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Nhc1cBFgAkkcNuGS9YyAkwgLWPDVxgBvyHABOI3qDkjiQgwgUgEk1UxAp4iwATiKXKcriMRYALpSPQ5b0bAigATCJtCZ0SACaQzthqXOegQYAIJuiYNiQoxgYREM3MlAxkB8mPjQCCVx9vhtradPhWqDwtnUqbqww4OpT4ZbnbhOEr1UuidnxAHfyDNvPYEcktw2dqLgOrbXiUQy5qP5Nmsg8tm9gfS3jbh+0IIAedxtSUCIU+CqpCTHjXeWkj+0NXrWsc+rhxKnSjUO3ghlOGR8ORwk3BpKzwSNtm92TrXOYSaO6iqqrYjhUsWL0DU2BdR8OqHgkDInbLW5jyNCz1Wz4TkkTAmRc8OpYLKirgyUhE4f+47xGXkOflEJ1/oh2GuOgKlYyrHbXVKc7XiA93uS/2gSE9uR2MmzcGTcQNxutiCEwXKjMNOGnTs/Szko6J8FA8aBMWlLewMonGFKhU8VtZhCJQsXIgocmn7qurStn022pYNK7ZLs+yjMKw4IFzakkdClbx8WWH2SOhLdFm3DxBodFzCauYP/RBoCartTud0j7p8ZV0SyF/zAaInvYjfCAJxXMI6UeDdspXWze3J4RaMGDRAIZDGJig+qBt9gBur7EgEaDBfuni+mIHQwwk96NDs1207dViyOiwedoQuOl95FMbyesSk5PEMpCMbm/MOUASsT+Xnf/ge8VkmWFadgGX1x2K/gpacSArWOB6r51sOlfvzrenpvvw1J1H0xt8Q98BcTB88CF+OLBSzEJqJfFJsxmkhFmuoHnsWfjoyHyOjBwoCEU+M/nhsDNDmDc5iWR8GmoCSxYswYOxLKHztFEw1x2BeeVyOrDoOU80RmCmsOIzolGwmkOA0Jq6VDARoDyQyNh6xo5/C4LEzEDdmutfirGfIuJnokWxGWveumD50MB4fEodH46Px2OBYPB4fg0eHxIpzdN4beWroEAzsejuOHD8mAxrWEWgIWB8IxAxk0QKE5z+ItBf+jNRZv0fqrDesIcVlyBtIeXYtBg5Lx+WLl/yCBC9h+QVmzkQmAufPnkPEgGhEmcchyuKlmCcgKn+8Vc8Eq84JGFg4GXcMzcTg22/DhJgBGDsoEmOj+4twXEykckznvJRx0VHof/vtOPHhBzIhYl0BiEDp0mX4z27huCMuDV1jktAtNtl7iUu064hLxO2DktAnIgqXf7ziFwSYQPwCM2ciEwGagQzO1MNStR+WmgPey8p6Rx0r61H42gkMe3QhnogbhC9oCWuEGaeHy5fPRxZgVIxmE10mUKwroBBQXuOdicI1h2CprPOJmFbsQAwvYQVUu3NhAgwB8RpvRh4My3fAWF4HY/ke6WKurkf8tJfxUEyU2OvQbnzLjDv8DyTAcObiyEVAEMjoGbCsrJdur0ofqINh2XYmELnNxtqCDQEmkGBr0dCoDxNIaLQz1zLAEWACCfAG4uK5RIAJxCUsfJIR8C8CTCD+xZtzk4MAE4gcHFkLI+AVAkwgXsHHiTsIASaQDgKes2UEtAgwgWjR4HhnQYAJpLO0FJczqBFgAgnq5g3ayjGBBG3TcsU6EwJMIJ2ptbisKgJMICoSHDICHYgAE0gHgs9Ze4wAE4jH0HFCRkAeAkwg8rBkTf5DgAnEf1hzToxAiwgwgbQIDV8IYASYQAK4cbhooYMAE0jotHUw1ZQJJJhak+vSaRFgAum0TRfSBWcCCenm58oHCgJMIIHSElwOdxBgAnEHLb6XEfARAkwgPgKW1foUASYQn8LLyhmB9iHABNI+nPiuwEKACSSw2oNLEyoIaPyENzU1QS6BOPoTMVfUwlSxB6o/kIdjBwh/IMeLjDhRYMCxQhP85Q9EU+1QaekgrKfVJzqApYsWIkrjD8RUUSvFL4i5crdVj+IPJDYlB5cuXPQLluyR0C8wcyYyERAEkqYXDqVMFXtBHdFT0Tqj0nZoU9V+xD84T+NQSieVOFQSOllsRvGgAfjo1Gk0Nd0AmDVkmkpA6fLXDCQ2OReXLp4HGn1vTEwgAWViXBhnBEQXUPuBNSQCiU3LdeGR0HE2oSWH1uI04zCWq0+Dig5ylTv0wbl4KHqg1SOhCcfz9YJEjhcoZHK0IM9rUhEeCaMHCgLR1l2QifYExzs9AiWLFiBqzHThkdBUvkvK7EO1a1P5HpCwR8JObyZcAZ8hYH2iunD2B8Sl5cG4YgdMZXWi46gdyN2QlqxoCUDMYMr3QBxX7IaYgUybDWUJywR1Cet4kVmQxgeFSqjOJDwNTw63iBnIx6c/UWBTydJnILJifyJAzSmatJGWsBYg8j4ikIPCFbPy4OKdO2ZFh7qEVQtD6XZEC5/oZ/1STZ6B+AVmzsR7BGgtWVlPPn/2HOIy8mBcvgOmijqxZ0EdyRMRPtXLiEBITx2MZdQZd1v3QObh4egBOFVM+x46HC1QZiBHC+XthdAMpGiAMgOh/R3+BSkCTQqBRI2ZCUvNXvHQo84evA3VpVcK9aU7EZucrSxh+QFKJhA/gMxZeIGAZkylAZYOaQlrMBGIGOxpD0QZ/L0JjeV7xTKWIJHyWpirDyP+wZfxWGwUPiu24MNCIz4iKTIpUmjAR0VGcZ6ueSqni00YYd0DUVGyE4l9A1a9xmHnQkBpy0ZQKPZAxsxAfk29eEiRMQNRH3gUEtoLfek2xKRY90D8ABUTiB9A5ixkIaAMqOdoDyQlG7nz3obulXehe+UdebLgHeQt+DP0izcjbuJMjIuMwA59NjbqsrA5T75s1eUgJ7w3Pjx5yg6ShjTtJznW2RFYvGg+Bk34LQrXHhUkQkQiRw4KPZbqA2JmQ31DbKL7ATAmED+AzFl4g0Dzp/CzZ8+iV99I9EvRo1+yQQkp7pXkISJZoyPViNsjhmBQVCRGFVgwMt/sIzGhwJKPr898xW9geWMmnSBtydLF+FXUUETp7kZU3ihESpABursQmXcX+ueOFPoisooRMSAaVy5d9gsiTCB+gZkzkYnAubPfK3sgK3ZaN9B3gd5qkSmW6v2Im/QM5r/8ksyis64QRYAmlSWLF6FP/iRkv/gnZPx2rRx5zqpn1qvIfO41ZDyzCoOGpeHypXN+QZoJxC8wcyYyEdASiNgEL/fuTRZXm5j0R8K4SbOYQGQ2XIjrUv4H8iwKVh+GqXKvfKnaC+Py3dY9EH4LK8TNjavfEgJy/4numnyYQFpCn897ioDyT3T1NV7XdufqYaa95+iVdvE/kKQssQfij600noF4ag2crsMQYALpMOg5Y08QsI7kJUuU/4Eob2HRa+fqn1e9IxPSQ/9fIqKx/w/kvCcldTsNE4jbkHGCjkJAfb2VCaSjWoDzdRcB7SxgycL5GED/A1lJr/ESaez0/t/o4lV2RY+YgSzfgZiUbFykT5n44ccE4geQOQs5CDCByMGRtfgfASKS0sXWGciq/db/MHk389AubdEXGGg/kGYgRCD8Gq//25hz7CQI8AykkzQUF9MBAfofiMMMRMwevCUR5TMmpopdMNIeyHL6IyETiAPwfMAIaBFgAtGiwfHOgkDJ4ldsn3NXPrtDXz/wlkC06a2b6EwgncUkuJwdgQATSEegznl6i4C/PufOMxBvW4rTBzUCTCBB3bxBWzkmkKBtWq5YZ0KACaQztRaXVUWACURFgkNGoAMRYALpQPA5a48RYALxGDpOyAjIQ4AJRB6WrMl/CDCB+A9rzokRaBEBJpAWoeELAYwAE0gANw4XLXQQYAIJnbYOppoygQRTa3JdOi0CTCCdtulCuuBMICHd/Fz5QEGACSRQWoLL4Q4CTCDuoMX3MgI+QsCRQLT/xHX/C6f0JVPt10zVfwZbasihFPsD8VEThqRanxNIWa3yOXf+J3pI2hdXup0IOBJInePnIKR8X2gP2B9IOxuDb2s3AloCUT5+6Pjwoz68uBvaPwsfrJ8y0X7TuN1wB9CNnb38AQSlx0VpApp9jXfZdvEFUm2HU2cU6jn1uD2hmoZCJhCPW4oTtoCAI4GQC2ZZBLJLeYgq2x1aMxB1QGgBbz7NCCgIEIFrSLzNGYg6C6HQHaEObb2fCYSNTzYCCoH8t8YfiBwCsT/4BOsMRHZLsL6QRkAlEOPyHS5nIPYO1b4Oal8CsN/PBBLSJuaTymtnIO7aaPvuZwLxScOx0uBCwEYgK5oTSPs6mp0oWrqfCSS4bCYQaqP9nHtLduf+eXUPkMI60ENVcH6Nt7EJTTca0Xj9hu+ksRGNjY243njDZ3KjqREkvPzWQV2yCRAEkqWHpboWlppDsNQckC4Fa45hyP2zMf/llzqoopxtsCGwbOkiRI19BgVrjsBctU++VO6HccVOxKTmCJe2mlVfn0HpN5e2U6ZMQbbOhFxTPvKM+SKkuEwh/VmpqRiuz0Vxbo5UKbLqG67LQW5qCg4ePOyzRmHFrSBgJZB+g+IQPerXiBn1CGLuekiujHoEsfc+hu7D8jD7hRfthWlUumQoPzw0WUelK1eu4pP/+Ss+PvUZTvpQPvvsrzh12prHyc9FfqdOysvz45Of4vSpz/Dpp5/b6kHnZNXp1GmlzITT9KdmoLd5CtKf/z1SZ72KlGfXyJeZ1Rh4ZzKuXLxgt1sfxvxCIE2N15GQlo2k6TXIXfAusuf+RbrkLnwPQ389H/qut6LeosNuY46QXYZseCuka5eBJBt7zbkY0bMb3tu0yYfNwqq1CIgBW/M4df7sOUTGxmPo+BmInzAT8RMo9E6GjJ8udAwZ/5TQeefkWQjPKMTsF57XFiWk4wp/NgoMampWIS7iZtyV1xujcnr5RO7O7Y2ed9wMfUoP3JVL+YRLz4f0GpO7o3e3mzEq1zf1IHzu0fdBXN+f45bwaPRK0KNHYh56JHgv3RN0Nj09E3XoPjQbfSMH4sqVS36xVb8RSEq2Dhlz34G5eh9MlXthqlDW7Cj0SkhX5V5YVh5C0tMVGNmrO04Xm/BBoREnCvUipLjHUmTXcaLAgE9H5mNsv15Yt3mzXxqIM7EiQK/ximijWMIanKkXtmSuPiheuaU9C4+l5oBIS0thqo7CtccweOocLJgzh5vAGYEmYGlpBeZPDEfDDiMaNuttcm2jzhbXnm8pfm2TPS3d43C8xQhLcjccr0lDwzaDotd2v3v5tJR/w3YjPqhJgSm5GxreN7lV9hZ1avAQ92zS46fdJiyc1Acx419A4auHYanaD0ulJKneh/yq/ULMFXsQG2x/JKQZSFqOARlz/gxTZS0MK2gT081XLFt7HbO8Fqaq/UieUYXint1wqtiC40VGSWIWeoiAjhfp8cnwfIyL6I1172+BOp137l98LBEBzcwDUJ5+lU30XBhcvIXl/iaksqEu/idSRg8zteL9fGUT/RksmDtbYmWCR1XpimrMm9gbDVv0uLI+T8iPG3QOoXq+rZDSqaLeS8dERsaUbjhckYZrm3T4cV2euO/Ke7m4bM1Tvd/TkPQerkhGfsoduLZRqYutHuuUenmqm9Kpuhq26rFgfDgGjn5O7Nd59dDs/NBtfYgmnYbS7YhJycOli+f9Ymx+m4Ek5+gFgVAHN1fWwWz9hER7/uDVnnvya+qR/HQlint0x8liI44W6KXJkXwdjhbk4WiBEadHmDG6Xx+s30QzEGVA80tLcSZiCtKERpw79wPiMvLEGyfizRMZf8gq2w1Thf3tLIVAZmHeHM0eSMi3gd3eS5dXYe6k3mjYarARCA2Yl9cposbbGnzp/iuagVqb/uomPSxJ3XGoMkUhkPU6ob8tne5cb9isw5HyREFU1zYb7MSkKZM7+pzvvfyeUj8ikJcn9sGgMb+FZWUdTOX057+dMJZ5L0IX6aF+sHwHopMyg49AUnP0SJ/9J2X5Sv3Dlhq2Nrto6xq9ula2WyxnJE+vRJGYgZhwvEiZORwrNMBbIV2qjtPD8zE2oo9YwgrlzVR/jqV2nJUB7NzZbzE4Qyd1BmKfuSizECKQ2EmzMG+u5i0sh9mQPxHo+LzsVVfaoHR5hUsCcR5A1ZlFSyHd7+oanW/YpIcp+Q4crJc6yWsAAB9SSURBVEhBw6bmsxxX6dw9R3oPVybBktod1zYacHW9dRZlJRB39TnfL+q3Lk8swS2Y0BuDxjwPetiVNQNR7dZUsVe8xmtYth3RKbnBSSC0hEWzD/FvXxlPjeX2j+fRx+9SZpRjRE/aA7EP+OrA73lIsw+9hkDMgkBoE93eqTq+g4dSCcQSVppeHoGU1Tp+T4s/ZeLSnLT2TgQyb3K4GBhpkKQlJSGSntxJJ81AiEDUGYjIZ12uWMqi+CUJeV3dTEtYSTCnEIHocXmD98tWVDZVVEwatukxb0I4osfOEv9EN1VYPz8iYRykT6Io+jR/JLwUNG9hNYL2QGgGkjHnbbEHorCm+gcY+7KByqbuhLS8RfcTgdAMhN6QOj1cJoFoZzA6oVudgbjsZXzS5wiofySUtwdCtqgsASjLpWRPB8TXeF8J9T0QLWtYX2SgGWFLS1jqwElP4mrck5CWsmhDnQb2Q5WpYgnr8rpcoVMse9EgLYFAlD0QIpButj0QKi8N/N7WwVZvMQNRCERZwqq3fbvKnbGu7Xs1BBJseyAKgSib6G0D4T6pqASibKKbbDMGz2ceWuKwx4mcmEB8zhGtZiCfQJrbm7oHwn8kdN0UbRGIbfDUPI27e44IRJmBKATibvr23N8SgbQnrTv3qDMQBwKRMPtwHEuZQJotJTgC1Lyjq9eZQFx39GA8ywTS8a3KBGJfpmoPkTCBeGGz9iUsnoF4ASMntSLABNLxpsAEwgRCVui313h5CavjO32wlIAJpONbkgmECYQJxINXfHkPpOMHLyaQjm8DJhAmECYQJpCOH4k8KAETiAegSU7CBMIEQibFS1hukgjPQCSPRB6oYwLxADTJSZhAmEDIpJhAmEAkDy2+V8cE4nuM28qBCYQJhGyECYQJpK2xIuCuM4F0fJMwgTCBMIG4SR70p0Rewur4wYsJpOPbgAmECYQJhAmk40ciD0rABOIBaJKTMIEwgZBJ8RKWmyTCMxDJI5EH6phAPABNchImECYQMikmECYQyUOL79Uxgfge47ZyYAJhAiEbYQJhAmlrrAi460wgHd8kTCBMIEwgbpIHb6J3/MBFJWAC6fh2YAJhAmECYQLp+JHIgxIwgXgAmuQkTCBMIGRS/lvCyjMge+FGFKw5jPxVh6RL4dpjSHt2DUb26o4vRhUKr4T/M8KCT4abpcqXo4owsb/i0lZyn/SdOq1TIN/l4ugj3kd5kjOjC+fPKj7Ry3Z4/Pl/1Q0AheQL3eYhTvhGr4Vl5UHETXrO0aWtT7HrXMqJQOZNJJ/oxmZ+ymU5YiJ/IJYk8kho9wdicyYlyaEU+URXPBJ2w48b9V45wWrts+7K59xVn+j1ildWctftpU8Qm90KPUHqD6Tx+g0kpKSjt240IoqmIaLwAXlSYNVVNA090wsR+fOf4bF+4fh1nx54KLwHHurTU4oIfX164tG+vRH9Hz8TPtE7V5cHGq834Z/XG60C/OOGGvcuvH5D0Xu98Qb++c9/avLwTq9SVuD6DXtZKa/vv/0Osak66Eu2gnxAO8pOp2Pn666OKc1O6Eu3iZD0kY/pmHHPMIFYjZyeB7TPBCXLKrHw/j74qc4EGhyFbNXj2lZrXD3nTbjTiILU7vhoTQYadhrt+WwzoGG7VbzRv02Pn3YZcGpVKgrTuqNhuwlXt0uug7V8P9WasHhyOGInzEbR704gf5WcB2l60BEP5KsPIH/VUViq9iM2JSeYfKI34sb1fyAhJQMDRk7DkPEzMHjs04gbMx1xY5/G4HHTvRJVR/zE/0Y/wxikZ2Zg1WuvYeXaNVi5dq1PZM2rr+Hbb7/tVPxx+PBBpKUnYXh+NootWSgyZ0oV0lloyUJS4lDostNQYJafh1pmU24Kbv6vW9A9Lh09hqQ5SM/4FIdj5+stHXcfnCrSiVDoyMQvevbF87OetbUzzX5C8WertdWlLWFQuqwcWXE/w9P39sZTd/fCb6wy/Z5e4pjOuSvT71F0qenouF+3/8AkU3eoep3vUe/1NJx+bzgmmbuhb/f/BMVJD9XFU32u0pG+p+8LR07cf+KX0anolz8efQxjpEpf41j01Y9Bb9196D8wBlcuXfaLqfplCQs3GpGaZ0DWfFrCqhdO5S0r5YT5Kw8IffmrDyDp6Qo88MCD4kmp0eF5yTssaeCgsUP7FNZpBhPR+xuxYdM2TDR0x1dvZePz32dKk7++niF0/fUPmfjyrWwMz7wdv58Vjy/+mAn1mrf5/fV1e3n/9vtMnFiVhpg7hyB3/l+gX7QO+kUbNLJJE98A3cL17ZNX1ot0uleU+42lmxE54mG8/NLz3hlPJ0/dkp2XLluBezJuxavPDsGqGYOFrJweB5KaGUqoHrcVUnrtPaq+1TOHIC7ivzBnykCsfka5R73X3Ty0+rXxV5+Jx0uT++POyF9i7cx4rHKz7FpdruJqedfOGoJ70m9H77QRGPbgXNw59XlJ8qKiZ8rzGDp1DoZOehZRQ+7Ej5ev+MXy/EIgqkfC9DlvwVS5V75D+bLdMFfvQ8ITKzB10mTNXLtRMogafbbHMslZ+Ejdxs3b8fCovmKKfnV9Hq5t1OHahjxc20ChBNmYh4b39Rhv6o2tC5PQsEWHa+sl6KWyCT16Wzm/eSMLg5OGwLBsF0wVdU6i7mko543ltWhN1PR0jxqnkJYFou6ZjrmzX3JqkUa0NKg63Rh8h1abp6B0eQ1emRqOn3Yb0UDLVu/rlZDiro7V865CbVo1bg0LU+/AByvTrUtkBns+6n2u9LlzbrsBH61KxaiMrmjY3kJd3NHn6l4qKy1hTemD6LEvoHDtUTFekRtuc3W9NKGHclNFLeJSc3HxwjmJj9Atm7JfCSRjjrNL2zqvN5GUTdA6QUx3PrYMkydPtddWwiDfTEWzE/bsAjm2cctuPDwyHA3vG8RGocNmJG1ISpCGrQaMNfTC5leScG2TDj+uk6NXWzYiu6/+mIW4pHix1+HtJqRiP7tgriAC2QuTdTPSsnIfou57EvNmvxDIzdpBZWtEaVkVXqZN9G2KPaltdFmCHam6rm7Uw5zSXdlE36LHpXV5uLperl2RnR4pS0Jxejdc26gHld8Xdkt7RHPHh2PQ6N+KFzTsdktjoOei2qsS7oVh2TYMSsnC5UsX/GIbfiGQxhv/RFquAemz34K5SiENx7cH9nhNJOaqfUh4vBRTaAbi419n5JCNm3fgkVF9xROcSh5qqHZYT0NVz7UteoVAFiaC3m65vC7Xe2J6z5GEiEDO/IEIhGYg2722G+0bWKpN0jl6mou6dzrmveQ8A/GxcXUS9TQDmTsxXLyFRXZDg64q2uO2bEpN4yq8tkEPY8odOFyVpjyQbCCbstqDGnpJWEQg9BYWEQgR1mWrvf24Tue97VpxoTITgcyf2AcDR89Cfk29sFvV3uxk4tk4qNVDfSI2JTtIZyAvKzMQ6qBGCa+waYEnAhn2+HJlCcvpjRGpfbIzsgcAIpCHR/YFzRLa6tTuXP9xvb2jaWcgRCDu6GnPvTTI+GIGos5ClFDpxLS8EHXvUzwDEZ3HunTbaDf+tv4HYhvovRjg6TVeU/IdOFiRIghEhk5nO9MSCOWnzqBkvYqs6qOZGhHuoDE0A6GlJs/IQjvmae1VnC+rFW8SRqdki7ew/LHU6pcZiLoH0nwJSw6IBJ5KIP6YgUglJD8p8xWBaDskrYOrS1i+IBDKy1cE4twxlRkIE0hL5tkWgWjtwtO4SiDa/4F4qquldM4E0tJ93p6nGci8CXYCcbY3OcdB+j8QJpCWuqH/zjOBuPewwgTSum0ygTgurbZFMEwgrdtTq1eZQFqFxy8XmUCYQGQaGhMIEwjZEy9hyexVAayLCYQJRKZ5MoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgTCByOxRAa6LCYQJRKaJMoEwgdgIxO4mRqaJ2XU5f43XVEl+qsl39S6vPcqp39F39gfS1HTDXoBQjzUBGzZttzqUMsp19KTxDOdLfyDCMY/qUOqNbKkubRVbdCQY9XPu8+e8GOrWAwfn2tbBwk4gku1J44CKXMyaU7oJl7ZXN9sHbHIspnoObOsz6m1dt/sD6QryP2K7X2PXtnOasrX3HDnBovIG+efcrR7HbJ787Meyeg+5tM2c+zbI0xsRiFSp2CMc0yc8Uebk0lZ+PWTh4S891N8b0YRNm6weCTU+0cmw29sRWrtP1dOwRY/RRrtP9NbStPeaqlsNhUvb1nyiaz1dauPC17kjSagPH0q4W/hFN5bvFg82gkDuae5Qyh9e3vxlG27no3nSLF1RjbmTmvtEV9uVBs72eBBs7R4iEPJIqLq0VV0ki9DJ1bGar7vh1c06HKlMFi5tGzYZbGVurVzu5kFeO1WXtoPGPA/Lyn3SPbIqNkw+0bcjxuqR0O329SBB2Pffn8VXX3+HL7/+Fme+cpQvzzgeO19v7/GXX53BsNQsDPtNObJefhMZs/+IjJf+aA8p7pW8iex5f0HMpOdtBBLSHd2FIazfvA2PjeqLn3Yb0bBJL3yjk9dAr2WLXtGxRYdr242YZOyJ9xcnoWG7wXvdavnUPDbrQH7Xf/hzrpiBGFfUCk+U5qp6mCv3K1J1EBbNMcVbE3PVQZgrD9jSiLRV9ShYcwwDRj+NubNfcIFmKJ1y/RBGM5B5E3sLF8lXN+pALmAVycOPG0joWI23Hirp86CGlI7i5KNcIZBUNGxx1G/Ps3XdbZWB9Aqf6GndQARCeq9s9E6nc56kk/rDgvHhik/0VYesKzDKSozjg0xrDzmur9FKjqmCdCkeCWNT8oRLW39YadgvfvFzZA7rhaKsfijM6I/8zP6wZEQgP7MfLBl9RUhxT6Ugqw+MqX3ws//4V3SNTUH3+Ex0G5KBbkOyrEJxz0XVd0d8Nm7tF4dJEyb6A7dOl8e69ZtRmNYNmxYnYf38BKyfn4h184Zh3bwEr4T0kD7Ss2lhIvKGdcWCB2Ow6RV5+jeIMlJZh2HDgkT86YU70W9AJJIeK0HKk8uR8ptSIclPlsAbIV1q+tTpZeiVczfmvPBbh7bWPIQ7nA+NAzuZLC6pxPNje+Lsuhx891Y2vn0zyybaY4p7IqTvh7dzYUjuhtqSZJz9i5KPoisL3/0pyyO9zmUhvXWlCTCndlXysOpV6+N8v7vH376ZKXA5vz4PL43pjQH3zhCzD93S96HIFuiWSpAS0vE+cheuR3RSpkIgfjDWsC5dumD74mTxZEdPDcT6yhMAhSrrex6Svm//mIVe4bche8F6WKprYaYlp4o6qZJfcwAJjy+1zUCoQ/MsxD6sbdi8FbER/4VH7o3CI6Oi8PDISKv0x8MjPRdV1yOjIvHI3QMQ0/+XsGSG46G7Sb/netW0pFcpa388ZI1PKopA1663YYD+bgww3ouBpvuaSUvnne8dYLwHA01jMNCk6LGlM49Ht5gkPP/cM3YQOWbbD1lasgyRPf8NxuTbYUy4FabE26zyK3FsTFCO6VpbQmlVHY7h7bjt5n9FWpxdp7ieoNzflt72XKe8U2JvQddf/rtDGZS0ar5t16GlvFRc9Im/Qv/u/4qf94hA17hUdI1JQre4ZHSNTfJSUsSDOenpFpuG2wcloU9EFK5cueIXaw0LCwvDjiXJoPXra+t1uCo2KvUivErH3spGHf7+pyz07P1LZM1fZ51q7YGprE7aBrqpYo/YWxn22BJMnTxFAa6JCURrQfQW1hN398NPe0xo2GZQlrC2GsQSRIOE8NpWvVgemzY8ApsWJCpLZe/rvdcvdFj1UHybHhffyUV8aiJMFXuRv/IgLDUHQHsWQmr22+PqudZC6/1mNZ01LHz1GIZMnY0Fc2drYQz5OD3U0oPZsuU0A+mF79fp8M1bOYr82Rq+lYOv38zG39XzHoSU/ru/6JCX2A27SlLw7V9y8Y2qXw090GsrqzXtd+/kYU9Jotispzjl63yPV8dvZgudP6zTY/o9fTFwzLMwr9gJw9ItUkS/dLOip2QL9Es3wrBoI6JTMnDx4nm/2GpYWNhN2E5r1pt1YkOVZh20SUSbluLNFw/ePNBuMhEp/f2NTPQM/xWy5q9XNs8rakGDvrdrf5RefZOLNucTHl1im4H4YfbmlwaSkQl1eNtrvNsMtnZWN6a17eVNnIhoWlEE3plzp5jReqPLltZpo//q+jx89ccsDE4aIjYMZdiQVodqT+bqfYid+CzmzX1JRhN0eh2Os/lGiD2QyeHiQYRebLi2USN0rJ5T4x6EtCdhSaJN9FQxPok8tHo25in5aM+5GadxT90DoU17bT1o70LUw02d2jRkr3RMDz7Pj+mHgeNmI9+6B6K1OznxvTAu3+HfTXRnAqGOSwOLSiS2juwhkRB43/wxE73CbxVLWL54hZfAJwKhGciUSVM7fWeVWQG14xOBPDKqr+jw3rapc3p6y4TO0cxmamFfO4G8lyvOO9/vyTE9zNCbMdTBiUDikuJhWLbT9gAhpQNq3toyV9cjbtIszH+ZCUS1R7Il9cGsdHlFi29hSRs7NuoFgRyqTAO9bkt2o+oWY5TTw4UndqW+xluU0c3hNV41H090atOQzZIuesX9uTF9BYHQTFmKvdreLFRXc5RNdHoL6/KlC2qz+TRsNgPRVl5GXCWQnr1pBrJOzEDkgqfMZOwEMtmngHVW5bYZyFZlBiKjbZ110Azk/qJ+eGe2xBmI04ML2ZOdQLZL7oj2WTETSOuWbv8fiO/sif6XQW9hHapMtRGIs815e6wSSHG6I4F4q9c5PfUN3xGIard2ArnUUUtYzhX39pgJpPWO6K+rTCBqJ2tfyATSumUygbj3HyomEKcnwfYSCxNI6x3RX1eZQNpHHOrsmAmkdctkAmECIQvhJazW+0nQXGUCYQKRacxMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgTCAye1SA62ICYQKRaaJMIEwgDgSiOmwhByhXyAmKBGct9MXeZl/jraq1+XCQ6dZW9QcyeeIkmf2k8+sSrn1vYOPmXXh4ZF/h9Km9X1J26751ikMpn/oDEe6WJfsDEU6kVIc8CsmYyvfA1dd4hUOlJtWlUuc3jfbVoBEAieOvXQTi5hgixh7NV79b8gdyeYN7g3drdqz1B9Kw2e7bRNb4p+Zt/5z7HFhW7rONgerXnz0NHcfQDvQHcnWzTnh8I/IQlVZDTYOqYLgTOhDIvPdsDqVMFXYi8RQ8Sqe4IK0THgkTHl+KyZMnujR4R/MPvaONm7fj4RF90bBVL9pXhrtim51YbYV0+4JAtGUleyKHUrGJ5NJ2p9cdkchCsaNaUGc0V+4Wx0QgsZNmsU904QP9hq3DqPRJBDJvYm/h857sQB1wtZ4C1XPujBfae69uVB1KpQiHUt7q0+pW43YC6QpyaSvOSxr71DwobNhm9JFDKeXhR/H0Wgfj8u3Cpe3lC37ziR7m6BN9XR6urtfhx3W5NqPQAuFunDo8+UTvFX6bxqWt4xOfNwQi0pbthqVmL+58dDGmTtJ4JFSt3Wb+oRuhGcgjI/rYOry77djS/dpO7eCR0EpULaXz9LxKIHHJ8TAs3+Y1gdhtr872MGKqoBnIQZcubUPOpDQVVqLKbKR0eY3i0vZ9PS5ZB1wieooL98PkgthN0aal+FWrR8KDFSkQD7hW/ZfWK66Stfe7m5d6P+k9Wp4E1SOh0LnBWnY1dLMeqm4RWmdL5O7Z2SMh2Znd/jyLKzrU8XQvDKXbEZuShYsXzvllsAsLC/s/2Lc8FVd3G3HtfQMathoV2aaJq+c8CbcbcOGdbJBL27zFW1Hw6hFYVh6EpeaAHLHqKnj1KJKfKsMUIhCN0fsFxU6QCe2BPDaqL37aZUDDFh0aNvtAdhjwYHEE3pt7Jxq2G+TksUUvynuNQmuZv3srG0NShiozhqo6mL0QS/VemCr3wly1zyqkbx/yVx/B4EkvYv68l22tq/qXt50IlYitP9mXsmwzkG0G/LiB/H7n4epGnViyJpJXj+mcp6IsYXXH4eo00fakk3RftS6Ni7gX+qlcDVv0OFqVjKK0rqAlLKXs9np4WnZbuvVK/Wl2/vzYvhgwdjbyVx/ymjhU4lFWYNSVmD0wlu1EdFIOLl086xfrDOsSFoYphtswd1I4Zk/ojdnjegmZM94eV895Es4Z3wuz7uuBf/v3/4uehnHoWzgNffIfQJ+CB+whxb2UvoW/xi+HmTDmvtFW4BqZSFQTagLWbdyKgpRbsWPpMOxYOAzbF96JbRJl+6Jh2FmSAGNSV8yZGomdSxOl6t/6ylChb8eSYXj7hSHo0b8Phj1WgsQny72UMiQ+WYaEJ8qQ9Bu7ruSZNeitH4M5Lz6nogixB2I7Cs2IisHS5ZV4YXR3Mcs4+3Y2fvhzFn74Sza+f1sJtcd0riXRprGlteo5/14udENvw/6SRFx4N1foJ73iPsrPGm9Jd3vOX3g3B/uXDYMl+VZQfmoaUX4J+lVsLm3Iw4y7eyFy9CwYyuqgK91qle3QlXorW6ErIX3bkbtoMwYlZODShYt+MdCw1atfRUXVGqyoXIWyipUoq6BwlfVYCemax1Jeg/LK1aisrMaqqnJFKivtcfWch+HKyjKQkO7qihXYsWOX2AMJ2adFJ7NRHx4/+eQTTJ06FdOm/RoPPPCgkGn3K6F67FF4/0M2naR73LgJmDzZMR+P9FrLSGlFme9/SCn3tF9jygPTMHbsaFD5H5w2RYo8NG0qHpx2v03XtPsfwMTxk/DOO+8IREPdnsiOtBj8/nd/wLDYcBgy+sOYFiFdTBmRIImM6IXMpP4wNctHue5t3pRHdmI/REX0cKiDKV1OnUzpkUKvOSMSQwb0Qu+B8YhMykJUQjoiEzIxICHLK4kapuiISsxC1LBsRCakY2hCMq7+eNlpJPDNYVhztdZpqjryNL/BwzO+nhEo5W5qsm/48VKWvalE55fepjSq2AcWMchQltZ8tAOOvSSexVwX3b6k4plWeyoqq+vyOubhuhx2PcEbc8ThH//4By5euoLzF7Tyo9Ox9pr78YuXruLCpYtCJ+V17qKig8ILF+XkRXrOnb+M8+cvCp3nzrtfTkcMWkt/SexNXLl4AZcvnQOF3sqPF5rruHzxUgu2LN86w1y9oic/G80g49PXIB2N3Bf16Nw6G9Wx3RpKxMsPI6tjFhLLLhrVjo2tjTXkaDvHET8jYG9n1wQvsTiOBiZRsf2hytYBZWmnMvuy3G2U08UMpI0UPr7sjpG4c6+Pi83qAwwBto0Aa5AQKk4o2V7AEUgI2RlXlRFgBBiBTo1AQBPI559/jp9++qlTA8yFl4eA9slOG5eXA2tiBNqHANufglNAEgiRxssvv4xbb70VH3zwQftalO8KegQaGxvx7rvvYvz48Rg1ahRmzJiBy5ftb5twpw56E+jwCt64cQPHjh1DZWUlqqqq8OWXX3Z4mTqyAB1OIK46fUVFBWbOnAmz2YwjR450JD6cdwAhQG/+LFy4EIcOHcI333yD+++/H0899ZTLErqyK5c38klGwA0E6uvrcdddd6G0tBTz589HfHw86BX5UP11OIGowGs7vLpslZ+fj8OHD6u3cMgICARUW9mxYwcKCwsZFUbAbwhcv37dIa8pU6agpKTE4VwoHQQMgbgC3WKxNCMQdfBwdT+fCx0EyA4eeughMSMJnVpzTQMFAVpO/eqrr6DT6bBv3z6//e8iUOqvliNgCMQVMbgiELXgHIY2Aq+//joMBgMaGhpCGwiuvd8RoFWRkSNHIjo6utkSqqtxzO8F9GOGAUMgap21DeCKQLTX1TQchgYCatu//fbbyMzMFPsgoVFzrmUgIUB7cefOncNnn32Gu+++G2VlZYFUPL+WJeAIRFv7vLw8HDx4UHuK4yGOAL2FRXtjFy5cCHEkuPqBgMCbb74pNtUDoSwdUYaAIxD1KZPAWL58Ob744ouOwIXzDEAEzpw5g1tuuUUsHzzxxBN49NFHxau8V69eFaXV2k4AFp+LFAQI0H7H7t278fXXX+PEiRPIyclBdXW1g/2Fkh0GBIG0Bnhr14LAHrkKbiBA+x30Wvf+/ftRW1uLPXv2gF6rpCUFthM3gORbPUaAbG7ChAm49957MW7cOKxduxa0oa7anxp6nEEnSxgQBNLJMOPidjACodZJOxhuzt4FAmyDCihMIC6Mg08FJgItddqWzgdmLbhUwYKAs905HwdLPVurBxNIa+jwtU6DQCh23k7TOEFSULax5g35/wFfvJQ+f30pxQAAAABJRU5ErkJggg==[/img][br][br][size=150][size=100]If your pattern continues growing in the same way, how many tiles of each color will be in the 4th diagram?[/size][/size]

[size=150][size=100]The 5th diagram?[/size][/size]

[size=150][size=100]The 10th diagram?[/size][/size]

[size=150][size=100]How many tiles of each color will be in the [math]n[/math]th diagram? [/size][/size]

[size=200][size=150][size=100]Explain your reasoning.[/size][/size][/size]

Explain what the slope means in the situation.

How can you find the slope from the graph? Explain or show your reasoning.

Find the point where the line crosses the vertical axis. What does that point tell you about the situation?

[size=150][size=100]After day 1, Lin reaches page 70, which matches the point [math](1,70)[/math] she made on her graph. After day 4, Lin reaches page 190, which does not match the point [math](4,160)[/math] she made on her graph. Lin is not sure what went wrong since she knows she followed her reading plan.[br][br]Sketch a line showing Lin's original plan on the axes.[/size][/size]

[size=150][size=100]What does the [b]vertical intercept [/b]mean in this situation? [/size][/size]

[size=150][size=100]How do the vertical intercepts of the two lines compare?[/size][/size]

[size=150][size=100]What does the slope mean in this situation? [/size][/size]

[size=150][size=100]How do the slopes of the two lines compare?[/size][/size]

[size=150][size=100][img]data:image/png;base64,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[/img][br]If this relationship is graphed with the year on the horizontal axis and the amount in dollars on the vertical axis, what is the vertical intercept?[/size][/size]

[size=150][size=100]What does it mean in this context?[/size][/size]