2017辽宁公务员考试:判断推理——科学推理题解题技巧
如下图所示,小球A.从斜面上由静止状态开始向下滑,撞击静止于水平木板上的木块B,下列说法正确的是( )。http://ln2.zhimantian.com/gwy/ziliao/xingce/2016/1114/data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAeQAAACWCAIAAACAUWzQAAAgAElEQVR4Ae3dCYBdRZU38Pf6dbqzk7CHJSTsm7KDKLKEYRwXUFnEQWUIqCM4OuoH6uioqIDL4Kij46ijgjPggjoKqICiqOwii+xLSFiTAAmQAOn0+r7ffSe5PN576bwk3Z1Ouopwu27dU6eqTp363/NOLbdYLpcLqx7k6uvr6+3tLRaLra2trm5bWloiET8prggkRpDS09PjKkSh0sVXvfCUI0kgSSBJYMRJYBlurmq7oa1QDbVwuRqaqxmi9EhKqVSqzhI0nkLtavoUTxJIEkgSSBKokcDqgzVGLOXu7m6R9vb2asDNETnMbXAcxNKDLCf2SMhvayqXbpMEkgSSBJIEQgKrCdZQGFKHAyQYhQMkbGf461a6iKvEHI6lBzrngI6gOh7c0jVJIEkgSSBJoFoCqwnWAFcIvwcsxjFSVgS70oNeJIA70DzyVlcoxZMEkgSSBJIE6iWwmmCNUaCzqzhnSGdn54MPPvjMM8888cQTzz77LEQeN27clClTxo4du/nmm2+xxRZcJTXFw/qwxGvS022SQJJAkkCSQI0EWmvum7xlFwugFkw/8MADt95665w5c6699tqnn356/vz5CxcuBNYTJ07ceuutJ0+evP3227/85S/faaeddt1110mTJnkkI5QPc3tFxniTNUlkSQJJAkkCI0ECq2lZg1o+60cfffSqq6669NJLb7jhBtb0qFGjNtpoI3AMiz1lODO3FyxYsGTJEo923nnnN73pTa997Wth9/jx49GAeyIG1gmvR4KqpTYmCSQJrIkEmgVr4AtSw90s0tXVdeONN55//vkXXXQRzN1qq63A9BFHHCGyzTbbbLjhhpD6hRdeeOSRRwD6Lbfccvvtty9evFiuPfbY44wzzjj44IM5SeC1lLa2tgBrL4BwjITNviatSnmTBJIEkgTWMwk0BdYMZAs/IDWnBxv5qaeeuvzyy7/5zW/+9a9/5eU46qij2Mv77LMP2B0zZoxrYDrkBfHizz///J133skG/+lPfzpr1iyAfvTRR7/zne/cYYcdAqbjTSAOphVExJG+nsk6NSdJIEkgSWC1JdAUWMPo8DIrZtGiRd/61rfOO++8efPmHXjggaeeeur+++/P9QGmcwMZ5oqD6XCABHaDbEj9wx/+UHYp73jHO971rnftueeeiLFlVgeZeELq1e7OlDFJIElgfZVA6cwzz2yybVAV4F544YWf/exnuThOOumk008//dWvfrWJRDjLOmZ0B866jYiUHOWh+SabbLL77ruzrO+5557rr78elL/sZS8D9IiD3lUpQg7cTdYtkSUJJAkkCazfEmgKrFnW0NOVXfyVr3zlySeffO9738um3nHHHQGrdMvyuC84oENYMf0oXYqM8Drg2xWy77XXXq633XYbrzfQ32WXXSZMmACmEccumyBev+WeWpckkCSQJLBKEmgKrKEtMP3Tn/509tlnP/zww9wX73//+6dPnw5bPQqEjanCwFnEkc6ylsLo5vUO/zVHtsRtt90WXt98881//OMfN9tss912281y7NyglmWV2pCIkwSSBJIE1nsJNAXWwNcM4bnnnmtdx7HHHsv7Aakl5vDKlAbZbiO49TQ3kEUANALpgfujR4+eOnWqFPa1BdoWkFjPh6aa53ov+tTAJIEkgSSB5iXQlA1r1d3FF198ySWX8HuceOKJ7GIGMlx2FRQGhXOPBwgORJYocIawqdHk8C2L9I033njmzJkc33fddZf1f1wrCITmq54okwSSBJIERo4EGoB1gCkRgGOo6sqgtqSagfye97zH2g+QGohslV7gsqt4oVhe/g+C+2eZRzmzqUuVfZLZQ2BcgeQKKJtvPOaYY171qlddeeWVF1xwgRLBOlYmHkdOB6SWJgkkCSQJNCOBBmANlAG0zIHUzGpLpK0DOeGEEw466CAeDJC6DHFf+qeqvMBkwFxYhs7+VgKeYYwHf97q448/3kKRK664Yvbs2VGi2ypWKZokkCSQJJAkUGgA1oHAcFOEhObOnQtJLbA77bTTOECk5GhbJz/0AcoVlI74MpReTlu5xdn7gIcELttQY1ujc0V+9atf8aVIj3KXZ0h/kwSSBJIEkgQagXXAZVxZ2b/97W/ZvNZTWxMNRoE4z4ZrI+EFWNdcqwiXG9o5ImPoTD5nhvCi/OxnP3NiHwfLil8GVaxSNEkgSSBJYCRJoIFlHVgJTyHyc88998tf/tK5H8cddxw8lQi+uZVXANaZ5DK/R2ZT5/8i2lcocq1kXuxAfHwyN3ehAJ0PP/xwxvUdd9xx9913x2zkSOqC1NYkgSSBJIGVS6ABWOeZ4KaldYID84CpdDgLr0UaQmrAc569KhJmeIbXPb3ZFGLuFkcDrC3dO+SQQ/hAnN5nWYinVXlTNEkgSSBJIEmgkRsEejKcQSpEvuyyy8Rf8YpX2GRIWhIDrKF2A+HB5Jp/FaJKWl/lmi0HyQNWAfrQ+dBDD3X49V/+8hefL2jMPM+WIkkCSQJJAiNPAg1sWFjJyHWFpNddd53zTn06QBxqC4GkAL0pWZUz9F4eMrgutmRojRuAFpY/Kuy9997A2mSmWUel5OkpkiSQJJAkkCRAAi/CZbU4TCG6feihh3ypi2d52rRpcXwHpGZcexSQXZ0li/f60nm5pzvbJmPTTG8Pw9kXvzK3iYL86e7LHgnBRAReV14BZZ8jsNTEh2ac8VQhSZckgSSBJIEkgRcl0MBA5p2AxUuXLrUIxJXBC0kbo/OLfLJY2frsnq5Saxtz2rl7yx6Wi70VQzlzgFT+l55zyyNeCdtttx0Q970CM5zNWu7Lykh/kgSSBJIE1nMJNLasYShPBctahA9kgw02aEoMxd6WbJNiz9KOJeU+vpRsWznUjq93AXCWdEMHB3RWkNNTLbtmy+cI3lShiShJIEkgSWAESKABWMPKmEXklCCB6dOnxxq7lUqjt2tpsZQtzmsf086Gthd96dLM7yFewWiHXHOhLLe4q9gBa7BuTYhvfaXVIFWCSdEkgSSBJIFlEmjgBvGE9wNe+yiMmUZ7F5uVVl9Xua8EjRc/s+jKK69e2tW7ww4773tAZStNLLEucI40sK15rr0hOFvsZbevPVnWzQo80SUJJAmMGAk0AGtYKXCD+GC5tRm+shjzjSuVSWl0azbHWGy57tprPvbxjy54evH73/+hnXbdedyEbLqS57oxVFeWWiPIjnxqbfWeYGWrwEqLSwRJAkkCSQIjRwIN3CAaDzdZ1rYvinNYV6+x60c03CeFUrG3u+umm256Yv78jo6OP/3pmgVPLYgsmec6s6obozB09rkZ/hZg3U8R6VGSQJJAksDIlEADy9pXXaAzPzK0BdmrsDCj3FsstCxYsOCWW27aZpupEzbYdNYDDzz77OKt+6aA6DKwzpaI1LpBFET01oEoVFlxOzI7I7U6SSBJIElgRRJoYFmHO8LVdhgeCUekyiwiiIDviNRzfK4wqdB1b/nZW69+sHP63ke88Yhdny8/9bObZvUUC6N6Fo9uWdLTW1mKvZxb8IHRQrDldWFf13NOKUkCSQJJAiNcAg3AOhzWANT5TUxdM3416AxYG0qt4/lioavn1ptve/6FjgMPPGjXnXdqay385S+3PGVRSam1XOgpQe3WWjdI7p6G1Ix6L4ma4hqWlRKTBJIEkgRGlAQagzUAFXirOZEt4ItjpgND41FDvN5wbLG8tPvGG2+ZMH78/gfst+0O203ZcPzjsx+Yv+D5XijNtdLdVwvVFWHj7N3gAzFCkxtwRlQnpcYmCSQJJAk0AGvmLQ+yYNUzDH388cc5r0mqGqxBdr3sSp0dc2Y9es3N9z3/9MLLLrv8ssuv6F604IWF82Y//uQLvb6P3tfmW1+1LutsN2NwnjdvHpeLlYINmdcXl1KSBJIEkgRGjgQaTDCG7cwBstlmm7Gp77//fis0YChIFeJpQwEVy0seX7jk8WeXdj791H987nMT+uYXu5Y+P+Hem+6498BXTN+gra9U7vFRxpq8wVaiU0FeeOEFhdYQpNskgSSBJIEkgQaWNa+xRdYs6x122MF0H7CONXxhAlutwQeCoF52XV2Lbrjt3sefXLzlDjtMmT59i63G7btzaXT3C/fc90hH5v/oLZYd5lefLzvSWuqdd97J6+Ls7AYUKSlJIEkgSWBkS6CxZQ2pIbL939tvv73934899phN5/nUX24L14hu6ZJFd856pLjBZp8757P77r3npO4HHrvxJ6d/4bIHZz384BOLd5ng6+bZKr06R0jGxvvAl2J4yXfZZZcatuk2SSBJIEkgSaCBZc1nTS6gOaCTa+LRRx819ScxfCCufNn1suuYPWvu4wsnb7LVnrvvts2WEzfeZureRx257VabP/jA/Tf/dVaFvreQfYTgJcFbgbW+cOFCh/w5yGnTTTd9yeN0kySQJJAkkCRgm0q9EOLYJt7qsWPHvv71r/fplj/+8Y/w1Bo+xJCaD4RxXZ9x7j13z5r96G4v33vLKRuWsuctpa7uHXfctm/x0w/ff79d5ZaE2B0juxCsMqLKwSC//vWvfXmAWW1Ws55zSkkSSBJIEhjhEmjgBgkgDsjeaaedAOh999338MMP77nnnoQFxBndILtecNP23u+fPzZt0nZ7jhvb0uooEHg9fvIxxx73zLSePQ7ep9cuxd6enr6uQin75C4OFlabupw4cSKY/t3vfsdz/cpXvtIEo7eCBXz1/FNKkkCSQJLAiJVAA7Ami3wn4Y477vh3f/d3F1xwweWXX+5ga48CZxnaMStYLbhJ2+32D7tPWdI6llntGL1CyVcIxm+7z9R/3ntiZ1ups9AzttDFZS2j9wHjOkAfK97qa6+9dtq0aT7uZUqzoY+luqAUTxJIEkgSGGkSaOAGYfPGBCNvMvsaWDN+gbVpRjDqERk1dIMU2zdwFNPoVgTlQqe1H77x1VYqtG7c1jq+VOzI3CCjS61ZiYrAHBPA7SDW3//+9074e/Ob3+zLXrAbiI+0bkjtTRJIEkgS6F8C/YG1nCB11113fdWrXnXbbbddcsklHBTAlCek3qxGXG4Zz142X5id2eR/H/QatUm52N7WW/ZNgt5Csa84yoFOsRAQ7sdM5l133QWsnUPy2te+1lsBjiui/0qnp0kCSQJJAiNNAg3AOmb/CAJuwmUwetRRR/kswJe+9KW//OUvYVl71EBSpTFjRo0aXXlUHFXoLpSXFNp7SqNsQh9TOcGpp+xDur2sddnBPZ7WBX7ve9+7++67jz766D322CN45hVoUERKShJIEkgSGJESaADWuYsDpAJWJvA+++xjWYh955zXc+bMibnHenF1dRdbC31t3B9COfvsrvP6urhEepe0Frqt/7B/EcbzSjPYucUB98UXX/yrX/1qr732mjlzJuz2bpA1HbxXL9uUkiSQJDDCJdAArHMXhyNBIDXIdvzeu971LpB6WSXA2YZSK44q9/UC575sEXZPV7GvnGWG3d1LWnq7uDYcd10sZSXiwDFtUvErX/mKd8Mb3/hGzhYIDq+Z1fnbomEpKTFJIEkgSWAESqABWMNXguDuAJ0ioFN83333fdOb3sQW/trXvnbhhRdKh6qxUwbIWoHnWmopt5QmlHqLPd1dve1jRpXGb25zTW9fZ/vGpdYJW/X0jC639JpmrOS1AgRSWxR42GGH4awsLmw8me1KDIaB2szteD2E3e0RDpEY3m1PlY5YfUTMWCIQ4qmrID1SRNwqK5i7ClLs/UEgPYi9qETUJxzrUaiUqANKkeApnkKSQJJAksBgS6B05pln1peRGcTLAywTBV5bbrnl9ddfD2Tnz5/P+raqz64ZcIYg3NDACyVuntrjaN9MT3ePlFFtbRmuVdZ+MNURwOjPfvazNsLsv//+/+///T82u/dBrOTDUHYBGiIGxB6JRMirikCKpxGRriCUQSCCjyCiaDVEjEDErUQh4vAXHGMSvh3pOEiskGSLwUVyznkETTCUEiWma5JAkkCSwKBKoDFYVxcJ1KAeP3IcvHfLLbfce++9Dz30kK2GU6ZMcUUAWHPQhIYBZCAvEiEaVIXF+Pjo19VXX/2Nb3zj0ksv5fr48Ic//Dd/8zc4MF3DplZ0jqQRwQQH3IKPW9yCeSBpVEAdRJSCABNxT9VEcBtXHIR4GqgtXRalI3b1VMQjTHKsjwizPWoie7RXJLiJpJAkkCSQJDCoEmgWrEEYzNpuu+1gljUhJhsdkuf46S222AJkB8YFcrnmQdW5F2Bc4KbvGPzhD3/493//99/85jcMc0h95JFHxi6YwEEZgSysFJGlmg9UzRMR5+Ab0pESMB15MZGOg6s4YuniwT9YBQfpCIIhDhIjr4iAPnKJoBEX8kcB4pGYrkkCSQJJAoMqgabAGuqxOp2yxLM8depUnhBHO0He22+/3SHULOJYH40m8E6NA+ZEAiufeOKJm2+++Ytf/OJ//dd/McxnzJjxoQ99yAoTjhQEUE8IcMyhUN4wYHNWIkJQRhHyRmJgtDiLO/hEOv91VClu5ULpfeMNIcVtTi8Sr4eocPAPFzYOQeyq9PwdgDLiiFNIEkgSSBIYVAks+0pLP2UEDoItABd26J/+9KePf/zj/CHAFHwD3Je97GW8GfY6brXVVtZlgzCUAn/FX//61z//+c9XXnnlgw8+6ICRCRMmHHfccSeccAI/NfSHd5gAQYhvx40UoJkXBHYRYCKCW+BpOJcDstUqd56wfCUiUzp6bw6PgkPgr2s8DczVZCiMeQCuRE8lIhOCRk2kKDcqiZt0uYImbvsRXXqUJJAkkCQwUBJoCqwDvABWwBPA4nQ+99xzmaiOebLy2pSjo5ecweSAU3Ac8AfjbFZ0aB/c5Ko2RenRBz/4QdvKf/7znz/11FPAEZ6Ce5tuHDxid8zs2bMBbjgl7JGxp9HyPmf+KTe8EPi/4x3vkPf//u//MA9EdpSrFwCHzPnnn//II48E3CsOW0ws5bbpRpW0Qon77befCvz2t7/lOpfiDeHRbrvtZm3iTTfdZFc9nlw3KoatshT94x//WCuQveUtb+Fnxz+QHWoPVDckPkkCSQJJAiuRQBiJ/VxhkwDCwB9QFoHRwNcqDt6PV7ziFeecc85ZZ53lszLgDMZBVUFEYHQDO+mu6rH11ltbAcIlAvLCqQKpMfnqV7/Kwn3DG97gFujLyKR973vfy4nxsY99TKIgRRbF8cBwfFuaggyxR9tuuy0fCwQHzWiiXI/+8z//U1X//u//Ho1EwXToaaedxh7/l3/5F+VK8cgrxH56EgDKm2yyCYyWjo8PL1i1AsFBOWKLzX/wgx94Y6mqN4orsfQjt/QoSSBJIElgACWwbNKsBtEhUZiN8IgVGYYkSxaq2sDirNTJkye/7W1ve+CBB0wVvuY1r/nnf/5n04yAmOkKVQE6AiAI9Zi6bsPhAGE5SYA+bzXHNxAXZyxPmzZNiYBYwwC9yojENhnvACAeXgiJcBmBLH/7t38LnaXgvPHGG4Nm6a9+9asReDGwl2GrKinC9kunRIVDQ/V4bDTHx8P4bZQuI+SVqJJ+GfDkmDVVnDrwznvZyHLIIYeYUMWBk0e6qoJ4RXsUL6Ea6aXbJIEkgSSBAZdAYzcIJIoQYATORCy248Q48cQTWbtQGLpdccUVH/nIRxiqFk3zLfg8OfyCnh6xTGGo6rLBJUJSRi7DFs7Ky3MiEVCCUcAH2dmzTvWTCCi9ITBhzOJgGtP5ITBXfcClCAgW5/5WJRXDUwX4QGRhdMsugo+nXgyYqIBS1ESK9LCd2ew8G26VhYks7GgQryxVlagsFbb6BTT7KSC7RqmnKinC05AJngPeJYlhkkCSQJJAvQQagDUoZHsCLBHgKI845LJ+g1v5wAMPtKJj9913h1YI/vu///vzn/880/jrX/86dwHwyrNDPXzcRgqMcytAxmCOAGjCbokw0RXyigTaiigdpVscACt6TBQRjyBmQLOaSMEHmSxZGZWVHp4KXgayiEiMKimUySy7pkmXRZAXHGMiUWMReKRQKXENnsgUJ9FVrgTW9SqVUpIEkgQGQwINlu4FDCksw7zKYjVXE33WR4M5hioPg2k6GAr72Lk+n2ixhysvBGMZtAWKAVBYVuGRLZJDnIFiBf0D4zyCmMEnIkGMBiZKF5ELseCRRCgpMa5SPFVbV9mlC0HpGiVGepa/4joPAvCNeZRVzV9iUOLvqasgi3i8KvCMRiFTmeAgMYUkgSSBJIHBlkCDX/GQCDYpOEAKWlkdYUkGN4VEfl5+amulpSPjhn7rW9/Kv8xJ8sMf/pDXQi4mqivsA21AjXUMUgPaIh7pUUS00FM0EWfYxqOoBi+HCAIVk+42DHMRt9DWUwFP18BQV7fIELhKV1shSsdKhOHsqaBcJaIXl+hRXpZHbmXEsEJbAN9KRCDkFY5H6ZokkCSQJDB4EmgM1gF8cAo+QiWbyx23B7A4B0CVHYw+mRir2RCYb/yHf/gH5irT+4YbboCM4gGaYE52V8CtDR6hx8GtxEgJVAV8QYOAv9tVekBkDo4ZQFYgOyJwEwdxBLILcrkNYeHmFvhGlkhEqVycPYrs0iUqMUoXD8ooOmcYT6NcBCGZnDiypGuSQJJAksDgSaCBGwQkAT7wBNTgkWm3H/3oR7/4xS8slpBohtB6CStDLHfjD2F0W/VhmQR0M99oKm+bbbaxjqICnplTGzfXCBLdgmwRKeLQEHrmb4XIpdCg8QiNIB1l5PJUCgIcmPDyqlXwke42LO54GbhG0RJlj7xSpOMQUB6lxDtDHCviDv5uxaPcqEZUO+ojRRi8vkmckwSSBJIEcgk0sKw9CxgCTOLWeFhrbBWELSpcwM7JE/EtLptKgJ3lFnDN02OPPda6Nwb4RRddxKsAFmEo6xUrfNBgJSXgz9OASE/Bq1tPA7JlkR1iKsvTHE8xiewiXDGuAhNeAJ2RF+DKIgXDSAy24rgJAcESBZTB0FOgLx65PELmqUiO4FFDtZIuIK5mlbFLIUkgSSBJYDAl0ACsgRcwgl9QT9FWs9kvfvjhh1uYDBPh8vHHH2/ZxjXXXMPohlwgTLBy+QMf+IAFy//zP/9j0QjABabogZqnwM5tgKm4FBmjXYHaUkQinVMiHqEJZ4X0eCRdIgJMcj4yinuk2shyttIjMd4ZUVXXII5bBMjgeNziIKVSWlYft3kpQRDVEPfUNcoaaVd9qiuzt2UlaL6/uRDEEcQtBYinQUmpIj1edXFFE1kiEpQ5txRJEhjmEqDVNNmV6hoXodWhxvkVqEqPIJGqC5HFrfR8aPTT2MZuEDCEhWyunB7CYYcdxunhE1z2hfteIri0tFkcZgVsuVqGrEibCR0bYsrRImWJaomP2gTqYZjjXYCda3VAXH1bHW/4qGFida4m4/3zqX5aE3c7ooIujredno1XY66Cfgbpekvgnabrabxog8zVI14y69zR+7lmRxV66+t1EBUPVYnOIk+RESXV1Nh1WgIGQgyKALf6tuSgR/k9dQusDRB4yJPMWJRdvH+1b2BZy4BjXuq22277vve9z45By/I8wprz2kka//iP/7j55ptDbZRhZxl49nb77IsJye985zv2aitezdQDQ/EI9S1JKeuQBPQmNdDpfnaI6HqVNyUgxZ5SU820xds9kFq/U0oEFn1++tOfPuOMM+gAyquuuoqeWEEkezCRLotH65AoUlWTBEggHwVhKTeUCWOF8zb8t5HF1aiRl9obBYYJ26Vh3jyx8djAmqVj5LjyeDh7mq3k1kC1CMRQZGVLwSXGqnRxucw0wnFzj5b6OUkDZQxpFVItNHHNi0+RdU4CVIKSQeHoykBYy4T0vhc523nu3Ln8Y/odDWK6QYkpj6fe39rrlmVNcYE7dRKRHbdgu84JJFV4hEuA6gqEwOCAua71AjEK2LUxneapBRpSGNSBnwaLkeJan7E6pTFYG1qKNNiQYudWJdwGO8NS3HvAI3E0CFRX8a58I854stXbwXg2y6BBKXu0J67VNUjxdUsCFIMa6HEgSw1c6YCr3ucHk04jLRCCvKGItFAK7RTZaaednLJiLvq8886TYvurcw2t03cqOsXANqnHuqUMqbYkQGkpv0jMpTXUYWPBwBGMC2MEpbEj0HkBQrJgVmpZZ2XUhwDfvFSjMVKCUlxgUsUtIFZXtYlSPTriiCNOOukk38P9whe+YCWfj+0GpbrmPOsLTSnrhASoFItAV+puiuFw8/PPPx9Y61nKx6ZGcMopp4Bmv8lcYbGjuC644AJHdwFoB8uYoOYAmT17tl9gjGtnKPpmkLbTnHVCAqmSSQLVEjAKAqwBrnSjw7UG6AyWyBKUnoJNKQaLFFjaDDY2AGvZhGCNqWLcRtmVJ8ssboUZilIqb4hlHy1UsHSWFOe15X1WZ1sZwpft8Lx4pQTbdF13JUAX9Thg1fv6Wpg+fTp9BdO2RPF1aJoVRAcffDBfGZeIK0qBNSGvA2SAtcVCtlY5cNxspM9T0BBam7/+113hpJqPTAkYEVT9f//3f50H51zSHJpzaVByG7+d/s+QhZlw0kjhe2DBUH7nNvtVKsVP0jxLfaQBWCMyFAOFvSvYR1KMRhVShpC/NNAEmiMQcRsvGa5q+2I4r1lPDom2bsRxfcGnvgYpZZ2TAICmIQCXr9nM86GHHur2uuuus8TTI2pHGZyCC6/pDAjmmJ45c6YPPlCnU089FWSjl8jBLU5nrNZH5scZTPdonRNIqvBIlgBIpMO+hOXwUVhsu0m92eHpl770JSPCeg1mCmvGb8qf/exnHIMWPeNgpFjB0b8YGwwMIy2CkRMI6xY7IzMGXv40InkB6JG59X4w5A466KB/+qd/4rx2ZoifuqBcCN8NGnEDWyPz7CmyDkmAbtEH4KvHwwHnV5RvclIJBoIIRdS5YYabi6Y5VIL1YQEfg+LGG2+UUdxCT6Dvaz4OAovmU4xcDjtL7FQAACAASURBVJnGVN3m6SmSJLC2JEDz6STNz69qQrcpuUROBSGvG7jj+pPFWEDDjrHN2+n/BgvNtx7aJ7fOPvtsxorhENgYCh/AWAOPjS1rQy4vL48YbzjmCJvT1EciC+LXve51t912G5+mA1T9BOC/9kid1D7Mq5x5iqwrEqBAepbXwruZXgZe0woLPLyk/ajSEL+leLHReNnT0Wgaeor7yU9+kkEtjtL8MxeKX458ZbGQn2KsK3JI9RyZEggwDUX15SzKTNXZKybJabXT7pggoJLyc4ZYR2dQOPaOmSIFsSwSzzzzTB9FgZx8IK4eEaZcuUiVoggM8xSRxmBdTSEe9TNEw38db4Aco2uIq2+9Sd7+9rdbdm03jY9s+ZgWD6ZK4GN446A28TqqzpXiw1kClEHHUSxXXQmvdaX1P5TVSmqzypzXjj7/5je/yffl6HNqI6Ch097QvnBvfadl+HPmzHFuwfvf/34mCSX2exCU44Z4ODc/1W0kSyAwlIpCZ34My5nYyNwXQAwcg7X777/fBhS454slTJavfe1rFNsXWvimbTUAytDcU1tVgLjhY3GU7IaARwaUib0ARgPBU6F6ODQ7MKKWYSUFdjfTZ2CdQa32RiawZkNZqhWuFUyCW83boxm2iWYtSoBKKT2uIpwYTlv0BWTfzLTqAxZDZL+oqKa4c8/1PlWmgtQOHP/kJz8x+WxTDO3kvKMYcjloF8NQ37XYtFR0ksBKJUCNQaoAc31B20cNqTeM/rd/+zdn/dNqXwE0hR4ftHKl+R/96Ed5PxguNJxb+He/+90JJ5xgmIBHSO3LsR//+MdtMASJYZKLGA4RquvTwGdd/TjissH4ageKlIZky0pY/gcQK36vvfY6+eST1eC73/0uT42IpmKIyuitfnXU80wpw00Cuk+VXMG0TrT76fvf/z6VNaNN+QQvY9f3vOc9xxxzzJe//OVYa//tb3+bI5tvznI9/W4RCHWaVQluvbbjJPTh1thUnySBaglQezoPZ8Eu4DJb6MtZzohmc7BOIC/jmqMDjks/4IADeDmkOGIBmvP7OU/p1ltvdbwSYgrvUDzEvA7GAs4SlQUwwaafod4BMdbyCjQF1kFtRAleFNWonTNqGDEOladhRx55pLW3NrBxXmuY1qqTLBqMpmHelDg8JZC7sFSPPsTCo/jpR1npGZ3TvyyIT33qU1YESQHf9JVXxBfg7DJncfOGuTr26/e//z3/CVbxS3B4NjnVKkkgJBCGhSsYZHHS8zC0oTC1B68STZ5btRx2qlvEFj7FQik+EIumuAHZ0QYLawYfCCkeQ4lhztDBE2eelhqkbdYNgpfMBmpUqMnOU5gscDm2obOnDE6rEU8//fTYYRwzVK5NMkxkw0EClIF9oQepGkfH3nvvrZfpnHUgVNMjQdf7DeggRsT0zyYpxoJE7mxrTv3u4yqx2fWd73znOeecQz04r+OMJ1o+HNqY6pAkUC8B6k3PBXgaV9Mtl1xyCZC1VtVKah5qaAaROUN8qJYyw2sbxzipfc6bH5iqYxIOE74REzyGhiyGBpyMcWRYsbgZ4DVjoSnLWrUUEGCtWoqvb0bDlAD3GLpcM0758e0CzhCOS4nBNkzshtlT4jCUAO+HWtEt17wHJVJfBoJfdpaasgvCNNDLwDpexmxnvwT9DPQzy8GNdJFLxN5FMzOWDDEC6JgwDJucqpQkkEsAkjI+3FJs6vrII4+YReTxsCDPoOAScVqZlcogzmJqAIjYslRz6fTfamYHTcNPA8dTk/B+YlofFdN4UQS2DqTk4ObajlGWF92UZR1jUhmQXtnGYZ6//4jGIFakkawS1oTbHPGZz3zG0kJnqGqhF0tUFFsEAmIt7J9teroWJcCgVnruxRKnvl7kcJlp7DRznRgaQm3yiD6lDNOmTfN5CsoQ8C0Xy/rEE0/0SFxG3OTKryIprEgCBE5unroSmhCRSBEPgjwx0htyk7c+Xcb6xJRCqrnBy91Beyn5u9/9btYGJecMMX9j+cfnPvc5yGajCW3/xCc+YUdYwKBEQOo3Jd+IFJ5Ahg5HsbzA0LiwbuSrX/2qRSbMYj9bjYtc5k1Z1kFtTOo/I2qVehGxtkUWfkxT/7yWfhFYDc4rElXHWZNUndKING+5581IkSGTgK6sCYqW4ko3QLkQsBvp8cg1sEOPU+4MWirgIk5Tw9mdUw5ZW0ZgQSH5musIlMPqNZkO022BccmV4cQba6jNovN4gC+JpnBouKkaS55+/etfgzjDQbqn8hI76GNNW+TqZyU/ofOEORsCWo0C3+Sy0dGuMVOUfqRKqa5nU5Z1jCIlqaXMcVvNZUVxVYTUcsXriDlmbyVjyuZLFlasQJSIM545pifHyIrkOTzT9Z0ejLqtSDdyguHZhFSrJIHmJcCIRsyPx6/7tre9jRuaXQy+KHlM6Vn1ZFqO3R0eao+YyZ76mC0UNhsPjq22APcXXnghSJQI0M3nWTTFBrdrhlNlxowZ1Wa1EpsC62gGDGX2KtV7oMmGgekYyfFWkd2tV4qq+GlgZ6NV2G9+85slYqvByDBPYN2keIcPmR4U+qmPpwmv+5HPUD6q74j++24o6zbMyyIoyCuAKQ4AH8NijwZekap0CCYg23rrrW2K0Ry38WtSIpQDxDJySVuLbUe3TWRurZGz58AZpddff72Fzv/6r/9q4ge9UmBmLpMGn/XKn+UR2QTVMt3JsOfHiHrkBP1EQjPCJEeGjyZZuWKZ4bXXXmsti18Qfg5IDwNcexJY9yPP4flI90XnVl8l5iHS89s80kxzEDdDNtJojKyQTC6f6oh4EOSJ0QUNpVRNkxM0TMyfjtgIbIVUgdeceLCYlUkapM2/ceihh3JDB8KilC6ORgR8e2pXICOai8NGBLemebgBbYa0p8ahlVKcIWwliVxKwVNBL4rafZOB/5vZ722AaZNZkIF47wfVzYNfClKs37J4i0Odb54fRwrioNHI5vknyrUugbxnI5L3Y016/W19zetppNSTpRQSyIeVOCnFrWtEcoJ4GoLNKYMsvyaxk0wzIQTFoARirnFrxao4CLY4FXaRqmsuUmzdCrLEpGLEZTG1KIsFfE78B8rOVr366qulVHOorlWzE4zKBvAB9i8ifdMxb+kI0QZ8OKy54Z1uzFq3WTkWhC2nSpZU05IdToTRfWqU92P/keFU9xFUl/pOGUGNX+OmQk/wFT5h+OuWZznMZ6anR1CbrQ2RYR1T1RUQIwPBJgxlkTcS0Thv0hyj05N8o+Pcc8+1ZQEHT3GIvNX1bRas4yWsm/ESqln0H0csFxptUAm3mqSWUiwj5573tvnpT3965513eqoUL5z4EdE/2/R0+EggH/zDp0qpJkkCgycBIAZ84RUoo/zwF7AGXrsNDwlERhYwLeIWpstlcQh6GZ1SaZ0rpBbhWLZNjDcYTUzdBR/X6lY0BbtwVh5cRLhpAmqruTQT1xhlq26w0lQtsZLPK8WBIZYWOihCq9AInkJtxIJ4M/wTzdBIQI+E1aA4OkolvGIHtWj8K4qQaYIfiaGNg1riajBXN9IIUaitOCZRbVfVDjUWp9i5xILAIwNYupDnEpGOoKYyaMgfB1kiO4JI8cjYyRMjLrGaTwxeKTHKIhJFiJNtnj2akzekphoj9pbcIuRgBXkD3KQHQLuGfCJFnBjJFhnxglAA7eBJa7EdjmSltnXZJh4hdXCGtLJEvFrOL041VqfWxKMMCodLqEgNQT+3ioynEaFkMFrcq0a66VRnqM6ePfuXv/ylj8tYJeL1EvTIRKqVKdLTde1KQA/qO5pHH6idoI9y9FnDuuVaXs0Hf7oeewcMDOpe/XSYxKk0jSUHYlFJcSOFoELtpZCY1rlKjGYi1hZNCzFqiKduZamRQ5DhbE0YzgQiBc94a1psECMUZ48ENGaYJBqwrhhiqzg7SE2CiQe9UvCBF/HzHLEgu5qAeLWKKrnKIj1S3I7YEL2p+XmkJp5LhsTyR4RM1EKkcHrYu/itb33Lomzn58ycOdM0I4HLEgurg3l1EcG2KbCWDSPKYT2gMUOl8jqtaiQUmq7IiCf1skuHM8TKlR/84Ac2a/pFoCBPtU25EShKRFa1uEQ/4BLQg7ZpXXTRRRaEGueUTH/pnQEpKPCrmhXO9ARIgSS6IVQ/HT5xgyLgjHyiVqBNc8iHbsNZiwQQ2EYRQ8kKXPuPfZt02rRp+YAKYK1plKHOVfj973/faUEEbmeZeX67lh2M5ceo4owUNH6kOhjIQl0HU+CjFKJTqONZbLVwQDEgDrCG13b5y4WDRMwxUVvAYc2vR7ZBeGqzhl+9VibobvKvqVW67UcCOjrUIB8XNEEgVV3Gi/Dd736XeC241pUi6HXESt+FTYF1VEvByosJTcqR16OfStc/kkvNaJLG4EZNRWiec3wsOXTG0/Tp021DlxFlXkre+HqGKWWIJeBt7WB1b1agYAyz4PSOMCDVoAz1eoW5guCURU4+cLdSnR6QmqwqE4MtslDaCJDxyiuvvPvuu50iK26IsqSAppMigCljyq2fko74iVN7vPOMCM0PIWCCoVuDxWlBvo3njFlxP5Ztl0BjW9mcOXOMf/Jx6/wGkrERQ3pkdPUIH/wtOcCfsS/RL27nV8hoi50SEXCkKujkk092sLg6YysdN0tsHWdB+NG/SpE9hZVKgEiJN8gINjrIrde2t6ljQ/gPuD4s/4DU8VqNTu+fc1NgrbO91dkCLF97WPgr+mfa/1Mt0QA0od9MDzrhAFW66OyS8847z+udHuemiqbmLe+fc3o6BBIwsKmXZfLGsF6zbgl8DFQH6XTqUd0Kt/FSZ1rGT/vhCRlUOmouIjBm7UKm0qxU0MwEITSm9KGHHkpisNsLzwY2ug27Hb0ASZnGlt9qXT62Qw7YekE668q4MLyJ2jAkKIupDEy32GLl4B2/Ux1MYQ+Ep/Li6cBlDG098ykfKQx8g85w02VK8eUmK3yZ6nrTiGOGuzL3WH9ejX4E2FQRaO6qFdX9kuL9SCB0gIQFcnOLmFRjK7mdJb7UoSt1nO4TPEWj1/JXfkPmyzSs4bM80e4Vm2oYNc4loR/AmgZEGTlNkxG9jlJezaCFWiISee229Lbh0KFYfrvRJwQoI8vwHKJNtnp9ItMpMIjnihr4Kq7b6MoBaaNeDs2u4QaMfEbd8Tc8fTBIqCFY67dsDnUw2MwdeZ851NjXQLhumLGw1bY0/gTWNPjTRj9PbQdzdUQ9PWcAMcChrd+Xr3jFK7gp8uaQBv13MKGzz/zidOKEIS0LgpgqhL8cnXoBW6WD9RhccrkVd9VBXhWuEgM7wLosiKWHMD1FiQn+HjkckQ3opExfo1eW9Bx08rqlyIokQIAeueo+QU85h883wC699FJIzdFEmSE1GmJHgFJPuRVfEU/pTb0t/SBSHotAv7IRFBC16Yfvih6pU7TBlaKEBtAPkVe+8pWMBefT+6loFTYbga6viE9KX1sS0HHGvOA39WCAZo2+RllwhDWqaKoorK2291OuGsJrJxfzQtjjAIXBK3rD0k8QgYa7daKxVviRyowNbhDTrja5nE8PrDkxbRPjG4mRgkbELW4QlsDhphRjUIQoiEsQkSKISA/OChLxVIprsJKILOLSDTGPYiRGrgB3Nr53TLBSrqbp7nhJBFm6rlQCIXO/UXiWGBnw2jvbr5nDDz88xK4vdCU+KMUJuf8Btcyx0n/BMa/t5xV20dlRRv+5Gj5VLdwEehCjDsPQD9rsl+BRRx3FNvHDkIkNxCmWsla7uIZ1SIlrIgE9qON0md7BR/cNYKivmK5XFiVWiojShXqytZ5CUXkkzzrrLKaG34iqCnZ5gadNm8ZSdqshXjxRefAnxRAQYWFBZ+dCUH6+6R//+MdcKIGnIV7XyCsLDnIRReTVBSSDSXQBMunolYKDIN01OETRrgJ0Zn4F+IrL5RqUYTnJ4teMF4lRGR3dP46gTyGXAAmLkyegsy7ZbBwHr8+ZO2wvbNDoAr0TEcIXCTzMmdRHmgLrDduLbd0vLOnsKfQu7e54ZkFX4SmfTyyUe5c+21fueaavsLS7s9z1ZD13uqXGgmrlT6mIaqmcINFVXWNM8qbRbyc90VczKn7ieUpXEFRzcCvkDFNkKCWgR/SFntVl0X1SBipEQ/CPkPOPX/cKrW5pTlOdODRxKs1wya8ikNpxPCzr6dOnhztSTcAoKYVw3IZxnaeAyHjEbeLXMduZz8Ep9bb1cmQ7nF4WnOk/wwVPy3IjLzlou7zgO5d8DtNSZEQpxVWIlLjGIxnzMahWHkV2T6Vj7lRlvwl8ClkzEaCXqDIIUqiRgO6IHiEikcArNODLimSuY2im+5zjz6YmTGSeukaPSBGk5B1Uwz+/bcoN0t3ZMXZM+7wnnvy3L33lz9f9fsPt9/zAp74wfdMxFktj1FIuFP1XaID7DYuvScxvo6kcII4y8fEnE0rmpk13hMJ5SlfIglblipU3I0WGUgKhbTpOyOODWoEoZVCLWCXmGg6/ZDHM6CRoY1BzZfCqm93hd2a3xprZarZy5bd53HsIWOPjoB9uEBlBvJ3HlNw493PWIwaa6SmekzBypciec8CzOh5F1KTU3NZUI+9EZBH3tjA1ahbUoBNUZrh1Qd6EtR4BUOpASl5sfn+ISLHe0SkaZhR9YtQEj3Oh+UCIkbZEhaMTxVfUNfXtaoCw9USllvLChQv+eO2fW8dM2H+ffW674ZqvfPkrCxd39RVbi4VyqVxZrVFsgPvqEaGeZ55CCZZTZXsBvNit5DNbSolt8mGqhCzQiBghZCHumjc7Z5UiSQJDIwG6RwNhqOKMOjaUGTloa2Lc8WTx4Q9a2kxlQDMyvxTxtJALOluh4cAc81G+e80xAr4DKAEB/TcKcA7Ubob/6tEYhjHEFB0QM9glrl49h0MufUcTAp2IK16u559/vum32bNnH3fccbTChFy8vAkzFKNJ9ahuYAOErX4c8fZSUQnjN9ni9Ucft9PGrYuWdNz2yCPzFizaesLGpUIn+CyNonArnPZZabW0MyBbS7Tc1fw4X48FiQwWGmzREtUJNVUlNOL19UwpSQJDIwEqGgAaestoshGXA8TnJT0Cu8AOuoX13X+Vgt4Yye0PWD9jxgyb3JxVz9FpATVAx5PaIxMwbIZz/+X2/zQ8kHAnx+got/9cI/NprgzRlb7K6LAjPjEydA6q0z+sm9K57G5aQUS6UoiX9CpJrDnI6+2atMHEAw/5m2223Wr0uPaX7TB10oSxizqWdPN+9PW2lbupD/94fcEV1Vq5fYGMIoZ+aLBbi5w4r/2oZGLYf8G+CEEYG0HQJOf6KqWUJIEBkQANNPZ829QSN/ppWJobZ/xKD0sC0jVTEPowUNDLSL2N7dNOOw1eO0bYfKNx4VHgNYaGAPpmOK8JTZjwmqONloGpWJPNWZNC19G8epC44K+u8avIThE2td9DXB+WtzlTOlRCD0bfef+tnq3ZFFiXCuVuR263j+WA6CuWN2gvzHv8YZ5q/4qF3mKLVQF9SzO3dYOgfhG8WwTxGiKNpHxaS0091QxtoxlWlWotKyN2NsuLINQUjVtkNazSbZLA0EggRiYU830mUyw+b2pxHlzL9ZMmN6+fYWRFXhlFnJnDWDFnw0bzlT8uQWUZ5Mo1CrKBNMhzfYaY4kCPylhnNtjFDU2vDVIp4Q3TL77U5RsC/Fc0wXyDYFMSAQZYu+pcktTdOZStUpWaAuvWljLf9AvdZcd88RWPbS1PGDu6XGzpydDSBLFXSp8a1ReschFUUSSuDckkagMCbaMl0UKLmax/sg3HVl1bKHHI30i0tp5PSkkSGBoJGGzG3uzZsx2QQictvws9Z2RQXWrsKTVupjI0GbEswVMcQ1cfdnI0Bz84LMCWM0TcHs6coBnmq02jVuYz41Q1JarbarNa7zP6/cGOtlPMx7r8zILUn/zkJ2fOnEl6MI0ZSoDUgz7o5bglEymrKpmmfqn1VI5ebB09tkSR+no7Fj8zelRrb6G8NPs15v/esqIblRwVyq8iEa+mpQe0M1dZeqltNF5KfJLSdKp5dotDmBvW9snbkE81zxRPEhhUCRicxqRtLDwV5vo5QOhkgCwFNibdijRTB9qOHqXsAfRhtfhNyVKxfm7atGniF154oVcC+73Jd0AzRfdD40gQHnObcVRGiQapSqphP1lG7COS4Q2zxN4GRT+GnExtoZ4z7wLr9C9vNYzO9SFWQ+a3zcutKenbx9rSOqqrhwoWyoW+Ua0tJe4Phz163fYAbWZ3ubeBYZ0tZ1EVlaaFIrqcAw4K+1kXcByapz32p1EFQRy9EMrB4+OwG/rqkwrO6rZDFwFWGo8Psryp4kOjx3mJKTJyJEC7AklDMyG1b9GxIay6O+ywwzgKqG4ujVDjUNQ8cUURZEJkMYCBYwwWysw08ekQO9Q5W5jVxj9Kam8ciayI4Wqka1SEyIu58WWjvJeEKgmergbb9SALYPVizhtCDrka6AjpCHw4BUBffvnlJhtELI7QUzo0+hRNWNOkKrjVxfmjnHMzkRc1rB/qjqWdHV2di55+qq/o/V96bknnwqcX2tlScVPjwNdcbMiIVgWA6m9xP+j8ZFDR0DaRXA9YDaGjqoGMIGJ7lVHhgIKTTjqJz85JFA4wIx1tJsF4E6AM8cmIYT+tSI+SBNZEApWxllnBRiyttqjUtjQH/MYhkdJjKAZZxJsprpo+4gZFaLJh8vjjjzsQiifULkdnUlJ1IwJZIEUz/FeVJmruRz0jyca0cMiqT1RpVbmt0/SkrdWwVY9Hvwf4EFGAj63kNkPZl2hDudOyPvvZz1qoF1vJNTx6M665HPLEPKX5SFO/1LbZdoeTT3l3724Hj/ZiaCkdevhrnp+6ZJPJk1r6yoVR7eU+tnVL5ruug0oIy/TQZkdBefPAXIvw4Kw224LJauaVEw8VpKNEYBiAaVc2OBnJ7iQwk6oMGb8ErQyxmImhnb+dQodiqIxAfWq+pxPlmkiAKoZ2iRhvYJTZa6vtW97yFktLcR5A3cMfRDLHosKWgoFOJz1JsUDQ07wya9Ki/vOaWvzud79rqDoj2/A0NvunXy+f6lPS1jQSiE4P4I43JeFYq/a1r33NoV1Og7H79Oijjx5UQTXVB6OnbPnGt7z16bEb9nb6+NDSTXfb85jdNl1Sah1dhNClcksrsObDrgdrLxlNtfnKti4n7YJd8ySaaosXM8EMBrAmBdsxqaPGh4JaPS6RqwSOGxWCrzXicP/99zsMxcoYW2aMEDRYxSBxHQINXi81MjWqGQnQNOOQygmhck7Rs4HFL8LQPenN8GmGJrQaWxFHPh177LHGjqlFKcYC4MBEpBlWq00DlRhMSonGrjafdTqjPoUqYURnHV8BHLc0ATqxPv3ogdQ28VkR5DcWWekmtuYgQXZTYM2FNXqsKrS02/3S6pguK+dK41qKo8o9zIy+YjvMbstmGmu5aZ4jDsArIAbTHNOaZ8LQKQcMZ2pHFjQSUjOZNRW426ZpBYzfevadkwgCBrgzwMjC1vMzzzzTyhhHl/m5QSj4k10oLj6IB1uJ12nlS5VfQwkEjGLCO8EE8SMvzItqPVzDImQ3EISABrfeCuKgU1kilBwWqMkgIULUH//wWCouaqJKa960dYtDiB2kCATCdiQNvQCRuWRBmTNbvEr5i2IrORHlPpDBaGktvDYuo2VUlyWe5b4n5z+xxcS+9vGTRpnhMKfY08l53pWttvaqbzAF4decVdLA2teYHPfhu0E8O9oDtQGxZkfjTznlFB4S8K10byrmtkV7lr/4pUleEukNSTkGxQgB9P/xH/9hAaMJa0+FGEIE2rjyKTVJYI0lQM3wCMuA5WHFnuWknJUOUfMokHSNC1nGIMpyE6Bsg5hlUb4PYLBE8EhkoIpryAd/w8qQ1ORoIFu7IeX6nZi9NitvKQKJF3NYn7wffLxgzZGnvs1GSgCKzzY6KO/BgRVOc2/LYmlpZ+c9d9531qc/cenFl3TYsWjfiu0wxR6rQ6y2zhSn3GBVKf+GTwc5LYHt7Cx2QOwLBk6fio8zkYJWCexoTaWUTmS3y1Y6R4eFeiLa70prScrcNH+IZTG4IbNZYLBVdmBlnbit0xKgqMYklTNKKTYnMnWlnFLCpzmArQsjDnNqzyvoKD5X5oi3gsSwTgawuHpWRpyyKqMzc/uMWEsoGq5/CYGU7Pkwc8ZY5ACwsNJnUiA1GuLyQ58mME8pSb08BySlOcu6wLyfsPjpOy+68MLtp0wqlto6ewvtLYViZsu2qFq2fo+hXWfaOuwRNENhx4k5LTDOptEYznj2tQhtIAVq4Xgqx9aIO+sLdn/0ox+N3x3i1sF4fXFzK4wvxWQjFx5iZ6P4IlFM7xBTjKURq1UDog2JyYokQLs8omaufgXDayeBOKg6xjCrkzJHfEUcVik91NivT8YK5jwh3/nOd/JfkKAcOqwSw1UlVoQmKzoarmkD28BVrc9aoQ+AUrTuIAczvZbHOK3I6QIQzJEA06ZNkw7KEegdV5Ad3t2Q28BWu7kuL1p4V+ha/FRXX6GrdaIzUTeC1MVRxcIkO843yFrj/+zbQjWVM/1iFlE6zWYXmzO1zH7mzJlA3G/JUDhPCcUn5sIBRBCsCcv1rMl/9atfjcZR7hKj8a6+weFsFEvQHbZrxtKWBKxwCG8RbmjcqomIUFOldDsEEugrdOuA1t5RfnN1tBZ88GqDnscKnT1LRk15sq19fKFn4+6l3S1jFxdbRrcUfKKqY9HCceN9qcsvtlbz1X3ZSQbZdLWjZ7JLZYnoEFR7pUUwHSiYYcnCAmesKigWOia9JrulUkvKhXHlzmL30r62ic8VimMLva3P3nfXVZd96+JrlkzZ9+gT37nPrpttWO5pW6akmp+dN5xxKrZwPIaxxgd46KGH2nfOagEERkRFrxso9tOFwoble2Ik0AAAIABJREFUrnJvx/N9Y8fZDdExvzB6YmdXqX1UT2dv63Mt7aNaixMtbKgD+uomaIjAXemET2+jeG1IWe+HUryftDdeuixIrY5bEQ5YGxQti9Apvj7IrLaqWo/rkXCPoAwRDd57tEmwzra9ZP+ykGlJS3bJnCG5mrnVpOx5VWCAzJ492ydtbrjhBn5qbmimMRc2yliiaF7RGnLSISloyz3CsrZ00a8M9ovtBkRj6wE4xlVpIVCzixaiszXIzssNfENnZgjiKBylIiKE6KsqlaJDIAGasMzDJuZfX2fHHT/7+SWz+maNnzphyb1bljum73z4377177JHhcLYCRPKvV2Fnq5iu9d+plfLq+j5sAih6XE1Pjlz2bxhH6yoftqwbJiUmDaZPWMUmVL/xcVXXPijq56f9Nepu+61766ve7GtyxlVxlZclo0p+s9tbex4W4SeRwWW51j2NzOZsjHYAqjtWvvp/5x398NPdrdvWHz+qVFjJuxy2HEzDtmzq6fcvoJBH60LXrZKz5gxg2WdvxsMsQDumkLXm1uY6zWscytSLGt7RFxtULTUGFixODkJLKD0gx4WySJUyw1xza2UgQor6LcBYs8o0MfgEjRjyaHj1FMpoeXMk1hPqtlEE+8oVxrp1HM7a2G9IBJHwXrXBZlxQl52+l599dVcK7Z42t9F0MQEoKPuEY/SB6g1iU3zEoA1GdxEEOvq6v7tFZd/4+I7F47arKU0b3J3x+bT/jx66y3332vXcmthfDY7XSy0Ma4zezq6MMsfvVmPZ8s5D81fqkWH6ZLiRKhotVpK9KjBEC0WWrXEv9IoI9jQd1TDovlP3nzHvRtN3uD57qWz77vvhaWvm5xtXqg0v9LM7MbbqtKwnKdJLX5C1hxrJpqc2yVxG1eDudzn7AcmXktf53O/u+yyn/zmpu4Jm5QXPdlSbNnlzw9uOuXrB+y0cXWWFcV9fIAt72cx96MmC3llVpRlXU8PxNDSeCfp5Yj4soRNSZdccomVmj5Y7IOZsW5Ye2URhqzhgwvWXssW3lEyoMxSNjfI73PdddeBXZ4N6+2PP/74AFkNhrPGABkxIvijneYuEVLLiNjTwHTSYWj4DBKfkaX77G4q5YBKgB7DCSUaQpd9/bYFhkxL1qSgZbgDRnSt9/T22+24wUY9D9/7+KMPX/mHq195wO6jTFX3lTJbEGYt3wm7DLDXpOCBy0uvKFKuXdpBAzklcsQMgvoCmbplr5+iLb59wL7Ys/TOex+c/+yi1x/5hqvvemzW3Xc8OvfJLbatoGc25l8y7CtWeTYoKLPxcsUVVygRWDOA3DLo6ouLvQ59hVbG4aiejnLH8y2ltq2233WD8tZLnnrs9ltuvOHPt+y982sanGVcxwtCnX766XyMHJLKMpoG79d9XeFrJyHQmbQFNdBegAOFvCaddcFzazG107UYmmCKQSnonRX1xWC0Ydlv1cFgjSdvxgUXXGC/PIxmLDvmlZfZEkXuC+ZwvK4ZyyLQXONBs1Exd+5cR6LAaClGBanxneFGTARKQLIgc8bNKaecYpwowuw8EXsaPBGHlofcB6l1ie2KJBAGZQ4+GQ4Vy6PbWqdstvHZZ3/m0p/95EMf+KdyuXPWnEeXdFmn7xCDEkTrzQ6fWf7LaBlrxixmwyvU1nFFtbPpsby0t6XY7ct3fb2lcmfv0iUPPPpEy/hNXnXQITtts+Vjs+5b+MSTmRmdvaICqbOrORzqSyqZNCryMBDYIsya7GllDRmMqC+2rdhJzj2FUqeTerqXjiv17LjD9p8650uXXP7rU999clv3kocee3RJfbZGKfgbklGK4dbw3dAo3zqcloF0ZR0wFxMhAxP+2HPOOYdNbUG9JQ+WaYIvCOOXPYGgAT5D+Q4bXLC2xs5yVHtYfEbAJhcKZ4EqiTBJyELQt9oMkTVe4LCmkSYhGd2Am+HMQ0ciscgUsXjAsbxE5lcJSptoeJSs5KNVFYEvE3oo9zqsPutw1SvQ81KY7ekqL170fG9XhyX5XS88t+G48XvtfwBU6bCUqFA0HReQPQwbTeXUKlRLxPgUmFdGddTWo/pqA9ti79LegvWtmoai85kF837+y8s3mbrjAQcduvsO05+Z+/Add83q7MnOhY9/wcSIECIeRXd2diuO8kei4gyWiFdfi31LvRX6in7IF+xYayt3dXR0dxTaim1jnpj7+OZTNt119z2bPFnYCGXCu8ZwU0pepeoS16d4iNo1nLe8QKxM2xQBF6S284M02NqaHJS6Y4h/uA+uG8RvBweGabw15PPmzTPByAUGZB2eR9sArvZrPJOZ7WBX2De+8Q3uOSBriYwJSQa41zsIjhca6YSORqJbS/dOPvlkMM0ZYmrevhsuFAMpdGjopbk+6e6atAXSLMOVZVzc9Y5u64MmZ33m09/99JzS3Dn77v36Qw6dMX5Mtu3VY2id9VdrdcaX8liTCq1ZXoNT3QKRAyhDh83EgDApKx605vPK0LNds/o6H3zAXoUHj3jDW9rbx06fsvmG48fOfeyJjs4eKzdUMDet+Ydho1EQbLt7+owXBKHYKsPg9Sjq85KW9XX6JKo1OOH5byv2zJu34MP/eubne57svf/qfY9487777drwdMyXMKncKJ2d5NetOwUZqoFQ9ZTrTYquDJnr1t/97ncgi2VtQZoNilbj6PFoafQ41I4uCN/s0AhhcMGalw1SX3/99RZZQ1gt33PPPekcaI4fWfTAMGBZExBQdhKKMyFJQSL9QOkYa7OIlIaMkAF3GfH0VAoyNrs1j1Zeo/QOtPsTspMdzuu9eg2Niqx5KZldynebnU/U8eQddz7XOn+Dju7e2++65bbbt5ly0GYTspMKPOUXfaktvuYlDwyH0NJQJypHPykwnQRnKyug3OslZPqUc2LJsw/df/8jc5+84g/XPDP/sSXz5yyY/+jdf71t8eLnJo+fnPtBSCpQm4+fw4NQHNL5zPKlq9ReiWpC+RsUnQk6W1Sbmc/PP1vs7Sx2dTx52+0Lexds0tP10OyHb771gS222KNBxkZJTCgI1bigRvTrepqeBTiAiE3tl7oVILZM+9btjBkzKEA1KKNkNbpKbPgTZ5BEsQpgrcZ5aLI26DWG98MEIL+z6dSwDqQ7TpC7A/LSe7dxZhWwRoaG7UBLwLcsdi1CZDRhhkNqcTQhMjXhS+K8NmNrMZ9lIc5VkUihMY8sTdY2kQ2wBDIDMWeZQdDkSZMOOObkg7Zv6Z5zz3cu+P13/vs7L99pyyl7TO/pLowe1VJZbrncwszzDZsIfaNUrqwBv+FYu+Zd1C7MMRpLXWsqa4OvHb4thRJb+ZmnF1q/hMejDz26cPa9o3t9dqnlkQfve2LBwimbTc6Ohs+AttDb49CPlqUdS9uzicTMi+9YHhsZvRu8JFQAXiuxvqwouuxhBteFwpjRvX2F0Rts8pZ3f2j78T0dd/zqp5df++MfXXTAq/aYOqmmmtmtMZXjcowvjhdvI3FPlajoBtnW2SSWHxm6whN9qu3Eq8l+zdvAYc+HQy9MsVq8AGriaUgpWkwsBDLEMmkWrKPP+u+aepqQCPc8fwhQJo6wl63ijOMEJZIUcbjl94hl//A9BIShw4LNRxNotaQiTlLyUiODhzPEGaqW8ftAgfX8IBtN5Oq/zunpIEpgOVJn7oyiba7FtvZxx7/thNfvvdGS2Xc89ETpR7c9+vDD8/bfddp4H7PoW3Ym+vJMg1ivNWFNh82mWBVAOcOqkoJhQwur1NIOaH2etFjue+bZ5+69b9bYiRNee8zfbzK6PKF38R13z7pr3qKH5jy83TZTx9uoWMFrgNzb0902qrWTHTN6jBN5MD/k1Qc5ddLCqvyVUD/WskYVS8VYYi1eLkH5qVtPOvaYGYfuNOWZu3a4/6nO6++8/Zab79v38J0y4qqAGzwKnhHXxjPOOMPINb4QwrUcyqvyrcNR/QWatUsDA4I4YHlf7XyxLILtaKe0zy8AIo2slnYezyNDJoVmwXr1KpS///2kgq36m1wCwWkDnm7Bt2aj5ICO9tNIj9CHajLMI6WmDogxJHQRc5gWq/vlEhMCZA33jSI9EWOpJm+6HVQJMMZeaoYxz1q6e1t8tmLsuPEgu7jB5K7eQt+ip3u6OlG2+j+bPdOTmSG3HK8zm26YhEq9lk2yGcBmvH0kl5XgZx+bgA7X/4bTCuZa5t7pXFpu6Z59/4P3zHniNUcc8cVzPr3pxLZSX+cvL/rZGWd+/tqr//Q3R8yACVnDGcOZKMq2DHcv7TDBp/nPPbfkhj/fzNCzZS5eCSpgENWXWLDDuL3FfshsFqy3/MSzSzu6C2NaSuPaR3WMm9jX0vrCc4snj8vsnpUG586bYcoxOkbuEBuSK63kmhCEB4M8QYR2OX7Zlumvf/3reBK1b93G9tQ1KWLA8750TA04+wocB1ySTkAnAQFf3S8okEJQPhPrAgJP0QskGFgvo9v6qkV2o4jiijulEEZ7B5ilND8gUZa41udNKYMsgeV4u6wY04fl7p7sfMZb77jrmhuu//P1N85+5PHW8WO22mzSmFGFHkDOC9LTbTFDVcWGF1jTNPopiJgjYeqaJmGF0d4V/IYrdpfb5Bnfarql6457Zi3pXLLXHi/fbOOJhZbW9jETd9xl52mbT7r44l/cP+shb6oec5DZiMj+MUPYKNmv82LhgVmznI3D4rNWip4bDq6B2lWyqkTbxmd/fLwajzGTxk3auNyz5K833nz1H669/k/XPPzQo5M3GL+V0psI+PucmP0NxqBXkRzxumoi67pB4jd9LkMt/d73vgepwcXMmTN5PyB1mJXDqjGDa1kDZZgraDOdjv52DRSWKC6IhLrTQreuUuSNLEEcZNLzgCxCEIj7cWoZH5eTj1ywtcF3FJ1nSZGhkcAylM1sxaxAFysm2se2L3r2mc//yyfGtjw2bvHTTz7X/nennLbV5pta1mCveXGU5WYZ9UsRetCNiWYEYtxSJAqGWBxeO/TGZwF43qxE4tPzVGK9SVEutRXL3b3PP7Nk0TNz5i7cfOtt9913j+zAlHbnnxTax43dfHL7QrZv66ieshV28Lrc5pNepZauzqVto7OFYn5/3HzzLXffcfsjs+9X+rnnnptDTH3Ne1pGl8pLuFGKpdbuzp4FL/Tcc+/9t//rhzcqdbQuffbJwuSjZ75j04nLjmSoz16dYlOMPSBO+zMbpHX1TasmXkfjEEa77P+wvNheDfDtFD2f/sm3gMCfYdW0wa0NxSKREAq5AFxvaX0vUPrAX08NgxxwKb2U0Mg8Y4yTGrx2S5pehjhHQYaN3ZLOrmRZc16bwDSihpW4R05lMsxdjtSibMTOrh5OVZ/v7Ckv6OvpPPKNf3/qaf84daspILrdcRV9ZuOY1ct+QlWyhrReit5rQ4IB1vQtdJj2brvtthwgjsr0gfODDz7YEoJYg1RdO0unl/QUNmgpl8a0Thq9+QfO+FhPuWWbraa0tvR1FVqfWdK9/S67fvO/vnzHU6Vdd9qCxaKdVo709pRbS9nJqGHILF686P9+/nP6T8/NMcYQcKtKKlNdnDjn+Lg+HpRsQUlXX6llzNj2tr7nnp6/oOf59lFthx/zhn869d1bbNTMBsaCLQ4Gkbkf41GhQozBmhLX3VtARMjeSU7Rg9SW/DKo7dvgPtW/GqvhgULDp42DC9b6WIPzNgNfLQ9ZVBQgG4fx1CPpoX8x61idjnhFIoPXxCqAexzMCZgZmD17tnO0p0+fbhVKA9feinil9AGTQBXYVkC7fczYE089dbfjJ8+eOG3T8sOl+XN2fNlrt9p9S30GBrJiHbFrLsvG7IpxDW6yyEvYDFjlVpVRtcaKy87bduCBBzqXBljDNUO9oYq2mk9hlHQtKZTGbT51W8ZFW0t3oez0UX9aHUu4wZab7r71hnC1Y2mh1FZobxuVvbQANyCu+FLvvOvOW2+6qXX02K6OxUZHoLYB0tDoY63719LX7RDjsZM2eu8HTz/6lJ7OtkltS58tlNqn7Ln/1lMnmDooWM2+sqCIQOcYwoanSLR9ZVnXjefacsstt9hKbkO1X+Ef/vCHnSgXE2ka4CdNWIrDqskr77Y1kb0Gw1xWgMaLCLh5p9GDPE4cgluJKD2lKDRDhEZKl+hWqKmJdPwRV5sYyKxgNz9w1llnmdu1attZwDUZ0+2QSABuvGj6sfc23XPvQ9u33KZ19GaFqZN69usrTVjY1TJ6jCXI4MlGP+9t2uhPBjjLaph1em2/D0nlX1JI6B59q051fI0P5jq/96qrrnKGRqh6NYGKOyiWjzmbPy21trWOYmtT675sGrGtbUwrM7rY3dE6puAHRWt71s5s0Z2TQJYuLbGuS63PLHz6N1f8prO3d5999731xmtiAsaIMJqQxY/R6hJ9FCR7uxX7uvvKo1pad9t3v13aJhZaxxe7n+sptS9uHbvo+eLk8S92SnXemngsIbf4VasNT2PTtYZmnb69+eabzTr4RL1ThtjUNiiaJCBheGLyzLVevGu9vY3BWqUBJYVgsYJCEdApHt0WMKrqIlRHurhHyGraE+9/6RrvURDkiTQg4vkjBCEjkfzRirREOrbBM8rF0C2hEz2Txwl/TiOxcNtmGa1AH7gfxJExRqB43MajdF1DCRQLPNDLIJeLNPOSlrZqmVgeW2jZJRN0e0upHaxsXlkCYTYDWHHh5oWGezhTpjqNymmGMqLKoVp5odTGL7ajjjrKei/HZkoPdY0dW4gzynJ5kga0TywXEDj+I2tQuZRthNNUzmxSKo/dvr2nj7Bsm0HPeM2+PT16HLwYXbJRoOuRh2ZvMnnCCce96cF7brdFRU0gtQme0NuslKowWTGlMcXCmMpmu2Jp4tQotNi6oe7YuFDcaIJK1A7SKgYvRsMAioUuChWUaATVyOHFDMMmpoaC6uS44TZwLIRmxZ59dvzUrtYm+jpKbKuWJfBk2P4WbwDWOfiqPRWkHNb/gzw9x3yQCKA56XRnbHDKheJRTdDHUuKaP8pv80g8qr6tjucZayL1NHrF+0N9fLzxxBNPnDt3rq+hc0jZMColrHvvofydiYMQXVvDPN2uiQSWIUIFFpZhQ+U4PfGKXZc9F1/+aNnfKNEN3FqetPzvmtRmIPLSkxo2BrbvOJsmYWKzQymeQY5MJHAts3KyPC7Z32X5lzOqJLmYbsnIKGc+7owvzC3/NejMwTjGepedd1YElMEnB9CM90tDZvrGiFuWHif3ZTeKyEpsOqiAKvGS5zZTwHfTDNYmoRGtC8iTsCPEa8aVGH/zm99AalvJnQT37ne/W/flBmJUWpa1WfsVl90ArDUphzOaZ32FzeJHHnkkXdRz+mzevHmMVkv0HdhYs2V+xQUNxRNSVj1KRqH1AbzmlrJ8kmXtLFaJelHTdGR1f1THh6KWqYx1XwIBxxZ4mWmcM2eOIzTNN/pBrWXUj47RtPhNvdK2GmJgxcjKB11kYfex0znxuPKoqGlMZUkJ62+woRN/G9n44jUkXiSGz0rbMnwI1L96XAd2E7WprC984Qu2ktr2bKUvqQYsaKbKV2cZPm3Ja9IArOOZhoVCmKyznpTmsSMCmm08MQ/OH3/YYYdFSg385dyHOELW8abx/tQHtvazqfWNT9Vst912TiaJl61a6ZvomGHePUMswFRckxKArQaIK/T0082KAgOElQ3djAVM6BUDuRlumFBLeisLWJRdiu3OPHh4GmhAk7qyOaRDauUibobzmtAYL5bAWsQWPxeabMualDhQeWNo14xuErMi3qFyFlPbOsfK/OIXvzh9+nQQByuAWMDdMEeDBmCtxvl7hn5YAEdF/HYQp0nWlvp6gK3h1l3ES4mUh0B7mulLSh+6rmIiPtRr5sf+BZvNLHq3AcyvAd7AGhOmGc6JJkmgRgLhEqRL06ZNo29ms0Xom7hHUKD5QYGSugqBifzgFp5aOcejCq+NR1d7gEXyUFOZAb81dpTOHW/UBxoECA54QQPOMK9nvNV0BMH68A33gBlF0OxQ5fe+971+pgQOED6pInMd8MoMLMMGr2iNVIbau2qA33ozZswAed5LfFjXXnutGXD7TfxA89YliGhk5BrYyq0qt5C7KomE9K2zPuWUU5gJxtK3v/1tu4TVOdq1qswTfZJALgE6D1jpmAHvJyYdc8CvH3C/+tWvchttlUYEVgL+Ng3yMVoUSIff+c53Mokk0ls+PYd2Mr2DLK/JIEWY9vEtKyUKXj/DH8tCFOoJr4EAQZGhRC8/u5rPPPNM+1/MAXzwgx909ieywC40Ob4PkjAHim0DsFZ7zVAAQ9Ur3Wp/59iZ6/AlASm2bHnqdwQczH++aXkYGgNVrdXjoxp6yCBRMXFXt/vtt5+V1+wd37v0+4Bl7VEEpeinCKtXYso1MiUAv5ic2k7ZnGnDWLN71gTJN7/5TadMhHYFQTPyCfylroYbpDb9xSo66aSTjDK2rZHFMPQasIPDGwJzA1BohvNq0/i0kw3urHsN9MO6+basdokDlZF8IFh0AdFZFeZXNUeuVRKW6EFqR3gSo6BE/aiBAuEPVAUGj08DsNZObVCkNmuSfnLuncXL9INWgbZ9992Xe54aSUEcrQ2LdfAq2gxnfaMyjJ0A68hC1RxyfcIJJzz22GO2ofssenSkpyIJqZsRbKKpkUAMdYlGBC3iVnZGHcime0YNJ6FQk6WfW0pIY13pKuvPT3Wbuc466yxOcOnKipHoqbI8jWHYD8M1f2RoW/FlQOVDSWTN2Q4Bh3x0a4JXjiNPLc7TEF97EXjhEagGoBAJfANxJDwEdVvDIrKTo9U1ekLttVC92aFUB2spCCgNdOYGieXigM8xpChljOlpcY0PPuJEELKQwkbgv4f+VA0rT8OOQBNA6RqsFCeuRIGJgT7sF6xUCatoKhpP1dAtAtyEPJLXWRZ83CqI291ROH6o/vGPf/SO5bn2feJoOAJtz5m7TWGlEoguiw7VO9EXK83VDAHO1WRxq4OoWXS0p7RlmAytUDBXGG3NhsM0aDvnMoCwbHTmzJkcozEcqhsVWh1NiLZQxSuvvHL+/PlGmeAMd7aRuUq5QgKKQC8jSlaRK2nIi8AjwSPXGFPE5amMsqCRLsWtp9XViOy5JNFEHHOU+lRG4wLnvBrV2YdtXEPUTVt4AkzPQi2+AR/Xfvvb3+43EOiI5sSQ18a4jciwbVRULHul6Ei9614/aYN6V1c9NIDb2rfJaaFdtvQpcrnGQI3syzhWUDWHP7pLfKEoyHKNkRgFueKTi0llpNB+KUHsqmKRDhqkgwm3MYDlxSqq7ZF06qXQiLvGeKD6H/nIR+wM/vGPf8yFzXWl5zwVqkuPlHTtXwJ5lxF7Lvn+s6z2U91HbXSWq87FJzpURDVWm+0aZqwpOjSWXpGGha1m4Hkt/ADndHZ6Pcimw2g0gbkam2jcAg6/za384z/xm48xDlYc7M5PDZERBJ4GcxXGBH9qn78dCYShbTh4hNhA8LbAX3pkD+kpV4SlJWJkearonK0xJcSYilLcWjuBQEF5bQ0TKWsotwHPrsmhFTlnlRRsULScxkI9W8nNKPD4k610za88zy7VWfL4cI5kYB0YrdmCHqVAWqLzdDDdojrgT7dx/vrUId98vNvpjZUh4p7KSGTEIVBWcYFm0Annk9lxT6V0v9vAbhKBnkrhmsABsbKoSKw8YQJ7hKc62AiAUlkqJqBUYZwRGMDYUnEZEUgX4VuXccGCBVK0S4qyuNfdaoj9wZaNe+WYNeXbwa1yEKVThl5i0A3nDlvrdSNJ4lUNU2GmoWLwD6AAa1jpaEhE03QrnOK9dbvWhVBfAfUMKKSTTGNqf8MNN9h5Aaw/9alPWc/74IMP+olJpeGpITZt2jSqyz190UUXcX1o2vTp02m7EYe5iKcxMAmEwI0deZViKS3mhO/IIY8MGfRmkowsg9RglIhSnBNA70jBXNF+TRId+x1zEKwflYssTPhZs2YZQQI542w1iLHs94HhrDjDU9HqU9/wtZtC5jUVUH9IzeHu29yQOg7S03D9QhrDU3lqmrCi22VfrNEZKPTc9ddf7+NY+lvD9LFeNykMUjnprSSXwmrgnuOnpyVUTX8DRH1MBd/xjnfY533eeefRUazIBbz6eUhedg1YOhNs6ZlVdDiA7y9/+cs0IFREib54xuVy9tln006JcJzuOgrLDKelrH7X0DDpEg866CDThpdeeikTJrLjwzljSxL18vNHrVSAhoHj973vfVh5095zzz2aaWWLRkFwGZGpFbYrElBKr5EAqZpepxLGvK1SOjHkXEM2ULd6R89638NrPK2+citxoPgPIB+6JJBGyMRgwdysoClH48h37OA1C0PlKZ7fdjTwmmuu8cKDOJAU2vrUEXtIAw0foIMVSmhryOAm3e9Co8NYQ0D+fOWf/vSndUdcFYe5gWlvgYklY8GQgbwB2abX/D52yKptvVh5GSjRQfs8ueZFLRaUojjEhx9+OFenQRoHaODpEbgfhsOkXhmkmJdyRDXk0eT4OgRhahd5agsCDalH+QHUhEFiVYSnNCm4a4blR8aDRI2hefzxtsD4pXbyySfzIWgtSunmrPUluKSL2k8Q8n7iE5/wi8NPP+80ZIDSI+P5wgsvZFzAZYnYEpzvUFhIB1X59bzxyE6iAcmhrET+Fq90xKE63BfQlvZYy4FncHZLI/GkfFGQdPYLmHZEqjqwRJSOA/T3G5OxY76eReO1JChOLuUaCcFT9hSalED0ODGiJ8mKRAdrcQKVUwRsilKi0CbrOcRkxKJE6kTrXAW3FIyJylBlEUsPNJcIqaUbWZAXWZ7FUNJeQaLBgmfeZBYuOcTQkA490dg26d3ALhaXCzQbvKwWEXsg0RtfOGBlIBgFSgTuiGPQeXkg9jrxkwVPZFETbP0GlTevmOaovIzDKoSQq6ukFRLt4PPpKEOz3O6GAAAEPklEQVSekFVbY9FIJ3kt0sz6jNVMhmc82xMVNVN7bfCuhnSa51Yfxw8i7beQCPwhAMoarC/pgelvZ6AYTgIV4VjQ9w4s99RrX6KM3vCKsHtQx+MpjhIih7IqS7pEbP004/UjXA4mGkzziBgHG8fppRUddo2H3PHh0ADu0Fll3GoCSj8kWSjqqbZ4gmbc5PVe0RAvEhZKDHvF4S+jIlzz8TA8O2lY1QqakDkB6gv6oJdjJAxUJaM3q7lRGAMs+osxqKOVXk0wfOIEQpdipFA8o8BPOmYpbfRIIDo/9WimiIaYSHQrTowaqKWaH5SBsNHqMIbQYBUaC7jlCoRF+brXvQ43xESBQ4wpTgDikqIOVmp76tYg4veIuCwGGj6gTS7VdjVkVMNIsZECmSaovIhaqcDwEXXUhBLWDF6qAoWAhh/fBrs2qjmFITctDaQebq1osj6Z8asnNFhEZ+iw8JppoUSN1HIS0anxVHdizVLQcq90uUgEBxkRSGeAk0hwk07PQtUQuCWyKA56IkOMoYBGcRRXIkVRhAq4Iqb0coVWBTFKCgSsKb0ayosymsBnrWLSKWg8chuJ1E5D1BaToKeU0UyFChJTWKkEyDPGALGTHpFKWWmuJgmia6qJKZKCKID+jYJ0a+hGNdlaj6unGqqGummFW5IBjqH2kUjHPIpW0E/EaOTSomigFIMoNNmjaJQs8RRPzhBeDmNBPEoxEJDhKZd+MSQVqiDpOCgdpVvFuUUml2BYSY9HnkZZihbPH+GmYmgMQBF5xaNKw+cazamuj0pqAp3xPtMctwKynIagvMxi4jRPXCcimeqE6muSGmunPhPRJFeNjKa6SkHpSgSu0X7aEEPXrcTIjidd0cGCns455EyCs2v+KJhLiRClYE7oaCSG3KM+bqP0eBRsKbSIEtU/jwTb4BZ56SXK4JzzqY6Ip9CPBHQxNSBh8tTRpB190U+WNXykrGo1i6LXkOeAZ6djeBIF+dBVIbRObaMst54GQYwj6cjymoRg3aIMCeeP8ry4eUTJg3/E6XPwCTK5lKJrjJ3ggLOMaERidCCIikV9Irs4egNEJOLSkXlDGM5Bk1dpmESiFdWVkRL1j4aEJCVGOsp4Gg2szjj84w08ANEMbauvvUcN00ME1Y9qKOtvq5lHxrzcIF5RlobEUQHX6jpUFxEEDZ9GuTXE6XZFEiDDFXXNirKsYXre43lkDRkORva8btWRGkHl5dak19wik5ITi6yUZ9AHWXXGftIR50/z4mo4SM9Tcppq/ms9nlevpibVNa955HZ4tqW+njUpL3ZGzYN0mySQJJAkkCQwfCTw4q+w4VOnVJMkgSSBJIEkgRoJpPXFmUBW9GOqRlgj8HYY/mActp1VI6uG9ayhWYc0qmFzhkP9112Rrqr0kmW9qhJL9EkCSQJJAmtBAgms14LQU5FJAkkCSQKrKoH/D3KTcmxPovdbAAAAAElFTkSuQmCC
A.小球A对木块B的作用力等于木板对木块B的摩擦力与木块B的重力相加
B.若木板的表面光滑且足够长,小球A和木块B将一直保持匀速运动
C.小球A在斜面上向下滑的过程中,以木板为参照物,小球是静止的
D.小球A对木块B的作用力等于小球A的重力
【解析】乍一看这道题就是高中物理中的力和运动的关系,物体从斜面滑下来,撞到前方一个物体,两个就一起向前运动,考生们仔细计算比较费时,直接就去蒙答案了。相信这是不少考生当时的心路历程,可是实际上,只要你了解几个关于力和运动方面的名词,这道题就可以迎刃而解,详情可看下面这些内容:
首先看看A选项,说“小球A对木块B的作用力等于木板对木块B的摩擦力与木块B的重力相加”,虽然看到摩擦力就头大了,但木块B的重力是竖直方向的力,小球A对木块B的作用力和木板对木块B的摩擦力都是水平方向的力,这怎么能直接相加到一起呢?果断排除A。再看B,“若木板的表面光滑且足够长,小球A和木块B将一直保持匀速运动”,问题是若板的表面光滑且足够长,那就意味着没有摩擦力了,那小球A和木块B就真的会一直一直勇敢向前匀速运动下去了,这个选项好像没啥问题,先保留着。再看C选项,“小球A在斜面上向下滑的过程中,以木板为参照物,小球是静止的”,题干中的图片都给出来了,小球就这样滑下去了,因此必须排除C。最后看D选项“小球A对木块B的作用力等于小球A的重力”,小球A对木块B的作用力是水平力,与竖直方向小球A的重力是没有关系的,因此排除D,这道题果断选择B选项。
辽宁公务员网认为通过这道真题的分析过程可以发现,科学推理这种题型只是看起来难而已,本质上还是重在推理。只要熟悉基本的物理知识,想要做对还是很容易的,当然了,如果连重力、摩擦力等基本知识点都忘记的考生应该再补充一下这方面内容,争取早日啃下这块骨头,在考场上可不要轻言放弃啊。更多精彩内容欢迎登陆:
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