a8miWW31ybS448l2jhicN9d6nH4VzFtcXVzqw0seOr6O9ZS6Qy2NsrOo6lf3fIoA7i3jeK2jjeRpHVQC7dWPrUlV7GCe2tEiubx7uVfvTOiqW/BQB+lWKACiiigAooqNZ4XkaNZELr95QeR+FAHmXiGGw174yafaXJjaDTNPZ7hZWwMuflx703wbHDB8VdXh8OyPP4eWyX7TLu3xrd7vuo3+71A71u6jrvhW2uboz6M8xhm8qWZLHeu/03Y5Nbmh65p+oyz2NnbTWr2saO0MsPlYRywUgemUb8qANqio0nilZljkRmX7wU5xUlABRRRQAUjkqhKqWIHCg9aWoriOSW3kjinaCRlIWVVBKH1weD+NAHB6FpHiPSvFeu61PpcUp1F18tUuFBRF6A89a6rRf7allurjWI4YNzbbe3hfcFQd2P94muc1SW90dWe88b6gkaf6yQWFuVj/3j5fFdBodreov2ubxFNqttMgMYaCFFH+0CigmgDaooooAKKKKACsbVPElrpd/HZG2vbm5ePzdlrbNKVXOMnA45BrVM8KyiJpUEh6KTyawf+aht/wBgxf8A0Y1AEln4rtbrUYbKSx1K1lnz5ZubR41YjqMkYrR1bU7fRtKuNQumxFCu4jPLHoFHuTgD61la5/yMvh//AK6S/wDoNPv9Pv8AUfEVm1xBE2k2wZ9hflpcYDEdwATx64PagDgdMuV0r4t6dcvqMNzJrdoyXRik3KsoOVRfYDivXa4fxn4TvNWv9FutGgtoZtOuRceYxC59V4rtkLFFLLtYjkZzg0AOooooAKztVg1WdYxpl9BasD85mg8zP05GK0aKAOc/s/xb/wBB3T//AAAP/wAXSHT/ABbj/kO2H/gAf/i66SigDyeLQPiFbS6rcXOu266WySFYHi3HGD0Gcj8zXofhn/kVdJ/684v/AEAVPrX/ACA77/rg/wD6Cag8M/8AIq6T/wBecX/oAoA4658JnxTNrkA1e/sCLs4NrJtB+Ude5/Orvhz4fS6NpCWMmuX+Y2PzQuqh/cgg8/jU1lq66LrGsR3NjfN5tzvRoodysNo75rR/4TGz/wCfDU//AAH/APr0AJ/wiZ/6Durf9/V/+Jo/4RM/9B3Vv+/q/wDxNL/wmNn/AM+Gp/8AgP8A/Xo/4TGz/wCfDU//AAH/APr0AJ/wiZ/6Durf9/V/+Jo/4RM/9B3Vv+/q/wDxNL/wmNn/AM+Gp/8AgP8A/Xo/4TGz/wCfDU//AAH/APr0AXdW0RNV8PS6TJd3Eauir9oRgJAQQQc+uRXL3mm/8JL4z0WSEOLPQGLvenhpZcYEYPcdzVjXvEjajpEtrp66lZ3D4Am+ybsDvxmudsbnWI7izS91K+ksbeVJTDDpwjL7TkAnd6jmgD0HUtDOo3Im/tO+tsDGyBwF/UGqX/CJn/oO6t/39X/4ml/4TGz/AOfDU/8AwH/+vR/wmNn/AM+Gp/8AgP8A/XoAT/hEz/0HdW/7+r/8TR/wiZ/6Durf9/V/+Jpf+Exs/wDnw1P/AMB//r0f8JjZ/wDPhqf/AID/AP16AE/4RM/9B3Vv+/q//E1zN58K5b3xR/ap8R6lAiqq4ikCvJj+8wAz+INdP/wmNn/z4an/AOA//wBej/hMbP8A58NT/wDAf/69AHMmE2/hjVoTK8uzWCN8h+ZvmHJq3q2gnxF4w1myGpXljnSrE+ZavsY/vLnqev5Vkz6o76RqcC6ZqPmT6mbhB5HVNwOeta1p4hji8Y6jqDadqX2ebT7WFG+z9WR5yw6+jrQAzwx8NptAtri3fX9QkDyeYJUcBm/3sgkn8a3f+ETP/Qd1b/v6v/xNL/wmNn/z4an/AOA//wBej/hMbP8A58NT/wDAf/69ACf8Imf+g7q3/f1f/iaP+ETP/Qd1b/v6v/xNL/wmNn/z4an/AOA//wBej/hMbP8A58NT/wDAf/69ACf8Imf+g7q3/f1f/iatafoBsLxbj+1dQuNoI8uaRSpyPYCq3/CY2f8Az4an/wCA/wD9ej/hMbP/AJ8NT/8AAf8A+vQBm67YjSrLV47ee6vbrWFMUNo7blRmGMj0HOTWnoHhttK8F2Wgtdyq0ECxNNCQGBA7da4i4vNeOrXN7a6peRiRjsD6YGKL/dB3V1Ok+J0stMggvIdTurlV/eTfZcb27nGaALn/AAiZ/wCg7q3/AH9X/wCJo/4RM/8AQd1b/v6v/wATS/8ACY2f/Phqf/gP/wDXo/4TGz/58NT/APAf/wCvQAn/AAiZ/wCg7q3/AH9X/wCJo/4RM/8AQd1b/v6v/wATS/8ACY2f/Phqf/gP/wDXo/4TGz/58NT/APAf/wCvQBzniP4Xza9eWci+ItQgW3yTJvHmH2DADArU0fTP7I8ZLZ/bLm7CaYuJLlgz/wCsbuAKv/8ACY2f/Phqf/gP/wDXqrpd6dV8ay3sVpdRQLYLFunj25bexwOfQ0AWtc/5GXw//wBdJf8A0Guirndc/wCRl8P/APXSX/0GuioAKKKKACiiigBssiQxNJIwRFGWYngCsU+MvDajJ1uxA9TMK2J5IooHkmZViVSXLdAK5SKxg8RzrqN3bRQaNbnzLeJ0C+cR/wAtH/2fQfjQBpnxj4bAydbsQB3Mwo/4THw3jP8AbdjjrnzhWWtnB4snEzW0cOgQNuTKBTeMP4j6Rjt6nnpila1g8VXBhht4o9DhbDyBADcsP4V/2B3PegCfVvF3h6XRrxY9ZsmZoHCgSg54NQ+HPFvh+LwzpaPrFmrLaRAgyjg7RTZbWDxNM2n2UEUWiwnZcTogBnx/yzQ/3fU0txDBrVw2jaRBDDp9v+6u7tEGBj/llGfX1Pbp1oA0x4w8NsMjWrEj1EwoHjDw0wyNasSPaYVmT21veSDw/odvDDbwKEurlUGIl/uKe7H9KJ7eAFPDnh63hjeJQLm62Ai2U+/eQ9h26ntQBpjxh4aOca1YnBwcSigeMPDRzjWrE46/vRWZLbWmnpF4c0C1hN3tzLMyBhAp6u57sew70SW1ro0Ueh6LaQz6lKNzySIGEeesjn+Q70AaY8YeGiSBrVjkdf3o4o/4TDw1kj+2rHI7eaKzJLaz8O28eladaR3us3ZMh3qCST96WQ9l/wD1Cg2lp4btRbx28d/rd8245QZkbux/uoKANP8A4TDw1nH9tWOeuPNFH/CYeGs4/tqxzjOPNFZn2S08N2pklt47/XL9sLGqDMj+g9EX1pFsrTw5A9/qEMd9rd8RGkUaDLt1EaDso7n2JNAGp/wmHhrIH9tWOT280UHxh4aBAOtWOT0Hmjms1LK00CCTVtXhiudVusIsUSA8npFGP6/jSR2Vpo8UviDXooWvpQEjhjQN5YP3Yox3P8zmgDTPjDw0MZ1qxGeB+9HNB8YeGhjOtWIzxzKKzIbG3tFk8SeIoIIZguILYKCLZD0UY+9IeMn14HAogsbclvEevwQ20UKk29syDEKnuR3c+n4UAaZ8YeGlGTrViBnHMooPjDw0Bk61YgeplFZltp8N/L/wkOt28NpZWoMtrbSKFES45lk/2sfkKILGHXpl1fUbWO10i3PmWsEkYUvj/lrIO3qAenegDTPjDw2ASdasQB1JlFH/AAmHhsDJ1qxx1/1orLisYPE1wL65to4dEgbfBGyBftBH/LRv9n0/OgWcPi24Di3ji8PwtkfIAb1gev8A1zBH/Ajz0AoA1P8AhMPDeM/21Y46580UDxh4bIBGtWJz6Sisx7aDxVcG2treKPQ4G2yzKgH2lh/Ap/ujue/SkmtoPEkzaZp8EUOjw/u7m4RAPOx1jQ+nqfwoA1B4w8NMAV1qxIPQiUUDxh4abprVifpKKzLiKHV7htD0W3ihsrb91eXiIMJjrFGe7die31ont7ed18O6DbQwxQKEublUBEK/3Ae7kflQBpjxh4aPTWrE/SUUDxh4aJIGtWJwcH96OKzJ7eCIx+G/D1vDHLGo+0XWwEWynvnvIew/E9qJLa00uOLw5oFpC98y7pJXQMIFPWRz6nsO59hQBpjxh4aJIGtWOR1Hmjij/hMPDRJH9tWOR1HmjisyS2tNEhj0XR7WG51Wf52eRAdmessh/p3okt7Pw3bx6bYWkd/rV4TJ86jLsessh/hUf/WFAGn/AMJh4azj+2rHPXHmij/hMPDWcf21Y56480VmG0s/DVqIxBHqGuX7ZPyDMr+uP4UX9BR9ktPDdq1xc28d9rd+2FjVBmRuyqOyL60Aaf8AwmHhoMB/bVjk8geaKP8AhMfDQIH9tWOT0HnCstbK18PQvqWpQR3ut3xESRRoCWPVYox2UdSfYk9KcllaaFDJrGswwz6pc4RYokBxnpFGP60AaR8Y+GgQDrViCeg84c0f8Jj4aUgHW7EE8D98OazY7G00mKXxBr8UP22QBI4UQN5YPSJB3Y/qaIbC3tg/iTxFBBDKq4gtgoItkPRf9qQ8ZPrwOlAFTWvFWgP4g0ORdXsykckm9hKMLleM1unxl4bUZOt2I5xzMKzILG3kZvEWvW8NtDCpNtbMg/cqf4mHdz6fhS29hBqMo1/WbeG0sLYGW1t5FCiMY/1snvjp6CgDSPjLw2oy2t2IHqZhS/8ACYeHP+g1Zen+uFZUNjD4gnXVb+1jttHgPmW0EkYUy46SuOw7gH8adFYw+KbpbqW1ji0WFt0KFADcsP4z/s+nrQB1oIYAg5B5BpaAAAAOlFACMqupVgCD1B71lapo76rLBBLOF01OZLdRgykdAT/d9q1qKAMrVtJl1NLezWcQaeP+PiKMYaRR0QHsvrRqWkyXlnDYW0wtbIYWZYxhmT+6D2BrVooAyr7SpZdNi07TpxY2/CSGMYcR9wp7E+tFxpLxaMmm6RIljGoCblXJVO+Pf3rVooAyjpLWei/2fpEq2p6eaw3Hn7ze7H1NLFpLabor2WkukM5GRNKu4lj1c+p61qUUAZVlo/8AZWlywWEg+1yZZ7iYbi8h/ib1o07R/wCy7GYQSCS+my0lxKMl39T7e1atFAGVpWjf2ZDNK0vn6jcfNPcyDl27D2UdAPSk0rRmsWmu7mUXOpT/AOsnI4A7Ko7KPStaigDJ0zRja3c1/ezC5v5eDLjAROyqOwpNN0Z4L+bU9QmFzqEmUVwMLDHn7iDsPU9T3rXooAyLTRmGqy6nfzC4uclYABhYU9FHr6miLRmk1p9T1CYTyRkraRgYWBfUD+8e5rXooAyH0ZrvW/t9/MJooMfZLcDCxnHLn1bsD2HTqaLjRnv9YS6vphLawYa3tgPlD/3m9T6ela9FAGRf6M+qanC97Mr6dBh0tAOHkByGf1A6gdM89qNU0d9Wu4EuZx/ZsfzPbKP9a3bcf7vtWvRQBk6to8mrPBbSThNNXmaBBgykdFJ/u+1Lq2ky6lBb2MdwLfT+lxHGMNIoxhAeynnPtx61q0UAZWo6TJdWEOn2cy2dmMLKsa4Yxj+FT2z/ACovdKlbS49O0ycWMPCO0Y+cR9wh7E+tatFAGXNpLW+iLpujyR2KqAgYLnYvfH+17mkGkNY6L/Z+kSLbP081xuOT95j6sfU1q0UAZUGktpmiyWmlSJFcsCfPlXcS56u3qaLDR/7J0yaGykDXkuXkuZxuMkh/ib1+latFAGVpmj/2XZzGOQTX82WluZRku/v7e1GkaN/ZqTTyS/aNRuPmnuXHLHsB6KOwrVooAyNK0ZrKWa9u5hc6lP8AfmIwFXsijso/+vS6bozW97NqN9MLm+l+USYwsadlUdh6+ta1FAGRp2jNDqE2p6hMLm/kyiOBhYY8/cQdu2T1P4UWujN/a0mp38wuLgErbqBhYU9h6nua16KAMiPRml1ptSv5hO0ZItYgMLCvrjux9aJNGa81sX1/MJoIMfZLcDCoccu3q3p6D8a16KAMi50Z9Q1eO5vZhJaQYaC2A43/AN5vUjtRf6M+qalC95MH06DDragcPIDwX9QOoHrzWvRQBk6po8mrXMEdxOBpqfNJbqMGVuwY/wB32o1XSZNUaC3acRacvMsKDBlx0XPZfataigBAAqhQMADAFLRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB//2Q==']	['phy_837.jpg']
phy_838	OPEN	In order to study the sliding of surface objects during the movement of the iceberg, Xiaoxing found a water tank long enough and placed a carriage with a mass of $M$and a length of $L$in the water tank to simulate the iceberg. There was a slider with a mass of $m$($m&lt;M$) and negligible volume in the carriage<image_1>. The upper and lower surfaces of the carriage are smooth, and the collision between the carriage and the slider is elastic and the collision time is ignored. At the beginning, the water tank was not filled with water, and the distance between the slider and the left side of the carriage was $d$. Apply a constant force of $F$and horizontally to the right on the carriage. Remove the horizontal constant force when the carriage is about to collide with the slider for the first time. If a certain depth of water is filled in the water tank, the carriage will not float in the water tank. At the beginning, the distance between the slider and the left side of the carriage is $d$. Due to external collision, the speed of the carriage becomes $v_0^*$in a very short time, and the direction is horizontal to the right. The relationship between the magnitude of resistance to water during the carriage's movement and the rate is $f=kv$($k$is a known constant). Except for the first collision, the carriage will stop before each subsequent collision between the carriage and the slider. Find the total distance traveled by the entire carriage.		d + \frac{3M^2 - Mm}{k(M + m)} \left( v_0' - \frac{kd}{M} \right)	phy	力学_动量及其守恒定律	['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phy_839	OPEN	<image_1>As shown in the figure, there is a horizontal and rightward uniform strong electric field (not shown in the figure) in the space. The electric field strength is $E=250\,\text{V/m}$. There is a uniformly charged long plate $A$on the insulated horizontal plane. There is an insulating baffle on the right side. The upper surface of the long plate $A$is smooth, and the dynamic friction factor between the lower surface and the horizontal plane is $\mu=0.2$. An insulating object $B$is resting at the left end of the long plate. The masses of the long plate $A$and the object $B$are both $m=1\,\text{kg}$, the length of the long plate $A$is $l=0.48\,\text{m}$, and the long plate $A$carries a positive charge of $q=1.6\times10^{-2}\,\text{C}$. At a certain moment, a horizontal and rightward constant force $F=6\,\text{N}$is applied to the object $B$. During the movement, the collision between the object $B$and the baffle is elastic and the collision time is extremely short. The horizontal plane is long enough. The electric field area is large enough. During the movement, the amount of charge carried by the long plate $A$and the charge distribution do not change. The maximum static friction force is equal to the sliding friction force.$g$is taken as $10\,\text{m/s}^2$. Request: From the beginning to the $n $collision with the baffle, the displacement of the long plate is $x_0$.		\[ x_0 = 0.48 \left( 2n^2 - 2n \right) \,\text{m} \quad (n=1,2,3,\cdots) \]	phy	力学_动量及其守恒定律	['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phy_840	OPEN	As shown in the figure<image_1>, above the rough insulation horizontal plane, there is a uniform electric field horizontally to the right in the space to the right of the vertical line $MN$. Multiple identical non-charged insulation sliders are arranged on a straight line in the direction of the electric field, and the numbers are in order. It is 2, 3, 4... the spacing between them is $L$, and the distance between the No. 2 slider and the boundary of $MN$is also $L$. Another positively charged slider numbered 1 enters the electric field from the left boundary at an initial velocity of $v_0$. The mass of all sliders is $m$, and the dynamic friction coefficient between the slider and the horizontal plane is $\mu=\frac{v_0^2}{250gL}$. The electric field force applied to slider 1 is always $F_0=\frac{mv_0^2}{750L}$. All sliders are in a straight line and can be seen as particles. The sliders will stick together after touching. The gravitational acceleration is known to be $g$. Possible mathematical formulas are: $1^2 + 2^2 + 3^2 + \cdots + n^2 = \frac{n(n+1)(2n+1)}{6}$, finding: the maximum number of the slider that can collide.		6	phy	力学_动量及其守恒定律	['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phy_841	OPEN	<image_1>As shown in the figure, the masses of blocks $A$ and $B$ are $m_A=2,text{kg}$,$m_B=1,text{kg}$, respectively, connected by a light rope and tied to the ceiling with a light spring with a stiffness coefficient $k=500,text{N/m}$ and hung on the ceiling without moving. Directly below $B$ is a quarter-smooth fixed arc orbit with a radius of $R=0.6,text{m}$, the height of which $a$ is $h=0.2,text{m}$ from the block $B$. At some point, the rope between $A$ and $B$ is cut, and then $A$ does a simple harmonic motion of the period $T=0.4,text{s}$, $B$ falls and smoothly enters a smooth fixed arc orbit from the $a$ point. When $A$ reaches the equilibrium position for the second time, $B$ moves exactly to the end of the arc and collides with the slider $C$ with a mass of $m_C=0.6,text{kg}$ to form the slider $D$. $D$ smoothly slides on a conveyor belt of equal height to the end of the arc, the horizontal length of the conveyor belt is $L=1,text{m}$, and rotates clockwise at the speed of $v_0=1,text{m/s}$, and the dynamic friction factor between $D$ and the conveyor belt is $mu=0.2$. At the right end of the conveyor belt, there is a fixed horizontal platform of the same height, the surface of the platform is smooth, and 2024 small balls with a mass of $m_i=3.2,text{kg}$ that are close to each other are placed on the platform, and $D$ can smoothly slide on the platform, and the collision between $D$ and the ball, and between the ball and the ball is an elastic positive collision ($A$, $B$, $D$, and the ball can be regarded as a particle, and the gravitational acceleration $g=10, text{m/s}^2$, ignoring air resistance). Find: The heat generated by friction between $D$ and the conveyor belt during the whole movement.		\[ Q = 4 - \frac{12}{5} \left( \frac{1}{3} \right)^{2024} \, \text{J} \]	phy	力学_动量及其守恒定律	['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']	['phy_841.jpg']
phy_842	OPEN	<image_1>As shown in the figure, a horizontal long straight track $ABC$is fixed on the horizontal ground. The sections $AB$and $BC$are long enough. A small object block $P$is placed at the $A$point of the horizontal track. There are $n$small objects along the track in the $BC$section. The spacing between two adjacent small objects is $L=1\,\text{m}$, and they are numbered 1, 2, 3,...,$ n$, where the distance between the No. 1 small object block and the $B$point is also $L$. The small object $P$starts to move from the $A$point under the action of the horizontal rightward pulling force $F$. Before the $P$reaches the $B$point, it has already started to move at a constant speed. The power of the pulling force $F$is constant at $P_0= 28\\\text {W}$. The $F$is removed immediately before the object $P$moves to the $B$point. After that, the object $P$slides up the $BC$section. After the movement, the object $P$collides with the No. 1 object. After the collision, the two stick together and continue to move forward.$L$collides with the No. 2 object. After impact, the three stick together and continue to move forward.$L$collides with No. 3 object. After that, each time the two objects collide, they stick together and move forward and collide with the next object. It is known that the dynamic friction coefficient between the mass and the $AB$segment track is $\mu_0=0.2$, the dynamic friction coefficient between the mass and the $BC$segment track is $\mu=0.07$, and the mass of each mass is $m=1\,\text{kg}$. All mass is regarded as a particle, and the local gravity acceleration $g$is taken as $10\,\text{m/s}^2$. Ask: At most, a few collisions can occur.		7	phy	力学_动量及其守恒定律	['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phy_843	OPEN	<image_1>As shown in the figure, a ring with a radius of $R$is placed horizontally and fixed, and there are small balls $A$and $B$with masses of $m_A$and $m_B$in the ring ($m_A &gt; m_B$). At the beginning, the small ball $A$moves in the tangential direction of the ring at an initial speed of $v_0$and collides with the stationary small ball $B$. Regardless of the friction between the small ball and the ring, the two small balls always move in the ring. If there is an inelastic collision between the small balls $A$and $B$, the relative velocity after each collision is $e$times the relative velocity before the collision ($0 &lt; e &lt; 1$). Find the distance traveled by the small ball $B$from the first collision to the $2n+1$collision.		\[ s = \frac{2\pi R m_A}{m_A + m_B} \cdot \frac{e^{2n} - 1}{e^{2n}(e - 1)} \]	phy	力学_动量及其守恒定律	['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phy_844	OPEN	<image_1>As shown in the figure, the smooth circular arc orbit $AB$is fixed on the horizontal plane and smoothly connected with the horizontal plane. The lowest point of the circular arc orbit $A$is stationary and places the objects $b,c$(which can be regarded as particles). The masses of $b,c$are $m, 2m $respectively. There is a small amount of gunpowder (the mass can be ignored) between $b, c $. At a certain time, the gunpowder burns and quickly separates $b,c$. After separation,$b$rushes up the arc to the left at the speed of $v_0$. After a period of time, it returns to the separation position of $b,c$and continues to move to the right. When $c$stops moving,$b$collides with it for the first time. It is known that all collisions between $b$and $c$are elastic collisions, that there is no friction between $b$and the horizontal plane, that the dynamic friction coefficient between $c$and the horizontal plane is $\mu$, that the maximum static friction force is equal to the sliding friction force, and that the magnitude of the gravitational acceleration is $g$. Given that the time it takes for the object $b$to rush up the arc from the bottom of the arc to return to the bottom of the arc again is independent of the speed at which the object $b$rushes up the arc, the radius of the arc $R$can be expressed as $\pi\sqrt{\frac{R}{g}}$($R$is the unknown quantity in the question) to find the displacement of $c$from the $n$th collision to the $n+1$th collision ($n=1,2,3,\ldots$).		\[ x_cn = \left( \frac{1}{9} \right)^{n-1} \times \frac{2 v_0^2}{9 \mu g} \]	phy	力学_动量及其守恒定律	['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phy_845	OPEN	As shown in the figure<image_1>, there is a sufficiently long wooden board $A$with a mass of $m_A = 1\text {kg}$on a smooth horizontal track that is long enough, and a slider $B$with a mass of $m_B = 4\text {kg}$is placed on the left end of $A$. The dynamic friction factor between $A$and $B$is $\mu = 0.2$. There are 2025 identical sliders placed in turn on the horizontal track at a certain distance. The masses of the sliders are all $m = 1\text {kg}$, and the numbers are 1, 2, 3... 2025. At the beginning, the wooden board $A$was still, and now the slider $B$instantly achieves an initial horizontal rightward velocity $v_0 = 5 \text{m/s}$. When $A$and $B$just reached the same speed, the wooden board $A$happened to collide with the slider 1 for the first time. After a period of time, when $A$and $B$just reached the same speed again, the wooden board $A$happened to collide with the slider 1 for the second time. After that, every time $A$, When $B$just reached the same speed, the wooden board $A$collided elastically with the slider 1 until the wooden board $A$collided 2025 times with the slider 1. The magnitude of the gravitational acceleration is $g = 10 \text{m/s}^2$. The collisions between the sliders are elastic collisions. Each collision time is extremely short, and the sliders can be regarded as particle particles. Ask: The total energy lost by the system composed of $A$and $B$from the time the slider $B$starts to move to the right until the wooden board $A$is about to collide with slider 1 for the 2025th time,$\Delta E$(can be expressed in fractions, such as the expression: $\left( \frac{a}{b} \right)^n$,$a$,$b$, and $n$are specific values).		\Delta E = \left[ 50 - \frac{125}{2} \times \left( \frac{4}{5} \right)^{4050} \right] \text{J}	phy	力学_动量及其守恒定律	['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phy_846	OPEN	There is a three-rail sliding door with an internal width of $L_1=2.75m$. The top view of the three door panels is shown in Figure A<image_1>. The width is $L_2=1m$, the mass is $m_0=20kg$, and the friction coefficient with the track is $\mu=0.01$. The height of the raised part on the edge of each door panel is $d=0.05m$. The collision between the raised parts of the door panel is completely non-elastic (non-adhesion), and the collision between the door panel and the door frame is elastic. At the beginning, the three door panels were still on the far left side that they could reach (as shown in Figure B<image_2>). Use a constant force of $F$to pull the No. 3 door panel horizontally to the right, and withdraw $F$after a displacement of $s=0.3m$. After a period of time, the raised part on the left side of the No. 3 door panel collided with the raised part on the right side of the No. 2 door panel. After the collision, the No. 3 door panel moved to the right and just reached the far right side of the door frame (as shown in Figure C<image_3>). Gravity acceleration $g=10m/s^2$. Request: If the force $F$is adjustable, but $F$remains constant during each action and the displacement applied by $F$is $s$, to ensure that No. 2 door panel does not collide with No. 1 door panel, please write down the relationship between the distance traveled by No. 3 door panel $x$and $F$.		If $F \leq 2\text{N}$, Door 3 remains stationary with $x = 0\ \text{m}$; if $2\text{N} < F \leq \frac{17}{3}\text{N}$, then $x = 0.15F\ \text{m}$; if $\frac{17}{3}\text{N} < F < \frac{85}{3}\text{N}$, then $x = \frac{3(F + 17)}{80}\ \text{m}$	phy	力学_动量及其守恒定律	['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'phy_846_2.jpg', 'phy_846_3.jpg']
phy_847	OPEN	As <image_1>shown in the figure, the smooth circular arc track $AB$is fixed on the horizontal plane and is smoothly connected with the horizontal plane. The lowest point of the circular arc track $A$places objects $b$and $c$(which can be regarded as particle particles). The masses of $b$and $c$are $m$and $2m$respectively. There is a small amount of gunpowder (the quality is negligible) between $b$and $c $. At a certain moment, the gunpowder burns to quickly separate $b$and $c$. After separation,$b$rushes to the left at a speed of $v_0$. After a period of time, it returned to the separated positions of $b$and $c$again and continued to move to the right. When $c$just stopped moving,$b$collided with it for the first time. It is known that all collisions between $b$and $c$are elastic collisions, that there is no friction between $b$and the horizontal plane, that the dynamic friction coefficient between $c$and the horizontal plane is $\mu$, that the maximum static friction force is equal to the sliding friction force, and that the magnitude of the gravitational acceleration is $g$. It is known that the time it takes for the block $b$to rush into the arc from the bottom end of the arc to return to the bottom end of the arc is independent of the speed at which $b$hits the arc. The radius of the arc $R$can be expressed as $\pi \sqrt{\frac{R}{g}}$($R$is an unknown quantity in the question) to calculate the displacement of $b$,$c$after the $n $$$$$$n $$$n+1$$$$$$		x_{cn} = \left( \frac{1}{9} \right)^{n-1} \times \frac{2v_0^2}{9\mu g}	phy	力学_动量及其守恒定律	['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phy_848	OPEN	As <image_1>shown in the figure, the distance between the end of the smooth inclined surface with an inclination of $\theta$and the left end of the horizontal conveyor belt $D$smoothly connected conveyor belt $DC$is $L$. The speed of movement in the clockwise direction is $v_0$. The right end $C$is smoothly connected to a smooth and long enough horizontal platform with $n$small sliders with a mass of $2m$. The numbers are $B_1, B_2, B_3, B_4... B_n$。Release the slider $A$with a mass of $m$from a certain height on the inclined surface from rest. When the slider $A$slides to the right end of the conveyor belt $C$, it is exactly the same speed as the conveyor belt. Collisions between small sliders are elastic collisions. It is known that the dynamic friction coefficient between the conveyor belts is $\mu$, the gravitational acceleration is $g$, and the sliders are regarded as mass particles. Calculate the number of times the small slider is collided with $B_1$.		2n-1	phy	力学_动量及其守恒定律	['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']	['phy_848.jpg']
phy_849	OPEN	As <image_1>shown in the figure, fix a trolley with a mass of $M = 1 \text{kg}$on a smooth horizontal surface through a locking device. The $AB$part on the left side of the trolley is a quarter of the radius of $R = 1.2 \text{m}$. Smooth circular arc track, the end of the track is smoothly connected to a horizontal rough surface $BC$with a length of $L = 3.8 \text{m}$, and the right end of the rough surface is a baffle. Release a mass (which can be regarded as a particle) with a mass of $m = 0.5 \text{kg}$from the point $A$at the top of the circular arc track on the left side of the cart from rest. The dynamic friction factor between the mass and the rough area $BC$of the cart is $\mu = 0.06$. There is no mechanical energy loss in the collision between the mass and the baffle. Take the gravity acceleration $g = 10 \text{m/s}^2$. If the car is unlocked and the object is still released from rest from the $A$point, the object will collide with the right baffle of the car multiple times. Calculate the displacement of the car during the entire movement.		1.33m	phy	力学_动量及其守恒定律	['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']	['phy_849.jpg']
phy_850	OPEN	As <image_1>shown in the figure, the horizontal conveyor belt moves counterclockwise at a speed of $v_0 = 2 \text{m/s}$. The left end of the conveyor belt is smoothly connected to the horizontal ground. The conveyor belt is tangent to a fixed quarter-smooth circular arc track. The object $a$slides down from rest from the highest point of the circular arc track and slides over the conveyor belt, and elastically collides with the object $b$that is still on the right end of the horizontal ground. It is known that the mass $m = 0.1 \text{kg}$of the mass $a$, and the mass $M = 0.3 \text{kg}$of the mass $b$can be regarded as a particle. The radius of the circular arc track is $r = 1.25 \text{m}$, the distance between the left and right ends of the conveyor belt is $d = 4.5 \text{m}$, and the dynamic friction coefficients between the mass $a$and the conveyor belt and the horizontal ground are both $\mu_1 = 0.1$. The friction coefficient between the mass $b$and the horizontal ground $\mu_2 = 0.5$, the gravitational acceleration $g = 10 \text{m/s}^2$, and the collision time is extremely short. Ask: The final distance between two objects when they collide.		0.48m	phy	力学_动量及其守恒定律	['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phy_851	OPEN	As shown<image_1>, the semicircular smooth track $AB$is fixed in the vertical plane and tangent to the smooth horizontal plane $BC$at the $B$point. On the right side of horizontal plane $BC$is a horizontal conveyor belt that turns clockwise, and the smooth horizontal plane $DF$adjacent to the conveyor belt is long enough.$ A vertical baffle is fixed at F$, and the object rebounds at the original rate after hitting the baffle. The existing object block $P$just passes through the highest point of the arc $A$and moves along the arc to the point $B$. At this time, the speed is $v_B = 5 \text{m/s}$.$ Stand a block of $Q$on DF$. It is known that $P$and $Q$can be regarded as particle particles, and the masses are $m = 1\text {kg}$,$M = 3\text {kg}$, and the collision between $P$and $Q$is an elastic collision. The length of the conveyor belt is $L = 5 \text{m}$, and the dynamic friction coefficient between the mass $P$and the conveyor belt is $\mu = 0.2$. Regardless of the mechanical energy loss when the object slides up and down the conveyor belt, the gravitational acceleration is $g = 10 \text{m/s}^2$, regardless of air resistance, and the result can be expressed in a radical form. Request: If the conveyor belt speed is $5 \text{m/s}$, the total time for the object $P$to move on the conveyor belt from the end of the first collision of $P$and $Q$to the end of the 2024th collision is $t$. (Collisions always occur on $DF$)		t = 7585 - 1011\sqrt{5}	phy	力学_动量及其守恒定律	['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phy_852	OPEN	As <image_1>shown in the figure, the slider with a smooth bottom is resting on the smooth horizontal ground. There is a smooth chute on the slider. The chute consists of a straight line section $AB$with a length of $l = 5\text {m}$and a section of arc $BC$with a radius of $R = 2\text {m}$, which are tangent at the point $B$.$ The angle between the AB$segment and the horizontal direction is $\alpha (\tan \alpha = \frac{3}{4})$, and the angle between $OC$and the vertical direction is also $\alpha$. Now, let a smooth ball with mass $m = 5 \text{kg}$(The density is extremely high and can be regarded as a particle) It is released from rest at a height of $h$directly above the $A$point. The small ball will not bounce up after falling into the chute and colliding with the chute. It will immediately slide down $AB$relative to the chute. The collision time is ignored; After that, it slides out of the $C$point on the chute and falls into the inclined plane along the tangent line from the top $D$of the fixed inclined plane on the right through $t = 2.4 \text{s}$. The angle between the inclined plane and the vertical direction is $\theta (\tan \theta = \frac{1}{2})$.$ C$and $D$are equal to each other, and the air resistance on the small ball is ignored. Request: The height of the ball release point from the point $A$is $h$.		15m	phy	力学_动量及其守恒定律	['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']	['phy_852.jpg']
phy_853	OPEN	<image_1>As shown in the figure, a heating wire with a resistance of $R = 9\Omega $is fixed to the side wall of an insulating rectangular box. The total volume of the box is $V = 2\times 10^{-3}$ m$There is a piston regardless of mass in the box, regardless of friction with the inner wall of the box. A certain mass of ideal gas is enclosed on the left side of the piston, the external atmospheric pressure is $p_0 = 10^5$ Pa, and a snap ring is provided at the box mouth. The resistance wire forms a closed loop with a circular coil through a wire. The coil is placed in a bounded uniform magnetic field. The coil plane is perpendicular to the direction of the magnetic field. The rate of change of magnetic induction intensity with time is $k = 0.5T/s$. The number of turns of the coil is known as $n = 100$, the area is $S = 0.2 $m$^2 $, and the resistance of the coil is $r = 1 \Omega$. Initially, the distance from the piston to the right box opening is twice the distance from the left box bottom. The circuit is turned on to slowly heat the gas. The temperature of the gas before heating is $T_0$. After a period of time, the piston slowly moves to the mouth of the box. During this process, the internal energy of the gas in the box increases by 100J. If all the heat generated by the heating wire is absorbed by the gas, determine the energization time of the circuit at this time.		\frac{700}{27} 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phy_854	OPEN	The temperature in devices for controlled thermonuclear fusion reactions is extremely high, so charged particles do not have a container in the usual sense. Instead, the charged particles are bound in a certain area by a magnetic field. There is an annular area with an inner circle radius of $R_1=\sqrt{3} \, \text{m}$and an outer circle radius of $R_2=3 \, \text{m}$. There is a uniform magnetic field outward perpendicular to the paper in the area, as <image_1>shown in the figure. It is known that the magnetic induction intensity is $B=1.0 \text{T}$, and the specific charge of the bound positively charged particles is $\frac{q}{m}=4.0\times 10^7 \text{C/kg}$. The charged particles in the hollow area enter the magnetic field at different initial velocities from the center point O of the inner and outer circles, regardless of the gravity of the charged particles and the interaction between them, and regardless of the relativistic effect. In order to maximize the binding effect, a magnetic field is also added to a circle with a radius of $R_1$, with the magnetic induction strength of $B'=2B$, and the direction is the same. Find the maximum velocity $v$at which a particle cannot exit a circular area with a radius of $R_2$.		\(8 \times 10^7 \, \text{m/s}\)	phy	电磁学_磁场	['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']	['phy_854.jpg']
phy_855	OPEN	Electron pair annihilation refers to the process in which electrons and positrons collide and annihilate to produce gamma rays. The masses of positive and negative electrons are both m, and the charge amount is both e. The gravity of the positive and negative electrons is not counted. As <image_1>shown in the figure, on the planar rectangular coordinate system xOy, the point P is on the x axis, and the point Q is somewhere on the negative half of the y axis. There is a uniform strong electric field parallel to the y-axis in the first quadrant, with the electric field strength of $E=\frac{mv_0^2}{2el}$, there is a uniform magnetic field perpendicular to the xOy plane in the second quadrant, and there is an unknown circular area in the fourth quadrant (not shown in the figure). The uniform magnetic field in the unknown circular area is the same as that in the second quadrant. An electron with a velocity of $v_0$enters the magnetic field from point A along the positive direction of the y-axis. After entering the electric field vertically through point C, it exits the electric field from point P; A positron enters quadrant IV from point Q on the negative half axis of the y-axis (coordinates unknown) along a direction at 45° to the positive direction of the y-axis, and then enters an unknown circular uniform magnetic field region. When leaving the magnetic field from point P, it is annihilated by the electrons emitted from point P, that is, the velocities of the two particles are equal and in opposite directions when they collide. Given that $OA=L$, ignore the interaction between positrons and negatives (except during collisions), find the minimum area $S$for the positron to enter the unknown circular magnetic field region from point Q.		\[ S = \pi L^2 \]	phy	电磁学_磁场	['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phy_856	MCQ	"<image_1>The figure below shows a device designed based on the principle of force exerted on the wings when the aircraft is taking off and landing, and is used to monitor changes in river flow velocity. The wing-shaped probe is always in the water, and the sliding blade $P$of the sliding rheostat is moved up and down through the connecting rod. The electromotive force of the power supply is $4.8\,\text{V}$, and the internal resistance is ignored. The range of the ideal ammeter is $0\sim0.6\,\text{A}$, the range of the ideal voltmeter is $0\sim3\,\text{V}$, the resistance of the fixed resistance $R_1$is $6\,\Omega$, and the specification of the sliding rheostat $R_2$is ""$200\,\Omega $$1\,\text{A}$”。Close the switch $S$, and as the water flow speed changes, the following statement is correct ()"	['A. As the water flow speed increases, the indication of the ammeter becomes smaller', 'B. As the water flow speed increases, the ratio of the indications of the voltmeter to the ammeter becomes larger', 'C. The value range of the sliding rheostat allowed to be connected to the circuit is $20\\sim150\\,\\Omega$', 'D. The electrical power of resistance $R_2$varies within a range of $0.54\\,\\text{W}\\sim2.16\\,\\text{W}$']	D	phy	电磁学_恒定电流	['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phy_857	MCQ	<image_1>As shown, in a homogeneous medium, the coordinate system $xOy$lies in the horizontal plane.$ The wave source 1 at the O$point starts to move simply harmoniously along the $z$axis perpendicular to the $xOy$horizontal plane from the moment $t=0$. Its displacement varies with time with the relationship $z=2\sin5\pi t(\text{cm})$, and the generated mechanical wave propagates in the $xOy$plane. The solid circle and the dotted circle respectively represent the adjacent wave peaks and wave troughs at the time of $t_0$, and there is only one wave trough in the plane at this time.$ When t_1=0.8\text{s}$, the wave source 2 at the point $B$also begins to perform simple harmonic motion in the negative direction of the $z$axis perpendicular to the $xOy$horizontal plane. The period and amplitude of its vibration are the same as those of the wave source 1. The following statement is correct ()	['A. The propagation speed of this mechanical wave is $5\\text{m/s}$', 'B. $t_0=0.4\\text{s}$', 'C. After the vibration stabilizes, the particle at $C$is the weakening point of the vibration', 'D. During the time from $t=0.8\\text{s}$to $t=1.6\\text{s}$, the distance traveled by the particle at $C$is $16\\text{cm}$']	AC	phy	力学_机械振动与机械波	['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']	['phy_857.jpg']
phy_858	MCQ	In <image_1>the rectangular coordinate system shown in the figure, the $y$axis is the interface between media I and media II, and the speed ratio of mechanical waves propagating in media I and media II is $1:2$. The wave source $S_1$with amplitude of $1\,\text {cm}$is at $x=-8\,\text{m}$, and the wave source $S_2$with amplitude of $2\,\text{cm}$is at the same vibration frequency.$ At t=0$, the two wave sources begin to vibrate along the $y$axis at the same time. There is a point $P$between $S_2$and the origin $O$. The vibration image of the particle at point $P$is shown in Figure B<image_2>. The following statement is correct ()	['A. The starting direction of the wave source $S_2$is along the positive direction of the $y$axis', 'B. The speed of wave propagation in medium II is $2\\,\\text{m/s}$', 'C. The location coordinates of point $P$are $x=6\\,\\text{m}$', 'D. The distance from $t=0$to $6\\,\\text{s}$is $16\\,\\text{cm}$']	AD	phy	力学_机械振动与机械波	['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'phy_858_2.jpg']
phy_859	MCQ	Connect the coil with a self-inductance coefficient of $L$wound on the plastic tube, the high-voltage DC power supply, the capacitor with a capacitance of $C$and the single-pole double throw switch $S$to the circuit shown in the figure<image_1>, and fix a metal ball in the tube on the right side of the coil. First connect switch $S$to 1 to charge the capacitor, and then connect $S$to 2 (set this time as $t=0$), then $t=\frac{4\pi}{3}\sqrt{LC}$()	['A. Capacitor is charging', 'B. The upper plate of the capacitor is positively charged', 'C. Looking from right to left, a counterclockwise current flows through the coil', 'D. The metallic ball is subjected to a magnetic field force to the right']	D	phy	电磁学_电磁波	['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phy_860	OPEN	As <image_1>shown in the figure, there is a single-pole, double-throw switch K at the upper ends of the metal rails MN and M'N 'with an inclination angle of $\theta=53^{\circ}$. When the switch is connected to 1, the rail is connected to a circular metal coil with a number of turns of $n=100$turns and a cross-sectional area of $S=0.04m^2$. The total resistance of the coil is $r=0.2\Omega$. There is a uniform magnetic field of $B_0$perpendicular to the plane of the coil in the entire coil, and the magnetic field changes uniformly with time. When the switch is connected to 2, the rail is connected to a resistor with a value of $R_1=0.3\Omega$. There is an insulating tape between NN'and PP' of the horizontal track, and other parts are well conductive. The rightmost end is connected in series with a certain value resistor $R_2=0.2\Omega$. Both tracks are long enough in length, have a width of $L=1m$, and are connected smoothly at NN'. There is a uniform magnetic field with a vertical slope downward in the plane of the guide rails MN and M'N ', and the magnetic induction intensity is $B_1=0.2T$; there is a uniform magnetic field with a vertical upward direction and the magnetic induction intensity is $B_2=1T$on the entire horizontal track. When the switch is connected to 1, a conductor rod a with a length of L is just resting on the inclined rail; at some point, the switch is quickly turned to 2, and finally the rod a can slide down on the inclined rail at a uniform speed. The conductor bar b is initially locked (locking device not shown) and the horizontal distance from the PP'position is $d=0.24m$. The masses of rods a and b are both $m=0.1kg$, and the resistances are both $R=0.2\Omega$. All guide rails are smooth and have no resistance. Request: Immediately before rod a and rod b collide, the lock on rod b will be unlocked, and the two rods will stick together after collision. What is the Joule heat $Q$generated on the constant resistor $R_2$from the time rod a enters the horizontal orbit to the time the two rods move to the final 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']	['phy_860.jpg']
phy_861	OPEN	"<image_1>As shown in the figure, an infinitely long smooth parallel guide rail is composed of metal and insulating parts, with a spacing of\( L = 0.5\,\text{m} \). Two sections of guide rail made of insulating material are embedded in the middle of the metal guide rail\( M \),\( N \)(represented by black entities in the figure), and the left end of the guide rail is connected to a power supply of electromotive force\( E = 11.2\,\text{V} \). Three identical conductor rods\( ab \),\( cd \) and\( ef \) with mass\( m = 0.1\,\text{kg} \) and resistance\( R = 0.2\,\Omega \) are placed vertically on the guide rail, of which\( cd \) is suspended by two very long, lightweight insulating thin wires, just in contact with the guide rail without pinching.\ ( ghkj \) is a ""□""-shaped conductor wire frame placed on a metal guide rail. It consists of three conductor rods. Each rod has a mass of\( m \), a resistance of\( R \), and a length of\( L \). If the\( ef \) rod collides with the wire frame\( ghkj \), it is connected to form a square conductor frame. Initially, the conductor rod and wire frame are both stationary on the metal guide rail. Above the guide rail, there are three bounded strong magnetic fields downward perpendicular to the plane of the guide rail: in the area immediately to the left side of the insulating guide rail\( M \), there is a magnetic induction intensity of\( B_1 = 1\,\text{T} \); there is a magnetic field with magnetic induction strength of\( B_2 \) in area\( II \), and the\( cd \) rod is placed close to the left boundary of area\( III \); There is a magnetic field with a width of\( L \) and a magnetic induction strength of\( B_3 = 2\,\text{T} \) in the area\( III \) immediately to the right of the insulating guide\( N \). Initially,\( ef \) is in area\( II \), and areas\( II \) and\( III \) are located on both sides of the insulating rail\( N \). The two points of the conductor wire frame\( gj \) are close to the left boundary of area\( III \). Close the switch\( S \) and\( ab \) and the rod are started, and they have made constant motion before entering the insulated track\( M \). The conductor rods\( ab \) and\( cd \) collide and are combined together to form the ""linkage two rods"". After briefly contacting the guide rail, they are swung upward to the right. The maximum height of the swing is\( h = 3.2\,\text{m} \). After reaching the highest point, it no longer falls. At the same time, it is found that the\( ef \) rod is moving to the right and enters the area\( III \). Other resistances are excluded. Find the Joule heat generated by the ""□"" conductor wire frame."		0.256J	phy	电磁学_电磁感应	['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phy_862	OPEN	An important technology in the era of new energy vehicles is the kinetic energy recovery system. The principle is as shown in Figure A<image_1>. When the accelerator pedal is released, the car will continue to move forward due to inertia. At this time, the recovery system will let the mechanical group drag the generator coil and cut the magnetic induction wire to generate induced current. When the inverter input voltage is higher than\(U_C \), the motor can charge the battery. When the voltage is lower than\( U_C \), the kinetic energy recovery system is turned off. The kinetic energy recovery system of an electric vehicle with a mass of\( M \) is simplified to <image_2>an ideal model as shown in Figure B. The horizontal parallel metal guide rail with a width of\( L \) is in a uniform magnetic field with a magnetic induction strength of\( B \) in the vertical direction. In the magnetic field, the mass of the metal plate\( MN \) is equivalent to the mass of the car, and the speed at which the metal rod moves on the guide rail is equivalent to the speed of the car. The resistance of the kinetic energy recovery system is equivalent to an external resistance\( R \). When the electric vehicle is driving at\( n \) times (\( n \) is greater than 1)\( v_c \), emergency braking is taken in emergencies. When the kinetic energy recovery system is turned on, traditional mechanical braking is involved throughout the process. The traditional mechanical braking resistance is proportional to the vehicle speed\( f = kv \). When the speed drops to\( v_c \), the kinetic energy recovery system is turned off, and the traditional mechanical resistance becomes\( \mu \) times the vehicle weight. It is known that the system is on for\( t \), and the gravity acceleration is\( g \). If the recovery rate of kinetic energy is\( \eta \), calculate the total displacement of the electric vehicle\( x \) during braking.		\[x = \frac{M U_C R (n - 1)}{B^3 L^3 + B L R k} + \frac{U_C^2}{2 \mu g B^2 L^2}\]	phy	电磁学_电磁感应	['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'phy_862_2.jpg']
phy_863	OPEN	<image_1>As shown in the figure,\( SM \) and\( TN \) are two parallel fixed horizontal metal rails, with the right end connected in series with a key\( K \) and a constant resistor with a resistance value of\( R_0 \). Inclined metal guide rails\( AC \),\( BD \),\( EP \),\( FQ \) with the same inclination angle are mounted on the horizontal guide rail and smoothly connected with the horizontal rail without resistance at the contact points. The spacing between horizontal guide rails and inclined guide rails is both\( L \); The mass of the metal rod\( a \) is\(2m\) and the resistance value is\( R \), the mass of the metal rod\( b \) is\( m \) and the resistance value is\(2R\), the length of the two metal rods is\( L \), and they are locked at the same height on the two inclined guide rails by the locker, and the height is\( h \). The projections of the two locked metal rods on the horizontal guide rail are\( ST \) and\( HG \) respectively.\ Both ( CDGH \) and\( PQNM \) areas are long enough to be distributed with a vertically upward uniform magnetic field, and the magnetic induction strengths are\( B_1 \) and\( B_2 \) respectively. Known: \( L = 1\,\text{m} \)、\( h = 0.45\,\text{m} \)、\( m = 0.1\,\text{kg} \),\( R = 1\,\Omega \),\( R_0 = 2\,\Omega \),\( B_1 = 1.0\,\text{T} \),\( B_2 = 0.5\,\text{T} \), all guide rails are smooth and regardless of resistance, and the two metal rods are in good contact with the guide rails. Close the button\( K \), only release the locker 1, and let the\( a \) rod rest and release it. After the\( a \) rod rest in the\( CDGH \) area, disconnect the button\( K \), release the locker 2, and let the\( b \) rod rest and release it. Calculate the total Joule heat\( Q_a \) generated by the\( a \) rod from the release of the locker 1 to the stable movement of the two metal rods.		0.5J	phy	电磁学_电磁感应	['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']	['phy_863.jpg']
phy_864	OPEN	An interest group designed a driving model of a maglev train. The simplified principle is shown in Figure A<image_1>. In the\( Oxy \) plane (paper), there is a magnetic field area with width of\( L \) and axis symmetry about\( x \). The magnetic induction intensity is\( B_0 \), and the change rule is as shown in Figure B<image_2>. A rectangular metal wire frame\(MM'N 'N \) with a length of\( d \) and a width of\( L \) is placed at the position shown in the figure, where the\( MN \) edge coincides with the\( y \) axis, and the\(MM'\) and\(NN'\) edges coincide with the upper and lower boundaries of the magnetic field respectively. When the magnetic field moves at a constant speed to the left along the\( x \) axis at a speed of\( v_0 \), it will drive the wire frame to move, and the resistance to the wire frame is constant\( f \). It is known that the quality of the wire frame is\( m \) and the total resistance is\( R \). The magnetic field stops moving at a certain moment after the wire frame moves stably, and then stops after the wire frame moves for\( t \). Calculate the distance of the wire frame during the time\( x \).		\frac{R}{4B_0^2L^2} \left[ m \left( v_0 - \frac{fR}{4B_0^2L^2} \right) - ft \right]	phy	电磁学_电磁感应	['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'phy_864_2.jpg']
phy_865	OPEN	As <image_1>shown in the figure, two smooth parallel guide rails $MNL$and $PQK$are placed on the horizontal plane, the distance between the guide rails is $l = 1m$, the left end of the guide rail $MN$and $PQ$sections are tilted, and the angle between them and the horizontal plane is $30 ^\circ $, and the horizontal sections $NL$and $QK$are smoothly connected through insulating materials at $N$and $Q$, regardless of track resistance. a$and $b$Two metal rods with a length of $1m$are placed perpendicular to the inclined guide rail.$a$and $b$are connected by an insulating light thin wire with a length of $2m$, and the thin wire is in a straightened state.$ The mass of a$and $b$metal rods is both $1.6kg$, the resistance is both $1\Omega$, and the $a$rod is in a locked state. The inclined track part is in a uniform magnetic field perpendicular to the plane of the guide rail, and its magnetic induction intensity is $B = 2t^2 (\text{T})$. After a period of time, the thin wire just has no pulling force. At this time, the thin wire falls off, and then the magnetic induction intensity of the magnetic field remains unchanged. At the same time, the lock is unlocked and the $a$rod is released freely. There is a bounded uniform magnetic field in the space where the horizontal guide rail is located. The magnetic induction intensity is $1\text{T}$, and the direction is vertical upward. Its left boundary coincides with the $NQ$dotted line.$ The b$rod enters the horizontal orbit through $NQ$at a speed of $4m/s$, and passes through the right boundary of the magnetic field at a speed of $4.5m/s$. During the movement,$a$and $b$do not collide. The gravitational acceleration $g$is taken as $10 \text{ m/s}^2$. The movement time and influence on the speed of the metal rod when passing through $NQ$are ignored. The metal rod and the guide rail are always vertical and in good contact. The magnetic fields of the inclined part and the horizontal part do not affect each other, and the magnetic field and air resistance generated by the induced current are ignored. Ask: The $b$rod starts entering the horizontal track and passes through $1.51s$to reach the right boundary of the magnetic field. Find the length of the bounded uniform magnetic field on the horizontal track.		6.35m	phy	电磁学_电磁感应	['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phy_866	OPEN	"As shown in the figure<image_1>,$PQ$and $MN$are two parallel tracks fixed in the horizontal plane with a distance of $L = 1m$. The two tracks each have a small length of insulators with negligible lengths at $O$and $O'$, isolating the metal track from left to right. Connect a resistor with $R = 0.3\Omega$to the left end of the track, and connect a ""constant current source"" to the right end of the track, so that the current is constant at $I = 0.5A$when the thin conductor rod $ab$placed vertically on the track is on the right side of $OO'$. The $x$axis is established along the orbit $MN$, with $O$as the coordinate origin. The boundary magnetic field downward perpendicular to the orbit plane is filled between the two orbits. The variation rule of the magnetic induction strength $B$in the $x \geq0 $area with the coordinate $x$is $B = 0.4x(\text{T})$, and the $x &lt; 0$area is a uniform magnetic field of $B_1 = 0.2T$. It is known that the mass of the $ab$rod is $m = 0.05kg$, the length of the $ab $rod is $L = 1m$, the resistance of the $ab$rod is $r = 0.1\Omega$, and the dynamic friction coefficient between the $ab$rod and the track is $\mu = 0.2$, and it is at rest at $x = 1.5m$under the action of external force. Regardless of the resistance of the metal track, the gravitational acceleration $g$is $10 \text{ m/s}^2$. Now the external force was removed, and it was found that the $ab$rod moved to the left along the track and finally stopped at $x_1 =-0.36m$. Ask: $ab$total time spent in bar exercise. (It is known that when an object with a mass of $m$performs simple harmonic motion, the restoring force $F$and the displacement of the object from the equilibrium position $x'$satisfy $F = -kx'$, and its vibration period $T = 2\pi \sqrt{\frac{m}{k}}$)"		\left( \frac{\pi}{3} + \frac{\sqrt{3}}{2} - 0.36 \right) \text{s}	phy	电磁学_电磁感应	['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phy_867	MCQ	"As shown in Figure A<image_1>, semiconductor thin film pressure sensors utilize the ""piezoresistive effect"" of semiconductor materials. Figure B <image_2>is an image of the resistance\( R \) of a pressure sensor changing with pressure\( F \). The following statement is correct ()"	['A. The working principle of this sensor is to convert electrical quantities into mechanical quantities', 'B. As the pressure increases, the resistance of the sensor increases', 'C. The slope of the curve at a pressure of 1N is approximately 29kΩ/N', 'D. Sensor sensitivity is greater in an interval less than 1.5N']	D	phy	电磁学_传感器	['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', 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'phy_867_2.jpg']
phy_868	OPEN	Hold the string and make point A on the rope drive each point on the rope to make a simple harmonic motion up and down from time t=0, with an amplitude of 0.2m. When t=0.4s, point B just starts to vibrate, and point A returns to its equilibrium position. The waveform formed on the rope is as <image_1>shown in the figure, and upward is specified as the positive direction of particle vibration and displacement. Find the distance s of particle B in 0~3s.		5.2m	phy	力学_机械振动与机械波	['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phy_869	OPEN	<image_1>The spring vibrator makes simple harmonic motion between points B and C with point O as its balance position. The distance between B and C is 20 cm. At a certain moment, the vibrator is at point B. After 0.5 s, the vibrator reaches point C for the first time. Find: The distance traveled by the vibrator in 5 s and the magnitude of its displacement;		2m, 0	phy	力学_机械振动与机械波	['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']	['phy_869.jpg']
phy_870	OPEN	<image_1>As shown in the figure, the light source $S$is located at the bottom of the container containing a certain liquid. A flat mirror $MN$is fixed to the inner wall on the right side of the container. The upper end of the flat mirror is flush with the top of the container, and the lower end is flush with the liquid surface. The light source $S$emits a beam of red light in the direction of $SO$. After being refracted by the $O$point, it shines on the $P$point on the flat mirror. The reflected light just passes through the upper point on the left side of the container $Q$. Given the angle of incidence $\theta = 37^\circ$, the width of the container $MQ$is $80\text{cm}$, the distances from the reflection point $P $to the upper end point $M$and the lower end point $N$of the plane mirror are $60\text{cm}$,$30\text{cm}$, the depth of the liquid is $40\text{cm}$, and the propagation speed of light in vacuum is $c = 3.0 \times 10^8 \, \text{m/s}$.$\sin 37^\circ = 0.6$，$\cos 37^\circ = 0.8$。Ask: The travel time of this red light in the liquid.		2.2 \times 10^{-8} \, \text{s}	phy	光学_光的折射与反射	['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']	['phy_870.jpg']
phy_871	OPEN	With the continuous development of monitoring technology, surveillance cameras and other equipment are now installed in streets and alleys and every household. <image_1>As shown in the figure, a hemispherical transparent material with a radius of $R$is removed from a monitoring device. The center ball is a $O$point, and the $A$point is the apex of the hemispherical surface, and the $AO$is perpendicular to the bottom surface coated with the reflective film. A beam of monochromatic light travels parallel to $AO$to point $B$on the hemispherical surface. The refracted light passes through point $D$on the bottom, is reflected by the point $D $, and then travels to point $E$on the hemispherical surface (not shown in the figure). Light travels in vacuum. The speed of travel is $c$. It is known that the distance from the $B$point to the $OA$connection is $\frac{\sqrt{3}R}{2}$, and the length of $OD$is $\frac{\sqrt{3}R}{3}$. Find: The propagation time of the monochromatic light from the $B$point to the $E$point in the hemispherical transparent material is $t$.		\frac{3R}{c}	phy	光学_光的折射与反射	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAB+AL0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAoqvd39nYRmS8u4LdB/FLIEH61z83xB8PrIY7Wa51B+mLG1knH5qMfrQB1FFcwPFt5MM2vhPW5B2MiRRD/x5wf0rzv4m+MviHYvpp0bRLvTYHYhmCx3DSPkYU7d20fzoA9rorkNP8Va2mnW7ar4R1Vbjy181rcwuu7HOB5mcfhUo+IOjRvsvoNT08+t3Yyoo/4EAV/WgDqqKo2GtaXqi7rDUbW5H/TGVW/kavUAFFFFABRRRQAhIAJJAA7mlrnfHhK+AtdIJBFlJyP92tnT+dNtSf8Ankv8hQBZooooAKKKKACiiigAoqpqWpWWkWMt7f3EdvbRDLSOcAf4n2rmR/bnjAbs3GiaI3AA+W7uR6/9MlP/AH19KANLVPF2n2F2bC2SbUtS/wCfSyXe6/756IPdiKpfYfFmuKft1/FodsTxDY4lnI9GkYYH/AR+Nb2laNp+iWottOtY4I+rbRyx9WPUn3NXqAOdtfA/h+3nW5nsRfXa/wDLzfsbiTPrl84/DFdAiLGoVFCqOAAMAU6kYkKSASQOg70AU9TvjY22Y1ElxJ8sMZ6Fvf0A6k+lcx4Xv7q+8A6Tf6oxubm6uBKzEkY3TErj2AIwParl1p1/qNjqN1d2A/tAq8VnEJxtRCPlOQeCTyfoOuKfo1je6R4N0bTntwtxarBDIow4+XAYg+nU5q6fxoyrfw2dLR1ooqDUw9R8H+H9Un+0XOlW/wBpHS4iXy5R9HXDfrVA6F4h0fc+i6415H2tNW/eD6CUfOPx3V1dFAHMW3jKGG5Sy1+zl0e7Y7VacgwSH/YlHyn6HB9q6YEMAQQQehFRXdpbX1s9tdwRzwOMNHKoZSPcGuVfRdW8Lkz+HZGvNPGWk0m4kyVH/TFz90/7LcfSgDsKKy9E1+x162aS0dlliOye3lXbLC/911PIP+RWpQBzvj3/AJEDXv8Aryk/9BrZ0/8A5Btr/wBcU/kK4j4w6zf6L4Eu5bayW5tZ1a3uTkhog4wrj2zx+Ira8A6zfa/4QstTvbNLTz1zDECSRGOFJJ7nGfoRQB01FFFABRRRQAVm63rdnoGnNeXjMRkJHEg3PK56Io7k1Y1LUbXSdPnvryURW8KlnY+n+Nc7oOmXWr6gvibW4mSYgjT7Nx/x6RnuR/z0Yck9unrQAaXoN5q19HrniZVM6HdaaeDuitB2J/vSep7dq6yiigAooooAKKKKACqOqoz28ISRYyLiM5ZsZG4cVeqhqwiNtD5zsq/aIsFRnncMCrp/GjKt/DZfoooqDUKKKKACiiigDntd8NG8uV1XSZxY61CMJOB8sy/3JR/Ep/MdRUvh7xENXE1pdwGz1a1IW6tGOSp7Mp/iQ9jW5XP+JNAl1Aw6npci2+tWYJt5j0kHeJ/VG/TqKAIviFFHN8PdeSRAy/Y5DgjuBkfrW1pUaQ6RZxxqERYECqBgAbRXJa5rsWvfC/XpxG0FzFaSxXNu/wB6GUL8yn+h7jBrr9P/AOQba/8AXFP5CgCzRXn194h3eK9eifX5rOz0+3jijhjKFnuGBY7QQS3BUY7kmuq8L3OqXnhmwuNZgEOoSRAzIBjB7ZHY4wSO1AGvRRWD4u1afTNH8uxKnU72RbWzVunmN3Psoyx9loAzHH/CYeKGjb5tE0iUbh1W5uhzj3VP/QvpXY1n6HpMGh6Nbadb8pCmCx6ux5Zj7kkk/WtCgAooooAKKKKACiiigAqhq7oltCXjEgNxEAM4wdwwav1S1MzCCLyF3N58eRtz8u4ZP5VdP40ZVv4bG63qP9j6Je6kUVxawtMVZtoIUZxnBxWLY+Lpn1HRrLUdN+yy6vbtNBsl37SqhirjAwcH3qt8RG+26dp3h5JQsur3scLANg+Up3yH/vlcfjUHhiBf+E31yLVHa41SyZRZyyn7to4BAUDgcggkDnHNQanc0UUUAFFFFABRRRQB5N8ZtP1TTdDvNa8PxvuvIvsuqIibg0OMhyOxHIz6N7V0/wAONU1u++H1le67ayC92HCiPa0iA/KdvYkYrr5Y0mieKRQ6OCrKwyCD2rl/CLvpV1feFp2ZvsBElm7nl7Z87R77TlfwFAHMR6NrF94H1TTX0WZNY1m5lnnknKiO3Zm+Vt2STtULjA6ivStPt3tNOtraSVpniiVGkbq5AwSfrViigArk4Qda+IU0zANaaJCIo/T7RIMsfqEwP+BGuonmS3t5JnOEjUsx9ABmuc8BQMPDKahJ/rtTmkvnz/00bKj8F2j8KAOnooooAKKCQBknAqvNf2dsgea6hjUnALOBmmk3sJyUVdssUVRk1iyjkjTzGdpACvlxs2QehyBSDVFa6a3W1uyVJBfySF49zVezn2M/bU9rl+is+PUZ5Y5GXTLpSoGFfYC30+ag3l+bcOumN5m7HltMo49c0ezl/TQe2j5/c/8AI0Ko6qjPbwhZFjIuIzlmxn5hxTZLnUgI/L09GyuXzOBtPp05qnq010XhSa1Vbb7TFiVZcnO4Y4x61dOD5l/mjOtVj7N6P7n/AJGtJaW00qyy28TyJ912QEj6GnG3hM4nMSecBjzNo3Y9M1TjudSPmeZp8a4UlcTg7j6dOKBeX4gLtpjeYGwI1mU5Hrmo9m/L70ae2j2f3P8AyNCis99RuI4o2bTLpmbOVQodv1+albVFS5WBrS7BbA3iIlefcUezkHtodfyZfoqjHq9nJI8e90ZAS3mRsoAHU5IqWHUbK4UtDdwuAQCVccZocJLdDVWm9pIs0UgIYZBBHqKWoNArk/F4GlahpHiVcgWk4trrHeCUhef919h/OusqhrenJq+h32nyAFbmB4/oSOD+dAF8HIzRWH4O1OXV/COm3lxxcNCEmB7SL8rfqDW5QBz3jq4a28E6sUOHkgMKY/vP8g/Vq0YntND0i1hmlSGKGNIlz3wMAAd+lc/8SJhF4ctlZwiSajaqzN0A81Tk/lWrZ3GlWtsbmXUY7hpH+aeV8gsB0A6Dr0FaQhfUxq1eV2TS9S217dytH9ksi0bgMZZm8sD8Oufwpy2189w7S3oEJyFjijAIB6ZJzzQ+s6bGIy97AokG5MuORTv7VsBdfZftcXn5xs3c5qrSW0fwIvTb96d/nb8v1uRxaNbJFJHK09wJMbvPlLZx7dKsRWFpDGscdtCqKcgBBgGoU1jTZfM2XsLeWpZ8OOAO9A1nTTA0wvYPLVgpbeMAntQ1Ve9wi8PHZr8C8AAMAYoqi+s6bHHHI97AEkzsJcc4605tW09Z1ha8hEr42ruGTnpUezn2Zr7an/MvvLlFUl1fT3meJbyEyJncobkY60i6zprxPKt7AY0xuYOMDPSj2c+we2p/zL7y9VDV3RLaEvGJAbiIAE4wdw5pTrOmrCsxvYBGxKht4wSO1cD8SvitaeDJdOtobVryW5xOSrAKsYPqQck804xcWnJEznGcXGLTfyPTKKyNK8S6Xq9nazwXKA3ESyLE5wwBGcEetWY9Z02VZGS9hYRjc5DjgetL2c+xXtqf8y+8vVDdTx2tnNcTHEUUbO59ABk1X/trTfI8/wC2weVu27t4xnriuf8AG122o+Fbiw0y7tBLfJ5Yklm2L5ZOHweecZFHs59mL21L+ZfeUPC2lzan4ETUbm+vob29El1HL9pfMIZiyAAnBAXbwRitTwTfp4q8EadqV/aQmW4T96PLGGZWK7se+M/jUF3JNfaePD8M9npcTxrbsyT75QhGMIMAAkcAk8elcpqXxa0PwT4jsvCFppskljbLFC1xHIMJkDoMfNjPPPrRaUddh81Oel0z0uXRrR4kjj823VM7fIkKYz9KcbS8SdGhvz5QwGjlQNkD0PBzSJrWmvA0y3sJjUgM27gE9KVta01Ikla9gEb5CtvGDjrV/vdmm/kY/wCz7ppejt+Qi3d7C0n2qzBjUFhJA2/PttxnNT2l9bX0Ze3kDhTtYYwVPoQeRUT6vp0ciRveQh3AKgt1B6VVu5dKv5fs4vUjuoyWVopNroQOf5d6OS+8WgdTl+Gafk7X+/8A4Bl+C3MNz4i008C01WUoPRZAsv8ANzXV1xHg+9juvGniwRSLIu+2JdWBDHy9ueO5Cjiu3rKScXZnRCSlFSRQ1rSLbXdJn067B8qUcMv3kYchgexBAI+lc5Dr194aRbTxTatJbKdserW0ReNx6yqOY29T933FdlSEAjBGRSKK1neWGpW6z2Vxb3MJ6PEwcfmKsbFznaM+uK5688D6LcTvc2sUum3j8tcafIYHJ98cN+INVzpXi7Tlxp+vW2oIOkepW2G/7+Rkf+g0CsjqdiDoq8+1GxMY2Lj6VzH9veJrJf8AiYeFWnA6vp12sn/jr7TSp4705B/p2n6vYY6/abCTA/4EoI/Wi4WR02xCPuLx7UbFznaM/SsCHx54UmYKuv2Ct/dkmCH8mxWrb6rp12oNvf20wPQxyq38jRcLItbEznaM/SjYmMbFx9KUMp6MD+NLmi4WQ3y0xjYuPpXL+OrXwyuhnUvEWlwXsdmQYUZMsXYgBV+pwMV1Vcl4+0i61TT9MmtYWuP7P1GG7lt16yop5A9SM5x7UDsOuINXtvDE+pSXiWV5BbmZbaGNTDHtXOw5GSOME5Htitbw3qa674b07VfIWI3lukpj/ukjOKyPEq33ibSzoumRz28N3hLu8ljMflRfxKoPJYjjpgZPNdLZWkGn2MFnbII4II1jjQdlAwBQKyJfLTGNi4+lGxDj5V49qUkDqRVebULK2BM93BEB1LyAfzouFkT7FznaM+uKybzwpoGoaxBq13pNrNfwY8ud4wWGOn1xUE/jfwtbErL4g04MP4RcKx/IGqzePdHcZsotR1D0+yWMrg/jgD9aB2Om8tMY2Lj6UbExjYuPpXMDxLrt6P8AiX+Erxc9H1CdIFH4As36Ugs/GuoZF1qem6XGf4bOFppB/wADcgf+O0XFZHSTyW9vEZp3ijjUZLuQAPxNcvceLTqcslp4UsxqVyDg3jDbaRepMn8Z9lz+FTQ+BNLkdZdXlu9ZlByDqEvmKD7IMIPyrpYoo4Y1jiRURRhVUYAFA7GT4c8PpoNnKHmNze3Mhmu7llCmWQ98dgBgAdgK2aKKACiiigAooooAKKKKAK1xp1ldDFxaQTA/89Iw386zJfBnhickyeH9MYnv9lTP54rcooA5h/h74XY5TTPJP/TGaSP/ANBYVGfh5on8E+rRf9c9TnH/ALNXV0UAcn/wr/Tx93VvEC/TVpv/AIqk/wCEAs/+g54k/wDBvN/jXW0UAcn/AMK/sD97WPELfXVpv/iqUfDzRv47nWJP9/VJz/7NXV0UAcuvw88Mg5ksJJv+u1zK/wDNqtReCfC0ONnh7Tcju1sjH8yK3qKAKdvpOnWgxbWFrDj/AJ5xKv8AIVcAA6UUUAFFFFABRRRQAUUUUAf/2Q==']	['phy_871.jpg']
phy_872	OPEN	The cross-section of an optical component is as <image_1>shown in the figure. The center of the semicircular glass brick is the point $O $, and the radius is $R$; the extension line of the $FG$side of the right-angled prism passes through the point $O$, the $EG$side is parallel to the $AB$side and has a length equal to $R$, and $\angle FEG = 30^\circ$. In the plane where the cross-section is located, monochromatic light enters the $EF$edge at an angle of $\theta$and is refracted, and the refracted light exits perpendicular to the $EG$edge. It is known that the refractive index of glass bricks and triangular prisms for this monochromatic light is both $1.5$. Monochromatic light incident at the angle of $\theta$can undergo total reflection if it reaches the semi-arc $AMB$for the first time. Calculate the range of distance from the point of incidence of the light on $EF$from $D$(not shown in the figure) to the point of $E$.		0< x \leq \frac{2\sqrt{3}}{9}R	phy	光学_光的折射与反射	['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phy_873	OPEN	<image_1>As shown in the figure, the rectangle $ABCD$is the cross-section of a transparent optical element, the side length of $AB$is $L$, and $O$is the midpoint of the side of $AB$. A thin beam of monochromatic light enters the optical element from the point $O$, with the angle of incidence $\alpha = 45^\circ$. The light can undergo total reflection on the edges of $AD$and $BC$, and finally exits the optical element from the midpoint of the edge of $CD$. The light emitted from the edge of $CD$is just parallel to the incident light on the edge of $AB$. It is known that the propagation speed of light in vacuum is $c$. Find the time for the monochromatic light to travel in the optical element.		\frac{3\sqrt{2}NL}{c} \quad (N=1,2,3,4\cdots)	phy	光学_光的折射与反射	['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phy_874	MCQ	As <image_1>shown in the figure, heavy objects with a mass of m and 2m are suspended at the left and right ends of the non-extensible special light rope that goes around the fixed pulley respectively. Now they are released from rest. After 3 seconds of movement, the heavy objects on the right side touch the ground without rebound. It is known that the weight on the left side is far enough away from the pulley, and the two weights are at the same speed when the rope is tightened. The mass of the pulley and all friction are ignored, and the air resistance is ignored. The gravity acceleration g is taken as 10m/s^2, then ()	['A. The initial height of the right weight from the ground is 45m', 'B. The speed of the right weight when it first touches the ground is 10m/s', 'C. After the heavy object on the right side touched the ground for the first time, the rope was tightened again after 3 seconds', 'D. The right weight hit the ground for the first time and hit the ground for the second time after 4 seconds']	BD	phy	力学_牛顿运动定律	['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phy_875	MCQ	As shown in Figure 1<image_1>, there is a fixed baffle at the bottom of the inclined plane with an inclination angle of\(\theta\). One end of a light spring with a stiffness coefficient of k is fixed on the baffle, and the other end is connected to an object A with a mass of m. The object B is in contact with A (not connected), and the mass is also m. Slowly push the object B with a downward force parallel to the inclined plane. Within the elastic limit, the spring length is compressed in total\(x_0\) relative to the free length. At this time, both A and B are at rest. It is known that the dynamic friction coefficient between object A and the inclined plane is\(\mu\), but the friction between object B and the inclined plane is ignored. After the external force is removed, objects A and B begin to move downward along the inclined plane. The change of the acceleration a of object B with the displacement x is shown in Figure 2<image_2>. Taking the position where B started to move as the coordinate origin, and the displacement of object B is\(x_1\), B and A are separated, and the gravitational acceleration is known to be g. then ()	['A. When two objects A and B are separated, the acceleration is both\\(\\mu g \\cos\\theta + g \\sin\\theta\\)', 'B. There must be\\(x_1 < x_0\\)', 'C. When the acceleration of A is 0, the compression amount of the spring is\\(\\frac{\\mu mg \\cos\\theta + mg \\sin\\theta}{k}\\)', 'D. The maximum speed of B during exercise is\\(\\sqrt{a_0 \\left(x_0 - \\mu mg \\cos\\theta + 2mg \\sin\\theta \\right)}\\)']	BD	phy	力学_牛顿运动定律	['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'phy_875_2.jpg']
phy_876	MCQ	As <image_1>shown in the figure, satellites a and b are two satellites in the same direction in the equatorial plane of the earth. The opening angles of the earth to satellites a and b are 30° and 60° respectively. Due to the earth's obstruction, satellites a and b will experience communication signal interruption. It is known that the motion of satellites a and b can be regarded as uniform circular motion. The period of satellite b is T, and the propagation time of communication signals between satellites can be ignored. Taking sin15° = 0.26, the time for each communication signal interruption of satellites a and b is approximately ()	['A. 0.1T', 'B. 0.25T', 'C. 0.4T', 'D. 0.6T']	C	phy	力学_万有引力与宇宙航行	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAC0AMkDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAoprukaM7sFRRksxwAK5G5+IFrc3Elp4asLnX7pDtY2uFgQ/wC1M3y/lmgDsKQsFGSQB71xo0vxxrDb9Q1u00W3brb6bCJZQPQyyDGfcLSx/DLw87iTUjqGrS9d2oXskoP/AAHIX9KANi88YeGtPcx3fiDS4ZB1R7tA35ZzVA/EjwYDj/hJdN/CcGtK28KeHrMAW2habEB/ctUH9KujTNPUYFjbAegiX/CgDGh8f+EJ2Cp4m0nJ6BrtF/ma3ba7tryIS2txFPGejxOGB/EVVm0HR7gYm0mxkH+3bof6Vi3nw38JXb+YNHitZe0lkzW7D/v2RQB1VFcYfB+uaWo/4R/xbfIoOfs+qKLuM+wY4cD/AIEaafFmv6EceJvDztbL97UNJJniHu0f31H50AdrRWfpGuaZr1mLvS76G7hP8UbZKn0I6g+xrQoAKKKKACiiigAooooAKKKKACiiigAooooAK53xD4vtNEnj0+CGXUdYnH7jT7bl2/2mPRE9WP61R17xLfXuqv4b8LBJNTAH2u8cborBT3b+857J+J4rU8OeFrHw3BIYTJcXtwd11fTndNO3qx9PQdBQBiReENS8SOt140vPNiJ3Jo9oxW2j9N56yn64HXiuxtbW3srdLe1gjghjG1I4lCqo9ABU1FABRRRQAUUUUAFFFFABRRRQBy2seBtPv7xtT02WXR9Y7X1lhS3tIv3XH1H41StfFuo+H7uLTvGcEUAkbZb6vbg/Zpj2D5/1TH0PB7Gu2qG7s7a/tJbS7gjnt5VKyRyKGVh6EGgCVWDKGUggjII70tefsmofDeTfEZ7/AMJE/PGcvNpo9V7tEPTqtd3a3UF7axXVrMk0Eqh45EbKsp6EGgCWiiigAooooAKKKKACiiigArkvFevXxvYPDPh9l/tu8Te0zDK2cGcGVvfso7n6Vq+J9fh8NaFPqMqGV1wkEK/emlY4RB7k4ql4O8PTaPYzXupOs2t6iwnv5h03dkX/AGVHAH+NAGh4e8P2PhrSksLJWIyXlmkO6SZz953buxNatFFABRRRQAUUUUAFFRT3VvapvuJ4ol/vSOFH61mP4r8OxttfXtMVvQ3cf+NAGxRVO11fTb44tNQtJyf+eUyt/I1coAKKKKACiiigBGVXUqwDKRggjgiuAdW+G2riRNx8I30uHTqNNmY8EekTE9P4SfSvQKgvLO31Cyms7uJZbedDHJGwyGUjBFAEwIYAggg8gilrivCF1caFq1x4M1GVpDbR+dplw55mts42k92Q8H2wa7WgAooooAKKKKACiisjxRraeHfDGo6u67vssDOi/wB5+ij8WIH40Ac9EP8AhLPiJJK3zaV4cOyMdVlvGHzH/gCkD2LGu4rA8F6I2g+FbK0lJa6dTPdOerzOdzk/iSPwrfoAKKKKACiiud8V+Jm0OK3s7C3+2a1fsY7K0z95gOXb0RepNAFnxB4o03w3BG17I73Ex229rAu+advRFHJ+vQVgrbeM/E433V0vhnT25WC2Cy3bD/ac5VPooJ960fDXhJNJmk1XU5/7R165H7+9kH3R/cjH8CD0HXvXTUAcjD8NPC4cTX9i+q3WPmuNSma4dvruOB9AAK1I/CHhmJNkfh3SVX0FlH/hW1VCy1WO7uZLWSGW3ukBYxSjqucbgehFUotptdCJTjFpN7mPd/DnwdecyeHNPRv70EIib80wapN4Q1rRmM3hnxJdKq/dsNUY3MBH90Mf3ij3BNdj50XnCHzU80jOzcM49cVn3eqzxXLW9rpd3cuvVgAkf/fTdfwojCUnZCnVjBXf+f5GLpfjUrqMej+JLFtH1R+It7bre5P/AEyk6E/7Jwa62s7U9IsfEGktY6tZxzQyr88bc7T6g9iOxFcvpeo3/g7WLfw/rly91pl03l6Zqcp+YN2glP8Ae/ut3+tSaLU7miiigAooooA5Tx5pNzd6VDq+mIW1jRpPtloB/wAtMD54z7OuRj1xW7o+qW+t6PaanaMGguYlkU+mR0PuOn4VerifBo/sTxFr3hU8QQyi/sgf+eMxJZR7LIHH40AdtRRRQAUUUUAFcX443ahrHhbQRzHeah9onXs0UC+Zg+24JXaVxqsbz4xODzHp+ijaP7ryy8n8kFAHZUUUUAFFHSoLi7itbVrmQsY1GfkUsT9AKaTeiE5KKuwvbyDT7Ge8uXCQQRtJIx7KBkmuT8D2E+oyT+MdUjIvtUX/AEaNv+Xa16xoPcj5j7n2qj4y1GTxCNK8NQ2tzbx6tdqsrTLsLwR/vJAB1wQAOcdcd6666069uJtsepta2oACxwRAMBj+8c/oBV+zs7Sdv68jL21480E3+H52NGSWOGMySuqIvVmOAKpW2tWF7cm3tbgTMoJLIpKj/gXSrAtIjZrbTA3EYAB875i2O59TXmfxK8XNaMfD+mOIsL/pLx8EAjhB+HX8vWl7iTvuU/aOStZLqX/E3xNTS76ay0+KG4aM483fuXPfp/jXNXXxV1C7tfs8mn2+0gB2V3Vj+IIxXAUUnUellawKkrvmbd++33Hofhr4hWunX0n2nT40hkb76/M6A9t3Uj2P5165Y6haanaJdWVwk8LjIZDn/wDVXzBWpoWs3Gj6jFNFcSxR7vn8s8478dD9Kt1PaSXP95nGl7CLVJXXb/L/AIP4H0pWdr2iWfiHRrnTL5N0My4yOGRuzKexBwR9KLK+2aNHeXt1CyFQ3noCqsp6HHbIxV+ORJY1kjdXRhkMpyDUOLRtGafr26nMeCNYu7yxutI1Z9+saRL9lun6ecMZSUezLg/XNdTXF6yv9i/ErRNVU7bfVYn0259C4y8JPvw6/jXaVJQUUUUAFcZ4nH9meOvC2sqdsc8kmmTn1Ei7owf+Bp+tdnXG/FBWTwPPeoP3lhcW92h9CkqnP5ZoA7KikRtyK3qM0tABVa7v7WwWM3MyxmRtka9WdsZwoHJOATx6VZrzifXTaePfEtxeWtxcXdhZoumW6xMQYyheRgcYGWwCf9kD2oA65/FeijRL/V47+KaysA32iSI52lQCV+vI4968k8G/FjT9V+JWqXr6beQ2uoxwW8U2AwhEe7l8dAS34V1/hTw/F4h+EDaZdrJDJqsUk1xKY9pMsrGQsAeuCQP+A+lee+CPhnrtl40vdBvNYt/7O03yppkjUsZlkyVC5Hy/dOfTtmrpqHN7+3kZVnVUf3STfme+m9Emn/a7OM3QYZRUIXfz71zWp+I9c0nWtIW70+3FhfySQbI5C8ol2FoxnhedpH5V0hguLfTvJtZt8yLhJLnLZ/3sYrkfEcWs3uo6K1/p6R6fpt1/aFzd2zmUny1O1FjA3Ekt6HgVVlyu1v1JvLnjzN7dtL/15i/2lBd6jrS+JbOezXTLdLmRRdmW3MRDcjAXn5GyCPzq5aeK4LOG1hudOFlHcWL3tnHG+4siAMyEYG18MDjkdeeK5HUrO3v7vxNaaZqdwlnq+l42ahJIFN0Sdu0ycgbcA9unpxt2NvJr3iHwpdxQSpBpVlKbrzIyoWR0VBHyOT94nGRge4pSc+VKV7dB040uZuFr9e42O5u9T+L2lre20MP2XRp7iMRT+aPnkRc52jBwP/r16DXBpY2ek/GOy+yWsFtHdaJMmIowgZlmQ9u+K7yszYbI4jjZz0UE18xajdyX+pXN3M26SaVnY/U19OTJ5sMkf95SPzr5fuYXt7qaCRSrxuUYHsQcUARUUUUhhVdboSXDwxLv8vh2zgA+nuasVgJbNHEUQOt8LsvuGfmUtnP020Ae7+AvF4i8GI95Bv021vPsMlyZPuFiAMrj7oLgE5/DAq9q/iB/DMMl7pOml4rm9GnQRNcYQzl9u4pjgZB6Hn071xPhTTZrz4V3/hyJJPt+o6oGjGw48oyITJnGNoCtk+ox1xXoHjTRLHVbUw6XFZnxFBLHeW52DczxMGAZgOMhcZPtWkXKzUTKap3Up2v0OY+LHjmGwitLWPS7qa707UIbt2BULGEORnBJG5Sccd67nwd40sfG3hs6tpsbIyM0ckExwUcDOCRnjkc1518TfCWpLex+JtNa1t9S1OW3s3jmLFkZgFAGMqSD1OOg4rUs/DV18MvhPq8IuxdazfvjzI88zy4jULnk4JzVVFCycd+v9f16kUXVvJTWnR9fu/r0R3fhLX5PE/h+LVXtBarLJIsaCTflVYqGzgdcZ6VuV5tDok3hjxP4O0zTNQvpG8l472Jp2MJgjiA3eX91fn24IAJJ5zXpNZG4Vzvj6EXHw98RRkf8w6cj6iMkfqK6Kuf8dSCHwB4ic9tNuP8A0W1AGlos5udC0+cnJlto3P4qDV6s/QYjB4e02JuqWsSn8FFaFABRRRQAVxlsDa/GK+QjC3ujRSg+pjlZT+jD867OuM8Xs2m+LvCOsLxGbuTT5iO6zJ8uf+BqtAHZ0UUUARywRToUmiSRT1V1BFRPZRfYTaQFraPGFMHyFPp6VZopqTRLhF7o8+8U2tx4f1fQPEdzeyXcNnd/ZXLqFMcU/wAhZiOoDbDXX3mpz2U7BtNuZbfAxNBh/wA1zmn61pVvrmi3ml3QzBdRNG3HTI4I9wcH8KxPA2s3F5p02j6o3/E60hhbXYJ5kA+5KPUOuDn1zV893eSv+H5GfsuWPLBtfj+dzo4buGa0W6yY4mGcygoR9QeleQfE3ww9pqDa5aLvtLkjzSvIR/X6H+dexTQRXMLQzRrJGwwyuMg1nx+HtNhZ/LgKxyKVeHefLcH1XOKXuNMq9RNKya69Pw1/M+a6K9b1n4TQzXEk2lXAiRjkQyE4X2B54rj774deJLIyMLHzYl53xyKcj/dzn9KXI7Jp3uCqq7TTVvu+85SrWn2MuoXkdvGrHcwBKqWIH0711XhjwI2r3nl3l3FBtPzRbvnP0XrXr2heG9N8O2nkWMABPLyty7n3NXKn7Nrn+4iFdVov2T+fT8w0O1MehR2TWj2kKJ5Uab/nKY+8cdGPJq5ZadaadF5drCsYPJPUsfUnqatVXvr2302xnvbuVYreBDJI7HhVAyTUOb1S0XYuNNKzlq116nJ+JyNX8c+GdCXlbaR9Vuf9lYxtj/N2/wDHa6fU9Js9XhiivYvMWGVZ4yGKlJF+6wI6EVzXga1uL97/AMW38bR3OsMpt4pB80Fqv+rT2JyWPu1dlUmhTtNMtbO4luY0ZriUAPNIxdyB0GT0A54HHJq5RRQAVx/xRkZfh9qMCffuzFaqPXzJFXH5E12FcZ4xP9oeJvCmhgErJem/mA/uQLuGfbeV/KgDsY12RIo/hUCnUUUAFFFFABWB410aXXvCGo2Fsdt00fmWzZxiVCHQ57fMorfooAyfDGtR+IfDVhqkfWeIF17o44ZT7hgR+Fa1cPoZ/wCEX8c3/h+T5NP1UtqGnegk/wCW0Y/HDge5ruKACiiigArk/FWg3xvrfxL4fCjWrNSjwscLew9TEx7HurdjXWUUAY3hzxLYeJrA3FozJNE3l3NrINstvIOqOvYj8j2rZrmNe8Hx6jfLq+lXb6VriLtW7hUESr/dlTo6/XkdjWevjTUtA/c+MNHltlHA1KwRp7Z/cgfNH9CPxoA7eqq6fbjUWviGacrtBZiQo9h0FQaZr+j6zEsum6naXasMjyZlY/iAeK0aak1sTKMZWuthhhiMolMaeYBgNtGR+NULvSPtFybmK+u7aYgf6qT5eP8AZORV24ure1jMlxPHCg6tI4Ufma5W7+Iuj/aGstESfXb8cCHTk8xAf9qT7ij1JPFOM5Rd0KdOE1aSOnVvsVjvvLpWESlpJ3AQYHUnsK4bMnxK1GMhGTwhaSh9zAg6lIp4wOvlKR/wI1ZXwxrPiuZLnxhNHFYqQ0ei2jkx5HTzn6yH/ZGF+tdtHGkMaxxIqRoMKqjAA9AKTd9SkrKw4AAYHAooopDCiiigArivDh/t3x7r2v53Wtmq6VaN2JU7piP+BkDP+zWp4012XQvD0j2YEmp3bC1sIv7878L+A+8fYGrfhnQ4vDnh2y0uM7jCn7xz1kkPLsfqxJoA1qKKKACiiigAooooA57xjoEuu6OpspBBqtnILmwn/uSr0B/2W+6fY1P4W8QxeJNFjuxGYLpCYru2Y/NBMvDIfx6eoINbVcR4jsLvwzrLeL9GgeaF1C6vYxjmeMdJlH99B+Y4oA7eiqunajaatp0F/YTpPazoHjkQ8MKtUAFFFFABQQCMGiigDndT8B+FdYnae+0KykmY5aVY9jk+7Lg1VX4b+GkXbHDfxp/dj1O5UfkJK6yigDko/hl4OSYSvokVxJ/eupHm/wDQ2NdPbWltZQJBa28UEKDCxxIFVR7AVNRQAUUUUAFFFFABSMyojO7BVUZJJwAKWuE128n8aavL4V0qVk0yBsazexnGP+ndD/eP8RHQcdTigBdBDeMvFT+KJVJ0iw3W+kIw4kbpJcfj91fYE967qorW2gsrWK1tolighQJGijAVQMACpaACiiigAooooAKKKKACiiigDhL7S9Q8EahPrHh+2e70edzJf6TEMsjd5YB6+qd+1dZo+s6fr2mxahptylxbSDhl6g9wR1BHcGr9chq3hC4ttSl1zwpcx6fqb/NPbuD9mvPaRR0b/bHPPegDr6K5TSPHNtPerpOuWz6LrOP+Pe5P7ub3ik+64/X2rq6ACiiigAooooAKKKKACiiigAoJAGScAVka74m0nw3bCXUrtY2biOFRvllPoiDlj9K5o2PiDx0c6qkuieHm5Fij4urtfSVh/q1I/hBzyQTQA7Uddv8AxdezaH4VmMVnGxjv9ZUZWP1jh/vP79F+tdVoui2Hh/SodN06ARW8Q4HUse7Me5J5JqxY2FppllFZWNvHb20K7Y4o1wqj6VYoAKKKKACiiigAooooAKKKKACiiigAooooAo6to2m65YtZapZQ3du3OyVc4PqPQ+4rlx4Y8R+HufDGt/aLUdNO1ctIij0SUfOv0ORXbUUAcYPHs2mnZ4l8O6lpe371zFH9qt/rvjyQPqBW1pfi3w9rRC6drVjcOekaTrv/AO+c5/StnrWPqPhPw9q243+iWFwzdXeBd354zQBsAg9KK40/C/w2hzaDUrL2ttSnUD6DfgU3/hW9mPu+IPEqj0GqyUAdpVS+1TT9MhM1/fW1rGP455VQfmTXL/8ACs9Hf/j51HXbkdxLqs2D+TCrtj8PPCWntvi0K1kk/wCelyDO3/fUhJoAqzfEnQndotIF5rdwvBj0y3aUD6v9wfnURPjnxDwFtfDVk3Uki5uyPb+BT/31iuxhght4xHBEkUY6KihQPwFSUAc9oXgvSNCuDeqkl5qbjEl/eOZZ2/4Efuj2GBXQ0UUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH//2Q==']	['phy_876.jpg']
phy_877	MCQ	As <image_1>shown in the figure, in the area of the right-angled triangle $abc$(including the boundary), there is a uniform magnetic field directed perpendicular to the paper surface. Certain positively charged particles are injected into the magnetic field from the midpoint $d$of the $ac$edge at different rates and perpendicular to the $ac $edge. It is observed that all particles are emitted from the $bc$boundary. It is known that the specific charge of the particle is $k$, the magnetic induction intensity is $B$, the side length of $ab$is $2L$, and $\angle a = 30^\circ$, then the following statement is correct ()	['A. The maximum length of the area where particles are ejected on the boundary of $bc$is $\\frac{\\sqrt{3}}{2} L$', 'B. The maximum area of the magnetic field region through which particles pass is $\\frac{3}{32} \\pi L^2$', 'C. The time for a particle to move in a magnetic field may be $\\frac{\\pi}{2kB}$', 'D. If the emission rate range remains unchanged and replaced by positive particles with a specific charge of $2k$, only half of the particles will be ejected from the $bc$boundary']	ABC	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAD8ALEDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiua8V6zc2c2m6RpzBNQ1SbykkIz5UYGXfHqBwPcigDpaK4GyMr/FEaZZalcyWem2Hm3kbylg0znC598c4+ld8CCMg5FABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVha94WtdevtPvnuru1urFmMUttIFbDDBU5B4NbtFAHO6P4M03Q9b1DVbWS5M18UMiPJlQVXbkdySOeSeSam0RrTTreCxXUGuvPZ3hdhwQDyAfY5rcPSsOw0SEaLZW8k3mNbSGRJoT33E8fng1tTceRqT7fqc1ZT9pFwWqT/NafNfkblFVbC/g1G1E8BO3cVIYYKkHBBFWqyaadmbxkpJSi7phRRRSKCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAA9KzdBspdO0W3tZipkTdkqcjlif61pHoazPD1rPZaHb29yMTJu3DOerEj9CK0T/dtX6r9TGS/fRduj1+a/P9Bshs9FuzLsdRfTAOwPyK+OD7ZrVqC7tIL62e3uE3xN1GcfyqDT9Rju5rq22NFNaybGRuuOzfQih+/G/Vb/AKCj+7nyuyT29d3/AJ/eXqKKKzNwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAPQ1meHluk0O3W98z7QN2/wAw5b7xxn8MVpnpWZ4emubjQ7eW8Lmdt24uMH7xA4+mK0V/Zv1X6mMre2j6P03j/S+Zp1manJFpgbVFtRJIAscrjqI89ffFUPGnjGw8EaEdUv0kkUuI0jj+87HtTvCPirTfHPhxNUsUcQOzRSRSjlGHVT2PBH51MJWeuxdSLlGy36epvRussayIwZGGQR3FOrMtb7ytWl0qSFYVSNXttvR0xgj6g9vStOicXFhTmprTpp8woooqSwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAA9DWZ4fvJtQ0S3urjHmvu3YGOjED9BWmelZ2hXrajo0F06IjSbsqg4GGI/pWiX7tu3VfqYyf76Kv0enzWvy/Uj8Q+HNL8U6U+m6tbCe2YhsZwVI6EHsafoOgab4a0mLTNJtlt7WPJCjkknqSe5rSorM2Keo+bHaSXFrDHJdRKTHuHPuB9afYXkeoWMN1FnbIucHqD3H4GrNZct3PZ63Bbug+xXCbYyq/ckHJB9iP5VpFc0eVbowm/Zz529Hp8+j/AE+41KKKKzNwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAA9KztCukvdHguI4FgR92I1PAwxH9K0T0rP0Oa2uNHgls4TDbtu2xnt8xB/XNWvgenVfqZN/vYq/R6fNf18zQorA8X+L9M8FaI2q6p5rRbwixwqC7sewyQP1qTwn4q03xloMWr6W0nkOxRklXDow6qRzzyPzqDU26juFke3kWF9kpUhGxnB7VJRQtBNXViho93PeaerXUTR3MbGOVSMfMOCR7HrV+szUGvbfULO4tw8tsSYp4VHQHo/4GtOtJpfEuplSbtyPdde/mFFFFZmwUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAB6Vn6GbM6PAbAMLX5tgbOfvHPX3zWgelZ2hxWsOjwR2UrS2w3bHbqfmOf1zVr4H6r9TJ/xY7bP13X4d/kReI/DWleK9KbTdYtvPtmYNgMVKkdCCORTvD/h7TPC+kR6XpFsLe0jJYLksST1JJ5JrUoqDUKKKKAEYblK5IyMZFZujC9ihmtb4M7QSFY5z/y1Q8g/UdD9K06zdXtrqQW9zZMfPt5N2zdgOp4YH8K0g7+4+pjVTVqiu7dO6/rU0qKQHIB6UtZmwUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAB6VnaFbQ2mjwQW9wLiJd22QdGyxP8AXFaJ6VnaFZf2fo8Fr5qS7N3zp0OWJ/rWifuNX6r9TFr97F26PX5r8/0NGisPxX4s0vwbox1PVXdYd4RVjXczMewFP8L+KNM8X6JHq2lSO9u7FCHXayMOoI9eh/GszY2aKKKACiuK1v4p+GdA8WR+HL2eb7axRXZI8pGXxtDH6EH8RXaggjI6UAZWm2c+m3d3EXU2Mj+ZBlvmRj95fpnkfU1q1Q1jTzqNiY0bZOjCSGT+646GrNtKJYsGSN5E+SXY2Qr45HtWk3zLn6mFJezfs0tOn+Xy/ImooorM3CiiigAooooAKKKKACiiigAooooAKxvEXiO38N29vPc2tzMk86W6mAKcOxwoOWB5Ppmm+JvEH9g2cAhh+0X95MtvaQZwHkPcnsoGSfYVympw6hqPxD8O6NeX0d3HbI+pXKJEFCMvyoPoSTjP92gD0XqvpkVnaDYy6dotvaTlTJHuztORyxP9a0j0NZnh+2ubTQ7eC7UrOu7cC248sSOfoRWif7tq/VfqYyX76Lt0evzX5/oQeKPCul+MNHbTNWiZ4CwcFG2srDuDT/DXhnTPCWixaTpMJjtkJY7jlnY9WY9z/hWvRWZsFFFFAHHaz8MPDGveKYvEV9aym+jKM2yTCSFfulh3wAB+ArsRwMCiigArK+xx6bq0+o/aEht7hQs0b8AyZwGB9T0961agvbSK+s5baYZjkUqauErOz2e5lVhzK6Wq1XqT0VR06WONf7Oa68+6tkUSkjBwRwavVMlZ2LhLmjcKKKKRQUUUUAFFFFABRRRQAUUUUAcz4o8M3etalo+o2F/Ha3WmzNIvnRGRHDLgggEc1X0fwdc6Z4y1DXpdUNx9sijRlMeHyo5y2cbSecADHArrqKAA9DWX4eF0NCt/tgkFx8+/zB833jjP4YrUPSsvw9PcXOhW810WM7btxYYP3iB+mK0X8N+q/Uxlb20fR+m8f6+81KKxfFHinS/CGjvqmrzNHbhgoCLuZmPQAVJ4b8SaZ4s0WLVtJnMttISvzLtZWHVWHYiszY1qKKKACiuP1n4m+GNB8UQeHb68cX8pUMEjLLEWxtDHsTkevXnFdh1oAKKKiubiK0tpbmdwkUSF3Y9gBkmgCne2ttDeprEkjRNbxsshUZ3p6EDng81eilSeJJYmDI4DKw7iuV8J/ETw344nvLTSbiR5bcZeKaMoWTONw9VycevqOa2bI2mlTxaOjybmVpYt/QjPKg+3p6Vp8cfNfkYfw530Sf5/8E1KKKKzNwooooAKKKKACiiigAooooAKKKKAA9KzPD97NqGiW91cEGV927AwOGI/kK0z0rO0K9bUdGgumjSMvu+RBgDDEf0rRL923bqv1MZP99FX6PT5rX5fqVPFnhPS/GWitpeqpIYSwdWibayMO4NP8L+F9M8IaHFpOlRslujFyXbczserMfWtmiszYKKKKAOK1z4WeGfEHiuHxHewz/bYyjOscm1JSuNpYY7YHQjpXagYGBRRQAVFdW0V7aTWs6b4ZkKOvqCMGpaKAOP8G/DTw94Gu7u70mOcz3I2GSeTcUTOdq8DjIHvx1rpb2zgufJmlRi9s3mxlDg59Px9Kt0U02ndEyipKzKun30OpWaXMOdrZBVuqkdQferVZcktpot1GiwMiX0xLyA/KsmBjPpnH6VqVU4pO62exFKTa5ZP3luFFFFQahRRRQAUUUUAFFFFABRRRQAHpWdoVzFeaNBPDbrbxtuxEvRcMR/TNaJ6VnaFJay6NA9lCYbc7tiE5I+Y5/XNaL+G/VfqYyb9tFX6P80aNFZHiTxNpfhPSW1PV5zFbqwUYXczE9gO9O8PeItM8U6PFqmk3HnWshK5xgqw6gjsazNjVooooAKK5PV/iR4Y0PxND4fvr4pfylRtVCVQt90Me2cj8xXWUAFFFRzzxWtvJcTuEiiUu7HoABkmgCSiuX8K/EHw74yubq30e7aSa2G50dCpK5xuHqM/zrqKAIbm1hu4TFcRiRCQcH1HIqtpmpC/E6NH5U9vIY5Iyckeh+hFX6zNUuF0pDqCWqNudVuXAwwTnn3xmtIe8uTr0Mar5H7S9kt/T/gf5mnRSKyugdSCrDII7ilrM2CiiigAooooAKKKKACiiigAPSs7Qvsf9jQfYN/2b5tm/r945/XNaJ6VnaFFaw6NBHZTGa3G7ZIRjPzHP65rRfw36r9TGX8aO2z9d1+Hf5FHxh4Q03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phy_878	OPEN	Electron pair annihilation refers to the phenomenon in which electrons and electrons collide head-on at the same size and opposite directions and then annihilate, producing gamma rays. Electron pair annihilation is the physical basis of computed tomography (PET). As <image_1>shown in the figure, the rectangular coordinate system $xOy$is located in the vertical plane, there is a uniform strong field parallel to the y-axis in quadrant I, and there is a circular area with a radius of $R$in quadrant II. There is a uniform magnetic field perpendicular to the paper. The circular magnetic field is tangent to the $x$axis and the $y$axis at the $A$and $C$point respectively. In quadrant IV, there is a uniform magnetic field perpendicular to the paper. An electron enters the magnetic field from the $A$point along the positive direction of the $y$axis at a speed of $v_0$, and enters the electric field through the $C$point. A positron enters the fourth quadrant from the $D$point on the $y$axis along the positive direction of the $x $axis. They collide directly and annihilate. It is known that the distance between points $O$and $P$is $\frac{2\sqrt{3}}{3}R$, and the specific charge of the electron is $k$, regardless of the gravity they are subjected to and their interaction. Find: The time interval between the electron departing from the point $A$and the positron departing from the point $D$is $\Delta t$.		$\frac{\pi R}{18v_0} + \frac{2\sqrt{3}R}{3v_0}$	phy	电磁学_电磁感应	['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']	['phy_878.jpg']
phy_879	MCQ	<image_1>As shown in the figure, the input terminal of the autotransformer is connected to an AC power supply with constant effective voltage. In the figure,\( R_0 \) is a fixed resistance,\( R_1 \) is a sliding rheostat, and the resistance of the lamp does not change with temperature. Which of the following practices may keep the brightness of the bulb constant ()	['A. Sliding contact\\( P_2 \\) does not move, sliding contact\\( P_1 \\) moves upward', 'B. Sliding contact\\( P_2 \\) moves upward, sliding contact\\( P_1 \\) does not move', 'C. While sliding contact\\( P_2 \\) moves upward, let sliding contact\\( P_1 \\) move downward', 'D. While sliding contact\\( P_2 \\) moves downward, let sliding contact\\( P_1 \\) move downward']	D	phy	电磁学_交变电流	['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phy_880	MCQ	When Xiaoming studied the phenomenon of electromagnetic induction, the experimental design was as shown in Figure A<image_1>. He set two coils on a straight iron bar. The coils were\( n_1 = 20 \) turns and\( n_2 = 40 \) turns.\( n \) was used as the original coil and input <image_2>the sinusoidal alternating current as shown in Figure B. The following expression is correct ()	['A. The cycle of the auxiliary coil alternating current is 0.02s', 'B. If the sliding rheostat slide downward, the circuit input power becomes smaller', 'C. The reading of the AC voltmeter is\\( 20\\sqrt{2}V \\)', 'D. When\\( t = 0.01s \\), the instantaneous electromotive force at both ends of\\( n_2 \\) is the largest']	AD	phy	电磁学_交变电流	['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'phy_880_2.jpg']
phy_881	MCQ	As <image_1>shown in the figure, a sufficiently long horizontal conveyor belt moves at a constant rate. When different small objects are lightly placed on the left end of the conveyor belt, the objects will undergo two stages of movement. Use\(v\) to denote the speed of the conveyor belt, and use\(\mu\) to denote the dynamic friction coefficient between the object and the conveyor belt, then ()	['A. In the early stage, the object may move in the opposite direction to the transport direction', 'B. In the later stage, the direction in which the object is subjected to friction is the same as the conveying direction', 'C. \\(v\\) When the same is the same,\\(\\mu\\) Different objects with equal mass generate the same heat due to friction with the conveyor belt', 'D. When\\(\\mu\\) is the same,\\(v\\) increases twice, and the displacement of the object in the previous stage also increases twice']	D	phy	力学_机械能及其守恒定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCABzAXUDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKK4TUfi54W0zVLrTrh7w3FrK0UgS3LAMDg81W/wCF1eEf72of+AjUrjsz0SivO/8AhdXhH+9qH/gI1H/C6vCP97UP/ARqLoLM9EorB8L+MNK8YW1xcaU0zJA4jfzYyhBIzW9TEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAeReCVVvG3jrcoP/ABMR1H+1JXd+XH/cX8q4XwP/AMjt46/7CI/9CkrvK5Z/EdtP4UN8uP8AuL+VJ5cf9xfyp9HapLOR+EXF34vA/wCgvJ/M16dXmXwi/wCPzxf/ANheT+Zr02uuOxwy3CiiimSFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRXO65478M+HSyalq9vHMDgwoTJID7quSPxoA4XwP8A8jt46/7CI/8AQpK7yvHfCvjS1s/EfifUItN1O7t9RvPOha3ti2FBY8+n3hW9N8Y9Bt5DHNY6nG46q8IBH4Fq5pxbZ1wklFI9Eo7VwNp8V9Lv1ZrPSNZuFU4Yw228A++DVn/hY9v/ANC9r/8A4BH/ABqeV9i+ePcsfCL/AI/PF/8A2F5P5mvTa8N8CeL/APhGZ9ee90DXGF/fNcxeVZk4Uk9c9+a7H/hbNj/0LniL/wAAT/jXStjjktT0GivPv+Fs2P8A0LniL/wBP+NH/C2bH/oXPEX/AIAn/GncVmeg0V59/wALZsf+hc8Rf+AJ/wAaP+Fs2P8A0LniL/wBP+NFwsz0GivPv+Fs2P8A0LniL/wBP+NH/C2bH/oXPEX/AIAn/Gi4WZ6DRXn3/C2bH/oXPEX/AIAn/Gj/AIWzY/8AQueIv/AE/wCNFwsz0GivPv8AhbNj/wBC54i/8AT/AI0f8LZsf+hc8Rf+AJ/xouFmeg0V59/wtmx/6FzxF/4An/Gj/hbNj/0LniL/AMAT/jRcLM9Borz7/hbNj/0LniL/AMAT/jR/wtmx/wChc8Rf+AJ/xouFmeg0V59/wtmx/wChc8Rf+AJ/xo/4WzY/9C54i/8AAE/40XCzPQaK8+/4WzY/9C54i/8AAE/40f8AC2bH/oXPEX/gCf8AGi4WZ6DRXn3/AAtmx/6FzxF/4An/ABo/4WzY/wDQueIv/AE/40XCzPQaK8+/4WzY/wDQueIv/AE/40f8LZsf+hc8Rf8AgCf8aLhZnoNFeff8LZsf+hc8Rf8AgCf8aP8AhbNj/wBC54i/8AT/AI0XCzPQaK8+/wCFs2P/AELniL/wBP8AjR/wtmx/6FzxF/4An/Gi4WZ6DRXn3/C2bH/oXPEX/gCf8aP+Fs2P/QueIv8AwBP+NFwsz0GivPv+Fs2P/QueIv8AwBP+NH/C2bH/AKFzxF/4An/Gi4WZ6DRXl8/x08N20zQz6fq0Uq8MjwKrD6gtU9t8aNFvQTa6Prc4HUxWob+TUXCzPSaK89h+M/hM3HkXjX1g/f7TasAPyya7TTNY03WYPP02/t7uMdWhkDY+uOlMVi9RRRQAUUUUAFV76+tdMsZr29nSC2hUtJI5wFFWK8q1rzfiT48fw7HIy+HdHYPqDI2PPl7Jx6EEfg3tQNCLqXif4n3DLpE0uh+F1babvGJ7oDrt9B/k56V1eg/Djwv4eiT7PpkU84OTc3QEshPrk8D8AK6e3t4bW3jt7eNYoY1CIiDAUDoAKkoC4mB6VBeWFnqFuYL21huYTyY5ow6/kasUUCPO9X+FdrFctqnhG8l0LVAvyiFj5Mh64ZewPtx7GpvCnjq6l1c+GfFdqthryD92R/qrpexQ+p54/wD1Dvq5bxz4Pg8W6N5anydStj5tldAkNFIOnI5wcDP59RSHfudTRXHfDrxVN4j0OSDUQE1nTpDbXsfQ7hwGx74P4g12NMQUUUUAFFFFABRRRQAUUUUAFFFU73VtN0woL/ULW1L52CeZU3Y64yeaALlFZH/CVeHf+g9pn/gXH/jR/wAJV4d/6D2mf+Bcf+NAGvRWR/wlXh3/AKD2mf8AgXH/AI1m69r+mXmjXEWmeKdOtL8Lut5Vu48BxyAQTgg9CD60AdTRXhug/HySGU2viTTQxUlTcWRHUeqk4P1B/CvWNB8XaD4ljDaTqcFw2NxiDYkUe6nkflRcbTRtUUUUCCiiigAooooAKKKKACiiigAooooAgvLu2sLSW7u5kht4lLySOcBQK8wOreJvibcvFoMsmi+Gkba9+VxNc+oT0H0/PtT/ABG0/wARPHP/AAitvI6aFpZEmpyIcebJ2jz/AJ7+gr021tYLK1itbWJIYIlCJGgwFA7AUh7HL6B8NPC3h+NfJ0yO5uBy1zdgSux9eeB+AFdaAB0ApaKYiC7srW/tzBeW0NxC3WOVAyn8DXB6x8KrEXDan4VupdB1VV+VrdiInPoy9gcduPY16HRQFzz/AML+Or1NZ/4RjxfbLY60P9TMv+qux2Kn1Pp/I8V6BXNeNvCFr4v0RrZ8RXsP7y0uR96KQdOfQ9/8QKofDnxRc67pE9hqo2a1pcn2e8QjBYjgP+OD+IPtSGdpRRRTEZHijVxoPhfUtUPW2t2dR6tj5R+eKwPhTo39leBLOeVf9K1DN5O56sX5XP8AwHFR/GB2T4aant/iMSn6eYtddpMSw6PYxJjYlvGq49AopD6Fyiig9KYiG4ure0QPcTxQqTtBkcKCfTmpgcjIr478ba7qGveLNQuNQlcsk7xxxk8RKDgKB26V618Adc1C7ttT0q4leW0tgkkO858snIKg+nA4+tK5Tjoe1UUUUyTzO8V/DPxusrmNQLPxDbNDKP8Apsnf6/d/76NemV5z8Svk8TeBpV++NXRPwJXNejUhsKKKKYgooooAKKKKACiiigArG1vwpoXiN4n1fTYbt4QQjPnKg9RxWzRQByP/AAq/wV/0L9r+bf40f8Kv8Ff9C/a/m3+NddRQO7OR/wCFX+Cv+hftfzb/ABrO13wB4O0nRrm8g8KxXVwi4hgiV2aRzwowD69T2Fd/RQFz518P/AvW9VkF1rU0OlwO24wRjfIBnpgcL+Zx6V654Z+GvhnwsVls7ETXa4P2m5O9wfUdl/ACuuopWBtsKKKKYgooooAKKKKACiiigAooooAKzfEGprovh7UdTcjFrbvKPcgHA/E4FaVcR8XHZPhlq+043CMH6eYtAIi+Emk/YPBEN/KC15qjteTyNyWLH5f0wfxNd5WZ4ciSDwzpUMeNiWcSrj0CCtOgGFRXF1b2kfmXE8cKZxukYKM+mTUtfIXxB1zUNb8Z6m99I+ILmSGKIk4iVWIAA7dOfek3YaVz69BBGQciivD/AIAa3qFwdT0iaWSWzgRZYtxyIyTggegPXHsa9wpoGrBXmerI3hr406VqMJC2uvQNa3C+sigbT9fufr616ZXm/wAVv3d/4OuE/wBamsxBfoSM/wAhSYI9IooopiOV+JGmvqnw91m3iXdIsBlUDuUIbH6Va8Daqus+CNHvVOWa2RH/AN9Rtb9Qa3nRZEZGGVYYINeYeCLhvBfjHUfBN85W0uJGu9KkYcMp6pn1/qD60h9D1GiiimI888UfB3w94m1aTUzLc2VzMd03kFdrnucEcE+orpfCnhDSfBumNZaXG2HbdLLIcvIfc/06VvUUWHcKKKrahf2ul6fPfXsyw20CF5HboAKBHn3jKYap8VPB2jRZZ7V3vpsdFUfdz+KH9K9KrzX4a291r2sat46v02HUG8iyjI5SBT1/HA/EE969KpIbCiiimIKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK5vx/pjax4D1mzjGZGtmdAO7J84H4lcV0lIwDKVYAgjBBoA5n4eamNW8AaLc5ywtlif/eT5D+q109eW+EJf+EF8dah4PuyyaffyG70qRj8vPWPPr2+q+9epUIbCvPvFfwg8P8AinVH1N5bmzu5cGVoCNsh9SCOv0r0GigVznvCXgzSPBmnvaaXG5MjbpZpTueQ9sn09hxXQ0U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phy_882	MCQ	As shown in Figure A<image_1>, a long wooden board P is still on the horizontal ground. When t=0, the small object Q slides onto the long wooden board from the left end at an initial speed of 4\,\text{m/s}. The changes in the speeds of the two over time are as shown in Figure B<image_2>. During the movement, the small object never leaves the long wooden board. It is known that the mass of the long wooden board P is 1\,\text {kg}, the mass of the small object Q is 3\,\text{kg}, and the gravitational acceleration g is 10\,\text{m/s}^2. During the entire movement ()	['A. The dynamic friction coefficient between small objects and long wooden boards is 0.2', 'B. The dynamic friction coefficient between the long wooden board and the ground is 0.05', 'C. The heat generated by friction between the small object and the long wooden board is 6\\,\\text{J}', 'D. The work done by a small piece on a long wooden board is 12\\,\\text{J}']	AD	phy	力学_机械能及其守恒定律	['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'phy_882_2.jpg']
phy_883	MCQ	<image_1>As shown in the picture, there is a wooden block $C$on the smooth ground. The wooden block $B$is connected to the $C $by an elastic rod. The elastic rod can be bent without changing its length. At first, the elastic rod was in a vertical state. A bullet $A$entered $B$at a horizontal initial velocity of $v_0=200\,\text{m/s}$but did not exit. The injection process took a very short time. Then,$AB$as a whole swayed left and right repeatedly on the elastic rod. It is known that $m_A=0.05\,\text{kg}$,$m_B=0.15\,\text{kg}$,$m_C=0.8\,\text{kg}$, and $C$never left the ground and did not tip over during the entire movement. The following statement is correct ()	['A. Conservation of mechanical energy of the $AB$system during the process of bullet $A$entering wooden block $B$', 'B. The overall speed of $AB$when the elastic rod is bent to the right is $50\\text{m/s}$', 'C. The elastic potential energy that the elastic rod has when bent to the right at its maximum is equal to the kinetic energy of the system reduced after the bullet enters the wooden block $B$', 'D. The speed of $C$when the elastic rod returns to its upright state for the first time is $20\\text{m/s}$']	D	phy	力学_动量及其守恒定律	['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']	['phy_883.jpg']
phy_884	MCQ	In order to study the bulletproof effect of multilayer steel plates in different modes, the following simplified model was established. As shown in the figure<image_1>, the two identical steel plates $A$and $B$are both $d$in thickness and $m$in mass. For the first time,$A$and $B$were welded together and left on a smooth horizontal surface. The bullet with a mass of $m$was shot horizontally at the steel plate $A$, just piercing the two steel plates. The second time,$A$and $B$were placed horizontally at a distance apart. The bullet was shot horizontally at $A$at the same speed, and then shot at $B$after penetrating out, and the two steel plates would not collide. Assuming that the resistance experienced by a bullet in a steel plate is a constant force, regardless of the weight of the bullet, the bullet can be regarded as a particle. The following statement is correct ()	['A. The ratio of time taken by the bullet to pass through $A$and $B$for the first time is $1:(\\sqrt{2}-1)$', 'B. The second bullet can penetrate two steel plates', 'C. The second bullet cannot penetrate the steel plate $B$, and the depth into the steel plate $B$is $\\frac{2+\\sqrt{3}}{4}d$', 'D. The ratio of mechanical energy lost to the entire system in the first and second times is $8:(6+\\sqrt{3})$']	CD	phy	力学_动量及其守恒定律	['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phy_885	MCQ	A classmate used the <image_1>device shown in Figure A to study the potential energy\(E\)(the sum of gravitational potential energy and potential energy) of a charged ball in the gravitational field and the electric field. Two small balls 1 and 2 with the same charge are placed in a vertically placed insulating cylinder. 1 is fixed at the bottom of the cylinder, and 2 is released from a position close to 1. The position and speed of 2 are measured. Potential energy\(E-x\) image can be obtained by using energy conservation. Line I in Figure B <image_2> is the\(E-x\) image of small ball 2, and line II is the asymptote of line I fitted by the computer. In the experiment, all friction can be ignored, and the charge amount of the small ball will not change,\(g = 10 \text{m/s}^2\), then small ball 2 ()	['A. The velocity increases first and then decreases during ascent.', 'B. The kinetic energy keeps increasing as it rises', 'C. The mass is\\(0.2 \\text{kg}\\)', 'D. Moving from\\(x = 6.0 \\text{cm}\\) to\\(x = 20.0 \\text{cm}\\) can reduce the potential\\(0.3 \\text{J}\\)']	AD	phy	电磁学_静电场	['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', 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'phy_885_2.jpg']
phy_886	MCQ	As <image_1>shown in the figure, a parallel plate capacitor with a capacitance of C is connected to a constant voltage power supply. The plate length of the parallel plate capacitor is\(d\), and the distance between the plates is also\(d\). A particle with a charge of\(q\) and a mass of\(m\) approaches the upper plate and enters the electric field from the left side at a velocity\(v_0\) parallel to the plate, and can just exit from the middle point between the two plates. Regardless of the gravity exerted on the particles, the edge effect of the capacitor's polar plates is ignored. The following statement is correct ()	['A. particles are negatively charged', 'B. The velocity of a charged particle when it exits the electric field is\\(2v_0\\)', 'C. If the lower plate is moved up\\(\\frac{d}{2}\\), the particles are ejected just close to the right side of the lower plate', 'D. If the lower plate is moved up after opening the switch\\(\\frac{d}{2}\\), the electrical potential energy is reduced as the particles pass through the parallel plate capacitor\\(\\frac{mv_0^2}{2}\\)']	D	phy	电磁学_静电场	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADYAQQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKK5XW/Go0/WH0bS9Ju9Y1KJFknityqrAp5G924BI5ApNpK7A6qiuBt/izo4vZbDU9N1fTr2AAzQy2hk2A9DlM8e9bdl498K6g+yDXLPzP7kkmxh9Q2KadwOjoqOG4huE3wTRyr/eRgw/SpKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDhfGlvcan4s8O6QmqajYW9wJ2lNjOYnYqoI5qT/AIVtH/0Nviz/AMGf/wBjUniD/kpHhX/cuf8A0EV2VAHE/wDCto/+ht8Wf+DP/wCxo/4VtH/0Nviz/wAGf/2NdtRQBxP/AAraP/obfFn/AIM//saP+FbR/wDQ2+LP/Bn/APY121FAHE/8K2j/AOht8Wf+DP8A+xo/4VtH/wBDb4s/8Gf/ANjXbUUAcT/wraP/AKG3xZ/4M/8A7GsOwST4b+IdXjv4dU1DTdReOeDUtjXMu4IFZJSozwRwcYxXqVFROCnHlY07HCeFlutc8aah4nNhPZ6c1mllbi5jKSTYYsXKnkLzgZrobmw8M6w8lvc2+l3bp9+N1jcr9R2pfFtpqV94S1S10ebydQlt2WB84O4joD2JGRntmvOfD+reE9ft9O8NajpUfh/xFp0sDR288Wxt8bK3yP1YNjuec55pxioqyE9Tr5/hh4VkYyWtlNp8vaSxupISv0Cnb+lQ/wDCtou3i3xYB/2E/wD7Gu2oqgOJ/wCFbR/9Db4s/wDBn/8AY0f8K2j/AOht8Wf+DP8A+xrtqKAOJ/4VtH/0Nviz/wAGf/2NH/Cto/8AobfFn/gz/wDsa7aigDif+FbR/wDQ2+LP/Bn/APY0f8K2j/6G3xZ/4M//ALGu2ooA818R+Bm0rwzqmo2/izxUZrW1kmjD6kSu5VJGfl6cV23hueW58LaRPPI0kstlC7uxyWYoCSfxqr42/wCRF17/ALB8/wD6Aan8Kf8AInaJ/wBg+D/0WtAGvRRRQAUUUUAFFFZmt+IdJ8OWEl5qt7FbQxqWO4/MQPRepPsKANOiuHi+LfhO4iWWGfUJI25DJp05B/HZT/8Ahavhf+9qX/gsn/8AiKAO1oriv+Fq+F/72pf+Cyf/AOIo/wCFq+F/72pf+Cyf/wCIoA7WiuHPxZ8KCQRmXUA5GQv9nT5I+myn/wDC1fC/97Uv/BZP/wDEUAP8Qf8AJSPCv+5c/wDoIrsq8l1fx9ol3400HUYV1FrW0WYTP/Z8w27lAHG3Jrpf+Fq+F/72pf8Agsn/APiKAO1oriv+Fq+F/wC9qX/gsn/+Io/4Wr4X/val/wCCyf8A+IoA7WiuK/4Wr4X/AL2pf+Cyf/4ij/havhf+9qX/AILJ/wD4igDtaK4r/havhf8Aval/4LJ//iK6HQfEFh4ksXvNOM5hSQxHzoHiO4AHowBxhhzQBqUUUUAZfiOTUodAupNIi87UFCmGPON53Dgk9ARnJ9K4bx5pUnjnRE0+Pwze2+uh0MN1Miqtp8wLN5qnDDGeFJJ9BXptFADUBVFUncQME+tOoooAKKKKACiiigAooooAwfG3/Ii69/2D5/8A0A1P4U/5E7RP+wfB/wCi1qDxt/yIuvf9g+f/ANANT+FP+RO0T/sHwf8AotaANeiiigAooooAK808OaZpuveJvEd1rcEV3qkN40CxXA3eTAANgVT0BHOa9Lrntb8D+HvEN4t5qNgWuQu3zoZpIXI9CUYEj61nVg5xsnYadmcNot1rOh+KvEGl+DdHg1PSYniYxPeiFLaVlO9UJBzngkDp+NdF/b3xC/6Eiw/8HC//ABFdTo+iaboFgtlpdoltbqc7VyST6knkn3NReI5tRttAvLjSpIEu4YmkTz4jIpwCcYDD8/0qoqySEc3/AG98Qv8AoSLD/wAHC/8AxFH9vfEL/oSLD/wcL/8AEVcsPEGo6taeFrqyNsF1CPzryJkJIj2ZLKc8YbA59RXWVQHgnxd1fxSPD9re6noMGj3EE4FteW2qh5AT1UKFBIOPXtUnwz8X/FLUWhjn0galp3ANzenyGUeofHzevQ17Re6LpmpXdvdXtlDczW+fJaVd2zPUgHgH3q8AFUKoAA4AHagBRnHPWiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDB8bf8AIi69/wBg+f8A9ANT+FP+RO0T/sHwf+i1qDxt/wAiLr3/AGD5/wD0A1P4U/5E7RP+wfB/6LWgDXooooAKKKKACiiigAqG6h+02c0GQPMjZMn3GKmooA4mLSpPAngKbyLj7RfwwJCLhl+6AcKAOyrknHqSe9anh++uW13W9KmmaeKz+zvFI5ywEkeSpPflSf8AgWOwrcurWG9tZba4jEkMqlXU9wag07SrbTEl8gM0kzB5ZZDl5CFCjJ9lUAfSgC7RRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAYPjb/kRde/7B8//AKAan8Kf8idon/YPg/8ARa1B42/5EXXv+wfP/wCgGp/Cn/InaJ/2D4P/AEWtAGvRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBg+Nv+RF17/sHz/8AoBqfwp/yJ2if9g+D/wBFrUHjb/kRde/7B8//AKAan8Kf8idon/YPg/8ARa0Aa9FFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFRXInNrKLZo1nKHy2kBKhscZA7ZrjvsvxN/wCgp4X/APAOf/4ugDY8bf8AIi69/wBg+f8A9ANT+FP+RO0T/sHwf+i1rldT0X4j6tpV3p1xqvhoQ3ULQuUtJgwVhg4+frzT7DSfiRp2nWtjDqvhkxW0KQoXtJiSqgAZ+frxQB31FcT9l+Jv/QU8L/8AgHP/APF12UAmFvELhkacIPMZBhS2OSAegzQBJRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFNkDNGyo2xiCA2M4PrTqKAPOvFGn+K9B8M6lq0XjS5le1haVY2soQGx26VoadoHii4s7S6fxrdfvI0kKfYoccgHHSrvxG/wCSc6//ANeb1t6P/wAgSw/69o//AEEUAXaKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOX+I3/JOdf/683rb0f/kCWH/XtH/6CKxPiN/yTnX/APrzetvR/wDkCWH/AF7R/wDoIoAu0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcv8Rv8AknOv/wDXm9bej/8AIEsP+vaP/wBBFYnxG/5Jzr//AF5vW3o//IEsP+vaP/0EUAXaKKKACiiigAooqvfwTXVhPBb3T2s0iFUnRQTGfUA8GgCxRXG/8Ij4j/6HvUf/AAFi/wAKP+ER8R/9D3qP/gLF/hQB2VFcb/wiPiP/AKHvUf8AwFi/wo/4RHxH/wBD3qP/AICxf4UAdlRXG/8ACI+I/wDoe9R/8BYv8KP+ER8R/wDQ96j/AOAsX+FAHZUV5jqWneKLHxTo+kr41vmjv1lLSG2iyuwAjHFbn/CI+I/+h71H/wABYv8ACgDsqK43/hEfEf8A0Peo/wDgLF/hR/wiPiP/AKHvUf8AwFi/woA7KiuN/wCER8R/9D3qP/gLF/hR/wAIj4j/AOh71H/wFi/woA7KiuN/4RHxH/0Peo/+AsX+Fb+h6de6ZZPDf6tNqcrSFxNNGqFVwBtwvGOCfxoA06KKKACiiigAooooAKKKKACiiigAooooA5f4jf8AJOdf/wCvN629H/5Alh/17R/+gisT4jf8k51//rzetvR/+QJYf9e0f/oIoAu0UUUAFFFFABRRRQAUUUUAFFFFABRRRQBxviD/AJKR4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phy_887	MCQ	As shown in the figure<image_1>, there is a uniform strong electric field in space. A small ball with mass\(m\) and charge\(q\) passes through\(P\) and\(Q\) points in the same vertical plane along the solid line in the figure. When passing through the two points, the rate is the same. The angle between the line between the two points\(P\) and\(Q\) and the vertical direction is\(\theta\), then the small ball moves from\(P\) to\(Q\) During the process of\()	['A. The velocity is minimum when the ball reaches the midpoint of the solid line', 'B. The change in the momentum of the small ball decreases first and then increases', 'C. The field strength of this electric field should not be less than\\(\\frac{mg\\cos\\theta}{q}\\)', 'D. The potential energy of the ball at\\(P\\) point is greater than that at\\(Q\\) point']	AC	phy	电磁学_静电场	['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']	['phy_887.jpg']
phy_888	OPEN	In modern scientific experiments and technical equipment, electric fields are often used to change or control the movement of charged particles. The <image_1>device shown in Figure A consists of three parts: an acceleration region, an electrostatic analyzer and a deflection electric field. Positive ions with unknown specific charge are released statically at the emission source S, pass through the accelerating voltage\(U_0\) between the vertically placed\(A\) and\(B\) plates, and then enter the electrostatic analyzer with the uniform radiation direction of the electric field. The electrostatic analyzer is injected from the\(C\) point along an arc with a radius of\(R\) and a central angle of 53°, and is injected from the\(D\) point, and is injected from the\(P\) point of the deflection electric field through\(DP\). The horizontally placed\(G\),\(H\) The spacing between the plates is\(d\), and the changing voltage as shown in Figure B is added between the two plates<image_2>.\(G\) is the positive plate. The maximum value of the changing voltage is also\(U_0\), and the period\(T\) is much longer than the movement time of ions in the deflection electric field.\(G\) and\(H\) plates are long enough to ignore the particle gravity. It is known that\(\sin53^\circ = 0.8\),\(\cos53^\circ = 0.6\). Ask: The length of the ion hitting the\(H\) plate.		\(\frac{27}{25}d\)	phy	电磁学_静电场	['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']	['phy_888_1.jpg', 'phy_888_2.jpg']
phy_889	MCQ	Doctors often use CT scanners to examine lesions in patients. Part of the working principles of the CT machine are shown in the picture<image_1>. After electrons are accelerated by an accelerating electric field from rest, they enter a rectangular uniform magnetic field perpendicular to the paper along the horizontal direction, and finally hit point P on the target to generate X-rays. It is known that the voltage between MNs is U, the width of the magnetic field is d, the specific charge of electrons is k, and the velocity deflection angle of electrons when they leave the magnetic field is θ, then the following statement is correct ()	['A. The direction of the deflection magnetic field is perpendicular to the paper and inward', 'B. The speed at which electrons enter the magnetic field is\\(\\sqrt{\\frac{2U}{k}}\\)', 'C. The radius of circular motion of an electron in a magnetic field is\\(\\frac{d}{\\sin \\theta}\\)', 'D. The magnetic induction intensity of the deflection magnetic field is\\(\\frac{d}{\\sin \\theta} \\sqrt{\\frac{2U}{k}}\\)']	AC	phy	电磁学_电磁感应	['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phy_890	OPEN	As <image_1>shown in the figure, the coordinates of the center of the circle are the radius of the semicircle (r = 0.08 text{m}) of the origin O, and the radius of the arc (R = 0.1 text{m}) of the center coordinate of the circle is (0,0.06m), and there is a magnitude of magnetic induction intensity (B_1 = 0.1 text{T}) between them, and the direction is perpendicular to the uniform magnetic field region facing outward from the paper side. A particle source at O emits a positively charged particle with velocity (v_r = 6 times 10^5 text{m/s}) uniformly into the first quadrant in the xOy plane, and emits the magnetic field after being deflected by the magnetic field. The plate length (L = 0.12 text{m}) and the spacing (d = 0.16 text{m}) of the parallel metal plate MN, where the coordinates of the left end of the N plate are (0.2m, 0), and now a constant voltage is added between the two plates, and the particle a with the shortest uniform linear motion time before entering the parallel metal plate happens to emit an electric field from the right end of the N plate. If the particle gravity is not counted, the specific load (frac{q}{m} = 10^8 text{C/kg}) does not take into account the interaction between particles and the edge effect of the electric field. (known (sin 15^circ = frac{sqrt{6}-sqrt{2}}{4}),(sin 30^circ=frac{1}{2}),(sin 37^circ = frac{3}{5}),(sin 45^circ = frac{sqrt{2}}{2})) particle a can be ejected exactly from the midpoint of the right boundary of the electric field, After passing through the fieldless region to point P on the x-axis (not drawn in the figure), after a period of time, it is deflected by a rectangular magnetic field region, and then the uniform linear motion returns to point P again, and the angle between the velocity direction and the negative direction of the x-axis is 15°, if the magnetic induction intensity of this rectangular magnetic field is (B_2 = frac{3sqrt{2}}{5}B_1),and the direction is perpendicular to the xOy plane, the minimum area of the rectangular magnetic field region is( ).		\(\left( \frac{4 + \sqrt{6} - \sqrt{2}}{2} \right) \times 10^{-2} \, \text{m}^2\)	phy	电磁学_电磁感应	['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phy_891	MCQ	The schematic diagram of the working principle of a medical cyclotron is shown in Figure A<image_1>. Its working principle is: under the action of the magnetic field and the alternating electric field, charged particles repeatedly perform cyclotron motions in the magnetic field, and are repeatedly accelerated by the alternating electric field to achieve the expected required particle energy, extracted through the extraction system, and bombarded on the target material to obtain the required nuclide.\ When (t = 0\), the trajectory in the cyclotron of charged particles released by the filament at the center of the cyclotron O and the high-frequency AC voltage applied between the gaps are as shown in Figure B <image_2>(the figure is a known quantity). If the specific charge of a charged particle is\(k\), ignoring the time and relativistic effects of the particle passing through the gap, then ()	['A. The accelerated particles are positively charged', 'B. The magnetic induction intensity of the uniform magnetic field between the magnets is\\(\\frac{\\pi}{2kt_0}\\)', 'C. The maximum momentum of the particle being accelerated is related to the radius of the D-box', 'D. the numb of times a charged particle is accelerate in a D-box is related to that AC voltage']	BCD	phy	电磁学_电磁感应	['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'phy_891_2.jpg']
phy_892	MCQ	As <image_1>shown in the figure is a simple model diagram of a magnetic fluid generator. The power generation channel is a rectangular cavity with the length, height and width of\(l\),\(a\), and\(b\) respectively. The front and rear sides are insulators, and the upper and lower sides are conductor electrodes. These two electrodes are connected in a closed circuit with a resistor with a resistance value of\(R\) through a switch. The entire power generation channel is in a uniform magnetic field, the magnitude of magnetic induction is\(B\), and the direction is perpendicular to the paper and inward. If the plasma source emits plasma particles with both mass of\(m\) and charge of\(q\) at a velocity\(v_0\), and are injected into the space between the two plates in a direction parallel to the plate surface, the number of positive and negative ions per unit volume is both\(n\). Ignore plasma gravity, interaction forces and other factors. The following statement is correct ()	['A. When the switch is closed and open, the potential of the upper plate is higher than that of the lower plate after stabilization', 'B. Let the resistivity of the plasma be\\(\\rho\\), and when the circuit is not connected, the resistance to the plasma is\\(f\\). After the circuit is connected, the pressure difference applied on both sides of the channel in order to maintain the speed\\(v_0\\) constant is\\(\\Delta p = \\frac{f}{ab} + \\frac{B^2alv_0}{Rbl + \\rho b}\\)', 'C. When the key is closed, if the movement trajectory of positive ions in the channel is as shown in the dotted line in the figure <image_2>(negative ions are similar to it), let the voltage on both plates be\\(U\\), and the height difference between the highest and lowest points of the trajectory in the figure is\\(h = \\frac{2m (Bav_0 - U)}{B^2aq}\\)', 'D. The difference in height between the highest point and the lowest point of the trajectory in the figure is\\(h\\). In the case of\\(h < a\\), the current through the resistor\\(I = \\frac{Bav_0} {\\frac{B^2b}{2mav_0}+ R}\\)']	AC	phy	电磁学_电磁感应	['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'phy_892_2.jpg']
phy_893	OPEN	As <image_1>shown in the figure, there is a circular uniform magnetic field area with a center of O and a radius of d in space. The magnetic induction intensity is\(B_0 = \frac{v_0}{dk}\). There is a parallel plate capacitor with a plate spacing of 2d directly below the magnetic field. The y-axis is the central axis of the capacitor, A and B are two points on the left and right edges of the plate respectively, and the line AB is tangent to the circular magnetic field. Point P on the line is 0.5d away from point B. Starting from point L C on the circular magnetic field circumference, there are n narrow strip magnetic fields\(B_1\),\(B_2\)...\(B_n\) outward from the vertical paper surface with spacing\(L_1\),\(L_2\)...\(L_n\). The magnetic field spacing\(L_n\) satisfies\(L_n = nL\)(\(n\) is a positive integer), and the spacing between adjacent strip magnetic fields is always L. The boundary of each magnetic field is parallel to the y-axis and below the x-axis. Now, an alternating voltage with a period of T is applied between the left and right plates of the capacitor as shown in Figure B <image_2>. A large number of positive particles with a specific charge of\(k\) are injected into the capacitor from point M on the y-axis at the same speed\(v_0\) in the forward direction along the y-axis. The particles injected at the moment of\(t=0\) arrive at the point of point P at the moment of T. Regardless of particle gravity and electric field edge effects and inter-particle interactions. If the magnetic induction strength of the narrow strip magnetic field\(B_n\) satisfies\(B_n = \frac{B}{n}\)(\(n\) is a positive integer), and\(B = \frac{2v_0}{21kL}\). Mark the farthest magnetic field that a particle that can enter a strip magnetic field can reach as\(B_n\), and the closest magnetic field that they reach is\(B_m\), and find the value of\(n+m\).		5	phy	电磁学_电磁感应	['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'phy_893_2.jpg']
phy_894	OPEN	As <image_1>shown in the figure, the smooth track $ABC$consists of a vertical section $AB$, a $\frac{1}{4}$arc-shaped track $BC$with a radius of $R$, and a tangent line at the end $C$is horizontal. Immediately to the right end of $C$are the horizontal rough conveyor belts A and B and the horizontal rough ground, all of which are equal to the $C$point; the conveyor belt A rotates clockwise at a constant rate of $u=7\sqrt{gR}$, and the homogeneous wooden board above the conveyor belt B is in a static state. The length of the wooden board is equal to the length of $DE$at both ends of B, both of which are $kR$($k$unknown), ignoring the gap between the track, the conveyor belt and the ground. Currently, an object is released statically from $P$on the track and enters conveyor belt A through the $C$point. After colliding with the wooden board at $D$, the object is taken away. Before and after the collision, the speed of the object and wooden board is exchanged. At the moment of the collision, conveyor belt B starts and rotates clockwise at a constant speed at the speed of the wooden board after it is touched. Finally, the wooden board moves a distance of $2kR$and then stops, ignoring the collision time and the start-up time of B. It is known that when the object passes through the conveyor belt A, the distance traveled by the belt A is $1.5$times the distance of the object; the dynamic friction coefficient between the wooden board and the conveyor belt B and the ground is $0.5$, and the maximum static friction force is equal to the sliding friction force;$PB$The height difference $h=R$, the mass of the object and the wooden board is $m$, and the gravity acceleration is $g$, ignoring the size of the object and the conveyor belt wheels. Given the periodic formula of simple harmonic motion $T=2\pi\sqrt{\frac{m}{k}}$, where $k$is the restoring force coefficient.$\ sin 27^\circ=\frac{\sqrt{5}}{5}$, find: board movement time $t$.		\frac{7}{5}\sqrt{\frac{R}{g}}\left(\frac{3\sqrt{5}\pi}{10}+4\sqrt{5}+2\right)	phy	力学_机械能及其守恒定律	['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phy_895	OPEN	As <image_1>shown in the figure, a small object with a mass of $m=1kg$that can be regarded as a particle is thrown horizontally from the $A$point on the smooth platform at an initial speed of $v_0= 3m/s$, and reaches the $C$point. When it reaches the $C$point, it enters the smooth arc track fixed on the horizontal ground along the tangential direction of the $C$point. Finally, the small object slides onto the long wooden board with a mass of $M=3kg$close to the $D$point at the end of the track. It is known that the upper surface of the wooden board is flush with the tangent line at the end of the circular arc track, and the lower surface of the wooden board is smooth with the horizontal ground. The dynamic friction coefficient between small objects and long wooden boards is $\mu=0.3$, and the radius of the circular arc track is $R=0.5m$,$C$The angle between the line between the point and the center of the circular arc and the vertical direction is $\theta=53^\circ$, regardless of air resistance. Find: ($g=10m/s^2$,$\sin53^\circ=0.8$,$\cos53^\circ=0.6$) The minimum length of the wooden board so that small objects do not slip out of the long wooden board.		3.625m	phy	力学_机械能及其守恒定律	['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phy_896	OPEN	As <image_1>shown in the figure, an ejection game device consists of a fixed catapult installed on a horizontal table, a water straight track $AB$, a vertical semicircular track $BCD$with a center of $O_1$, and a vertical semicircular pipe $DEF$with a center of $O_2$., a water straight track $FG$and elastic plates, etc., and all parts of the track are connected smoothly. It is known that the mass of the slider (which can be regarded as a particle) is $m=0.01kg$, the radius of the track $BCD$is $R=0.8m$, the radius of the pipe $DEF$is $r=0.1m$, and the dynamic friction between the slider and the track $FG$is $\mu=0.5$. The rest of the track is smooth, the length of the track $FG$is $l=2m$, and the maximum elastic potential energy of the spring in the catapult is $E_{pm}=0.5J$. After the action of the slider and the spring, The elastic potential energy of the spring is completely transformed into kinetic energy of the slider, and the slider rebounds at an equal rate after interacting with the elastic plate. If the spring springs out with maximum elastic potential energy, please determine whether the slider will get out of orbit during the game? If not, request the final rest position of the slider.		The slider will not escape the track during the game, and the slider's final resting position is $0.4m$away from the elastic 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phy_897	OPEN	As <image_1>shown in the figure, a wooden board with a mass of $M=3kg$has a rough $AB$section on its upper surface and a length of $L=3m$, and a smooth $BC$section. There is a mass $P$(which can be used as a particle) with a mass of $m=1kg$on the far left end of the board, which slides to the right on a smooth horizontal surface together with the board at a speed of $v_0=3\sqrt{6}~m/s$. The dynamic friction coefficient between the object block and the plate surface of section $AB$is $\mu=0.3$; there is a vertical wall on the right side of the wooden board. The wall is equipped with a horizontal groove. A light rod is embedded in the groove. When it moves in the groove, the sliding friction force between it and the groove is always $f_0=20N$. A light spring with a stiffness coefficient of $k=50N/m$is fixed to the left end of the light rod. At this time, the distance from the left end of the spring to the wall is less than the length of the $BC$section plate. It is known that the board immediately stops after hitting the wall, but does not adhere to the wall. The light spring is always within the elastic limit. When its deformation value is $x$, it has an elastic potential energy of $\frac{1}{2}kx^2$, and the maximum static friction force is equal to the sliding friction force, taking $g=10m/s^2$. Request: If the object $P$returns to the $B$end of the board, immediately apply a horizontal constant force $F=3N$to the left to the board. Try to calculate the increased internal energy of the system composed of the object $P$and the board after that.		2.4J	phy	力学_机械能及其守恒定律	['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']	['phy_897.jpg']
phy_898	MCQ	As <image_1>shown in the figure, the pipe with smooth inner wall consists of upper and lower horizontal pipes and a semicircular pipe in the vertical plane. The radius of the semicircular pipe is $R$. The horizontal pipe and the semicircular pipe are just tangent. The two small balls in the pipe $A$and $B$are connected by a non-extensible light rope with a length of $l=\pi R$. The masses of the small balls are both $m$, and the radii are slightly smaller than the inner diameter of the pipe but much smaller than $R$. Initially,$A$was at the top end of the semicircular pipe, and the rope was just straightened. Due to slight disturbance,$A$began to slide down the pipe. It is known that the gravitational acceleration is $g$, and the following statement is correct ()	['A. The speed of the small ball $A$when it first enters the horizontal pipe below is $\\sqrt{2gR}$', 'B. Before the ball $A$enters the horizontal pipe below, the work done by the rope pulling force on the ball $B$is $\\frac{1}{2}mgR$', 'C. If the rope length is changed to $l=\\frac{\\pi}{2}R$, the speed of the small ball $A$when it first enters the horizontal pipe below is $\\sqrt{2gR}$', 'D. If the rope length is changed to $l=\\frac{\\pi}{2}R$, the work done by the rope pulling force on the ball $B$during the entire process will be $\\frac{\\sqrt{2}}{2}mgR$']	AD	phy	力学_机械能及其守恒定律	['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phy_899	MCQ	As <image_1>shown in the figure, objects $A$and $B$with a mass of $m$are connected by a light rope.$A$is worn on a fixed vertical smooth rod, and $B$is placed on a fixed smooth slope. The slope angle is $\theta= 30 ^\circ $. One end of the light spring is fixed to the baffle at the bottom of the slope, and the other end is connected to the object $B$. Initially,$A$is at the $N$point, the light spring is in its original length, and the light rope is stretched straight (level of the $ON$section). Now $A$is released from rest, and the speed when $A$moves to the $M$point is $v$. Let $P$be the lowest point of $A$movement,$B$will not encounter light pulleys during the movement, the spring is always within the elastic limit,$ON=1$,$MN=\sqrt{3}l$, and the gravitational acceleration is $g$, regardless of all resistance. The following statement is correct ()	['A. When $A$moves from $N$to $M$, the work done by the pulling force of the rope on $A$is $\\sqrt{3}mgl-\\frac{1}{2}mv^2$', 'B. As $A$moves from $N$to $M$, the reduced mechanical energy of $A$is equal to the increased mechanical energy of $B$', 'C. When $A$moves to the $M$point, the speed of $B$is $\\frac{2\\sqrt{3}}{3}v$', 'D. When $A$moves to the point $M$, the increased elastic potential energy of the spring is $\\frac{(2\\sqrt{3}-1)mgl}{2}-\\frac{7}{6}mv^2$']	D	phy	力学_机械能及其守恒定律	['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']	['phy_899.jpg']
phy_900	MCQ	As <image_1>shown in the figure, a circular pipe with a radius of $R$is fixed in a vertical plane. The side near the center of the circle is rough and the side far away from the center of the circle is smooth.$BD$is the horizontal diameter of the track, and $CA$is the vertical diameter of the track. The cross-sectional radius of circular pipes is much less than $R$. The gravitational acceleration is $g$. Initially, the small ball with a diameter slightly smaller than the diameter of the cross-section of the pipe is stationary at the lowest point of the orbit $A$, so that the small ball achieves a horizontal rightwards velocity $v_0$, then ()	['A. If the small ball moves in a periodic circular motion, the minimum value of $v_0$is $\\sqrt{6gR}$', 'B. If $v_0=2\\sqrt{gR}$, the ball will eventually stop at $C$', 'C. When the initial velocity of the small ball $v_0$changes from $4\\sqrt{gR}$to $8\\sqrt{gR}$, the movement period is reduced by more than half', 'D. When different values of $v_0$are taken, the time interval for the ball to pass through the $A$point cannot be the same']	C	phy	力学_机械能及其守恒定律	['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phy_901	MCQ	As <image_1>shown in the figure, a ring with a radius of $R$is fixed in the vertical plane, with the center of the circle being $O$, and $O_1$and $O_2$are two light fixed pulleys, of which $O_1$is at $2R$directly above the $O$point. The light rope that crosses the fixed pulley has one end connected to the small ball $P$located at the lowest point of the ring (the $P$is sleeved on the ring), and the other end connected to the small ball $Q$. At a certain moment, the small ball $P$obtains horizontal and right. The initial speed can just rise to the point of $E$along the ring, and the angle between $EO$and the vertical direction is $60^\circ$. It is known that the masses of the small balls $P$and $Q$are $2\sqrt{3}~m$and $m$respectively, and the gravitational acceleration is $g$, ignoring all friction. The following statement is correct ()	['A. During the movement from the lowest $P$point to the $E$point, the mechanical energy of $P$first increases and then decreases', 'B. When $P$first starts to move, the tension on the rope is greater than $mg$', 'C. When $P$moves to the $F$point equal to the center of the circle, the ratio of the velocity of $P$to $Q$is $2:\\sqrt{5}$', 'D. The initial kinetic energy of the small ball $P$is $(4\\sqrt{3}-3)mgR$']	D	phy	力学_机械能及其守恒定律	['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']	['phy_901.jpg']
phy_902	OPEN	As <image_1>shown in the figure is a schematic diagram of a certain track. The lower end of the quarter-arc track $AB$with the center of $O_1$is tangent to the horizontal track $BC$at point $B$. The upper end of the quarter-arc track $EF$with the center of $O_2$is tangent to the horizontal track $DE$at point $E$. There is a horizontal conveyor belt between the tracks $C$and $D$, and the two ends are smoothly connected to the horizontal tracks $BC$and $DE$respectively, and the $FG$section is horizontal. The radius of track $AB$is $R_1=0.45m$, the radius of track $EF$is $R_2=0.4m$, the length of the conveyor belt between $C$and $D$is $L=1m$, the surface is rough, and the rest of the track is smooth. A slider (which can be regarded as a particle) with a mass of $m=1kg$is released from rest from the $A$point. When the conveyor belt is stationary, the pressure on the circular arc track when the slider moves to the $E$point is exactly zero. Gravity acceleration $g=10m/s^2$, regardless of air resistance, ask: If the conveyor belt rotates clockwise at a constant speed of $v$, after the slider is released from rest from the $A$point, try to discuss: The relationship between the heat generated by friction between the slider and the conveyor belt and $v$.		The relationship between the heat generated by friction between the slider and the conveyor belt and $v$is: when $v>\sqrt{14}~m/s$, the frictional heat is $(\sqrt{14}-3)v-2.5(J)$; when $2m/s\leqslant v\leqslant\sqrt{14}~m/s$, the frictional heat is $\frac{(3-v)^2}{2}(J)$; when $v<2m/s$, the frictional heat is $(2.5-v)J$.	phy	力学_机械能及其守恒定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADJAkADASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAorA0vxXZ6t4n1XRLdT5mnKheTPDls5AHtgDPqfat4nAJoAWiuMtPH8l/brc2fhfW7i3YkJKkabWwccfN7Vp6H4pXWdTuNPk0u+sLmCJZil0qjKkkAjBPoaAsdBRRRQAUUUUAFFFFABRRRQAVFc3UFnA09zNHDCgyzyMFUfUmpa8+u2bxR8VP7IuBu0vRLdbiSFvuyzt90sO+Acj3FAHXWPiHSNSuDb2eoQSzYyIw2GYeoB6j3FadcD8T2NtB4eurYAX6atCsBH3iDkMv0I6131ABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABWN4m1SfTNHc2URm1C4PkWkQIy0jdOvYck+wNbNYt14fN1r9tqzaldq1tnyoAI/LAON3Vc84xnOeTjFAHCaBFPo3xP0y3n0+ayFzpLwZmlR2ndH3s5Kk8kkk/WvVH+4fpXOap4RTVNfs9Yk1W+iuLIsbdYhGFj3DDDlCSCB3zXRkcEUDZyHw6u7dPAmmq9xErAPkFwCPnao4Y2u/ircTW9+yRRabEZI4trLL878EkEj14xWf4I8KaBd6NdLeaRaTXFvqFzAzvGCTtkbH6Yrs9N0DSdHkkk03Tre1eQAO0SBSw96QEd7pd9dalFcwa3dWsCY3W0ccZR8HnJZSeenBpdW0y91BoTaazdacEzuEEcbb84671PT29a1KKYjO1PTry+tYorXVrmwkQ5aWFEYvx0O5SPfii4068m0iOzj1a5huFCg3ipGXbHUkFdvP0rRooAzotPvE0drNtWuZLkggXhRPMGe+Au3j6Uadp93Z2UkFzqtxeyuSVnlRFZOOgCqB+laNFAGZpOm3uniX7XrFzqO/G3z4412fTYo6+/pTdP0u+s76We41u6vInB2wSxxqqZOeCqg8dOTWrRQByesQa7p2safeWeqXlzbXF+kU1mYEMccTZychdwxxyTSXeh6hpnjKbxHpMMd0t3brDd2rSbGYr911J46cEHFa2u6w+kHTQkIl+2X0dq2TjaGz836Vr0DOUTw/fa14ktdZ11YoobEE2VjG+/a56yO2MFvQDgetbVlqT3WrajZPEqC0Me1g2dwYE88cdK0azbLTpbbWdRvXkRku/L2qAcrtBHP50CNKiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA5Tw232Pxb4m0vGFM8d9GPUSJhv1Q11dclrJ/srx5oupgYhvkfTp27bvvx5/EMPxrraACiiigAooooAKKKKACiiigDM1jV4dJNh5sLSfa7yO1TGPlZs4P6Vp1mazdadanT/wC0YhJ5t5HHb5TdtmOdp9u/NadABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAGJ4s0h9a8OXVrA2y6UCW3f8Auyodyn8xU/h3WE17QLTUUUoZU+dD1Rxwyn6EEVqVx1qf+EW8aS2b/LpmtuZoGPCxXIHzJ/wMfMPcGgZ2NFFFAgooooAKKKKACiiigDM1mPS5Dp/9psq7byNrbLEZm52jjr3rTrM1jTbPUTYfa5jF9mvI7iLDAbpFzheevU8Vp0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFZniDRINf0iWxmYoxw8Uq/eikHKuPcGtOigDnvC2tz38M2m6ooj1iwIjuUHAkH8Mq/wCyw5+uRXQ1zniTQbi6mh1jR3WDWrQfu2PCzp3if1U/oeaueHvEFt4gsmkjVobqFvLurWTh4H7qw/ke4oGa9FFFAgooooAKKKKAMrW9GGsHTiZzF9jvY7sfLnftz8vXjOetatY+vaZdamdM+yzCL7NfxXEuWI3Iucrx9a2KACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArnNe8Ny3N2ms6LMtnrUK4EhH7u4X+5KO49D1HaujooA5/QvFMOqXD6dewNp+sRDMtnMeSP7yHo6+4roKydc8O2GvwIl2jJNEd0FzC2yWFvVWHI/lWINU8Q+Fxs1m3fVtNTpqFomZkH/TSIdfqv5UDOxoqjpWs6drdqLnTbyK5iPUo2SvsR1B9jV6gRxnxTuFtfAV7OHkjmVkEDxytGVdmCg5UjsTweK5jW4dJ0/w9AvhrWbm58TERLAtrqck7SSZG4shdl243E5GK1/ibfQTtouk4kcHU4JrrbEzKkK5JJIGPSq3itIPEtxpdr4Ws3GoRXiStfpbNEtvGPvZcgA5/ujOaRSOu1aHWZrXRfsrkTpeQve+WwUGMA7/qM9q3qxtfudStjpf9nI7+ZfxR3O1N2ITncT6DpzWzTJCiiigAooooAq6jqNppVhNfX0yw20K7ndugFYJ8VagbE6mvhy8OnBd+8yoJSnXcI+uMc4zn2rH+IhN34h8IaRLzZXWob5lP3X2DIU+oOeld5M8MUDNOyJCBhi5wAKBlbSNSj1nSLXUYY3jiuYxIiyDDbT0zV2o4IYreCOGCNY4o1CoijAUDoBUlAgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK5nxJ4quNA1PTrKPSXvDqEnlQss6p8/cEHsB3966auE1xv7R+LXhyxHK2FtPeyf8AAvkX9RQNGxF4pkg1O2sNZ0ubTXu22W8rSJJFI/8Ad3KeG9AetdHXAfEdmv8AUPDGh2oLXk2px3XH8EcedzfrXf0AFFFFAgrN17VH0XRbrUUtTci3QyOgkCfKBknJ9q0q4/4o3htPh3qoT/WXCLboB3LsFx+RNAIbH4x1ibQF1qLwrM9o0HnjF3Hv2Yznb9O1dVYXRvdOtrpojEZolkMbHJXIzg1yeiW2s6XqkUer3FsukWWmpHE0StHGWJAO7cSCQFH/AH1712gwBx0oGwooooEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUlAC0UlFAC0UlFAC0UlFAC0UlFAHP6n4N0jUbtr6OOSx1E/8vlk5il/EjhvxBqn9m8aaQAtteWOtwD+G7H2ebHpvUFT9cCusooC5yn/CZzWpC6t4a1i0bu8UIuIx/wACQk/pU0XxB8Kudr6vDA3dbhWiI+oYCulqOWCGYYliRx6MoNAHK6r4/wBHt309dO1TT7oz3aRTBZw3lxHJZ+DxjHXpWp/wmPhr/oP6b/4Ep/jVbXZ9D8O2n2mTTbeS6mPlW9vFCvmTuRjYvHfv7Vj6b4b03Rra78S+KIbFbqRNzp5Y8q1j7IgxyfU9SaQzof8AhMfDX/Qf03/wJT/Gj/hMfDX/AEH9N/8AAlP8a5rSfDdv4i1CPX9V0uC006L5rCwaJVOP+eso9fQdh71C2lWPjm+MNlY29v4ct3xLcxwqrXrg/cQgZCAjlu/QUAdX/wAJj4a/6D+m/wDgSn+NH/CY+Gv+g/pv/gSn+Nc5q9vZ6nft4b8O6dZRyxgC9vRApW0T+6OOZCOg7dTTtRs9F8M2VpoGi6Na3mrTJi3hkjDEDvLK2PujqT36CgC3r+oeDvENpFDc+IbGKWCUTW9xDdoHhkHRlOf51HBqegCaJtU8Z2uoCLDRx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phy_903	OPEN	As <image_1>shown in the figure, the vertically placed spiral circular track $BGEF$with a radius of $R=0.2m$is smoothly connected to the water straight tracks $MB$and $BC$, and the inclined plane $CD$with an inclination angle of $\theta= 30\circ $is smoothly connected to the straight track $BC$at $C$. The horizontal conveyor belt $MN$moves clockwise at a speed of $v_0=4m/s$. The difference in height between the conveyor belt and the horizontal ground is $h=0.8m$, and the distance between the $MN$is $L_{MN}=3.0m$. The dynamic friction coefficients between the small slider $P$and the conveyor belt and the $BC$track are both $\mu$(unknown), and other parts of the track are smooth. The length of the straight track $BC$is $L_{BC}=1.0m$, and the mass of the small slider $P$is $m=1kg. Now release the slider $P$from the slope height $H=0.4m$, then $P$reaches the $F$point for the first time, which is equal to the center of the circular track, the pressure on the track is just $0$. Gravity acceleration $g$is taken as $10m/s^2$, and find: If the slider $P$can pass the highest point of the circular orbit $E$twice during the movement, find the range of slope height $H$.		The range of bevel height $H$is $0.7m\leqslant H\leqslant 0.8m$.	phy	力学_机械能及其守恒定律	['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']	['phy_903.jpg']
phy_904	OPEN	Conveyor belts are widely used in all walks of life. Due to the different dynamic friction coefficients between different objects and the conveyor belt, the movement of objects on the conveyor belt is also different. As <image_1>shown in the figure, an obliquely placed conveyor belt has an inclination of $\theta=37^\circ$to the horizontal plane, and is driven by a motor to run at a constant speed clockwise at a rate of $v=2m/s$. M$,$N$are the two endpoints of the conveyor belt, and $MN$The distance between the two points is $L=7m$.$ There is a baffle $P$close to the conveyor belt at the N$end to block the objects on the conveyor belt. Metal block $A$and wooden block $B$are released from static motion at $O$on the conveyor belt. The mass of metal block and wooden block are both $1kg$and can be regarded as particle particles. The distance between $OM$$$is $L=3m$.$\ sin37^\circ=0.6$,$\cos37^\circ=0.8$, and $g$takes $10m/s^2$. There is no relative slip between the conveyor belt and the wheels, regardless of friction at the axle. The wooden block $B$was released from rest and moved downward along the conveyor belt and collided with the baffle $P$. It is known that the collision time is extremely short, the speed before and after the collision between the wooden block $B$and the baffle $P$remains unchanged, and the dynamic friction coefficient between the wooden block $B$and the conveyor belt $\mu_2=0.5$. Ask: After a long enough time, the output power of the motor is constant. Ask for the output power of the motor at this time.		8W	phy	力学_机械能及其守恒定律	['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phy_905	MCQ	As <image_1>shown in the figure, the length of the horizontal part $ab$of the conveyor belt is $2m$, the length of the inclined part $bc$is $4m$, and the angle between $bc$and the horizontal direction is $37^\circ$. The conveyor belt moves clockwise in the figure at a uniform rate of $2m/s$. Now lightly drop the small coal block $A$with a mass of $m=1kg$from static to $a$. It will be transported to the point of $c$. It is known that the dynamic friction coefficient between the small coal block and the conveyor belt is $\mu=0.25$, and the coal block will not escape from the conveyor belt during this process,$g=10m/s^2$. The following statement is correct ()	['A. When the small coal piece moves from point $a$to point $b$, the extra electricity consumed by the motor is $4J$', 'B. The time it takes for small coal to move from $a$point to $c$point is $2.4s$', 'C. During the movement from point $a$to point $c$, the heat generated by friction between the small coal and the belt is $6J$', 'D. During the movement from $a$point to $c$point, the trace left by small coal lumps on the conveyor belt is $2.8m$long']	ABC	phy	力学_机械能及其守恒定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACnAUcDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iikoAWikooAWkyM4zzSMwVSzHAAyTXl1/4mM3j7S76LUImsRM9mtskoLbjgbiM9Dmh6RcuwLWSj3PU6KSigBaKSigBaKSigBaKSigBaKSigBaKKSgBaKSigBaKKSgBaKSigBaKSigBaKSigBaKSloAKKKKACikooAWikooAWiikoAWikpaACiiigApKWkoAKKK5jxzdX0GnadBp97JZTXmow2rTxKCyK+c4BBHagCz4tXXZdJ+z6DawTzSttkM0/l7E7kcHJ7fjXGeI/A181lpX/CP+G9KivIJY5pZ2mCOCpBK7tuWz61v/APCG6/8A9D7rP/fiD/4isrXLDxB4XTT7/wD4S/Ub5ZNQt7d4J4ogrK7gH7qg0B6Hf2LXLWURvIkiuNo3oj7gD9as0lFJKysNu4UtJRTEFFFFABRRRQAUUUUAFFFFABS0lFAC0VT1See20y5ntvJ86OMsnnZ2Z98c4rK8Ja/LrmiQXN8bSK8k3boYXzjDEdDz2oeiT7gtb+R0NFFFABSUtFABSUtFACUUtJQAUUUtABRSUUAFFFFABRS0lABRRRQAUUtFABTWO1S3oM06kPIxQB5LqWq3l9a6nrtzrt5YwR3ItbS3trjy16j5mHc/N+ldH4j3HRPCe+YzN/a1nukLZLHnJzVPX9C8GWN7cfaLS4ury8cSGzgmYlmBzlUzgdKq682t61pNna2Gh3+nJZXEdxDIY1aRSmdvyk4PXvRLWV/X/gfcEdI29D02uP8AiP8A8gXTP+wxZ/8Ao0V51Nq/xNbVzZx69FYq5xCNTtkjeQ+wVSPWtC48LfFnUntRqer6Rd20FzHciH7gZkbcOQmaAPZaK4/7Z8Q/+gT4f/8AAyX/AOIo+2fEP/oE+H//AAMl/wDiaAOxpK4/7Z8Q/wDoE+H/APwMl/8AiaPtnxD/AOgT4f8A/AyX/wCJoA7CiuP+2fEP/oE+H/8AwMl/+Io+2fEP/oE+H/8AwMl/+IoA7CiuP+1/EP8A6BPh/wD8DJf/AIij7Z8Q/wDoE+H/APwMl/8AiaAOworj/tnxD/6BPh//AMDJf/iaPtnxD/6BPh//AMDJf/iKAOworj/tnxD/AOgT4f8A/AyX/wCIo+2fEP8A6BPh/wD8DJf/AIigDsKK4/7Z8Q/+gT4f/wDAyX/4iqOqeIvGuj2xnvbDw7EnQZvJcsfQfJQBveObia28F6q9ujNL5DBdq5Ocda8/0zRdIGueGj4aMUl7E3m6jdxEOSpVsq7DvuI4NaGn+M/H2ozBJ/BVuLRusnmsQw9sjmtuy8S22kMRfeG5tJRz89wtuqxfiRz+lEtY29fxsEdHc7Wiora6gu4Ent5VkicZVlPBFTUAJRRRQAUtJRQAtFFFABSUtJQAUtFFABSUUtABSUUUAFLSUUALRSUUALWH4l1iTTbWG3tAHvruQQ26npuOeT7cVuVx97/pHxS02F+Y4tOllVf9oOuD+poA2dE0GDSYS7ZmvJPmmnflnNa9FFAFW+0611K2e3uoVkRhjkdKwNDu59L1mTw9eyNIoXzLOZurp3X6gY/OuorkfGB+zavoN6nEqXPlAjrtcqDQB11FFLQAlVtQvodNsZbu43+VEMt5aF2/ADk1apKAOP8A+Fm+Hf8AqJf+C6f/AOJo/wCFm+Hf+ol/4Lp//ia7CigDj/8AhZvh301L/wAF0/8A8TXLfED4nWaeE7h9EuNQgvlIMbtZyxgcHuy4r1quc8beGj4t8NTaQJ/I84jMmM4HPagDyTwX8fpJHisfENo0jnCrPACT9SOSfwr3azu4r60iuoN3lSqGXcpU4PseRXG+EvhT4b8KIrxWq3V13mnG7n1AOcV3IAAAA4oAKKKKAKupahBpemz31y22GFCzH2rC0LS5NSddc1dN9zLzBC3IgX0Hv/jUfj879GtbVv8AV3V2kMg9VIP+FdRCoWGNR0CgfpQA8AAYHAprxpIhR1DKRgginUUAeb+ItP1HwdqcOq6FcbLK5lEc1pJzGGY4BA7ZJ611GleKre8m+yX0TWN6Oscp+VvdW6H8Kk8YwrN4Q1QtjMVs8qE9mVSQfzFMtNMs9f8AC2m/b4A7NaxESYw6naOVPUUAb/aiuRxrvhcgKH1XS1695oh+pf8AEit/StasNatzNY3CyBTh1z8yH0I7GgC/RRRQAUUUUAFLSUUAFFLRQAUUlFAC0UUlABRS0lABRRRQAtcj4lQ6Z4m0rX8HykU2k7f3EY7ix/ECuuqG6tYb21ktriNZIZBtZWGQRQBIrK6BlIKkZBFLXI+brHhTMf2eTUtKX7jIczRD0xyW/SoJvip4atGCXZvbaQ9EmtWQn8DQB21chqJGueN7Kyi+a305TNcMOm4/cH5qaZF4o1DxLHs8PWEscD8NeXSmPYPUKfvfga6HR9Ih0i0MUZLyud8srfekY9SaANCiiigApaKSgBaKSigAopaKAEopaSgApaSigDA8Z6dPqPhycWi7ruH97CPVx0/nWhouow6rpFvdwNlXQZB6gjgg1f8AauYvNL1HRbyTUNCjWWKU7riyZtoY/wB5T2P4dqAOopK5OPx/p6ny7yx1K2lHDBrV9o+jYwaRvG4vW8jRtJvrmduAZoWijH/AiMUATeN7pv7IXTLcb7i/cQbB12E4c/QA10FjbCz0+2tR0hiWMfgAP6Vk6Nos8VydU1WQTak4wMfdhX+6v+Pet6gBOoxWBq3haC8m+2WEz6ffr0nh7+xB4/St+igDlbfxLd6VcrZeIrfys/LHeRAmKT+oP1AFdRFLHNGJInV0PRlOQabcW8V1A8E8ayROMMjDIIrl5PD+o6C/n+HJs245bT5W+Qj0Q9E/I0AdZRWHpPie01KX7LMrWd8vDW83ykn/AGc/eHuK3KACiiigAooooAKKKKAClpKWgBKKKKACilooAKSlpKAFqld6Tp9+pF1ZW8uRjLxgn86uUtAHJS+BLWGUzaRf3enTHnKyGRf++WOBTd/jLSOClrq0A6uSUlP0UDFdfSUAcrD480+JxHq9tc6VIeMXSYyfbBNdFbX9pexiS2uI5FboVapZYIp0KSxq6nggiucufAmjPK09kkmnXJ5M1o21v1zQB01Fch/Z3i/Sjmz1ODUbcf8ALO6UmU/8CyB+lL/wmz2DiPXNGvLFjwGjUzqff5AcUAddRWfY67pepKptb6B2P8G8Bx/wHrWhQAUUUUAFFLSUALRSUUALSUUUAMkhilH7yNHH+0oNOVEjGERVHoBinUlABRRS0AFJRRQAUUUUAZmraDYazFtuYsSD7sqHa6/QjmsQXWt+FztvEfU9MXpOg/exj/aHAwPXrXXUEAjBGaAKmnapZ6rbLcWU6Sxnup6VbrnNQ8Kobl7/AEaf+z9QPJZfuSH/AGx3H0xUdp4nlsrhLHxBbG0nPCTrzFJ75HC/QmgDp6KRHWRQ6MGUjIIOQaWgAoopaACkoooAKKKKACiiigBaSlpKAClpKKAFpKKKACiiigBaayq6lWAIPUGlooAwdQ8G6JqOWa0FvIestqfJc/8AAlwazx4d1/SUzo+ttLGvS3u035/7aEk111LQByEfibXNP41zw/LtH/LXT8zj6ngYrS03xhoWqzeRbajCbgcGBmAcH3FbhAIwRkVmah4d0jVEK3dhFID6ZU/mMUAafWiuQbwbeWD79E127tEHS2fDRfjkFv1pX1nxVpOBf6NHqMY6yWDbcD1O8/yoA6+krnbDxto14/kyTNbXA+9HOjLj8SMfrW/FPDOu6GVJF9UYEfpQA+iiigAooooAWikooAKKKWgBKKWigApKKKACobu0t763aC5hSWNuquoIqaoY7y1mlaKK5heRfvIrgkfUUAcy+j6t4dLS6HKbu1zlrK4c5A7lW5P0Fauk+I7HVpHt0LQ3sY/e20o2yJ+HpVx9V06Nykl/aq4OCrTKCP1rk/Gt5pqm2SPTpr29kHmRy2bqrxKON+SQCB+NA7Hb0VxtnrmpaPawSagrX+myAFL6MfOo7bx3P0FdXZ31tqECz2sySxnkFT/P0ptWdmSmmronooopDCiiigAooooAWkpaSgAooooAKKKKACiiigAooooAKKKKAClpKWgApKKKAKmoaVYarF5V/aQ3Mf8AdlUMK5+TwNbW536PfXmnMPuxxSkRf98CurpaAOPD+NNJ/wBYlprEQ7oRAwH05yamg8d2Cv5WpW13p8g4ZriIrH/32cA11VQz2tvdJsuII5V9HQMP1oAZZ6hZ6hF5tndRXEf96Jww/SrFczeeBtJuJfPtvOsrgdHgkYAf8Bzj9Kr/AGDxdpH/AB56hBqsQ/hvB5bAe2wc/jQB11FckvjZrJtmuaReWAHWdlBiP0wSf0resNc0zVIxJZXsUqnuDj+dAF+ijrzS0AJS0lFAC0UlFAEN3A1zaSwpK0TOpAdTgr7ivMjaaUnjLTRpUTaTLHKy3c1wnkvdjaeBnG/kg/h7V6Xf3L2dlLcR2s106LkQwgb39hnFcJqltqPjm905Tol5pKWU/nPNeKoZhjGE2k8/WiPxp/1/XkEvgZf1nwZ4WtrSSWTQ7O5u7mTaJZog7l27k/WtC68F6ZfWNlAxuLU2yhVNpL5Zx1K5HbPak1K2vr7xnpg+zyf2dbxu8kv8JcgbfyIra1LVLLSLNru/uFggXq7AkD8qF8P9dNP8wb97+uv9ImhtooLZbeNAIlXaF7Yrnbzwq9pO174euPsFyTuaHGYZD3yvHPv9a09L8SaRrUEs2nXyXEcQy7KrDb+YqtY+M/D2pah9gs9TjluiSPLCsDkfUUbiStoiCw8VBLhbHW4Dp950BY5jk/3X4BPtXSA5GRXM+IPEHhRJjpms3kCyngI6MWGfQgcVgaprQ+H1rFef2mlzo8n3IJiTIo/2DjJ/E0DPRaKxfDfivSPFdibrS7pZQuA6fxIfQ1X8Ya7c6Jp0IsoRJd3UywRbui7iAW/DOfwoA6KiuZ0HT/EVhqkg1LW01G1ZAQroqPG/HACjp160UrgdPSUtJTAKWikoAKKKWgBKKKKACiiigAooooAKKKWgApKWkoAKKKKACilpKAClpKKAEKqwwwBHuKwb/wAF6FqE32h7FIrrtPFw4+hrfpaAOQbw/wCJNNOdH14zIP8AlnqIMvHoCMYobxVq2krjW9CnWMdbi1Pmhvoi5NddRQBjad4r0XUlHlXqRuekc/7p/wDvlsGtkEEZBBB7isvUPDmkakD9psIC5/5aqgVx9GHNYqeDbvSyX0LXbu2PXy7km4B9vnPFAHXUtceuseLNMfGpaNHeW46S2Tl5G/4BgAfnVu18daFNOtvcXRsro9ILsbH/ACzQB0lFIjpIgZGDKRkEHrS0AFBAYYYAj3oooARUVRhVA+gpBGgOQig+uKdWX4k1UaH4b1DUyM/ZYWk/KgDO1XU7q+vn0rRFiNyo/fXUi7khHp7n2z3qv/wgGnXahtXuLnUpTyTcOGAP+yMcCtLwppo03QYd/wA1xOPNmkPV2Pc/hitygDkB8PtMtCZNInudNm67rZwoY+/HNVrqGS/8vQPEzskpYPa6hbnZuYc8ZzhuB16129YvivTF1PQLheRNAPPhYcEOnzLz6ZAoAk0fw/b6Pvk+0XN5cvw9zdPvkYdgSAKKd4d1L+1dBtLpjmQoFk/3xw365opWA1aKKSmAUUtFACUUtJQAUUUUAFFFLQAUlFFABRS0lABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAC0UlFAC1Tu9Lsb+MpdWkUinrlefzq3S0AclN4Et4HMmiahd6U2c7YGBUn33A00y+MdHX95Da6tCvQQ5WUj3LECuvpKAOWtvHen+YINSt7nTbg/8s5kLf8Ajygj9a6K2vrS8UNbXMUoP9xwadcW0F3CYriFJYz1VxkGuduPAmkMxksPP02Trmyk8oZ9wOtAHUVzXxBt5LrwFrMUKlpDbNtX1PpVT7D4w0rm2vrfU4V6QzJ5bfi5Jz+VL/wmPkg2+u6Nd2hYYZljMsI+r4AoA6LSJ0udItJozlWiXBHsMVcrgPDXiXTNJmOlf2jDPp5bNrOrghAf4HPY5z+YrvlZXUMpBU8gjvQAtVNVnS20i8ncgLHA7HPspNW2YKpZiAB1J7VyOrXR8VTjR9MlzaK4a7uV5XAOdgPcnBB9M0AW/A1s9t4Vt94P713mXP8Addiw/Q0V0EMKW8EcMS7Y41CKPQAYFFAElJRRQAUUUUAFLRRQAUlFFABRRRQAUtFFACUUUUALSUUUAFFFFABRRRQAUUUUAFLRRQAlFFFABRRRQAUUUUAFFFFAC0lFFAC0140lQpIiup6hhkUUUAc9q/gbw/rKEXNginqDESmD64BFUE8BzWUappHiLUNPUDHyhZc/995oooAengea4Yf2x4gv9Sj/ALjhYgf++MV09lY22n2y29rCsUa9Ao/zmiigCxRRRQB//9k=']	['phy_905.jpg']
phy_906	MCQ	As <image_1>shown in the figure, a small ball with a mass of $m$is suspended at point $O $with a light rope with a length of $l$. At the beginning, the small ball is still at point $P$. The first time, the small ball slowly moved from point $P$to point $Q$under the action of horizontal pulling force of $F_1$. At this time, the angle between the light rope and the vertical direction was $\theta$($\theta&lt;90^\circ$), and the tension was $F_{T1}$; the second time, under the action of horizontal constant force of $F_2$, it started to move from point $P $and just reached point $Q$. At point $Q $, the tension in the light rope was $F_{T2}$. Regarding these two processes, the following statements are correct (regardless of air resistance, the gravitational acceleration is $g$)()	['A. In both processes, the tension on the light rope becomes larger', 'B. In the first process, the pulling force $F_1$is gradually increasing, and the maximum value must be greater than $F_2$', 'C. $F_{T1}=\\frac{mg}{\\cos\\theta}$，$F_{T2}=mg$', 'D. In the second process, the power of the resultant force of gravity and the horizontal constant force $F_2$first increases and then decreases']	BC	phy	力学_机械能及其守恒定律	['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phy_907	OPEN	A certain amount of water is stored in a cylindrical vertical well. The sides and bottom of the well are sealed. A thin-walled circular tube with open ends is fixedly inserted in the well. The tube is coaxial with the well, and the lower end of the tube does not touch the bottom of the well. There is a gas-tight piston in the round tube, which can slide up and down along the round tube. At first, the water surface inside and outside the pipe is flush, and the piston just touches the water surface, as shown in the figure<image_1>. Now use a winch to apply an upward force $ F $on the piston through a rope, so that the piston moves slowly upward. It is known that the radius of the tube is $ r=0.100m $, the radius of the well is $ R=2r $, the density of water is $ \rho =1.00 \times 10^3 \, \text{kg/m}^3 $, and the atmospheric pressure is $p_0 =1.00 \times 10^5 \, \text{Pa} $. Find the work done by the pulling force $ F $during the piston rise $ H=9.00m $. (The wells and pipes are long enough above and below the water surface. Regardless of piston mass, regardless of friction, gravitational acceleration $ g=10m/s^2 $.)		1.65 \times 10^4 \, 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/rrrcN83H8Pp6ciqHwu+yDTtcFgGFoNWm8rcCDjC9jzVnxFFaQ6oLjVrl73J/0TTY16/Vf4uc84qP4bvPJb+IHuIFt5W1iYtCpyEOF4zQBd+JX/JNPEX/AF4yfyrf0v8A5BFl/wBcE/8AQRWB8Sv+Sa+Iv+vGT+Vb+l/8giy/64J/6CKALdcl4c/5Hrxh/wBdbX/0VXWVyfhz/kevGH/XS1/9FUAdZXH6P/yVPxL/ANedn/J67GuO0j/kqfib/rzs/wCT0AZ/xS+ybPDYv932X+1U8wqCTjY/Yc1raIdQtruCHemqac4Pk3YYb4uOjev4Cs/4kvPHJ4Ye2t1uJhqy7YmOA/7t+M1Y8OJZyaoZdKuXssZ+16ZKv3fQhf4ee+KAOzpKWkoAKKKKAFpKKWgBKWikoAKWiigBKKKKACilpKACilpKAFoopKAClopKACiiigDjL6WMa9dRaJZCXUnI8+6mJMdvwPXocY6CmfDZHit/EEctz9plXWJg03Hz8LzxxVrXxez3Eq3tyunaNH95kceZcew9B2xjtVD4Wm0Om639ghaG0/tabykZCpVcLxg8igDS+JX/ACTXxF/14yfyrf0v/kE2X/XBP/QRWB8Sv+Sa+Iv+vGT+Vb+l/wDIIsv+uCf+gigC1XJ+HP8AkevGH/XS1/8ARVdZXJ+HP+R68Yf9dbX/ANFUAdZXH6P/AMlS8Tf9edn/ACeuwrj9H/5Kn4m/687P+T0AVPiTHJLL4YjiujaynVk2zgD5DsfnnirenzI2vW8Ot2KxammfIu4c+XPxz06nHqKz/imbQR+HPt8TS2n9qp5qKpYkbH7Dmtbw+L6C4iW1uU1HR3B2SM48yDjofX6YoA6qilpKAClopKAClopKACiiigApaKSgApaKSgApaSigBaSlpKAFpKWigBKWiigApKKWgDi9dSxttbE97LJqN6//AB56eq8L7lc8855xTfhw109v4ge9iSG5OsTGSONtyqcLwD3qbUJHbWrqDRrFY7lsfatRlzti4HTJ64x0GKrfDSMRWmvp9qa7K6vMPPbGZOF544oAv/Er/kmviL/rxk/lW/pf/IJsv+uCf+gisD4lf8k18Rf9eMn8q39L/wCQRZf9cE/9BFAFuuS8Of8AI9eMP+utr/6KrrK5Pw5/yPXjD/rpa/8AoqgDra47SP8AkqXiX/rzs/5PXY1x2j/8lS8Tf9edn/J6AKvxIa6Wbww1lEk1yNWXy45DhWPlvwTU+gCxn1xpbOWXTr1R/penOMBvQhc8c98c4qt8TIxMfDMf2prTdqyDz1xlPkfnmr+mzSrrNvbazZJJdKCbbUIvuyjHIOO+PUYoA62lpKWgBKKKKAFooooASlopKAFopKWgBKKWkoAWikooAWkpaSgBaSlpKACloooASiiloA5DxEtxLPK2rXq2mjJwsMTfvLk+nuPbHaqXwua3bT9cNnbNbW39rTeXEybSgwvGD0qxrJsLbX2l2yanqrj/AEe06pEPUjp+OM8034cG7MPiE3wjW5OsTeYsZyobC9DQBc+JX/JNfEX/AF4yfyrf0v8A5BNl/wBcE/8AQRWB8Sv+SaeIv+vGT+Vb+l/8gmy/64J/6CKALVcn4c/5Hrxh/wBdLX/0VXW1yXhz/kevGH/XS1/9FUAdbXHaP/yVPxN/152f/s9dhXH6P/yVPxN/152f8noAofFJrZU8Nm8tmubb+1V8yJU3FhsfjHetLw6tzFPG2mXq3miuCPKkb95bn0+nTjHFU/iP9rE/hc2IjNz/AGsnliQ4Uny361NohsZ/EAkKyaZqqqftFn0SUf3gOmPfGeKAO0pKKWgBKKKKAFpKWigBKKKWgBKKWkoAWkpaSgAoopaACikpaACkpaSgBaSlpKAFpKKKAOQ1FriXVLuDSrZLIEg3eoy9uBwvvjHbFVfhisSWWvJDcvcoNXmxM/VxheTU/iSP/S2l1q+K6cCBBZQffnPocfe78YqD4ZMrWevFLX7Kh1ebbDjGzheMUAaHxK/5Jr4i/wCvGT+Vb+l/8giy/wCuCf8AoIrA+JX/ACTXxF/14yfyrf0v/kEWX/XBP/QRQBark/Dn/I9eMP8Arpa/+iq6yuT8Of8AI9eMP+ulr/6KoA62uO0j/kqfib/rzs/5PXY1x2j/APJUvE3/AF52f8noApfE6OKQ+GkmuGt4zqqAyr1T5H5rR0yS6i1S2ttVt0u8Am11GPncMdG98fhWd8TmRR4aaW1+1INVXdCBneNj8Yq74aTbdLJo195ultkS2k337dvT27cYoA7CloooASiiigApaKSgBaO1FJQAtFJS0AFJS0lABRS0lABRS0UAFFBpKAClpKKACilpKAON1SWzt/EMpsbZtR1qQDajElLcY6n0+o55pnw5W5SHxALyRXuP7Ym8wr0JwvSptYvpjeXVrp6LZRqQby/kGO3RfU4xzyKpfC0wnTtcNu8skP8Aa02ySUYZhheo9aANP4lf8k18Rf8AXjJ/KvmiL4z+OoYUij1gBEUKo8hOAPwr6X+JX/JNfEX/AF4yfyr4qoA9B/4XZ49/6DI/78J/hVS2+LHjK0v7y9h1ULPeFDO3kp8xUbR244riqSgD0H/hdfj3/oMj/vwn+FepfArxFqfijV/EOpavcefdGOBC+0LwN2OBXzZXv37NX3/EH0h/9moA9H+I6XLz+GFs5FjuP7WTYzdAfLfrU2kyWkviGM31s2nayoIZEJEdwMdQO/fkjNUfimYBH4cNy8scP9qpueIZYDY/QCtTRL64+129rfKt7EwJtb9Oc8dG9DjvxQB11FFJQAUUUUAFLRRQAlFLSUAFLSUUAFFLSUAFFFLQAUUlLQAUlLRQAUlFLQAUlFFAHHeIktodSFxrN01xFkfY9PjXmQ+6/wAXesfwno6+JNP1wXzXlgw1mdjHaXLRFTtTgkYzWvqEkEWv3CaNZfadVkx5s8pJjt+Byc9O3T1rP8FXN1pek+JJjFPqt1HrEwYQbd0pwvIzgUAZ/jzwJYWHgPXLuPU9akeG0dwk2oSOjEDoVJwRTLH4E+B59PtpntrzfJErNi6bqQDV3xf4hvtW+H/iSG58N6npqjT5SJbrZtPHT5WNdrFcyWfhuC4itZbp0tkIhixufgcDJAoA4X/hQngX/n1vf/Apqz7P4BeGBqmom7t7g2RaP7GFujuA2/Pu/GuysvF2p3V3HBJ4O1q3R2AMsvlbV9zh810l5O9rZyzx28lw6LkRR43P7DPFAHnP/Cg/Av8Az63v/gU1Znh74a6JYeOte0qxuNUtLWC2tpFFveuhJbdnJHXpXaW/jDVJ7pIn8F63CrNgyP5W1fc4esWXWLrSPid4he20W+1MvaWmVtduV+/13EUAZvi3wxD4b1Hw1fWE2p6hN/aaqLe7vXlVvkfoDnmuo8PJbTakbnRrlreLn7Xp8i4MZ9l/h5rmPFuuanrd74bgOjajoko1RTHc3fl7Qdj+hNdNpssMviCFNXsvsurxg7JYs+XcDHJHr360AdlSUUtACUUUtACUtFJQAtJS0lABRRS0AFFJS0AFJRRQAUtFJQAtJRRQAUUtFABSUtJQBymtrqF1dTpNMml6TH/rZw43z8fwnt6c1n/C77H/AGbrn9noyWn9rTeUrKVIXC9QeRVjxEtnFrCS6lcyX0p5s9MjX731XPzDOeopnw3a4e38QPdQJbznWJt8KHIQ4XgGgBnxY1m10/wFq1nMlwZbu0kSMxwM6g4/iIGFH1re8K6za61oVvLapcKscaRt58DRnIUdAwGR71R+JX/JNfEX/XjJ/Kt/S/8AkEWX/XBP/QRQA3VdTt9HsHvblZmiQgEQxNI3P+yoJrE0zx9o+rX8Vlbwamsshwpm0+WNfxYrgV1FJQA2SQRRPI2dqgscDJ4rzLQPGGmXHxS1vZFfj7VBaxR7rOQYZdwO7I+Uc9TXp9cfo/8AyVLxN/152f8AJ6AM/wCKf2Ty/Df29Ha0/tVPMCKWONj9AK1tD/tC3uoY4p01PSnz5NxvBeLjox7/AIVn/Eh7lJfDDWkCXE41ZdkTnAY+W/BODVjw7HYzau82m3EtjMo/0vTXXp6ELn5efQUAdlRS0lAC0lLSUAFFFFAC0lFFABRRRQAtJS0lABS0UlAC0lLSUALSUtJQAtJRRQAtJS0lAHH38wOuXUGiWK/b3x9pvpc7IeB698Y6cVj+DPD2nazp+uWurMdSEWszkTGQrvOE5yhFbviBL24nl/tG8Ww0SPrskHmXH49vTGKz/hcbU6drn2CBoLT+1pvKjZNhUYXjaelAFfxp4S0PQvh74juNNsvIlOnyqW8124x/tE12UFnBqHh23tbqPzIJbeMOuSMjA7jmuR+KehLc+Ddd1H+0tSiMdk5+zxXG2FsD+Jcc11+hQfZtAsIfNll2wJ88rbmPGeTQBU0rwfoOiXf2rTrHyZsEbvOduPozEVrXVrDe2sltcJvhkXa65IyPqKi1GxGpWT2xubm23Y/eW0mxx9DVDR/Di6PO0o1bVrzcMbLy6Mij3AxQBHpvgzw/pF6t5YWHk3C9H86Rv0LEVzP/AAj+l6/8T/ESana+esdnaFR5jLj7/wDdIru760F9ZyWxnng3jHmQPsdfoe1cJ4V0Uab8T/ECDUdRufKtLY5urjeW3B/vcc4xx6UAVvGnh+w0ePw3aaS500Sauh84OW2Hy35yxNbunTg67bw61YKuoID9nvYc+XPxz0PXHrWd8UjaCPw59ugae1/tVPMjVNxYbH6Ada1fDwvYp4/sN2t/org7S7jzIDjoT37cYFAHV0tJRQAUUtJQAUtFFACUtFJQAUUUUALRSUtABSUUUAFLSUUALSUtJQAUUUtACUtFFAHE66LODXRLcSS6pftza6eq/LGPUjOCM9zVXwTDqd5pfiOM3KafqDaxNueFBIqHC5ADda0NQeZtXu7fR7NLeViDd6jL0XgdM98Y6cVW+GcaR2mvKty10Bq8w89iCX4XnigCn4y0rWbH4feJJNQ8RSajGdPlAia0jiwcdcrXZQQz3Hhy3itrk2szW8YWYIHKHA5weDXM/FddVPgHWDYyWi2os5PtImVi5XH8GOAfrW/4XXVV0O2/taS0eXy02G2VgNu0Yzu70AU7TQfEcF1HJceL5biJSC0RsIl3D0yORW/dxTTWkscFwbeVlwsoUNsPrg8GotSXUGsnGlvbpdcbTcqSn445rH06Lxkt9GdSudEe0z84t4pQ+PbJxQBHBoHiWO4SSXxjLLGDlozYRDcPTIrCOn6lf/E7xEunaw+mstnabmW3SXdw/wDe6V6E+/y28sgPg7d3TPbNebaDH4nHxS1zzp9KOLe1+0bI5OU+bbt569c5oAr+L9N8RadeeGpJNbGrTHVV8qGa2SFd2x+pX8a6DQlsbjXTNbvLpt+o/wBKsCPlf3A6DnuPSq3xNjWRvDKtdNaA6sg89SAU+R+eavaa8w1i2g1mySedQTa6hD91+OQffHrxQB19FJRQAtJS0lABRRS0AJS0lLQAlLSUUALRSUtACUUUtACUtJRQAtJS0lAC0lFFAC0lFLQByHiKOWS4kk1m9FrpCECOCJsPcHHQ/rxWD4LvNQt9J1qTw9oaTK2sT4tppfs/lrtTHBB/KtjWWtLfxAzokmqaq4HkWxHyQD1I6Yz3680nw5+1eT4gN75f2n+2JvMEZyu7C9KAM7xjqHiK6+H3iRNW0OCxh/s+UiSO8EpJx0wAK7SGS6h8OW8lnbrcXC28eyJn2BjgcZ7VyHxU1u4tvB+uaeui6hNFJZODeRqpiTI6k5zx9K7HQZ2udAsJWgkhLQJmOQfMOMc0AUdH1DxJdXnl6roNvZW+CfNjvRKc+mABWxdyXEdpK9rCs06rlI2faGPpntUWp3smn2L3MVlcXjrjENuAXb6ZIrO0XxDc6tcNFN4f1PTgq58y7RQp9hhjQBHpepeJ7i+WPUvD9taWx6ypfCQj/gO0VzT3es2nxO8QnSNLiv3Nnab1kuRDt4f1BzXeX929lYyXEdrNdMgyIYAC7fTJrg/CesT6j8T9faXR7+yMlpbArcqoKbQ+M4J69vpQBU8bXl/cWvh2TX9ESIDV0zbQy+f5i+W/oK6Lw4k0dwj6TfC60h8hoJW/eW59P5cdqqfEf7V5/hf7EY/tP9rL5fmHC58t+tT6KbK418SPE+m6sgInth9yYeoHTHv14oA7KlpKWgAopKWgApKKKAFpKKWgBKWikoAWkoooAWkoooAKWikoAWkpaKAEpaKSgApaKKAOQ1N7ubUbuDTYUsIsg3eoScE8DhffGOelZHgTULHR9E8Q3TTz3FrHq82JQhkdxhecKMn8q1fEcKfazPrl+VsFYC2souGmbHQ8/N34qv8ADRxJaa+y2ptUOrzEQldpTheMdqAKninxTp/ijwL4gsNLjvpLlrGTaklnJHnjoNyjJrsY7uPS/DsFzciQJDboXCIWYcAdByaXVfEGkaGEOq6lbWYk+558gXd9M1JpmsabrVubjTL6C7hU7S8LhgD6cUAYdn8QtCv7uO2g/tDzJGCrvsJVGT6krgV0d5dxWNnLdTbvLiXc2xSxx7AcmmX+oWel2jXV9cxW9uvDSSttUfjWZY+NPDOpXaWtlrlhcXEhwkccwZmPsKAKFv8AEXQbq5S3j/tDzHbaN1hMBn6layZtbtfDfxG1671GK7EFxa2qxvFbPKGI35+6D6ivQHdY0Z3YKqjJJ6AVh2/jXwzd3i2lvrthLcM21YkmBYn0xQBwXjPxVoviOfw7bwT3tuq6opeV7aSEqNjcgsuK67THu4dStrfU4Uvk5NrqMfPGOje+O/Ss/wCJjBT4aY2v2oDVlzBjO/8AdvxirnhlE+1+bot6W08kieym+/btjoPTtxQB2FLRSUAFLRSUAFFFLQAUUlLQAlFFFABS0UlABRS0lABS0lFAC0lLRQAlFFFAC0UUlAGT/wAI/ZtqU+oTlpp5BhC/IiGOw6e+a8otfhk2q+J9TFl4l1SKwWQtJMhUbpT94D6cV7NewPc2csMchjZ1wHHaqlno0On6J/ZtmzRr5ZQSZ+bJGM59aAPHIfhMuu69PbL4l1K4sLUbXnlVGJc9lyO2DmnJ8KdniCPSNJ8T6n5UY33jqEUR9gBgfe6fhXsukaVb6Pp6WluOBlmbuzHksfcnmk0vR7XSVnNuGMk8nmSyOcs7dMk/TA/CgDyTxH8KoNM0ppJ/FmsTu5CRQuEIdzwoxj1xVS4+D1noeiLqd14g1CK7CAiKCOMMXI+6OOtexXGjR3etQ6hcOXFupEMR6Kx6n+VSXukW2oX1rdXBdjatvjTPy7uzY9RQB5bY/B+5k0mO41Lxdq0MpQtKqlSqj8R6Vk+H/g5Bqs9zdx69fw2iSbbeYRxh3IPLdOnTFe1atp51PTpLQTNEsmNzKecZ5H49KkjsYbfTlsbcGGFY/LTyzgqMY4oA8XtPhYdW8RtDD4o1aaysCGadyufN7BfwJr1qDw5ZW97b3kYZbmJdrODjzBjuOlW9M0y20iyW0tE2xgluepJOST+Jq5QAUUtFACUtJS0AJRRRQAUtJS0AJS0lLQAlLRRQAlFLRQAUUlLQB//Z']	['phy_907.jpg']
phy_908	MCQ	<image_1>As shown in the figure, A is an L-shaped frame, fixed pulley 1 is fixed above A, fixed pulleys 2 and 3 are fixed on the vertical wall, fixed pulley 1 and fixed pulley 2 are on the same horizontal line, and fixed pulley 2 and fixed pulley 3 are on the same vertical line. The object B is connected to the L-shaped frame A by a thin wire through three fixed pulleys, and the connection line is always vertical or horizontal. In the initial state, the system is at rest, and the distance between object B and the upper surface of the bottom plate A is d. It is known that the mass of A is M, the mass of B is m, and the local gravity acceleration is g. All contact surfaces are smooth, and the mass of the pulley is not determined. During the process from the fall of object B to the point where it comes into contact with the upper surface of the base plate A, the following statement is correct ()	['A. The contact surfaces of A and B have elasticity, and the elasticity does positive work on B', 'B. During the fall of object B, the speeds of A and B are always equal.', 'C. The falling time of object B is $\\sqrt{\\frac{(M+5m)d}{2mg}}$', 'D. When object B falls until it comes into contact with A, the velocity of B is $\\sqrt{\\frac{10mgd}{M+5m}}}$']	ACD	phy	力学_机械能及其守恒定律	['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KAR3tFc3/wAJ/wCEv+hh0/8A7/Cj/hP/AAl/0MOn/wDf4UCsdJRXN/8ACf8AhL/oYdP/AO/wo/4T/wAJf9DDp/8A3+FAWOkorm/+E/8ACX/Qw6f/AN/hR/wn/hL/AKGHT/8Av8KAsdJWbretWWh2IudQl8q3ZhGZCOFJ6Z9BWb/wn/hL/oYdP/7/AArL8R+J/Buv+Hr7S5fEGnFbiIqCZhw3Y/nQOw34aa9p97oUGmWs3nXECNJNsGRGC5wCfU/0ruq8f+FGo+F/CnhdlvNc09L66lMkuZRkAcKPy5/Gu8/4T/wl/wBDDp//AH+FIGtTpKKq6fqVlq1ot3p91Fc27EgSRNuBI61apiCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArN1/Vl0PQ7rUGQu0SfJGOruThV/EkVpVynj/AANI05nBMS6pbGT2G/v7ZxQA3RtOj0CAalqSSX2v343TOib39dif3UXOK2NF1+01wXKwCWOe1k8ueCZdrxtjIyPpV+5E32d2tVjM+3EZk+7+OO1eYaUNUu5PFGg2zpZ+KJZFmurp2LRyRngFMYIwOBSHuXvFGnD4iak+mafsht7DcJtSA+YyFSPKQjqOfm/Kpvhhcy3UniFp7VLWeO7iglgQYVHjhSNgo9Mqce1WdL0vxno+nQ2NmugRwxDAGyXJ9SeeSaxvC8fi86t4lmsTo2W1HbOXWTaZFjXdtwenPPvmgZ6jXK/Eo4+HWtn/AKYf+zCm48ff3tB/74l/xrnvHQ8Zf8ITqv8AaDaP9kEOZfJWTfjI6ZOM0CR0kUVn4o0+C8sZntNVtFCh8YkhbHKOvdT6flW9pr3r2MZ1CKOK6HDiNsqfcfWsEWkGs2lvregXSRXyIE34wsmOscq9fz5Fb2m3NxdWMct1aNaz9HiZgcEehHUelMC3RVDUtb0zR1Q6jfQWokOE81sbvpWf/wAJx4X/AOg7Zf8Af0UCN+uT8Tf8jf4U/wCvib/0Crv/AAnHhf8A6Dtl/wB/RXNeIPFegXHijw3PDq9o8UE0rSsJBhAUwM0ho9EqN4Inbc8SMfUqDWJ/wnHhf/oO2X/f0Uf8Jx4X/wCg7Zf9/RTEbX2a3/54Rf8AfAo+zW//ADwi/wC+BWL/AMJx4X/6Dtl/39FH/CceF/8AoO2X/f0UAbX2a3/54Rf98Cj7Nb/88Iv++BWL/wAJx4X/AOg7Zf8Af0Uf8Jx4X/6Dtl/39FAG19mt/wDnhF/3wKPs1v8A88Iv++BWL/wnHhf/AKDtl/39FH/CceF/+g7Zf9/RQBtfZrf/AJ4Rf98Cj7Nb/wDPCL/vgVi/8Jx4X/6Dtl/39FH/AAnHhf8A6Dtl/wB/RQBtfZrf/nhF/wB8Cj7Nb/8APCL/AL4FYv8AwnHhf/oO2X/f0Uf8Jx4X/wCg7Zf9/RQBm/DYAeHbsAYA1K5/9DNdjXjPhSTw1Np93LeeKrqyle+nYRRXnlrtLnBAx3re/wCKP/6Hi/8A/BiP8KQ2j0iivN/+KP8A+h4v/wDwYj/Cj/ij/wDoeL//AMGI/wAKAsekUV5v/wAUf/0PF/8A+DEf4Uf8Uf8A9Dxf/wDgxH+FAWPSKK83/wCKP/6Hi/8A/BiP8KP+KP8A+h4v/wDwYj/CgLHpFFeb/wDFH/8AQ8X/AP4MR/hR/wAUf/0PF/8A+DEf4UBY9Iorzf8A4o//AKHi/wD/AAYj/Cj/AIo//oeL/wD8GI/woCx6RRXm/wDxR/8A0PF//wCDEf4Uf8Uf/wBDxf8A/gxH+FAWPSKK83/4o/8A6Hi//wDBiP8ACj/ij/8AoeL/AP8ABiP8KAsekUV5v/xR/wD0PF//AODEf4Uf8Uf/ANDxf/8AgxH+FAWPSKK83/4o/wD6Hi//APBiP8KP+KP/AOh4v/8AwYj/AAoCx6RRXm//ABR//Q8X/wD4MR/hR/xR/wD0PF//AODEf4UBY9IqhrWlQ63o13ps5Kx3EZXcvVT1DD6HB/CuG/4o/wD6Hi//APBiP8KP+KP/AOh4v/8AwYj/AAoCxe0vxDrQu4tDvZtPtNTt02SC6R/9JA6SxEEAggcjqDW/ovh2LS7++1Sac3WpXxBmn27VCjoqrzhR9T9a4a/0nwBqqIl94turgRtuTzL8EqfUHbkVNDa+CIYxEPGl+0Y/gbUyR/LNAHWeIfFEemgWGmot7rU4229qhzg/3nx91R1JPpVvw1ov9gaHDZPMZ7glpbmc9ZZnO52/Ek/hisTSNY8B6GjDT9S0+Jn+/IZdzv8AVjya0/8AhOPC/wD0HbL/AL+igDfrlviOcfDzWyen2f8AqKtf8Jx4X/6Dtl/39Fc5488W+Hr7wNq1tbavaSzSQbUjWQEscimCNqSwciPX/DUsTTSorTQBv3V2uO/o47N+Brd02+XUbGO5EMsJbho5V2shHUEVgtYXGi41TQlE1pKBJcWKn5XyPvx+h9uhrf0+/g1Oyju7ZiY39Rgg9wR2NAEk9pbXQAuIIpQvTegbH51z2reELaS5GpaTBa2+oIMFXiBinX+64/qORXT0UCOSt7XQfE1rcaXfaTFaX8QBntHQLJGezow+8uejD9DxUUCQeH50stds7aW0dglvqXkqBnssvHyt6N0P1rrHtLeS6iungja4iBEcpUblB6gHtmnTwRXMDwTxJLFINro65DD0IoGcndeGE0a5k1HRdPt7m3kO+405kX5vVoifut7Hg+3WnyaLoHiuwivdOSK3uoGIjlWEK8LjqjoR+amurjjSKNY40VEUYVVGAB6VHHa28NxNPFBGk02PNdVAL46ZPfGaAucxY/2dPM2ia9pNnBfupC/uh5V0vcxn+a9RVf8AsqPwkf3ljHfaF/e8kPNZj34y8Y/Me46dfcWlvdiMXEEcvluJE3qDtYdCPQ1N1GDQFzkrzwzZXLprfh+Oy+0OgO0oGhuU7A46H0YURWPh/wAV2M9hc6bHa3sBHnW5QJNbv2YEdvRhwa6e2tbezi8q2gjhjyW2RqFGSck4FBtbc3a3ZgjNyqGMS7RuCkglc9cZA4oC5ydsINEuI9P8QWVo8Ltst9SEKhJPRZOMK/v0PseKW48NJoFxJe6Tp0N3ZOd8+nmNSw9WiJ7/AOz0PbFdbcW8N1A8FxEksLjDI6hlYe4NORFjjWNFCooAVR0AFAXOUm0LQvFFlBqek+RDdRE+TcRxDKN3R0I59Cp/SizXS79pNE1zR7O21BkIMfljy7he7Rt39x1H6108Vpb2800sMEcck7BpXRQDIQMAk9zjiia1t7l4nngjkaF98ZdQSjeo9DQBx/2CHwidt5ZRXmh9rnyQ0loP+mnGWT/a6jvxzVm+8L2pnGtaBDZGeRAzwsoMN0uOOR0OOjD9RXW9Rg1Da2lvY2629pBHBAmdscahVXJycAe5NAXOYTT/AA94tsJLZ7BLS8t2HmRbAk1tJ2P+B6GmWht9Luo9M8Q2FmDK2y11BYVEVweyt/ck9ujdvSuq+yW/2v7X5Ef2jbs83aN230z1xS3Vrb3ts9tdQxzQSDDxyKGVh7g0Bc5Gbw6nhuZ7rTdNivNNdi01j5YLxerRev8Au/lU8+gaN4itbfV9FNtDdID5NwkQKn1SRO4z1BwR7GusqGC0trZ5nggjiaZ98pRQN7dMn1NAXOb086VqLy6Pq2j2tpqYQ+ZbmMFJk6F4mx8y/qO4qnFY2vhOdLa/tIJtGdgsF28QLW5PRJDj7vYN+BrsJrS3uJIZJoI5HhbfEzqCUbpkHsafNDHcQvDNGskTqVdHGQwPUEd6AucvqvheKG8/tnRbK1a6CgT2joBHdoO3T5XHZvwPFKNK8PeLtJEkFqkE0T9REEmtpR1DDsR6dCPUGuojjSKNY41CIowqqMAD0pkdrBFcSzxwxpNNjzHVQC+OmT3xk0Bc5azNrZXcekeINOs0nlOy3u1hURXXt/sv/snr2zUEnh9PC0jTWGmx32jElpLMRBpbf1aL+8vfZ+XpXX3Nrb3sBguoI54iQSkihgSDkcH3qagLnJXPh7SNdhg1nQjaJchf3Uyxho5B/cdfT9RS2sGia/FcaLqujW9rfqmZrRkGWX/npGw+8uehHQ9cGumgtbe1Egt4I4hI5kfYoG5j1Jx3oltLae4guJYI3mtyTDIygtGSMHB7ZBxQByKW8PhiRbfWLWC50snbFqJhUtF6LNx0/wBv8/WpbzwtHYXT6roNlazeb809i6rsnH95D/C36Hv611skaSxtHIiujDDKwyCPQimwQRW0CQQRJFEgwqIMBR6AUBc5b+yvDvi/ThJbQJbXVtJjIiCTWso6qykcH2PBHqDSWRs4rldG1/S7KO6kBWGdYQIbsf7Po2Oq/lmuoS1t47qS6SCNbiVVWSUKAzhc4BPfGT+dFzaW97EIrqCOaMMGCyKGAIOQee4oA5BtETwo5kh05L/RM5eEQh5rUeq8ZdP9nqO2elWLvw3pmrJBrmgfYluSmY5FQNDcJ/dcDt79RXW1Db2lvaK620EcKu5kYRqFDMepOO59aAucxb22heJLafSdR0mG1v4wPPtWQB19HRh1X0YVDFHD4clS01yztptPYhYNU8lRtz0Wbj5T2D9D3wevWva28lzHcvBG08QISQqCyg9QD2p8sUc8TxTRrJG4KsjjIYHsRQFzkrzwumk3cmpaLYW88Uh33Gnsi4k9WjJ+63t0NPfRtA8W6fHd2EcdtdW7ny5UiCyW8g6q6kfmp611UMMdvBHDCixxRqFRFGAoHAAFMjtLeK5luI4I0nmAEkiqAz46ZPfFAXOXsjYPcf2Jr+k2UF9IpEbrEPJu17lCeh9VPI9xzUB0mLwmxY6fHe6H1P7kPLaD16ZZP1HuK6+4tLe7VFuII5QjB1DqDtYdCM96moC5yV74YsL149c8PrZLdMgI+QNBdJ2DAfow5H6UQWmgeKLSfTrvS47S+hwZrZkCyRN2ZSOo9GHH8q6e2tLeyh8m1gjhi3FtkahRknJOB6kk0NaW73SX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phy_909	OPEN	"""Water skiing"" is a water event suitable for men and women, old and young to experience. After placing a small flat stone piece horizontally in your hand, it will fly out with force. After meeting the water surface, the stone piece will not directly sink into the water. Instead, it will rub the water surface on the surface of the water and slide for a short distance, then bounce and fly again. After jumping several times, it sinks into the water. This is called ""water skiing"". As shown in the figure<image_1>, a person now flies out a small stone piece with a mass of 20g at a horizontal initial speed of 8m/s from the shore at a height of 1.8m from the water surface. The small stone piece bounces on the water surface several times and then sinks to the bottom of the water. The horizontal resistance encountered when sliding on the water surface is 0.4N. Suppose that the small stone piece jumps up for 0.04s every time it touches the water surface for the same time. The ratio of the speed at which the small stone piece jumps up in the vertical direction after sliding on the water surface to the speed at which it slides along the water surface at this time is constant k,$ k=0.75 $; After the speed of the small stone piece on the water surface is reduced to zero, it sinks into the water bottom with a depth of 1m in the vertical direction at an acceleration of 0.5m/s$^2$. Regardless of air resistance. Request: The total time from the time the small stone piece is thrown out to the bottom of the water."		8.4s	phy	力学_机械能及其守恒定律	['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']	['phy_909.jpg']
phy_910	OPEN	<image_1>As shown in the figure, there is a game track in the vertical plane, which consists of a tilted straight track AB, a conveyor belt and an arc track FGH. The CD part of the drive belt is horizontal, its length is L=1.2m, the radius of the large pulley is r=0.4m, and the bottom E point is on the same horizontal line as the F point of the rough arc track FGH. The radius of the arc track is R=0.5m, the G point is the lowest point of the arc track, and the center angle corresponding to the arc FG is $\alpha = 53\circ $. GH is a $\frac{1}{4}$arc. Now that the conveyor belt does not rotate, a classmate gently places a mass of m=0.5kg and can be regarded as a particle on point A. The mass slides down the straight track AB from rest, and slides onto the conveyor belt CD through point C. The two points B and C are connected smoothly, and there is no energy loss when the object passes by. The mass moves from point C to point D and then flies out horizontally. It can just enter the arc track from point F without collision and fly out from point H. When passing through point H, The friction force between the circular track and the object block is $f = 2N$. The dynamic friction coefficient between the object block and the conveyor belt and the circular track FGH is $\mu = 0.5$. The rest is smooth,$\sin53^\circ = 0.8$,$\cos53^\circ = 0.6$, and gravity acceleration $g = 10m/s^2$. Find: If the straight track AB is infinitely long, the conveyor belt rotates clockwise at a constant speed of v=3m/s, find the relationship between the height h at which the object slides on the straight track AB and the speed $v_D$at which the object flies out from point D.		$v_D=3m/s$when $0 \leq h \leq 1.05m$;$v_D=\sqrt{20h - 12} \, m/s$when 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phy_911	OPEN	<image_1>The figure below shows a schematic diagram of a certain game device. AB and CD are both quarter-arcs, E is the highest point of the arc DEG, and the junction of each arc track and the straight track are tangent. The angle between GH and the horizontal is θ=37°, and there is a spring at the bottom H. A, O, O, D, O, and H are on the same horizontal straight line. A small steel ball with a mass of 0.01kg (its diameter is slightly smaller than the inner diameter of the round tube and can be regarded as a particle) is released statically from point O at a height of h from point A, and enters the orbit along the tangent line from point A. There is a device at point B. The small steel ball can pass through without energy loss to the right, but cannot pass through to the left and the small steel ball is attracted to point B. If the small steel ball can move to point H, it will be bounced back at a constant speed. The radius of each circular track is R=0.6m, the length of BC is L= 2m, the dynamic friction coefficients of BC and GH of water straight tracks μ=0.5, the rest of the tracks are smooth, and the small steel balls pass through each circular track and the straight track. There is no energy loss. Secondly, during the game, the small steel ball starts from point O and can pass through the highest point E of the arc for the first time. (sin37 °=0.6, cos37 °=0.8, g=10m/s²) Calculate: If the release height h of the small steel ball is changed, calculate the total distance s and h of the small steel ball moving on the inclined track.		"① If the ball release height is $ h < 1.6m $,$ s = 0 $  
② If the ball release height is $1.6m\leq h < 2.24m $,$ s = 2.5 \, (\text{h} - 1) $  
③ If the ball release height is $2.24m\leq h $,$ s = 1.6m 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phy_912	MCQ	"An experimental team used <image_1>the device shown in Figure 1 to explore the ""relationship between work and speed changes."" During the experiment, when the car hit the brake device, the hook code had not yet reached the ground. Some of the steps of the experiment are as follows:
(1) Fix a long wooden board with a fixed pulley at one end on the table, and fix a dot timer at the other end of the long wooden board;  
(2) Pass the paper tape through the limit hole of the dotting timer, connect it to the rear end of the trolley, and use a thin wire to cross the fixed pulley to connect the trolley and the hook code;  
(3) Pull the cart to a position close to the dotting timer, turn on the power, and release the cart from a standstill to get a paper tape;  
(4) Turn off the power supply and study the relationship between the work done by external forces on the trolley and the change in speed by analyzing the relationship between the trolley's displacement and speed. Figure 2 <image_2>shows a paper tape obtained in the experiment. Point O is the starting point on the paper tape, and A, B and C are the three counting points on the paper tape. There are 4 points between adjacent two counting points that are not drawn. The distances from A, B and C to O are measured with a scale. As shown in Figure 2. It is known that the frequency of the alternating power supply used is 50Hz. Question: In this experiment, what are the following practices that can effectively reduce the experimental error?"	['A. Raise the right end of the long wooden board appropriately to balance friction', 'B. In the experiment, the quality of the hook code was controlled to make it much smaller than the total mass of the car', 'C. Adjust the height of the pulley so that the thin line of the trolley is parallel to the long wooden board', 'D. Let the car move before turning on the dot timer.']	C	phy	力学_机械能及其守恒定律	['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']	['phy_912_1.jpg', 'phy_912_2.jpg']
phy_913	MCQ	As <image_1>shown in the figure, there is a uniform magnetic field with a large enough range on one side of the straight line boundary on the smooth horizontal desktop. The magnetic induction intensity is\(B\), and the direction is perpendicular to the desktop and downward. A unit square wire frame\(abcd\) with side length\(l\) and resistance\(R\) is placed flat on the desktop, and its diagonal\(ac\) is parallel to the magnetic field boundary. Now an external force in the direction of\(db\) is used to pull the lead frame into the magnetic field area at a constant speed\(v\). During the entry, the following statement is correct ()	['A. The direction of the induced current is\\(a \\to b \\to c \\to d \\to a\\)', 'B. The ampere force applied to the lead frame first increases uniformly and then decreases uniformly', 'C. The amount of charge passing through the cross-section of the conductor of the leadframe is\\(\\frac{Bl^2}{2R}\\)', 'D. The heat generated in the leadframe is less than\\(\\frac{1}{2} \\cdot \\frac{B^2(\\sqrt{2}l)^2v}{R} \\cdot (\\sqrt{2}l)\\)']	AD	phy	电磁学_电磁感应	['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phy_914	MCQ	As <image_1>shown in the figure, two adjacent bounded uniform magnetic fields with widths of $L$have opposite magnetic fields, and the magnetic induction strengths are both $B$. The $ab$side of a single-turn square wire frame $abcd$with a side length of $L$and a resistance of $R$is collinear with the left boundary of the magnetic field. Under the action of external force, the wire frame crosses the bounded magnetic field at a constant speed of $v$. Taking the edge of $ab$just entering the magnetic field as the zero point of timing, it is stipulated that the counterclockwise direction of the induced current $i$in the wire frame is the positive direction, the direction of force to the right is the positive direction, the ampere force on the edge of $ab$is $F$, and the external force is $F'$. The following images are correct ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	B	phy	电磁学_电磁感应	['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'phy_914_2.jpg', 'phy_914_3.jpg', 'phy_914_4.jpg', 'phy_914_5.jpg']
phy_915	MCQ	As <image_1>shown in the figure, the regular hexagonal wire frame $abcdef$has a side length of $2a$and is placed on the insulating plane. There is a uniform magnetic field area with a width of $4a$on the right side of the wire frame.$pq$and $mn$are the magnetic field boundary lines,$pq \parallel mn \parallel ce$, and the wire frame moves to the right at a constant speed perpendicular to $pq$. Let the induced current in the wire frame be $I$, and the ampere force of the magnetic field on the wire frame be $F$. The counterclockwise direction is the positive direction of the induced current in the wire frame, and the horizontal direction to the left is the positive direction of the ampere force. Timing starts when the wireframe $d$point enters the magnetic field. The following image may be correct ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. 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']	['phy_915_1.jpg', 'phy_915_2.jpg', 'phy_915_3.jpg', 'phy_915_4.jpg', 'phy_915_5.jpg']
phy_916	MCQ	As <image_1>shown in the figure, a square wire frame enters a bounded uniform magnetic field at a certain initial speed on a smooth horizontal plane, and the side length of the wire frame is half the width of the magnetic field. During the process of the wire frame passing through the magnetic field, the graph of the change between the induced current $i$and the change between the velocity $v$and the displacement $x$may be correct ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. <image_5>']	D	phy	电磁学_电磁感应	['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phy_917	OPEN	As shown in the figure<image_1>, tilt angle\(\theta=37^{\circ}\), a small object B is placed on the fixed slope, and the small object B is connected to the object A through a light rope across the fixed pulley. The height of A from the ground\(h=2\,\text{m}\), the dynamic friction coefficient between B and the bevel is known\(\mu=0.55\), the masses of blocks A and B are\(m_A=2\,\text{kg}\),\(m_B=1\,\text{kg}\), now release A from rest. After each landing, the speed of A will be reduced to 0 immediately, but it will not adhere to the ground.\(g=10\,\text{m/s}^2\),\(\sin37^{\circ}=0.6\), find: The maximum height that A can rise after leaving the ground for the first time.		\frac{4}{135}\,\text{m}	phy	力学_动量及其守恒定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADZAUgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iimTCUwuIWVZSPlZxkA+pGRmgB9FYaKXWSys53ESEm8vi2WLdwp/vep6KOB7NMkU1ssz5g0eADy0GQ1we3HXbnGB1Y+3UA3qKxJJpFljvLyNjcMStnYqRkHB5PON2Op6KPzIpuIJ2jVln1WcAuxBMVun+HXA6sc9B0ANuisNFLLJZWc7iNSTeXzNli2OQp/vfoo4HoG+ZDPbLKxMGjQAeWozuuPTjrtzjA6sfbqAb1FYkk0iyx3l5GzXDkrZ2KkZBweTzjdjqeij8SRTcQTtGjLPqs4BkYg+Vbp/h1wOrHPQDgA26KxEVmWSxs53CKSby9ZssWwMgH+9+ijgdgGb4Z7VZSTBosABQLnNz6cdSmcYxyx9vvAG9RWJJNIskd5eRs07ErZ2Kkbs88nnBbHU9FH4kgNxBOY1ZLjVp1BdsHyrZP8OuB1Y56AfKAbdFYiKzK9jaTuEUk3l6zZYtgZCn+9+ijgegj3w3FqspJg0WAAoF5N16cdSmcYxy59vvAG/RWLJNIskd7eRuZmJWzsUPzZ55POC2OSeij8SUBuILgorJcatOoLnnyraP8Aw4OB1cg9APlANuisREZlextJ5Nikm8vXPzFsDIU/3vpwo4A6AR+ZBcWiy7jDokABQLybr09SUJIxjlz7feAN+isV5pFkjvb2NzMxK2dih5zzyecFiOSTwo/ElA1xDcFEMdxq86guefKto8/njg4HVyD0A+UA26KxI0cq9jaTybVJN5eufmLYGQp6bj7cL0A7CMvBcWiyE+TokIBUDk3Xp6koSRjHLn2+8Ab9FYrzSLIl7eRuZWJWzskPOeeTzgsR1J4UfiSga4huCimO41eZQW6+XbR5/MDg4HVyOwHygG3RWJGjlXsbSeTapJvL5z8xbAyAeBu9xwvQDsGNJBcWYkJ8nRIQNoHJuvT1JQ5GO7n2+8Ab1FYrzSLIl7eRv5rErZ2SHnPPJ7biOueFH4kpunguCimO41edQW5Pl28efzA4PuxHYD5QDborDjRyr2NpO5Ckm8vn+8WwMhTwN304UcY7BrSQXFoHY+TosIGO5ufT1JQ8Y7sfb7wBvUVivNKskd7eRv5rErZ2SHnPPLdtxHXPCj8SUDTwXBUMlxq86gkZPl28efTsOD7sR2A+UA26Kw40ciSxtJ3OGJvb5vvFsDIXHG7Hpwo/KmtJBcWgdm8jRYQMZyTc/wBSuce7H2+8Ab1FYjTSiSO+vI38wkrZ2KHnPPLf7WOvZR+JIGnguCoZLjV51BYZPl26Z9M8L192I7AcAG3RWHGjkSWNnO5wxN7fN94tgZC8Y3Y9OFH5UgeG4t1beLfRocYJJBuD9c52Zx7sfb7wBu0UUUAFU9VeZNLuDBb3FxIVwI7d1SRs8fKWIAP41cooA4iTUNalaK2PgzUk06FRiBLi2/eMD/F+9+6PTv39C4avr8l211ceDNScxEi2hFza7U/2j+8+8fXsDgdye1ooA4ePVfEkUUtx/wAIjqD6lMoUyNPbFIx6KPN6Dr2JPU+gdR16O3FtbeEtWQSsWubg3Nr5r/Q+Z1PTPYDjtjuKKAOIk1DWpWitj4L1KPTYlBECXNtmRgejfvfuj0/i78cGvB4p1O9128gfwlqUt3p6oy2wntwsSuDsYkycsdrcjoOPUnW8R+OrDQro6fBbz6jqgUMbS2x8gPQux4QH359Aa4HTPHWsW3jXX75vDqSmaC0EkEd4N6BRJjBKgMTk8cdKAOvj1XxLHFLcf8IjqD6lMApkee2KRD0Ueb0HXsWPUjsHUdeit1trbwlq0YlYtc3BubUyv9D5nU9M9gMDtjb8O+LtK8SrIlnK8V3EAZ7OcbJos+q+nuMj3rdoA4iTUNalMVr/AMIXqUemxAHyUubYGRs5w3737o9P4s88cF41bXpbxrq58G6lIYifs0IuLXan+0f3n3j69gcDuT2lFAHDx6t4ljiluB4R1BtSmUL5jz2xSIeijzRkDr2LHqR2DqOvRWwtrbwlq6CVi1zcG5tTK+fQ+Z1PT2AwMcY7iigDiJNQ1qVorX/hC9Sj02IA+SlzbAytnOG/e/dHp/FnnjgvGra9LeNdXXg3UpPKJ+zQi4ttqf7R/ecseeewOB3J7SigDh01bxLHFLc/8IhqD6lKoXzHntjHEPRR5oJA69ix6kcYDqOvRWwtrbwlq6ea5a5uDdWxlfPXB8zqenooGABgY7iigDiJNQ1qUxWv/CFalFpsSg+THc2wMrZzhv3n3Rjp/FnnjILxq2vS3rXV14N1KTyifs0IuLban+0f3vLnnnsDgdye0ooA4dNW8SxxS3I8Iag+pSqF8x57YpEPRR5oJA644LHqR2P7R16K2FtbeE9XTzXLXNwbq2Mr564PmcE9PRQMADAx3FFAHESahrUpitB4K1KLTYlB8mO5tgZWz0b95wox0/izzxkF41bXpb03V14N1JxET9mhFxbbU/2j+95Y889gcDuT2lFAHDpq3iWOKW5/4Q/UJNSlUL5j3FtsiHoo8zJA644LHqR2P7R16K2FtbeE9XTzXLXNw11bGV89cHzeD2HZQMADAx3FFAHESahrMpitR4K1KLTYlB8lLi2/enPRv3n3R6fxZ544Lxq2vS3purrwdqTiIn7NCtxbbU/2j+95brz2BwO5PaUUAcOmreJI45bn/hD9Qk1KVdod7i22RD0UeZnA6+rEckdg6jr8VsLe28J6uhlctc3DXNsZWz1wfN4PYdlHAHTHcUUAcRJqGsyeVaDwXqUWmxKP3KXFrmU56N+8+7/PPPGcuXVtelvTc3Xg3UmERItoVuLban+0f3vLe/YHA7k9rRQBw6at4kjjluf+EP1CTUpVC73uLbZEPRR5mcDrj+IjkjsHUdfithb23hPVlMzlrm5a5tjK2euP3vB7Dso6DpXcUUAcRJqGsyeVaDwXqUenRqMwpcW2ZTno37z7vc+ueeM5cNW16W9NzdeDdSZYifs0K3NttT/aP73lv5A8dye1ooA4dNW8SRxy3J8HahLqUq7Q73FtsiGeijzc4HX/AGiOSOwdR1+K2FvbeE9WUzOWublrm2MreuP3uAew7AdB0ruKKAOIk1DWZPKtB4L1KPTo1GYVuLbMpz0b959319c88dXpquuzX4uLrwdqflxHFvCtzbbU/wBo/veW9PQdO5rtKKAEUkqCQVJHIPailooAKKKKACiiigArH8Va1/wj3hbUtWCh3toGdFPRn6KPxYgVsVxvxX3f8Kx1vau5vLQqPU+YuKAOT8PaT5FtmVjLdTMZbiZjlpJDyxJ+v5CjTbEHxr4iXH3bezP5iWp/D2qRXljDcoeHXkd1buD7g5FbpltkeWdIo1nmVVkkCgM4XO0E98ZOPrQBwfjDTLe3a21kyXFvLYSq7T2rlJREThwCPYkj3H1r0c6zrPhbI8QRtqOlrjbqlrF+8Qf9Nol/9CTI9QK4bxQh1eOLQ4G/0nU5VtkA5IBPzt9FXJP0r2cABduOMYxQBFaXltf2sdzaTxTwSDKSRMGVh7EVNXLXnhOWyupdR8L3S6ZeSNvmt2Xda3B774x91j/fXB9c1NpniyOW9XS9ZtW0nVS21IZmzHce8UnRx7cMO4FAHR0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXJfE3/knmq/SP8A9GpXW1yXxN/5J5qv0j/9GpQBS13wBJJqE+qeHbyKyuZstNazITbzP/e45Rj3Izn0JrEXw547lfyDY6RAB1na9d0P0UR5/PFeq0UAcr4Y8FQaDdSajd3Tahqsi7DcOm1Yl/uxrk7R68knua6qiigAqnqelWGs2TWeo2sVzbtzskXOD2I9D7jmrlFAHIfZ/EHhQ5tDNr2jhiTbyMDeW6+iMf8AWgejHd7mt7Rtd07X7Q3GnXKyqrFJEIKvEw6q6nlT7EVo1g6x4VtNSvE1K1ml07VoxhL21wGI/uup+WRfZgcdsUAb1FclD4nvdDkjtPFsEcAY7Y9Vtwfssh7B88xN/vfKex7V1aOsiK6MGRhlWU5BHrQA6iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKK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phy_918	OPEN	As <image_1>shown in the figure, in the\(xOy\) plane rectangular coordinate system, there is a circular uniform magnetic field area perpendicular to the paper surface in the second quadrant.\(O_1\) is the center of the circle, the radius is\(R\), and the magnetic field boundary is tangent to the two coordinate axes; Uniform electric fields and uniform magnetic fields with widths of\(d\) are alternately distributed in the\(y \leq0\) region, and their boundaries are parallel to the x-axis. The electric field strength of the uniform strong electric field is\(E_0\), and the direction is along the negative direction of the y-axis. The magnetic induction strength of the uniform magnetic field is\(B_0\), and the direction is perpendicular to the paper and inward. A charged particle with mass\(m\) and electrical charge\(+q\) enters the magnetic field at an initial velocity\(v_0\) from a point\(P\) on the circular boundary,\(v_0\) is parallel to the x axis, and\(v_0\) and\(PO_1\) are included at an angle\(\alpha = 60^\circ\). The moment the particle exits the circular magnetic field, a uniform electric field in the positive direction along the y-axis is applied in the\(y &gt; 0\) region (not shown in the figure). It is known that the magnetic induction intensity of a circular magnetic field is\(\frac{mv_0}{qR}\), and the electric field intensity of a uniform strong electric field in the\(y &gt; 0\) region is\(\frac{mv_0^2}{qR}\), regardless of particle gravity. Calculate the sine value of the angle between the velocity direction and the vertical direction when the particle passes through the second electric field in the\(y \leq0\) region;		\(\frac{B_0}{2} \sqrt{\frac{qd}{mE_0}}\)	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAFuAVIDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKMg0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFRXFxDaW7zzyLHEgyzMeBQlfRCbSV2S0hIAyTgDuazTdXWpWIk03EBZ8b7mM/d/vKO/4099IhurOK31FmvNhLFn+XcfcDir5UviZHO38Cv8Al/XyJLrVbGyhSa4uo0jc4Vs53H2xTJdYs4rSK6LuYZfuMsbHP4Yq3Dbw28KQwxJHGn3VUYAqSi8OwWqd193/AASjJrNhDaxXM1wIopThGkBXJ/GrUM8NzEssMiSRt91lOQaeyqwIYAg9iKp3elWd7CkUsOFjO5PLJQqfUY6Ue4w/eLs/w/zLtFZtxBqFrawrpsiSmLO5LkkmQf73Y1MmowrLBb3LLBdSpuELNn6gHoaOTS61D2ivaWhcoooqDQhvLqKxsp7udgsUKGRyewAya8j+EfjubX/E+vWd7KS93Kby3UnoBhSo+ihfyr1q+sbbUrKWzu4xLbyjbIh6MPQ+1cT4Q0PS21/X7j7FCk1jqrC2dF2mIeUoKjHbBIx0pDWxtanquoaf420SyM0R07UVnQxmPDK6R7wd2fQHtV3w9PqFzZ3Et/LFKrXUn2Z402boc/LkevXnuMGse7trTxrqGlXlrLcJa6dNK7ShCnmEq0ZjGRnoTkjt9eOtRFjRURQqqMAAcAUxDqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiqt/fRadaNcS7iAQqqvLOx6Ae9NJt2QpSUVdj5rmOJ1h3p58gPlRs2C5AzVawtrwxO+pypLJKQfJVf3ceOgHr9awfEWv6f4RvbPULyzvbm41KVbdPLUN5IwOOvA9h1/Ct+XWtPg1a10uW5VL26VmhiYEFwoycduAKptJWRCi5Pml/XqX6Kp2OqWWoyXUdpOsj2kxgnABBRx1B/Osnw94wtPEeqatYW9pdwvpsvlO0yAK5yRkc+3eoNDoqKKwvFvii28I6KdTura4uI/MWPZAoLZPfntQBu0VFa3C3dpDcIrKsqK4VxhgCM8jsaloAKr3ljbX8PlXUKyIDkZ6g+oPY1i2HjC0v/GN/wCGktLtLizjEjTOgEbDjoc+4+vNdFTTad0KUU1Zmebm9h1UQy2/mWcv+rlj6xnHRh6e9aFZfiLWYPD+gXeqXMM00Num5o4Rlm7cfnVHwzfxPotpdmaRLG9CtZx3IxKm4E7D69OKrSS03/MjWD11T/A6KuS8G/8AIX8Wf9hZv/RaV1tcl4N/5C/iz/sLN/6LSoNDraKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArLt7iPUrq4eWGM29nLiKVv74BDH8M4/Op9Wu5bLTZZoE3z8LGuM5YnA/nXOfEFLVvCjWt01w81wwihtrWXyjczN0U45xnk+3WrWkbmb96fL2J7HxzpOs+Lf+Ef0tvtskUTzXE6H93EAQMA/xHJHSqHj+K4TVvCGoWlrJcT2+rbNkY52vDJu57Djk1yvgzQ7D4TareTeINQijF8sMFrKVOGbGZAMDgBscn2r12O5t5inlzRuXXzE2sDuX1Htz1rNGrOeOow+HfOWeN7m9lja/vnjwNqjCkjPXAAAHovr16ONkkjWSPBVwGBHcGuf13w/c6hd3M9q8Q+12DWUvmMRtBOQwwDnGW447c1Z0LxBo2pyXGm6ZercTabiGZQpG0jjuOenamI2qQgEYIBHvS1m65r+meG9P+36tdC3tt4TeVLZJ6DABNAGlRUcE0dzBHPC4eKRQ6MOhBGQakoATAznAz60tZNt4l0i81+50KC9V9Stl3ywbTlRx3xg9R09a1qAAgEYIyKrX9jFqFk9tLkK2MMvVSOhHuKZquq2WiabNqOoTiC1hG6SQgnH4Dmn6dqFrqunwX9jMJrWdA8cg/iB+tNNp3QpRUlZ7CWd3FcebEjs0lu/lSbhg5A6/j1rnPBv/ACF/Fn/YWb/0Wlbc8lrp+rQyNG4lv2EJcH5cqCRn3PIrE8G/8hfxZ/2Fm/8ARaU5rZrqTTbaae6/pfgdbRRRUlhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRXH/EnUr3TvCwGmXb2upXN1DbWsiEcO7Ac54IxmqU1/qGk+ONC0iw1i51RLpZDfwz7H8lFA2yblUFcnjB4P4UAdTqN+9rqVnFlUtikktxI44VVA79uT+lct4UvbTxp4luvETzLJHYk2+n2zcGJD1mKnoX7H0qx4lg1PxD4mh8OKrR6KYFnv5sY3jccRA/7WOfYU7xbZRaJcaf4nsEEMtlIkFysYwJbZiFKkD+7kMPTBqpdCYbt33ZmX0mm6j491e48SGFrDQ4YhZ203ILuN7SBf4m4Cj6GpPhjBb3I1LWGbbd3FxMiWbdbGETPiIj+E7skj6dgK7W7fTIJYZ7w2scjsEjebaCT2AJqzHFFCXMcaIXO5ioA3H1PrUlElUrLSNO064ubiysbe3mun3zvFGFMjepx1q7moIL21uZZY4LmKV4W2yKjglD6H0oAnqpqWl2GsWhtNRs4bq3LBvLmQMMjoeat5rM1/xBpvhnSZNS1SfybdMDgEliegAHU0AaKIkcaxooVFACqowAB2FOrnPCfjfRPGdtLLpU774SBLDMu10z0OOmD6g10eaAKUOkadb6nNqUNjbpfTqFluFjAdwOxPX/APVV2oEvbWS6ktUuYmuIwGeIOCyj1IqfIoAgvbK11GzktLy3juLeUbXikUMrD3FOtraCytYra1hSGCJQsccahVUDoAB0pZ7iG1gaaeVIokGWd2AAHuaWKaOeJJYpFeNxuV1OQw9QaAKmr/Z0097i4hMq2xE4UHByvORXPeCXEmp+KXXo2qEj/v2ldTdiNrOYSrvjKHcueox0rj/h5NHcS+IpokKRvqO5VJztBiTAqn8JC0m/NHbUUUVJYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBwXiMf258RPD2mSWk8mnWIlup5GgYxNKV2omcYyMsfxFdpa6fZWO77JaQQbvveVGFz9cVZooAwLrT7fUfE0kV5AXjW1VkYOy87iD0Iq9faFpupMpvLbzdq7RmRgMfQGi6ubiDWbCJRm2nWRX+XowAK8/nWjW0pzXK0+hzwpU25Jq+uunz/U53xF4I0TxS1m2pwys1o4aMxylenY+36+9aV3omn3zRm4gLmNdi4kZcD8DWhRWalJO6ZtKEZKzV0Z93omn3xjNxAXMa7VxIy4H4GsXTvh14c0u9vbq3tZjJdyb3DTvgH0GCOOe+a6qijnlprsL2UHf3VrvoZ91omn3oiFxAX8pdqYkZcD8DXPePfAcHjHw+ljFN9muYCDBIxJUY7EZ5+vWuxpksqQwvLIwVEUsxPYChyk1ZsFTgndLU8t8D/C2z8HRXN1r9/BNNOAihJGjRAOeuQSTXfnTtH1e3iK7LiKEeWhjnbC+2Qf51zXgMP4pim8YamDK13Iy6fA/K21upwMD+82Mk9elUNKv4LH4xeJvLmjt9Kisbf7USwWMXJPyn03EEj3oU5RtZhKnCTbkk7nQxfD3w7FrtzrAtpjdToEYGdtoAx0wc9h3rZuND0+7ihjmgLJAu2MCRhgfgeenetCihTktmDpQe8UYmteE9I17SRpt9DIbdY/LXZKylRx3zz0HXNOt/C2k2+lWWmrbubazj8uEGVgQPcgjNbNFCnJO9wdODXK1oZt5otncWaQmAt5CFYR5jDHHHfn8a5j4b28lp/wkFvKAJI9QCsAc4IiTNddqkc82l3MVt/rnjKpzjk+9cz4GjMV/4njJyU1Mrn6RpVOTcLN9SYwiqjaVtP6/I7GiiiszUKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAKOsS3Nvpsk9oCZ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phy_919	OPEN	Modern scientific instruments often use electric and magnetic fields to control the movement of charged particles. As <image_1>shown in the figure, in the vacuum coordinate system\(xOy\), there are two areas with borders parallel to each other and widths of\(d\) in the second quadrant. They are respectively distributed with a uniform electric field with a vertical downward direction and a uniform magnetic field with a direction perpendicular to the paper. By adjusting the magnitude of the electric field and magnetic field, the speed and direction of the flying charged particles can be controlled. Now, positively charged particles with mass\(m\) and charge\(q\) are released from rest at the boundary\(P\). The particle just enters the\(x &gt; 0\) region from the coordinate origin\(O\) at a velocity of\(v_0\) and along the positive direction of the x-axis. There are a uniform magnetic field with magnetic induction intensity of\(B_1\) and direction perpendicular to the\(xOy\) plane and another unknown uniform strong magnetic field in the\(x &gt; 0\) region. After entering the\(x &gt; 0\) region, the particle just moves in a uniform straight line, regardless of the particle gravity, ask: Keep the magnetic induction intensity in the second quadrant unchanged, increase the electric field intensity to 4 times that of the original, and adjust the position of the incident\(P\) point left and right so that the particles can still enter the\(x &gt; 0\) area from the\(O\) point. Find the coordinates of the farthest position from the x axis during the movement after the particle enters the\(x &gt; 0\) area.		$\left( \frac{[(4n+1)\pi + 2\sqrt{3}]mv_0}{2qB_1}, -\frac{\sqrt{3}mv_0}{qB_1} \right)$ and $\left( \frac{[(4n+3)\pi + 2\sqrt{3}]mv_0}{2qB_1}, \frac{\sqrt{3}mv_0}{qB_1} \right)$ for $n = 0, 1, 2, \cdots$	phy	电磁学_电磁感应	['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phy_920	OPEN	As <image_1>shown in the figure, in the\(xOy\) plane rectangular coordinate system, there is a vertical downward uniform strong electric field in the second quadrant, and the electric field strength\(E_1 = 20 \text{V/m}\), the magnitude of magnetic induction in quadrants 1 and 4 is\(B = 2.0 \text{T}\), a uniform strong magnetic field with a direction perpendicular to the paper and a uniform strong magnetic field with a vertical upward direction, and the electric field strength is\(E_2 = 10 \text{V/m}\), the mass is\(m = 1.0 \times 10^{-5} \text{kg}\), charge amount is\The droplet of (q = +1.0 \times 10^{-5} \text{C}\) starts from the\(S\) point in the second quadrant to the\(v_0 = 5 \text{m/s}\) is injected parallel to the x-axis. After a period of time, the liquid droplet just enters the 4th quadrant from the coordinate origin at the speed of\(v = 10 \text{m/s}\), and then enters the 1st quadrant from the point\(A\) on the x-axis, and the electric field\(E_2\) is immediately removed. Gravity acceleration\(g\) is\(10 \text{m/s}^2\). Find: The maximum value of the velocity of the droplet in motion after the electric field\(E_2\) is removed.		\(5(1+\sqrt{3}) \text{m/s}\)	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEYAj4DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACioIb21uZJI4LmGV4jiRY5AxT6gdKdbXVve26XFrPFPA/wB2SJwyt24I4NAEtFMSWOR5ER1Z4yA6g8qSM4PpwQafQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUVR1i/n03TZLq20+fUJUIxbwEB2yccZOOOtAHDxSweHviprzJAN19p9u8FvEADLICy4HbJJ5P4mur0bT7Xwl4WW3byooLZJJpREMIhZmdgg7KCxAHoBSWGkLcax/wkGoWqx6gYvJhQ4JhjznGRxuJPJH0rT1CwttUsZbK7j8y3mG2RM43D0oA8I+FHxFm1T4p6zb3sjeRrTNJbBicK6fdUemUz/3yBX0BXnnh7w1o1x4s8RRtp8CiyvreS2KIFMLLEhG0jpXodABUMN1DcNKsUgZom2OB2NRanfJpum3F5IfliQtj1PYV594F1S7h8QXMF8kiC9Ytl1IHmdcflTSurnTSwzqU5VF0PTKKKKRzBRRRQAUjMFUsTgAZJpa5/wAZak+n6BKsAZrm4/cxKoycnrj8M00rl04OpNQXU27e4iuoEngcPG4yrDvUtcR8OdRkfTpNOuFZXi+ePcMZQ+n4129DVmXiKXsqjh2CiiikYhRRRQBFc3MVpA087hI16salBBAI5BrhPiPqEv2WHTLZXZ3/AHsuwZ2qDxn6n+Vb/hLUm1HQYTKCtxD+6lVhggj1p20udMsM40FW7s3KiluYICBNPHGT03uBn86lry74pXOn3Xijwhot9JDFC14b25lkONsUan5SfRiSPwpHMelJfWkjhEuoGY9AsgJNT1x+lab4Z8Sz22taVbQhbG5YRXESbRIQMHHqOf0rsKACoZrqGCSKOWRVeZtqA/xHGcVNXmHjXV7uTxPbizjleOwcDKKSDJ1I/L+tNK50YbDuvPlPT6Kr2F2l/YQXUZ+WVAwqxSMGmnZhRRRQIKKKCQASeAKAIRdQm7Nr5i+eE3lO+3OM1NXlFv4guW8dnVTHL9jdvLB2nHk52hvpnn616uCCAQcg02rHTicM6HLfqgooopHMFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRUF4zJY3DqSGWNiCOxxVXQZpLjQbGWVy8jwqWZjkk4oK5fd5jRooooJCiisfVLiaLWdJjjkZUkkYOoPDDb3oKhHmdjYooooJCiiigArF17xRp/hxrQagJx9rlWCExxFt8jdF47mk8N3M91HqhnlaQx6jPGm452qCMAe1cd4vuZ9U+Kvh3TLaxe+j0mKTUp4Y5FXLH5Y87iBkHDCgucHCTizrF8Yad/adpp8sF9BPdPsi822ZVY4z16V0FYfh28udc0/wDtDUbFbWRbmVYYGIZogjFOSOCcqx44wR161uUEBRWR4iuJrawgaGRkZrqJSVOMgsMitegpxtFS7hRRRQScj4Y/5HHxf/19Q/8Aola66uR8Mf8AI4+L/wDr6h/9ErXXUANdEkADqGAIOCM8isPRI0k1DWQ6q2LzIyM4O0c1vVh6D/yENa/6+/8A2UU0bU/gl/XU3KKKKRiFFFFABUF1GhgkcqpdUYBiORkc1PUVz/x6zf7h/lQOO5k+FY0PhywcqpcRkBscgZrbrG8Kf8ixY/8AXP8Aqa2ab3NK/wDFl6sKKKKRkFFFFAGJ4pjQaBduFUM23LAcnkVrQRosasqgMyjJA5PFZfir/kXbn/gP8xWtD/qI/wDdH8qfQ2f8Jer/AEHMwRSzdAMmvLtJ1e1n+K2va7qC3MMFvax2Ngz20mHXO52Hy/3gPzr1KikYnLaDr9rcT362lpNbaVZgu888TJ5kjEsdoIyR71saTrun62J/sMxdrdgkqMpVkJGRkHnkdKs39zBZ2M1zcgmGJdzBVLE49AOprn/Ct5Zalf6nqMIm+13RjMwaB41jRQRGmWA3H7xOM8k9sUAdRXP65Gkep6GERVBvCSAMclTk10FYOv8A/IU0L/r7/wDZTTRtQ+P7/wAmbiRpGu1EVRnOFGKdRRSMQooooAKR0V0ZHUMrDBBGQRS0UAc/HGh8b3EZRSn9nINpHGN54xW+AFAAGAOgFYUX/I93H/YPT/0M1vU2bVt16IKKKKRiFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAFe//wCQfc/9cm/kap+G/wDkW9P/AOuC/wAquX//ACD7n/rk38jVPw3/AMi3p/8A1wX+VPoar+E/X9GalFFFIyCsPWP+Q9ov/XV//QTW5WHrH/Ie0X/rq/8A6CaaNaPxfJ/kzcooopGQUUUUAc74WLCDWSoy39qXGBnGeRWBoukeJ9N8Xa/rtzpdncPqJjSELebTHGgIAPy+9dD4T/1Wsf8AYVuP5iugpvc2xH8VnP6HFr76je3msRW1vHtCWltbylwB1ZmOB8xOKuaBqza3pn2trfyGE0sRj3bsFHK9fwrTYkKSBkgdPWsTwrYXem6RJb3kQjlN1PKAGDAq8jOOR7NikYi+Kf8AkHW3/X5D/wChitvtWJ4p/wCQdbf9fkP/AKGK2+1Poay/hx+f6BRRRSMjkfDH/I4+L/8Ar6h/9ErXXVyPhj/kcfF//X1D/wCiVrrqACsPQf8AkIa1/wBff/sorcrn9IjaW612NJWiZrrAdcZU7RzzTRtT+CXy/M6CisY6xJbf6HdRbtQPESJ92b/aHoPX0rRsop4oP9Jm82ZjuYgYA9h7ClYiVNxV2WKKKKCAqK5/49Zv9w/yqWorn/j1m/3D/Kga3Mvwp/yLFj/1z/qa2axvCn/IsWP/AFz/AKmtmm9zSv8AxZerCio7iNpoHjSVonYfK64yp9eayjrEsH+hzw7tSPCRr92X/aHoPX0pWJjBy2Nmiq9nFPFbgXMxmmJLM2MAE9h7CrFBLVmY3ir/AJF25/4D/MVrQ/6iP/dH8qyfFX/Iu3P/AAH+YrWh/wBRH/uj+VPoaP8AhL1f6D6KKKRkFFFFABWDr/8AyFNC/wCvv/2U1vVgeIRu1LRBkjN3jI6j5TTRtQ+P7/yN+isdtUbSiYNRYuTxBKo5m9Fx/e/nVywS72vNdvh5DkQjpEPTPc+posRKm0rv/hy5RRRSICiiigDBi/5Hu4/7B6f+hmt6sGL/AJHu4/7B6f8AoZreps2rbr0QUUUUjEKKKypryTSZne8kL2MjErKRzET/AAn1HofwoKjFy0Rq0Vn2L3V3MbyUtFbsuIYMckf3m9z2HYVoUBKPK7BR2oqvf3sWnadc305xFbxNK59lGT/Kgk5a38dyXV/rNrbaHczHSJBHcvHKpGcZwucZIHUVv6Brtj4k0eDVNOkL28w43DBUjqCOxFeP6fc+JvD/AMLLvxAqWixavcPqF7OMvOiSnG5UOFyFwQM16p4M0rTdG8Jafa6UXa0MQkV5PvOW5LH3OaAN6iiigAooooAKKzrya4sJzdljLZkfvUxzF/tD1HqKZbXU2qXCz28hTT4zw4HM59v9n+dOxp7N25uhqUUUUjMKKKKACiiigCvf/wDIPuf+uTfyNU/Df/It6f8A9cF/lVy//wCQfc/9cm/kap+G/wDkW9P/AOuC/wAqfQ1X8J+v6M1KKKKRkFYesf8AIe0X/rq//oJrcrD1j/kPaL/11f8A9BNNGtH4vk/yZo6pqNvpGlXepXbFba1iaaQgZIVRk8VyzeL9cj8Pxa6/h1Gsp1R4o47zdMFcgIWXbjnIzgnGe9dNqltZalYzaVe4aK+ieFo88spHzfoa868LXWoeD/E8XgLWz9t06dTJpV04ydqnOxvp2pGR6ihLRqzDBIBI9KdRRQBz/hP/AFWsf9hW4/mK6Cuf8J/6rWP+wrcfzFaWsamuj6XPfvbzzpChd0gXc2ACScfhTe5tiP4rL1Fc63jCx/sHSdYjhuJrXUmjVDGu4xl+m76Hg10VIxMTxT/yDrb/AK/If/QxW32r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phy_921	OPEN	As <image_1>shown in the figure, in the planar rectangular coordinate system yOx, the center of the quarter-dotted arc AB is at the coordinate origin O, and the two points A and B are on the y-axis and the x-axis respectively; there is a uniform magnetic field perpendicular to the paper surface and outward with a magnetic induction intensity of\(B_0\) in the first quadrant outside the boundary of the arc. The intersection of the dotted line MN parallel to the y-axis and the x-axis is N point, and the distance between the two points O and N is equal to the radius of the AB arc; In the second quadrant, there is a uniform strong field with a field strength of\(E_0 = B_0v_0\) along the positive direction of the y-axis between the dotted line MN and the y-axis. On the left side of the dotted line MN, there is a uniform strong field with a field strength of\(E_0 = B_0v_0\) along the negative direction of the x-axis and a uniform strong magnetic field with a magnetic induction strength of\(B_0\) outward perpendicular to the paper. The current yield quality is\(m\) and the charging quantity is\The particle of (q (q &gt; 0)\)(regardless of gravity) obtains an initial velocity in the positive y direction at point O\(v_0\). The particle moves at a uniform speed to point A and enters the magnetic field, then reaches point O from point B, and then enters the uniform strong electric field between ON, and then moves from point C to point D on MN (There is no electric field or magnetic field in the OB section on the x-axis, and all points in the ON section on the x-axis are covered by the electric field\(E_0\); there is no electric field or magnetic field in the OA section on the y-axis, and all points above point A on the y-axis are covered by the magnetic field\(B_0\).) Find the distance between points C and D.		\(\frac{(2+\pi)mv_0}{qB_0}\)	phy	电磁学_电磁感应	['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']	['phy_921.jpg']
phy_922	OPEN	As <image_1>shown in the figure, in the region of\(0 \leq x \leq4d, 0 \leq y \leq4d\) in the\(xOy\) plane, there is a uniform strong field with a field strength of\(E\) along the positive direction of the y-axis. There is a uniform strong magnetic field extending perpendicularly to the paper surface around the electric field. A positively charged particle with mass\(m\) and charge\(q\) enters the electric field from the midpoint\(A\) of\(OP\)(regardless of particle gravity). If the particle enters the electric field for the first time in the positive direction of the y-axis from point\(A\) at a certain initial velocity, and then enters the electric field for the second time from point\(P\) after leaving the electric field. When the particle moves to the point\(P\), the direction of the electric field suddenly changes to the negative direction along the y-axis, and the field strength becomes\(108E\)(regardless of the time when the electric field changes). After moving in the electric field for a period of time, the particle enters the magnetic field. After being deflected by the magnetic field, it enters the electric field again. Find the coordinates when the particle enters the electric field again.		\(\left( \frac{2\sqrt{14}}{3}d, 4d \right)\)	phy	电磁学_电磁感应	['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phy_923	OPEN	As <image_1>shown in the figure, two thin metal plates\(M\) and\(N\) with a length of\(L\) are placed opposite the y-axis. A voltage\(U_{MN} = U_0\) is applied between the two plates. A slit parallel to the y-axis is opened on the two plates, and the slit is located in the paper.\ The distance between the lower edges of (M\) and\(N\) and the x-axis is\(5L\), and there is a uniform magnetic field perpendicular to the paper in the entire space. Positively charged particles with mass\(m\) and charge\(q\) are released from the upper edge of the\(M\) plate at rest. After being accelerated by the electric field between\(M\) and\(N\), they can pass through the slit and enter the magnetic field in the x-axis direction, regardless of the gravity of the charged particles. Adjust the magnetic induction strength so that\(B = \frac{3}{L} \sqrt{\frac{2mU_0}{q}}\), and calculate the number of times the particle is accelerated from the beginning of release to the point where it passes\(O\).		65 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phy_924	OPEN	As <image_1>shown in the figure, three areas are divided between the two infinitely long horizontal boundaries. The rectangular ABCD area in the middle is distributed with a vertical uniform strong field (not shown in the figure). On the left side of the boundary AB, there is a uniform magnetic field perpendicular to the paper. On the right side of the boundary CD, there is a uniform magnetic field perpendicular to the paper and outward. A particle with a mass of\(m\) and a charge of\(q &gt; 0)\) enters the left magnetic field vertically downward from point P, with a velocity of\(v\). After deflection by the magnetic field, when the particle crosses the boundary AB and enters the electric field for the first time, the angle with the boundary AB is\(\theta\), and then leaves the electric field in a direction perpendicular to the boundary CD and enters the right magnetic field. Finally, the particles exit the electric field region in the vertical direction from point Q, directly below point P. It is known that the electric field strength of a uniform strong electric field remains unchanged, but every time a particle leaves the electric field, the direction of the electric field will reverse. The distance between points P and A is\(d\), and the distance between the upper and lower boundaries is\(2d\),\(\sin \theta = 0.6\). The gravity of the particle is ignored and the edge effect is ignored. Ask: If the distance between boundary AB and CD is\(\frac{1}{3}d\), what is the maximum value of the magnetic induction intensity\(B_2\) of the right magnetic field?		\(\frac{27mv}{10qd}\)	phy	电磁学_电磁感应	['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phy_925	OPEN	As <image_1>shown in the figure, in region I (0 ≤ x ≤ L), there is a uniform strong electric field with magnitude E along the negative direction of the y-axis; in region II (L &lt; x ≤ 2L), there is a uniform strong magnetic field with magnitude B inward perpendicular to the paper; in region III (x &gt; 2L), there are both a uniform strong magnetic field outward perpendicular to the paper and a uniform strong electric field along the positive direction of the y-axis. The magnetic induction intensity is\(\frac{B}{2}\), and the electric field intensity is E. A positively charged particle with a specific charge\(\frac{q}{m} = 1.0 \times 10^8 \, \text{C/kg}\) enters region I from point A (0, 0.5L) at a velocity\(v_0 = 1.0 \times 10^5 \, \text{m/s}\) in the positive direction of the x-axis; the particle enters region II through point B (l, 0). It enters region III from point C (2L, 0), where\(L = 0.02 \, \text{m}\), regardless of the gravity of the particle. Find: the maximum value of the particle's motion velocity in region III\(v_{\text{max}}\);		2 \times 10^5 \, 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phy_926	OPEN	As <image_1>shown in the figure, the spatial rectangular coordinate system\(Oxyz\)(z axis not drawn, positive direction outward), a circular area with radius of\(R\) in the\(xOy\) plane is tangent to the y axis at the point\(O\), and the center of the circle is\(O_1\). The uniform magnetic field in the area is along the positive direction of the z axis, and the magnetic induction intensity is\(B_1\). In the\(x &gt; 0\) area, the directions of the uniform electric field and the uniform magnetic field are both along the positive direction of the x axis, and the electric field intensity is\(E\), and the magnetic induction intensity is\(B_2\).\ (xOy\) In the third quadrant of the plane, there is a linear particle emitter parallel to the x-axis, with the midpoint at\(Q\), and the line between\(O_1\) and\(Q\) is parallel to the y-axis. The particle emitter can be located at a width of\Within the range of (1.6R\), the same kind of particles with mass\(m\) and charge\(q(q &gt; 0)\) are emitted along the positive direction of the y-axis, and the emission speed is adjustable,\(\sin53^\circ = 0.8\),\(\cos53^\circ = 0.6\). When adjusting the particle emission speed to a certain value, all particles fly out of the circular magnetic field from the\(O\) point. Calculate the position coordinates of the point farthest from the x axis on the motion trajectory after the particle emitted from the leftmost end of the emitter enters the\(x &gt; 0\) region.		\left( \frac{3(2n+1)\pi B_1 R}{5B_2} + \frac{\pi^2 m E (2n+1)^2}{2qB_2^2}, 0, \frac{8B_1 R}{5B_2} \right) (n = 0, 1, 2 \cdots)	phy	电磁学_电磁感应	['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phy_927	OPEN	As shown in the drawing<image_1>, in the\(xOy\) plane, there is a uniform strong magnetic field inward perpendicular to the plane in the\(0 \leq y &lt; L\) region, and there is a uniform strong magnetic field along the positive direction of the x-axis in the\(y &gt; L\) region. There is a particle source at the coordinate origin\(O\), which emits positively charged particles\(a\) and\(b\) at the same rate\(v_0\) along the positive directions of x and y axes respectively. Both particles have a mass\(m\) and a charge amount\(q\). The angle between the velocity of the particle\(b\) when it leaves the magnetic field and the negative direction of the x-axis is\(60^\circ\), and then the particle\(b\) passes through the y-axis from\(0, (1+\sqrt{3})L)\). Regardless of particle gravity, regardless of interactions between particles. If the particles\(a\) and\(b\) leave the magnetic field at the same time, calculate the time difference between the emission of the two particles from the\(O\) point		\(\frac{\pi L}{3v_0}\)	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEDATsDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAqanqMGk2Et5cJO8UYJYQQvK2AM/dUE9qzz4s0oWej3YlkaDV5EitZEiZgWYZUMR930571r3C7raVfVCP0rgfhvaTnwToragjw22mQEIjAjzJAWzIfUAfd+pPpgA7D+3dP/wCEj/sDzv8AiY/Zftfl448vdtzn1znitKvmCPV/Eo+NJ8Utpd2Iji4aPYdwsS3lB8Yzt49Pevp5WDoGU5DDIoAWiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAMnUNJutQ1KGQ6rNDp4jKTWUaKBMc5yX6gdsDrWoiJHGsaKFRRgKBwBTqKAOFUD/hfEo7f8Iwn/pU1d1XCr/yXmX/sWE/9KmruqACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoqve3Rs7Zphbz3GCB5cC7mP0GRWX/wAJG/8A0AtY/wDAdf8A4qnYuNOUldG5RWH/AMJG/wD0AtY/8B1/+Ko/4SN/+gFrH/gOv/xVFmV7Cp2NyisP/hI3/wCgFrH/AIDr/wDFUf8ACRv/ANALWP8AwHX/AOKosw9hU7G5RWH/AMJG/wD0AtY/8B1/+Ko/4SN/+gFrH/gOv/xVFmHsKnY3KKw/+Ejf/oBax/4Dr/8AFUf8JG//AEAtY/8AAdf/AIqizD2FTsblFYf/AAkb/wDQC1j/AMB1/wDiqP8AhI3/AOgFrH/gOv8A8VRZh7Cp2NyisP8A4SN/+gFrH/gOv/xVH/CRv/0AtY/8B1/+Kosw9hU7G5RWH/wkb/8AQC1j/wAB1/8AiqP+Ejf/AKAWsf8AgOv/AMVRZh7Cp2NyisP/AISN/wDoBax/4Dr/APFUf8JG/wD0AtY/8B1/+Kosw9hU7GCv/JeZf+xYT/0qau6rzVdVb/hcMmof2dfZOgLB9l8oed/x8M2/bnGztnPXtXXf8JG//QC1j/wHX/4qizD2FTsblFYf/CRv/wBALWP/AAHX/wCKo/4SN/8AoBax/wCA6/8AxVFmHsKnY3KKw/8AhI3/AOgFrH/gOv8A8VR/wkb/APQC1j/wHX/4qizD2FTsblFYf/CRv/0AtY/8B1/+Ko/4SN/+gFrH/gOv/wAVRZh7Cp2NyisP/hI3/wCgFrH/AIDr/wDFUf8ACRv/ANALWP8AwHX/AOKosw9hU7G5RWH/AMJG/wD0AtY/8B1/+Ko/4SN/+gFrH/gOv/xVFmHsKnY3KKw/+Ejf/oBax/4Dr/8AFUf8JG//AEAtY/8AAdf/AIqizD2FTsblFYf/AAkb/wDQC1j/AMB1/wDiqP8AhI3/AOgFrH/gOv8A8VRZh7Cp2Nyiudu9fkltJUTSNahYqcSC3X5T6/ermtB8f6jPcLa3Wnvec43264cfUdD+lPlZrDB1Zxcl0PR6KbG/mRq+1l3DO1hgj606pOUKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOFX/AJLzL/2LCf8ApU1d1XCr/wAl5l/7FhP/AEqau6oAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAIri3jurd4JQTG4wwBIyPqKZaWFpYRCK0t44UHZFAqxRQPmdrX0CiiigQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAcKv/JeZf8AsWE/9Kmruq4Vf+S8y/8AYsJ/6VNXdUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUjEhSQNxA4A71yel+N5dZivJdP8N6nNHaTvbuwkgGXXrtzJzQB1tFUNG1MaxpFvqAtp7YTruEM4Adee+CR+tX6AK97PNb2zSW9s1xICMRqwBP4msv+19W/wCgBP8A9/k/xrcoplxnFLWN/vMP+19W/wCgBP8A9/k/xo/tfVv+gBP/AN/k/wAa3KKLle0j/Ivx/wAzD/tfVv8AoAT/APf5P8aP7X1b/oAT/wDf5P8AGtyii4e0j/Ivx/zMP+19W/6AE/8A3+T/ABo/tfVv+gBP/wB/k/xrcoouHtI/yL8f8zD/ALX1b/oAT/8Af5P8aP7X1b/oAT/9/k/xrcoouHtI/wAi/H/Mw/7X1b/oAT/9/k/xo/tfVv8AoAT/APf5P8a3KKLh7SP8i/H/ADMP+19W/wCgBP8A9/k/xo/tfVv+gBP/AN/k/wAa3KKLh7SP8i/H/Mw/7X1b/oAT/wDf5P8AGj+19W/6AE//AH+T/Gtyii4e0j/Ivx/zMP8AtfVv+gBP/wB/k/xo/tfVv+gBP/3+T/Gtyii4e0j/ACL8f8zzVb69/wCFwyXf9myfav7AWP7JvXds+0Md+emM8Y61139r6t/0AJ/+/wAn+NYK/wDJeZf+xYT/ANKmruqLh7SP8i/H/Mw/7X1b/oAT/wDf5P8AGj+19W/6AE//AH+T/Gtyii4e0j/Ivx/zMP8AtfVv+gBP/wB/k/xo/tfVv+gBP/3+T/Gtyii4e0j/ACL8f8zD/tfVv+gBP/3+T/Gj+19W/wCgBP8A9/k/xrcoouHtI/yL8f8AMw/7X1b/AKAE/wD3+T/Gj+19W/6AE/8A3+T/ABrcoouHtI/yL8f8zD/tfVv+gBP/AN/k/wAaP7X1b/oAT/8Af5P8a3KKLh7SP8i/H/Mw/wC19W/6AE//AH+T/Gj+19W/6AE//f5P8a3KKLh7SP8AIvx/zMP+19W/6AE//f5P8aP7X1b/AKAE/wD3+T/Gtyii4e0j/Ivx/wAznL3U9TmspkfRbiJShzIs6gp75z2rl/DXi/xFcSi3Nk2pRg4MgG1l+rdPzr0eeCK5geGZA8bjDKehFLDDFbxLFDGkcajCoigAfhTuuxtDEU4wcXBO/qZniDWF0XwrqGrTrs+zWzy7Cf4gOF+pOB+Ncd4I0jxDpOheH4prm1TT5N95fMqMspZgXALFsYLEZ47V1Hi3wwvi3R20qe+mtrWRlaUQqMvtYMASe2QD+FQ3nha71GGG2uteuzaIyl4Io0QSgH7rEDOOOgqTkOkXaVBXG3HGOlLQBgYFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHCr/yXmX/sWE/9Kmruq4Vf+S8y/wDYsJ/6VNXdUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRVe9t5Lq2aKK5kt3JGJI8ZH51l/2Fff9B++/75T/AAplxjFrWVvvNyisP+wr7/oP33/fKf4Uf2Fff9B++/75T/CixXs4fzr8f8jcorD/ALCvv+g/ff8AfKf4Uf2Fff8AQfvv++U/wosHs4fzr8f8jcorD/sK+/6D99/3yn+FH9hX3/Qfvv8AvlP8KLB7OH86/H/I3KKw/wCwr7/oP33/AHyn+FH9hX3/AEH77/vlP8KLB7OH86/H/I3KKw/7Cvv+g/ff98p/hR/YV9/0H77/AL5T/Ciwezh/Ovx/yNyisP8AsK+/6D99/wB8p/hR/YV9/wBB++/75T/Ciwezh/Ovx/yNyisP+wr7/oP33/fKf4Uf2Fff9B++/wC+U/wosHs4fzr8f8jcorD/ALCvv+g/ff8AfKf4Uf2Fff8AQfvv++U/wosHs4fzr8f8jBX/AJLzL/2LCf8ApU1d1Xmq6dcf8Lhksv7SuPPGgLL9rwvmbftDDy+mNueemc1139hX3/Qfvv8AvlP8KLB7OH86/H/I3KKw/wCwr7/oP33/AHyn+FH9hX3/AEH77/vlP8KLB7OH86/H/I3KKw/7Cvv+g/ff98p/hR/YV9/0H77/AL5T/Ciwezh/Ovx/yNyisP8AsK+/6D99/wB8p/hR/YV9/wBB++/75T/Ciwezh/Ovx/yNyisP+wr7/oP33/fKf4Uf2Fff9B++/wC+U/wosHs4fzr8f8jcorD/ALCvv+g/ff8AfKf4Uf2Fff8AQfvv++U/wosHs4fzr8f8jcorD/sK+/6D99/3yn+FH9hX3/Qfvv8AvlP8KLB7OH86/H/I3KKw/wCwr7/oP33/AHyn+FH9hX3/AEH77/vlP8KLB7OH86/H/I17i4jtbd55SRGgyxAzgetJa3ltewia1njmjPRo2BFYV5o99FZzONZ1CYhTiJUQl/bpXNeHvAusW04up79rAk5KQtlj7Ht/OnZdzaFCk4OUp2Z6RRTY0KRqpcuQMFm6mnVJyBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBwq/8AJeZf+xYT/wBKmruq4Vf+S8y/9iwn/pU1VfDVvFrnxM8UaoFJsdPkjsoF52GdRulfHTcGOPyoA9EooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKguxdG3YWbRLNkYMoJX9KrXCasbeEW8toJgP3pdW2k+1Uo36mcp8t9GzQoqhImqmyjEctqLrPzsytsI9u/pSbNW+wAebafa93LbW2Y/nmnyeaF7V/ys0KKz1TVvsLh5bQ3efkYK2zHv3ohTVRazCeW1Nwf9UUU7R9aOTzQe1f8AKzQorPtU1YRzfapbVnK/uvLVsA++aLNNWVn+2S2rLt+TylYc++e1Dha+qBVW7e69TQorPsk1dZib2W0aLbwIlYHP40lsmsC7BuZbRrfJyI1YN7daHDfVAqrdvdepo0VnRprAvQZJbM227kKrbsf40jJrH23Ky2f2Xf8AdKtv2/yzT5PNC9q7fCzSorNuE1k3RNtLZi3yMB1YtjvS3aaubjNnLaLDgcSqxb36UKHmgdVq/uvQ0aKz7xNXaRPsctoqbBuEqsTu74x2ouk1YpD9lltVYL+98xWwT7Y7UlDbVDdVq/uvQ0KKz501Y20IgltBOB+9Lq20/SlkTVTYxiOW1F3u+dmVtmOenf0o5PNB7V6+6zh9U1A6Z8Zb27W3nuZI/CoKQwRNIzt9pbAwoJ5NV/Auqf8ACK+AV+16Prs+sTyTXd3Cml3BeSZ2J5YptzjaM57VMq6r/wALpkHm2v2z/hGk+badmPtTfjXdImq/YZBJLam73fIwVtmPfv60cnmg9q/5Xtf/AIHqWLM3DWUBvFRbkxqZljOVD45A9s5qeqECaqLWYTy2puD/AKoorbR9aLVNVEc32qW1ZyP3RjVsA89c/hQ4b6oFVbt7r1L9FZ9omrhn+2S2jLtOzylYYb3z2pLNNXFxm8ltGhweIlYHP40OFr6oFVbt7r1NGis22TWBdA3Mtm1vzkRqwb260Ims/bAXlszbb+gVt23/ABp8nmhKq7X5WaVFZrprP20lJbMW27oVbdt/xpblNYN2TbS2i2+RgSKxb36UcnmgdV2vys0aKz7xNXa4zZy2iw4HEqsWz+FF4mrM6fY5bRV2/N5qsTu9sdqShe2qG6rV/dehoUVQuk1UpF9kltVcD955isQT7Y/GidNVNtCIJbUTgfvS6ttJ9qFDbVA6rV/dehforPkTVjZRiOW0F1n52KtsI9u9Ls1X7BjzbX7Zu+9tbZj+eaOTzQe1f8r2/r5l+is+NNW+wyCSW0N1u+RlVtgHv39aIE1YW0wnltDOR+6KK20fWjk80HtXp7rNCioLQXIt1F20bTdzGCF/Wp6lqzsaJ3VwooopDCikOQDgZNc/4e8WQa1d3Wm3ED2GrWhPnWUx+bbnh1P8Sn1FAHQ0VzieLoLzxV/YWmW0l60HN9cxn91a8cKT3Y+gro6ACiis7XNQudK0ie9tbCS+kiwxgiIDMufmx6kDJx3xQBo0Vk6b4k0nVdC/tm2vI/sQUmSRzt8oj7wbPQjuDVfwz4k/4SeO5u7exnh05XC2tzL8v2kd2VeoXPQnrQBvUUUUAFFc/wCIPFMfhq9szf2si6ZPlJL9TlIHyNocdQD69Kn1/wAT6d4d0tb66kMnmkLbwwjc9w56KgHUmgDZoqnpVzdXml21ze2Zs7mRAz27OGMZ9CR3q5QAUUVzll4tik8TXPh/UbV7C9DM1p5jApdxD+JD6+q9RQB0dFc7qniyGz1600Kxtn1DU5mUyxREAW8WeZJD2GOg6muioA4Vf+S8y/8AYsJ/6VNXdVwq/wDJeZf+xYT/ANKmrsr6ae3sLia2t/tE6Rs0cO7b5jAcLntmgCxRWJ4b8UWPiWxeaAPBcQNsurScbZbd+6sP69DUGieK4vEOs3dvptq8umWqlTqOcRySggFE/vYGcnpxQB0VFFFABRWH4m8QSeG7SG+fTp7qxD4u5IOWt0/v7epA746Dmp7nxJpFpoB12W/h/s3YJFnDZDA9APUnpjrQBq0Vl+H9Vn1rSUv59PmsRKxMcUx+cp/CxHbI5xWpQAUUVzt54tt9K8TxaRqlvJaQ3QAs71z+6mfuhP8AC3oD1oA6Kiuf8S+K7bw/9nto4XvdUuzttbGE/PJ6k+ijuTW8hZo1LrtYgErnOD6UAOoopGJCEqMsBwM9aAFornvDvi221u5udOngew1e0P7+xmPzBezqf4lPqKSLxbBe+KjoemW73nkZ+23MZHl2xxwpPdvYdKAOiooooAKKKKACvK/FMD/ETXorTwzi2l0pyJvECEr5TYIMMZH389+w/n6oQCMHpUFnZWun2y21nbx28C52xxqFAz7CgDiPh/qFroy/8IdfWKaZq9sDJs6peg9ZkY/eJ755H4cd3LIsMTSOGKqMnapY/gByainsbS5uILie3ikmt2LQyMoLRkjBwe1Z3izWl8PeFNU1Ykbra3Z0z3fGFH5kUAV7Xx14YvCnk6xb4eTyld8opf8AuhmAG72zmtfUdRs9J06e/v7hILWBd8kjnAArxWayvE8D+H/h9qNi2kjVWjMupXTK4eXeJCqBCfnJwBvK/nXtEmmWlxp8djdQpcwRhPlmG7JXGCc9TkA0AeO3nhPVvFN5eeKtN0tbXSp3jlOiyu0f9qBCT5ki9FJzwD179a9T8L+I9N8SaUs+n5jMJ8qa1ddklu44KMvYitsAAYAwKrw2Npb3U91DbxRz3GPOkVQGkxwMnvigCxRRRQBznjHX9P0fTBa3Vr/aF1f5gttOVdzXLHqMf3eeSeBXnWk+H9Q+HV7Za/4gg/tDTo4zGBGzy/2MrMThAc5QAgEjkY9K9gaxtHvo757aJrqNDGkxUblU9QD2FTOiyIyOoZGGGVhkEelADLa5gvLaK5tZo5oJVDxyRsGVlPQgjqKlqCzsrbTrSO0s4I4LeMYSONcKo68Cp6ACvOfHc0Xi28Twno0C3GqwSLNJfgkLpZByH3jnzPRQc+tejVWtNPs7Ezm0tooTPIZZTGoG9z1Y+poA8+8GOvgrWZfDuvRhdQ1CZpYNXckjUST91mPSQdNv5V6VVe7sLS/SNLu2inWORZUEihtrqchh6EVM7rGjO7BVUZJPQCgDh1/5LzL/ANiyn/pU1dpcXlraLuubiGEYLZkcLwBknn2FfNEfjPVf+F4HxM1tdDT2OzlDgWe7yw/ptzznpnNen+IZbPVPijHGdHk1UabpTNJDbxoxkMxwFYsQFwoJ5PO/igDI1rRr34majd6t4Z/4ltksDWxviWj/ALVGRlCBg+XwRuPr6V3fgnXdPvtPOkQ2I0q/01RFcaYRgw+hX+8h7MOv1rS8L61p3iDw7aajpUbRWbrtSFkCNFtOCpUcDGMcVofYLT+0f7Q+zRfbPL8nz9o37Mg7c+mQKALFFFFAGT4i8Q6b4a0mS/1OXbH9xI1G55nPREXqxPp+fFeTReENZ0q4g8WXOjiXSYrh7v8A4RtHLfZAwH71F+6ZBySuO5xzXs9xYWl3Pbz3FtFLLbMXhd1BMbEYyPQ1YoApaRq9jrulwajp1ws9rMuUdf1B9COhFXar2lja2Ebx2lvFAjuZGWNQoLHqeO5qxQAVxHj7VbK8t/8AhE4dPTVtW1BPktP4YV/56yN/AAeQeueldvUEdjaw3k13HbxLczgCWUKNzgdAT3xQB5Z4cspvhrrpfxSftw1EJDHr7MzGIgACCTP3F44PQ969ZBBAIOQehFRXdnbX9rJa3cEc8Egw8ci7lYe4qVFVEVEAVVGAB2FAC0dBk0UjKHUqwBUjBB70AeV+J4X+I2uJbeGCbaTS2ZJfECErsYjmGMj7/v2FbHw/v7XR4h4PvNOj0rV7Rd5jU5S8HeZGP3s988j8K7azs7bT7VLazgjggT7scahVH4Uk1jaXF1BczW8Tz25JikZQWTIwcHtQBYooooAKKKKACgEEZBzSEAgg9DXmOq6hN8I3+0NI154XupSEtmkzPaSHJxHk5dD6dR9KAPT8gd65Px1oOreJLC0sLFbM2q3Mc9ytxMyeaqNny+Ebg461R8L6de+Jr618Ya3dBl2ltNsIJMxW6N/GxHDuR36Cu6oA4q+8Lat4l8SaTqGuyWdvYaVMLmCztHaRpJh91ndlXgEA4A/Gu1JA6mis3XtFtfEOjz6bdmRYpcEPE5V0YHKsCOhBANAGlRkZxnmvJ7jx/rPhe/Hg6/Fvf66+xLG9aVVjkVshWmGcqwx0/i7da7jwr4abQYLie8vZr/Vb5xLeXUjfeYdFVeiqOgAoA6CiiigAyM4zzRXM+KvDlzqUltq+kXhstasQfIkJPlyqeTHIvQqcfUVxtj411H4kTHw9pTjSXiUjVblJlZ1AYqVgI65x9/tmgD1gEEZByKKp6TpdpomlW2m2MZjtrdAkalixx7k8k1coAKAQehorzvxFFcfD27vPFWnTb9IuJPN1PT5ZcDeTzLESeGPde9AHoZIHU4oZQylWAIIwQe9ec6E03xMu7fX7qYw+HrSffZWEcmGmlQ8STYPGCMhPz9/R6AOCWGL/AIXnLD5aeV/wi6Ls2jGPtLcYpmgx6tpUvii9k0yR9Z1C/drcOuIxCihINzDjaFHOOfxqZf8AkvMv/YsJ/wClTV2V9ZW+pWFxY3cfmW9xG0UiZIypGCMjkfhQBm+EvDyeFvC9jo6SmZoE/eSkcyOTlm/MnHtitrIzjPNeUah4tvPhSV0bVJW1aylQ/wBlTPKomXBAEcpP8IyPnrrPCnh68gvJfEWuXgu9ZvIgn7tz5NvESGEcY6YyASepNAHV0UUUAGRRWF4p8NJ4jsofLu57LULR/Os7uBiGik9x0ZT0IPUVwsfxB1zU9R/4Qq3W0t/EwZo574SKYERQCXQZyz4P3O3fgUAergg9Dmisrw7oNv4c0hLC3kmmO4ySzTOWeWRuWZie5NatABRkZxnpRXFeKtIvtJv5fF2hXYiuoov9OtJ5MQXcSjvnhHA6N/8AXyAdqTgZPSivLNN1qb4wF4raRrDw3bMq3caygXF0+M7Dg5SP3/ir1GNFijWNBhVAAHoBQA6iikdVdGRhlWGCPUUAKCCMijIz1rzDVNRn+Ebec8z3vhe5kPl2zyZntJDk7Uycuh9O1a3hbTr/AMRX1t4w1u4Q7o92m2NvLuit42H3iRw7kdT0HQUAdzRRRQAUUUUAIc4OOvauS0fwhNJrL694mmhv9U+ZbeNQTDaIeyA9yOrHmuo+123/AD8Rf99ij7Xbf8/EX/fYoA5jTPCl34c8Q+bod1HHodyzNc6dLnbE5/jh9MnqvTvXW1D9rtv+fiL/AL7FH2u2/wCfiL/vsUATVna5Hqs2kTxaLLbw374WOWcEqgJ5bA6kDOB61b+123/PxF/32KPtdt/z8Rf99igDmrH4faJBoN1pt7D9ukvjvvLufmWaT+9u6jHbHSrnhfS9Z0aC4sNS1BL+0iYCynbPneX/AHZOxI4APfvWz9rtv+fiL/vsUfa7b/n4i/77FAE1FQ/a7b/n4i/77FH2u2/5+Iv++xQBg+KND1TxFLbafHfLaaMwJvfKJE03ogPQKecnrUGseBNPu7CyXSMaTf6cu2wurdcGIf3SP4lPcHrmul+123/PxF/32KPtdt/z8Rf99igCHSv7Q/su2Gq/Z/t4TE5tyfLLeq55q5UP2u2/5+Iv++xR9rtv+fiL/vsUATVyJ8KXes+Jm1TxHPDcWlpKTpthFkxIB0kkz95/0Hauo+123/PxF/32KPtdt/z8Rf8AfYoA5i58KXWn+JV1vw3cRWpuZV/tKzlz5NwufmcAdJAM89+9dbUP2u2/5+Iv++xR9rtv+fiL/vsUAcWv/JeZf+xYT/0qauyvvtf2C4+wCI3flt5ImJCb8cbsc4zXj8fxK8NN8dHnF2/2dtMXShPs+TzxOW6/3ecZ9fzr2L7Xbf8APxF/32KAOZ0LwTb2sd3da66atq2oRmO8uJkypQ/8s0U/dT2/OpPDPh7UfDN/PYw3q3Hh4putYpiTNbPn7gPdMZxnkcCui+123/PxF/32KPtdt/z8Rf8AfYoAmornfFHjGw8KafHqN4jzWXmBJpLch2iz0YrnkZ4OOfY1Poni/wAP+IrYT6XqttcLjJUOAy/VTyKAE8T2Gt6nZxWWj38Vgkz7bq5IJlSPHPljpuPTJ6daoT/DzQZPDcOjw25g8hvNgukP76Ob/noH67ievrXS/a7b/n4i/wC+xR9rtv8An4i/77FAFHw/Bq9rpKQa3cQXN3GxXz4QR5iD7rEHo2OuOK1Kh+123/PxF/32KPtdt/z8Rf8AfYoAmrk9b8LXvibXFTVbtP8AhHYArrYRZBuZOv70/wB0Hoo6966b7Xbf8/EX/fYo+123/PxF/wB9igDl9d8HO9/FrfhuWLTtahURk4xDcxj/AJZygdR6HqK6xN/lr5mN+Bu29M+1R/a7b/n4i/77FH2u2/5+Iv8AvsUATUjbtjbMbscZ6ZqL7Xbf8/EX/fYo+123/PxF/wB9igDl9G8ITNqz694mnj1DVTuSBFGYLSM/wxqe5HVjyaXSfCl14a8QF9EuI49CuSz3GnyZxC553Q+mT1XpXT/a7b/n4i/77FNe8gCMUmhZgDgGQAE/WgCxRXFaL8U/DGr3smny3Z07UYnMclre4RgwOCA2Sp/A12isrqGRgykZBByDQAtFFFAHJ/8ACs/B3/QEi/7+P/8AFUf8Kz8Hf9ASL/v4/wD8VXWUUAcn/wAKz8Hf9ASL/v4//wAVR/wrPwd/0BIv+/j/APxVdZRQByf/AArPwd/0BIv+/j//ABVH/Cs/B3/QEi/7+P8A/FV1lFAHJ/8ACs/B3/QEi/7+P/8AFUf8Kz8Hf9ASL/v4/wD8VXWUUAcn/wAKz8Hf9ASL/v4//wAVR/wrPwd/0BIv+/j/APxVdZRQByf/AArPwd/0BIv+/j//ABVH/Cs/B3/QEi/7+P8A/FV1lFAHJ/8ACs/B3/QEi/7+P/8AFUf8Kz8Hf9ASL/v4/wD8VXWUUAcn/wAKz8Hf9ASL/v4//wAVR/wrPwd/0BIv+/j/APxVdZVLV9Si0fRr3U5wTFaQPO4HUhVJwPfigDk77wR4A00ot3ptvG8n3I/MkLv9FByfwFGn+CPh/q0cj2OnW8wjbZIBLIGRvRgTkH60fDW1ub/R/wDhK9XG/VdY/ffN/wAsYM/u409Fxg++c1R0aV5/jz4g+xg/Y4tKijuyjZUz7lKZH94LvH50Aeax/BaAfF46GdQzp6Ww1TG07jEZSnl/XI6+leyf8Ky8Hf8AQEi/7+P/APFVSX/kvMv/AGLCf+lTV3VAHJ/8Kz8Hf9ASL/v4/wD8VR/wrPwd/wBASL/v4/8A8VXWUUAeZ+L/AISaXqukLY6DYWtjNNIBLdSO7eWg5O1c8k9KPDXwN8J6FDm6jn1O6YYaWeQoo/3VUjA+uT71qNrf9sX2v3d1eS2egaE7W7eTKYnmmVQzksCCFXcoAB5Oc+lXvh0dRm8E2N9qt3Lc3l/uu2eRycLIdyKB/CAm3gcZzQA3/hWfg7/oCRf9/H/+Ko/4Vn4O/wCgJF/38f8A+KrrKKAOT/4Vn4O/6AkX/fx//iqP+FZ+Dv8AoCRf9/H/APiq6yigDk/+FZ+Dv+gJF/38f/4qj/hWfg7/AKAkX/fx/wD4qusooA5P/hWfg7/oCRf9/H/+Ko/4Vn4O/wCgJF/38f8A+KrrKKAOT/4Vn4O/6AkX/fx//iqP+FZ+Dv8AoCRf9/H/APiq6yigDk/+FZ+Dv+gJF/38f/4qmv8ADTwgqMV0OJmA4XzXGf8Ax6uuqG6t1urZ4WkljDjG6JyjD6EcigDxzSf2f9Pn1SbU/ENzuEshkWwsiVjQE8KXPzEAccY+tevabpllo9hFY2ECwW0QwiLk4/OuE8Am+161L3uvX0x0e+kt4/LlwLpATteU4y4KkEdu9ejUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVR1rS4db0S+0udisV3A8LMOqhhjI9x1q9RQBx2h2vivRvDVroQs7CW4s4Vt4b5rgiJkUYVigXdnAHy9Mj71aXhXwvD4as5wZ2ur+8lM95duMNNIe/sB0A7Vv0UAcKv8AyXmX/sWE/wDSpq7quSXSb0fF6TWfIP2A6CtqJs8eaJ2bb+RzXW0AFFFFAHH3Pw50m6i1iB7m9FrqkrTy26y4RZGABdRjrwPaul03T4tLsIrSFnZIxjc7ZY/WrdFABRRRQAUUUUAFFFFABRRRQAUUUUAFZ2q6QmrGAS3VzFFGxLxwybRKCMFW9RWjRQBi2Hhiw07XLzVbcyrJdFWeLd+7Vgu3cF9doAraoooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/9k=']	['phy_927.jpg']
phy_928	OPEN	As shown in <image_1>, a freely movable smooth circular-arc track }M\text{ rests on a smooth horizontal ground; the bottom of the arc is horizontal. A short distance to its right lies a clockwise-rotating horizontal conveyor belt whose length is }L_{BC}=\frac{5}{8}\,\text{m}.\text{ To the right of the conveyor belt is a rough horizontal track. A light spring has its right end connected to a fixed stopper; when the spring is at its natural length, its left end is exactly at point }C.\text{ A small block of mass }m=0.1\,\text{kg}\text{ is released from rest on the circular-arc track at a height }h=0.6\,\text{m}\text{ above the horizontal ground, slides down, passes the conveyor belt, and then compresses the spring. The mass of the circular-arc track is }M=0.3\,\text{kg},\text{ the speed of the conveyor belt is }v=5\,\text{m/s},\text{ the spring constant is }k=4\,\text{N/m},\text{ and the coefficient of kinetic friction between the block and both the conveyor belt and the rough track is }\mu=0.4.\text{ The spring always remains within its elastic limit, and the period of simple harmonic motion for the spring-mass system is }T=2\pi\sqrt{\frac{m}{k}}.\text{ Find the total time during which the block and the spring are in contact. (A possible mathematical relation: if }\sin\theta=b,\text{ then }\theta=\arcsin b.\text{)}		$\frac{\sqrt{10}}{20} (\pi - \arcsin \frac{1}{6} + \arcsin \frac{1}{4}) 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phy_929	OPEN	As shown in Figure A<image_1>, a mass A that can be regarded as a particle is located at the leftmost end of a wooden board B with a smooth bottom. A and B move left on the horizontal ground at the same speed\(v_0=7\,\text{m/s}\).\ At the moment (t=0\), B elastically collides with the static long wooden board C, and the collision time is extremely short. B and C have the same thickness. A slides smoothly to the right end of C. After that, the\(v-t\) image of A is as shown in Figure B<image_2>. At the moment\(t=1.9\,\text{s}\), C collides with the left wall. The collision time is extremely short. The speed of C before and after the collision remains unchanged, but the direction is opposite; During the movement, A never leaves C. The masses of A and C\(m_A=m_C=0.1\,\text{kg}\) and the magnitude of the gravitational acceleration\(g=10\,\text{m/s}^2\) are known. Ask: What is the amount of heat\(Q\) generated by friction between A and C 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'phy_929_2.jpg']
phy_930	OPEN	As <image_1>shown in the figure, radius\(R=1.8\,\text{m}\) is vertically fixed with a smooth quarter-arc track, mass\(M=2\,\text{kg}\), length\The wooden board of (L_1=2.9\,\text{m}\) is stationary on the rough horizontal ground. A small slider B with a mass of\(m_1=2\,\text{kg}\) is placed on the left end of the wooden board. The end of the circular arc track is tangent to the upper surface of the wooden board. The distance to the right side of the wooden board\(L_2=0.3\,\text{m}\) is a fixed platform, and the height of the platform is the same as the thickness of the wooden board. Slider A, whose mass\(m_A=2\,\text{kg}\) is released from rest from the highest point of the arc-shaped track, elastically collides with slider B when sliding to the bottom end. The wooden board moves to the right and stops immediately after colliding with the platform. It is known that both slider A and slider B can be regarded as particle particles, and the dynamic friction coefficient between the board and the board is\(\mu_1=0.5\), the dynamic friction coefficient between the board and the horizontal ground\(\mu_2=0.1\), and the gravity acceleration\(g=10\,\text{m/s}^2\). Ask: Total time for slider A to move to the right on the wooden board\(t_A\);		0.6s	phy	力学_机械能及其守恒定律	['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9lT0Xueaf4m0LU/El/b6QzLbeHBGHvGjfElwc8QgD7q4AJPfOK6uigDl/EWkateWdloWhmHTtLdTHd3MZ2vDCAAI4lHQnpnsB9KdqWj6hpvhq10TwjHBZDIh89j/wAe0f8AE4H8Tf1OTXTUUAczFoM/hfwjLYeGII5b88iS5fmSRiN0sjdzyW98YpNH8OP4V0K+lskGo65cBp555n2tdTY4BY/dXsB0Arp6KAOX8M+GZ9J+1avqciXviG9XNxMOFUDpEmeiD9epqLw74bvjq0niPxI8cusSKUghjOY7KI/wJ6sf4m7/AErraKAOQtPDV7q3idtc8R7GWzkZdMsUbdHCOnmt6uR+VGoeHL7xL4n8zW1jGg2Dq9pZq24XMmM+ZIPQHgL7Zrr6KAOS8RaDqfifV4tOumSDw1GqyTqj/vLx8/6s/wB1Bjn1qXxNo+raslpomnSrp+juhW9nibEgjGAIox2yOCewrqKKAOZ1fSNRtfD9nofhVYbCEkQvODg20OOWQd27D3OaR9DufDXhAaX4RtYBc5CrJcPgAsfnmc9WI5OO9dPRQBzOm+H5fCvhq7TSIlvtYmzNJNcPtNzOf4nb09uwo8N+GZtCt7vUbuUahr94N9zcn5QxA+WNP7qDoB+NdNRQByfhnwzdRahL4i8QulxrtwuwBTmO0i7RR/1Pc0zTPDd7qHiN/EPiRY2uLd2TTbNW3x2qZxv93Yd+1dfRQByE3h3UPEHik3uvCJdJ0+UHT7FG3CVx/wAtpPcdl7YzTtd8Paj4o1xLTUHWLw1bhZGgjf5r2Trtf0QccdzXW0UAct4n0TU9ektdFgkWz0F0P26SJ9skijgQqB0BHU+nFO13SdU/smx0Lw0sOn2T/up7hThraEDpGvdj0z26109FAHM3WjXuh+FIdH8HwW8EoIiWWY8Qg/elI/jbvjuTRZ6BN4V8LXFtoES3epvmRprl8GeZuru36/hiumooA5nw/wCGn8Oade3hb+0teu1MtzcyttM8gHyoD/Cg4AHYVH4X8M3FldT69rbpc+ILtdsjjlbePqIo/RR3Pc11VFAHI6F4d1C61xvEnibyjqK7ksrWNt0dlGeOD3cjq3vikXw3f634pOqeITH9isZT/ZtgjbkyP+W0nq3oO34119FAHI6z4cvvFHiFYtWKL4ctCkkdqj5N5L1zIP7qn+Huaf4m0PVPEd/b6RuS18OeWHvHjfElwc8QgD7q4AJPfOK6uigDmPEWk6td2VloehNFpumuvl3VzGdrwwgABIlHQnpnsKXUNHv9L8M22i+EY4LPkQ+c5/494z96QD+Jv6nNdNRQBzMOgzeFvCMtj4YgSbUDyJLqTmWRiN0sjdzyW98YpNG8OP4W0O+ls0Go65cgzXE8zbWupscAsei9gOgFdPRQBy/hjw1caUbnWNVlS98Q3q/v5hwqDqIo89EH69TUXh7w1evq8niTxI6Tau4KW8CHMVlEf4U9WPdu/wBK62igDkLbw1e6t4pbW/EfltHZSsul2SNujiHTzm9XI6elGoeHb/xL4n362sS6BYur2tmrbvtUmAfMkHoDwF9s119FAHJ+I9B1TxPq0Wm3Lpb+Go1ElwqP+8vHz/qz/dQY59ak8S6NquqxWeiabKtho8ilb2eFtsgjGAIox23DjPYV1FFAHM6tpGo2fh600PwokFjEWEDz5x9mhwcso/ibsPc5pG0O58NeERpfhG1g+1ZCrJcPgbmPzzOerHv7/pXT0UAczpnh+Xwt4cu10tBf6xMDNLNcPtNzOe7N2Ht2FHhrwzLokN1qV7MNQ1+8G+5uW4BIHyxp/dQdAPxrpqKAOT8NeGbqPUpfEfiFkn12ddiqp3R2cXaOP+p7mmaZ4cvtR8SN4h8SLEZrd2TTbNG3pbJnG/PQuw79hXX0UAchP4c1DxB4pN5r3lDR7CUNYWKNuErj/ltJ9Oy9utO1/wAPaj4o1uOz1B1i8NQBZHhjf5r2TOQr+iDAOO5rraKAOW8T6JqmuPa6LbOtnoToft0sT7ZHUcCFQOgI6n04p2u6Tqi6RY6F4ZWDT7N/3M9wpwbaED/lmvdj0B7da6eigDmbnRr3QvCcWj+EIbeGUERrLMeIgT80p/vt1PuaLHQJfCvhe5g0KJbzVJMyNNdPhriZuru36/hiumooA5jw/wCGn8Oafe3pP9o6/dqZbm4kbaZ5APlQE/dQcADtTPC/hq5s7qfXtceO58QXabXZeUt4+oij9AO57muqooA5HRPDl/d663iTxKY2v0LJY2kbbo7OM8cHu7Dq34Un/CN32ueKTqfiEp9gsJc6bYI25Cw/5bSereg7fjXX0UAcjrXhy+8UeIVg1XYvhu02SJbK+TeS9f3g7Ip/h7mn+JtE1XxFe2+kB0tfDvl77x43xLOc8QgD7q4GSe/SurooA5jxDpOrXVhZaHoLxabpzjy7m5jOHhhAxsiXsSOM9qW/0a+0nwvb6L4RigtDkQ+c5/1CH70mP4m/qa6aigDmIdBm8K+EZrLwxbRz6gfm8y5kwZZWI3SyN3PJb8MUui+HJPDGi3s1qo1HXLkGa4uJW2tczY4Bbso6AdAK6aigDl/DHhm40trnWNWlS98QXi/v5Rwka9RFHnog/Xqah8P+Gr2TWH8SeJGSXVmBS2gRt0VlEf4U9WPdu9ddRQByMHhu91fxU2teIhG0NlKw0uyVtyRjp5zerkdP7v1pNR8O6h4l8TbtaES+H7F1e2tFbd9qkxnfIP7oPAX1Ga6+igAooooA/9k=']	['phy_930.jpg']
phy_931	OPEN	As <image_1>shown in the figure, a conveyor belt with an inclination angle of (theta=30^{circ}) and a sufficiently long belt always runs at a constant counterclockwise speed at the speed of (v=6,text{m/s}), and a block A that can be regarded as a particle is placed on board B of unknown length (A starts at 1 from the right end of B,text{m}), and both are released from rest at the same time, and the distance between the plank and the bottom end of the conveyor belt is (d=4,text{m} There is a fixed baffle at the bottom end of the conveyor belt, and the plank B bounces back at an equal speed immediately after colliding with the baffle. The mass of plank B is (m_B), the mass of block A is (m_A), and the mass of (m_A=m_B=2,text{kg}), the dynamic friction factor between plank B and the conveyor belt (mu_1=frac{sqrt{3}}{4}), and the dynamic friction factor between block A and plank B (mu_2=frac{sqrt{3}}{6}), let the maximum static friction equal to the sliding friction, and take the gravitational acceleration (g= 10,text{m/s}^2), regardless of other resistances. Find: If the plank $B$ does not fall from $B$ during the release to the first time it reaches the highest $A point, the minimum length of the plank 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phy_932	OPEN	As <image_1>shown in the figure, the inclined plane with an inclination angle of (theta=30^{circ}) is fixed on the horizontal ground, and the block A with mass (m_1=1,text{kg}) is located at the bottom of the inclined plane, and is connected to the block B with a mass of (m_2=2,text{kg}) by a light spring with a stiffness coefficient of (k=20,text{N/m}), and the sliding friction factor between blocks A and B and the inclined plane is  (mu=frac{sqrt{3}}{3})。 At the beginning, blocks A and B are stationary on the inclined plane, and the springs are in their original length. Now lock block A, block B moves downward along the inclined plane at the speed of (v_0=5,text{m/s}), and in the subsequent movement, whenever block B decelerates upward along the inclined plane to zero, it immediately locks on block B and releases block A at the same time; Whenever Block A slows down to zero along the inclined plane, it immediately locks on Block A and releases Block B. Knowing the gravitational acceleration (g=10,text{m/s}^2), it can be considered that the maximum static friction force is equal to the sliding friction force, and the elastic potential energy of the spring (E_{mathrm{p}}=frac{1}{2}kx^2) ((k) is the stiffness coefficient of the spring, and (x) is the deformation of the spring). Find: The distance of the final block B from its initial position.		1.6m	phy	力学_机械能及其守恒定律	['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phy_933	MCQ	A classmate observed the change in the position of the speedometer pointer in the car. At the beginning, the pointer position was as <image_1>shown in the picture, and after $6\,\text{s}$, the pointer position was as <image_2>shown in the picture. If the car moves in a straight line with uniform speed changes, then ()	"['A. The acceleration of the car is approximately $10\\,\\text{m/s}^2$', 'B. The acceleration of the car is approximately $2.8\\,\\text{m/s}^2$', ""C. The car's displacement during this time is approximately $50\\,\\text{m}$"", ""D. The car's displacement during this time is approximately $100\\,\\text{m}$""]"	B	phy	力学_运动的描述	['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'phy_933_2.jpg']
phy_934	MCQ_OnlyTxt	The object accelerates uniformly along a straight line from the point $O$from rest, and passes through the two points $A$and $B$in turn. The acceleration of the object is $a$. If the time taken to pass through the $OA$segment is $\delta$, the displacement through the $AB$segment is also $\delta$. The following statement is correct ()	['A. The velocity of an object at $A$is $a\\delta$', 'B. If the time it takes for the object to pass through the $AB$segment is $\\frac{\\delta}{2}$, the size of $a\\delta$is $\\frac{5}{8}$', 'C. If the size of the displacement traveled by an object through the $OA$segment is $\\frac{\\delta}{5}$, then the size of $a\\delta$is $\\frac{3}{2}$', 'D. The ratio of the average speed of an object through the $OA$segment to the $AB$segment is $1 + \\sqrt{1 + \\frac{2}{a\\delta}}$']	A	phy	力学_运动的描述	['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dRzJJwcYzxkd+1eLEk4yScVseEP8AkddB/wCwjb/+jFoA+qfiX8Q7HwEumG90g6j9sMuzDquzZsz1B67h+VeH/Ej4q6b448OQaZZ6C1hJHdLOZS6nICuu3gD+8Pyrr/2mf9X4Y+t1/wC0q+fqAPpT9nO1t5vBeqPLbxO/9oEbmQE48tOP1NfNdfTX7N//ACJGqf8AYRb/ANFpXzLQB6V8JfhifHeoy3uoM8ei2jBZShw0z9fLB7cck+49cj1HXvin4N+Gk0mheG9Eiubm3+SZbYiKNGHUNJglmHfg+5zV/wAOynwR+zxHqNoEW5Gntdq5HWWXlSfXG5R+Ar5Xd3kkaSRizsSWZjkknuaAPoGw/aStbibydX8Mslq/DtBcCQgf7jKAfzq/40+GXhvx34W/4SfwTHDHeNGZUS2XbHc46oU/hfr6c8H1HzbXvf7NmtTfadZ0J3Jh8tbuJT0Ug7Xx9cp+VAHghBBweDX014F8Or4m/Z4h0y3igW7uknjWV1HB+0NyT14H8q8R+JumR6R8Stfs4lCxi6MqqBgKHAfA9hur6A+Et9/ZfwKi1Dj/AEWK7n56fK7t/SgDn7/xl4L+DIGg6DpA1PWIlAurgsqNuPOHkwTnvtAwPar3hT486N4o1GPR9c0kaf8AaiIkkaUTQuxOArAqNoP4j1xXzXd3U99eT3dzI0txPI0kkjdWZjkk/iaiBIIIJBHQigD2D45/Dyx8L3lrrmjQLb2F65imgQYSKXGRtHYMAeO20+vHA+A/DH/CYeM9O0VpGjhnctM6jlY1BZse5AwPcive/jBKdU+BtlfzfNK/2S4yf7zLyf8Ax41438INetPD3xJ066vpFitpQ9u8rHATeuFJ9Buxk9qAPZ/F3xB8O/CHyPD2gaBDJdGMSPGjeWqKehdsFmY479u9Z3hb456d4t1WHQPEegwQw3riFH3iWIs3AV1YdCeM89fxpfjB8JNW8U60PEOgGKed4ljntXcIzbejKx4PGBg46d814HrHhnXPDsuzV9KvLI5wrTRFVb6N0P4GgDtPjP4HsvB3imGTSwE0+/RpEh3Z8lwfmUf7PKkfUjtXm1BOTk9aKACiiigAooooA9j/AGb/APke9T/7Bjf+jY65n40/8lc13/eh/wDREddN+zf/AMj3qf8A2DG/9Gx1zPxp/wCSua7/AL0P/oiOgDvf2Z/+PzxJ/wBc7f8AnJXkvjv/AJKF4l/7Ct1/6NavWv2Z/wDj88Sf9c7f+cleS+O/+SheJf8AsK3X/o1qAOfr6Y1X/k1iP/sHW/8A6NSvmevpjVf+TWI/+wdb/wDo1KAPmeut+F//ACU7w7/1+JXJV1vwv/5Kd4d/6/EoA7/9pP8A5GjRv+vJv/QzWR8DfA1l4s8RXd/qkSz2OmKjeQ33ZJWJ2hh3UBWJHfjtmtf9pP8A5GjRv+vJv/QzVr9m3WbeDUda0aaVVnuVjngU8F9m4OB68Mpx7GgC/wDEj433uha3ceH/AAtBbxiyJhmuZY92HHBVF6ADpkg8jp6+ZTfGHx9OxZvEcy57JDGg/Ra2PiV8L/E9j4x1O9sdKu9RsL25kuIpbSIykb2LFWC5IIJxk9ah8E/BnxH4i1OJ9WsLjStKRg08t0hjkZR1VFPOT6kYH6EA9b8R3l7qH7NT3uozPNd3GnwyySP1YtIhz+RFeJ/B2dLf4saA7kAGWROfVonUfqRX0B8SLjT7r4IarJpTI1gLaNIDH93YsqqMe3HFfKOl6jPpGrWepWpxPaTJNGT/AHlII/lQB7B+0nasnirRrsg7JbIxD0yrkn/0MV4pX1n4r0XT/jN8OLW70i4iS5GJ7Z3OfLkxh4nx09D7gHkV87Xvw08a2F21tL4Y1N3Bxugt2lQ/8CTI/WgDntPtHv8AUrWzjBL3EyRKB1JYgf1r6T/aPGPAWmj/AKiaf+ipK5b4b/DSfwjO3jbxqEsLTTUaWG3kILl8YDMB0I7L1LY6d+o/aOO7wDpjDvqSH/yFJQB53+zzOkXxKkRjgzafKi89TuRv5Ka6z4rfFHxd4P8AHM2mabcW6WRgjliWS3VjyMHk+4NeM+DfEUnhPxfputorMttLmRF6tGRtcD3Kk19E/FDwPF8T/Den674bngnvYoy0DbgBcRNzs3diD0z0JIOKAPJv+F9+O/8An8s//AVaP+F9+O/+fyz/APAVa5WTwB4wjujbN4Y1fzQcYWzdh+YGMe+a9f8Ahz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0weOvXoAeLeJ/FGp+L9XOqatJG90Y1jzGgQbR04H1pugeKNb8LXhutF1KezkON4Q5V8dNynhvxFSajJ4eHjKSSwt7k+H1uxtieT940IIzz1GRnGeRkZz1r2L4g/Bewn8O2Gq+ALPzgq7pYknaQ3EbAFXUsTkj0HUH2oAzdC/aO1q2dI9c0u1vYhw0luTDJ9ccqfpgV3Xifw34X+LfgSXxFosCR6kImeG4CBJDIoyYpcdfTvjIIOOvztH4M8US3It08OasZicbPscgI+vHFfRvgzTJvhX8HL+fXnSK5Pm3bQlwdrsoVI8jgk7V6d2oA+VqKKKACvpr9nb/AJJ1qv8A2EZP/RMdfMtfTX7O3/JOtV/7CMn/AKJjoA+Za+mP2brlG8F6ragjzI9QMhHcBo0A/wDQDXzPXpXwX8cQeD/FjwahL5emakqwzOTxG4PyOfYZIPs2e1AHBazZtp+uX9k4Ie3uZIjnrlWI/pVKvoT4v/CTUNa1Z/E/hmFLo3Cg3VrGQGZgMeYnZsjGR1zzznjxyLwH4vmuBAnhjWPMzjDWUigfUkYFAFn4aWkl78TPDkUQJZb6OU/RDvP6Ka9N/aXuEbUfDtsGHmRxTyEegYoB/wCgmt/4T/DJvAkdx4p8UywW12kJCRtINtqn8TM3TcRxx0GeuePGPiX4w/4TbxrdanFuFmgEForDBES5wT9SWb8cUAdP+z3/AMlLb/rwl/mtZ3xzJPxZ1XJ6RwY/79LWj+z3/wAlLb/rwl/mtZ3xy/5K1q3+5B/6KSgDzqiiigArqfhxrq+HPiFoupSECFJxHKT0COCjH8AxP4Vy1FAH0P8AtHeGpZ7TTPEsCFlt82tyQM7VJyhPtksPqwr54r6W+FfxD0rxj4aXwd4ndHv/ACjbqJz8t5FjAGf74HHqcAjnOOL8ZfAHXdMu5bjw1jU7BiWWEuFmiHoc4DfUcn0oA8dorqB8OPGhl8v/AIRfVt3qbVsfnjFegeCvgBrF9eRXXinbYWKEM1skgaaUemVJCj3zn2HWgDrP2edAbSvC+peIbweUt84WIvxiKPOWz6Fif++a8D8Wa0fEXizVdXxhbu5eRB6Jn5R+WK9r+MHxJ03TdCbwT4XlQEKLe6eD7kMQGPKU9yeh9BkdTx8+UAfTXgf/AJNj1H/sHaj/AO1a+Za+mvA//Jseo/8AYO1H/wBq18y0AFfTXxL/AOTd9N/69rH/ANBWvmWvpr4l/wDJu+m/9e1j/wCgrQB8y19NftCf8kx0n/sIw/8AomWvmWvpr9oT/kmOk/8AYRh/9Ey0AfMtfUUrf8LU+AJf/W6nBBuPdvtMPX8XH/odfLte3fs6eJvsmuX/AIcnfEd6n2i3BP8Ay0QfMB9V5/4BQBlfs/8Ahr+1/HD6tMmbfSot4JHHmvlU/TefqBWX8a/E3/CRfES6iifdaaaPscWDwWU/Of8AvokfRRXuUthY/CHwD4l1K2KeZNczXEAx0Zzthj9wvH618lO7SSNI7FnYksxOSSe9ADaKKKAPqDxv/wAmx23/AGDNO/8AQoa+X6+oPG//ACbHbf8AYM07/wBChr5foAK1/DHhy+8WeIbTRtPTM1w2C5HyxqPvO3sB/hWQASQAMk19NeA9BsfhF8O7vxTrybdUuIgzxnh1B+5Av+0Tgn368LmgDs7PWvDXgS58P+BftTLcTQ7LcOc9Ohc54LtnHvxxxXzp8XPAMngrxO0tsjNpN+zSWznnYf4oyfUZ49QR71yWveIdQ8ReIbnW72Ym8nk8zKkjZj7oX0AAAH0r6M8K6rp/xp+Gdxomruo1a2ULK+PmWQD93Oo9+c/8CHQigD5er6b8B/8AJtGof9g/UP8A2pXzprmi3vh7WrvSdRi8q6tZCjjsfQj1BGCD6GvpD4Rwrr/wKutHgkUTOl3Ztk/dZwxGfThxQB8v0V07fDnxot49qfC+qmRDgkWzFPwfG0j3BrmpI3ikaORSjoSrKwwQR1BoAbRRRQB9QfH1DqHwrsbuD5okvYJyR/daN1B/NxXy/X1F8O9U034m/CaTwvqEwF3bW4tJ143BV/1UoHfGF/FTXiPiL4VeMPD1/Jbvo13ewhiEubKJpUcdj8oJX6HFAHF19Q+HbSSz/ZhnjkBDNpN5L+DmRh+hFeTeDPgz4m8R6lCdSsLjStMDAzTXKGNyvoiHkk+uMD9K+gvE0+mz/CLXl0hkaxt9NubaLy/ugRK0ZA9QCpGfagD41r6b+IymT9nLT2XkLaWDE+2EH9a+ZK+q/BotPiR8Co9EM6rMlqLGTPPlSR48skenyo1AHypWx4StmvfGWh2qfelv4EHtmRa1NW+GfjLR7+S1m8PX8+1tqy2sDTRv6EMoPX869K+GPw8m8HPL448Zxiwt7GItbW8uDJvPG4jsecBepJ7YGQDT/aW/5Bfh7/rvN/6Ctcb+zzOkXxKkRjgzafKi89TuRv5Ka7T9pZc6P4fbsLiYf+Or/hXiPg3xFJ4T8X6braKzLbS5kRerRkbXA9ypNAHs3xW+KPi7wf45m0zTbi3SyMEcsSyW6seRg8n3Brif+F9+O/8An8s//AVa9Z+KHgeL4n+G9P13w3PBPexRloG3AC4ibnZu7EHpnoSQcV8+SeAPGEd0bZvDGr+aDjC2bsPzAxj3zQB1X/C+/Hf/AD+Wf/gKtcX4n8Uan4v1c6pq0kb3RjWPMaBBtHTgfWvafhz8GINLs7rW/HlvbrF5LBLOZxthXvI7A4Bx0we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phy_935	MCQ	<image_1>The speed-time image of a robot with a mass of $15\,\text{kg}$moving along a straight line is shown in the figure. The following statement is correct ()	['A. The distance the robot moves within $0 \\sim3\\,\\text {s}$is $18\\,\\text{m}$', 'B. The resultant force experienced by the robot in $0 \\sim3\\,\\text {s}$is $30\\,\\text{N}$', 'C. The acceleration when the robot slows down is $0.5\\,\\text{m/s}^2$', 'D. The kinetic energy of the robot in $3\\,\\text{s} \\sim11\\,\\text {s}$has been reduced by $480\\,\\text{J}$']	AD	phy	力学_运动的描述	['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phy_936	MCQ_OnlyTxt	China player Zheng Qinwen won the women's singles tennis gold medal at the Paris Olympics. During the game, Zheng Qinwen threw the tennis ball upright and completed the shot when the tennis ball threw $1\,\text{s}$. It is known that in the process of rising to the highest point, the ratio of the height rising in the initial $0.4\,\text {s}$to the last $0.4\,\text {s}$is $2:1$, and the gravitational acceleration is $g = 10\,\text{m/s}^2$. Regardless of air resistance, the distance from the tennis ball to the throwing point at the moment of hitting the ball is ()	['A. $1.2\\,\\text{m}$', 'B. $1\\,\\text{m}$', 'C. $0.8\\,\\text{m}$', 'D. $0.6\\,\\text{m}$']	B	phy	力学_运动的描述	['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phy_937	MCQ	<image_1>Automotive autonomous driving technology relies on sensors to sense the surrounding environment and make decisions in real time. In one test, a self-driving car brake urgently because it sensed an obstacle in front of it. The braking process can be regarded as a uniform deceleration and straight-line motion. Taking the start of braking as the zero point, and the $x-t$image of the self-driving car is shown in the figure, then the self-driving car ()	['A. The acceleration of the brake in the front $4\\,\\text{s}$is $4\\,\\text{m/s}^2$', 'B. The speed of the zero point is $40\\,\\text{m/s}$', 'C. The average speed in the first $4$seconds is $10\\,\\text{m/s}$', 'D. The average speed within $0\\sim4\\,\\text{s}$and $0\\sim8\\,\\text{s}$are 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phy_938	MCQ	<image_1>In the 100-meter final of the school sports meeting, Xiao Shen started behind but caught up and eventually surpassed Xiao Yao. The starting gun sounds at $t=0$. The picture shows a photo of the two of them at the moments of $t_1$,$t_2$, and $t_3$. At the moment of $t_2$, the two of them are moving hand in hand, then ()	"['A. Xiao Shen surpassed Xiao Yao because of his great acceleration', 'B. $t_2$The instantaneous speeds of Xiao Shen and Xiao Yao must be the same at the moment', ""C. During the period from 0 to $t_2$, Xiao Shen and Xiao Yao's average speed are the same"", 'D. During the period from $t_1$to $t_3$, Xiao Shen and Xiao Yao D have the same displacement']"	A	phy	力学_运动的描述	['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CiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP/9k=']	['phy_938.jpg']
phy_939	MCQ_OnlyTxt	The divers remain upright and start falling from rest with their feet down. Start with your feet at $5\,\text{m}$from the water. The following statement is correct ()	"['A. Athletes spend approximately $2\\,\\text{s}$', 'B. Athletes spend approximately $1\\,\\text{s}$', ""C. The athlete's speed when entering the water is about $5\\,\\text{m/s}$"", ""D. The athlete's speed when entering the water is about $1\\,\\text{m/s}$""]"	B	phy	力学_运动的描述	['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capNp+kfZxNDCZnM8m1doIHYHnLCudr2T9m/wD5HjU/+wa3/o2OgDy3xBod34a1270e/MZurVgshibcuSAeDgetZtdt8Xv+Sra//wBdl/8ARa1zOhaLeeItcs9I09A91dSCNAeAPUn2AyT7CgCPTNKv9ZvkstMs57u5f7sUKFj9eOg969L0z9nvxlfRCS7fTtPz/wAs55yz/wDjgYfrXrcjeF/gX4JUrF517P8ALxxLeSgc5P8ACg/JQe5PPh+v/Gnxrrlw7Ram2m25PyQWQ2bR/v8A3j+f4UAdHc/s3+J0XNvq2kynHIdpE/L5DXB+J/h14p8I7n1XSpVtlP8Ax9Q/vIvbLDp+ODRafErxrZTCWLxRqjMDnE1w0q/98vkfpXs3w4+NcfiW5Tw74tgtxPcjyorkIBHOTxskXoCenHB6YHcA+cK7Lwb8M9f8dWVzd6QbRYreQROZ5SpLEZ4wD2rpvjP8M4vCF/FrGjwsuj3bbWjBJFvL1x/ukdPTBHpXDaB428R+F7aW30XVZbOGV97qiqdzYxnkHtQB3H/DPXjX/nppX/gS3/xNH/DPXjX/AJ6aV/4Et/8AE1z3/C3fHv8A0Mlz/wB+4/8A4mvfvDniPV7z4AzeILi9eTVV069lFyQNwdGl2nGMcbR27UAeRf8ADPXjX/nppX/gS3/xNY/if4PeJ/CWgT6zqT2BtYCocQzFm+ZgowCo7kVW/wCFu+Pf+hkuf+/cf/xNUNY+Ini3X9Mk03VdamubOUgvEyIAcEEdBnqBQBzFFFFAF3R9P/tbW7DTfM8r7XcxweZjO3ewXOO+M123xR+Gcfw6/sry9Ue++3edndAI9mzZ/tHOd/6Vy3g7/kd9A/7CVv8A+jFr2X9pr/mV/wDt7/8AaNAHgFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHqGtfCOPSPhXB4z/tl5ZJba3n+y/ZwAPNK8bt3bd6c4ry+vprxp/ybBY/9g7T/AOcVfMtABRRRQB6h8M/hJF8QNDu9Sl1h7LyLnyBGtuJM/KrZzuH979K8vrd0Txn4j8N2slro2r3FnBI/mOkRGC2AM8j0ArCoAKKKKACiiigAooooAKKK9C+D3gzTvG3iy5stWSVrOCzaYiNyp3blUcj6n8qAPPaK1/Fen2+keL9a020DC2tL6aCIMckKrkDJ78CsigAooooAKKKKACiiigAooooAKK9a8c/DvRvDfwk8P6/bxTLqt41uLhmlJX54WdgF7cgV5LQB1/w48Ep498TPpD3zWSpbPOZFi3k4KjGMj+9+lUvHPhlPB/jK/wBBS6a6W18vEzJsLbo1fpk4+9jr2rO0XXtU8O3xvdIvZbO5ZDGZI8ZKkgkfoKi1XVb7W9Sl1HU7l7m8mx5k0nVsAKP0AH4UAU6KKKACiiigAooooAKKKKACiiigDtfB3wt8Q+ONLm1HSWs1t4ZjA3nylTuChjgAHjDCuOnha3uJYHxvjco2OmQcV9Lfs3t/xQ+pr6akx/8AIcf+FfNuoNv1K6b1mc/qaAK9FFFABRRRQAUUUUAFFFFABRRRQB1Hw70/SNX8eaXpuuRNJY3chhZVkKHeykJyOfvbfzrf+Mngex8E+J7SLSYXi067thIiu5fDgkMMnn+6fxrz6zupbG9gu7dts0Eiyxt6MpyD+Yr6N+OFtF4n+FukeKLVciFo5weu2KZQCP8Avry6APmyvofwZ8FND1j4Z219qFvL/bV9bPNFL5zKse7PlHaDg8bT+NeFeHtIl1/xFp2kw533lwkOR/CCcE/gMn8K+stR8VwaJ8TfDXhGAiO2nsZQyA8KePK/9FOP+BUAfH0sTwyvFIpSRGKsp6gjqK6DwF4eXxV440nR5FZoJ5gZwpwfLUFn57fKCM+9bPxi0H+wPiZqiIm2C8YXkXuJOW/8fDj8K7T9m/Q/P13VtckT5bWFbeIkfxOckj3AXH/AqAOa+M/hrw34S8QWGlaBavDJ9nM1yWmaTO44UfMTjAUn/gQro/C3w48Nan8EL3xPdWkr6rHZ3kySCdgA0e/b8oOP4RXnHxD13/hJPH+s6mr7onuDHCe3lp8in8QoP417n4H/AOTY9R/7B2o/+1aAPmWvprxT/wAmswf9g6w/9GRV8y19NeKf+TWYP+wdYf8AoyKgD5lr6a8U/wDJrMH/AGDrD/0ZFXzLX014p/5NZg/7B1h/6MioA+ZaKKKACvoX9mf/AI9fEv8Av238pK+eq+hf2Z/+PXxL/v238pKAOX8AeP8A/hDPidq9ley7dGv7+VJsniF95Cyf0Pt9BWp8e/h+LK7/AOEv0yL/AEW5YLfKg4SQ9JPo3Q+/+9XkXiX/AJGrWP8Ar9m/9DNfQHwa8Y2vjLwtceC9f2zzwQGNBIf+Pi36Y/3l4HrjB7E0AfNdeyfs3/8AI8an/wBg1v8A0bHXBePfB114H8U3GlTbntz+8tZiP9bETwfqOh9xXe/s3/8AI8an/wBg1v8A0bHQByPxe/5Ktr//AF2X/wBFrXc/s36Ilzr2ra1LGCbOFYYiezSEkke+Fx/wKuG+L3/JVtf/AOuy/wDota9b/ZrCf8I3rZB+c3iAj22cf1oA8v8AjP4jl1/4j6hHvJttOb7HCmeBt++fqW3fkPSvPq1PErO/irV2k++b2Yt9d5rLoAKUEqwZSQQcgjtSUUAfV1rMfiX8AnN0Q15JZOrseT58JOGP1KA/8Cr5Rr6j/Z7/AHvwyuUlH7v+0JlGf7uxM/zNfLrYDEA5GeDQAlfUHhL/AJNfuP8AsE6h/wChTV8v19QeEv8Ak1+4/wCwTqH/AKFNQB8v0UUUAFFFFAG14O/5HfQP+wlb/wDoxa+kviz4Cv8Ax9r3hixtnEFrAt091dMuRGpMOAB3Y84HsfSvm3wd/wAjvoH/AGErf/0YtfS/xy8WXPhrwOLexlaK81KX7OJFOGSMDLkH16D/AIFQBys2lfA7whJ9g1CZdQvYziRmeWdge4Pl/ID7YzV63+H3wo+IVjN/wjFwLa6RclraRw6ehaKTtn0A+tfNVafh7Xb3w1r1nq9hIUntpA4AOA47qfYjIP1oAu+MvCGo+CfEEuk6iAxA3wzJ92aM9GH5EEdiDWJb2813cxW1vG0s8ziOONBksxOAAPUmvpP496dba58OdO8R265a3kjkR+/kygcfnsrgv2fNCi1Px3PqM6KyabbmRARn94x2qfwG78cUAdToXwT8NeGdCGs/EDUF3AZkgE5jhjz0XcvzO30I9s9anhb4BX8osUW1jJO1ZHFzECT/ALZxj6k1wPxy8TXOt/EG504yH7FpeIIoweN2AXY++ePoorzKgD2n4l/BKPQtJl1/wxPJcafEvmT20jB2jT++jD7y+ueQOcnt4tX0n+zz4gl1bw1qfh69IlisGUwh+cxSbsp9AVP/AH1XgfirSV0Lxbq2lJny7S7kijyeSgY7f0xQBkUUUUAev/BLwD4f8aW+tPrlrJObV4RFsmZMbg+fukZ6CvLtatYrLXdRtIARFBcyRoCckKrED9BXu/7M/wDx5+JP+ulv/KSvDvEv/I1ax/1+zf8AoZoAy69u8BfDfw1rnwkvvEGoWksuoxpcskgnZQCinbwDjtXiNfTfws/5N/1L/rle/wDoJoA+ZK+gPDnwe8LeHPCyeIPiDckF4w727StHHDnkL8nzO/sD6jBxmvCNPkhi1O1kuADAkyNID3UEZ/Svpv49eH9V8ReELC50eKS7jtJjNLFD8xZCuA4A+9j27NmgDnra7+AupzLYfY0t9x2pLIs8Qz7vnj6niuR+LPwni8FQw6xo08k+jzuI2WQ7nhcgkcgcqQOD/PNeVsrIxVlKsDggjBBrpb/4g+KNT8Nx+HrzVGl0qONIlgMUY+VMbctt3HGB37UAc9b2813cxW1vG0s8ziOONBksxOAAPUmvf9C+CfhrwzoQ1n4gagu4DMkAnMcMeei7l+Z2+hHtnrXLfs+aFFqfjufUZ0Vk023MiAjP7xjtU/gN344qj8cvE1zrfxBudOMh+xaXiCKMHjdgF2Pvnj6KKAO+hb4BX8osUW1jJO1ZHFzECT/tnGPqTXO/Ev4JR6FpMuv+GJ5LjT4l8ye2kYO0af30YfeX1zyBzk9vFq+k/wBnnxBLq3hrU/D16RLFYMphD85ik3ZT6Aqf++qAPmyvUfhf8ILjxvH/AGrqc0lnoysVUxgeZcEdQueAB03YPPAHXHG654eex8eX3h63BymoNaw55yC+1P0Ir6H+LmrL4C+FlroekFoWuAtjE6HBSNV+c59SBj/gRNAGLeW3wJ8NTHT7lILm4T5ZCrT3BB75ZSVB9hVa6+GHw98e6XPceAdTS3v4l3CDzXKH/fR/nXPTI49jXz5Wr4c1+98Ma/aavp8hSe3cNgHAde6n2I4NAH0X8QLSew/Zugs7qJori3srGKWNuqsrRgg/iK+X6+tPjJdxX/wWv7yA5huFtpUJ7q0qEfoa+S6ACiiigD274L/Djw14y8M399rdpLPPFeGFCs7IAoRT0UjuxrxGvpr9m/8A5EjVP+wi3/otK+ZaAPa9C+GWiaz8Dv7ft7CebxBJHL5ZSVvmcTMigLnHQAVp2fw0+H3gLS7e4+IOpJPqUybvsqyPtX/dWP52x03Hj2rtfgzdJZfBiyu5c+XALmRseiyOTXzD4k1+88T+Ib3WL5yZrmQvtzkIv8Kj2AwB9KAPoXR/D3wX8cMbDR4IPtewkIjzQygDuAxG7H415B8T/hzN8P8AWYkime50y7Ba2mcfMCOqNjjIyOe4P1A4yxvbjTb+3vbSVori3kWWJ1PKsDkGvpb44+VrPwhsdV2AMJre5T2DqRj6fN+goA+YaKKKALmkpaSazYx6g+yya4jFw2cYjLDcfyzX1f8ADbTvh5a3eoS+CZ1mm8tFuSJZH2rk7fv+4PT0r5Er3n9mf/j+8R/9c7f+clAG1r2k/BSXxDqUmrXyrqTXUhul8+cYl3HeMDjrnpXhvjmDw/b+L76LwvIJNHUR+QwZmz8i7uW5+9upfH3/ACUTxL/2FLn/ANGtUXgzRV8ReNNI0l/9Vc3SLJ/uA5b/AMdBoA9H+G/wTGv6Umv+JrmSz0yRfMhhjYK8idd7Mfur+pHPHGemZvgFp8xsittIc7WkAuZRn/fGR+RxR+0R4jm07StL8M2REMF0DNOqcZRCAiYH8Ocn/gIr51oA+idd+CfhfxPoJ1fwHeqjspaKMTGSCU/3ctlkb6njoQO3z3c201ndS21zE0U8LmOSNxgqwOCD75r1H4B+JLjSvHsej+Z/oeqIyOhPAkVSysPfgr/wKk/aA0WPTPiILyFAqajapO+OnmAlG/RVP1JoA2vh58HtHn8Lp4r8aXTRWLxmaO38zy0EXZ3cc89QBjtzzitJNR+AbSfYvsIEZO3zjHc4/wC+s7vxrqfGmj3fiv4E2EHh5DMRa2syQRHmRFUZQDuR1x6rjrXyzNBLbTPDPE8UqHDI6lWU+hB6UAeyfE34Q6ZpPh0eKvCVw02mAK8sJk8wBGIAeNupXkZyT1zmsT4a6f8ADa70a7k8a3YivRcYhUyyL+72jn5PfPX0rmLb4g+KLPwufDcGqMmkGN4zb+VGcq+dw3Fd2OT371zNAH2Z47sfBkvhOyt/Fcoh0eOaMQHe6jeEYKMrz93dXi3jbTPhFb+EL+XwzeLJrChPs6ieZs/Ou7huPu7q7j9oD/klulf9hCH/ANEyV8yUAegfB7wrpPjDxpLp2swvNapZyTBEkKfMGUDkc/xGs34naFp/hn4iarpGlxNFZW/leWjOWI3RIx5PPVjXWfs7/wDJSLj/ALBsv/ocdYvxt/5K9rv/AG7/APoiOgDa+CPgXw/41fXBrltJObQQeSEmZMbvM3Z2kZ+6K1PDfwf0Sws7rxD45vvsOlLO621sZfLLoGIBc9eQOFXkjnNXP2Z/+PvxJ/1zt/5yVyfxz8UXGuePrjTd7Cy0r9xHHngvjLtj1zx9FFAHoGnD4C6nOunW8Vqru2xDP9pj3E/7bEY/EiuY+LHwbtvC+lt4g8PPK1hGwFzbSNuMIJwGVupXOAQckZznHTxivqb4e3r+KvgHc2l6xleK1ubIs3JIVTs/JSo/CgD5Zr0H4ZfC688f3ck8szWmkW7bZrgLlnbrsQHvjqegyOvSvPq+r7y5Hwv+BELWqbLxLNEUgc/aJfvN+BYn/gIFAGJqWhfBPwTJ9g1RYZr1OHV5JZ5Af9oJwp9sCs0+AvhZ8QbeWLwbqYsNVVCyRb5MMf8Aajk5I916V8/ySPNK8srs8jsWZ2OSxPUk9zU1jfXOmX8F9ZTPDcwOJIpEOCrDoaAPc9O+EGk2Hws1rUvEGnSjXbGG8YMJ3C5jDbCADgg4BHHINeCV9iarrq+JfghqWsonl/a9EmkZP7reWwYfgQa+O6APpX9m1v8AikdXX0vwf/Ia/wCFfNszb55G9WJ/Wvoz9m6Tb4Z13/Zulb/xz/61fOFABRRRQAUUUUAFFFFABRRRQAUUUUAFfS/wwdfG3wL1Dw5IQ09uk1mu48jI3xt9AWA/4DXzRXsv7OmufY/F9/o7viPULbeg9ZIzkf8AjrP+VAEP7Pfh5r7x1c6pNGdmlwHGR0lfKgf98765nxt4xmvPi3d+IrR9ws71fspzwVhIC/gduf8AgVe8XlhF8L/AvjTV4iqT3t3NcW5B5UyELEv4Fs/nXydQB9CftA6dDrHhjQPFtkN0RxGXHeOVd6E+wIP/AH1Wh4TP/CA/s6XWrn93d3kUlwh775SI4j+Ww/nUfgWM/ET4A3nh0srXtputoyx7qRJEfYdF/A1T/aD1KHSfDOgeFLM7Y+JWQdo412ID7HJ/75oA+e6+mvA//Jseo/8AYO1H/wBq18y19NeB/wDk2PUf+wdqP/tWgD5lr6a8U/8AJrMH/YOsP/RkVfMtfTXin/k1mD/sHWH/AKMioA+Za+mvFP8AyazB/wBg6w/9GRV8y19NeKf+TWYP+wdYf+jIqAPmWiiigAr6F/Zn/wCPXxL/AL9t/KSvnqvoX9mf/j18S/79t/KSgDw7xL/yNWsf9fs3/oZqLRdYvdA1m01XT5TFdWsgkjbt7g+oIyCPQ1L4l/5GrWP+v2b/ANDNZdAH1T4i0zTvjX8MINT0xUXU4VLwAnmKYD54WPoeP/HTXnv7OsUlv4/1eCZGjlj091dGGCpEsYII9a574P8Aj8+C/Ewt72UjR78iO4yeIm/hk/DofY+wr6Is/BcGnfE6bxZYbFh1CweG7jXoZd8bK4+oU59xnuaAPmf4vf8AJVtf/wCuy/8Aota9C/Zr1WKO+13SHbEs0cVzGPUKSrf+hrXnvxe/5Ktr/wD12X/0WtZHgzxRceDvFVlrVuu/yWxLFn/WRnhl/Lp74oA0/irokmg/EnWrdkKxzzm6hPYpId3H0JI/CuNr6s+IPgvT/iz4Ustb0C5ha/ji32sueJkPJiY9iD69DkHqa+YdW0bUtCv3sdVsp7S5Q8xypg/Ueo9xxQBRoor1T4Y/B/U/E2o2+pa1ay2mhxsJCJVKtdf7KjrtPdvTp7AHqngeMeCfgC2oXgMcjWk16wPBJfPlj6kbPzr5Xr3r49+Pbd4U8GaTJG0cZV75oyNqlfuxDHoQCfTAHrXgtABX1B4S/wCTX7j/ALBOof8AoU1fL9fUHhL/AJNfuP8AsE6h/wChTUAfL9FFFABRRRQBteDv+R30D/sJW/8A6MWvaP2mVfyvDLDOwNdA/X91j+teMeDQT448PgdTqVv/AOjFr6j+MPg2fxl4LaKwTfqNlJ9pt4+8mAQyD6g5HuBQB8g0U+WKSCZ4Zo3jlQlWR1IKkdQQehrovA/g6/8AGviS3020ifyN4a6nA+WGPPJJ9cdB3NAHvXjkGL9ma1SUYk/s3T1weu7MWf5Gua/ZnK/a/Eg43bLfHrjMn/1q0/2htftbDw3pnha1KiWV1meNT9yFAQoP1PT/AHDXBfAfxHDofxBW0uZAkGpwm2DMcASZDJ+ZBX6tQB6D4m+MPhvRPE+paZeeDVuLi2uGjeYiP94QfvcrnnrWV/wvbwl/0IyflF/8TWT8fPA91p/iNvE9nbu9hehftLKMiGYDHPoGAHPrn2rxmgD6Etf2hfD1jv8AsnhGS3343eS8absdM4XmvF/GGuxeJfFupazDA0Ed3L5giZsleAOv4V3PgL4LXfivw9d6vql3JpMBTNk7xgiTuXYHHyY6Hv16Dny+6hW3u5oUnjnSORkWWPO2QA43DODg9eaAIqKKKAPoX9mf/jz8Sf8AXS3/AJSV4f4mGPFesA9ft03/AKGa9g/Zq1GKPVNf0xmAlnhinQeoQsG/9GLXBfFjwzeeHPiBqhmgdbS9uHuraXb8rq53EA+qk4I9vegDh6+nfhfG0f7Pt8zDAkgvWX3GGH8wa+btK0q+1vUoNO022kubudtqRoMk/wCA9SeBX2DbaBD4Y+E91oMEqymz0yaORgeshRmY+2SxOPQigD4yr1TwN8cda8KWMOl6hapqmnQjbEGfZLEvZQ3IIHYEe2QK4Lwtoa+JfE1hozXsdmbyTylmkUsAxBwMD1OAPc10PxH+G178Pb61je4a9s7mPKXYh8td4zlCMnkDB68g+xoA9ji+IXwq+IDLb67YQ21zJ8obUIAhz7TIePxIri/ir8GrfwzpT+IfDssr6chH2i2kbcYgTgMrdSuSBg5IznJHTxivqOP7Tpf7Msqa3uSf+y5ECyDkB2IhB98MgoA5b9mcr9r8SDjdst8euMyf/WrX8TfGHw3onifUtMvPBq3FxbXDRvMRH+8IP3uVzz1rz74D+I4dD+IK2lzIEg1OE2wZjgCTIZPzIK/Vq1vj54HutP8AEbeJ7O3d7C9C/aWUZEMwGOfQMAOfXPtQBrf8L28Jf9CMn5Rf/E1Ytf2hfD1jv+yeEZLffjd5Lxpux0zhea+e69V8BfBa78V+HrvV9Uu5NJgKZsneMESdy7A4+THQ9+vQcgGFFrsHiT406frUcDW8N3rFtJ5TncVHmJnJH0r079phZDZeG2B/dCS4Df7xEeP5GvAyzaZq2+2uEma1nzHPHna5VuGGcHBxmvqT4gaTH8U/hPbanoyeddKq3trGpyS2MPH9cFhj+8ooA+UaKdJG8MrRyoySISrKwwVI6giuk8C+C9Q8beIoNPtInFsHDXVwB8sMeeST646DuaAPdvHKun7MtmsmQ407TwQe3MVfMdfW/wAaY4ovg3qcVuFEMf2dUCngATIAK+SKACiiigD6a/Zv/wCRI1T/ALCLf+i0r5lr6a/Zv/5EjVP+wi3/AKLSvmWgD6b8Csyfsy37KcMNO1Egjsf3tfMlfTXgf/k2PUf+wdqP/tWvmWgAr6a+Jf8Aybvpv/XvY/8AoK18y19NfEv/AJN303/r2sf/AEFaAPmWiiigAr3n9mf/AI/vEf8A1zt/5yV4NXu/7NDqNS8RRk/MYYCB7Avn+YoA8q8ff8lE8S/9hS5/9GtWz8Gio+LWg7sY8yXr6+U+Ky/iPbS2nxJ8RxzIUZtQmkAI/hdiyn8QQazvDGsnw94p0vVwCws7lJWUdWUH5h+IyKAPpz4l/ETRvBmsWdrqnhwam89v5iTEJ8o3EFfmB+v41xP/AAvbwl/0IyflF/8AE10nxs8JN4z8I2PiDQ1N5PZr5qiH5vOt3AJKjuRgEe2a+XyCCQRgigD6Ag+Pvhi1mWa38F+VKv3XjMSsO3BC1598UviFa/EHUNPurbT5bP7LE0bCRw27JB7VX+G3w5vvHushCJbfSYcm5u1Xpxwi54LHj6Dn61PFXg638NePB4b/ALat54vMjR7vYQIN5/jHqoOTgn8+AAa/gH4v654Gtxp/lR6hpQYsLaVirR55Oxh0z1wQR+Zr1WH4t/DXxoiWviXSxbyMNu6+tlkVT/syLkj64FeW/EX4R3/gHTrO/F6dRtpmKTypAUEDcbQeTweeeOn0rzmgD3v4hfBTS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phy_940	MCQ	As <image_1>shown in the figure, objects $A$,$B$bolted with light springs are placed vertically on the horizontal ground. The spring stiffness coefficient is $k$, and the mass of $A$is $m_0$. The mass $C$, which is also $m_0$, is released from rest from a height of $h=\frac{15m_0g}{k}$from $A$, and sticks together after colliding with $A$. Then when they move to the highest point, the elastic force between $B$and the ground decreases just to $0$. It is known that the elastic potential energy of the spring is $E_p=\frac{1}{2}kx^2$($x$is the deformation of the spring), the vibration period of the spring oscillator with a mass of $m$is $T=2\pi\sqrt{\frac{m}{k}}$, and the gravitational acceleration is $g$. Regardless of collision time and air resistance, the spring is long enough and the elastic force is always within the elastic limit. The following statement is correct ()	"['A. Block $B$has a mass of $2m_0$', 'B. The amplitude of simple harmonic motion after the mass $A$,$C$is stuck together is $\\frac{2m_0g}{k}$', 'C. After the collision of $A$and $C$, the time for the first movement to the lowest point is $\\frac{2\\pi}{3}\\sqrt{\\frac{2m_0}{k}}$', ""D. When $A$and $C$reach the lowest point, the ground's support for $B$is $8m_0g$""]"	AD	phy	力学_动量及其守恒定律	['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']	['phy_940.jpg']
phy_941	MCQ	A smooth semicircular groove with a mass of $M$is resting on the smooth horizontal ground. A small ball with a mass of $m$and can be regarded as a particle is released from rest at the same height as the center of the groove and the center of the center. The trajectory of the small ball's motion relative to the ground is a half ellipse, as <image_1>shown by the dotted line in Figure A. The image of the kinetic energy of a sphere over time during motion is shown in Figure B<image_2>. It is known that the ratio of the semi-major axis to the semi-minor axis of the ellipse is $3:1$. The following statement is correct ()	['A. The momentum of the system composed of a semicircular groove and a small ball is not conserved', 'B. Ratio of pellet mass to groove mass $m:M = 2:1$', 'C. At $t_1$, the ball is supported by the groove and the direction is perpendicular to the speed', 'D. At $t_2$, the support force of the ball by the groove is greater than the gravity of the ball']	ABD	phy	力学_动量及其守恒定律	['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', 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'phy_941_2.jpg']
phy_942	OPEN	As <image_1>shown in the figure, a slope $OAB$with a mass of $2m$and an inclination of $\theta$is fixed on the smooth horizontal surface. There are $n$blocks with a mass of $\frac{m}{2}$on the right side of the slope. The slider with a mass of $m$is released from rest from the top of the smooth slope $A$.$ OA=h$，$g=10m/s^2$。There is a fixed vertical baffle on the horizontal plane near $B$. The inclined plane is not fixed. After the slider moves until the bottom of the inclined plane collides with the horizontal plane, only the momentum in the horizontal direction is retained. After colliding with the baffle, the block returns at the original rate. At this time, the roughness between the block and the horizontal plane and between the inclined plane and the horizontal plane is changed. The dynamic friction coefficient between the inclined plane and the horizontal plane is $\mu_1=0.2$,$h=0.75m$,$\theta=45^\circ$. To enable the block to catch up with the inclined plane, find the maximum value of the dynamic friction coefficient between the block and the horizontal plane.		\frac{4}{15}	phy	力学_动量及其守恒定律	['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phy_943	OPEN	As <image_1>shown in the figure, the wooden board $B$with a mass of $m is placed flat on a smooth horizontal surface, and a small ball $A$with a mass of $2m$is placed at a height of $h $just above the leftmost end of the wooden board. At the initial moment, the small ball $A$is given a horizontal and right-to-right initial velocity $v_0$. During the fall, the small ball $A$hits the midpoint of the upper surface of the wooden board $B$, and the highest point of the motion trajectory of the $A$is equal to the initial position after collision. After a while, the small ball $A$collided with the wooden board $B$for the second time, hitting the leftmost end of the upper surface of $B$. It is known that all collision times are extremely short, the gravitational acceleration is $g$, regardless of air resistance, and the small ball can be regarded as a particle. After the second collision between $A$and $B$, in order to ensure that the small ball $A$collides with the upper surface of $B$for the third time. When it can just hit the rightmost end of $B$, an elastic baffle $C$is fixed at $d$(unknown) away from the rightmost end of $B$, what is $d$?		\frac{v_0}{3}\sqrt{\frac{2h}{g}}	phy	力学_动量及其守恒定律	['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phy_944	OPEN	As <image_1>shown in the figure, the left and right ends of a horizontal conveyor belt are smoothly connected to the horizontal ground. The ground on the left side is rough and the ground on the right side is smooth. The distance between the two axles of the conveyor belt is $L = 5.5m$, and the conveyor belt is driven clockwise at a speed of $v_0 = 3m/s$. There is a compressed light spring between $A$and $B$with a mass of $1kg$(the spring is not connected to the two blocks). The initial compression of the spring is $\Delta x = 25cm$, and the elastic potential energy is $E_p = 25.5J$. The dynamic friction coefficient $\mu$between the two blocks and the left floor and the conveyor belt is both $0.2$. Three identical small balls $1$,$2$, and $3$are arranged in turn on the ground close to the right end of the conveyor belt. The mass $M$is both $2kg$, and the distance $d$between two adjacent small balls is both $1m$. Now release the two pieces of $A$and $B$at the same time from rest. When $B$leaves the spring, it just slides onto the conveyor belt, and the timing begins at this time. The mass $A$,$B$and the three small balls are all on the same straight line. All collisions are elastic collisions, and the collision time is ignored. Both the mass and the small balls can be regarded as particle particles, and the gravitational acceleration is $g = 10m/s^2$. Request: The total heat generated by friction between the object block $B$and the conveyor belt.		\frac{32}{3}J	phy	力学_动量及其守恒定律	['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phy_945	OPEN	As <image_1>shown in the figure, there are two small blocks $A$and $B$with masses of $m_A = 2kg$and $m_B = 1kg$respectively on the smooth horizontal ground. They are connected with thin wires and the light spring in the middle is in compressed state (the spring is not bolted to the two blocks), and the elastic potential energy of the spring is $E_p = 0.75J$. The left end of the horizontal conveyor belt with a shaft spacing of $L_1 = 4.5m$is smoothly connected to the horizontal ground, and the conveyor belt rotates clockwise at a constant speed of $v = 4m/s$. Place a fixed ramp long enough with an inclination angle of $\theta = 30^\circ$on the right side of the conveyor belt, and place a small piece of $C$at a distance of $L_2 = \frac{128}{15}m$from the top of the ramp. Now burn the thin wire between $A$and $B$. After $B$is separated from the spring, it is rushed onto the conveyor belt. After moving $\Delta t = 1.5s$on the conveyor belt, it flies horizontally from the right end of the conveyor belt, just without collision. Slide into the inclined surface from the top of the inclined surface, and after a period of time,$B$and $C$collide.$ When t=0$,$B$and $C$just completed the first collision, and when $t=2.4s$, the second collision was just about to occur. The $v-t$image of $B$moving in $0 \sim 2.4s$is shown in Figure B <image_2>(with the downward direction along the inclined plane as the positive direction). B$,$C$Each collision is an elastic collision and the collision time is extremely short. Regardless of air resistance, the mass $A$,$B$, and $C$can be regarded as a particle. The gravity acceleration $g = 10m/s^2$, seek: $C$The maximum distance that slides down the slope is 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'phy_945_2.jpg']
phy_946	OPEN	As <image_1>shown in the figure, the number of turns of the coil is $n$and the area is $S$, and its two ends are connected to the two poles of the parallel plate capacitor $M$and $N$. There is a magnetic field in the coil that runs inwards perpendicular to the paper. The relationship between the magnitude of the magnetic induction intensity and time is $B_1=kt$($k$is the rate of change of the magnetic induction intensity and is unknown). The boundaries of the $I and II $areas with widths of $L$are vertical, among which the uniform magnetic field in $I $is perpendicular to the paper and outward, and the magnetic induction intensity is $B_2$. There is a uniform strong magnetic field in the horizontal direction in $III $. The uniform magnetic field in $II $is perpendicular to the paper and inward. An electron is released from rest from $P$close to the capacitor $M$plate. After being accelerated by the electric field, it is injected into the $I $area parallel to the paper. The angle between velocity and horizontal direction is $\theta = 30\circ $. When the electron exits from the right boundary of $I $, the angle between velocity and horizontal direction is also $30\circ $. It is known that the electric charge of an electron is $e$and the mass is $m$. Gravity is ignored and the influence of changing magnetic fields in the coil on the movement of the electron. If the electric field strength in zone II is zero, the electron can just return to zone II. The magnitude of the magnetic induction strength in zone III is unchanged,$B_2$, and a strong horizontal shim field to the right is added to zone II. The magnitude of the electric field strength is $E=\frac{eLB^2}{3m}$. The electron is still released from rest from $P$. Calculate the movement time of the electron in zone III ()		\frac{10\pi m}{9eB}	phy	电磁学_静电场	['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phy_947	OPEN	As <image_1>shown in the figure, the $O-xyz$coordinate system is established with $O$as the coordinate origin. The positive direction of the $x$axis is horizontal to the right, the positive direction of the $y$axis is vertical to the right, and the positive direction of the $z$axis is vertical to the paper outward (not shown in the figure). There are four areas from left to right along the positive direction of the $x$axis, and the boundaries between the areas are all parallel to the $yOz$plane. There is a uniform strong magnetic field in the negative direction of the $y$axis in Zone I, and the electric field intensity is $E_1= 15N/C$; there is a uniform strong magnetic field in the positive direction of the $x$axis in Zone II, and the magnetic induction intensity is $B_1=\sqrt{3}\times 10^{-2}T$; there is a uniform strong magnetic field in the positive direction of the $z$axis in Zone III, and the magnetic induction intensity is $B_2=\sqrt{3}\times 10^{-2}T$; There is a uniform electric field along the negative direction of the $y$axis and a uniform magnetic field along the negative direction of the $z$axis in the region IV. The electric field intensity is $E_2= 200N/C$, and the magnetic induction intensity is $B_3=0.01T$. The region IV is wide enough. The intersection point between the right boundary of Area I and the $x$axis is $O_1$, and the distance from the $A$point to the $O$point on the $y$axis is $h=0.1m$. A charged particle with a specific charge of $\frac{q}{m}=1\times 10^{4}C/kg$enters Zone I from point $A$at a velocity of $v_0=1\times 10^{4}m/s$in the positive direction of the $x$axis. It enters Zone II through point $O_1$and passes through the $xOz $plane for the first time. It passes through the $xOz $plane for the second time when entering Zone III. It passes through the $xOz $plane for the third time when entering Zone IV, and then continues to move in Zone IV. Regardless of the gravity exerted on the particle. Find: The distance between the charged particle and the left boundary of zone IV each time it passes through the $xOz$plane ()		4n\pi \times 10^{-2}\mathrm{m} (n=1,2,3......)	phy	电磁学_磁场	['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phy_948	MCQ	Taking the potential at infinity as $0$, there is an equipotential sphere with a potential of $0$near unequal charges. As <image_1>shown in the figure, the two points of charges $Q_1$and $Q_2$are located at $x_1$and $x_2$on the $x$axis respectively. The $B$point is the midpoint of the connection line between the two points of charges. The potential of each point on the dotted circle centered on the $A$point on the $x$axis is $0$, and the potential of the $B$point is $\phi_B &gt; 0$. The following statement is correct ()	['A. $Q_1$is negatively charged,$Q_2$is positively charged, and the amount of charge carried by $Q_1$is greater than the amount of charge carried by $Q_2$', 'B. The electric field intensity at each point on the dotted circle is equal, and the direction points along the radius to the center of the circle $A$', 'C. If you only reduce the amount of charge carried by $Q_1$, the radius of the dotted circle will decrease', 'D. If you only increase the amount of charge carried by $Q_2$, the center of the dotted circle $A$will be far away from $Q_1$']	C	phy	电磁学_静电场	['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phy_949	MCQ	As <image_1>shown in the figure, there is a uniform strong electric field with a horizontal direction to the left above the smooth insulating horizontal plane. The field strength is $E$, the mass is $m$, and the small ball with a charge amount of $+q$starts to move to the right at an initial speed of $v_0$. During the movement, the amount of air resistance to the small ball is proportional to its speed, and the direction is always opposite to the direction of movement. It is known that the acceleration of the ball at the beginning of movement is $a_0$($a_0 &gt; 4\frac{qE}{m}$), and the speed of the ball at the point of $P$is exactly zero. During the process of the small ball moving from the beginning to the return to the starting point, the following statements are correct ()	['A. The acceleration of the ball reaches the point of $P$', 'B. As the acceleration of the ball gradually decreases from $\\frac{1}{2}a_0$, the speed of the ball continues to increase', 'C. When the acceleration of the ball is $\\frac{1}{2}a_0$, the speed of the ball is less than $\\frac{1}{2}v_0$', 'D. When the speed of the ball is $\\frac{1}{2}v_0$, the acceleration of the ball is less than $\\frac{1}{2}a_0$']	C	phy	电磁学_静电场	['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']	['phy_949.jpg']
phy_950	MCQ	As <image_1>shown in the figure, two smooth $\frac{1}{4}$arc-shaped tracks of equal height have a radius of $r$and a spacing of $L$, and the track resistance is ignored. A resistor with a resistance value of $R$is connected to the top of the track. The entire device is in a vertically upward uniform magnetic field with a magnetic induction strength of $B$. There is an existing metal rod with a length slightly larger than $L$and an indeterminate resistance starting from the most position of the track at $cd$, and under the action of pulling force, it moves in a uniform circular motion to the right along the track at an initial speed of $v_0$to $ab$. Then during the process ()	['A. The direction of current through $R$is from outside to inside', 'B. The direction of current through $R$goes from inside out', 'C. The heat generated on $R$is $\\frac{\\pi rB^2L^2v_0}{4R}$', 'D. The amount of charge flowing through $R$is $\\frac{\\pi BLr}{2R}$']	AC	phy	电磁学_电磁感应	['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phy_951	MCQ	As shown in Figure A<image_1>, the metal rails with a spacing of $L=0.4\mathrm{m}$are placed at an angle of $\theta= 37\circle $to the horizontal plane. The upper end is connected with a fixed resistor $R_1=1\Omega$, and the lower end is connected with a fixed resistor $R_2=4\Omega$. There are two bounded and uniform magnetic field areas distributed between them: the magnetic field in Region I is perpendicular to the track plane downward, and the magnetic induction intensity $B_1=3\mathrm{T}$; The magnetic field in region II is parallel to the orbit downward, and the magnetic induction intensity is $B_2=2\mathrm{T}$. The mass of the metal rod $MN$is $m=0.12\mathrm{kg}$, the resistance connected to the circuit is $r=4\Omega$, and the dynamic friction coefficient between the metal rod and the track is $\mu=0.5$. The metal rod is now released statically along the track from somewhere above Area I. When the metal rod $MN$reaches the lower boundary of Area I,$B_1$begins to change uniformly. The change of the speed of the metal rod with the sliding time during the entire process is shown in Figure B<image_2>. Except for the $ab$segment, the $Oa$segment is parallel to the $cd$segment. During the sliding down process, the metal rod is always parallel to the magnetic field boundary and has good contact with the track. The track resistance and air resistance are ignored. The two magnetic fields do not affect each other.$\sin37^\circ =0.6$, and $g$is $10\mathrm{m/s^2}$. The following statement is correct ()	['A. The speed $v_2$corresponding to the $c$point in Figure B is $1\\mathrm{m/s}$', 'B. The width of area I is $0.8\\mathrm{m}$', 'C. As the metal rod passes through Zone I, the Joule heat generated in the loop is $0.192\\mathrm{J}$', 'D. $B_1$The rate of change for uniform change is $11.25\\mathrm{T/s}$']	BD	phy	电磁学_电磁感应	['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'phy_951_2.jpg']
phy_952	MCQ	Building a ladder to space is a long-term dream of mankind. A simple design is to regard the ladder as a straight cable with a length of tens of millions of stories high and evenly distributed mass. As shown in the figure<image_1>, the dotted line is the orbit where the geostationary satellite is located, and the orbit radius is\(r\). The upper end of the ladder points to space, while the lower end is in contact with the equator but has no interaction with the ground. The positions of the two objects\(P, Q\) on the space ladder are as shown in the figure. The height of the object\(P\) from the ground is\(h_1\), and the height of the object\(Q\) from the ground is\(h_2\). The entire ladder and the two objects are stationary relative to the earth. Ignoring the influence of the atmosphere, the earth can be regarded as a sphere with uniform mass distribution. It is known that the gravitational constant is\(G\), the radius of the earth is\(R\), the masses of objects\(P, Q\) are all\(m\), and the period of geostationary satellites is\(T\). The following statement is correct ()	['A. The mass of the earth is\\(\\frac{4\\pi^2 r^3}{GT^2}\\)', 'B. The density of the earth is\\(\\frac{3\\pi r^3}{GT^2 R^3}\\)', 'C. The force of the ladder on the object\\(P\\) is\\(\\frac{4\\pi^2 m[r^3 - (R + h_1)^3]}{T^2 (R + h_1)^2}\\)', 'D. The force of the ladder on the object\\(Q\\) is\\(\\frac{4\\pi^2 m[r^3 - (R + h_2)^3]}{T^2 (R + h_2)^2}\\)']	BC	phy	力学_万有引力与宇宙航行	['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phy_953	OPEN	"Figure A <image_1>is the structural diagram of a superconducting electric maglev train (EDS). The simplified diagram is shown in Figure B<image_2>. Electromagnetic force generated between the superconducting magnet and the ""8""-shaped coil is generated through mutual inductance to suspend the vehicle body. As shown in Figure C<image_3>, the superconducting magnet installed on the side of the train generates a magnetic field perpendicular to the paper and bounded by a dotted box. Ignoring the edge effect, the magnetic induction intensity is constant\(B\), and the length and width of the magnetic field are\(2l\) and\(l\) respectively. ""8"" shaped coils are fixedly installed on both sides of the train track. Each ""8"" shaped coil is wound with an enameled piece. The number of turns is\(n\), the resistance is\(R\), and the horizontal width is\(l\), the vertical length is large enough, and the intersection node is\(P\). When the train is moving at a constant speed\(v\), if the center\(O\) point of the magnetic field is\(h\) lower than the coil node\(P\)(\(h &lt; \frac{l}{2}\) and remains unchanged), only the motive electromotive force is considered, and the instantaneous power of the coil to the train resistance is calculated when the magnetic field just enters a single ""8""-shaped coil ()."		\(-\frac{4n^2 B^2 hlv^2}{R}\)	phy	电磁学_电磁感应	['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phy_954	OPEN	As shown in the figure<image_1>, fix two metal rails\(PEN\) and\(QFM\) with a spacing of\(d\) in parallel on the horizontal desktop. At the two points\(P, Q\), pass a small section of insulating material and the rails with a spacing of\(d\). The parallel metal rails with a sufficiently long inclination angle of\(\theta\) are smoothly connected. The lower end is connected with an inductor coil with a self-inductance coefficient of\(L\). There is a uniform and strong magnetic field perpendicular to the guide rail upward and with a magnetic induction intensity of\(B_0\) in the inclined guide rail area. The horizontal guide rail is divided into an area\(PQFE\) and an area\(EFMN\) with a length\(2x_0\). A fixed resistor with a resistance value\(R\) is connected through thin wires at the two points\(P, Q\). Two insulating light springs with both stiffness coefficients\(k_0\) are hung on the desktop column, and the springs are parallel to the guide rail. Place a metal rod with a mass of\(m\) and a length of\(d\), slowly compress the spring to the right on the horizontal guide rail, so that the deformation amounts of both springs are\(x_0\). At this time, the metal rod is located at the right ends of the horizontal guide rail\(M\) and\(N\). The metal rod is released from rest, and the spring springs it apart. When the movement distance of the metal rod is\(x_0\), the timing starts. At the same time, a changing magnetic field in one direction vertically upward is added to the area\(PQFE\), and the magnetic induction intensity changes according to the rule of\(B=kt\)(\(k\) is greater than 0 and constant). When the metal rod enters the area\(PQFE\), the magnetic field maintains the magnetic induction strength at this time unchanged, and the metal rod can just reach the two points\(P, Q\) and slide into the inclined orbit. Regardless of all friction, all resistances except the constant resistance\(R\) are ignored. Calculate the amount of charge\(q\) that passes through the resistance\(R\) during the process from the beginning of the metal rod's movement to the two points\(E\) and\(F\).		\(\frac{2k_0x_0}{kd}\)	phy	电磁学_电磁感应	['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phy_955	MCQ	<image_1>The energy of the ground state of the hydrogen atom is $E_1 = -13.6 \, \text{eV}$. A large number of hydrogen atoms are in an excited state. Among all the photons that may be emitted by these hydrogen atoms, the photon with the highest frequency has the energy of $-0.9375E_1$. From the perspective of Bohr's atomic model, the following statement is correct ()	['A. These hydrogen atoms may emit photons with an energy of $0.64 \\, \\text{eV}$', 'B. These hydrogen atoms can emit photons of up to 6 different frequencies', 'C. Irradiating the hydrogen atom with electromagnetic waves at $3.3 \\times 10^{13} \\, \\text{Hz}$can ionize the hydrogen atom in the ground state', 'D. After these hydrogen atoms emit photons, the kinetic energy of the electrons outside the core will decrease']	BC	phy	近代物理_原子结构	['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phy_956	MCQ	<image_1>As shown in the figure, there are two positively charged balls\(A\) and\(B\) that can be regarded as point charges.\(A\) The ball is tied to one end of a non-extensible insulating thin wire, passes around the fixed pulley, and applies a pulling force\(F\) at the other end of the string.\(B\) The ball is fixed on the insulating seat, directly below the fixed pulley. The initial distance between\(AB\) is less than the distance between the pulley and\(B\). Now slowly pull the string to make the\(A\) ball slowly move to the fixed pulley. During this initial process, the\(B\) ball is always stationary, ignoring the size and friction of the fixed pulley. The following judgments are correct: ()	['A. The Coulomb force on the\\(B\\) sphere increases first and then decreases', 'B. The tensile force\\(F\\) decreases first and then increases', 'C. The support of the ground surface for the insulating seat has been decreasing', 'D. \\(A\\) The potential energy of the sphere remains unchanged']	B	phy	力学_相互作用	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAEYATQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKoazrFloOlT6lqEwit4VyT3J7ADuTQBforO0LU5dY0W11CaxlsmuF3iCY/Mozxn6jB/GqGseK7bTNc07RYLeS91G8fmGEj91H3kc9gP1oA6CikZgqlmIAAySe1YPh7xVb+Jb3UVsLeVrG0kES3p/wBXM/8AEE9QPWgDforJ8R+IbDwxo8uo37kIvypGvLyueiqO5NXNNupb7Tba6mtXtZJYw7QSHLRk9j70AWqKwLrxXaxeK7Xw7awyXd7IpkuPK+7bR9mc+/p1/TO5LLHBE8srrHGgLM7HAUDqSaAH0VheGfE0PiiC6u7O1mSxjmMcFxIMC4A6so64zTvE/iez8L6atzchpp5XEdvax8yTueiqP69qANuio4JHlt45JIjE7KGaNjkqSOlYieKra48Wnw/ZwyXMsMZkup4yNlueysf7x9KAN+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigCOeeO2t5J5TtjjUuxxnAHJrxqHxlonirxM2peIr022lWEmLDT2idjIw/5ayYBH0H+T7SQCMEZBqD7Fa/8APtD/AN+xQNHB+IPi5oNho00ukzNfXxG2GEROo3HuxIHArN8I+JvCWhxTX2o64LvW7357u5MEnX+4vy8KK9O+xWv/AD7Q/wDfsUfYrX/n2h/79ikB5N4r+Iem+IdQh0Cz1F7PR3XffX/lOGdf+eSDGee5rprL4g+BtH0uOzsr4R29vHiOKO3k6D0+Xqa7P7Fa/wDPtD/37FH2K1/59of+/YoDQ8f0fxhoWveIT4j8T3vkfZ3K6dpzROwgH/PRsDBc/pW74p+LujWeleXodz9p1G4by4t0TqkWertkcgegr0P7Fa/8+0P/AH7FcN4utbdfiN4FVYIgrS3e4BBg/uh1oDQo+FPE3gnw1YOG1r7TqNy3mXl28Em6V/8AvnoOwrJ8R+O9H8Wa4ujSajJZ+HIQHupvKcNeN/zzXAyF9Seteu/YrX/n2h/79ij7Fa/8+0P/AH7FAXON/wCFl+C9M0zZZ3eY7eLEVvDbuMgDhV4xXKeGvFnh+91hvFHifUlGpNlbS08qRls4/QfLgse5r137Fa/8+0P/AH7FH2K1/wCfaH/v2KAucLq3jxddWLRvBsjXOpXZKtcGJlS1j7ucgc+grqPDPhqy8L6ULO1BeRjvnnfl5pD1ZjWrHbwxEmOKNCepVQKkpgFFFFAgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiikZlRSzEBQMkk8CgBJJEhiaWV1SNAWZmOAAO5NeReLPH3hibx94TuodVilt9PluTcyxqzKm6MAcgc8jtmrj6nB8UvF82jQTOfDemYe5KMQLx88DP9zIP1xWh4k0+zsPHvgG0tLWGC3WW8AijQKuPKXtSGdtper6drdmLvTLyG6tycb4myAfQ+h9jV2vKviD4ck8MbPFfhWb+y7lZUS8jiGIpUY43MnTgmtvT/Hk+m3cWm+MbL+zLiTAhvlO61n9w/wDCfY0XCx3VFNR1kQOjBlIyCDkGnUxBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV57rV/ceOtak8M6PM8ek25xqt9Gcbv+mKHuT3NWPFGuXutaofCPhyQrduM396vK2kR6jP8AfPYV1Oh6JY+HtJh03T4hHDEOvdz3YnuTSHscVZQ2Xgf4jG28pLTStVtI4rZ+iLLHxsJ9SPzrurnS7K8vrO+ngSS5syxt5D1jLDDY+opmsaLp2vae9jqdqlxbv/C3UH1BHIPuK5MfD7VLUeRp3jfWbay6CF9sjKPRXPIoAPiRepfWdr4VtGEuo6nOimNeTHEGBZ29BgV2F1plnf6f9hvbeO4tyoVkkXIPFZXh3wdpfht5LiDzrm/m/wBde3T+ZNJ+PYewroKYHn8vhfXvCDG58H3P2uxBy+j3jnbj/pk/8J9jx/Ktvw9430zXZTZuJLDVE/1tjdjZIp9v7w9xXS1ieIPCekeJYQt/bfvk5iuYjsliPqrDn+lIDborz5L/AMVeB/3eqI+v6Iv3byFf9JhX/bX+Ie45rsNG13TPEFkt3pd5HcRHrtPKn0I6g0xWNGiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK4/xd4mure6h8OaAgn168Xg9VtY+8r+nt71a8X+KToNvDZ2EH2zW71vLs7Ve7f3m9FHc0vhHwt/YFvNdXs32vWL0+ZeXR6s390eijsKBlrwt4atfDGki0hJlnkYyXNw/LzSHqxNbdFFAgooooAKKKKACiiigA61x+teAoJ9QOsaBdPo2sdTNAP3c3tInRvrXYUUAcLbeObvQ7mPT/GtmNPkc7YtQiybaY/X+E+xruI5EmjWSJ1eNhlWU5BHqDUV5Z22oWslreQRzwSDDxyKGVh9DXESeEta8KO1z4OvPMtM7n0i7cmM/9c2P3T7dKBnfUVy/h7xzp2tztYXKS6Zq8fEthdjY+fVT0YfSuooEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVh+KfE1t4Y0s3MqNNcyny7a2T780h6KP8ata7rll4d0ibUb+TbFGMAD7zseigdya5jwtoV/q2qnxd4kTF5IMWFkfu2cXb/gZ7n/IBlrwh4Zu7aaXxB4gdZtevRl8crbJ2jT6d66+iigQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBja/4W0nxLbiPUbYNIn+rnQ7ZIz6qw5Fcv9p8VeBXxdrL4h0Ff+W8a/wCl26/7S9HA9f5V6DRQFzM0XxBpfiGzF1pd5HOn8QHDIfRlPIP1rTrkdd8B2t9dnVNGuZNG1leRdW3Cye0idGFUrbxtqGgTpY+NLL7KSdqanbgtbSn3/uH60DO7oqOGeK5hSaCRJInGVdDkMPUGpKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFVtQv7XS9Pnvr2ZYbaBC8kjHAAFTSyxwQvNM6xxoCzOxwFA6kmvO4IpfiZrAvLgOnhSylzbxHj7dIP4yP7g7DvQBLomnXXjjWYfE+tRPHpduc6VYOOD/02cep7CvQqRVVFCqAFAwAOgFLQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABUVzbQXlu9vcwxzQyDa8cihlYe4NS0UAcDJ4O1XwtM934LvMW7HdJpF05aFvXYTyhrU0Dx1Y6re/2Vfwy6VrS/esrr5S3uh6MPpXVVieJvD+i65prjWbZXjhBdZlB8yL3UjnP0oGab31tHfxWLzKtzKjSRxk8sq4zj6ZFWK+VfE/inVbbxBZtY6hqFxBpMhNnc3kJSXBxkHuRxjnnHWvofwR4utPGXh2HUICFnX5LiHPMb9x9D1FJMGrHR0VR1e6nsdKubu38nfBG0h84kLhQSeR06Vxng7xj4n8Z6GNWs9I0y3tzI0aie4kBbHUjCnimI9BorkbPXvEw8ZW+ialpFkltLbvcG7trhnAC4GMEDncy/nXXUAFFFFABRRRQAUUUUAFFFFABSEgAknAHUmlrgPEOqXfi/V5fCegzNHbRkDVb+P8A5ZL/AM8kP94/pQBBfzy/EjWn0mykdPDFm+L65Q4+1uP+WSn+76mvQba2hs7aO2t4lihiUKiIMBQOwqDS9Ls9G02DT7CBYbaFdqIv8z6n3q5QAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAEM9pbXS7bi3ilHpIgb+dV7LRtN02aWaxsYLaSUAOYkC7seuKvUhIAJPQUAcF8YtafSfh7eQwk/ab9ltIlHU7uuPwzWTDqHiPwT4C0vRtP8LSJOBFZrcyXMbIs0hA3lVJJ+ZicVR8bagniH4m+GLH7PeNo+nSG5uJ/ssnlmX+EZ29sD869eaOKdULorgEOu4dCOQfrQAkMAjWMufMmSMIZ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phy_957	MCQ	<image_1>As shown in the figure, the inclined surface\(abc\) is fixed on the horizontal plane, has a baffle\(MN\), the extension line passes through the\(a\) point, and there is a smooth small cylinder\(Q\) between the inclined surface and the baffle\(MN\), and the whole device is in a balanced state. Initially\(\angle NMC &lt; 90^\circ\), if external force is applied to slowly rotate the baffle\(MN\) clockwise around the\(a\) point and ensure that the three points\(N\),\(M\), and\(a\) are always collinear, before the baffle\(MN\) is rotated to the horizontal position, the following statement is correct and the following statement is correct ()	['A. The support force of baffle\\(MN\\) to\\(Q\\) gradually increases', 'B. The support force of baffle\\(MN\\) to\\(Q\\) first decreases and then increases', 'C. The supporting force of the inclined body for\\(Q\\) first increases and then decreases', 'D. The resultant force acting on the small cylinder\\(Q\\) gradually increases']	B	phy	力学_相互作用	['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phy_958	MCQ	<image_1>As shown in the figure, the horizontal conveyor belt rotates at a constant speed in the clockwise direction at a rate of\(v = 8m/s\), and the left end is smoothly butted with a fixed vertical\(\frac{1}{4} \) smooth circular arc track. The right end is smoothly butted with a horizontal smooth track of enough length, with the distance between the two joints\(L = 3.9 m\). Smooth arc radius\(R = 1.0m\). Known mass of slider\(A\)\(m_A = 1.0kg\),\),\Dynamic friction coefficient between (A\) and conveyor belt\(\mu = 0.5\), Quality\The slider\(B\) of (m_B = 7.0kg\) is stationary on the track on the right side of the conveyor belt. The collision between\(A\) and\(B\) can be regarded as an elastic collision, and the gravity acceleration\(g = 10m/s^2\), now\(A\) slides along the orbit from the top of the arc (equal to the center of the circle\(O\)) with the initial kinetic energy of\(E_{k0} = 2.5J\). The correct one of the following statements is ()	['A. When the slider\\(A\\) moves directly below the\\(O\\) point, the magnitude of the support force of the orbit on it is\\(35N\\)', 'B. The power of the conveyor belt to overcome friction when the object is on the conveyor belt\\(80W\\)', 'C. Slider\\(A\\) final motion velocity magnitude is\\(1m/s\\)', 'D. Due to transporting objects\\(A\\), the conveyor belt consumes more electricity\\(136J\\)']	ACD	phy	力学_牛顿运动定律	['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phy_959	OPEN	<image_1>As shown in the figure, the horizontal conveyor belt with length of\(L = 3m\) drives to the left at a constant speed\(v_0 = 12m/s\), and its left end is smoothly connected to the horizontal plane with length\(L_1 = 1.44m\). A long wooden board\(C\) with length\(L_2 = 0.9m\) and mass\(M = 2.5kg\) is placed close to the left end of the horizontal plane. The upper surface of the long wooden board\(C\) is at the same level as the horizontal plane on the right. Quality\(m_1 = 0.5kg\) slide\(A\) gently placed on the rightmost end of the conveyor belt, and after a period of time, the mass\(m_2 = 2.5kg\) slider\(B\) elastically collides, and the dynamic friction coefficient between slider\(A\) and the conveyor belt is known\(\mu_1 = 0.6\), the dynamic friction coefficients between the two sliders and the horizontal plane and the upper surface of the long wooden board\(C\) are both\(\mu_2 = 0.2\). The lower surface of the long wooden board is smooth, and the gravitational acceleration\(g\) is\(10m/s^2\). Both sliders can be regarded as mass particles. Calculate the time interval between the second collision of the two sliders		\frac{10 - 3\sqrt{3}}{3} \text{s}	phy	力学_牛顿运动定律	['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phy_960	OPEN	<image_1>As shown in the figure, the horizontal conveyor belt with a length of\(L = 10m\) drives at a constant speed\(v_0 = 12m/s\), and its right end is smoothly connected to a smooth horizontal plane. Place a smooth\(\frac{1}{4}\) arc-shaped groove with a mass\(M = 1.5kg\) and a radius\(R = 2m\) on the smooth horizontal surface at the right end of the conveyor belt. The bottom end of the arc-shaped groove is located on the same horizontal plane as the conveyor belt. Now place a slider\(A\) with a mass of\(m = 1kg\) on the leftmost side of the conveyor belt without initial velocity. The dynamic friction coefficient between the slider\(A\) and the conveyor belt is\(\mu = 0.5\), the gravitational acceleration\(g\) is\(10m/s^2\), and the slider\(A\) can be regarded as a particle. Total time spent by slider\(A\) moving on the conveyor belt.		2.8s	phy	力学_牛顿运动定律	['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phy_961	MCQ	As shown in Figure A<image_1>, a slider is placed on a plank of sufficient length and the plank is placed on a level ground. It is known that the masses of both the slider and the wooden board are $1kg$, the dynamic friction coefficient between the slider and the wooden board is $0.3$, and the dynamic friction coefficient between the wooden board and the horizontal ground is $0.1$. Now a variable force action of $F = kt$(N) is applied to the wooden board. Starting from the moment $t = 0$, the relationship between the resultant force of the friction force on the wooden board and time is shown in Figure B<image_2>. It is known that $t_1 = 5s$. Assuming that the maximum static friction is equal to the sliding friction, and the gravity acceleration $g$is taken as $10 \text{m/s}^2$, then the following statement is correct ()	['A. $k = 0.6$', 'B. $t_2 = 12.5s$', 'C. $0 \\sim t_2$, the displacement of the slider is $337.5m$', 'D. When $t = 15s$, the acceleration of the long wooden board is $2 \\text{m/s}^2$']	D	phy	力学_机械能及其守恒定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACHAWIDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKAK91fWllt+1XUMG/O3zZAucdcZqv/AG7pH/QUsv8Av+v+NcF8SrC01Pxv4Ltb63juLdxfFo5F3KcJGRxTf+EH8L/9AHT/APvwtYVa6puzRvToOorpnf8A9u6R/wBBSy/7/r/jR/bukf8AQUsv+/6/41wH/CD+F/8AoA6f/wB+Fo/4Qfwv/wBAHT/+/C1n9cj2NPqku53/APbukf8AQUsv+/6/40q63pLsFXU7NmJwAJ1yT+def/8ACD+F/wDoA6f/AN+FrB8W+FtB0zRorux0m0t7hL212yRxBWGZ0B5+hpxxUZNKxMsLKKbue20UDoKK6jmCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDzvx5/yULwT/ALt//wCi461Ky/Hn/JQvBP8Au3//AKLjrUrzsX8fyPQwnwfM5iXxLd/8JVfaNb2sMgtrZJd5cjDMT97jgADPfqBWP/wnmpP4Jh1uOwtzOXVHUswVi0m0Knckjn296mGh6ymh+JrtLcf21qszrGPMXKRfcTnOOFyafqHhu5hTwto9jaebpljKJbht4HzIvyFsnJBY5OPSoSgW+c7UcgVzfjv/AJFtf+v60/8ASiOulrmvHf8AyLa/9f1p/wClEdRS+NepdX4H6Hqo6CigdBRXrnkhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABmjI9a8bv9Bs9f+I/iw373bC3mt1iWO6kjCg28ZPCkDrU3/CAaF6X/wD4Hzf/ABVcVXHU6c3Bp3R0wws5x5kevZHrRketeQ/8IBoXpf8A/gfN/wDFUf8ACAaF6X//AIHzf/FVH9pUez/r5lfUqndHr2R60ZHrXkP/AAgGhel//wCB83/xVH/CAaF6X/8A4Hzf/FUf2lR7P+vmH1Kp3R69ketGR615D/wgGhel/wD+B83/AMVR/wAIBoXpf/8AgfN/8VR/aVHs/wCvmH1Kp3Rs+PD/AMXC8E/7t/8A+i461cj1rjn+HPhyWRJJIbx3TOxmvZSVz1x83FL/AMK78Pf8873/AMDpv/iq5q2LpVJX1+7/AIJ00aU6cbaf18jsMj1oyPWuP/4V34e/553v/gdN/wDFUf8ACu/D3/PO9/8AA6b/AOKrL21Lu/u/4Jrafb8f+Adhketcz47P/FNr/wBf1p/6UR1V/wCFd+Hv+ed7/wCB03/xVNf4b+G5V2yQXbLkHDXspGRyP4qcMRSjJPX7v+CTKE5Rasvv/wCAewgjApcj1ryH/hANC9L/AP8AA+b/AOKo/wCEA0L0v/8AwPm/+Krt/tKj2f8AXzOP6lU7o9eyPWjI9a8h/wCEA0L0v/8AwPm/+Ko/4QDQvS//APA+b/4qj+0qPZ/18w+pVO6PXsj1oyPWvIf+EA0L0v8A/wAD5v8A4qj/AIQDQvS//wDA+b/4qj+0qPZ/18w+pVO6PXsj1oyPWvIf+EA0L0v/APwPm/8AiqP+EA0L0v8A/wAD5v8A4qj+0qPZ/wBfMPqVTuj17I9aMj1ryH/hANC9L/8A8D5v/iqP+EA0L0v/APwPm/8AiqP7So9n/XzD6lU7o9eyPWjI9a8h/wCEA0L0v/8AwPm/+Ko/4QDQvS//APA+b/4qj+0qPZ/18w+pVO6PXsj1oryH/hANC9L/AP8AA+b/AOKqx4H02HRfiffWFnJcfZjo6TbJZ3k+czMCfmJ7AVrRxtOtLlimRUw06ceZnq1FFFdZzhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAeXWv/JRfGf8A182v/pNHW3WJa/8AJRfGf/Xza/8ApNHW3XzmN/jyPYw38JBRRRXMbhRRRQAUUUUAFFFFABRRRQAVzq+J2Hjj/hG5rVV3W5njnWTOcH7pGODjnr6V0VedXZZPGHhnWJCF+13d0ue2wx7U/wDHUB/GtaUVK9+z+8zqSatY7bWdXtdC0m41G8bbDChYgdWPYD3qLw9qdxrOi22o3Fqtt9pjEiRiTeQp6ZOB2xXGeOJJNb061hXcE1G7S0sk5BKE/PKR7gED2PvXokMSQQRwxqFRFCqo6ACiUFGmu7CMnKT7D6KKKyNAooooAKKKKACiiigAooooAKxNGvbWy+Lt293cwwK2hxgGVwoJ85/WtuubstC0rXvizcw6tp9texR6JGyJPGHCnznGRmu7Lv4/yOXGfwj0n+39G/6C1j/4EJ/jR/b+jf8AQWsf/AhP8ayv+FdeDP8AoWNK/wDAZf8ACj/hXXgz/oWNK/8AAZf8K948o1f7f0b/AKC1j/4EJ/jQdf0fBxq1jn/r4T/Gsr/hXXgz/oWNK/8AAZf8KQ/Drwbg48MaVnt/oy/4UAc/ovxo8M32oy6Xqcv9l38UrQt5rBoWYHGVkHGPc4r0SGaK4hWWCRJI2GVdGBBHsRXlGi/AXw/BqMuo60322WSRpBaQr5VvHk5CgDkgdOo+leo6fp1lpVlHZ6faw2ttH92KFAqj8BQByfjvWNV0/UPDun6Le+ReanfCFlMauPJAJkfkdQMVo3+meIEjjOn+IZXmWWPfHNbwkGMsA3RQQcZP4VzdxbN4p+Mcqi4mgtvD9gFDwkBvPm5PJB/gFdd4f0WbSDqDXF9cXslzcmRZLhtzKmAFTjjAwfzoA2qKKKACiiigAooooAKa0iIcM6qfc4p1c14q8N+FdQifVvEllbyJaRHdPMxXYg5xwf8AOaAOh8+H/nqn/fQo8+H/AJ6p/wB9CvHfD3w/8OatPdeK9U0iLTdAWI/YrORmXdGOTNLzkE9h2FRaP4I8L6zdXHiy+0qLTPC1tG32SF2ZTcKOs0mTkD+6v40Aa9rLH/wsTxmd64NxbYOf+naOtvzo/wDnon/fQri9H8DeFr5rzxjrGkQ6X4ciiP2O0kLKZEH/AC2k5zlv4V+lTeH/AIe+G743ni3W9Ih03RfKJs7GRmXbEOfNl5zuPYdhXnVsv9rUc+a1/I7KeL5IqNjrvOj/AOeif99Cjzo/+eif99CuR8PfD7w3rl5P4ovtHh07w7HGwsraRmTzU7zykngHsPTmotH8DeFtfv5/E9xpUOm+FLRG+zRyMyG6x1mfJyE/ujv1rL+y/wC9+H/BL+vf3fxOz86P/non/fQo86P/AJ6J/wB9CuL0fwP4W1We68W6jpMOmeGLeJvsdvIWUzr3mkyc4P8ACv8AkmkeB/C10t54x1rSYdM8PRxH7FZuWUvH/wA9ZOc7m/hX3Hej+y/734f8EPr3938TtPOj/wCeif8AfQo86P8A56J/30K5HQPh94auUvfFuv6RBpujmIm0sZGZRHCOfNk5zub07D3qHR/A/he9N54w1jSYtL8ORRH7HaSFlMif89pOc5b+FfpR/Zf978P+CH17+7+J2nnR/wDPRP8AvoUedH/z0T/voVxek+B/C7QX3jLxDpMWmaII/wDQrB2YHy+0knOS7dlHr3NTaF8PvDRtr/xd4k0iHTtLaLdbWDswEEI53yc5Lt6dulH9l/3vw/4IfXv7v4nXedH/AM9E/wC+hR50f/PRP++hXI+H/h74b1F7vxZrOjw6ZogiP2OykdlxEOfOlOc5I6DsKi0bwP4W1Sa68XalpMOmeGYIm+x20hZTMneaTJzz/Cv0o/sv+9+H/BD69/d/E6nUvOn0+aGyuYYZ5EKrK5yEyOuB1rF1DwxbatZaLbXlxGE06RXZYzxKAhXb14B4z7ZFZ+keB/C1yt74y1vSYdM8PxxH7FZuWBaP/nrJznc3Zfcd6fovgLww0F/4x8RaRDpujeVm0sHZhsiHIkfnJduy9sgdaqOXOO0/w/4InjE94/iXr7Rbi88U6Zqv2u0W109XEdtg5JYY3bs8cY4xXR+dH/z0T/voVyOgfD3w3dLeeLde0iHTdHMRNpYyMy7Ihz5snOdzdh2FQ6P4H8LXzXfjDV9Jh0zw3FEfsVo5ZTJH/wA9pOc5P8K/SiWWuVrz28v+CCxiX2fxO086P/non/fQo86P/non/fQri9J8D+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'phy_961_2.jpg']
phy_962	MCQ	"""Tianwen"" is an immortal poem written by Qu Yuan, and the ""Tianwen"" planetary exploration series represents the unremitting pursuit of deep space physics research by China. As shown in the following figure<image_1>, the density ratio of the two spherical planets $A$and $B$with radii of $R$is $\rho_A : \rho_B = 1 : 2$.$A$and $B$each have a near-earth satellite $C$and $D$, and their orbit periods are: $T_C$and $T_D$respectively. Astronauts standing on the surface of the planet throw an object $a$at the level of $h$above the surface of $A$planet at the level of $v_0$, and another object $b$at the level of $2h$above the surface of $B$planet at the level of $2v_0$. The following statement is correct ()"	['A. The ratio of the speed of $C$and $D$running around $A$and $B$is $1 : 2$', 'B. The cycle of $C$and $D$running around $A$and $B$satisfies $T_C = T_D$', 'C. Since the masses of $a$and $b$are unknown, it is impossible to find the ratio of their speeds when landing.', 'D. $a$,$b$The ratio of the displacements of the two objects from throwing to landing is $1 : 2$']	D	phy	力学_机械能及其守恒定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADDAf0DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooppOKAHZoqGWaOIbpJFUe5xUX9o2Zhkl+1Q+XH9994wv1NOz7EucVo2W6Mis6HWdNuJRFDf20kjdFWVST+tWRcwsxUTIWBwQGGc0OMluhKpB7NFiimA8detPpFhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFI1AC5oyKhknjiUl5EUepbFUL3XdN06QRXd2kbkbguckj1xVRhKTskZyqwgrydjVzRmsb/AISLTjp7X6zO1ur7CwjY8/TFNsfEum6jciC3mkMhBIDRsvT6in7Kdr22I+tUbpcy121NujI9axY/FGiyvsXUIlOcfOdv861BIrDhgeM8HtSlGUfiRcKsJ/C7k1FNByKcKk0CiiigAooooAKKKKACiiigAooooAKKKKACiiigAopM1HLOkKM8jKqKMlmOABQJtIkY471BNcxwRu8jgBFLEDk4HtWSdVk1u1uE0aQJJGwTz5EOwjvt9ak0rQItPla6mnkurxxh5pT/ACHatPZqKvPfsc/tpTa9krp9en/BILbX7zUbqMWOmSm1JG+eY7Bj/ZHekutF1G9uZGm1qdIGYlYoFCEDsM1b1jX9I0CDz9V1C3s48HHmvgt9B1P4Vxp+KMurAp4S8L6prGThbhk8iA++5v8ACn7Sz9xW/EPq7krVZX/D8rfqdjN4e0+7jgS6ia48hdqtI5Jx7+tWLfRdNtraS3is4Vil++m3Ib65rh8/FfU14Hh/R1b13zOo/kaF8G/ECfm6+Irof7sGnRgD9RUOpJq1zRUaad+VXO4h0TS4JlmhsLaOVTlWWMAiqd14V0e6keV7QLIx3MyuVOfXg1yp8EeOYuYPiRcluwk0+Mj+dINP+KunHMWs6Fqyj/n5t2hY/wDfHFNVJp3TYSoUpKzijq7zR7gpAthqc1mIU2BeGUj3z1pI59Y07T5ZL1FvpEYbBbjDMvckHv8ASuTHjzxPouR4m8FXaxDrdaZILhMepXqB+NdH4e8deG/FGF0vVIXm728nySg9xtbB/Kj2jas9SPq6UuaLaf8AXTYv6Z4gstUcxROyXCjLQyrtcfh3rU3dOagksYJS0nlqJSpXzFGGAPoaxLS31rSr2OESi/sHON0rYkiH17iqcYy+DTyf+ZKnVp2U1fzX+X+R0gORS1UtNQtrxGa3lSUIxVtp6GrQbOays1udEZKSuhaKKKCgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoopCcUALTCf9rFU9S1a10u2M904VeijOSx9AO9Zqx3HiXTMXC3GnxtJnajfNInofTNWoNrmeiMZ1knyx1l2LsusQ7LkWjC8uIBloYSCeelU7KTxBdXaT3aQWtoOsA+Z2+prRsdLs9Lh8u0gWJe+ByfqeprmNZ+J3h3Srr7DbSTatqOcC005POfPuRwPzp88VdRX3kKlUnZ1HbyW3+ZqL4S0552luvPunZs5nlJx7YGK2vsVqzKxt4iyjaCVBwPSvPRqnxN8QAtYaNp2g2rfde/kMsuPXavA+hFSRfD/xNegtrHxB1ZnPVbFFt1/Sk5ye7NIUKcNoo9DEcYG0KoHoBSiNB0UV54fg9pU2Tea/4jumPUy6gT/Shfg5pEJ3Wmu+IrZ+zR35B/lUGlkd1caZYXAPnWcEn+9GDWfqXh6z1CcTb5oZ1UKskMhUgDpx0rlX+HniKyXdpPxC1mNx0F6FuFP1zioWvvihoKq15pml+IbdPvNaSGGYj1weM+wFUpyi7pmc6FOaalFHWmLV9N05UtJVv5VfJNydpK+gPr9ak03XDeGWK6tZrOeFcyLKPlx6huhrA0j4o+H7+7/s+/Nxouo8A22pR+UT9GPB/Ouwmt4by2eGZRJDIuGU9CDVc6atJfMz9jKLThLTs9V/mSo4cBgcgjNPzXPWej3Wj3mbW8d9PCkm3kBZl9NprQ0vWbTVYma3Y70OHjfhlPuKUqdtY6odOte0aitLsaVFJmlqDoCiiigAooooAKKKKACiiigApM0GoZp47eF5ZXCIgyxPYUWE2lqxl7eQWNs9xcSCONOSTWNFH/wlNjvvbaaC180NEofBlXHVh6UWLp4ljklvLMfYklD224nL4z8xHpVnxF4k03wpo0uo6lKI4U4VF5aRuyqO5Nau1PT7X5HLFOvrf3O3f/gFqe5sNE0157iWGzs4FyzsQqqK4CTxf4m8bztbeCbUWWmAlX1q9Thv+uSHqff+VR6Z4Y1X4hXsWueMVa30tTvstFViBjs8vqfb/wDVXp0FvFbRJFCixxoMKijAA9AKyOpJJWRxWi/CzRLC5F/qpm1vVCPnutQbzOf9lTwB+f1ruEjSNFREVVUYAAwBTqKBhRRRQAUYoooAMD0rlvEXw/8ADnicb77TkS5B3LdW/wC7lU+u4dfxyK6migDy5h44+H53K8nijw+mcq3F5Avrn+MD8/pXZ+G/E+j+K9PF7pV0syDAkjPDxN/dZeoNbpGa4HxT4Adr8+IvClwNM8QJydoxFdDusi+/r/8ArAB0Fz4fC6nHqGnS/ZZtwMyqPklXuCPX3q5purWt/NcRRsyzQMVeNxhh749KwfBvjaPxIs2n39sdP12z+W7sn4IPTcnqp/z2J2L3RYZ9Qt9Qid4bmFgSyD/WL3U1qpqStN+hyum6TvSS1eq/y7M2MilrN0rVbfVYWkg3KyOUkjcYZT7itKs5RcXZnRCcZx5ovQKKKKRQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFACEgVl61rEWlWysVaWeU7YYV6u1TatqcWk2T3U3IGAqjqzHoBVTR4bya2W51VUNwzF0TaP3QP8ADWkY2XPLY56tRtulB+9b7gsLGW5t4J9YhgkukJZAF4jzjiq3irxjo/hGyWbUJiZ5OILWIbpZm9FX6456Vn+M/Gn/AAj/AJGmaZB9v1+9+W1tEOcf7b+ij9fzIr+EfAP2C9bX/ENx/afiKcZed+Ugz/BGOwHTNRKXM9TSnSjBWRkLoXi74g/vvEVxLoWhscppdq2J5V7eY/b6foK7nQPC+jeGrQW2ladBbIBgsq/M/wDvMeT+NbAGBilpGgYFFFFABRRRQAUYHpRRQBl634d0jxFZta6rp8F1GRgeYnK/Q9R+FcFL4Y8V+AmNx4SvJNV0hcGTR719zqvfyn7cdv516jSEZoA5jwr410rxdAy2rNBew8XNjONssLdMFf61pT6JbSalHqSK0dzHkkxnHmcdG9awPGHgKHWZk1jSLg6Z4htuYLyLjf8A7Mg/iH+eelN8F+NptWmm0LXLYWHiKzGJoGOFmX/npGe4P6Zpxk4u6InTjNWkjf0nXE1CWW2niNteQk+ZAxyceo9RWuDxWZe6dA1wmoLDvvIFbyznbu4PB9RTNF1hNVtS2xoriNtk0LdUarlFNc0Fp1MadSUZezqPV7ea/wAzXopBS1mdIUUUUAFFFFABRRSEkHFACMcCufnuodY1WfRzb+daxoDcSbyMNnheOtaOr6nDplgbifcQGCqqdWY9hTdK0y3023ZYd5aVzI7SHLEn1NaRtGLk16HNVbnNU4vTd+nRfMXUL6w8P6NNe3Tpb2dpHuY9go7AfkMVwPhbR7zx3rUXjTxHCyWUbZ0fTn+7GueJWHdjjI/A+lM1zf8AETx8vhxNx8P6KyzakwGBPP8AwxZ9B3HsfavUIkSOJUjUKijCqBgADtWZ0JWVkOAA6ACloooGFFFFABRRRQAUUUUAFFFFABRRRQBxHjrwbNq7w67oTi08Saf89tOOBKB/yzf1U5PX19DV7wT4si8XaOZnj+z6hbN5N7at96GUdR9D2/8ArGupPSvL/GtrL4K8TweO9ORjaSFbfWYE6NGThZceo/w96AOwvLSDStTl1zzXih8vFxGi5D+h/D/PetmGVZ4UkjfejgMrA9RTENvqGnrIrLNbzxggg5VlI/liszQrdtJR9Mmuo5CGZ7dS3zeXnv8AjWj9+Gr1X5f8A5lF06lkvdf5/wDBN0dKKQcqKWszpCiiigAooooAKKKKACiiigAooooAKKKKACiiigAqJ22gknAHPNS1jazqX2WS1s44RPNdye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phy_963	MCQ	<image_1>As shown in the figure, the heavy dump truck can use hydraulic devices to slowly tilt the carriage, and the cargo in the carriage will slide down automatically. It is known that the gravity of the cargo package is\( G \), the static friction coefficient between the cargo package and the carriage floor is 0.75 (the static friction coefficient is the ratio of the maximum static friction force to the positive pressure), and the dynamic friction coefficient is 0.70. The curves in the following four images are all sine or cosine curves. The real curve that can correctly describe the relationship between the friction force\( F_f \) on the cargo package and the inclination angle\( \theta \) is ()	['A. <image_2>', 'B. <image_3>', 'C. <image_4>', 'D. 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'phy_963_2.jpg', 'phy_963_3.jpg', 'phy_963_4.jpg', 'phy_963_5.jpg']
phy_964	OPEN	As shown in the figure, there is a uniform strong magnetic field in the negative direction of the $y $axis in the circular area of the planar rectangular coordinate system $xOy $. The center of the boundary circle is at the position of $(0, R)$(not marked in the figure). The boundary circle is tangent to the $x $axis, and there is a uniform strong magnetic field outside the boundary circle that is perpendicular to the coordinate plane and inward.<image_1>A positively charged particle with a mass of $m $, a charge of $q $, and a velocity of $v_0 $is ejected into the first quadrant from the origin of the coordinates in the coordinate plane along an angle of $45^\circ $to the positive direction of the $x $axis. When the particle exits the electric field for the first time, the direction is along the positive direction of the $-x $axis. The particle is deflected by the magnetic field for the first time and enters the electric field again from the $(0, 2R)$position. Regardless of the particle's gravity, find: If the electric field is withdrawn immediately when the particle enters the electric field for the second time, then the time for the particle to move in the magnetic field for the second time.		\frac{233\sqrt{2}\pi R}{180\v_{0}}	phy	电磁学_静电场	['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']	['phy_964.jpg']
phy_965	MCQ	As <image_1>shown in the figure, there is a smooth circular glass pipe in the vertical plane. The center of the pipe is\(O\) and the radius is\(1.5\,\text{m}\). The radius of the pipe is much larger than the inner diameter of the glass pipe. There is a uniform electric field horizontally to the right in space, and the electric field intensity is\(4 \times 10^6\,\text{N/C}\). Place the ball at the lowest point of the glass tube and give the ball an initial velocity so that the ball can just make a complete circular motion in the glass tube. The mass of the ball is\(0.03\,\text{kg}\) and the amount of charge is\(-1 \times 10^{-7}\,\text{C}\). Take the potential at the center of the pipe\(O\) as\(0\), the horizontal plane where the center of\(O\) is located is the zero-potential energy surface of gravitational potential energy, and the gravitational acceleration\(g\) as\(10\,\text{m/s}^2\), then the following statement is correct ()	['A. The minimum speed of small ball movement is\\(5\\,\\text{m/s}\\)', 'B. The ball has a minimum potential energy of\\(0.6\\,\\text{J}\\)', 'C. The minimum mechanical energy of the ball is\\(0.15\\,\\text{J}\\)', 'D. The minimum pressure of the small ball on the orbit is\\(0\\)']	CD	phy	电磁学_静电场	['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']	['phy_965.jpg']
phy_966	MCQ	A scientific and technological group designed a generator and used the generator to supply power to the circuit. The working principle and power supply circuit of this generator are shown in Figure A<image_1>. The vertical conductor rod\(AB\) with a length of\(L\) can rotate at a uniform speed in the vertical plane around the vertical axis\(O_1O_2\). There are two uniform strong magnetic fields in the horizontal direction in the space. The magnetic induction strengths are\(B_1 = 2B_0\) and\(B_2 = B_0\) respectively, and the directions are opposite. The top view is as shown in Figure B<image_2>. A fixed resistor with a resistance value of\(R_0\) is connected to the circuit. At zero time, the conductor rod starts to rotate in the direction shown in the figure from the position shown. The angular velocity of rotation is\(\omega\), and the radius of rotation is\(r\)(the thickness of the rod is much smaller than the radius\(r\)). Regardless of the resistance of the wire and the conductor rod, the conductor rod is always in good contact with the circuit during rotation. The following statement is correct ()	['A. During one revolution of the conductor rod, the direction of current flowing through\\(R_0\\) is always\\(C \\to D\\).', 'B. During one rotation of the conductor rod, the direction of current flowing through\\(R_0\\) is first\\(D \\to C\\) and then\\(C \\to D\\)', 'C. During one rotation of the conductor rod, the heat generated by the resistor\\(R_0\\) is\\(\\frac{5\\pi B_0^2 L^2 \\omega r^2}{R_0}\\)', 'D. During one rotation of the conductor rod, the heat generated by the resistor\\(R_0\\) is\\(\\frac{5\\pi B_0^2 L^2 \\omega r^2}{2R_0}\\)']	D	phy	电磁学_电磁感应	['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']	['phy_966_1.jpg', 'phy_966_2.jpg']
phy_967	MCQ	"In the experiment of ""Exploring the Relationship between the Voltage at Both Ends of a Transformer Coil and the Number of Turns"", Xiao Li connected the primary coil to an AC power supply and the secondary coil to a voltage sensor (which can be regarded as an ideal voltmeter). He observed that the voltage of the secondary coil\(U_2\) changes with time\(t\) is as <image_1>shown in the figure. At the time\(t_1\), the student first turned off the switch, and then closed the switch at the time\(t_2\), then the operation performed during the time\(t_1 \sim t_2\) may be ()"	['A. Increased frequency of AC power', 'B. Tighten the loose iron core', 'C. Reduced number of secondary coil turns', 'D. Increase the number of turns of the primary coil']	B	phy	电磁学_电磁感应	['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phy_968	MCQ	As shown in the figure, the insulating cylinder with a radius of\(r\) is in a radial magnetic field (<image_1>not fully drawn in the left picture), and the magnetic induction intensity is\(B\), and the direction is perpendicular to the insulating cylinder inward (as shown in the right picture<image_2>). A thin copper sheet with length\(a\) and width\(b\) is pasted on the surface of the insulating cylinder. The right side of the insulating cylinder is connected to the resistor\(R\) through two thin metal rods. The metal rods are parallel to each other with a spacing of\(d\), and the left side is in good contact with the cylinder. The resistance of metal rods and copper sheets is negligible. When the insulating cylinder rotates at an angular velocity\(\omega\) at a uniform speed in the direction shown under the action of external force, then ()	['A. During rotation, the external power is constant', 'B. The insulating cylinder rotates once to overcome the ampere force and do work\\(\\frac{B^2d^2br\\omega}{R}\\)', 'C. The potential difference between the upper and lower edges of the copper sheet is\\(Bar\\omega\\), and the potential at the lower edge is high', 'D. If the angular velocity of the insulating cylinder becomes\\(2\\omega\\), the thermal power of the resistor\\(R\\) becomes twice the original.']	BC	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAE3AbYDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAbJIkUTySMERAWZicAAdTXMWnjmwubKLVJE+zaPcTi3trqYndcOW2rsjCk7Se5I+lXfGWm3eseDNY06xIF1c2kkUeTjJI6Z9+n41zQslutG8Nxy6Jdiz0gxvLEYwGEiJgYXPzANznv70AdZb65FJ4in0OWIx3cduLpCG3LJEWK5zxggjke45Nah4U/SuP8PaZf33jTU/Fd/byWkctsljY28mN/kqdxdwOhLHgenWuwb7p+lAHLeANSvNU8Pzz3s7TSrf3EYZuu1ZCAPwFdVXF/DD/kV7r/ALCV1/6MNdpQAUUwTRtK0QkQyKMlAwyB9KfQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABUc08VvH5k0ixpkDcxwMnpUlYfjLSv7a8H6rp/O6W2cIR1DAZBHvkUAbnWivmv4cfErxZohtrXWY/tOiuSiTXrmIpg4O2UjBxzwx7YyK+iLLVtP1GBJrO8t5kYAgxyq38jQBcpG+6fpS0jfdP0oA4z4Yf8ivdf9hK6/8ARhrtK4v4Yf8AIr3X/YSuv/RhrtKAOc1vwH4a8Q3v27UNNU3uBi6hkeKUY6HchByPeso+F/E+gL5nh3xLPewrz9g1k+cGHoso+ZfbORXX3OoWVlGZLq7ghQdTJIFA/OuVu/iRpkjm18O21z4gvzwkViv7sH1eU/Kq+/P0oA1fDHiX+34rqG4s5LHU7JxFd2khyY2IyCD/ABKRyDW9XMeEtD1Oyn1DWddlhbVtTZDLFBzFbooISNSeTgE5Pc/menoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKxtS8W+HtIDfb9ZsoGX7ytMCw/4COaxX+Jmivj+z7XVNRB6Pa2Tsh/4EQBQB2dBAIwRkGuNHizxJczeXaeCr5FyQJLqeONT6HgkikS8+Idy6g6Rotmpzlnu3kx+SigDpbPRtPsdLXTYbWP7IM/unUMDk5OQevNYl58OfCl3I8w0mK2nbrLasYW/8dIqmdP+I0qkPruhQ5PHlWchIH4tT5fDfjC5iUN44a3cdfs+nR/+zE0ANPw5toYtlhr+u2nzbsi9aT/0LNJL4H1Yr8njnXUAHTMZ/wDZad/wiHiVkw/j7UifVbSBf5LUD+BteYEnx9rPTtFGP6UAc58PvCepXmg3EqeLdXt0F9cIY4tgBIcgt93qetdSPh1DNGyX/iLXroMc/wDH4Y8f984rkfAPhDV73QZ5YPGWqWirfXCGOJEIJDkFuR1PWuuTwb4ij+74+1X/AIFbQt/NaALNt8NvClu6SSaWt3MhyJbuRpmH/fRrpre2t7SEQ20EUMQ6JGgUD8BXIJ4U8WRzBx4/u3X+5Jp0JH6YpX0rx9FMxg8SaXKnYT2BH/oLUAdnRXGZ+I1pEm5dAv3z82wyQ8fjmk/4SLxnaIpvfByTEsR/oN6r8f8AAgKAO0ori/8AhYaWzImqeHNdsnbGR9kMoXPqUzV6x+IfhO/kMUet2sco6xzt5RH/AH1igDpqKZFNFPGJIZEkQ9GRgQfxFPoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArn9c8aaJoMot7m6M1633LS2UyzN/wFefzrEvNU1Xxlq13pHh+5ax0mzcw3uqKMu8g+9FD7ju3aui0Lwro/hyIrp9oqytzJcP88sh9Wc8mgDB/tTx1rxH9m6RZ6Dakj/SNTYyzkd8RIQAf95qF+HZvwG8S+JNY1liMPD532a3P/bOLH867eigDD03wd4c0cq1hotlDIowJBEC5+rHk/ia2lRUXaihR6AYp1FABRRRQAUUUUAFI33T9KWkb7p+lAHGfDD/kV7r/ALCV1/6MNdpXF/DD/kV7r/sJXX/ow12lABRRXE3fjq8t9e1fSIdDN3dWMAlhjtrjc1wSCcYKjbgDnr1AGSaAO2oqrptxPd6VZ3N1bNa3E0CSS27HJicqCUJ74OR+FWqACqN9oulanF5V9p1pcx9ds0KsP1FXqKAONn+GXh8SNNpbX+i3DHJl0y7eL1428pjn+7UP2D4gaES1nqth4ithz5F9F9mnx6LInyn6stdxRQBx1r8Q7KO4Sz8QWN3oV4x2hbxcxMf9mUfKR6dK6+ORJY1kjdXRhkMpyCKivLK11C2e2vLeOeBxho5FDA/ga4a90DVfA+/U/CjSXWmKd9zosrZG3uYCeVb/AGehx+YB6BRVDRtYs9f0i31Owl8y3nXcpxgj1BHYjpV+gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACqerTSW+jX00TbZI7eR1YdiFJBq5VDXf+Rf1L/r1l/8AQDQBzvwrkspfhpoj2TBlMH705yTLk78++7NdjXknhLSdX8J+FdH1vw7A17YXlhBLf6VuwTIY1zLFnox7r3rv9B8XaP4iUrZXQW5TiS1mGyaM+hU80AblFFFABRRRQAUUUUAFFFFABSEZBFLRQB5vpN5q/wAPo7mz1TRprvSpLqWdL+wHmlA7Fvnj6jGeoz0rtdF8Q6R4itftGk6hBdxj73lt8y/7y9R+NadcxrfgPRdZuxqEaTabqq8rqGnyGGbP+0Rw49mB4oA6c8CuQ8EaHd2M+tatqcDRahqV67lS2dsS8J09hmqpuvG/hj/j7gi8Taev/La2UQ3aj3T7r/hjoa2tE8Z6Hr0hgtbvy7sfetbhTHKv/AW5oA36KKKACiiigAooooAKKq3+o2Wl2j3V/dRW0CDLSSsFArirrW9X8c7rDw1HJZaO52XOsTIVLKeogU8kn+8eBn3oAX4aXMM134titJFayi1mQQKn3VBVS2P+BE131ed/CzTLXRbrxbptkhS2ttWMcak5OBGnU16JQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABVDXf+Rf1L/r1l/9ANX6oa7/AMi/qX/XrL/6AaAM3wF/yT3w5/2Dbf8A9FipNc8H6J4hYS3tmBcr9y5hYxyp9HXBqPwF/wAk98Of9g23/wDRYroaAOI/sXxvoOP7H1221m1XH+i6whWUKOyzIOSenzLgUL8QLrTlx4m8K6vpZUZeeBBd26+nzx8/+O129FAHP6b448MasypZ63ZvKy7hE0myQD3VsEfiK3Y5Y5V3Rurr6qc1nal4a0PWFkGo6TZ3Jk+80kKlj/wLrWC/wx8Oh0ayF/pypjalleSRqDnPTOKAOyorjF8G63bStLZ+NtVzzsiuEjkQfXjJog0z4gWzbm8RaVdqF4jksCmT/vBqAOzoriRc/EtCAdO8NyDPJ+0yqcf98mpbrX/Glq6qPBsN1xy1vqK4/wDHgDQB2NFcQ3izxio/5J5ct9NTgp0Xi3xW2PM+Ht+nrjULc4/8eoA7WiuOfxX4mGNngHUW9c31uP8A2aoB4u8Yk/8AJOrsD1Opwf40AdxWNrnhTRPEcYXU7COVx92VcpIn0cYI/OsIeJ/GjyKq+A3jB6tJqUWB+VS3F78Q3kU2mjaDFGRyJ72RmH5IBQBXbR/Gfhkb9E1Ndesl62GqNsmx/sTgdfZhj3rjYPjdDY/EKWw1S2urXTLhUSVLkDfZTgbTjaSGQ4B/HPqD2stj8QdUsJYLi90PT2f5T5MMk2V+pIxXIH4A2N9Ew1LUYo5C+4NY2ojJ9cliaAPYo5o5oUmjkV43AZXU5BB7g1n6h4i0XSojJqGq2dsgOMyzKvPpya5Ww+FGkWljbWk2qa1cJANqKb50XGc42rgVt2HgPwrpsry2ug2KyP8AeZ495Pf+LNAGbL8TdFlkeHRrTVNbnQ4KadZswHvvbC49waYLj4ha6dsVnpvhq1JIMk8n2y5x2IRcIPoScV2qIs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']	['phy_968_1.jpg', 'phy_968_2.jpg']
phy_969	OPEN	<image_1>As shown in the figure, smooth parallel metal rails\(cde\) and\(fgh\) with a spacing of\(L\) are smoothly connected by a quarter-arc guide rail and a horizontal guide rail of sufficient length.\(d\) and\(g\) are the lowest points of the arc guide rail. There is a vertically upward uniform magnetic field in the area on the right side of the dotted line MN perpendicular to the guide rail. The magnitude of magnetic induction is\(B\). The conductor rods\(a\) and\(b\) are fixed at the highest point of the track and released by rest\(a\). It is known that the mass of the conductor bars\(a\) and\(b\) is both\(m\), the resistance is both\(R\), and the gravity acceleration is\(g\). If the speed at which the\(a\) rod moves to the\(dg\) position is\(v\), the\(a\) rod stops and releases the\(b\) rod, and the final distance between the two rods is calculated.		\(\frac{mvR}{B^2L^2}\)	phy	电磁学_电磁感应	['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phy_970	OPEN	<image_1>As shown in the figure, the smooth arc-shaped guide rail is tangent to the horizontal guide rail at\(b\), and the right side of\(b\) is in a vertically upward uniform magnetic field. The magnetic induction intensity is\(B\). The width of the horizontal guide rail of the\(bc\) section is\(2d\), and the width of the horizontal guide rail of the\(cd\) section is\(d\). Both the track of the\(bc\) section and the\(cd\) section are long enough. Metal rods\(P\) and\(Q\) made of the same material are placed on the\(ab\) and\(cd\) sections of the track respectively. It is known that the mass of the metal rod\(P\) is\(2m\), the rod length is\(2d\), and the resistance is\(R\). The mass of the metal rod\(Q\) is\(m\), and the rod length is also\(2d\). Now the metal rod\(P\) is released at no initial velocity from a height of\(h\) from the horizontal track. The two metal rods are always in good contact with the guide rail and perpendicular to the guide rail during movement. Regardless of other resistances and air resistance, the gravitational acceleration is\(g\). Find the current in the loop when the two metal rods are closest to each other.		\(\frac{Bdv_0}{4R}\)	phy	电磁学_电磁感应	['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phy_971	OPEN	<image_1>As shown in the figure, there are two smooth semicircular arc tracks of equal height, with a radius of\(r\) and a spacing of\(L\). The tracks are vertically fixed and have no resistance. A resistor with a resistance value of\(R_1\) is connected to the left end of the track. The whole device is in a vertically upward uniform magnetic field, and the magnetic induction intensity is\(B\). There is a metal rod with a length slightly larger than\(L\), a mass of\(m\), and a resistance of\(R_2\) connected to the circuit starts from\(ab\) on the left end of the track.(Note as the moment of\(t=0\)), under the action of variable force\(F\), make a uniform circular motion along the arc track at the initial speed\(v_0\) to\(cd\), and the diameters\(ad\) and\(bc\) are horizontal. During the whole process, the metal rod and the guide rail are in good contact. Calculate the amount of electricity\(q\) passing through the resistance\(R_1\) during this process.		\( \frac{2BLr}{R_1 + R_2}\)	phy	电磁学_电磁感应	['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PaLc3bMI2YKNq5Oay4vHOjTTJErzbnYKMxnqaUaNSS5oq6CeJowlyykkzpKKztW1q00W3Sa8ZgrttXaueazbfxvo9zcxQRvNvkcIuYzjJOBRGjUkuaK0CeJowlySkkzo6KzNX12y0RImvGcCQkLtXPSqNp4z0i9u4raF5vMlbauYyBmiNGpKPMloEsTRjLklJJk3i//kUtS/64n+Yo8If8ilpn/XEVS8c6rbWfh+4tJS3nXUREYC5HBHU1V8HeJNPbS9N0oNJ9qEezGzjIyetCpzcbpHXKtTjh7OX2rfOx2VFZOreI7DRZY47xpA0gLKETPFQaf4u0vU71LS2aXzXztDRkDgZoVGo48yWhyPE0VPkclfsbtef/ABd8Haj4w8LQxaTsa+s5xPHE7BRJwQRk8Z570X/xl8JadqNzYzzXfnW8rRSbbckblOD+oqv/AMLx8G/89b3/AMBzWV0b2Y3+yfGfifwrLHr9tbWUkNuwgsYJd32iYLhWlboFBwQoPXGelHwn8J+IPD2gW1trOyySCSRxawuGaZ2P35GHHA4Cg+57Yd/wvHwb/wA9b3/wHNH/AAvHwb/z1vf/AAHNF0FmekUV5v8A8Lx8G/8APW9/8BzR/wALx8G/89b3/wABzRdBZnpFFeb/APC8fBv/AD1vf/Ac0f8AC8fBv/PW9/8AAc0XQWZ6RRXm/wDwvHwb/wA9b3/wHNH/AAvHwb/z1vf/AAHNF0FmekUV5v8A8Lx8G/8APW9/8BzR/wALx8G/89b3/wABzRdBZnpFFefWPxl8I6hqFvZQzXfm3EixJutzjcxwP1Neg0xBRRRQBBeJcyWkiWc8cFwR8kkkRkVfqoZc/nXn/h/4Z6noPjO68T/8JSLu8vMrdLNYDDoWUkDD/L90AemOhr0eigDkvH/gaDx3o9vZSXrWUtvOJop1j3lTjBGMj+fal1HSbyLwHqdnrl7Bqzx2kmyVrURk4Q4LDcwLe4xXWVn67a3N9od7Z2YhM1xC8SmZyqjcCMkgE9/SgCh4H/5EHw9/2Dbf/wBFrW/WT4Y0+70jwzpumXvkmazto7ctC5ZW2KFzyARnHStagArlfGvjvTPBliGuCZ76Xi3tIz87n1PoPesnxv8AEhNEuF0TQYf7S8QTHasKDcsPu2O/t+eKz/CHw/ezvj4h8TT/ANo69N85MnzLAT2HuPXt2rKrWjTWpSjcztD8G6t4v1WPxN44Yt/Fa6Z0SNT03Dt9Ovr6Vr/EDwMPEFjHfaT/AKNrVkubeSJthdR/BkdPY9q7mqGs61p+gabJf6lcLBbp3PVj6Adz7V5zqzlPm6mhwfwah8M3Gj3Fp/Z6Lr0DkXy3ahpGOeoyOnbHY9evPqH9kab/ANA60/78r/hXjnhTS9X8a/EFfGllbtommRkAPj57sDqCOhyOCenpk817fXqRba1M5blP+yNN/wCgdaf9+V/wo/sjTf8AoHWn/flf8KuUVRJT/sjTf+gdaf8Aflf8KP7I03/oHWn/AH5X/CrlFAFP+yNN/wCgdaf9+V/wo/sjTf8AoHWn/flf8KuUUAU/7I03/oHWn/flf8Ky/Eel6fF4a1N47G2R1tpCrLCoIO09OK6CsrxN/wAivqn/AF6yf+gmhbmlL44+qMvwbptjP4S0+SWytpHZGyzxKSfmPfFbv9kab/0DrT/vyv8AhWX4J/5E7Tv9xv8A0I0nizxno/g7Tjc6lOPNI/dW6EGSU+w9Pc8U3uVX/iy9X+Zeu7PRLC1kubu1sIIIxueSSJFVR7kivAviB8UbTUhJpnhmxt7e05WS88hRJIPRePlHv1+lcv41+IWseNbv/SXMFgh/dWkZ+Ue7f3j7n8K6T4f/AAfvvERj1HWhJZaZwVTGJJx7f3R7/lUXvsQlbVnH+EvBur+MtSNrpsP7tMGa4fhIh7n19utfS3g34d6L4PsQkMK3N464mupUBZ/YD+Ee1cn8H7WLTPE3jbS4E2Q2t/sjTOcIGkC/oBXrVNCk76ES2tujBlgiVh0IQAinSRRygCSNHA7MM0+iquyLLYiS1t42DJBErDoQgBrO8TRo/hnUyyKxW1lKkjODtNa1ZfiT/kWNU/69Jf8A0E0XdzSklzr1RneBYYh4TsJPLTzNrfNtGfvHvXQyQRS48yJHx03KDisHwN/yJ9h/ut/6Ea6Kht3KxCXtZ+rIkt4Im3Rwxo3qqgGlkghlIMkSOR03KDUlFF2Y2VrEcdvDEcxwxofVVAokt4ZSDJFG5HdlBqSii7CytYjjghiJMcSIT12qBSPbwStukhjdvVlBNS0UXYWVrEccEUWfLiRM9dqgZrnfHcMR8IahKY08wBPm2jP317101c747/5EvUfon/oa003c2w6XtYeq/Mv+H4408PacURVLWsRJAxk7BV57W3kYs8ETMepZATVTQf8AkXdM/wCvSL/0AVoUru5FRLmfqMjijiBEcaID1CqBTWtbd2LPBEzHqSgJNS0UXZFlsMjijiXbGioPRRimNaWzsWa3iLHqSgyamoouwshqRpEu2NFRfRRgVE1paklmt4SepJQVMzKoyxAHqaw/EVjqupiC0sZ0gtZCftEmfmx6CqprmlZuxnVlywuo38i3Z6lp2oSXVlYzLugGH8oYC5zyD0Nch4L06K28Va7ayYnEW0BpFBJ5PNdlpGj2mjWYt7VMd3c/ec+prmfC/wDyPPiT/eX+ZqpSSbUNjpwkZOlN1Er26eqOzVERQqqFUdABgVF9jtf+faH/AL4FT0VndmTSY0IqpsVQFxjAHFRfY7X/AJ9of+/Yqeii7BpMbsXZs2jbjGMcYqL7Fa/8+0P/AH7FT0UXaBpPcaUVk2FQVxjBHFRfY7X/AJ9of+/Yqeii7QNJ7jWRHQoygqeoI4rh9aghT4jaIixIFKHKhRg9a7quJ1z/AJKTof8A1zb+tOLOnCpc79H+R2jxpIpV1VlPYjIqMWdsCCLeEEdCEFTUUrs5mk9xrxpIu2RFZfRhkVGtpbKwZbeIEdCEFTUUXYNJjXijlXbIiuvowzUa2tujBlgiVh0IQAipqKLsLLcZJFHKAJI0cDswzTUtbdGDJBErDoQgBqWii7Cy3MLxiiN4T1EsqkrESCR05FJ4PgiHhbTZBEgcwj5toz+dP8X/APIpal/1xP8AMUeEP+RS0z/riKd9Dpsvq3/b36GxJDFLjzIkfHTcoOKaltBE26OGNG9VUA1LR0pXZzWV7nk3wks7W9u/F09xbQzE6s+C8YbHLHjP1r03+yNN/wCgdaf9+V/wrzf4Fnz/AA9rN5/z8am7Z9tqn+pr1SpRT3Kf9kab/wBA60/78r/hR/ZGm/8AQOtP+/K/4VcopiKf9kab/wBA60/78r/hR/ZGm/8AQOtP+/K/4VcooAp/2Rpv/QOtP+/K/wCFH9kab/0DrT/vyv8AhVyigCn/AGRpv/QOtP8Avyv+FH9kab/0DrT/AL8r/hVyigCn/ZGm/wDQOtP+/K/4Uf2Rpv8A0DrT/vyv+FXKKAKsemWEUiyR2NsjqchliUEfjirVFFABRRRQAUUUUAFFFQXl5bWFpLdXc6QW8SlnkkbAUD1NAExIAJJwB1JrynxR8QtQ17U28MeBAJ7o5FxqKn5IR0O0/wDs35ZrO1PxDrnxUv5dJ8NmSw8OxnbdXzjDTD0Ht7fnXoHhzw1pnhbTFsdMg2JwXkbl5D6se5rmrYhQ0W5cY9zL8G+BNP8ACVu0oP2rU5h+/vJOWYnkgZ6DP5966uiuK8afECDw866XpsX9oa7P8sVrH82wnoWx/LqfbrXn2lUl3ZZp+LfGWl+ENP8APvZN9w4Pk2yH55D/AEHvXJaD4J1fx3qUfiLxuGis15tNK5AAPOWHYdPc98Vq+DfhxOuof8JJ4wlF/rUhDJEx3Jb+nHQkfkP1r0uvRo0FDV7kOXYZFFHBEkUSLHGgCqiDAUDoAKfRRXQQFFFFABRRRQAUUUUAFZXib/kV9U/69ZP/AEE1cv7+00yylvL64jt7eJdzySNgAV4P4v8AjBN4g1KHSNCDQaY8oSaZh884J6Y/hX9TRfU0oq84+pq3/wAWbXwp4Qs9K0xBc6wIyG3f6uDLE5PqeRxXjks2t+Mdf3ObjUdSumwAOSfYDoAPyFdHp3gXWPGniu7isIvLtkceddSDCJwPzPsK+hfB3gTR/BliIrGLzLplxNdyAb5P8B7D9aT1ZpXaVWXqzjPh98G7PRRDqfiFY7vUQQyW5GYoT2z/AHm/QfrXrWMUUUzBu55Z4P8A9B+N/jKw6efFHcgev3T/AO1K9Trym5b+zP2irWTomo6cYyfUgH/4gV6tSQMKKKKYgrL8Sf8AIsap/wBekv8A6Ca1Ky/En/Isap/16S/+gmhF0vjj6lHwN/yJ9h/ut/6Ea6Kud8Df8ifYf7rf+hGuipvcvEfxZerCiiikYhRRRQAUUUUAFc747/5EvUfon/oa10Vc747/AORL1H6J/wChrTW5th/40PVfmaWg/wDIu6Z/16Rf+gCtCs/Qf+Rd0z/r0i/9AFaFIip8b9QooooICkY4Un0Has3WtctNDtPOuGy7cRxL95z7f41S8OS6zetNfaltigmA8m3xyo9fyrRUpcnO9vz9DF14+0VJav8AL1MjyNT8Y3ebhZbLSI24QjDSEf5/Cu1jQRxqi/dUACnUU6lXnskrJdBUaCp3k3eT3YVxXhf/AJHnxJ/vL/M12tcV4X/5HnxJ/vL/ADNZrZnoUP4dT0/VHa0UUUjmCiiigAooooAKKKKACuJ1z/kpOh/9c2/rXbVxOuf8lJ0P/rm39aaOnC/G/R/kdtRRRSOYKKKKACiiigAooooAxPF//Ipal/1xP8xR4Q/5FLTP+uIo8X/8ilqX/XE/zFHhD/kUtM/64in0On/mG/7e/Q26p6vcfZNGvrnOPJt5JM/RSauVzHxEvPsPw+1ubOD9lZB9W4/rSOY5z4G2/k/DtJMY865kb+Q/pXpVcf8ACy0+x/DbRUIwZIfNP/AiSP0IrsKEN7hRRRQIKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvLPjho91e+GYtRjv8AZb2ThprN5AiTgnqPVh6emcc11njHx1pHgyx8y9k8y7dSYLSMjfIe30Ge/wDOuH0vwfr3xE1CPXPG7PbacnzWmlISvHq3p+PJ9hSY13Om8A63o+t+FrZ9HgjtY4VEclqowYm7j3z1z3+tdRXlnivw9d/DjXR4t8MW5/sp8LqNhH91Vz94DsP5H2NQ3niPW/ifetovhRZbPRuFvNRkUg4PVR/h1PsK8+eGlz2WxpdWNDxP48vtR1Q+GPBURvNTf5ZbtcGO3HQ4PTI9eg9zXS+B/h3ZeE0a8uZPt2tT8z3knJBPULnoPfqf0rW8J+D9K8H6WLPTYRvbmadgPMlPqT/ToK367KdKNNWRDlcKKKK1JCiiigAooooAKKKKACuZ8YeOdH8GWBmv5g9yw/c2sZHmSH6dh7muO+IHxjs9CEmm6A0d5qPKvNnMUP8A8U3t0/lXg6prfjDXiB9o1HUrpsk9Sf6AD8hSbKUTS8ZePNZ8aX2+8lMdop/c2kZ+RP8AE+5rpfCfwr1OfSZvEeq77K3tomnt4WH7yUqMgkfwr9eT+tejfD74P2Ph0Q6lrQjvNUHzLGRmKA+395h6/l613vibjwtqn/XrJ/6CaEtdTSm/fil3KfgdFXwdp5VQNysTgdTuNdDWB4J/5E7Tv9xv/QjW/VPcVf8Aiy9X+YUUUUjI8o+KAOl+PPBeuDhFuTbyN6AkYz+DN+Ver1578aNMN/8ADy4nQHzbGaO5QjqMHaf0Yn8K67w3qo1zwzpmqDGbq2SRgOzEfMPwORSH0NSiiimIKy/En/Isap/16S/+gmtSsvxJ/wAixqn/AF6S/wDoJoRdL44+pR8Df8ifYf7rf+hGuirnfA3/ACJ9h/ut/wChGuipvcvEfxZerCiiikYhRRRQAUUUUAFc747/AORL1H6J/wChrXRVzvjv/kS9R+if+hrTW5th/wCND1X5mloP/Iu6Z/16Rf8AoArQrP0H/kXdM/69Iv8A0AVoUiKnxv1CsLXPE0GkOltFGbq9kICwIeR9avwatY3t5PZW9wHniHzhe341T0fwzaaTcS3Rdrm6kJJml5Iz6VtBQi71F8u5x1ZVJpKi15vt/wAEvPY21+ba5u7RDNGNyhxkoT1FXKKKybbOhRS1CiiikMK4rwv/AMjz4k/3l/ma7WuK8L/8jz4k/wB5f5mmtmdND+HU9P1R2tFFFI5gooooAKKKKACiiigAridc/wCSk6H/ANc2/rXbVxOuf8lJ0P8A65t/Wmjpwvxv0f5HbUUUUjmCiiigAooooAKKKKAMTxf/AMilqX/XE/zFHhD/AJFLTP8AriKPF/8AyKWpf9cT/MUeEP8AkUtM/wCuIp9Dp/5hv+3v0NuvNfjfetD4ESwi5m1C8igVR1IGW/moH416VXk/j8/238V/CGhL8yQMbuRfxz/JKlnOtz03S7FNL0iz0+P7lrAkK/RVA/pVuiimIKKKKACiiigAooooAKKKKACiiigAooooAKKKKACsHxVdeIINMaPw3YRXN9IMCSaQKkXvg9T7VvUUAfPlj4F+I9n4ifXp9P0/UNRY7hLeyiTYexAyACO3p2rrvtnxk/6B2ifn/wDZV6rRSsO55PNN8YLiB4ZtL0KSKRSro2CGB6g/NVbS7b4raLYR2Om6LoFtbR/dROB9fvcmvYaKLBc8q+2fGT/oHaJ+f/2VH2z4yf8AQO0T8/8A7KvVaKLBc8q+2fGT/oHaJ+f/ANlR9s+Mn/QO0T8//sq9VoosFzyr7Z8ZP+gdon5//ZUfbPjJ/wBA7RPz/wDsq9VoosFzyr7Z8ZP+gdon5/8A2VH2z4yf9A7RPz/+yr1WuU8Z+P8AR/BdkXu5BNeOP3NpGfnf3PoPc0AcVqXiD4r6PYS32oQaBbW0Qy8kjAAf+Pcn2ripvi5qfiDS57DWrv7HG5xusEKM69wTycfTFcn4t8a6z401Hzr+UiEN+5tIydkf0Hc+55rU8MeCmi8YeH7TxVZzW1lqhLRoW2s+M7Qe4y2Bjg4NOE+WV7X9RVKfPG17ehPoXw8PjK6jHh8zpZoxFzd3K/InsvTc3XgfpXr+heENU8GebbeH7CyaM4BupsGWUf7Rzxz2HFegWdla6daR2tnBHBbxjakca4AH0qetVUSk5cq/QxlRbgoc70631MnRH1p0m/tiK3Qgjy/KPX1zz9K5/wASy+J/7P1NTBaDT/LcFgfm2Y+vXFdtWV4m/wCRX1T/AK9ZP/QTQqnvN8q1LpUXzQjzPR999epl+ADdnwtbi4WMRDPkFepXJzn8c0lxN4yFzKILax8redmT/DnjvVvwT/yJ2nf7jf8AoRrfojU5ZN8qZWLo89SS5mtXt6mdo76q9kx1aOFLjedoiPBXAxn8c1iST+NPNfy7ax2ZO3nt+ddZRRGrZt8q1MJUHKKjztW89/UwZLC/1rwrfafrEcKT3MUkX7vpgjAP515r8K9U8Tv4al0qyitmOmTtBIk33kJJOOvrn8q9oryXS2PhX48ajYn5LTXofPQdjJyc/mH/ADqVUtPmsv0LdLmp8nM/Xqel2Dak2lBr2OFb7DfKh+XPb+lYHn+Nv+faw/z+NddRVRq8rb5U7kToOSS52rdnv6mfbvqZ0bdPHANR2H5FPybucf0rk9Ym8XnRL4XVvZC3MD+aV6hdpzjn0rvKy/En/Isap/16S/8AoJojVtf3VqawouVSHvNWt139TK8JG5XwFbGzVGuRG/lh/ultxxmovP8AG/8Az7WH+fxq54G/5E+w/wB1v/QjXRU41OS65U/UrG0faVpPma1e3qUJ21IaNuhjhOo+WPkJ+Tf3/DrWB5/jf/n2sP8AP411M1xBbLunmjiX1dgo/WohqVibJr37ZB9lXOZvMGwY9+lKFXl+ymYVKDm177XoyG+fU10jdZxwtf7V+Vz8meM/1rBE/jbIza2GPr/9eurhmjuIUmhkWSNxuV0OQw9QafRCryq3KmFSg5u/O16Moao2pLp2dNjha7yOJD8uO9YKT+Nd67rWwxnnn/69dbRRCryq3Kn6jqUHOV+dr0Znaw+qJZqdKjhe43DIlPAFcV4ol8VN4cuxqMFotphfMMf3vvDGOfXFejVzvjv/AJEvUfon/oa0QqWXLyo2o0ebEwnzNarTpuJG+rJ4V0k6RHA8v2eLf5p6LsHSs+4i8Z38f2aX7LbxyHDyRHBA7966PQf+Rd0z/r0i/wDQBWB4g8eW2m6xFoOk2j6tr0vItIWAWIf3pHPCj9acK3IrKKMsThvaVJNya8k9Cc6NfaDYxReH4IJJmP7+Wf7zfrTrGbxab6EXlvZC2LfvCp5A9uagnPj9bVp4j4eaUDd9l2THP+z5m4c++2o/AXj638aW93E9q9lqli/l3Vo5yUPTIPcZBFP27a95Jvv1M1hUmuSTSXRbGzrcmuIYf7Hit3Bz5hlPI9Mc/Wqmmy+Km1CIahb2a2pzvKHkcdufWujoqVVtHl5V+pcqDc+fnfpfQxtbk15JYho8Ns6YPmGU85/Oq2lS+KG1BBqUFotrg7yh+YccY59a6KihVbR5eVfqDoNz5+d+l9DD1mTxEl0g0mG1eDb8xlPO7865jwY2onxprH2lIg5H+kbezZ4xXodcV4X/AOR58Sf7y/zNHPePLZHXh6VlVlzPVLTpujX1iXxIl6BpUFq9vtHMh+bd3707RZPET3TjV4bVINnymI87sj36YzW5RR7X3eXlXr1OT2D5+fmfpfQ5/VpfE63zDTILRrbAwZD82e/epdFk8QPPINXhtki2/IYjzn8626KHV93l5V+oKg1Pn536X0Oc1KXxUuoSjT7eza1GNhc/MeO/PrVvRJNcczf2xFboBjyzEeT655rYoodW8eXlX6hGg1Pn536X0Oa1CbxYt9KLG3szbA/uy55I9+av6I+tus39sRW6EEeX5R6+uefpWtRRKrePLyr9QjQcZ8/M35X0OXvJvF4vJha21kYNx8ssedvbPNc+z6s/xA0Y6vHCk2G2iLpjB6816RXE65/yUnQ/+ubf1purzLl5UjpwVBxquXM3o9G9Ni5cTeMhcyiC2sfJ3nZk/wAOeO9bOjvqr2THVo4UuN52iI8FcDGfxzWjRSlV5o25UjmhQcJc3O36vQ5OWfxp5r+XbWOzcdvPb863NKfVG08nU44VusnAjPBHbNaFHaidXmVuVIKdBwlzc7fqzwnxJrHjy++J1jplg1uL2yiMyW8chWJgRkmTnB4roftnxk/6B2ifn/8AZU34bAeIfiF4s8V53QCX7Hat2Kg8kfgqf99GvV6yb5nc3iuVKO9jyr7Z8ZP+gdon5/8A2VH2z4yf9A7RPz/+yr1WilYdzx/U7r4pPptwus2OkppxX/SGiPzBfb5qNMuvikmmW66NY6S+nBP9HaU/MV9/mr0Xxf8A8ilqX/XE/wAxR4Q/5FLTP+uIquh03/2b/t79Dhftvxk/6B2ifn/9lXEeH7nx94h8cal4j02006fUbQfY5S/ESdvk+bn7p5z3PrXuPjDWk8P+EdT1Nm2mGBtnu54UfmRXOfB7RX0nwFbTzri51Bmu3z1w33f/AB0A/jUnPfQyPtnxk/6B2ifn/wDZUfbPjJ/0DtE/P/7KvVaKLCueVfbPjJ/0DtE/P/7Kj7Z8ZP8AoHaJ+f8A9lXqtFFgueVfbfjL/wBA7RPz/wDsq9M09rttOt2v0jS8MamZYjlQ+Oce2as0UxBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAeTfEj4vJ4enm0bQ1WbUk+WadhlID6AfxN+g968JtbTWvF+umOFbjUNRuG3MzHcT6kk9B+le0eKvgdNrfi251Ox1SKC0vJjNOkiEujMcttxwcnJ5xjNek+FvCGj+ENP+yaXb7S2PNmfmSUjux/p0qbNlXSWhyXw/+Een+FxFqOqBL3VgMjIzHCf9kHqfc/hTPjVp8q+H9P8AEFqv7/SLtJSR1CEgf+hbfzr06qGtaZFrOiXumzAGO5haI59xjNOwr6kml38WqaTZ38LBormFJVI9GAP9at15l8FtUlbw9e+Hrsn7Xo9y8JVuoUsf5MGFem0xMKyvE3/Ir6p/16yf+gmtWsrxN/yK+qf9esn/AKCaa3NKXxx9UVfBP/Inad/uN/6Ea36wPBP/ACJ2nf7jf+hGt+h7jr/xZer/ADCiiikZBXmPxl0+e303S/FVgMXujXKybvVCRwfbIH5n1r06qmqabb6xpV1p12u63uYmicDrgjHHvQCE0nUodY0i01G3OYbmJZV9sjOKuV5d8INTnsU1TwZqLf6ZpE7eUT/FET2+h5+jD0r1GgGFZfiT/kWNU/69Jf8A0E1qVl+JP+RY1T/r0l/9BNCLpfHH1KPgb/kT7D/db/0I10Vc74G/5E+w/wB1v/QjXRU3uXiP4svVnmvxwk0+2+Hl1LcWsEt5O6W1tI8YLqzHJ2nqOFJrM0/4dnxZ8O7LSrm/mtLCCBFslhHyyPwWnccbgx3bQeg56moviRCPF3xU8L+Em+e0gDXl0nYjrg/gpH/Aq9hVVRQqgKoGAAMACkYlDQ9Jh0LQrHSoGZ4rSFYlZupwOtaFFFABRRRQAVzvjv8A5EvUfon/AKGtdFXO+O/+RL1H6J/6GtNbm2H/AI0PVfmYHi/xj/whfwstL+Fl+2y20MFqDz+8KDnHsAT+FVvg14X/ALK8KjXL7dLq+sf6RNPKdz7DyoyfXOT659hXnfxu82ax8DWrsVtntOvbcRGD+Qx+dfRUEMdtbxwQqEijUIijoABgCkRU+J+pJXgfw/nab9orxO9l/wAezC583HQgSKM/99Y/OvW/G3ii28IeFL3VrhwHRCsCZ5klP3VH4/oDXl/wk06Xwn4T1Txvq9pcyzX4MiJFHl/JGWLc9ATzz2A9RQQe40Vn6Dq0evaBYatFE0Ud5Akyo5yVDDODWhQAUUUUAFcV4X/5HnxJ/vL/ADNdrXFeF/8AkefEn+8v8zTWzOmh/Dqen6o7WiiikcwUUUUAcL8RvG2reCNNS/t9Ks7q2eVYVZ7plkLsCcbAnTjru/Cszxf8TtT8PaPZtYaL9vvyYo7xlz5MEzqD5eRyWPp24z1rH+Lr3XiDxz4U8I6fhpmk+2SA8hQCcMfYBXNesaVplvpGnRWdsuETJZj1dycszHuSSST70AWomZ4UZ12OVBZc5wfSn0UUAFcTrn/JSdD/AOubf1rtq4nXP+Sk6H/1zb+tNHThfjfo/wAjtqKKKRzBXN+PtaGgeCNVvw22RYTHH/vt8o/U10leTfFOV/Efizw54LgYlJ5hc3Sj+4M4z+Ac/lQxo6P4T6KdF+HunLIm2a6U3Tg9fn5H/juK6jV9XsNC0ybUdSuUt7WEZeR/5D1PtVxEWONURQqqMAAcAV4/8RJj4m+LfhbwXKSNOX/TblM8SkbjtPthMf8AAjQB1sHifXtT0q41uGzs9J0eOJpopNR3PLKgGd5RSNgI9ST7VpeBvFQ8ZeFbbWRbG3aRnRkzkZViCVPocZ/St+SCGW2a3liR4GXY0bKCpXGMEelMs7S2sLSO1s4Ire3jGI4okCqo9gOBQIy/F/8AyKWpf9cT/MUeEP8AkUtM/wCuIo8X/wDIpal/1xP8xTPC0qQeDLCaVgscdvuZj0AGSTT6HT/zDf8Ab36HDfFqeTXdb8PeCrViXvbgT3AXtGMjJ9sBj+FepwQpbW8cEShY41CKB2AGBXlPwzjk8VeNNe8cXKkxGQ2llu/hUYzj/gO38zXrVSjnfYKKKKYgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK888YePda8N+J9I0S20iznbVpvKt5DcsSo3KCzKFGPvZ69jXodeIalrNle/tASXd7IxtNBtfLRUQuzzEcKqjJLZY8D+6fSgD2+iuL0X4naHrPiL+wWg1DTtSIzHDf2/lGTv8vJ7Dviu0oA8j1tv+EI+NNjq6/u9N15PIuOy+ZwM/XO0/ifWvXK4/wCJfhn/AISjwXdW8SZvLf8A0i2I6h1HQfUZH40vw18UHxV4MtLqZ915CPIufUuo6n6jB/GkPodfWV4m/wCRX1T/AK9ZP/QTWrWV4m/5FfVP+vWT/wBBNUty6Xxx9UVfBP8AyJ2nf7jf+hGt+sDwT/yJ2nf7jf8AoRrfoe46/wDFl6v8wooopGQUUUUAeSfEWGXwb420nx3ZITA7C11FB0ZTxn64/VVr1e3niuraK4hcPFKgdGHQgjINUPEGiWviLQbzSrxQ0NzGUz3U9mHuDg/hXB/CXXLq3W+8F6u2NQ0hysW7q8Of1xkY9iKQ+h6fWX4k/wCRY1T/AK9Jf/QTWpWX4k/5FjVP+vSX/wBBNNFUvjj6lHwN/wAifYf7rf8AoRroq53wN/yJ9h/ut/6Ea6Km9y8R/Fl6sh+yW32n7T9ni+0Yx5uwbsemetTUUUjEKKKKACiiigArnfHf/Il6j9E/9DWuirnfHf8AyJeo/RP/AENaa3NsP/Gh6r8zD8S+Brbx58O9NsJJBBdQ28UttPjOxtgBB9iOv4elSaLqPjrS9Lg0/U/DaahcwIIxewX8apKBwGYNhgfXiuq0H/kXdM/69Iv/AEAVoUmRU+N+p5zN4B1Pxfr0Gq+NbmFrO1O620i0YmJT6uxwWPr0/Liup8WxpF4I1iNFCotjKFUDAA2Hit2szxBp1xq+hXmnW08cD3MTRGSRC4UMCCcAjn8aCDM+Hf8AyTjw5/2D4f8A0EV01Y3hXR7jw/4asNIuLiO4NnCsKyxxlNyqMAkEnmtmgAooooAK4rwv/wAjz4k/3l/ma7WuK8L/API8+JP95f5mmtmdND+HU9P1R2tFFFI5gooooA4nSfBN1bfE3VvF1/dwz/aYhBaxKpzCgwO/svb1NdtRRQAUUUUAFcTrn/JSdD/65t/Wu2ridc/5KTof/XNv600dOF+N+j/I7aiiikcxHPNHbwSTysFjjUuzHsAMmvKvhhHJ4n8W6/44u1yJZDa2Wf4Yxjp+AUfn61pfGDXp7TQIPD+nknUdakFugXqI8jd+eQPxNdh4X0KDw14bsdItwAtvGAx/vOeWb8SSaQ+hr15748+Ht7r2v6b4m8P6ilhrlgAivIpKSKCSAfzYe4OK9CopiOQg0nxbq8aQeItR0+2sx/rYdLjcNOP7rO5O1T3CjPvXWxxpDEkUahURQqqOgA6CnUUAYni//kUtS/64n+Yrzfxjr09t8N9D8OacS2pa0qwKiH5vLzhvzyB+Jr0jxf8A8ilqX/XE/wAxXmvwx0C61jxVc+JtSBaDT1+x2AYcZA5I+mT+LGm9jqX+7f8Ab36Hp/hjQ4fDfhux0mADbbxBWI/iY8sfxJJrWoopHKFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBW1G9i03Tbq+nOIreJpX+ijNeVfA/RlvLLU/Gd/Er6nql3IVlYcqmctt9MsT+QruPiDpWqa54G1TTNH8v7bcxhFEjbQRkbhn1IyKxfCWoz+H/CWm6DB4Z1lr+0gWN43gCRtJ1ZvNJ2bSxJ4J+lAHOeP7car8cvBNnZqPtdri5uHXqIlfcAT/AMAb/vr3r2OuP8KeEJtP1jUPEmtSRz67qBw5jOY7eMdI0z19z3xXYUAFePoT8OPi60Z/daF4iOR2SObP6YLfk3tXsFcr8QfCa+MPClxYIFF5H+9tXPGJB0GewPT8aGNHVVleJv8AkV9U/wCvWT/0E1zfwv8AFreI/Dn2S+Zl1fTT5F3G/DHHAY/XGD7g10nib/kV9U/69ZP/AEE0Iul/EXqir4J/5E7Tv9xv/QjW/WB4J/5E7Tv9xv8A0I1v03uOv/Fl6v8AMKKKKRkFFFFABXlnxS0a80nUbHx7oqf6ZpxAu1X/AJaQ9Mn14JB9j7V6nUc8EVzBJBMivFIpV1YZDA9RQNFLQdas/EOiWuq2MgeC4TcPVT3U+4ORTPEn/Isap/16S/8AoJry/Q55fhV48k8PXjk+HdWfzLKZzxC5PQn8gfwNeoeJP+RY1T/r0l/9BNCLp/xI+pR8Df8AIn2H+63/AKEa6Kud8Df8ifYf7rf+hGuipvcrEfxZerCiiikYhRRRQAUUUUAFc747/wCRL1H6J/6GtdFXO+O/+RL1H6J/6GtNbm2H/jQ9V+ZpaD/yLumf9ekX/oArQrP0H/kXdM/69Iv/AEAVoUiKnxv1CiiiggKKKKACiiigArivC/8AyPPiT/eX+Zrta4rwv/yPPiT/AHl/maa2Z00P4dT0/VHa0UUUjmCiiigAooooAKKKKACuJ1z/AJKTof8A1zb+tdtXE65/yUnQ/wDrm39aaOnC/G/R/kdtTJZEhieWRgsaKWZicAAdTT68x+LGu3NyLPwVozF9U1ZgsoQ/6uEnnPoDzn2BpHMih4IWTx78RNR8Z3SltPsCbXTVYcA+o98En6t7V67WX4c0O28N+H7PSbUDy7eMKTj7zdWY/U5NalA2FFFFAgoornPG/i218HeHJtRmKtOfktoSeZJD0H0HU0AcZ8UfF8g1G18K6ZueZ/398yfwRgZCn69T7Aetd14ORU8I6btULmLJwOpJPNeeeHfClzYeB9a8S64Gk13VovNkaQfNGhIIXHYnqR9B2r0Twh/yKWmf9cRTWx1P/dv+3v0NuiiikcoUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHkPjizuPAHjK38daXGWsblhDqduvTnjd+P8x716DrF9b6l4Ivb20kElvPZO8bjuCprT1HT7XVdOuLC9iWW2uEMciMOoNeLWN/d/D6bWPA+sO7afdQSvpNw3IOQfl9snt2b60Lc1pa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phy_972	OPEN	<image_1>As shown in the figure, two smooth parallel arc-shaped guide rails are placed vertically, and the lower ends are smoothly connected to two smooth parallel horizontal guide rails with a spacing of\(L\). The horizontal guide rails that are long enough are all in a vertically downward uniform magnetic field, and the magnetic induction intensity is\(B\). Place a conductor rod\(a, b, c\) slightly longer than\(L\) on the guide rail.\ The mass of (a\) the rod is\(2m\), the resistance connected to the circuit is\(R\), the masses of\(b\) and\(c\) rods are both\(m\), and the resistance connected to the circuit is both\(2R\). It is known that the distance between the\(a\) rod and the\(b\) rod is\(d\) at the beginning, and both are in a static state. Now let the\(c\) rod be released from rest from the height of\(h\) on the circular guide rail. If the\(c\) rod and\(b\) rod collide, they will stick together. It is known that the magnitude of the gravitational acceleration is\(g\), the resistance of the guide rail is not counted, and the conductor bar is always perpendicular to the guide rail and in good contact during movement. If the initial distance of the\(b\) rod from the left boundary of the magnetic field\(x_0 = \frac{mR\sqrt{2gh}}{B^2L^2}\) and the\(b\) rod does not collide with the\(a\) rod, try to calculate the Joule heat generated by the\(a, b, c\) rod during the entire process.		\( \frac{5}{8}mgh\)	phy	电磁学_电磁感应	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAFQBAQDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAq6ldmw0u7vBH5ht4XlCZxu2gnH6Vj+B/EzeLvClprL2628kxdWiVtwBVivB/DP41s6hF5+m3UJGfMhdcfUEV558DZifAktqx+a2vZUx7cH+ZNA+h6ZRRRQIKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAOoryr4QZsdZ8YaM3BtdQLAexLD/wBlr1RmVELuwVVGSScACvnS+udS1z4m6+3gvUJbeyvCi3V5FlQu0AMVbrywOMdc+lFm3ZBdJNs+jKK+ftW0vxH4LsG13TfFeo3L25UzQ3LlkcE45BJB6/8A169x0PUxrOg2GpBdguoEl2+hIyRVSi4uzJjOM1eJoUUUVJQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABVe9v7TTrZri9uYbeFeskrhR+ZovryDTtPub65cJb28TSyMeyqMk/kK8z+H8Nx8QL+bxtr0fmWyzNHpFm4zHCinBk29C2eMnuD7UAeg2HiHSNUuDBY6jbzzBd/lq3zFfUDuPetOuTuvB0958RrHxRLqjfZrK2aGGyWPGGbgndnofTHYV1lABTJZY4InlldUjQFmdjgKB3JptxcQ2ltJcXEqRQxKXeRzgKB1JNeKa94h1L4panJpGjNJa+GIXAubrbg3BHYe3oPxPpTSbdkJtJXY/wATeK9R+I+py+H/AA5I9vocTYvL8cecPQe3t378V0Wk6TYeH9LW0tI1igjGWYnlj3Zj61JZafp/h7SRb26pb2luhZmJxgdSzH+teb+JtZ1rxlp2pnQIJF0LT0LXVyfl87HYe3fH510pRoxu9zjbniJWWiNS+u9R+JGqP4b8OgLpisPtuoMMpgHOB+I49fpzXt2j6bFo2jWemwsWjtYliVm6kAYzWB8NItOT4f6RJptukMcsCvKF6mXGHJPc7ga6yueUnJ3Z1xgoLliFFFFSUFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBz/jjSrrW/A+s6bZf8fNxausYzjc2M7fxxj8a88+F3xB0PRfBtr4f1pptO1LT98bwSW8hMmXLAqApyeenXNex1GYITJ5hiQv/AHtoz+dAGboupXmrCW7ksXtLJsC2WdSszjnLMv8ACDxgHn1x0q/eXltp9pLd3cyQ28Slnkc4CgUzUdRtNJ0+a+vp0gtoV3PI54Arxm6udV+L2q4/e2PhG2k+UdGumHc/5wPrQk27IG0ldiapq2qfFrU2s7FpbHwrbviSTo1yR/np26nmuxSDTPDej7EEVnY2y5JJwAPUnuf1NT3EmleFtD3uYrOwtUAAHAHoB6k/rXD6Xo+q/FnU1vb4TWPhSByYogcPckH/ADz26Dua3TVJeZzNSrPsiK0tNV+LWpmKHzbDwrbv+8mxhrkjsP8APHfnivYrfw9pln4fbQ7W1SGxaJojGo7EYJPqfertlZW2nWUNnZwJBbwqEjjQYCgVPWLbk7s6IpRVkeX/AAZupbOw1nwreH/S9HvGXHqjEjI9sqfzFeoV5NqYPhL46WF+fkstfh8h27ebwMfns/76r1mpRTCiiimIKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOC+JnibVPDg0EaZMsX2u/WKYlA25eOOfrXe15X8bRtsfDs3aPU15/z9K9TU7lB9RmkPoLVLVtWsdD0yfUdRuEgtoV3M7H9B6k9hUeua7p3h3SptS1O4WG3jHU9WPYAdyfSvHEi1T4q6umq6wklp4dt2zaWWcGb/AGj6+5/AdzVJNuyJbUVdjydU+Lmrrd3olsvCltJ+5ts4a4I7n/Ht0HOTXdalqmkeENB864KW1nAoSOJByT2VR3P/AOs1T1zxDpfhDRRPcbI40XbBbx4Bcjoqj/OKwPC/g7UvHWqReKPGCFLFTusdMJONvUMw9P1PfjGdXamrLcxV6ru9ivoXhvVPifqkWu+Ike18PROWtLDkGb0J9vU9+g4r2aCCK2gjggjSKGNQqIgwFA6ACnoixoqIoVVGAAMAClrH1N/JBRRRQBwPxf0J9X8DzXVuD9r0xxdxMvUBfvY/Dn8K6LwdrqeJfCenaqrAvNEPMx2ccMPzBradFkjZHUMjAhgRwRXk/wAOZH8I+O9c8EXBKwSObuw3H7ykcgf8Bx/3yaQ+h61RRRTEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHmXxziJ8DW9yo5tr+KT8MMP5kV2Gq+J9N8O+GI9X1GcJB5SlQPvSMRkKo7k1z3xknsU+G+o293cRxSzGP7OrH5ndXVsAfQGvO/D+h6r4uew1bxSxNnaQpFZ2RGFKqoAYj3xk+v0wKcYuTshTnGEbyLdva6p8TNXTXfEKtBosTE2Wn7uGHqf6nv9K6fxH4p0/wAJaarSANMw229rHwXI6Aegqn4o8W2vhm1jhijFxqEuEt7SPqT0GQOg/nVzwL8O7k3w8UeLiLnVpfnht35W2HbjpuHp0H1reTVJcsdzmjGVZ80tir4N8A3+u6knivxqm+4OGtNPdflhXqCyn+X58161RRXOdQUUUUAFFFFABXmPxd0q5tY9N8ZaYp+26NKpkK9TET39gTz7Ma9OqG6tYb20mtbhA8MyGN1PQqRgigEVtF1a213RbPVLRw8FzEJFI7eoPuDkH6VfryX4dXU3gzxdqPgLUnPlM5uNNlPR1PO0e5HP1DV61QhsKKKKBBRR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phy_973	MCQ	As shown in the figure, Figure A <image_1>is a photo of the contact part of the bicycle generator and the wheel, and Figure B <image_2>is a diagram of the internal power generation device. It is known that the radius of the generator runner (the speed is the same as that of the generator coil) is\(r\), the area enclosed by the generator coil is\(S\), the number of turns is\(n\), and the resistance is\(R_0\). The magnetic induction intensity of a uniform magnetic field is\(B\), where\(P,Q\) is a fixed semicircular ring that always maintains good contact with the coil, and the external resistance is\(R\). When the bicycle is driving at a certain speed on a straight road at a constant speed, the total resistance encountered by the ground and air is\(F_f\), and the electric power consumed by the external resistor is\(P\). then ()	['A. Starting from the shown position, a sinusoidal alternating current flows through\\(R\\)', 'B. The frequency at which the direction of current flowing through the external resistor\\(R\\) changes is\\(f = \\frac{R_0 + R}{\\pi n BS} \\sqrt{\\frac{2P}{R}}\\)', 'C. Speed of bicycle\\(v = \\frac{(R_0 + R)r}{nBS} \\sqrt{\\frac{2P}{R}}\\)', 'D. Power of work done by the cyclist\\(P_A = \\frac{F_f (R_0 + R)r}{nBS} \\sqrt{\\frac{2P}{R}}\\)']	C	phy	电磁学_电磁感应	['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'phy_973_2.jpg']
phy_974	MCQ	<image_1>As shown in the figure is a schematic diagram of a small rotating pole generator. An ideal transformer is connected to a load resistor with a resistance value of\(R\), the primary coil is connected to an ideal AC voltmeter and an ideal AC ammeter, and the number of turns in the primary and secondary coils are\(n_1\) and\(n_2\) respectively. It is known that the generator coil area is\(S\), the number of turns is\(N\), the resistance is not counted, the angular velocity at which the magnetic poles rotate at a constant speed is\(\omega\), the magnetic field between the magnetic poles is approximately a uniform magnetic field, and the magnetic induction intensity is\(B\). The following statement is correct ()	['A. Maximum instantaneous current at the position shown', 'B. The power of the load resistor is\\(\\frac{n_2^2N^2B^2S^2\\omega^2}{2n_1^2R}\\)', 'C. The current direction points from P to Q when turning 90° from the shown position', 'D. Minimum instantaneous voltage when rotated 90° from the position shown']	B	phy	电磁学_电磁感应	['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phy_975	MCQ	<image_1>As shown in the figure, one end of the light spring is fixed on the smooth rotating shaft\(O\) on the horizontal plane, and the other end is connected to a small ball (which can be regarded as a particle) with a mass\(m\) set at the smooth fixed straight rod\(A\).\ The height of point (A\) from horizontal is\(h\), the angle between straight rod and horizontal is\(30^\circ\),\(OA = OC\),\(B\) is the midpoint of\(AC\),\(OB\) is equal to the original length of spring. The ball starts to slide from rest at\(A\), and passes at\(B\) at a speed of\(v\). It is known that the gravitational acceleration is\(g\), the following statement is correct ()	['A. Kinetic energy of a small ball at\\(C\\) point\\(E_k = mgh\\)', 'B. The acceleration of the ball when it passes through the\\(B\\) point is\\(\\frac{g}{2}\\)', 'C. The maximum elastic potential energy of the spring is\\(\\frac{mgh}{2} - \\frac{1}{2}mv^2\\)', 'D. Conservation of mechanical energy during ball sliding']	AB	phy	力学_机械能及其守恒定律	['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']	['phy_975.jpg']
phy_976	MCQ	As shown in Figure A<image_1>, a horizontal conveyor belt of sufficient length rotates counterclockwise at a constant rate of\( v = 2\,\text{m/s} \), and a small piece of mass\( m = 1\,\text{kg} \) slides onto the conveyor belt from the left end of the conveyor belt at a speed to the right. When a small object moves on the conveyor belt, the image of the relationship between the kinetic energy\( E_k \) of the small object\( x \) and the displacement\( x \) of the small object is shown in Figure B<image_2>, where\( x_0 = 2\,\text{m} \). It is known that the dynamic friction coefficient between the conveyor belt and the small object is constant and the gravitational acceleration\( g = 10\,\text{m/s}^2 \). then ()	['A. The heat generated between the object block and the conveyor belt during the entire process is\\( 18\\,\\text{J} \\)', 'B. The time required to slide from a small piece to reach common speed with the conveyor belt is\\( 2\\,\\text{s} \\)', 'C. The dynamic friction coefficient between the small object and the conveyor belt is\\(0.1\\)', 'D. Due to the appearance of small objects, the extra power consumption of the conveyor belt motor is\\( 12\\,\\text{J} 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'phy_976_2.jpg']
phy_977	OPEN	<image_1>As shown in the figure, tilt angle\(\theta = 37^\circ\) A sufficiently long smooth slope has a mass at the bottom of\(m_A = 1\,\text{kg}\), length is\(L = 4\,\text{m}\), a baffle with the same height and negligible thickness as the thickness of the board is vertically fixed at the bottom of the inclined surface. When the board collides with the baffle, the speed of the board is immediately reduced to 0; There is an object B with a mass of\(m_B = 2\,\text{kg}\) and can be regarded as a particle at the lower edge of the upper surface of the wooden board, and the dynamic friction coefficient between the object and the upper surface of the wooden board\(\mu = 0.5\); object B and object C with a mass of\(m_C = 8\,\text{kg}\) are connected by a light rope that passes around a fixed pulley, and C is high enough from the ground. At the initial moment, the system is in a static state,\(g = 10\,\text{m/s}^2\),\(\sin37\circ = 0.6\),\(\cos37\circ = 0.8\). Unlock the wooden board and release objects B and C at the same time. When object B passes through the midpoint of the wooden board, the light rope connecting BC breaks, and calculate the heat generated between AB during the entire process from releasing object BC to when object B leaves the wooden board.		\[ Q = \frac{128}{3} \, \text{J} \]	phy	力学_机械能及其守恒定律	['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phy_978	OPEN	<image_1>As shown in the figure, the upper end of the conveyor belt with an inclination angle of\(\theta = 37^\circ\) and length\(L = 1.5\,\text {m}\) is tangent to the point\(C\) with a radius\(R = 0.5\,\text{m}\) fixed in the vertical plane. The radius\(OD\) is vertical, and the lower end\(B\) of the conveyor belt is smoothly butted with the horizontal plane with a small smooth arc. The left end of a horizontal light spring with a stiffness coefficient\(k = 48\,\text{N/m}\) is fixed, and the right end of the spring is just at the\(B\) point when it is not subjected to external force. A small object with a mass of\(m = 0.4\,\text{kg}\)(the object does not overlap with the spring) compresses the spring to the right end to reach the\(A\) point (the spring is within the elastic limit at this time) and then releases it from rest. The spring is immediately removed after the object slides on the conveyor belt. As a result, the object can just fly out horizontally from the\(D\) point on the arc track. Conveyor belts are always measured in size\(v = 5.2\,\text{m/s}\) running clockwise,\(A, B\) distance between two points\(x = 0.5\,\text{m}\), the dynamic friction coefficients between the mass and the horizontal surface and the conveyor belt are\(\mu_1 = 0.5, \mu_2 = 0.875\), the elastic potential energy of the spring\(E_p = \frac{1}{2} kx^2\)(Where\(k, x\) are the stiffness coefficient and deformation of the spring respectively), take the gravitational acceleration\(g = 10\,\text{m/s}^2, \sin37^\circ = 0.6, \cos37^\circ = 0.8\), ignore the air resistance, and ignore the mechanical energy loss at the point of\(B\) and\(C\) of the mass passing through. Calculate the time\(t\) for the block to move on the conveyor belt (keep two significant digits for the result).		0.29s	phy	力学_机械能及其守恒定律	['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']	['phy_978.jpg']
phy_979	OPEN	<image_1>As shown in the figure, the smooth (frac{1}{4}) arc track is vertically fixed, tangent to the horizontal plane at the lowest point (P), the radius (R=0.2,text{m}), there is a horizontal left-ward uniform electric field in space, the field strength (E=1times10^3,text{V/m}), the mass of object A is (m_1=0.2,text{kg}), negatively charged, and the amount of charge is (q= 1times10^{-3},text{C}), there is an uncharged object B at (L_1=1,text{m}) on the right side of the (P) point, the mass is (m_2=0.2,text{kg}), there is a vertical fixed baffle at (L_2=0.5,text{m}) on the right side of object B, and object A has a vertical downward velocity (v_0=2, from the point (A) at the same height as the center of the circle (O) at a vertical downward velocity (=2, text{m/s}), the dynamic friction factors of A and B and the horizontal plane are (mu=0.2), all collisions have no energy loss, and there is no charge transfer in the collisions of A and B. In the whole process, the sum of the total distances traveled by B on the horizontal plane is ( ).		\(6.25\,\text{m}\)	phy	力学_动量及其守恒定律	['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phy_980	OPEN	As shown in Figure A<image_1>, a small object A with mass\(m_1=1\text{kg}\) is placed on the left end of the platform, and the dynamic friction coefficient between A and the platform\(\mu=0.1\). There is a sufficiently long trolley of mass\(m_0=2\text{kg}\) immediately on the right side of the platform, and the upper surface of the platform and trolley are at the same level. A small slider B with a mass of\(m_2=2\text{kg}\) is placed at the left end of the trolley. The dynamic friction coefficient between B and the upper surface of the trolley is also\(\mu=0.1\). The vertical wall is far enough away from the trolley.\ When (t=0\), apply a horizontal force to the right\(F\), and the change of F with time is as shown in Figure B<image_2>. When\(t_1=2s\), the force\(F\) is removed when the block A just moves to the right side of the platform. After that, A and B collide elastically. The collision time is extremely short. After each collision, the speed of the trolley reverses, and the size becomes that before the collision\(\frac{1}{4}\). Ignore the friction between the cart and the ground, and take the gravitational acceleration g\(10m/s^2\). Calculate the distance from slider B to the left end of the cart before the cart collides with the wall for the second time ().		\(\frac{801}{64}\,\text{m}\)	phy	力学_动量及其守恒定律	['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'phy_980_2.jpg']
phy_981	OPEN	<image_1>As shown in the figure, a slider with mass\(M\) is sleeved on a smooth horizontal rod, and a light rod with length\(L\) is connected to a small ball with mass\(m\) at one end, and the other end is connected to a living hinge on the slider. Regardless of all friction, the gravitational acceleration\(g=10\,\text{m/s}^2\) is known: \[M=2\,\text {kg}\,,\,m=1\,\text{kg}\,,\,L=0.5\,\text{m}\,\pi\approx3\]. If the slider is unlocked, give the ball a vertical upward velocity\(v_i=4\,\text{m/s}\), and try to calculate the displacement of the slider when the ball reaches the highest point ().		\(\frac{1}{6}\,\text{m}\)	phy	力学_动量及其守恒定律	['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phy_982	OPEN	<image_1>As shown in the figure, there is a compressed spring on the left end of the horizontal track\(AB\), which stores elastic potential energy\(E_p = 4.5J\). The left end of the spring is fixed, and a mass (which can be regarded as a particle) with a mass of\(m = 1kg\) is placed at the right end. The mass and the spring are not adhered. When the spring returns to its original length, the mass has not yet reached the\(B\) point. The length of the conveyor belt\(BC\) is\(L_1 = 0.7m\),\(CD'\) is a horizontal track,\(DE\) is two vertically placed semicircular tracks with a radius\(R = 0.3m\),\(D\) and\(D'\) are staggered a little, and the objects enter the arc track from\(D\), and exit from\(D'\) into the horizontal track\(DH\).\ (AB\),\(BC\),\(CD\), and\(DH\) are all connected smoothly and do not affect the movement of the mass. It is known that the dynamic friction coefficient between the object and the conveyor belt is\(\mu = 0.5\), the rest of the tracks are smooth, and the gravity acceleration\(g = 10m/s^2\). If the conveyor belt rotates at a constant speed in the clockwise direction, the object can move in a circle to reach the\(E\) point, and the minimum speed of the conveyor belt is calculated.		\(\sqrt{15}m/s\)	phy	力学_机械能及其守恒定律	['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phy_983	OPEN	As shown in <image_1>the figure, a game device is in the vertical plane, and the device is composed of an inclined straight track (AB), a circular track (BDE), a horizontal straight track (EG), a conveyor belt (GH), a horizontal straight track (HI), two identical quarter-round pipes spliced into a pipe (U), and a horizontal straight track (IK). The circular orbit is tangent to the orbit (AB, EG) at (B) and (E) ((E) is the lowest point of the circular orbit). Linear track (EG) and (HI) are smoothly connected by conveyor belt (GH), the pipeline (U) and the linear track (HI) are tangent to (I) point, the right end of the linear track (IK) is an elastic baffle, and the slider can return at the original rate after colliding with the elastic baffle. Circular track radius is known (R = 0.4 , text{m}), (EG) length (L_{EG} = 2 , text{m}), conveyor belt (GH) length (L_{GH} = 1.5 , text{m}), (HI) length (L_{HI} = 4 , text{m}), (IK) length (L_{IK} = 2.8 , text{m}), radius of a quarter-round pipe  (r = 0.4 , text{m})。 Now a slider with mass (m = 1 , text{kg}) (regarded as a particle) is released from a certain height (h) on the inclined track (AB), and moves to the (D) point and then slides out of the circular orbit from the (E) point, the dynamic friction factor (mu_1 = 0.25) between the slider and (EG), (HI), (IK), and the dynamic friction factor (mu_2 = 0.6) between the slider and the conveyor belt, The rest of the tracks are smooth. All tracks are smoothly connected, regardless of air resistance, (g) takes (10 , text{m/s}^2). If the slider is released from the height (h' = 3 , text{m}) on (AB) and the conveyor belt rotates clockwise at a constant linear speed, the condition that the linear velocity (v) of the conveyor belt is to be met in order for the slider to pass through the (J) point and only once.		\(6\,\text{m/s}\leq v<8\,\text{m/s}\)	phy	力学_机械能及其守恒定律	['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phy_984	OPEN	As shown in <image_1>, there is a fixed inclined plane with a baffle at the bottom, where the height of the baffle is equal to the thickness of the wooden board. The inclination angle is \(\theta = 30^\circ\). A long wooden board A with a mass of \(4\text{kg}\) and a length of \(L = 2.6\text{m}\) is placed on the inclined plane, and the distance from its lower end to the baffle is \(s = 9.8\text{m}\). A small block B with a mass of \(2\text{kg}\) is placed on the top of the wooden board A. The dynamic friction coefficient between B and the wooden board A is \(\mu_1=\frac{\sqrt{3}}{2}\). The dynamic friction coefficient between the wooden board A and the inclined plane is \(\mu_2=\frac{\sqrt{3}}{6}\). The long wooden board A and the small block B are released from rest at the same time. When the wooden board slides to the bottom of the inclined plane, it collides with the baffle at the bottom and immediately comes to rest. Then the small block B slides onto a conveyor belt through a short smooth arc track without loss of velocity. The conveyor belt is \(l = 1.3\text{m}\) long and runs clockwise at a constant speed of \(8\text{m/s}\). After leaving from the right end of the conveyor belt, the small block B slides along a horizontal track DE and then rushes onto the inner side of a smooth semicircular track with a radius of \(R = 0.6\text{m}\). It is known that the dynamic friction coefficients between the small block B and the conveyor belt as well as between B and the DE section of the track are both \(\mu_3 = 0.5\). The gravitational acceleration \(g\) is taken as \(10\text{m/s}^2\), and air resistance is ignored. If the small block can just reach the highest point of the semicircular track, what is the distance \(d\) of the DE section?		\(d=1.9\text{m}\)	phy	力学_机械能及其守恒定律	['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phy_985	OPEN	<image_1>As shown in the figure, a certain device consists of smooth connection between inclined rails\(AB\), horizontal rails\(BC\), smooth circumferential rails\(CDEC'\), and smooth straight rails\(CF\).\(B,C, C'\) are the connection points (\(C, C'\) are slightly diverged), there is a baffle at the\(F\) end, and a light spring is fixed on the baffle. The whole device is in the same vertical plane. The slider with mass\(m\) starts to slide down from point\(A\) at a certain initial speed\(v_0\) and moves along the orbit. It is known that\(m=0.2kg\), the circumferential orbit radius\(R=0.4m\),\(AB\) length\(l_1=1.0m\),\(BC\) length\(l_2=0.8m\), and the dynamic friction coefficients between the mass and\(AB,BC\) are\(\mu=0.25\). Regardless of other resistances,\(\sin37^\circ=0.6\),\(\cos37^\circ=0.8\),\(g\) is taken as\(10m/s^2\). To keep the slider from getting out of orbit, find the value range of\(v_0\)(regardless of the motion after rebound).		\(0\leq v_0\leq2m/s\) or\(v_0\geq4m/s\)	phy	力学_机械能及其守恒定律	['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phy_986	MCQ	<image_1>As shown in the figure, place two blocks connected by a sufficient length of elastic rope\(c\) on a horizontal wooden board suspended from the ceiling by two strings\(a\) and\(b\) of different elongation. The mass of the objects is\(m\), the height from the ground is\(H\), and the elastic rope is in tension at the initial moment. At a certain moment, the two strings\(a, b\) broke at the same time. Before the wooden board hit the ground, the two objects did not collide. The gravitational acceleration is\(g\). The following statement is correct ()	['A. Conservation of mechanical energy in the system composed of wooden boards and two objects', 'B. The object may move in a variable acceleration curve first, and then move in a uniform variable speed curve', 'C. The velocity of the mass reaching the ground may be less than\\(\\sqrt{2gH}\\)', 'D. The two objects hit the ground at different speeds']	BD	phy	力学_机械能及其守恒定律	['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']	['phy_986.jpg']
phy_987	MCQ	<image_1>As shown in the figure, a smooth inclined surface with an inclination angle of\(30^\circ\) is fixed on the horizontal plane, a vertical inclined baffle is fixed at the bottom end of the inclined surface, and a certain pulley\(O\) is fixed at the upper end. The lower end of a light spring with a stiffness coefficient of\(k = \frac{6mg}{d}\) is fixed on the baffle, and the upper end is connected to a mass\(Q\) with a mass of\(2m\). One end of a light rope crossing the fixed pulley\(O\) is connected to the object\(Q\), and the other end is connected to the object\(P\) with a mass\(m\) that is sleeved on a horizontally fixed smooth straight rod. Initially, the object\(P\) rests at the point\(A\) of the straight rod under the action of horizontal external force\(F\), and it happens to have no interaction with the straight rod. The angle between the light rope and the horizontal straight rod is\(30^\circ\). Remove the horizontal external force\(F\), and the angle\(37^\circ\) between the light rope and the straight rod\(P\) moves from rest to point\(B\). It is known that the vertical distance from the pulley to the horizontal straight bar is\(d\), the magnitude of the gravitational acceleration is\(g\), and the light rope between the spring axis, the mass\(Q\) and the fixed pulley is parallel to the inclined plane, regardless of the pulley size and friction,\(\sin37^\circ = 0.6\),\(\cos37^\circ = 0.8\). Then the following statement is correct ()	['A. The elongation of the spring when the object\\(P\\) is at the\\(A\\) point is\\(\\frac{d}{3}\\)', 'B. When a block\\(P\\) moves from point\\(A\\) to point\\(B\\), the decrease in potential energy of the block\\(Q\\) is equal to the total increase in kinetic energy of the two blocks\\(P, Q\\)', 'C. When the mass\\(P\\) moves to the point\\(B\\), the velocity of the mass\\(Q\\) is\\(4\\sqrt{\\frac{2}{123}}}gd\\)', 'D. During the movement of the object\\(P\\) from point\\(A\\) to point\\(B\\), the work done by the light rope pulling force on the object\\(P\\) is\\(\\frac{25}{171}mgd\\)']	BD	phy	力学_机械能及其守恒定律	['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phy_988	MCQ	As shown in Figure A<image_1>, in the spatial coordinate system\(xOy\), the alpha ray tube is placed in the second quadrant. It consists of parallel metal plates A and B and a thin tube C parallel to the metal plates. The distance between the thin tube C and the two metal plates is equal, the opening on the right side is on the y-axis, and the metal plate and the thin tube C are both parallel to the x-axis. The radiation source P is at the left end of the A pole and can emit alpha particles with a certain initial velocity in a specific direction. If the length of the metal plate is L and the spacing is d, when a certain voltage is applied between the A and B electrodes, the alpha particles can just be horizontally ejected from the thin tube C at a speed v0 and enter the electrostatic analyzer located in quadrant I. There is a radial electric field as shown in the figure in the electrostatic analyzer, distributed throughout the region of quadrant I. The electric field lines point in the radial direction to the center of the center O coinciding with the origin of the coordinate system. The particle moves in a circle at a uniform speed in this electric field, and the field strength at the trajectory of the alpha particle is\(E_0\) everywhere. At t=0, the alpha particle enters the alternating electric field in quadrant IV perpendicular to the x-axis. The field strength of the alternating electric field is also\(E_0\). The change of direction with time is as shown in Figure B<image_2>. The positive direction along the x-axis is the positive direction of the electric field. It is known that the charge of an alpha particle is\(2e\)(e is the elementary charge) and the mass is m, regardless of gravity. The following statement is correct ()	['A. The kinetic energy of the alpha particle decreases as it moves from the source\\(P\\) to\\(C\\)\\(\\frac{md^2v_0^2}{L^2}\\)', 'B. The velocity of an alpha particle when emitted from a radioactive source\\(P\\) is\\(v_0 \\sqrt{1 + \\frac{d^2}{L^2}}\\)', 'C. The trajectory radius of the alpha particle moving in the electrostatic analyzer is\\(r = \\frac{m v_0^2}{2e E_0}\\)', 'D. At the moment\\(t = 2T\\), the coordinates of the alpha particle are\\(\\left(\\frac{m v_0^2}{2e E_0} + \\frac{e E_0T^2}{m},-2v_0T\\right)\\)']	BCD	phy	电磁学_静电场	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAFnAkADASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiuc8aeLLbwjoZu5GU3UzeVaxNnDue5xztHUn0HrigDjPjP44utF0KTSNH3/bLgpHc3KHi2R84XPZ2AOB1wCfSvTNNhFtpdpAvSOFEH4KBXz5481LQ7vQ/D+iaXqa6jqF5q6XV/ceWytNKQV3HIHHzYA7ACvowAKoA6AYoAWiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKzPEX2RfD99NfSSx20MLSyPFK0bKFBOQykHtQBp0V4t8J/Dt34q8INrOta9rrPNcOsATUJEAjXAzweTnd+VX/Cuv6vofxdv/A11qc+q6d5PnW81y26aH5A20t3HJHPt0oA9Q1HUIdMsnup1mdEH3YYmkcn0CqCTXI+CLibxFqF94j1Sxu7S/wBxt7a1uYWT7Pbg8YyMFmPLEew7UeNfiMvhDWLDSotEvdVu72NpEjteuAfTBJ71if8AC3NY/wCiceIv+/Tf/E0AZPxQa41b4g+D3tdM1K5sdLuxLdyxWcjKoMiE4+XnhO2a9lgnS5gWaPdsYZG5Sp/I4IrzD/hbmsf9E48Rf9+m/wDiaP8Ahbmsf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryz/hbusf9E48Rf9+m/wDiaP8Ahbusf9E48Rf9+m/+JoA9Toryp/i/q0aM7/DrxCqKMljGQAP++a7jwf4ng8YeGbXW7e3kt459w8uQglSpIPI+lAG7RRRQAUUUUAFNeRI1DO6qCQoLHHJOAPxJxTq8O+PvjabSZ9G0fTpyl3HMt/KR22n92D68gnHsKAPca5rxxrOt6B4bvNT0azsrg2sLTSfaZWGFUZOFUfNxk/eHStHw5rUPiLw5p+rwYEd3CsmAc7T3H4HI/Cn6/Z/2h4c1Oyxn7RaSxY9dyEf1oAy9I8QX2vfDu313TreKTUbix82KBjhDNj7vXpuGOtTeCtYv9f8ACNhqWp2yW17KHE0Uf3Qyuy5HJ4OM9T1rzv4XanPqnwv0jw7p8xW7fzluZlPNtB5rZb2Yg7V/E/wmvXbO0t7Czhs7WJYreBBHHGvRVAwBQBNRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV5r8ctZ/sz4cz2kbYn1KVLVFHUg/M34YXH416Q7rGjO7BUUEsSeAK8J8deI9J8TfFfwvaG436LpsnnT3O0mIvndjOMEfKoz05NAHa+HrDxt4e8K6fomnaRoSi3gVFnlvZMZPJZkEeckkkgHqetXfBnw+Xw7qt9r+qXx1PX78/vroptVAeqoOw4H4AdK7SORJYkkjYMjgMrDoQehp1AHjXxO1218LfFnwnrmopN9igtpg7RJuOTkYH5itFP2gPBkjBUj1RmPQLagn/wBCql8TzYx/FDwfL4jCHw6Fk3ecMxCbnG/tj7nXtmsb4l6n4cj8U+GbzwjFb32uW9z5skekgOXgUZKnZkE4zj2z2oA6v/he/hMkj7LrGR1H2P8A+vS/8L28Kf8APprP/gH/APXrzrWvjLb23xEsdf0aOZtPlskg1GwmTaQyu/4bgGGCPp619BaNqmm6/pNvqemyRz2k67kdR+YI7EdCKAOC/wCF7eFP+fTWf/AP/wCvR/wvbwp/z6az/wCAf/169M8qP+4v5UeVH/cX8qAPM/8Ahe3hT/n01n/wD/8Ar0f8L28Kf8+ms/8AgH/9evTPKj/uL+VHlR/3F/KgDzP/AIXt4U/59NZ/8A//AK9H/C9vCn/PprP/AIB//Xr0zyo/7i/lR5Uf9xfyoA8z/wCF7eFP+fTWf/AP/wCvR/wvbwp/z6az/wCAf/169M8qP+4v5UeVH/cX8qAPM/8Ahe3hT/n01n/wD/8Ar0f8L28Kf8+ms/8AgH/9evTPKj/uL+VHlR/3F/KgDzP/AIXt4U/59NZ/8A//AK9H/C9vCn/PprP/AIB//Xr0zyo/7i/lR5Uf9xfyoA8z/wCF7eFP+fTWf/AP/wCvR/wvbwp/z6az/wCAf/169M8qP+4v5UeVH/cX8qAPM/8Ahe3hT/n01n/wD/8Ar0f8L28Kf8+ms/8AgH/9evTPKj/uL+VHlR/3F/KgDzP/AIXt4U/59NZ/8A//AK9H/C9vCn/PprP/AIB//Xr0zyo/7i/lR5Uf9xfyoA8z/wCF7eFP+fTWf/AP/wCvR/wvbwp/z6az/wCAf/169M8qP+4v5UeVH/cX8qAPKtQ+OHha4026gS11cNJC6DNngZII9a0/gf8A8kp0v/fl/wDQzXa6vHH/AGLffIv/AB7ydv8AZNcV8D/+SU6X/vy/+hmgD0SiiigAooooAZLKkMTyyMFRFLMxOAAOpr498bW3iDxZrVx4snsZY9Pv70WtlJL8gYdECg8kYHJ6ZzX2HJHHNE8UqK8bgqysMhgeoIryv46yRWvhvQpHISKLV4WY44VQGoApfA+51PQhqXgvX7ea1vLVvtNtHKOGjPD7D0IDYPH94+9d9J400u9haDQbmDVNQeR4IoInyA6/eLkA7UGQS35ZJArNHxT8ASukja/ZF1ztZlbK+uCRxUWheJ/hlpBm/sfVNCsjO2+QpIkZc+5OPy7UAbfg3whp/gvQU02xXLE+ZPMRzLIepPt2A7AV0NUbHWtK1QZ0/U7O7HrbzrJ/Imr1ABRRRQAUUUUAFFFFABRRRQAUUVyWv6leWWtCFfEMVnHJGHjtjpjzuexIZT0z7UAdLZX1pqNql1Y3MNzbuMrLC4dT9CKSXULOC+hspbqGO6nVmihZwGkC4zgd8ZFeN+B724t/A2j2sHiOfT0adyfI0hnC4kYkySH5dpxyffFdBHpWpat4iuvHk9/Z2Ftb25hsRfWZl2QLy02N67C3JHU7cUAem0VxvgS68Qy20k3ifUbZ7i/ZriysxEI5YoRxyMnsVOOdueSc8bXibxHZ+FdGbVb9JWtkkSN/KXcw3MFzjvjNAGtJIkUbSSMFRQWZicAAd6ZbXVve26XFrPFPC4yskThlYexHBrE1LX7R9Lu1+y6l80LjnT5sfdP+zXL/AAp1WysfhnosItL0N5TM5hsJWVmLHncq4P1oA9IornNF8ZWOu+I9T0W2tb2OXT0RpJJoGRTuGcc8g/XGecdK6OgBCQMZIGeBUclzBDLFFLNGkkpIjRmALkdcDvXm/in7R43+IWneGbC5mj03R3W+1SeBipEn/LOPcOhxk8evtXR+OrZotItdahgaefRLlb4RqMs6KCsgHvsZiPcCgDqqKr2N9banYQX1nKsttPGJI5FPDKRkGqup6/pmjyxxX90IZJVLIuxjuA69AfUfnQBZs9Qs9QR3s7qG4VHKOYnDbWBwQcdCD2qzXj/w68WaFothrZmeQyXWv3G0w2zuSjMNrMQOFHPXpW/okt/rHxC8Z6fJrF6ljaPaNBFC6gKJIctgkEgcA8EdT60Ad5NcQW+zzpo497BV3sBuJ6AZ71LXIXPwz8L39ytzqNrdX86nKyXV7NIQfbLcV1qoI4wi5wowMnP60AOzkZpMggHIweleKeGNQ0BvBV//AGp4re21GOa7VLdtbaEqA7bAI9446Y45ollez/Z/8O3H22eJvtFq7TmdlZAZecPnKgDPfgUAe2ZA79aK8g16bw/ceKPB8OjeJpL921QebHFrL3BChGwcbzjnjPvivX6ACiiigAowPSisM+KLQeM/+EX+z3JvPsgvPNVAYxGWK8nPByPTuKANyio7h5I7eR4YvNlVSUj3bdxxwM9qy/DfiXT/ABRppvLBnBjkMU8Mq7ZIZB1Rh2IoAtato2m67YPY6pZQ3ds/WOVcjPqPQ+4rlH+H0Hh7TpU8B2mm6TqE2Q15cq8zqvopYk/09q7msq48S6HaXUltcaraRTxnDxvKAy/UUAfP+ofs+eLry7mu5tb0+6uJWLySSPJuYnuSVrrfhp4I8ffD/VfJmNjeaLcsPPhjuDmM/wB9AwHPqO4/CvT/APhLfD3/AEGrH/v8tZ+sfEbwnodl9qu9Zt2QsFCwt5jkn0Uc+9AHU0VHb3EN3bR3FvKssMqh0dDkMD0INZuleJNK1m8vLK0uR9tspDHcW0gKyRkd9p6g9mGQfWgDWorGtvFvh66R2j1myBjkaJ1kmVGV1JDAg4I5FS/8JLoWcf21p2fT7Un+NAGpRWJo3i3RNf1G/sNNvUnnsmCygdD7qejDPGR3rboAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAKWsf8gW/wD+veT/ANBNcR8D/wDklOl/78v/AKGa7fWP+QLf/wDXvJ/6Ca4j4H/8kp0v/fl/9DNAHolFFFADJporaF5p5EiiQFnd2AVQO5J6Vyw+IOl3LsNIstU1iNSVabT7QvECOoDthT+BNcDrV/cfFD4ot4SgnZPDWkEyagI2I+0OpAKkjqN2Fx7MfSvZbW1gsrWK2tYUhgiUJHGi4VQOgAoA5uw+IOhajrNvo0TXSarMSGs5rZ45IgFLEuGAAGB1BOc1yvxzRZNA0FHUMraxCCpGQRhq7iXw7BL40t/EZVPOhsXtBxydzqwP4YYf8CNcR8cP+QH4f/7DMH8jQB2x8GeF3HzeHdJOfWzj/wAKpXPw28F3YIl8MaYM944BGfzXFdSOlFAHnN18DfAk5LQ6bPat13QXUnH/AH0TVGX4NTWQ3eH/ABtr+myDkB5jIn5Ar/OvVKKAPKzYfGLQ0zb6po+vxp0SeMRSMPqNo/M0i/F/UNFATxh4N1TTNpw9xAPNh+ueMfma9VpGVXUqwBU8EEdaAOf0Dx14Y8TBBpOs208jdIS2yT/vhsH9K6GuB8XfDPwRf6ddahe6dHp7W8bTNd2Z8lkCjJPHB6dwa8/8By/FBPDUWu6Ldx6tpsjyLHp+oyZlKK2AVc49D3H0oA9+orznQPjBo97eJpfiC1uPD2rH5WhvlKxk+znH64/GvREdJUV43V0YZDKcgigB1FFFABXEa7rNxpvihNLbUtYZ7qBriGKysopQiqQGBypbqRz7129eb+LIPtHxV0RPs19cf8Su4OyyuPJk/wBYnO7enHtmgDH3W+l2el+D4L/xfbRXryCELZxRvhT5jfMUyRk847H0pnjWTRD4bhaHw3fJPJfWvm3E2mGMygyrvBOB94ZGOhzir13a/Zvij4M/0LVbbcLz/j/vBPu/dr9394+PfpnjrV74iQ69/wAI5Ebq907yv7UtAixWr5/167SSZPpkY/HvQBg3t7Y2HxR0i80rwhfNJHp8uLeOzEDkl1BcA4zhSfzxXR/GNvN+GNzIAwzNbsFYbT/rV4I7VqR+Htafx/Za5eXdlNbW9hLbkQwtE25mBHBZs9OuRUXxS0fUNd8Dzafpdu093LcQbEBA6SKSSSQMADNAGlqF5rh0u6DaRbAeS+T9t6fKf9iua+Ft1q6fDTQ1t9Mt5YhAdrtd7SfmbtsOPzro9RtfEQ0u63atpxXyXyBpzj+E/wDTaua+F1vrj/DXQ2ttSsYoTCdiSWLOwG5urCUZ/IUAO8DPPJ8SvHDXMKwyl7XcivvA/dnvgZ/Kup8Qapfxr/ZuhwCbVZl+V3H7q2U/8tJD/JepPtkjC0PSNR8NeKPEGt6xPbzRarcWsMJt0KktxGCVJOBlh3PQ13VAHn9kzfDjwrfXM+kTzpCXub29a4jMl0+eXIz37DtwK37LX9S1DS7e+i0CRYbiFZlElzGCFYZGR2ODXP8AxQdtZt9M8GWhLXesXKGUD/lnbRsGkc+nQAetdbrc6aV4V1GdcIlpZSOMdgqE/wBKAPHfCN34zsNFh8TeFdJjudD1G4dpNDebJhO8qXib+FSR07ehHNev6jrDaV4WutX1KFbZ7e2aaSIPv2kDO0HAyc4H41ifCi2Nr8LtAjIwWtvM/wC+2Lf1rU8QaTLr1zY6dNEDpSyC5u2J/wBaUIKR47gt8x9lx3oA8g+Fvi3UPC+iRf2tYmXTtS1qS1eaMHzbe5bbw47qfbkYPWuy0O1v7r4q+PXsdRFooexDfuBJuPke/TH9asfC+C3udJ8QCaKOVF8R3cih1BAYMpBHuDUvw1Bv7jxP4gx+61LVX8h+zxRgIpHtwaAI4LrxJqnjHXPDR18QRWlpDItxFaIJMyA56nAxjiupgh1bR9FtrZHOs3MeEaaeQQsy/wB5iAQT/OuZ0Ej/AIXT4uGefsVn/wCgmuv1R9WCJHpUFq0jfelupGCxj1CqCWPtlfrQByGo3dt4G8Lyibw/YxWRZgsIvC7zyOSdqjYSzMSf/rCsHw7o2taH4Yub7xBoaXlvPMl2NMWX91YqD8oSIIcbRyQCenQkcu8LWGsa5c6v4m1HUrO71DTr24tbb7TZsyQCPvGokAXPrgnjrVnTPGviK58KeC7t57NrzWbw208j25K7cPg7Qw5+XsQOaAH6PpOvC1vrzSl0vU7aVhNoz3l554smIIYh9m5hzwM8Yx616FpDak+l251eK3jv9uJhbuWjLeqkgHB9K8i8ZeHNd8O+IdGn8P69HpdxrN99mljs7do4C5BPmNGzspPHOAK9W8P2eq2OkxRa1qn9o3+0GWYRLGobHIUKBx9eaAL13d29jayXV3PHBbxKWeWVgqqPUk9Kx9O8aeHdVWVrPU43WKJp2Z1ZAY16uCwG5R3IzXnfi6aTx38XbHwRvcaPpqC81GNTgStgMAfb5kH/AAI1Y+NIS6tfDnhrTisOpX935MBQ7RHCVKOCB/CQwGPb2oA7fVJx4n8HT3fhzUX81kaWyubdsAyITge6kjaQeCM1wdjqet/8LBkvrnTca5J4UizaJ0EzTkAH+6uTk+gzXoi+FNK/4R+x0WSJzaWSIsYSVoz8oxklCD9a8NtL7Tx8UPE1+NIub/RbKyIVIZ33+Skio8iZPzgMH4zjr6UAeteHbHWNC0OxsNOvLHVo9rGW7u759zS5O5UAVhtByAM8YqlBpuo+EF1a8hOiWUur3Zlaa6vX2LMwwoA8scZ7Z5z1qjrh0XRPhtaeJfCUSLY2N1FqMSQk4dS2yQc9MqzAj1FJ8VRH4o0jwto9m3mrrOpQuuO8AUszfQAg0Ad14dj1mLRoI9entLi/QYee1yEkHZsEDB+nFam0ZzgZqlcae501LPT7ltPEYVY2hjQ7VH8IVgRjFVv7Hvsc+I9T/wC/dv8A/GqAM3xR42s/DOp6fpklpPPe6kGFosYG1nBUbWP8I+YHODwD+MUHgeDUNSXV/FDR6rfqcwwMv+jWo9I0PU+rNknHauZ8UabdJ8VvBMTazfSO63m2Vkh3R4jHTEYHPuD+Fd42i3zKR/wkmqDIxkJb5H/kKgCxq2qWug6VJfXKSfZIAPMMMe7y17sQOcDvjoK5a/0/R7vUIfGGh3CvqOqQx6dDcwMNhRnG6THd1UHr/dx2rY8N+EofDen3NiNU1LUre4dnZNRkSXBb72CFBwc8g5rn/D/h/T9E8UWnh7SnkOnaLBJeyLI+4iediqA/RBJ+BHrQBg+GdfHhTwf4i1IWP2sDxPPD5e4KSHkVcgn3Nb1jpusw+LdR8R3fh2SS5nRYLdEvowkUKjoRnBJbJJPTjFcJI3n/AAc1W5bfsvPEplQoDuINyvTHOeDXoH2vw7/aB07+2fEf23yvN8jfd79mcbsbc4zxmgDW8DeI5vFfh7+1ptNWx3TyRogkD7lViucj3BH4V01cL8Hxj4bWAw4HnXGN4OSPOfnmu6oAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAKWsf8gW/wD+veT/ANBNcR8D/wDklOl/78v/AKGa7fWP+QLf/wDXvJ/6Ca4j4H/8kp0v/fl/9DNAHolI2dpx1xxS0UAeEfs/jZ4j8ZJc8XomjBDfe+/Ju/XFe7151rvw3vI/Fp8V+ENUTS9VlBF1DNHuguP94DkZxz1554PNa0Vt4/vFSG9vtCsEPEs1lFJLIR32h8Kp9zuxQB1kc0UrSLHIjmNtrhWB2tgHB9Dgg/jXmHxw/wCQH4f/AOwzB/I16PpunW+lWKWlsH2LklnYs7sTkszHkknkmvOPjh/yA/D/AP2GYP5GgD1IdKKB0ooAKKKKACiiigDzL4zanPLo2n+EtPydQ165WAAfwxAgsT7Zx+Ga9B0nTYNH0iz021ULBawrEgA7KMV5l4Yz41+Mus+InYSadoS/YLHHQyHO5ge/8f8A30vpXrNAGTr3hnRvE9l9k1nT4LuIfd3r8yH1VhyPwrzmTwX4x+Hrm58E6k+qaSrFn0a+bJAPURt/hj8a9cyPWigDiPB/xO0bxTN/Z86vpetISsun3fyvuHXaT976dfau3rlPGPw90PxnAGvITBfxj9zfQfLLGe3P8Q9j+lcZZ+LvE3w0vItL8cI+o6K7LHb65CpJT2lHU/z4P3qAPXq5i60e9m+JWnawsa/YbfTZoHctzvd1IAH0U10Fle2upWcV5ZXEdxbTLujljbcrD2NT0AcC+i+KtS+JOlX+pppw0vSI5mhubfcrTGVQu0oScEbfXH8gvjHS/Fus6hp2mQQ6dNoz30VxPcLuSWBI5A+CCxDE4xkfkK72igAooooAjuIRcW0sLEgSIUJHbIxXnXh3RviJ4V0K20Szi8N3drabkhmlnmR2UsSNwCEA816TRQB5rr+k/EvxJpy6e58O6chnjlNzBPM8iFGDgqCgGcgV3F7LqsFpBDY28V1duArzSt5cSEDlmAyT7AfmOtaVFAGDoXhmLS7y41O7uGv9YuhtmvJFxhe0ca/wIPQfUkmua8b+HPG2s7tK0rWoDo+o7o7w3ECiS2jPUKVxuBGRjGfU969DooAqaXp8Wk6TZ6dBnybWFIUz1woAH8qt0UUAeb+H/Cev23h7VtHlK2aapq1zPLcJKC8ds5HC4/jbkewyeuAe/sLC20vT7exs4lhtrdBHHGvRVHSrNFAHJaV4dv7X4leINfm8oWV5bwQQANlyUUZJHYZyK62iigDiNF8B3GnWOrRTaxcq99ez3IW2faiiQ8Agjk+tUl+HN5BoPhHSIdSXZot2Z5rhcxuww33Bzzlu9eiUUAcdq/gaTUdW0K9XWLtl0y9F0yXDeZvwMYHTB967GiigDgpPC2oaL8T7rxbplqL631G0FvdW4kVJI3G3DLuwCCEGRn1NZ+peBda1O81PxVcC2bxDiMaVal90dqkciuFLcZZsEEjA+YjvXptFAHI+T4pl8JQ2Nw0Y1u/ZxcTx/wCqs0Yknb6lVIVR3PPTNYOhaNZaL8X20iziC2lv4YjiVTzkeeck+pPU/WvTKxI/DVvH40m8T/aJjcyWK2Xk8bAgffn1zmgClrWiaNd+DbzwrbXVpp9vJbtboqkYi99uRnnmsLTrLT7bxnpUZ1GB7Lw5pAhjkeRRull+Unr2SLn/AHhXZz+HdEurqS6uNIsJriXG+WS2RmbAwMkjJ4pn/CMaB/0A9N/8BU/woAXQ/EWkeJbSS60e+iu4Y5Gidoz0YHHT9R6jmtJ5EiQvI6oo6sxwKrWWl6fp2/7DY21rvxu8iJU3fXA5qW7s7a/tZLW8t4ri3kGHilQMrD3BoA4HxU6t8X/Ae1gfkvTwe3livRK4fQvhT4b8PeMZ/EdhFIkrKRDbg/uoCRhio65PPfAyfw7igCrqFimo2b20k1xCG/5aW8zROp9QykH+leN+B9Tk07wv4z1C0uLjUtQu9YewsZJ23SXDhQsWT3wGyfYGvbqwNL8GaHo2oveafZLASzSLGpOxJG4d1HZiAo+g4xk5AOPex1HTtI0fwF4UuFjv7YRzajqJTetqM7i3PBd2zhfTPQc067t7uf4zzQW16YLz/hHRsuAgOHEwOSp4wSOR6E16BFpGnxWU1mtpEbecs0yONwkLdS2fvE+9Yfh34f6F4Y13UNX06GRbi8AXaz5WFOMqg7AkZ/lgUAQeB/F82vSajo+pWIstZ0hxFdRR8xNnO10P904ziuwqtDp1nb39zfQ20aXVyFE0qrhpAowuT3wDVmgAooooAKKKKACiiigAooooAKKKKACiiigAooooAr38DXWn3NuhAaWJkBPTJBFeQeGPDvxa8JaFBo2nL4da1hLFTK7luSSecD1r2OeZLeCSaQ4SNS7H0AGTXmy/Hjwc43IuqOvZltCQf1oAbv8AjP8A88/C/wD31JRv+M//ADz8L/8AfUlP/wCF6+EP+eWq/wDgGf8AGj/hevhD/nlqv/gGf8aAGb/jP/zz8L/99SUb/jP/AM8/C/8A31JT/wDhevhD/nlqv/gGf8aP+F6+EP8Anlqv/gGf8aAGb/jP/wA8/C//AH1JXGfERvH5tdE/4StNHFn/AGrD5f2EsX389c9sZrtv+F6+EP8Anlqv/gGf8a4r4jfEjQvGFroljpiXqzR6rDK3nwFBjkdfxoA+gR0ooHSigAooooAK5T4keJR4U8DajqCk/aWTyLYDqZX4XH06/hXV15N4vz40+L2h+FVbOn6Qv9o3wHOX4KKf/HR9HNAHVfDLwz/wivgPTrGSLy7uRPtF0D18x+SD7gYX8K4f4wWttq3jXwloFrmO+vrgvcyQkq/k5A5I68Bsf7tez14dp9rdeOPjrr2p6dqRs10SIWsNwIVlw3KEANx18zmgD0O7+Hvg+4T7G+nRxSTK2zy53R8DqVw2eMj8xVvwN4fk8MeE7XS5pGkljaRnd23E5ckZP0xWX4T0PWrbxhrd9rurPqjxJHbWUzQiIJGwDuAq8ddgyOu2um1TXLHSHgjuXkaecnyoIImlkfAySFUE4A6np+dAGjUF7ZWuo2ctpe28dxbyrteKRQysPcGksL+11OyivLKdJreVdyOh4P8AgfbtVigDxu+0LXvhHeyav4ZE2peFnbfeaW7Fntx3aM+n+TnqPTfDfibS/FmjxanpNyJoH4YdGjburDsRWvXg/jZoPhp48tdR8HTZvr75r7QokLJKgBO/A+73P5kcZFAHvFFYfhPxZpfjLRI9U0uXch+WSJvvwv3Vh2P863KACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAKWsf8gW//wCveT/0E1w3wRjRvhVpZZFJ3y8kf7ZrudY/5At//wBe8n/oJriPgf8A8kp0v/fl/wDQzQB6D5MX/PNP++RR5MX/ADzT/vkU+igBnkxf880/75FHkxf880/75FPooAZ5MX/PNP8AvkV5d8bo0XRPD5VFB/tmDoPY16pXlPx5leHw1osscRldNWiZY16sQG4H1oA9WHSivL/+Fo+JUGZfhprar6q+7/2Wmv8AGu2sRu1fwj4isEHV3tcqPxJFAHqVFcNpfxg8DaqFEeuRW8h/gukaIj8SMfrXZWl7aahbrcWdzDcwt0khcOp/EUAeU+OPiTL4E+LNnDd75dGutLj8+NeTG3my4dR69j6j6Csj4V+MPDlmNV17WtVhXW9cvSwt13SSqgOETCgkck8emK5b9omKSf4j6bFEjSSPpkSqijJYmWXAA7mvQPhF8JY/DEEeua3Er6zIuYojyLZT/wCz+p7dKAPR9e1h9K0ia4gsby8uDExhgt7dnZmxwDgfLzjrXmXwjefwp4evhrOg63Fql5eNPMy6dK+4YG3kA/7X5mvY6KAPOtR8Sa94l1ux0LS9A1fTtOlmDXupXluYh5S/MyL6bsbcnHXp3qzZPJN8b9UE+cW+ixLbg/3WkJYj8QB+ArvKxNT8P/a9Yg1iyu2s9Shha380Rh1kiYglWU9cEAjkYP1NAHOfC138jxTD/wAsIfEV4kA7BNwPH4k131Zmg6FaeHtMFjZ72UyPLJJIctJIx3MzH1JNcv4/+IB8OGLRdFg/tDxLe/LbWqDd5ef439u+Pb0oAPiB8QP+Ec8rRtGh+3+Jb75LW1T5vLz0dx6e3f6Zo+H/AIAHhtZtY1ib7f4kvvnurpznZnkovt79/pS+APh//wAI352saxP/AGh4kvctdXbndsz/AAJnoP5/TAruqAPI/F3h/UPh9r0njnwpCXs3OdY0xSdsi9TIo7Ecn269M16ToGvaf4l0W21bTJhLbTrkHup7qR2IPFaTKrqVZQykYIIyCK8avIpfg34yGo2wY+DdYmC3MQyRZSn+IDsP5gEdhQB7NRTIZo7iFJoXWSKRQyOpyGB6EGn0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBS1j/AJAt/wD9e8n/AKCa4j4H/wDJKdL/AN+X/wBDNdvrH/IFv/8Ar3k/9BNcR8D/APklOl/78v8A6GaAPRKKKKACiiigAry344f8gPw//wBhmD+Rr1KvLfjh/wAgPw//ANhmD+RoA9SHSigdKKAMXU/CHhzWQ39oaJYXBbqzwLu/76xmuKu/gnpNtO914Y1fU9AuT0+zzs8efcE5I/GvT6y/EOpSaTo011Cu6bhYxjPzE4qoQc5KK3ZFSpGnBzlstTyS8sPFfhnX7PxLrWiP4qn0+L7K1zGqq0aBiwkRQMlsNjOOMdR1r0Pwr8R/Dfi/MVjeeTeqcPZ3I8uUH6Hr+Ga6WyM7WMButv2gxqZNo43Y5rlfF3wz8PeL91xcW5tNT4KX9r8kqsOhJ/i/H8MU5u72FSTUdW3118/8jsaK8gTxN4w+GM623i1JNc8PF9serwrmWIdvMHf8efQnpXqWk6vYa5p0WoaZdRXNrKMpJGcj6H0PselQaF2mrIjlwrqxQ7WAOdpxnB/Aj86hvryHTtPub24bbBbxNLI3oqjJ/lXzd4V+MOqxzeIo7aza61jWr5ZLCE/6uJmBU5JPQKqD8Oe9AHr3xA8f/wDCOeTouiw/b/Et98lrapz5ef439B6Dvj0zS/D/AOH6+Gll1fV5vt/iS++e6u3+YoT/AAIew/nj0wKPh/4BXw2susatcf2h4kvhvurxzu25x8iew9e+PTAruqACiiigAqjrOkWevaPdaXqEQltbmMxyL7eo9CDyPcVeooA8p+HOq3vhXxDc/DrXZWd4AZdJuXP+ug67fqPT2I7CvVq4D4qeEp9d0OLV9J/d67o7/arSRR8zBTkp+OMj3Hua3PA3iu38Z+FLTV4tiyuNlxEpz5Uo+8v9R7EUAdHRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRWV4jS0OgXkt9PcQW0ETTPJb3DwsoUE53IQfwoA1aK8Y+Ffh7UPFPgw6xq3iXxGJp7iQW5j1ORdsa8DjOCchq1vhf4u1jUPEviHwtq9ydQOkyEQ3xUBmUMVw+OCehz9aAPUc0ZHrXjnxK0a28S/Fzwpot/JOLO4tZi6xSbTxk8H8BWr/AMKG8Hf39U/8Cz/hQB6dketGR615j/wobwd/f1T/AMCz/hR/wobwd/f1T/wLP+FAHp2R60ZHrXmP/ChvB39/VP8AwLP+FH/ChvB39/VP/As/4UAenZHrRketeY/8KG8Hf39U/wDAs/4Uf8KG8Hf39U/8Cz/hQB6dketGR615j/wobwd/f1T/AMCz/hR/wobwd/f1T/wLP+FAHp2R60ZHrXmP/ChvB39/VP8AwLP+FH/ChvB39/VP/As/4UAenZHrRketeY/8KG8Hf39U/wDAs/4Uf8KG8Hf39U/8Cz/hQB6dketGR615j/wobwd/f1T/AMCz/hR/wobwd/f1T/wLP+FAHp2R60ZHrXmP/ChvB39/VP8AwLP+FH/ChvB39/VP/As/4UAenZHrRketeY/8KG8Hf39U/wDAs/4Uf8KG8Hf39U/8Cz/hQB6dketGR615j/wobwd/f1T/AMCz/hR/wobwd/f1T/wLP+FAHp2R60ZHrXmP/ChvB39/VP8AwLP+FH/ChvB39/VP/As/4UAeg6wR/Yt/z/y7yf8AoJriPgf/AMkp0v8A35f/AEM1mah8DfCFvpt1Oj6nvjhd1zd5GQCfStP4H/8AJKdL/wB+X/0M0AeiUUUUAFFFFABXlvxw/wCQH4f/AOwzB/I16lXlvxw/5Afh/wD7DMH8jQB6kOlFA6UUAFZSazHceIZdIjgL+TFvklzwp4wMfiK0Lq5is7WW5mbbFEpZj7Cq2mrYzRnUbOIKbwB2fGC3pmtIJKLlJenqYVHJzjCEkur72/4cvUUUVmbjJoYriF4Zo0kicFWRxkMPQivJNY8Gaz8O9Sl8R+A1eawYhr7RCSVde7R+/t1HbI4r16qUmq2UWpRac04+1SglYwCTwM8+n401Fy2RMpxj8TseLfEf4k2vi/4f2WmeGhcT6hrEgSW0iQmWNUwWUgepwPQjNcj4W+APiTVwtxrEsej2+fuuN8xH+6Dgfic+1eneMvC+s+Fr2Lxh4SkaeW0LteWDIMTRMctjHp1x+I56934U8Uad4v0CDVtNkzHIMPGT80Tjqre4pyST913FBycbzVmVvCPgvT/B1j9msbq/nyMM11cs4J9Qv3R+ArpKKKksKKKKACiorm6t7K3e4up44IIxl5JGCqo9ya821b4wQXN5JpXgrSrjxDqQ43xKRAh9S3cfkPegD0ySRIo2kkdURQSzMcAD1Jrwvwz4q0Pw38aL7TNG1O2utD11g37n7kFyScAHoQTkccfMPSt2P4ceJ/GUy3Xj/XnFtjK6TpzbIl7/ADHv+p960fG/w10p/h3cWHh7TYLS6scXVoYlw5kTnBbqSRkcnqRQB6RRXM/D/wATL4t8F6fqp4nKeXcL6Srw35nn6EV01ABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFeb/HDWDpvw8msomP2nU5ktI1HUgnLfoMfiK9HZlRC7sFVRkknAArwvxv4p0TW/i54Zhlvo30bSSbia5UF4jL94KCAQfur+ZoA09Zg8f+Bvh1DBpp0j7BYWyrO1sji4RB95l3ZUt1JOPwrpvhPp3hyDwimpeHmnm+3uZLq4ujmZ5ASCHx0wSfzzznNYvjjx/b+INAu/D3hC0utZ1G/jMBaCB/LhVuCzMQB0/D1rqPhr4Tk8GeCbPSrhg12S01xtOQJG6gfQAD8KAK/jP4cweL9XsNUGsX+m3dnG0ccloQDgn16jvWN/wqO+/wCigeJf/Air3iPxJqOnfFvwzpMd4ItMuraZ7iNgNrEBsEk9MYFQ+J/jb4R8PCSK3ujql2vAis8Mufd/u4+mfpQBX/4VHff9FA8S/wDgRR/wqO+/6KB4l/8AAis3wB8Rtb8e+I5by6mstI0GyHMAcb55D90Fm6gck4x265r1T+2NM/6CNp/3/X/GgDz3/hUd9/0UDxL/AOBFH/Co77/ooHiX/wACK9C/tjTP+gjaf9/1/wAaP7Y0z/oI2n/f9f8AGgDz3/hUd9/0UDxL/wCBFH/Co77/AKKB4l/8CK9C/tjTP+gjaf8Af9f8aP7Y0z/oI2n/AH/X/GgDz3/hUd9/0UDxL/4EUf8ACo77/ooHiX/wIr0L+2NM/wCgjaf9/wBf8aP7Y0z/AKCNp/3/AF/xoA89/wCFR33/AEUDxL/4EUf8Kjvv+igeJf8AwIr0qC6t7pS1vPFMoOCY3DAH8Kx/F+s3fh3w1e6xaxW8os4mleOZiu4DsCM80Acb/wAKjvv+igeJf/Aij/hUd9/0UDxL/wCBFb3w/wDFGteMdDh1q8061sbOcsIkWRndwCRu5AAGQa7GgDzD/hUd9/0UDxL/AOBFH/Co77/ooHiX/wACK9InvbW1Ki4uYYS3TzHC5/Oof7Y0z/oI2n/f9f8AGgDz3/hUd9/0UDxL/wCBFH/Co77/AKKB4l/8CK9C/tjTP+gjaf8Af9f8aP7Y0z/oI2n/AH/X/GgDz3/hUd9/0UDxL/4EUf8ACo77/ooHiX/wIr0L+2NM/wCgjaf9/wBf8aP7Y0z/AKCNp/3/AF/xoA89/wCFR33/AEUDxL/4EUf8Kjvv+igeJf8AwIr0L+2NM/6CNp/3/X/Gj+2NM/6CNp/3/X/GgDz3/hUd9/0UDxL/AOBFH/Co77/ooHiX/wACK7641PTZ7aWJdWt4mdSokjnQMpI6j3FeKw/HHVvCmu3Gh+KrGLUFtpNn22zYKzp1D7futkYPGKAOrf4QXkiMj+PvEjKwwQZ8giu08I+Gbbwf4bttFtZpZooNxEkuNxJJJ6fWsrTPiR4a8SaVdSaNq0Ju0gd1gl+SUEKT909ce2RTPhTrWoeIPh5p+o6pcG4u5GkDyMACcOQOntQB2lFFFABRRRQAV5b8cP8AkB+H/wDsMwfyNepV5b8cP+QH4f8A+wzB/I0AepDpRQOlFAGfq1na6ravpk9wYzKA21HAcgHPT0q7DDHbwRwxKFjjUKoHYCsuLRnHiafVppVdTEI4UA5Qd/6/nWvWs3ZKKd1v8zCkm5SnKNnt8lsFFFZd/r1rY6jbWG2Sa6nYDy4xkqD/ABH2qIwlN2ijSpUhTXNN2RJc61Z22p2+nM5a5nPCIM7fc+lFpo1nZ6hc30aMbm4bLu7ZI9h6CpIdLsoNQmv44FFzNw8h5P4elXKuU0laF9Vr5mcacpPmqpOz08v+CFeOa9aS/CXxmvifTY2PhjVJBHqdrGvFu56SKB0HX9R3Fex1T1bS7PW9KudNv4RLa3MZjkQ9wf61kbliCeK6t4riCRZIZUDo6nIZSMgis/xF4h07wvolxq2qTCK2hH1Z27Ko7k15n4C8Sf8ACCS614N8UXQij0dTc2d1I3ElsTwB78jAHqR2rxb4k/EO98e635nzQ6Xbki1ts9B/eb1Y/p0+oB9T6B4qt9Q8GWXiLU5LfT4bmMynzZQqopJ2gscc4xXHXvxcn1q7Om+ANEn1q6yVa7lQx20fuScZ/Hb+NeW/DEeF/Fl7a2HjLVr2ae2Cw2FjPJstSvQAEd/bjPvX05YafZaXZx2lhaw2ttGMJFCgVR+AoA8ytfhZq/iedL74ha9NfEPvXTLRilunoCRjP4AH3NekaVo+m6HZLZ6XZQWluvSOFAoz6n1PvV6igAoPIxRRQB5N4IH/AAh3xZ8Q+ETIVsdQA1KwjbgAn76r+o+kdes15V8YEOiah4Y8aQxnfpl6IrhkHJhfqD7dR/wL3r1OORJYkkjYMjgMrDoQe9ADqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigApuxP7i/lTqKAEAA6AD6UtFFAHj3xC0ex1/wCMvhPTNSg860ns51kTcVzwx6g56isbxP8As5QyO0/hnVDDxn7Ne/MM+zgZA+oP1r16+8KafqHivTfEczTfbdPjeOEK2EIYEHI/E1uUAfNHgD4aW9t4hm0Px34buUefmzvFlYRFhnKbkO0kjkd+DXqf/Cj/AAF/0CZP/AqT/GvRCAeoooA87/4Uf4C/6BMn/gVJ/jR/wo/wF/0CZP8AwKk/xr0SigDzv/hR/gL/AKBMn/gVJ/jR/wAKP8Bf9AmT/wACpP8AGvRKKAPO/wDhR/gL/oEyf+BUn+NH/Cj/AAF/0CZP/AqT/GvRKKAMHwx4O0PwdbzwaJaG3Sdw8mZGcsQMDqTXF/HfVpLbwTBo1qpe71e6S3RF6lQdxx+IUfjXqVeOa9IfFf7Qmi6Ug32ugwfapvaT72fzMQoA9T0LTE0bQNP0yMALaW6Q8d9qgZrQqlq+rWWh6VcalqE6w20CF3Zj+g9Sewp2mXU17pdrdXFubaWaJZGhJyYyRnafcUAYfif4feG/GF1Bda1YtPNCnloyysmFznHB9awv+FH+Av8AoEyf+BUn+NeiUUAed/8ACj/AX/QJk/8AAqT/ABo/4Uf4C/6BMn/gVJ/jXolFAHnf/Cj/AAF/0CZP/AqT/Gj/AIUf4C/6BMn/AIFSf416JRQB53/wo/wF/wBAmT/wKk/xo/4Uf4C/6BMn/gVJ/jXolFAHm1z8F/h5aW0tzcaa0cMSF5Ha6kAVQMkn5q8Zt/hJrvi7xBcz6Pox0XQ2c/Z3vmYfuxwDg5ckjnpjnrX1eQD1ooA8a0r4C+HtB0e5u9Tnm1O+jhdwSTHEpCkjCg5P4n8K6H4H/wDJKdL/AN+X/wBDNegXECXNtLBJnZIhRsehGKy/C/huy8J6Bb6Np7StbwFiplbLHJJOfzoA2KKKKACiiigAry344f8AID8P/wDYZg/ka9Sry344f8gPw/8A9hmD+RoA9SHSs/W/th0a6WwUtdMm1ApweeMg+uK0B0rD+338/i37FCuyxgh3TMyffY9MH8vyNa0oty5l011MMRNKPK7+9ppvr/luaGk2sllpNrbzSNJKkYDszZOe/NXKKxdc106ZLBaW1s1zfXB/dxDpjPJJpRjKrPTdjlOnh6V5PRaDtV8QRabeW9lHC9zdzsAIYzghfU1oLY2q3r3ogQXLqFaTHJA7U8W8RnFw0MYn27d+BuA9M1LQ5KyUdO/mEYScm6jur6abf8EKKr319b6bZvdXUmyFOpwT/KqenaoNc06aW1Se2zlI5JUHXHDAdxSVOTjzW07jlWgp+zv729upqViWevT3+rNa2+m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'phy_988_2.jpg']
phy_989	MCQ	As shown in Figure A<image_1>, if the\(x\) coordinate axis is established in a certain electric field, an electron moves in the positive direction of the\(x\) axis only under the action of the electric field force, passes through the three points\(A,B,C\), and is known\(x_C - x_B = x_B - x_A\). The relationship between the potential energy\(E_P\) of the electron and the coordinate\(x\) is shown in Figure B<image_2>. Then the following statements are correct ()	['A. The electric field strength at point\\(A\\) is greater than that at point\\(B\\)', 'B. The potential at point\\(A\\) is higher than the potential at point\\(B\\)', 'C. The rate at which electrons pass through\\(A\\) point is less than the rate at which electrons pass through\\(B\\) point', 'D. The potential difference between\\(A,B\\) two points is equal to the potential difference between\\(B,C\\) two points']	AC	phy	电磁学_静电场	['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'phy_989_2.jpg']
phy_990	OPEN	As shown in figure (a)<image_1>, the distances between the four points\(A,B,M,N\) and the\(O\) point in the same vertical plane are\(\sqrt{2}L\),\(O\) is the midpoint of the horizontal line\(AB\), and\(M,N\) is on the mid-perpendicular line of the\(AB\) line.\ (A,B\) Two points have fixed points of charge respectively, and the charge amounts are both\(Q\)(\(Q&gt;0\)). Establish the x-axis with\(O\) as the origin and vertical downward as the positive direction. If we take infinity as the potential zero point, then the relationship between the potential on\(ON\) and position x is as shown in Figure (b)<image_2>. A small ball\(S_1\) with a charge of\(q\)(\(q&gt;0\)) falls vertically from point\(M\) with a certain initial kinetic energy. After a period of time, it passes through point\(N\). The change relationship between the acceleration a of its motion in the\(ON\) segment and the position x is shown in Figure (c)<image_3>. In the figure, g is the magnitude of gravitational acceleration, and k is the electrostatic force constant. In order to ensure that\(S_1\) can move to\(N\) point, what conditions must the initial kinetic energy\(E_k\) of\(S_1\) fall from\(M\) point satisfy?		\(E_k > \frac{(13-8\sqrt{2})kQ^2}{27L}\)	phy	电磁学_静电场	['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'phy_990_2.jpg', 'phy_990_3.jpg']
phy_991	MCQ	A current sensor and a computer can accurately plot the current versus time. Now <image_1>the capacitance of the capacitor is roughly measured using the circuit shown in figure a. During the experiment, the resistance value of the resistance box was adjusted to 890Ω, and the switch was first turned to 1. After the capacitor was charged, the switch was turned to 2. The computer recorded the image of the current changing with time as shown in figure b<image_2>. Regardless of the resistance of the current sensor, the following statement is correct ()	['A. The charged amount of the container when it is fully charged is approximately 8×10^{-3}C', 'B. The capacitance of the capacitor is approximately 2×10^{-3}F', 'C. If the resistance value of the resistance box is adjusted to 10000Ω and the experiment is conducted again, the area under the I-t graph will decrease.', 'D. If the resistance value of the resistance box is adjusted to 10000Ω and the experiment is carried out again, the discharge time of the capacitor will increase.']	D	phy	电磁学_静电场	['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'phy_991_2.jpg']
phy_992	MCQ	As <image_1>shown in the figure, a static radon nucleus (^{222}_{86}Rn) decays in a uniform magnetic field perpendicular to the paper to release a certain particle to generate a new nucleus. The motion tracks of the new nucleus and the particle are two circumscribed circles on the paper. It is known that the ratio of the diameters of a great circle to a small circle is 85:1. then ()	['A. The nuclear reaction equation is ^{222}_{86}Rn→^{222}_{87}Fr + ^0_{-1}e', 'B. The nuclear reaction equation is ^{222}_{86}Rn→^{222}_{85}At + ^0_{1}e', 'C. The nuclear reaction equation is ^{222}_{86}Rn→^{218}_{84}Po + ^4_2He', 'D. The great circle trajectory is that of the new nucleus, and the direction of the magnetic field is perpendicular to the paper and inward.']	B	phy	近代物理_原子核	['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phy_993	MCQ	As <image_1><image_2>shown in the figure, when the comet moves to A, some dust particles are released, and they no longer move along the orbit of the comet. One view is that the radiant pressure generated by sunlight pushes them away radially. Suppose that the dust particles are all solid spheres, and all the sunlight they intercept is absorbed. If detection finds that the movement path of dust particles with radius R_0 is shown in b in the figure, Ab is a straight line, and Aa and Ac are curves. Assuming that the radiant power of the sun is constant and the effects of other forces such as the solar wind in a small range at A are negligible, the following statement is wrong (    ）	"['A. The size of the radius R_0 is independent of the distance of the dust particles from the sun', 'B. The radius of dust particles moving along Aa path is greater than R_0', 'C. The radius of dust particles moving along the path of Ac is greater than R_0', ""D. The dust particle moving along the path of Ab is subjected to the sun's gravity equal to the radiant pressure of sunlight on it""]"	C	phy	近代物理_原子核	['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']	['phy_993_1.jpg', 'phy_993_2.jpg']
phy_994	MCQ	As <image_1>shown in the figure, the mobile phone with a mass of $m$is resting on the inclined surface of the support. The angle between the inclined surface and the horizontal plane is $\theta$, the dynamic friction coefficient between the mobile phone and the contact surface is $\mu$, and the gravitational acceleration is $g$. The following statement is correct ()	"[""A. If the bracket is stationary, the friction force between the bracket's inclined surface and the mobile phone is $\\mu mg\\cos\\theta$, and the direction is upward along the inclined surface."", 'B. The handheld bracket uniformly accelerates upward and moves in a straight line and there is no relative sliding between the mobile phone and the bracket. The support force received by the mobile phone is equal to that received when it is still.', 'C. The handheld bracket moves evenly and linearly to the left and there is no relative sliding between the mobile phone and the bracket. The mobile phone may not be supported', 'D. The handheld bracket performs uniform acceleration and linear motion to the right and there is no relative sliding between the phone and the bracket. The phone may not be subject to friction.']"	D	phy	力学_牛顿运动定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCACVAKsDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACue8Xape2NnY2elSImp6jeR20DMm8IM7pHK9wEVj+VdDXJQypq3xLnYupj0W1EMaFufOmwzMB7IFH/AjQA7+2fE+kcaroQ1CEdbnSny2PUxNg/8AfJNaGk+LtD1m4Nra3yreL960uFMMy/WNwG/Stus7V9A0nXoBDqun292q/dMiZZD6q3VT7gigDD1zxRqlr4iGl6Np1vemC3E92JpTHjccIqtgjccMeewpsPxC02F1i121u9ElJxuu0zCT7SrlfzIqsfh9Lpl1cXXh7XLm1knIaWK9H2pHwMKNzHeABx941WuLzXdLVotb0JrqAgg3OnAzIw90PzD8jQB3sFxDdQrNbzRzROMq8bBlP0IqSvKrCz8OX07zeH9Tn0i7Y5kSxl8jLf7cJG0n6rmtyHVvFmjnZcQ2+uWw/wCWkZEE/wCKn5W/Aj6UAdzRXL2Pj3Rridba8abTLs/8sb6Mx5Psx4P4GumjkjmjEkTq6NyGU5BoAdRRXFX3xN0Sy8XS+HlZ7i6ihLssI3sZMgCNQOrYJJ9MUAdrQenXFcn9g1/xLzqcz6Rprf8ALnayfv5R6PIPuj2Xn3rp4raKC0S2jDLEiBFAY5AAwOev40Ac14hudQtjZ/Z9QvI1nu0hcCBPukHODtznitHRoZLSO9QDUZWEm5XvpAfMO0cpydq9sYHTpWb4nWEXejWirdNLJfoww0hGAGzznArbm0i3km+0o0yXSxPEkpldtgbGflJweg6jsKAORi8Uahd2F7NauiKupfZ/M85ZGjwwUrtx04PNdH4cury5/tJbu5M/k3skUZKKpCrwBwK5bQ/D1u7RxQaeYXg1Fy8zLgiFGyoJ75IzWt4av5INc1PTJbW53y3tzN5hiIRV3Db83TkE4+lAHXUUUUAFFFFABWJqnhPR9WuDdT2xivDj/SbdzHJx0+YdfxrbooA5T+yvFOkjOm6vFqUK9LfUEw+PTzF/qKB42WwO3xDpV5pX/TYr50J/4GmcfiBXV0jKrDDAEehFAFax1Kx1OAT2F5BdRH+OGQOP0q1XPah4J0O+nNzFbtYXpJIu7BzBLk9yV6/Q5FUZoPGGgQvPb6hZ65aRKzNFep9nn2jniRAVY/VB9aANrVfDWja1zf6fDLIOku3a4+jDmsCTwbqen/NoeuyiMdLa+XzUx6BvvCjTPiZo91bW8upwXmj+eoaNr2LETgjIIlXKdD3IPtXXW13b3kKzW08c0TDIeNgwP4igDz++utStYTF4k8NNNbD709oBcR/Ur94fkaqaZZ6VchpfCviCWzfO4w2825F9jE3T6cV6jWLqvhLQdaYSXumwtMPuzxjy5F+jrgj86AOam1vxZZWcsF5ZxXsbJs+1ae2yZcjlgjcEj61znhbwl8No9ViuI7q8j1gMJNuozPDKzHvhsZyc9Ca6yXwlrumYfQ9eN1EP+XPVhvBHtMo3j8Q1ZOoXxEHleLvCs9vD1aZUW7tx7l1GV/4EooA9LGAox0pa8y02yQQibwh4olt4QeLfeLq347bGOVH+6wrXj8WeINLx/begrdQgfNdaRIZMc9TC+GH/AAEtQB21FZeieItK8RQPLpd4s4jO2RMFXjPoykAqfqK1KACiiigAooooAKKKKACiiigAooooAKq6n/yCrz/rg/8A6CatVV1P/kFXn/XB/wD0E0Acb4XRZPB2kI6hlNjECCMgjYKpaN4TsbrxFrZs5rnS5ITCY2sJPLUFlOcp90/iKv8AhT/kUdG/68of/QBV/wAL/wDIyeIfrb/+gNQAKnjDRcBXttdth3fEE4GP++T+lSweONNWRYNUhutJnOPlvIiq5Po4+U/nXTVHNBDcRmOaJJEPVXUEfrQAQXEN1Cs1vKksTDKujBgfxFSVy8vgbT4pzcaRdXmjzlgxNlLhGx6xnKn8qo2+reKLKVoUbTfESRg58hvs1wcNtbAOUfB4OCMHjrQBran4K0DVJjcPYrb3Z/5ebQmGT65XGfxzWRL4b8S6XltM1aLUoRkiC/Ta/sBIvX8RWlaeOtFluUtL95tIvX4W31OIwFjnHysflb/gJNdKCCMg5FAHnfhnVh4Viu08S2NzY3t1cPNNdbPMhb0AdewGBzXdWOpWOpw+dY3cNzH/AHonDY/KrLKrqVdQynggjINc/feCtGu7g3UEUmn3hz/pFjIYX5GOdvX8aAOhork/sfjDRh/od9a61bL0ivh5U2MdBIowT9V/GpI/HFlbzx22u2V7ok8jBEN5HmF2PZZlyn5kH2oA6iiiigAooooAKKKKACiiigAqrqf/ACCrz/rg/wD6CatVV1P/AJBV5/1wf/0E0Acf4U/5FHRv+vKH/wBAFX/C/wDyMniH62//AKA1UPCn/Io6N/15Q/8AoAq/4X/5GTxD9bf/ANAagDq6KKKAMPxnfXGmeCdcvbRmS5gsZpInXqrBDhh9Dz+FYGiWFxZ+NtP0yMhrPRtEWAyKpALOyhVPPJxFmun1abUVHk2mkw38MiESCW5EY54xgqcjFLLHPplkDpWmRTSswLxtP5fbqWIOfSgC3fWtpeWcsN9bw3FsVy8U0YdWA9QeDXnng3whNJ4ch1jTNYvtHmvy11BawPvtYYnOUTyWyuNuCSMHJPOK70y30mku8liguyh/0YT8E+m/H9KyvBNlq+leFrXTNWt4Y5rNPJiMU28PGvCZ4GCFwD9M0AVjqPjDSh/p2kWurQqCTNp0vlyY7fun7/RjVyw8Z6NfXH2WSdrK8HBtr1DDJnGejdevar1hd6rPcul7pcVrCB8si3QkLfhtGKp6jazatefYtQ8PWd1p24jz5ZwzAEdQm3IP0NAG6CGAIIIPcVynir/iaa7oPh4fNFLcfbrsD/nlDhlB9jJ5f5Gs/UvC+r6Vcq3hJ7iBT8xSS9zCD0x5bqePoav+E9K15dSvtZ8TLaLqEyR28SWrlkSJee/QliSfwoA62iiigAooooAKKKKACiiigAqrqf8AyCrz/rg//oJq1VXU/wDkFXn/AFwf/wBBNAHH+FP+RR0b/ryh/wDQBV/wv/yMniH62/8A6A1UPCn/ACKOjf8AXlD/AOgCr/hf/kZPEP1t/wD0BqAOrooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAqrqf/IKvP8Arg//AKCatVV1P/kFXn/XB/8A0E0Acf4U/wCRR0b/AK8of/QBV/wv/wAjJ4h+tv8A+gNVDwp/yKOjf9eUP/oAq/4X/wCRk8Q/W3/9AagDq6KKKACiiigAooooAKKKKACiiigAooooAKKKKACo554rW3knnkSKGNS7u5wqqOSSewqSud8ff8k88R/9g2f/ANANAEv/AAmvhf8A6GHTP/ApP8aP+E18L/8AQw6Z/wCBSf41nQ2Np5Ef+jQ/dH8A9Kf9htP+fWH/AL4FAF7/AITXwv8A9DDpn/gUn+NVtR8Z+GH0y7Vdf00s0LgAXKcnafeovsNp/wA+sP8A3wKPsNp/z6w/98CgDmfDPinQIPC2kxS6zYJIlpErK06gghRkHmr3hzxZ4eh8Qa7JLrenoknkbGa4UBsK2cc1sfYbT/n1h/74FH2G0/59Yf8AvgUAXv8AhNfC/wD0MOmf+BSf40f8Jr4X/wChh0z/AMCk/wAao/YbT/n1h/74FH2G0/59Yf8AvgUAXv8AhNfC/wD0MOmf+BSf40f8Jr4X/wChh0z/AMCk/wAao/YbT/n1h/74FH2G0/59Yf8AvgUAXv8AhNfC/wD0MOmf+BSf40f8Jr4X/wChh0z/AMCk/wAao/YbT/n1h/74FH2G0/59Yf8AvgUAXv8AhNfC/wD0MOmf+BSf406Pxj4amlSKPXtOeRyFVVuUJJPbrWf9htP+fWH/AL4FYfi60to/DsjpBErCe3wQgBH75KAPR6KKKACiiigAooooAK53x9/yTzxH/wBg2f8A9ANdFXP+OYpJ/APiCKKN5JH0+dVRFJLHYeAB1oAhh/1Ef+6P5U+ufi8X6OsKKXvAQoB/4l9x/wDEU7/hMdG/56Xn/gvuP/iKAN6isH/hMdG/56Xn/gvuP/iKP+Ex0b/npef+C+4/+IoA3qKwf+Ex0b/npef+C+4/+Io/4THRv+el5/4L7j/4igDeorB/4THRv+el5/4L7j/4ij/hMdG/56Xn/gvuP/iKAN6isH/hMdG/56Xn/gvuP/iKP+Ex0b/npef+C+4/+IoA3qKwf+Ex0b/npef+C+4/+Io/4THRv+el5/4L7j/4igDerB8Y/wDIty/9d7f/ANHJR/wmOjf89Lz/AMF9x/8AEVl+IfEFhquk/YrIXktxJPBtT7DOucSoTyUAHANAHqtFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH/9k=']	['phy_994.jpg']
phy_995	MCQ	<image_1>As shown in the figure, glass bottles A and B contain hot water and cold water with equal mass and a temperature of 60℃ respectively. The following statement is incorrect ()	['A. Because the masses are equal, the internal energy of water in bottle A is greater than that in bottle B.', 'B. The average distance between water molecules in bottle A is smaller than that in bottle B', 'C. If you put the two glass bottles A and B together, the internal energy of the water in bottles A and B will change. This way of changing the internal energy is called heat transfer.', 'D. If you put the two glass bottles A and B together, their states will change. Until the two temperatures are the same, the two systems will reach thermal equilibrium, and both systems that have reached thermal equilibrium are in equilibrium.']	B	phy	热学_分子动理论	['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phy_996	OPEN	In the experiment, 1 mL of pure oleic acid was prepared into 5000 mL of oleic acid alcohol solution. Using a syringe, 1 mL of mixed solution was measured to be 80 drops. Take 1 drop of such solution into a prepared tray and place it on the glass cover plate. The outline of the oil film drawn on the cover plate is as <image_1>shown in the figure. The side length of each grid of the square paper is 0.5 cm. Based on the above information, the diameter of the oleic acid molecule is estimated.$d=$___m. (Results retain one significant figure)		7 \times 10^{-10}	phy	热学_分子动理论	['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']	['phy_996.jpg']
phy_997	OPEN	A certain group designed a simple depth gauge, as <image_1>shown in the figure. It is constructed as a rigid cylindrical container with good thermal conductivity. There is a bayonet at the top. A thin piston with negligible mass is used to seal part of the ideal gas. The piston and the container wall can slide without friction, and water squeezes the piston to move it downward. The depth reached by the depth gauge can be calculated based on the distance $d$moved downward in the figure. The inner bottom area of the container is $S = 0.8 $m$^2 $, and the inner height is $L = 1$ m. Ignoring the change of water temperature with depth, after the depth gauge reaches thermal equilibrium with water in the water, the piston is located at the top bayonet. At this time, the enclosed gas pressure is $p_0$, and the external atmospheric pressure is known to be $p_0 = 1.0 \times 10^5$ Pa, and $p_0$is equivalent to the pressure generated by a 10-meter-high water column. If the depth gauge slowly descends from a water depth of 70 meters to 90 meters, the change process of gas state corresponds to the process from point $a$to point $b$on the isotherm. As shown in Figure B<image_2>, the $ab$section can be approximately regarded as a section of inclined straight line, and calculate the heat released by the gas to the outside world during this process,$Q$.		9 \times 10^4 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'phy_997_2.jpg']
phy_998	MCQ	<image_1>The picture shows a vertically placed closed thin tube with a thick upper part and a thin lower part. The mercury column divides the ideal gas into two parts A and B, with the same initial temperature. After raising A and B to the same temperature and stabilizing, the corresponding volume changes are $\Delta V_A$and $\Delta V_B$respectively, and the pressure changes are $\Delta p_A$and $\Delta p_B$respectively. The changes in liquid surface pressure are $\Delta F_A$and $\Delta F_B$respectively, then ()	['A. $\\Delta V_A < \\Delta V_B$', 'B. $\\Delta F_A = \\Delta F_B$', 'C. $\\Delta p_A > \\Delta p_B$', 'D. The column of mercury moved up a certain distance']	CD	phy	热学_气体、固体和液体	['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']	['phy_998.jpg']
phy_999	OPEN	Picture A <image_1>shows a pneumatic shock absorber for a mountain bike, which is mainly composed of a piston, a cylinder and a spring. A research team took it out for research. As shown in Figure B<image_2>, place the heat-conducting cylinder B with piston A on a smooth inclined surface with an inclination angle of $\theta = 30 ^\circ $. The piston is pulled by a light spring fixed at the other end, and the light spring is parallel to the inclined surface. In the initial state, the distance from the piston to the bottom of the cylinder is $L_1 = 27$ cm, the distance from the bottom of the cylinder to the bottom of the inclined surface is $L_0 = 1$ cm, and the initial temperature of the gas in the cylinder is $T_1 = 270$ K. It is known that the mass of the cylinder is $M = 0.6$ kg, the mass of the piston is $m = 0.2$ kg, and the cross-sectional area is $S = 1.5 $cm$^2 $. A certain mass of ideal gas is sealed between the piston and the cylinder. The piston can slide without friction, the gravity acceleration is $g = 10$ m/s$^2$, and the atmospheric pressure is $p_0 = 1.0 \times 10^5$ Pa. The suspension device is horizontally installed on a smooth bracket under the seat of the mountain bike. The ambient temperature remains unchanged at $T_1$. A cyclist accelerated downhill on a mountain bike (When the slope is $\theta = 30^\circ$), the magnitude of the acceleration generated is $a = 5$ m/s$^2$, and the suspension device is still placed as shown in Figure B. It is found that the distance from the piston to the bottom of the cylinder is $L' = 27$ cm. Through calculation and analysis, whether the airtightness of the cylinder is good. If it is good, please explain the reasons; if it is not, what percentage of the gas intake or leakage in the original gas is?		0.2	phy	热学_热力学定律	['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'phy_999_2.jpg']
phy_1000	MCQ	<image_1>As shown in the figure, there is a uniform strong electric field (not shown in the figure) parallel to the plane where the rhombic ABCD is located in space. There is a particle source at point A, which can continuously emit negatively charged particles with a charge of $q$and an initial kinetic energy of $E_k$in all directions. The kinetic energy of the particles passing through point B is $3E_k$, and the kinetic energy of the particles passing through point D is $5E_k$. It is known that the side length of a diamond is $L$,$\angle BAD = 60^\circ$, and the gravity of the particle is ignored. Then the following judgments are correct ()	['A. The potential difference between the two points AB is $\\frac{3E_k}{q}$', 'B. The direction of the uniform strong electric field is in the AD direction', 'C. The kinetic energy of the particle passing through point C is $7E_k$', 'D. The magnitude of the uniform strong electric field is $\\frac{5E_k}{qL}$']	C	phy	电磁学_静电场	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCAChAPMDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigDL8SXzaX4c1DUFuBbm2gabzCoYDaM9DXASeK/F2lfDe08Y31zYSsyJLNYtbFAUZsDa4bIOCDyDWn8Wp5Ljw/Y+HrZytxrd7FaAr1CZyx+mBj8a5zxnpreHvEfhS2vr2513SLi5W2XTrzaBGRja6iNUDY9GBoA9bsLsX+nWt4qMi3ESShG6ruAOD+dWKAAAABgCigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKK5vxJ430fw2Vgmke5v5OIrK2G+WQ/QdPqaAINa8Ff2z4hstbfWryCex3fZljSMpHuGCcMpyfc0+08D2MevRa5qN5earqMIIgku3XbD/ALiKoUH3xWENE8W+NiJddvJdA0o8pYWUmLhx28yT+H6CjzPGHgT/AFok8S6Gn8ajF3AvuP4x+tAHotFY3h/xTo/ia18/S7xJSOHiPyvGfRlPINbNABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFRXN1BZ273FzMkMKDLO7YAH1oAlrN1rxBpfh2yN3ql5FbxDpuPLH0A6k1yFx451PxHO9j4IsPtKg7X1S5BW3j917ufpV7Rfh7aW16uq67cya1q/Xz7nlI/ZE6CgDN/tTxb45+XRoX0HRW631yn+kSr/wBM0PT6muk8OeC9H8MhpLSFpr2TmW9uG3zSH3Y/yFdD0ooAKKKKAOS8QeANN1e6/tKxkk0rWF5W9tPlJP8Atjow+tZMfi/XvCUq2vjKy86zztTV7NS0Z/66L1U16HTJYo5o2jlRXRhhlYZBH0oAhsNQs9UtEurG5iuIHGVeNsg1Zrg7/wAAT6Zdvqfgy/Ol3THc9o3zW0x91/h+op+l/EIW94mleK7JtH1EnasjnMEx9Vfp+BoA7mikR1kQOjBlIyCDkGloAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoJAGScCud8R+NdH8NbYbmVp76TiKytxvmkP+6On1Nc4NI8V+ODv1ud9D0ZuRp9s/7+Vf+mj9voKANHWviFawXraV4ftZNa1boYrf/VxH1d+gqnbeBdR8Q3CX/je/+14O6PTLclbeP6/3z9a67RdA0vw/ZLaaXZxW8Q67Ryx9SepNaVAEVvbQWkCQW0KRRIMKiKAAPpUtFFABRRRQAUUUUAFFFFABVLU9JsNZsntNRtIrmBxgpIufy9Ku0UAedt4a8SeDGM/hW7OoaaDltKvHyVH/AEzft9DW54d8d6Vr0xspPMsNUTiSxuhskB9v7w+ldRWF4i8IaP4nhC39sPPTmO4jO2WM+oYc0AbtFedfafF/gU4ukk8RaIv/AC2Qf6VCvuP4x+tddoPibSPEtp9o0u8SYD78fR4z6Mp5BoA16KKKACiiigAooooAKKKKACiis7WdVj0ixMxXfM7COCIHmRz0FAEjatZrq6aV5wN48Rl8sckKO59Ku15X4KtZj8XvEc91cGedLKESPnIDkkkL6AVsfETxvqHhX7JbWViq/aztOpXIY29tzj5toJz+lAHV61r2l+HrBr3Vb2K1gX+KRuW9gOpP0riU13xR49Qf8I7GdG0R/wDmJXC5mmX1jTt9TVvQPAemXjJret6gPEl9MuVuJSGhUHtGg+UCmeAI/wCx/EXiXwzCxNjZTpNbKTkRLIM7B7A0Aa+i+EtB8HWs9+RvuApkudQu23yMBySWPQewo0PXdU8UAahYwRWmjs37mSdS0twv94DOFU9s5rD+NU06eADbQuyLeXkNvKw7IxOf1Aqh4oTVfAVloer6Xq13cWq3ENpc2UzAxvG3GVUABSMdvagDqbzxHeXni6Tw3ovkLPawCe8uJ1LLHu+4gUEcnr9Kq2fjppNA1ia4tUGq6TcfZLi3VsI0hYKjAnkIxIOe3PpWN4D3j4rePfOGJWe2ZQeuwqxX9MVD4RsotS+JfxFguIllsJmt4ZEYfKx2tkUAdbaanrdhrlhYay1lOmoLJ5T2qMhjdF3FSCTkYzz6j3rpqxdM8L6fpd6LxHuri4WMxRvdXDzGJDjKruJwOB9cVtUAFFFFABRRRQAUUUUAFFFFABRRRQAVyGvfD/T9Tu/7T02aXSNYXlby0O0sf9tejD6119FAHnsXjPWvCkq2njWx3WudqaxZoWiP/XReqH9K7qyvrXUbSO6sriK4gkGVkjYMp/EVLLFHPE0UqK8bDDKwyCK838ReGIPBUc/iDw5rkOg4O6W0uWzaTn02dQf938qAPS6QkKCSQAOSTXL+BPFV14t8PDUbzS5dPcNt+fOyUY++mcHafeub0C5l+JmvahqF27/8I1YTm3tLQHC3LjrJJ/eHoOlAHosV/ZzhzDdwSBPvbJAdv1x0qxXMa54K0zVBp7Q2sNvJZ3cU4eNdpKq2SvHUHA4rp6ACiiigBsj+XEz7WbaM7VGSfpXH2dn/AMJPfXl74j0GVYbdilnaXkSONvdwMkbj+grsqKAPNfAGk3OleMfElw+gT6bZXkqm0/doqbAPRTwa9Gnt4bqB4LiJJYnGGR1BDD0INSUUAef3PgPUPD1w+oeBdQFizHdJpdyS9pN9B1Q+4rI8A6/FpniHV7bxYraV4j1O6MoiuBtidBwqxSdGH45r1es7WtB0vxFYNY6tYw3du38Mi8qfUHqD7igBNe0Oy8SaJc6VfoWt7hcEqcFT1DA+oPNYw8JXl9Hptvrmqpf2mnyrNHGlt5bSuv3GkO45x14C81i/2N4u8DfPoFw/iDRF66bdyf6RCvpFJ/EB6H6Cui8NeNtG8Th4rWZoL6LiaxuV8ueI+hU/zGRQAuoeGJG8RDX9JvI7LUGg+zz+bAZY5kByu5QyncOxz04qz4c8OW/h20uEjlee6u52ubq5cANNK3U4HQdgOwFbNFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABTZJEhjaSV1RFGWZjgAepNcnr/wAQdO0q8/svToZdY1puFsbMbip9Xbog+tZUfgzW/F0i3Xji+22mdyaJYuVhHp5rjlz+lAEt58QbnWbuTTPA2n/2tcKdst/JlbOA+7/xn2WptJ+Hcb3yav4rvn13VRynnDEEB9I4+g+prsbKytdOtI7Syt4re3jGEiiQKqj2AqegCC6t/PsZrdDs8yNkBH8ORivMfhFqdpoOj3XhTVpY7HV7G6lLwzsEMqsxIdc/eHPavVap32k6bqe37fp9pd7Pu+fCsmPpkUARWms2uoXrwWLrcxxA+bPEwaNG/u7hwW68Dp3xkVo0yGGK3iWKGNI41GFRFAAHsBT6ACiiigAooooAKKKKACiiigArnPEngnRvE5Sa6ieC/i5hv7ZvLniPbDDr9DXR0UAedf2z4s8DHZr8D69oq9NStI/38S+ssY6/UV2mja9pfiCxW80q9iuYW7o3IPoR1B9jWjXF6z8PLWa+bVvDt3JoesHkzWw/dTe0kfQ/WgDtKK8/tvHeoeHrhNP8c2Asix2x6nbgtay/U9UPsa7y3uIbqBJreVJYnGVdGyCPrQBJRRRQAUUUUAFFFFABRVPU9VsNGs3u9RuoraBBkvI2BXDt4n8SeM2MHhO0NhppOG1e9QjcP+madT9TQB0/iLxfo3heAPqN0BK/EVvGN8sh9FUcmuX+z+MfHXNy8vhnQ2/5ZRn/AEydfc9Iwfzrc8O+A9K0Gc30hk1HVn5kv7s75Cf9n+6PYV1NAGRoHhjR/DFn9m0mySBTy79XkPqzHkmteiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigCK5tbe9t3t7qGOaGQYeORQysPcGuDuPA2qeG53vfA9/9nQndJpN0xa3k/wB09UP6V6DRQBxuifEKzu70aVrltJousdPs9zwsh9UfowrsgQRkciszW/D2leIrI2mq2cdxF23D5lPqD1BrjTpni3wMd+kTPr+irybK4b/SIl/2H/i+hoA9FornvDnjTR/EyslpOYryPiW0nGyWM+6mqfiDx9pukXX9nWUcmqau3CWVoNzA/wC0eij60AdXJIkMbSSuqIoyWY4Arhb/AOIE2pXb6Z4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phy_1001	MCQ	In recent years, my country's new energy vehicle production has shown explosive growth. China's new energy vehicle production and sales have ranked first in the world for nine consecutive years. The change of instantaneous speed over time of a new energy vehicle during the experimental testing phase is <image_1>shown in the figure. The two straight lines in the figure are both tangent to the middle curve. It is known that the test car starts from rest on a straight road. The rated power of the car is 7kW. The resistance experienced by the car is constant. At the end of 18 seconds, the speed of the car just reaches its maximum. The following statement is correct ()	['A. The power is constant during the first 8 seconds of car movement', 'B. The maximum traction force of the car is 700N', 'C. The traction work done by the car during uniform acceleration is $2.24\\times 10^4$ J', 'D. The displacement of the vehicle within 8s to 18s is 95.5 m']	D	phy	力学_机械能及其守恒定律	['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phy_1002	MCQ	A locomotive with a mass of $m$starts from rest on the horizontal plane. The change of traction force $F$with time $t$during starting is <image_1>shown in the figure. It is known that the resistance experienced by the locomotive is always $F_f$, and the speed of the locomotive at the moment of $t_1$is $v_1$. At this time, the locomotive reaches the rated power and remains unchanged. The speed of the locomotive at the moment of $t_3$is $v_3$, then the following statement is correct ()	"[""A. The acceleration of the locomotive's uniform acceleration during the period of $0 \\sim t_1$is $\\frac{4F_f}{m}$"", 'B. The average speed of the locomotive during the $t_1 \\sim t_3$period is greater than $\\frac{v_1 + v_3}{2}$', 'C. $t_2$The speed of the locomotive at the moment $v_2 = 2v_1$', 'D. $\\frac{t_1}{2} The speed of the locomotive at the moment is $\\frac{v_3}{8}$']"	BCD	phy	力学_机械能及其守恒定律	['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phy_1003	MCQ	When a car has a total mass of $m$and an engine power of $P$, it is driving at a constant speed of $v_0$on a straight road. The driver reduces the throttle to enter the speed limit zone reasonably, and the car's power is immediately reduced to $\frac{P}{3}$and maintains this power to continue driving. Assume that the resistance experienced by the car remains unchanged while driving. Since the driver reduces the throttle, the relationship between $v$-$t$of the car is as <image_1>shown in the figure, then the following statement is correct during the time of $0$-$t_1$()	['A. When $t=0$, the acceleration of the car is $\\frac{P}{3mv_0}$', 'B. The speed of the car at a time of $t_1$is $v_1 = \\frac{2}{3}v_0$', 'C. The displacement traveled by the car is $\\frac{v_0t_1}{3} + \\frac{4mv_0^3}{9P}$', 'D. The work done by the car engine is $\\frac{2Pt_1}{3}$']	C	phy	力学_机械能及其守恒定律	['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phy_1004	MCQ	As <image_1>shown in the figure, a smooth semicircular track with a radius of 2.5m is fixed on the smooth horizontal plane. The semicircular track is placed vertically and the bottom is tangent to the horizontal plane.$a$and $c$are the end points of its vertical diameter respectively, and $b$is the same height as the center of the circle. A small ball with a mass of $0.5kg$moves along the horizontal plane at a certain initial speed and enters the semicircular orbit from the $a$point. When the ball passes through the point $a$, the pressure on the orbit is $25N$, and the gravitational acceleration is $g = 10 \text{ m/s}^2$, then the following statement is correct ()	['A. The initial velocity of the ball is $5\\sqrt{5} \\text{ m/s}$', 'B. When the ball passes through point $b$, the pressure on the orbit is $10N$', 'C. The velocity of the ball when it leaves orbit is $\\frac{5\\sqrt{5}}{3} \\text{ m/s}$', 'D. The ball de-orbit between $bc$at a height of $\\frac{25}{6} \\text{ m}$above the ground']	BD	phy	力学_机械能及其守恒定律	['/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAgGBgcGBQgHBwcJCQgKDBQNDAsLDBkSEw8UHRofHh0aHBwgJC4nICIsIxwcKDcpLDAxNDQ0Hyc5PTgyPC4zNDL/2wBDAQkJCQwLDBgNDRgyIRwhMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjIyMjL/wAARCADSASMDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiikZgqlmIAHJJoAWiufbxnoqhJBPK1q8giF2sLGDcTtA8zG08nGQcVV8S/Ebwt4Svo7LV9SWK5kAby0RnKg922g4/GgDqqKr2N9a6lYw3tlOk9tMoeORDkMPUVYoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuA+J97K//CP+HhK0NtrWoLb3UinBMI5ZAe27gfnXf1j+I/DGleKtOWy1W3MsaOJI2VirxuOjKw5BoAlvdL0e4trOxvLW2eCKVGtoXAwHQZXaPYA14L8VvhP4o1XxzdavpFp9vtr4q3yuoaIhQuDkjjjrXuui+GrHQ/mhku7mfbt8+9uXnkC+gLE4HsMVsUAeU+FfhDcaZ4as7e68U69Z3qqTJHYXuyFCSTgKQfXn1Oa1/wDhEfG+nn/iWePHnQdI9Rslkz9XBBrv6KAPPjrfxF0I/wDE08O2OtQD/ltpMxRwPdH6n6Vf0j4m+HNSuVsrqaXSdRJ2mz1KMwSA+nPB/A12VZuseH9I8QWjW2rafb3cRHSVASvuD1B9xQBoghhkEEHuKWvOX8HeJPCBNx4L1RrmyU5bRtScumO4jk6r9DxWz4Z8fWGu3TaZeQy6VrcQ/e6fdja/1Q9HHuKAOtooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArn/FPg7SfFtoqX0RS6h+a2vITtmgbqCrdevbpXQUUAec6V4p1bwhqkPh/xpIJIJW2WOtAYSb0WX+6/6H9a9GBBGQciqGs6NYa/pU+m6lbpPazLhlYdPcHsR61w3h7VL/wNr0PhHxBcPcadcHGj6lJ/F/0xkP8AeHGD3oA9IooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArG8UeG7LxXoU+l3y/LIMxyr96Jx911PYg1s0UAcT4A8Q3tyLvw1rxA13SSElb/n4iP3JR65HX3+tdtXn3xGsZ9JnsfHOmRlrzSTtu41H+vtWPzg/wC71H413Nje2+pWFve2kglt7iNZI3HRlIyDQBYooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigCOeCO5t5IJkDxSKUdT0IIwRXBfDOaTSpNa8GXEhZ9Fuf8ARi/3mtpPmQ++OR+Veg1574iH9hfFrw5rIGINUhk0yc/7X348/jkUAehUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVwPxeRofBsWrRj95pV/b3g+iuAf0au+rifixqOm2Xw61eDULqKFrq3eOBXPMkmMgAd+lAHaRyLLEkinKsAQfY06ud8D63Za74P025srqO42W8ccpQ5KSBRuU+hp/jbUINK8GarfzySIsFuzKY5GQ78YUAqQeWIoA36K5jwFDPYeDtJs9Ru2m1JrcTT+dLuk3P8xznnjOPwrp6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArxL9oHwhq2sWdlrliPOttPicXEW7BReu8A9enPfpXttcZ8V7v7H8MdcYfelgEKj1LsF/rQByfwE8I6r4e0G91HUv3Sal5bwQbs4QAkOcdM7v0rc+KAfWZfD/hGFyjareh52H8MMQ3t+uK7bR7X7Dolhaf88LeOP8AJQKxtS8MXE3jC28S2l1E1xb2rWqW9whMahmyWUg5Ddu9AHHeO/Dmn6Zr3g+TRbfydZk1VFMyMfNmhAJkLt1YYxknNer1iWfh/Gttreozi61ARmKEqm2O3Q9QgyeT3JOT7DitugAooooAKKKKACiiigAooooAKKKKACiiuS8ZeMLnwg1hcSaYs+m3FzHby3InwYdxxkpt5H40AdbRWJrWtXemapotvDp/2m3v7gwSzCQAw/KWBx/F0P5Vt0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFef8AxPIv5fDHh5fmbUNVjd09Yo/mfPt0r0CvPLA/8JH8Zb69UbrPw9aC0Rj0NxJy+PoowaAPQ6KKKACiiigAooooAKKKKACiiigAooooAKKKKACuF+MNobv4X6uqqWkQRSIAMnIkXp713VIyq4wyhhkHBHpQBh6NBcX5t9Vv4niKwhba3kAzGCBudv8Aab07DjqTVVfGVubSHUzGo0qa++xRzhiWJ3bA5GPulxj6YPtXTEZUj1ry5NAvT4A0/wAJLGft0OqIJOCAIknMnmZ9CoGPc460AepUUgZSSoYErwRnpS0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBi+LfEMHhbwxe6tPyYY/3SdS8h4VR9SRWb8O9An0HwpD9vydUvXa8vnbqZX5IP0GB+FYEz/wDCw/iElun7zw74dl3zNn5bm77L7hP5/WvS6ACiiigAooooAKKKKACiiigAooooAKKKKAGyF1ido13uASqk4yfTNcIfFXxBBOPhyh/7jcP/AMTXe0UAcD/wlXxB/wCicJ/4O4f/AImj/hKviD/0ThP/AAdw/wDxNd9RQBwP/CVfEH/onCf+DuH/AOJo/wCEq+IP/ROE/wDB3D/8TXfZooA+X/ib4r8W6b43s9RFhN4d1J7dd0UF8twJgGO1mCjHqMEHpXqvwz8UePNciUeI/D6xWpXK3zHyWb/tn1OfUYFdydA0ptZfV3sIZNQZQn2h13MqjoFz90fStKgAooooAKKKKACiiigAooooAKKKKACiiigAooooAK4Txx4jvZ7yLwf4afdrl8v76YdLGE9ZG98dB/8AWzJ4s8az298vhvwxCt/4inHQcx2i/wDPSQ9Bj0/ydHwd4Pt/C1lK8kzXmq3jebe30n35nP8AJR2FAGh4b8PWXhfQrbSbFSIoR8zN96RjyzE+pNa1FFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV4t478Zaxrnie48M+H7ySxsrIhLy6hOJJJMcop7Ad8d69pr55jU6F8SfENhfKUlmvGu4i3/AC0jfkEevpQBAPCGp6YPt2nazqdtedfOFwxLH/aB616j8MvGd34n0+8sNWVV1fTHWO4ZBgSqw+VwO2cHNZl/rNo+m7BtBA61lfB2Br/xZ4k1yHP2LbHaI4+7I4yWI+nH50AeyUUUUAFFFFABRRRQAUUUUAFFFcXefFfwZY6+2jXGsIt0r+W7BGMaPnG0tjA5/KgDtKKQEEAg5B6EUpIAyTigAorn9Z8c+GNAJXUtbs4ZB/yyEgeT/vlcn9K5w+O/EPiL914Q8MXHlOcLqWqgwwAf3gv3mH0oA7u+v7TTLOS7vrmK2t4xl5ZXCqPxNefXHinXvHcjWPgyN7LSids2uXCFcjOCIFP3j15/lVqz+G76leR6l401WXXLtG3JbY2WkXpiMdfqevpXeRRRwRLFDGscaDCqowAPQCgDE8LeEtM8J2DW9ijPNKd9xdSndLO/dmbvW9RRQAUUUUAFFFFABRRRQAUUUUAFcZrfh3xRcahc3lp44k06yPzLB9ijZYlA5+Y9u/NdnXG+MtF1vxRqFpokT/ZPDzr5moXCSYkmweIQOwPc/wCSAcV4XHjzxXqN9JY+NZ10O3byob97CMG5cdSi4+6Oec//AFmu3jm78aL4d0bxvNem3G7Ubr7DEsdqOy553OfT/wCvj0LxFY6vZeGINJ8H20FvIxW2WQkKtpFjlwO5HYepqG28P3Hg3wTPZ+F7VLzVCN2+4fBnmYgNI5PX1x7YoA4PXm8c2PiCy8PaR43m1HV7g75Y/sMSpbRd3kbnHsO/5VJ4tPjTw4LSztfHVxqGs3zhLWxj0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phy_1005	MCQ	As shown in Figure A<image_1>, in the\(xOy\) plane of the three-dimensional rectangular coordinate system\(O-xyz\), the two wave sources\(S_1\) and\(S_2\) are located at\(x_1=-0.2\,\text{m}\) and\(x_2=1.2\,\text {m}\) respectively. The two wave sources vibrate perpendicular to the\(xOy\) plane, and the vibration images are as shown in Figures B <image_2>and C respectively<image_3>.\ (M\) is a point in the\(xOy\) plane, and\(MS_2-MS_1=0.2\,\text{m}\). There is a uniformly distributed medium in space and the wave velocity of the two waves in the medium is\(v=2\,\text{m/s}\), then ()	['A. The equilibrium position is on the\\(x\\) axis and the direction of particle vibration at\\(x=0.2\\,\\text{m}\\) is along the negative direction of the\\(z\\) axis', 'B. In the superposition area of two waves, the equilibrium position is on the\\(x\\) axis and the particle vibration is weakened at\\(x=0.6\\,\\text{m}\\)', 'C. In the superposition area of two waves, the equilibrium position is on the\\(x\\) axis and the particle vibration is strengthened at\\(x=0.5\\,\\text{m}\\)', 'D. If timing starts from the time when two waves meet at the point\\(M\\), the vibration equation of the particle at\\(M\\) is\\(z=0.4\\sin(10\\pi t+\\pi)\\,\\text{m}\\)']	D	phy	力学_机械振动与机械波	['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'phy_1005_2.jpg', 'phy_1005_3.jpg']
phy_1006	MCQ	As <image_1>shown in the figure, in a horizontal uniform electric field and a uniform magnetic field perpendicular to the paper, there is a vertical fixed insulating rod MN that is long enough. A small ball P is sleeved on the rod. It is known that the mass of P is\(m\), the amount of charge is\(+q\), the electric field strength is\(E\), the magnetic induction strength is\(B\), the dynamic friction coefficient between P and the rod is\(\mu\), and the acceleration of gravity is\(g\). The small ball starts to slide downward from rest, and the maximum acceleration of the small ball during movement is\(a_0\). The maximum speed is\(v_0\), then the following judgments are correct ()	['A. The acceleration is greatest when the ball starts to slide', 'B. As the speed of the ball increases from\\(\\frac{1}{2}v_0\\) to\\(v_0\\), the acceleration of the ball decreases all the time', 'C. Ratio of the velocity of the ball to\\(v_0\\) when\\(a=\\frac{1}{2}a_0\\)\\(\\frac{v}{v_0}=\\frac{1}{3}\\)', 'D. When\\(v=\\frac{1}{2}v_0\\), the ratio of the acceleration\\(a\\) to\\(a_0\\) of the ball must be less than\\(\\frac{1}{2}\\)']	B	phy	电磁学_磁场	['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']	['phy_1006.jpg']
phy_1007	MCQ	As autonomous driving technology continues to mature, unmanned vehicles have successively entered specific roads for experiments. As shown in the figure<image_1> is a moving $v-t$image of two unmanned cars starting from the same place at the same time on a horizontal straight road. There is no collision during the movement process. For the movement process of two unmanned cars, the following statement is correct: ()	['A. At 4 seconds, the distance between the two unmanned cars was 6 meters', 'B. At 2.5s, the unmanned car A returned to the starting point', 'C. At 2.5 seconds, the acceleration directions of unmanned vehicles A and B are opposite.', 'D. In the first 2 seconds, the acceleration of A is always greater than the acceleration of B.']	D	phy	力学_匀变速直线运动	['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phy_1008	MCQ	The two carriages A and B with sensors moved from the same position and in the same direction at the same time. Data processing was carried out by the computer, and their $\frac{x}{t}-t$images were obtained, as <image_1>shown by the straight lines A and B in the figure. It is known that two carriages can be regarded as mass particles. The carriages accelerate under the action of the engine and decelerate under the action of frictional resistance. The following statements are correct ()	['A. Both cars A and B perform uniform acceleration and linear motion', 'B. A The acceleration of the trolley is $6 \\, \\text{m/s}^2$', 'C. The maximum distance between the two small workshops before the encounter is $4 \\, \\text{m}$', 'D. In the 2nd, two cars A and B met']	BC	phy	力学_匀变速直线运动	['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phy_1009	MCQ	As shown in Figure (a)<image_1>, a sufficiently long slope with an inclination angle of $\theta$is placed on a rough horizontal surface. Small objects A and B of equal mass slide down the inclined plane at an initial speed of $v_0$at the same time. The dynamic friction coefficients of A and B and the inclined plane are $\mu_1$and $\mu_2$respectively. During the entire process, the inclined plane is stationary relative to the ground. The relationship curve between position $x$and time $t$of A and B is shown in figure (b)<image_2>. Both curves are parabolas, and the tangent slope of B's $x-t$curve is 0 when $t=t_0$. then ()	['A. $\\mu_1 + \\mu_2 = 2 \\tan \\theta$', 'B. When $t = t_0$, the speed of the armor is $3v_0$', 'C. Before $t = t_0$, the friction force on the slope faces to the left', 'D. After $t = t_0$, the frictional force on the slope faces to the 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'phy_1009_2.jpg']
phy_1010	MCQ	As shown in Figure A<image_1>, the plate length and plate spacing of the two parallel metal plates A and B are both d, and the periodic change rule of the voltage between the two plates with time is as shown in Figure B<image_2>. A charged particle beam regardless of gravity is injected into the plate from point O along the center line between the plates at a velocity of $v_0$. If the charged particles entering the electric field at the moment of $t=0$are just along the right edge of the A plate at the moment of $t=T$, then ()	['A. The velocity of the particles entering the electric field at $t=0$when they leave the electric field is $\\sqrt{2}v_0$', 'B. $t=\\frac{T}{2}$The velocity of the particles entering the electric field when they leave the electric field is $v_0$', 'C. $t=\\frac{T}{4}$The maximum velocity of a particle entering the electric field during movement between the two plates at the moment is $\\frac{3}{2}v_0$', 'D. $t=\\frac{T}{4}$The minimum distance between the particles entering the electric field and the A plate during the movement between the two plates is 0']	B	phy	电磁学_静电场	['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'phy_1010_2.jpg']
phy_1011	MCQ	As <image_1>shown in the figure, the two long straight electrified wires a and b are fixed at positions A and B perpendicular to the paper. The current direction has been marked in the figure. The distance between positions A and B is L, and the midpoint of AB is C. The entire device is in a uniform magnetic field with a direction parallel to the paper and perpendicular to AB. The magnetic induction intensity of the uniform magnetic field is $B_0$. It is known that the magnetic induction intensity of point D is zero. AD is perpendicular to AB and the angle with BD is 30°. If the magnitude of magnetic induction generated by a long straight electrified wire at a certain point is inversely proportional to the distance from the point to the wire and proportional to the magnitude of the current, then the following statement is correct ()	['A. The ratio of current magnitudes in a and b is $\\frac{4}{3}$', 'B. The direction of magnetic induction intensity at the midpoint E of BD is vertical AB upward', 'C. The magnetic induction intensity of point C is $13B_0$', 'D. The ampere force applied to wire b is horizontally to the left']	C	phy	电磁学_电磁感应	['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phy_1012	OPEN	As shown in the figure<image_1>, a wooden board $C$with a mass of $m_2=1\mathrm{kg}$and a thickness of $h=0.45\mathrm{m}$is stationary on the smooth horizontal ground, and a vertical smooth circular arc track with a radius of $R=0.75\mathrm{m}$is fixed on the horizontal ground to the right of the wooden board $C$. The wooden board and the track are in the same vertical plane. The bottom end of the track is equal to the wooden board $C$and on the same vertical line as the center of the center $O$. The line between the upper end of the track $D$and the center of the center $O$forms an angle of $37 ^\circ $with the horizontal plane. The mass $B$with a mass of $m_1=1.9\mathrm{kg}$is placed on the left end of the wooden board $C$, a bullet $A$with a mass of $m_0=0.1\mathrm{kg}$hits the mass $B$at a horizontal speed of $v_0=160\mathrm{m/s}$and remains in it (for a very short time), and then the mass $B$(including $A$) slides horizontally to the right from the left end of the wooden board. The dynamic friction factor between $B$and $C$$\mu=0.5$. When the item $B$(including $A$) reaches the right end of the wooden board, the wooden board just collides with the bottom end of the track and is locked, and at the same time, the item $B$(including $A$) slides onto the track in the tangential direction of the arc. When the mass $B$(including $A$) moves to the highest point in the air, it will burst into mass $M$and mass $N$(including bullet $A$) with a mass ratio of $1:3$. The total mass remains unchanged, and at the same time, the momentum of the system increases by $3\mathrm{J}$, and only one of them moves in the direction of original speed. It is known that the wooden board length is $L=1.3\mathrm{m}$, the gravitational acceleration is $g=10\mathrm{m/s^2}$,$\sqrt{10}=3.16$,$\sin37^\circ =0.6$, and $\cos37^\circ =0.8$. Determine whether item $M$and item $N$will fall on the wooden board? If it does not fall on the board, calculate the distance from the falling point of the object to the left end of the board.		Block $M$will fall on the board, block $N$will not fall on the board,$2.1\mathrm{m}$	phy	力学_动量及其守恒定律	['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phy_1013	OPEN	As <image_1>shown in the figure, a wooden board with a mass of $M$and a sufficient length is still on the smooth horizontal ground. A slider with a mass of $m$rushes onto the wooden board from the leftmost end at a speed of $v_0$. The dynamic friction between the slider and the wooden board is $\mu$, and the gravitational acceleration is $g$. Then: If $M=2m$, initially fix a baffle (not shown in the figure) at a certain position on the right side of the board at a distance of $L\geq\frac{v_0^2}{25\mu g}$from the right side of the board. Immediately withdraw the baffle after the elastic collision between the board and the right side baffle (the speed of the board before and after the collision remains unchanged, but the direction is opposite), and find the possible range of heat generated by the system after a long time after the slider rushes onto the board.		\frac{13}{27}mv_0^2 \leq Q_1 \leq \frac{1}{2}mv_0^2	phy	力学_动量及其守恒定律	['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']	['phy_1013.jpg']
phy_1014	MCQ	As shown in the figure<image_1>, there are two parallel strip magnetic fields, with the boundaries from top to bottom being horizontal, which are successively marked as $a$,$b$,$c$, and $d$. The uniform magnetic field inward perpendicular to the paper is filled in $ab$and $cd$. In the area, there is no magnetic field in other areas. The widths of ab$and $cd$are both $d$, and the width of $bc$is $L$. The negatively charged particles enter the magnetic field at a velocity of $v_0$perpendicular to the boundary $d$, and after a period of time, they just do not exit from the boundary $a$. The particle charge is $q$, regardless of gravity, then ()	['A. The magnetic induction strength of the magnetic field is $\\frac{\\sqrt{2}mv_0}{2qd}$', 'B. Time from the time a particle enters the magnetic field to the point $a$$$$\\frac{\\pi d}{v_0}+\\frac{2L}{\\sqrt{3}v_0}$', 'C. If the width of $bc$decreases, particles will be ejected from the boundary $a$', 'D. If the width of $ab$becomes $0.5d$and the width of $cd$becomes $1.5d$, the particle cannot reach the boundary $a$']	B	phy	电磁学_电磁感应	['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']	['phy_1014.jpg']
phy_1015	MCQ	As <image_1>shown in the figure, there is a circular area with a radius of $a$in the coordinate system $xOy$, and the center of the circle is the origin $O$. There is a uniform magnetic field perpendicular to the paper and the magnitude of the magnetic induction intensity is $B$. Above the straight line $y=a$there is a rectangular uniform electric field area along the negative direction of the $y$axis, and the field strength is $E$. There is a particle source at the point $A$at $x=-a$. The particle source continuously emits particles with a mass of $m$and a charge of $q$($q&gt;0$) perpendicular to the direction of the magnetic field into the circular magnetic field at the same rate. It is known that after leaving the circular magnetic field for the first time, all the particles emitted return to the circular magnetic field under the action of the electric field, and then fly out of the circular magnetic field for the second time from the $C$point at $x=a$. Regardless of the particle gravity and the interaction between particles during the entire process, the following statement is correct ()	['A. The initial velocity of a particle entering the magnetic field is $\\frac{qBa}{2m}$', 'B. The minimum area of a rectangular uniform electric field region is $\\frac{qB^2a^3}{2mE}$', 'C. The shortest time for a particle to move from $A$point to $C$point is $\\frac{\\pi m}{qB}+\\frac{2Ba}{E}$', 'D. During the entire process of the particle moving from the $A$point to the $C$point, the impulse of the Lorentz force on all particles is $\\pi qBa$']	C	phy	电磁学_电磁感应	['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phy_1016	MCQ	In the planar rectangular coordinate system $xOy$, <image_1>the bounded uniform magnetic field region is as shown in the figure. The upper boundary of the magnetic field is an arc with the point $O'(0.4d)$as the center and the radius $R=5d$. The arc and the $x$axis intersect at the two points $M(-3d,0)$and $N(3d,0)$. The lower boundary of the magnetic field is an arc with the coordinate origin $O$as the center and the radius $r=3d$. As shown in the figure, in the dotted area $(3d&lt;y&lt;9d)$, a beam of uniformly distributed negatively charged particles enters the magnetic field area along the negative direction of the $x$axis at a speed of $v_0$. It is known that the direction of the magnetic field is perpendicular to the paper and outward, the magnetic induction intensity is $B=\frac{mv_0}{4dq}$, the mass of charged particles is $m$, and the amount of charge is $q$. Regardless of particle gravity,$\sin37^\circ =0.6$,$\cos37^\circ =0.8$. The following statements are correct ()	"['A. The radius of motion of a particle in a magnetic field is $4d$', ""B. A particle incident on the $O'$point does not necessarily pass through the $O$point after leaving the magnetic field"", 'C. The maximum time for a particle to move in the magnetic field region is $\\frac{143\\pi d}{45v_0}$', 'D. The proportion of particles entering the fourth quadrant through the $O$point is $\\frac{1}{3}$']"	ACD	phy	电磁学_电磁感应	['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']	['phy_1016.jpg']
phy_1017	MCQ	As <image_1>shown in the figure, an ideal transformer with adjustable number of primary and secondary coil turns has an AC power supply with constant effective value at its input terminals $a$and $b$. It is known that the resistance of fixed resistor $R_1$is $R$, and the maximum resistance of sliding rheostat $R_2$is $4R$. At the beginning, the ratio of the turns of the primary and secondary coils is $12$, and the slider $P_1$is located at the lowest end. The indications and changes in indications of an ideal voltmeter are represented by $U$and $\Delta U$respectively; the indications and changes in indications of an ideal ammeter are represented by $I$and $\Delta I$respectively. Regardless of the remaining resistances, the following statement is correct ()	['A. Keep the positions of $P_1$and $P_2$unchanged. During the process of $P_3$sliding upwards slowly,$U$remains unchanged and $I$increases', 'B. Keep the positions of $P_1$and $P_2$unchanged, and while $P_3$slowly slides upwards,$\\frac{\\Delta U}{\\Delta I}$continues to decrease', 'C. Keep the positions of $P_1$and $P_2$unchanged, and while $P_3$slowly slides upward, the output power of the secondary coil gradually decreases', 'D. Keep the position of $P_3$unchanged, and $P_1$and $P_2$move upward, so that the primary and secondary coils add the same number of turns, and the output power of the secondary coils increases']	C	phy	电磁学_交变电流	['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phy_1018	MCQ	As <image_1>shown in the figure, two parallel smooth metal guide rails are fixed on the insulating horizontal plane, and the left end is connected to a resistor with a resistance value of $R=1.5\Omega$, and the guide rail spacing is $L=1\mathrm{m}$. A conductor rod with a length of $L=1\mathrm{m}$and a resistance value of $r=0.5\Omega$is placed vertically on the guide rail. The distance from the left end of the guide rail is $x_0=16\mathrm{m}$. There is a magnetic field evenly distributed inwards perpendicular to the guide rail plane in the space. The graph of magnetic induction intensity changing with time is shown in Figure B<image_2>. Starting from the moment $t=0$, the conductor bar moves in a uniformly accelerated straight line to the left under the action of external force with an initial speed of zero. The relationship between speed and time is shown in Figure C<image_3>. Before the conductor bar leaves the guide rail, the following statement is correct ()	['A. The current in the loop first gradually increases and then gradually decreases', 'B. The direction of current in the loop changes at a certain time during $t=1\\mathrm{s}$', 'C. When $t=1\\mathrm{s}$, the ampere force on the conductor bar is $0.11\\mathrm{N}$, and the direction is to the left', 'D. The net amount of charge through the constant resistor $R$is $0.8\\mathrm{C}$']	CD	phy	电磁学_电磁感应	['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', 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