[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUsAAADlCAYAAADa1tW0AAAgAElEQVR4Ae2de8wdRfnHiVjEgIKIt1e5VA01JZHiPxpEIMQQISQ2WP0DDaAGIihQvCSaanhVsAYNrSEaJajVeAfkxWskCq8V8RKiJPWGCmqISCzWoGDqrfPLZ/09Zd7pnj2zZ3f2zO5+J9mzZ3dn5/Kd3c8+c9nZ/ZycFJACUkAKTFVgv6k+5EEKSAEpIAWcYKmLQApIASkQoYBgGSGSvEgBKSAFBEtdA1JACkiBCAUEywiR5EUKSAEpIFjqGpACUkAKRCggWEaIJC9SQApIAcFS14AUkAJSIEKBLGH5yU9+0l166aWVyT/33HMd/uSkgBSQAl0okBUs//rXv7rzzjvPHXfcce7kk0+emP/LL7/cHXLIIY61nBSQAlKgCwWyguVNN91UAPC2226bCMuf/vSnBUwBpWDZxSWiOKSAFECBrGBpRTIJllie69atcwCzCpZ33323i1keeeQRi1JrKSAFpEClAr2CJe2YZk1WwfLee+91/nLXXXe5j370oyv2cVywrLw2dFAKSAFPgd7AMrQ2q2Dp5a/4S0cQHUJyUkAKSIFZFegNLOnQofNncXGxWE455RTHwvY09/KXv9wdfPDB07zpuBSQAlJgogK9gaVZkramt5yF7SpHO+d+++1XLHQgyUkBKSAFZlGgN7AMM2fQDPeH21TBgeX++++vqngojralgBSIViBLWNLbPW1QOhCMGZROFXzVqlUFMA866KBoYeRRCkgBKeArkCUs/QQ2+e9XwVUVb6KkzpUCUmDQsLQquIGSNZamnBSQAlKgrgKDhiVgBJBr1651CwsLxX+2sTjlpIAUkAJ1FBgsLK0KzvjKN7/5zQUwzdKMaeusI6L8SgEpMHwFBgtLgGgD0Q2WFCf7VRUf/oWtHEqBthUYLCz9MZU+LBEQYKoq3valpPCkwLAVGCws/WILYekf038pIAWkQIwCgmWMSvIjBaTA6BUQLEd/CUgAKSAFYhQQLGNUkh8pIAVGr4Bg2bNL4He/+51bXl5esfQsC0quFOilAoJl5sVGr/3WrVuL6ej8N5HC/8wgv3HjxmIW+cyzpORJgV4qIFhmWmxYkMzfaVBkbOiWLVsckyAz0QgOP2zbmFLm/MQ/83yyX04KSIH2FMgSlkDAgOBnFStraWmpmPC37Ljv1//fp6FD5BELEegdddRRBSDrjAllfCnzfBo06+jka6b/UkAKrFQgO1hys2MhhZ/CxVICHvYdHj6XO20aN8tqX2BJHo8++ugi/1iRTZzpBTRjZpNvEpfOlQJjUCArWHKDA0GqlSEssa58CwvrExDEuD7AEqCRH/JN3tpyTJJsVqavX1vhKxwpMBYF4mjTkRoGRKAZwjJMAn4nwXLnzp3OXy688EK3Zs2aFfs4nsPXHcmHtU1O+0RGqEHsNnpirdtnhGPPkz8pIAUeVSArWFqyYmBJNXXShBh33nmn85dXv/rVbvXq1Sv2cXzesASUAAyQ+e+ymw5trrFWsdoPPfTQ0vbgNuNSWFJgiAr0EpZ0WtB+GVtdzbEa7oOyq04Y4hQwh3gbK09dKNA7WBoo6wAmN1jOA5R2MQmYpoTWUqCeAr2C5SygRI7cYEkbJVXvOsCvV6zVvn1g8l9OCkiB6Qr0BpazghIJcoIlw53omKJddp4OSNKUQZupgDnPklDcfVGgN7CkdxzIhEtMD3IusGRIFOlnnYPjAYSFi6UrJwWkQLUCWcKyOsn1j+YAS8BET7R96qJ+LtKcQS88AG86CD5N6hSqFMhHAcGyg7KgmsubOfRE5+hs4Pq82lBz1ERpkgKhAoJlqEiCbevQiR3qlCAJU4OkmQOgq/1yqlTyMFIFBMvEBW/V3NSDzptmA5DTfrl+/fqmQel8KTBIBQTLhMWKlUY75aQ3jRJGPVPQfQH7TJnTSVKgoQKCZUMBq07HSsNa61PVFrAD+D6luaoMdEwKtKWAYNmWkkE4fbXSgCSAz63XPpBXm1KgcwUEywSS9636HUpg40HnPXA+TJe2pcA8FZgZltxIfRlq0vU4S97SwTrLufd72kVnvePT/Om4FBiLAtGwxNqgDY72rPAtGoacMDwmV0ukS1jyAEGfmDeLcr7IhpKPnDVW2vqlwFRYAkD71AHtWECTff4CGBhwDSQAam6dA13Cko+F8c71EBwWsjp7hlCSykMbCkyFJdVJXoWLASDVToA6bZbzNhJeJ4yuYGmdOrla2HU0w686e+oqJv9DVmAqLGMgGQqUW1tdV7DEAs/tQRGWTd1tHpTUGHIr07r5kH8p0FSBqbC0CGjDqvqaIsfa6vAB0JPC4qZdXl6OsnQt7V3A0nqQhwgVmhVoXpCTAmNWIBqWVC2rrCaOtVH9BJLMsVgWF22j3Lgco3kAQMW41LAE7rTtDXVsoj0I2ijfmPKSHymQowJTYQkIsOS2bt1aQIz/4bJx48aiqjbJGozNODcjMKTqF8ISi41j1ixAXAAzxqWGpc3aM0Sr0vSlPGRdmhpaj1GBqbAEAFhMgCkcMmTb9IS3MR8icbGUWbGEH1pu3MBl1s6ePXucv1x22WVu7dq1K/bZ8aaFPnSr0vRBZ8q7TG/zo7UUGLICU2FpmQdiobVnx9pel8ES643Fd8Az3Mfx7du3u1tuuWXv8opXvKKwSv19/G/jU7jEz4MEfYbuZF0OvYSVvyoFomFJIF0BoQyWZWAsA2hZZlNVw82qLAN2WTr6vk/WZd9LUOlvokAtWBIRYwl5W4f2K2ujBKK0abblymBZBsYygJalIRUsSdPYhtXIuiy7wrRvDArUgqW988wNQ2cLUMNhYbUJjTJYTmqzBN7TXApYmlUZtqNOS0vfj8u67HsJKv2zKhANS+t9NmsSYBosidyH56yJsfPKYIn1WtYbDrSmuRSwBN5tPiCm5SGn43ToUf5yUmBMCkTDMgRYCEtuIB+eTUQM47KwGO8HMG1Cj3mOs+RtnbFZlX458KCwB6ft11oKDFmBWrBksLg5H5ZtV8MJb9KNiIUJTGMsSktr25alDdLuqsPL8pHTmofWWB8WOZWD0tKdAtGwJElYj3TuAAmDJVCb9MZNd9mojqltWGJV9uW7OtXKzH5UD4zZtdOZ/VSgFiwNklTB/AVw1rH0upaqTVhi1ZL3tpocutairfgob8aXVs0X0FZcCkcK5KBALVhagrEmgQXLpOqy+c1h3SYsGTKFhS3nihcCAOanP/1pd8MNN2iZkwZf+cpX3J///GddkokVmAmWidPUevBtwRLLGqsytmOp9YxkFiB6PP3pT19Ry/BrHPq/sgaWSo+DDz7YnXHGGZldHcNLTm1YMhAb64pZdqwqyk3T5qD0tmVuC5Z0aGBJyT2qwL///e+iCYZquZb5aHDdddcVD6yPf/zjjxaM/rWuQC1Y0qlBLyjAZG2w5CbhqQk0c3RtwJI88oAg73JSIDcFzjzzTPeCF7zAPfTQQ7klbTDpiYYlbZNYVUADZ73hpkSb4ywtzLbWbcByzIPQ2yoHhZNOge9///uFwXLllVemi2TkIUfDEisSQJobGyzHPAjdylzrvBV44xvf6BYWFtyvf/3rvBPa09RFwxLLkqp3mWVpHR9DrYbzoKCZwZodelrWSvbAFfj973/vDjvsMHfxxRcPPKfzyV40LEke1iSdO8yUzkB0eoWXlpaKT+Xm/DZH02o4eeNBIScFclfgqquuco95zGOKOV1zT2vf0lcLlliVgCMcAsHAZLM4cxSgCSzJF/mlzVJOCuSuwH/+8x93/PHHuw0bNuSe1N6lrxKWTH82qWpNtbwPA9IpkSawtI6dnB8GvbvqlOCkCnzuc58rHvDXX3990njGFnglLP1OHMDY11fbmsBSHTtjuyWGkV9m5jrxxBOHkZlMcjEVlja5btgbPo/000bKWEeGKQExS9u0tMwKS3XsTFNWx3NV4Lvf/W5hXV5zzTW5JrF36aqEJVVQ4MRMQywAanFxceIyqcrehiphbzzbtCXGVI9nhaU6dtooOYUxLwXe9KY3uec+97lu586d80rCoOKthCU5xZoDGlhzDEqnaj5pSdmGWWbZ0kMdE+cssATCPCjUsTOo631UmbnnnnvcU57yFLdp06ZR5TtVZqfC0iIGHkByng5g2zvotJ8C8TL3ox/9yPnL2Wef7VavXr1iH8erPoXLQwLLNaW1XJZ27ZMCbSqwefNmx0QbO3bsaDPYUYYVDUvUmTc4iB9rD4j5s7aHJbdr1y7nLxdddJFbs2bNin0cr4Il40nHPsFvqKu2+6fA7t27i3fGL7jggv4lPrMUT4Ul1mQdSGKRpYAMacCypFrMf+IAmCnaLAkfIJMXOSnQdwWuvfba4nqmNiU3uwJTYWnfxmYowrZt20rBSbsh1WM6gGjXTPFaIOkIhy4B8pg2xbptlsSlqdhmv6h0Zn4KvPCFL3Sve93r8ktYj1I0FZbkBUsrfHPHqsNYYCx0tgCZGEtvFn0AJeH7jjSlgKXGVvoq6/8QFPjEJz5R3KfMTiQ3mwJRsPSDxopkfCPgYsGKBKapHfFi7WHB8m76xo0bi+0YONexLIkH+KewjlNrpPClQJUCJ5xwgjvnnHOqvOhYhQK1YVkRVvJDQNkgjUUZA0oSVQeWWKuaNCN5USqCOSjAt5IwBLZv3z6H2PsfZa9gOavcdWBJ80LYNjprvDpPCuSmwEknneQYSidXXwHB0tOM5gWevFTF5aTAEBWwSTZuvfXWIWYvaZ4ES09equAMT5KTAkNW4NRTT3WvetWrhpzFJHmLhiXthVXjDjnWRUfPLCrEVsP1euMs6uqcvinwpS99qahB3XLLLX1L+lzTGw3Lsnez/ZQz5jHXHuQYWFoVPFfg+1rrvxRoqsBpp53mzjrrrKbBjOr8VmAJYLDK+gxL3ghSFXxU1/6oM/vlL3+5sC6/8Y1vjFqHOpmfCksb30jHR9WSM2imWZYMQSJvMQPc64grv1IgZwXOOOOMJK8m55znJmmbCksLHJAARKzHssX85bieBkvaW4GlquA5lp7SlEqBm2++ubjuv/rVr6aKYlDhRsOSXFd18OSsyjRYqgqec+kpbSkVeNnLXqaPm0UKXAuWkWFm560KlqqCZ1dcSlCHCnz+858vrMvbb7+9w1j7GVUtWFL9Zp7HSW2XfezgURW8nxeuUt2eAsxIdP7557cX4EBDioYlFhg93lRZGWZT1m4Z+65211pWWZYaiN51aSi+3BT4yEc+4latWuV+9rOf5Za0rNITDUvgmHOPd5WqVbDUQPQq5XRsDAr84x//cMccc4x729veNobszpzHWrCc9zd4yCXQ5kuTNAfETngxCZYaiD7zdaMTB6bA+973PvfUpz7V/fGPfxxYztrLTjQsGVbDfJLzrGrTvsj0aUCO9MROeDEJlqqCt3chKaR+KwAkgSXQlCtXoBKWwIiJdm3BouO7N0tLS3v32THWKUFqbaazjIWcBEuq4LHWabl82isFhqMA1XCq41TL5fZVoBKWVLsn9XyX7U/ZG441GdsM8Jvf/Mb5C98e4WPz/r7PfOYzRd5irdN9pdMeKTAsBejgoaOHDh+5fRWohOW+3ue3hxnSqTbTGw80qY7zaYky99vf/tb5i8HS34eVfOSRR5adrn1SYLQKMISIoURy+yoQDUuqwbNUgfeNcrY9wBJAWlWftb1+OS3Esmo4HyVTFXyacjo+NgUYnE6tkcHqcisViIYlVWysOlxZ1dUGdyP0JItvZdT1tuzbO/5ZZfv84/Y/hCXpJ51U7eWkgBRYqcCGDRscr0HKrVSgFizpEGEBNKx9aNJTDrxsPGbb75EDNoYL+Y5qecxMQSEsSae+C+4rqf9S4FEFmFiDe/zb3/72ozv1z9WCJYCxYTtAyr6CSPUccc3V6Yyxc2LWVLv5FC5VcGAcO5QphCU9+oBWTgpIgXIF+Gzu61//+vKDI937KOGmCIDFGAKGjhbAxTEflgRlIJ0SbK3DxEUaiJcmAd+yrQrIh6WBvW3Ltyp+HZMCfVPgmmuucQcddJC75557+pb0ZOltBEssPYBVBssQnslyEBGwD0trWwW8clJACpQr8OCDD7qFhQV3xRVXlHsY4d5oWGKRUe3dtm1bMSB9cXGx2AaY69evLyxL6y0HoLFjIrvQ3IelDT3qIl7FIQX6rMBb3vIWd+yxx7o9e/b0ORutpT0alsRIWyTAxGqkmg0U2ccQHCw2wAlEaROkEyUX58OStMd0CuWSdqVDCsxLgTvvvLO41z/72c/OKwlZxVsLltNSDjCxKHMCJWk2WAJ2YGkW8LT86LgUGLsCfAHyzDPPHLsMRf5bhWWuihos6RxK0fGUa76VLinQVIHrr7++MDDuuOOOpkH1/vxKWGKBMbaRNQtV7KolV4vNYKm3dnp/vSoDc1Dg+OOPdxdffPEcYs4ryqmwpFoNBK3Thu1JC35ydMDyOc95TvGEpCouJwWkQLwCV111lTv88MPd/fffH3/SAH1WwnIo+QWWDIPIaTjTULRVPoavwH333Ve8sXf11VcPP7MVORwNLOnFt3fbK/TQISkgBUoUuPDCC0c/G1EtWFIdtzGVWGkMRsdR/WZ/rg7L8oADDujtd89z1VXpGo8CX//614ua2Y9//OPxZDrIaS1YMo6S9kra/fhvsCRM4JlzmyWwzLUDKigTbUqB7BT473//65797Ge79773vdmlrasERcMSMPrDboCmD8twu6sMxMRjbZYxfuVHCkiBcgWoir/4xS8uPziCvbVgCRDNhXAEpD48zV8Oa2C5du3aHJKiNEiB3ipw8803Z12DTC1sNCypwvpTovmwBJJUw7ucnIK3hWLhLFimvowU/hgU2L17tzviiCPc5s2bx5DdffIYDUvO5B1wJv2197+ZEZ2FfV2+4mhwjo1TsNyn3LVDCsykAN/oCSfhnimgHp5UC5bkz97/xpJkwcLscqA31iudS7y6KFj28IpTknutwA033FDc9zt27Oh1PmZJfG1YzhJJm+cwVhJgA8pJsNy1a5fzl4suusitWbNmxT6OP/LII20mTWFJgcEr8PDDD7tnPOMZ7oMf/ODg8xpmsFewxIK1geVVsGQsmL+cffbZbvXq1Sv2cVywDC8HbUuB6QrwGemXvvSl0z0OzEctWNqgdNosypaU4yyJmx5360SqgmVYRmqzDBXRthSYXYEvfOELRVX8V7/61eyB9PDMaFgCKWbtoY3SQBWuUw76Jl46lpaXl4uFpxsL29OcYDlNIR2XAvEKwAIm1uDjgWNy0bCkB9oflN61SMDSX0gLC/umOcFymkI6LgXqKfCa17zGnX766fVO6rnvWrCMAVNXephVGxOfYBmjkvxIgXgF6GQ98MAD3QMPPBB/Us99RsPS2gxzya9gmUtJKB1jVODee+8t2i2/+MUvjib70bBEEQBFbzTthNbR0gelZFn2oZSUxr4pcNJJJzneFx+Lq4Ql1W4bfB6zjn39sGtxBcuuFVd8Y1DgXe9616jmXKiEJUOBAGDskqu1KViO4dZVHrtWAC5gRI1ljstKWHYtfqr4BMtUyircsSvwrGc9y33gAx8YhQyC5SiKWZmUAmkUYAjRWL4rLlimuYYUqhQYhQKf+tSn3BOe8AT34IMPDj6/guXgi1gZlALpFACStFveeOON6SLJJGTBMpOCUDKkQF8VOOGEE9wll1zS1+RHp1uwjJZKHqWAFChTgI+YPf/5zy87NKh9guWgilOZkQLdK/CTn/ykqIqnnHWs+1ztG6Ngua8m2iMFpEBNBRYWFtyWLVtqntUv74Jlv8pLqZUCWSrAEKJXvvKVWaatrUQJlm0pqXCkwIgV+PCHP+wYoD5k10tY1m0b0Rs8Q76ElbccFOCeZAjRHXfckUNykqShN7Bkijg+ZcGXHZngg2+Yx07cIVgmuXYUqBRYocDjH/94d/XVV6/YN6SNXsHShyP/AWaMEyxjVJIfKdBMgVNPPXXQ7Za9gWVZMWL2xzjBMkYl+ZECzRTYtGnToNst42jTTMMkZ/NZ3EnfBNq+fbv71re+tXc566yz3JFHHrl3247pU7hJikaBjlSBr33ta4Meb9lLWDJv5rp16ya2We7Zs8f5y2WXXVZMUurvs/8jva6VbSnQugJ/+ctfClh+6EMfaj3sHALsHSwNlHwwKdapGh6rlPxJgWYKPO95zxtsu2WvYDkLKCl6wbLZDaCzpUCsAq997WsH227ZG1jOCkoKWbCMvdTlTwo0U+Daa68tquK//OUvmwWU4dm9gSVflTz00EOLsZaMt7QlpjouWGZ45SlJg1Rgx44dBSyB5tBcb2A56eNpDFaf5gTLaQrpuBRoTwFmTudd8aG53sCyifCCZRP1dK4UqKfAaaedNnFYX72Q8vItWOZVHkqNFOi9AouLi0VV/P777+99XvwMCJa+GvovBaRAYwW++c1vFrBkkPqQnGA5pNJUXqRABgrs3LmzgOV73vOeDFLTXhIEy/a0VEhSQAr8vwLHHHOMYwTLkJxgOaTSVF6kQCYKnHPOOe6II47IJDXtJEOwbEdHhSIFpICnADOnMyvYv/71L29vv/8Klv0uP6VeCmSpwPe+970ClsvLy1mmb5ZECZazqKZzpIAUqFRg165d7rGPfazbvHlzpb8+HRQs+1RaSqsU6JECJ554otuwYUOPUlydVMGyWh8dlQJSYEYFmEd29erVM56d32mCZYtlsnv3bsfsSF044nn44YeTR0U8XeSpq3j++c9/dpIfCoY8/f3vfx9tGV133XVFu2VdAegU6uKaszJ66KGHopIoWEbJFOcJWHbVoE0Dehew/PnPf+7uu+++OAEa+PrTn/7k7rrrrgYhxJ0KLG+99dY4zw193X777Z3A8he/+IX7wx/+0DC1009/4IEHXJ3PUP/gBz8oYHn33XdPD9zzASy/853veHvi/9aFLJ/uFSw9fbuaSEOw9ESv+VewrCmY5z1XWP7tb39zCwsLLmYaRS87xXCjWWFJOJdeeqk777zz3NLSkh9s6X/BMpBFsAwEqbEpy7KGWIHXsVuWyHH66ae7888/P1CmerOJZWkhn3vuuYVVy3RxVeAULE2x/18LloEgNTYFyxpiBV4FS+fe+ta3umOPPTZQpnqzDVgSgwGTwfEsZeAcFSx5B/Xwww+vXA488EC3atWqSj/Twog5/uQnP9kdcsghyeMhLcRDfDHpauLnSU96kjvssMOSx0MczITfJK0x56qMqu+VKg1nKaMnPvGJ7oADDqhdrm3dR8RtsPTXhI/FeeONN46nzfJjH/uYe//731+5vOQlL3FPe9rTKv1MCyPm+BVXXOEuuOCC5PGQlje84Q2OWV1i0tXED8M/3vGOdySPZ9OmTUVbU5O0xpx75ZVXFtXCGL9N/VBG7373u5NrR83p7W9/e/J43vnOd7pLLrkkeTxtlRFpfdzjHrcXlvvvv3/x/5nPfGZxrfGVhVFZltUG/f+Oqhoeo1K5H1XDy3WJ2atqeIxK+/ppoxpOr/iaNWv2gtIAGfbmjwqWfuZ5UvjbVgyCpSlRfy1Y1tfMzhAsTYl666awBJTr1q0rZj2iZ7yMCZaiUcASQWjAvemmmwoxEOXkk08u2vJo+/IFEizt0qi/Fizra2ZnCJamRL11U1gyVMm//6tiHzwsEQJQYkkCS3+SUY7ReMuTxVyXsPzhD39o0SZdE48GpdeXmEHpXZZRF2/w5DrOsn7p/O8MYNllGQ12UDoWJRYkoGQ56qij9nk16vLLLy/aKvCL6wqWs14cOk8KSIH8Fejd645YlMAQx/+ytwNuu+22ApascYJlIYN+pIAUaKBAr2CJJclYKbMYbR3m32Bp+wVLU0JrKSAFZlWgV7DcsmVLUQWfllnaMamem+sSlrSZToK4paeNNQ+OLpxZ513ERRzEl0o/wmaiE1tiOwGa5J04UsSDRpaPcN0kvVXnEmdX110KzaryZseq8tcrWFLtpr1ymsMfvePmgOWLXvQi20y2Jk4s31SA4WLlrQMeBOjAuqwZomkGLR46yiyeU045JRnELL08DFPqR9jkxxb/GrE0tLWmqYhRGRZXW+FaOMDEwrb1cccdV+hnftpacz1Q/oRPXFx3qWBGmfjXd5vxWD7IQ+i4j+x6Z10Wb69gaRdFmFF/G0EQm3WXjguJgiaNKWHpw9GaJaqehrNqgHXuO/IFzFI5Lk67GVPpByy7cICSvHR9DRIvhkLbLgyXa8MfbdJWfITr68Y1wb3chrOwygwu7h8AafeR+Q3j7ebqCWOdcdsst6qLED8+UGaMqvZpCIxLCcuyRHUVH7py06Ry3CRAMlV+uBGIowvn33hdxGdxpIqXcqf8zU2CiR2fdV12jbV1PZBmFrvG/DRiBIQPGbsefX+9giUZxTqYdNOS6XmA0he0rcL1w5z0n4cGN0jVw2PSuXX2oztPeHvy1jk3xi/laWWaSj/ycPTRR7vFxcVi2bZtW0zSavvhhjRobd26tYgrlW5+4rju/fHG/rGm/0k/5U9+0BGrMqx5NI2D8/3rwMIjT3Zt2L4ma9LPNea7SfGGNalewZIM8gQAmOvXry8auLk4meST/Qgxb5fqZi/LV9sXUhgHeUFr2t6ATApHmfkWXyr9eKBwU3CTcxMQT4qqJPkBypSNxQVouE5TOuJIef0DY64Flo0bNybJCuknH9zPlBdwJr4QWk0iJw7K3ndl91EZQHsHSzKJeGSQTAPJeVuTvvCpbnY/Dv6Tb5YunFVh23zCk25uCEDpW15d6Uf8KQBjN7xfLlyvKcuK699/4Phxt/HfwqecWLj36GhM4XjAcA2wEG/b10MZLMvASHmF13svYZmikNoKs+3CLUtXl6C0+MsuMjs265owzVoJ1+iY2hFH29XJMp3K9rWZN/KR0mAoa7+jqSG1tYxGPND8h2lT3crKAij6bbLEUXZtCJZN1Q/OR2QKJJWbByjJi1nzqfJl4abSL2zX5UZv+0a0PBCuD1NQWiMAAAYmSURBVBJuxPBmNL9N11xrxJfSheBAS5pm2oRYWfpTWORlsCQfaGjXCGse3rZtaRMsTYmW1qludpLHxUMhMubNX9q+EbmgaM+zzhCqXF1ZEqn0QzvaEk038pPKGsNa5eZDP9r3/BuxpctsbzDoRd5SOvKDXuSFPKFhqmYFrDyLg7yFwGqazzJYEib5IV/EzXVSdm0Ilk3VD87Homi7gC0KnoAUdrj4Voz5bbomTG5CFuLrynWlX+r8UFbccIAm1fVAHiiblOGbTuSHvHA9pLjeLB40Y0l1zaHVpPQTJ3FPOi5YWilpLQWkgBSoUECwrBBHh6SAFJACpoBgaUpoLQWkgBSoUECwrBBHh6SAFJACpoBgaUpoLQWkgBSoUECwrBBHh6SAFJACpoBgaUpoLQWkgBSoUECwrBBHh6SAFJACpoBgaUpoLQWkgBSoUECwrBBHh6SAFJACpoBgaUpoLQUyUKCr1xczyGrvkiBY9q7I8klw2dRdXaaO93yZ+KCLd6O7yhcTpcS8F8272uRdrjsFBMvutO51TGUzGzEJLDftvBxpYmaaIblYWJJn8h5OUDskLXLLi2CZW4lkmB5mm8kNSkAasEyaISZDGaOSVAeWWKD4H5JlHSXSnDwJlnMSvi/RMiUX8/sx2avNBWmAAqD2n/ywDcSY/xL/nGdVRSwgtlk4Ht7gbPNdJY7bXJpVGmFVhp9SAOqEYXHz308fcRA34bMwP2OYDtLPeRy3PPt+0AMdSCdr4vQdU3yRNkDGcWDGuuwDafi1sIjTHgB+NRzd/HBC7ZgrkzTJpVdAsEyvca9jADZMjGrtk9zIBo/QCmKbm9fmI+QmNlgQBucCF8LyJ48lPMAU+imr+puYhOFXQQ00xEk8LPxnvznOoenAjrMNpMxZOnw/5MUc8TEJLnkgDI6x7cMKP+SFsM2f6cA55uxc0wq/aOdrynnss3BY+3kmLDTLzeq3PA5tLVgOrUQT5IcbtOyG9G9somU7BBznccP7DghgmZljG7j4DjAQnoHZP8Z/juHHHCCq8g+UwnQYYM36JO2hHwvf/PpxcoxwgaM5tCIdPqQ5hg4+6IjH37awONegynH/oWJx+Gvi5xy59ApI5fQa9z4GbtpYWNqNbpnmPCw13xnYbB9+rOpNtZ2FKrIPDvNr6/AYUAW4QJgqbwhZQMgxC9/WhGMADIFmcbEO02zHiMdPC1qxHTpfh/Ac82txmIZAHMuVarjtM7+2tnNsW+t0CuxbquniUsg9VaApLDnfd+ENDkiwtFiHi1l9/vns8wHlH7OqK9YeQDRXFQfWGQ7Yhmm1883StW1/7aelCpakAWf5L8ubHxZ+sVABPdAE9iE0LSw/PfqfRgHBMo2ugwo1NSyxPKdVN0NBQ6iEx4Gb354IcAxWoV/b5vgkWE6CklXPDWIxsCS+svRbHBaWpYs11qiF7Vfx7Rzfr/6nUUCwTKProELlJqWaHLrwhg+38V8GoPAGt3a/sOocxudv+yD09/v/gTCQxJll6IPG98t/8um3pYbHidOsUDvGOX47pwHNjtsaHXxYl7VZYhWXaWhhsA6Ph/H7fvW/XQUEy3b1HGRoVu3dunWrW15e3tt5Ed644TZixMASf9beSNV5aWmpqEKXAdoEDq1R0siwGs4ljaSVqri1R3Ie51j13OIIe8OBGPFyPgthmrPOFNpTicPaVf04YmFp8PbDQitfQ+JDD+JiIa0A23+ohDpYWrVuXwHBsn1NBxkiN7dZR2adse23u4XbCIFlF1pjnIPf0GFZcfNzjHV4nu+fY4DPwMHaqtp2fll1lvP8OIjTd4TDPsJgMcvU/BCmnc8xP//4IXzOCx1+y8KyoT8cI27CtjBZ23FLi2lP+PgHrj6sw3i13Z4CgmV7WiqkjhUoqxZ3nIS5RqcqeLfyC5bd6q3YWlQAKy+slrYYfNZBYWFiWZdZz1knvMeJEyx7XHhKuhSQAt0pIFh2p7VikgJSoMcKCJY9LjwlXQpIge4UECy701oxSQEp0GMFBMseF56SLgWkQHcKCJbdaa2YpIAU6LECgmWPC09JlwJSoDsFBMvutFZMUkAK9FgBwbLHhaekSwEp0J0C/weqT5/Ss2yKywAAAABJRU5ErkJggg==[/img][br]Select the best description of the range of this function.
Which statement accurately describes the domain of the function?
[size=150]The function is represented by the equation [math]C\left(n\right)=4+3n[/math]. [/size][br][br]Find a value of [math]n[/math] such that [math]C\left(n\right)=31[/math] is true. [br]
What does that value of [math]n[/math] tell you about the cafeteria meal plan?[br]
Match each description with a graph that could represent it.
[size=150]The graph [math]H[/math] shows the height, in meters, of a rocket [math]t[/math] seconds after it was launched.[/size][br][br][img]data:image/png;base64,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[/img][br][br][br]Find [math]H(0)[/math]. What does this value represent?
Describe the domain of this function.[br]
Describe the range of this function.[br]
Find [math]H(x)=0[/math]. What does this value represent?[br]