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5 Feb 2021
Consider the graph of
shown below. Find
.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAtsAAALnCAYAAABYyIt+AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsIAAA7CARUoSoAAAGSySURBVHhe7d0JfFXVuffx52RiJkCAkDCHIcwEcEBBSRTrWGs1ra2drO2t+vb2Y+1926qtba+9bW3t29rbXqtXW2snq6Z2QKuIkjggQQaDyBCmJAwJAQIkARIyvll7L9yB7BMynHP29PvS07OfnWhXT9ZJHv5Ze+1QaxvpoYKCAsnOzpaa+lp5OP9R47m9K6dfJldMy9ZVdKSnpxvP5eXlxrMTTr8OTmIMFjeMIxQKSS/eWhHBnDAxBgvz0sQYTMxLC18Pk5vG8Od1f5UNezfqs6almUvkqhmX6yp6Ij0n4/RzrwzuO0gumni+rixrytbL8VPHdQUAAACc2/aDO/WRZerIyfrIWyLSbCsXTlhgNN3tHTtZLatL1ukKAAAA6Fx59QE5fuqErkxJCUkyIWWsrrwlYs026TYAAAB6yy7VnjIiQ+JCEWtbYyqioybdBgAAQG9sP7hLH1m8uoREiWizTboNAACAnmpubZbdh8t0ZckcOUkfeU/E83jSbQAAAPREZd1haWpp0pVpSL/BMnxgiq68J+LNdth0u5R0GwAAAOHtP3lAH1mmpU7VR94UlZXmtul2Hek2AAAAwquoq9RHlqkeXkKiRKXZJt0GAABAd6jt/o6eqtaVSd1gZgrNtj3SbQAAAHTVtsod+sgybuho6ZfYV1feFLVmm3QbAAAAXeW3Lf9Oi1qzrZBuAwAAoCv8dIv29qLabJNuAwAA4FzC3aJ9/LAxuvKuqDbbCuk2AAAAOuO3W7S3F/X/B6TbAAAA6ExxZcf12pk+WEKixOSvC6TbAAAAsNPY3Cg7DtldHOntLf9Oi0mz3Vm6XUu6DQAAEFg7Du3WR5Yh/ZI9fYv29mK2ECZcul1Iug0AABBYxTb7a89Iy9RH3hezZpt0GwAAAGfbXFGsjyzTUqfoI++LWbOthEu3VcMNAACAYDl8vMroBduLC4Vk8vCJuvK+mDbb4dJttZSEdBsAACBY7G7RPqmt0VZ7bPtFKD8/v1Ufd1tRUZFkZWXpqmvqmutl2Z4VxnN781JmyZyh03XVdbm5ucZzXl6e8eyEnrwOkcYYLG4YR05OjrS9t3TlDOaEiTFYmJcmxmBiXlr4epicGMOr5W/K/pMHdCVSU1Mjl2UslplDnFuzHek5GWpto4+7raCgQLKzs3XVdSu2FcjyrSt1ZVJXnd6Vc7sM6jNQn+ma9PR047m8vNx4dkJPX4dIYgwWN4wjFApJL95aEcGcMDEGC/PSxBhMzEsLXw9TrMfQ1NIk3172Q+P5tKqqKvnRx78jowan6jOxF+k5GdNlJKexdhsAACDYdh4qOaPRVgYk9He00Y4GR5pt1m4DAAAEm9167dEDRukj/3Ck2VZItwEAAILLttnuT7MdMaTbAAAAwaQCVrXtX3tqy7/0fv5aQqI41mwrpNsAAADBY3cjmwkp4yQhLkFX/uFos026DQAAEDx2t2j3010j23O02VZItwEAAIJD7UCy/eAuXVkyabajg3QbAAAgOEqqyjps+TewzwAZnZymK39xvNlWSLcBAACCYeuB7frIMi11qj7yH1c026TbAAAAwWC35V9m6mR95D+uaLYV0m0AAAB/U73dwdrDujKp26P79eJIxTXNNuk2AACAv9ktIRk7ZLT0S+yrK/9xTbOtkG4DAAD4l90Skumj/LteW3FVs91Zun381AldAQAAwGtaWlvDbPnn3/XaiquabSVcul1Yuk5XAAAA8Jrdh0ulsblRVya1fEQtI/Ez1zXbpNsAAAD+E27LP3WBpJ+5rtlWSLcBAAD8xW699rRR/t2F5DRXNtuk2wAAAP6hQtPK2oO6smSO9Pd6bcWVzbZCug0AAOAPdqn2mCHpxm3a/c61zTbpNgAAgD8UB+yuke25ttlWSLcBAAC8TW35t61yp64sft9f+zRXN9vh0m11kxvSbQAAAPcrrSqz3fJv/NCxuvI3Vzfbil26ffTkMdJtAAAAD7Bbrz115GTfb/l3muub7fDpNmu3AQAA3M5uf+2grNdWXN9sK/bpNmu3AQAA3EwFoxU1lbqyzBiVqY/8zxPNdmfpdlyfeF0BAADATbYcKNZHlrTBqYHY8u80TzTbSrh0u++EgboCAACAmwT1rpHteabZDpdu92trtkm3AQAA3EVt+bfj4C5dWaal0my7ll26HdcvgXQbAADAZUqr9khdY72uTEkJSTIxZYKugsFTzXZn6TY7kwAAALhH8cGON7KZOmKSxAVky7/TPNVsK+HSbXYmAQAAcI9tNlv+BW29thJKS0tr1cfd1tDQIElJSbqKnQHThkj/acnGsRqDktAcJ0cLDkjLqWajjiWnXof2GIPFDeOoqKiQtveWrpzBnDAxBgvz0sQYTMxLC18PUyTHoK6nS7l6jK4sVcv3SUtd+F7NDa9DpOek55Jtpa60Vlrqz/xCqXS738QzE28AAADEXlJqX31kaa5t7LTR9qtQaxt93G0FBQWSnZ2tq9hasa1Alm9dKStWrDDqK664Qob2T5a7su+I+d6NTr4OpzEGixvGoW5B24u3VkQwJ0yMwcK8NDEGE/PSwtfDFMkx/HHts1K0731dmS6dfJFcP/tqXdlzw+sQ6TnpyWRb4a6SAAAA7qMa1eLKjhdHTh81VR8Fi2eb7XA7k6i7SrIzCQAAgDP2HtvfYcu/xPhEmTJikq6CxbPNtqLS7bPXbpNuww1GjhypjwD3+MpXvqKPAPf4yEc+oo/gF5srtukjy5QRGfooeDzdbKt0u770uK4spNtwWn5+vj4C3OO///u/9RHgHn//+9/1EfxiS0WxPrJkeuiukTNmzNBHkeGqZrupqUmef/55ufTSS43F6QsXLpSnn35aTp06pT+jI7udSYx0u4R0G84ZO3asfPnLX5Y//elP+gzgjBMnTsgvfvELmT9/vvF9ddq0afKd73xHDh06pD8DiL26ujp59NFHZc6cOca8XLp0qfHzX/UB8Laa+lqpqKnUlWV2+nR95H5f/epXjXXnjz/+uGRlZUlxcce/PHSHa5pt9X/q2WeflTvvvFMuvPBCeeWVV+Saa66Rf//3f5eHH3447BtQNdq26XYZ6TacceTIEbnnnnvkkUce0WcAZ6iG+jOf+Yz8+te/lptvvlleffVVuf32243vtbfeeqvs3btXfyYQO6rR/sY3viHf+ta35JZbbjHm5cUXX2zMyZ///OfS3By8reH85P3yrfrIMmpwaodNLdxMLW1av369/OAHP9Bnesc1zXZpaanxK061pvBHP/qRsZXf/fffbyQy6gdFUVGR/syOVLpttzPJmtL1ugKiT/0G5sUXX5SrrrqKRhuu8Oabb0phYaExH7/5zW/K5ZdfLnfffbfRbJeUlMhzzz3n+JZrCJ63335bnnrqKePn++l5+d3vflfuvfde47eBO3d23MUC3rG1suNdI2d4bBeSxMRE+clPfmLcYCcSXNNsqzefSgSvv/56SUhIMM6pXy1ddtllMnHiROOHRjgq3bbbmaSwdC3pNmImLy9PrrvuOqmpqTHepLNnz9YfAWKvpaXFaFrU8pG5c+ca5373u98Zz5MnT5ZFixbJ9u3bpb7+zB0DgGhT827JkiXGz3f1c/6f//ynxMfHG0tIN27cKIcPH9afCa9pbmmW7Qd36coyIy1TH7mf+s3KE088Yayo+NrXvqbP9o4rmm2VrOzYsUMyMjJk9OjR+qxpyJAhxg8GtV5G/eopnHD7bpNuI1bU7WV/+tOfyqpVq4y/NMbFueqSCASMmn/qV/UvvPCCpKSkGOcee+wx47mxsVGOHTtmHAOxppaLLlu2TNLT04160iRzOzj1G251i+y+fTveeRDeUHxwp9Fwt9cvsa+MHzpWV+731ltvGb9hue+++yJ2y3ZXdAMqWTlw4IBxUVm/fv30WZP6W6/6G+++ffs6TWDC7btNuo1Y+djHPib/8R//8UFjA7jNpz/9aeNZrUVUfyk8//zzO3zPBWJtypQp8vLLL8tDDz0kN910U8R3gkDsbDnQ8UJClWqrXs4LKisrjesGPv/5z8uCBQv02d5zVfSmmuqzvyDqB4FKu1Wcr34t2hnSbQAIT12AtnXrViOxueCCC4xlT4CTnnnmGenTp49cffXVRsKtrtXiL4DeZbfl3/RUbywhUX2m2n1E/Zb6s5/9bET/guCr33OTbgNAeGot7Ne//nXjWF2InpqaahwDTpk5c6axG4m6iFftjnPjjTf2eps1OGN/dYWx7V97cW0Na2bqZF2528qVK42Lx7/97W/L0KFD9dnIcH2zrdZp79+/37hositrYEm3AaCjzZs3y6c+9Smj4VYX/0yf7p09b+Ffs2bNMnYjUeu41Q4lx48fNxrvzu6vAXeyS7Uzhk801my7nbpe4IEHHjB2xIvG5gauaLbVxRCjRo0y/s+ePHlSnzWpiyfVlaFjxozp0kUTpNsAYFHfQwsKCoy1sOqCc/Vre9XgAG5xercctYxE7VCikm3VdMNbth7ouOXfdI9s+aeuYVGPL33pS0awq5aQqIe6zkXtkKNuBqa29a2qqtL/RPe4otlW/4fUBRK7d+82Uuz21BXzavuqzMzMLq/jIt0GANMbb7xhrNVWa7SffPJJGT9+vP4IEHtqowN1M5tPfOITUl1dbZw7vd2vui5LJdpd/U023ONEw0nZe+zM/k3xyv7aixcvlvz8/A4Ptf+76k//+Mc/yve+9z0ZOHCg/ie6xzWzWd09atiwYfLSSy99cLdIlcioNTTq5guXXHKJca4rSLcBQIyLIdVNQz70oQ8Zd+IdMWKE/gjgDPUbarXNr/pLoNoVR1F3jFbWrFlj3BhM7Q0/ePBg4xy8QS0hOfsGWcP6D5URA4fryt1UCJGdnd3hoRrt/v37y3nnnScLFy40LubtCdc02xMmTDDi+p/97GfGHc7UNkDf//735a677jLWcql703cH6TaAIFMJ4W9+8xujgVEpobrK/sc//vEZj6effjpid0gDukrdh0DdwOa2224ztllTd4hW8/H22283ftZ/+ctfNnYng3fYbfk3K32aPvIedX+CSHJNs62Wktxxxx3GrdnV+hi1DdC//vUvY9/Nr371qx/8mqmrSLcBBJm6k6n6Xqqom9ncc889HR6vv/66cU0MEEvqNyzqL4IqWFNzc+nSpca1BCpYUzcTYZccb2lpbZVtlTt0ZZkxyrvNtrqgPJJctShKNdRq2x/16yX164jCwkLjb749je1Jt+GUqVOnGmmN2v0BcIJqaFasWGF8Lw33ePTRR9nTGI4YMGCA8Zvrbdu2GXNxw4YNRq3Ow1t2Hd4tjc2NujIlxidKxvAJuvIedaNFRf0MVz/L1XWDveHrKxBIt+GUvLw8fQS4hwoyALepqKjQR/CizTZb/qkLI9Ue21715z//WR9Fhq+bbYV0G074+Mc/ro8A91iyZIk+AtwjPT1dH8GL7PbXnpHm3SUkysGDB/VRZPi+2SbdBgAAiLzK2kNy5ORRXZnUNXgzRnnjFu2x4vtmWyHdBgAAiKytNruQjB821hN3jYylQDTbnaXbaiN2AAAAdI/dXSO9ciObWApEs62ES7cLS9bpCgAAAF1R11gvJVVlurJMT2UJydkC02yTbgMAAERGceUOY4/t9lSvlZbMPulnC0yzrZBuAwAA9J7dln+z0qbrI7QXqGabdBsAAKB31I2ItlXarNdOYwmJnUA12wrpNgAAQM+VVO0x1my3p+4aOWVEhq7QXuCa7bDpdgnpNgAAwLlsrey4hGTqyEkSHxevK7QXys/PP3N1ezeo+8VnZWXpyhm5ubnGc3duj13XXC/L9qwwntubnzJbZg/t/l2P3PA6MAaLG8aRk5Mjbe8tXTmDOWFiDBbmpYkxmJiXFr4epq6O4R97lsuxhhpdmS4asUCmJvc+2XbD6xDpORlqVQtveqigoECys7N15YzTt3ktLy83nrtqxbYCWb51pa5Mw/oPkbty7pABSf31ma5xw+vAGCxuGIe6g1Yv3loRwZwwMQYL89LEGEzMSwtfD1NXxlBTXysPvPSQriz/ee093e6f7LjhdYj0nAzcMpLT7NZuHzl5jLXbAAAAYby3f7M+sowZkh6RRtuvAttsh1u7vaZ0HWu3AQAAbGyxvWsku5B0JrDNtkK6DQAA0DWNzY2y63CJrizTuUV7pwLdbJNuAwAAdM22yp3S3NKsK5NaPjJ26GhdwU6gm22FdBsAAODcth6wuWtkOneNPJfAN9uk2wAAAOe2uWKbPrKwXvvcAt9sK6TbAAAA4e09ur9DCKluYqNuZoPO0Wy3Id0GAAAIb4vNEhJ1e3Z1m3Z0jmZbI90GAACwZ9dsT2cJSZfQbGuk2wAAAB2pPmj/sQpdWWZzcWSX0Gy3Q7oNAABwpvfLt+ojy6jBqR16Jtij2W6HdBsAAOBM71d0bLZncCObLqPZPkv4dHutrgAAAIJB3TVy+8FdurLMSGO9dlfRbJ8lfLq9nnQbAAAEit1dI/sn9ZPxQ8fqCudCs22DdBsAAEDdyKbjEpJZadMlFArpCudCs22DdBsAAARdS2ur7XptbtHePTTbYZBuAwCAICutKpP6xlO6Mqmb2GSOnKwrdAXNdhjh0u1C0m0AABAAdqn2tNTJxm3a0XU0252wS7ePnjxmbAUIAADgZ5ts9teemTZNH6GraLY7ES7dXl3CvtsAAMC/KqorjYCxvbhQSGalzdAVuopm+xxItwEAQNBsPrBNH1kmpIyXvol9dIWuotk+B9JtAAAQNHa3aFdb/qH7aLa7gHQbAAAERU19rew7Vq4ry2y2/OsRmu0uIN0GAABBYbcLSVpyqgztP0RX6A6a7S4i3QYAAEHwfnnH9dosIek5mu0u6izdPtXSoCsAAADvUjex2Xlol64sbPnXczTb3RAu3d5e3XFSAgAAeM3Wyu3GbdrbU73PmCHpukJ30Wx3Q7h0e3tNiZw4xdptAADgbVsqOi4h4cLI3qHZ7ia7dPt44wlZU8babQAA4F0q0VbJ9tlm0Wz3Cs12N3W2dpt0GwAAeNWBukpjzXZ76iY2k4Zn6Ao9QbPdA2F3JiHdBgAAHrX3RIU+skxLnWrcph09R7PdA6TbAADAb8qO79NHFrb8671Qfn7+mZecdkNRUZFkZWXpyhm5ubnGc15envEcK3XN9bJszwrjuaamRgYPHmycn58yS2YPjf3EdMPXwg1jUNwwjpycHGl7b+nKGcwJE2OwMC9NjMHEvLTw9RCpOnVU/rz5+Q/6GUUl2rdkfFTiQ/H6TPS54WsR6TkZam2jj7utoKBAsrOzdeWM9HRzK5ry8o63FY22FdsKZPnWlVJVVSUpKSnGOXV3pa9m3yED+vQ36lhxw9fCDWNQ3DCOUNs3qF68tSKCOWFiDBbmpYkxmJiXFr4eIi9veU2eefv5D/oZJTN1svzbxZ/VVWy44WsR6TnJMpJeYO02AADwg80HuGtktNBs90Jna7dPNtTpCgAAwL1UUFhRXakrC3eNjAya7V5S6Xa/+L66MqlJW1i6VlcAAADutal8qz6yjB06usNv79EzNNu9pCZiZvIkXVlItwEAgBe8X9Gx2Z5Fqh0xNNsRMDU5w3btNuk2AABwM3UTm5KqMl1ZuGtk5NBsR4BaRsLabQAA4DXvV2zpsPOG2lktddBIXaG3aLYjJNzOJKTbAADArTZXdNyFZM7omfoIkUCzHSHsTAIAALykuaVZtlXu1JVl5ijWa0cSzXYEkW4DAACv2H5wlzQ2N+rK1D+pn0xMGacrRALNdgSFS7cLS9eTbgMAAFfZVL5FH1nU3trqDoqIHJrtCLNLt4+cOEq6DQAAXENdFGm/5R+7kEQazXaEkW4DAAC3Kzuyt0NfEheKk2mpU3SFSKHZjgLSbQAA4GabD3TchWR0/1ESHxevK0QKzXYUkG4DAAA3K9r3vj6yjBswWh8hkmi2o4R0GwAAuNHB2sPGbmntqYsixw5I1xUiiWY7Ski3AQCAG22xWUKitvvrE5+kK0QSzXYUkW4DAAC3eW+/3ZZ/7EISLTTbUUS6DQAA3KS2/rjsObpPV5Y56TP0ESKNZjvKwqbbJaTbAAAgtjbu73hh5OghaTK0/xBdIdJotqMsbLpdRroNAABiy+6ukdzIJrpotmOAdBsAADjtZMNJ2V1VpivLnNEz9RGigWY7Bki3AQCA094r32Lcpr29EQOHS+qgEbpCNNBsxwjpNgAAcNLGfZv1kYVUO/potmOEdBsAADjlVNMp2XV4t64s7EISfTTbMUS6DQAAnKAujGw5awmJ2oFE7USC6KLZjiHSbQAA4ISN+22WkJBqxwTNdoyRbgMAgFhqbG6S7Qd36coyezTNdizQbMcY6TYAAIilzRVbpbmlWVemQX0HyvihY3WFaKLZdkC4dHtN6TpdAQAARIbdEpLZ6TMkFArpCtFEs+2AcOn26rZmm3QbAABEilpCsq1yu64sqtlGbNBsO4R0GwAARJtqtFXD3V6fhD4yafhEXSHaQvn5+WfuA9MNRUVFkpWVpStn5ObmGs95eXnGsxN6+jpsPLJFio6c+audgYkD5LoxS6VPfJI+0zVu+Fq4YQyKG8aRk5Mjbe8tXTmDOWFiDBbmpYkxmJiXFj9/Pd44sEZKju/RlWny4AmyaGTH37AzL02RnpOh1rPv29kNBQUFkp2drStnpKenG8/l5eXGsxN6+jrU1NfKw/mPGs/tXTvzCsmZeomuusYNXws3jEFxwzjUOrhevLUigjlhYgwW5qWJMZiYlxa/fj3URZHfefFB44Y27X3hok/L9FFTdWVhXpoiPSdZRuKgztdun9QVAABA9xUf3Nmh0U6MT5CpIyfpCrFAs+2w8Gu31+sKAACg+9RdI882K226xMfF6wqxQLPtMNJtAAAQaerW7JsrinVlYReS2KPZdgHSbQAAEEk7D+3uENqpRHv6qExdIVZotl2AdBsAAESS3RKS6alTjTXbiC2abZcIl24Xkm4DAIBuUDtp2N41cjRLSJxAs+0S4dLtQtJtAADQDSVVezr0DnGhkMxKm6YrxBLNtouQbgMAgN6yW0IyZeQk486RiD2abRch3QYAAL1VtH+TPrKwC4lzaLZdhnQbAAD01J6j+6S2/riuTOqOiHNoth1Ds+0yYdPtEtJtAADQObslJBNTxkv/pP66QqzRbLuQbbp9knQbAAB0rmjf+/rIQqrtLJptF+os3a5rrNMVAACApbz6gBw9eUxXlrmjZ+kjOIFm26XCpdur2xpuAACAs9ktIRk3dIwM6jtQV3ACzbZLkW4DAIDueM/uRjYsIXEczbaLkW4DAICuOHT8sFTWHtKVJWsMS0icRrPtYqTbAACgK+xS7bTBqTK0/xBdwSk02y5Hug0AAM7lPZv12nNGz9RHcBLNtsuRbgMAgM6oHUj2H6vQlWXOaNZruwHNtgeQbgMAgHA27u+4t7ZaPpI6aKSu4CSabQ8Il26vKV1Pug0AQMBttFmvPW/MHH0Ep9Fse4Rdul114gjpNgAAAXasrkb2Ht2vK8tc1mu7Bs22R5BuAwCAs23Yu1EfWVIGDJPRQ9J0BafRbHsI6TYAAGjPbr32/LEsIXETmm0P6Szdbmhp0BUAAAgCFbjZ7UJy3rgsfQQ3oNn2mHDpdnH1bl0BAIAgeHffJn1kGTU41VhGAveg2faYcOn2jpoS1m4DABAgdktIuD27+9Bse5Bdul3beJy12wAABIT6rXZFdaWuLPPGzNZHcAuabQ/qbO026TYAAP633mYXErUDCUtI3Idm26PYmQQAgOBav6djs501mlTbjWi2PYp0GwCAYDpQU2kEbGebx5Z/rhTKz89v1cfdVlRUJFlZzm4vk5ubazzn5eUZz05w6nWoa66XZXtWGM81NTUyePBg4/z8lNkye+g04ziW3DAfFDeMIycnR9reW7pyhhteB8Zgcst7g3lpYgwm5qXFa1+Pd6vel/eObtWVaXifYXLt2Mt11TPMS1Ok52SotY0+7raCggLJzs7WlTPS09ON5/LycuPZCU6+Diu2FcjyrSulqqpKUlJSjHNqvdZXc26Xfon9jDpW3DAfFDeMIxQKSS/eWhHhhteBMZjc8t5gXpoYg4l5afHa1+NHrzzcIdn+yJyr5ZJJF+mqZ5iXpkjPSZaReBxrtwEACA51E5uzG23VHLILiXvRbHsca7cBAAiOjfs36yNLRsp4GdhnoK7gNjTbPqDS7X7xfXVlIt0GAMB/Nuwt0keWuaO5kY2b0Wz7gEq3M5Mn6cpCug0AgH/sO1Yux+pqdGWKU0tIxrKExM1otn1ianIGa7cBAPAxu9uzTx6REfMNEdA9NNs+oZaRsHYbAAD/enfve/rIksWFka5Hs+0j4XYmKWxruAEAgHftObrPdgnJ7PTpuoJb0Wz7SLidSQpL1kldA+k2AABetXFfxyUkmalTWELiATTbPhM23S4j3QYAwKvWs4TEs2i2fYZ0GwAAfymt2iPHTx3XlSk+Ll5mpU3TFdyMZtuHSLcBAPAPuxvZTE+dKn0S+ugKbkaz7UOk2wAA+ENra6u8u2+TriwsIfEOmm2fIt0GAMD7SmyWkCTGJ8hMlpB4Bs22T5FuAwDgfRv3d0y1Z4zKNBpueAPNto+RbgMA4F1qCcnG/Vt0ZckaM0cfwQtotn2MdBsAAO/adbikwxISdVHkjFFTdQUvoNn2OdJtAAC8yW4Xklnp04xt/+AdNNs+Fz7dXku6DQCAS7W0tkqRzV0j546epY/gFTTbAWCfbh8l3QYAwKV2HtotdY1nhmJqCUnmyMm6glfQbAcA6TYAAN7yns0SkrmjZ7KExINotgOCdBsAAG9obmmWDXvf05Vl3lhuZONFNNsBQboNAIA3bDmwXRqaG3RlGthngEwanqEreAnNdoCQbgMA4H4b9m7URxZ1e/a4UEhX8BLXNtuVlZVyww03yKpVq/QZ9FZn6XZ9Y72uAACAU1SiveVAsa4s88dyIxuvcmWzXVZWJnfeeaf84x//0GcQKeHS7dWl63QFAACc8u7eTcaa7faGDxwm44aO0RW8xlXN9okTJ+TJJ5+UK6+8Uv72t7/ps4gk0m0AANzL9sJIbs/uaa5qtn/2s5/JbbfdJsOHD5ef/vSn+iwijXQbAAD3OVZXLburSnVlWTA2Sx/Bi1zVbA8YMEB+97vfyfLly2XhwoX6LCKts3S7jnQbAABHqCUkra2tujKNHTraWEYC73JVs/21r31NPve5zxlNN6Ir7M4kpNsAADjCbhcSlpB4nysvkET0kW4DAOAexxpqpKKmUlemUCjELiQ+QLMdYKTbAAC4w66ajmu1p4zIMG5mA29Tu6OfuTgoCm699VZ58MEHZefOnbJ48WJ91vTAAw/IvffeK7/97W/l9ttvl4997GPGhZJq+z/1uW+99ZaMHz/eWGLy3HPP6X8KkTJ8XpqkzBulK1Nj7Skp/UextDScufUQAACIjkk3z5KEAYm6Mh14s0yqdxzRFbwqTi3E7+kjPz/f9vzZD7WdX2pqqv6f7CghIUG+9KUvGZ/77LPPypgxZ+4lqWp1/ux/r3qkpaUZD7uPxerR1dchmo+ejmHX28VyS+4n5brrrvvg8dFP3iSvbiqw/fzOHm54HdTDDeNQ7M7H8uHleRnJB2OwHsxL88EYzAfz0no4/VrsOlQilyy99IyfxR+5/iNycGuF7edH68G8NB+RnpMxXUayaNGiDgO4//779UfhhHBrt9eUrWPtNgAAMWC3t/astOmSFJ+kK3gZa7Zhu3b78PEjUljC2m0AAKJJ3S3Srtnmwkj/oNkG6TYAAA7ZcmC7NDQ36MrUL7GfTEudoit4Hc02DKTbAADEnt3e2nNHz5T4uHhdwetc22yfXt+tnhF9pNsAAMSWSrS3HCjWlYUlJP5Cso0PkG4DABA76vbsas12e0P6JcvElPG6gh/QbOMDpNsAAMSO3YWR88bONu4cCf+g2cYZSLcBAIi+Y3XVsruq410j54+dq4/gFzTbOAPpNgAA0aeWkKhr09pLHTRC0gaHvwkgvIlmGx2QbgMAEF12u5AsGEeq7Uc02+iAdBsAgOiprD0kFTWVurKwhMSfaLZhi3QbAIDoWL+nSB9ZRvZNMXYigf/QbMMW6TYAAJGn1mnb7UKSMYjt/vyKZhthkW4DABBZJVVlxk4k7cWFQjJx0FhdwW9othEW6TYAAJFll2pPS50qSXFJuoLf0GyjU6TbAABEhrpbpP2NbLg9u5/RbKNTpNsAAETGlgPbpaG5QVempPgkmZU2XVfwI5ptnFO4dHtN6XpdAQCAc7HbW3t2+nRJjE/QFfyIZhvnFC7dLixdS7oNAEAXNDQ1yLbK7bqysLe2/9Fso0tItwEA6LkN+96TxuYmXZkG9hkgmamTdQW/otlGl5BuAwDQc++UbtBHlvlcGBkINNvoMtJtAAC678jJo7Ln6D5dWRZO6BhiwX9ottFlpNsAAHSf3Xa5o5PTZOSg4bqCn9Fso1tItwEA6Dp1e/Z1e4p0ZTl//Dx9BL+j2Ua3hE23S9ZKQ0ujrgAAgLL94C6pqa/VlSk+Ll4WjMvSFfyOZhvdZptunzgi26t36woAAChr97yrjywzRk2Vfol9dQW/o9lGt4VLt3fU7GbtNgAAmtpbe3PFVl1ZzhvHEpIgodlGj9il2zWNx1m7DQCAtmGv/d7aM9IydYUgoNlGj3S2dpt0GwAA+yUkC8bOlVDbHwQHzTZ6LNzabdJtAEDQqb21y47s1ZXlwgnn6SMEBc02eox0GwAAe4UlHYOn0UPYWzuIQvn5+a36uNuKiookK8vZrWtyc3ON57y8POPZCW54HZwaQ11zvSzbs8J4rqmpkcGDBxvnF6TMkVlDnVmT5oavR05OjrS9t3TljCDPy/YYg4V5aWIMJualJdKvhdpbO6/sRTnZVKfPmC4cMU+mJU/W1ZmYEyY3jCHSczLUNiF63GwXFBRIdna2rpyRnp5uPJeXlxvPTnDD6+DkGFZsK5DlW1dKVVWVpKSkGOeGDxgmd+Xc4cjWRm74eoRCIeObrZOCPi9PYwwW5qWJMZiYl5ZIvxbbD+6U/131e12Z1N7a37vmm2F/LjInTG4YQ6TnJMtI0Gus3QYAwLK2rOMdI2eMymRv7YCi2UavdbZ2u77plK4AAPA/tbf2+xVbdGXh9uzBRbONiFDpdr/4M//GrtLtwpJ1ugIAwP827LPfW3v6qKm6QtDQbCMiVLqdmTxJVxbSbQBAkKzb03EJyYJxWeytHWA024iYqckZtmu3SbcBAEGg9tYurdqjK8uF4xfoIwQRzTYiRi0jYe02ACCo1pRu0EeWMUPS2Vs74Gi2EVHhdiZRDTcAAH6ltopbW9ax2ebCSNBsI6LC70yyjnQbAOBbOw7tlpr6Wl2Z1N7a88fO1RWCimYbEUe6DQAIGrsLI9lbGwrNNiIuXLqtbnJDug0A8Bu1t/am8s26srCEBArNNqLCLt0+dLyKdBsA4Dvv7tvE3toIi2YbUUG6DQAIirVl7+ojy4Kx7K0NE802ooZ0GwDgd8be2kds9tZu+xkIKDTbiBrSbQCA36mfaWcbO3Q0e2vjAzTbiCrSbQCAX5l7a3dcQnLeOC6MhIVmG1FFug0A8Ksdh3aF2Vt7jq4Amm3EAOk2AMCPCm2WkMxKm8be2jgDzTaijnQbAOA3JxpOyuaKbbqyXDCeCyNxJpptxATpNgDAT94p3SDNLc26Mqmfc1NHTtIVYKLZRkyQbgMA/OTtknf0kUX9nAuF2FsbZ6LZRsyQbgMA/GDnod1y9OQxXZnUDWzYWxt2aLYRM52m242k2wAAb7C7MFLdmv3sQAlQaLYRU2HT7VLSbQCA+9U11sum8i26spBqIxyabcQU6TYAwMvUTWzOvjByQFJ/mZGWqSvgTDTbiDnSbQCAV9ldGHnhhPOMNduAHZptxBzpNgDAi0qP7JHDx6t0ZVK7j1w08TxdAR3RbMMRpNsAAK8pLFmnjyyThk+Qof2H6AroiGYbjiDdBgB4ibowsmjf+7qyqCUkQGdotuGYcOn2mrKOyQEAAE7asPc9aWpp0pWpX2JfmZM+Q1eAPZptOCZcuq1+TUe6DQBwE7tljuePnyfxcfG6AuzRbMNRpNsAALfbc3SfVFRX6spiFxgBZwvl5+e36uNuKyoqkqysLF05Izc313jOy8sznp3ghtfBy2PYeGSLFB3ZrCvT4MSBct3YKyQxLkGf6To3vBY5OTnS9t7SlTOYlybGYGFemhiDiXlpOddrsfrQetlevVtXphF9U+SaMZfpqveYEyY3jCHSczLU2kYfd1tBQYFkZ2fryhnp6enGc3l5ufHsBDe8Dl4eQ019rTyc/6jx3N6HZ18pSyYv0lXXueG1UFtB9eKtFRHMSxNjsDAvTYzBxLy0dPZaNDQ1yPde+onx3N4nFnxUzhs3T1e9x5wwuWEMkZ6TLCOB41i7DQBwK3Vh5NmNdlJCkmSNma0roHM023AF1m4DANxoTdl6fWRZMHauJPRgmSOCiWYbrkC6DQBwG3VR5N6j+3VlWcje2ugGmm24Buk2AMBNVtts95eWnCqjh6TpCjg3mm24Buk2AMAt1A1s1u0p0pXlogls94fuodmGq5BuAwDc4N29mzpcGKnWaZ83zvntEuEtNNtwFdJtAIAbFJZ2DHnUDiRqJxKgO2i24Tqk2wAAJx1u+5lTdmSvriwLJy7QR0DX0WzDdUi3AQBOemv3Gn1kGTFwuEwYNk5XQNfRbMOVSLcBAE5Zb3Nh5MUZXBiJnqHZhiuRbgMAnLBuz7tS11ivK1N8XHxEb82OYKHZhmuRbgMAYm11Sce9teekz5B+iX11BXQPzTZcq7N0+9RZ2zEBANBblbUHpezIPl1Z7H4WAV1Fsw1XC5duF9okDwAA9MbrO97WR5aUAcMkY/gEXQHdR7MNVwubbpeSbgMAIkddD7Rh73u6slw6+WJ9BPQMzTZcj3QbABBta/dsMG7R3l5ifKJcMJ4LI9E7NNtwPdJtAEC0vbWr497a57c12qrhBnqDZhueQLoNAIiWirqDUnXiiK4sizIu0EdAz9FswxPCpdurSbcBAL1UXL1LH1kyho+X1EEjdQX0HM02PMMu3T5Mug0A6IXa+uOy5/h+XVkumkiqjcig2YZnhF27XbaedBsA0CPqJjatbX/a65/UT+aOnqkroHdotuEptmu3aw+TbgMAuk012atLO/78UMFOXIgWCZHBTIKnkG4DACLl/fKtxjKS9kJtfxZnLNQV0Hs02/Ac0m0AQCSs2t1xu7+ZadNkUN+BugJ6j2YbnkO6DQDoLbXV385DJbqyLJrEhZGILJpteBLpNgCgN+xuYpMyYJhMHp6hKyAyaLbhSZ2l241n3W4XAID21G3Z1e3Zz7Yo40IJhUK6AiKDZhueFS7d3lGzW1cAAHS0fs9GqW88pStTQlyCXDB+vq6AyKHZhmeFS7eL25rtU01nfhMFAOC0N3au1keW+WPnSN/EProCIodmG55ml27XNNRKYck6XQEAYCk7sk8qaw/qyrJkysX6CIgsmm14Wmdrt0m3AQBnW13yjj6yjOg7TFIHjdQVEFk02/C88DuTkG4DACxqnXbRvvd1ZclMnqyPgMgL5efnt+rjbisqKpKsrCxdOSM3N9d4zsvLM56d4IbXIehj2HhkixQd2Wwc19TUyODBg2Vw0iC5bszlkhiXaJyPpZycHGl7b+nKGcxLE2OwMC9NjMEUxHm5+VixrDv8nq5MfeKTZGr1WJmf5ezFkcwJkxvGEOk5GWpto4+7raCgQLKzs3XljPT0dOO5vLzceHaCG16HoI+hpr5WHs5/1HiuqqqSlJQU4/yHZ10pS6YsMo5jSW0d1Yu3VkQwL02MwcK8NDEGU9Dmpfrf+MHyn8mxump9xpQ9ZbEMPJzE16MNYzBFek6yjAS+wNptAEBnth/c1aHRVk3V4kkX6gqIDppt+AZrtwEA4bxtc2Hk9NSpMqRfsq6A6KDZhm+QbgMA7FSdOCpbKop1ZVk48Tx9BEQPzTZ8RaXb/eL76spEug0AwbZqd6G0tv1pb1j/oTJjVKaugOih2YavqHQ7M3mSriyFpaTbABBE6nv/apvA5eKMjr8JBaKBZhu+MzU5o+Pa7eOHZU1bww0ACBYVtjQ2N+rKlBifaLvsEIgGmm34jlpGYvdNVCUbpNsAEBxq6cibO1frynL+uHnSJ6GProDootmGL9nuTEK6DQCBsmn/Ftvt/py4/wKCi2YbvhRuZxLSbQAIjjd2dUy11XZ/KQOG6gqIPppt+BbpNgAEV3n1ASmt2qMry+JJC/UREBs02/At0m0ACK787W/qI8vIQcNl6siOO1YB0USzDV8j3QaA4FHrtIv2va8rS/aUxfoIiB2abfga6TYABM+q3Ws63MSmf1J/mT92jq6A2KHZhu+RbgNAcKg9td/evVZXlkUZF0hCXIKugNih2YbvkW4DQHC8U/Zuh+/tcaG4tmb7Ql0BsUWzjUAg3QYA/2ttbZU3dq7SlWXemNkysM8AXQGxRbONQCDdBgD/21q5XapOHNWVhZvYwEk02wgM0m0A8Lc3bG7NPmn4BElPHqUrIPZothEYpNsA4F/qJjY7D+3WlWXxpIv0EeAMmm0ECuk2APiTXao9pF+yzEqfpivAGTTbCBTSbQDwn+OnTsiGvRt1Zbl08sUSavsDOIlmG4FDug0A/qJuYtPS2qIrU5+EPm3f7+frCnAOzTYCp7N0u6G5QVcAAC9oamlqa7bf0ZVFNdqq4QacRrONQAqXbhe2NdwAAO9Yv2ejnGw4qSuTWjqilpAAbkCzjUAi3QYAf3jd5iY2M9OmGRdHAm5As43AIt0GAG/bfnCnHKw9rCvLJZPZ7g/uQbONwCLdBgBvy9/eMdVWN7BRN7IB3IJmG4FGug0A3rT/WIXsOLRLVxbWasNtaLYRaKTbAOBN+Tve0kcW9T19/tg5ugLcgWYbgUe6DQDeUlNfKxv3va8ry5LJF0tciNYG7sKMROCFS7cLS9eTbgOAC63c/qa0tv1pT+2pfXHGhboC3COUn59/5mzthqKiIsnKytKVM3Jzc43nvLw849kJbngdGIOlJ+Ooa66XZXtWGM/tnT98rswYMlVXXZeTkyNt7y1dOYM5YWIMFualiTGYvDovG1oa5LnSF6SppVmfMc0ZNl3mDZulq+7h62FiDKZIf68MtbbRx91WUFAg2dnZunJGenq68VxeXm48O8ENrwNjsPR0HCu2FcjyrSt1ZRo5aIR8Ned2SYpP0me6JhQKSS/eWhHBnDAxBgvz0sQYTF6dl3bfq+Pj4uX+q/6vDOwzQJ/pHr4eJsZgivT3SpaRAJrd2u2DtYdYuw0ALtHc0ixv7FytK4v6/t3TRhuINpptQOt07XYTa7cBwGlrytZLXWOdrkzq1uw5UxbrCnAfmm2gnbDpdinpNgA4SV0Qmb+943Z/WWNmydD+Q3QFuA/NNtAO6TYAuNN7+7fI0ZPHdGW5PPNSfQS4E802cBbSbQBwn1eLC/SRZerIyTJqcKquAHei2QbOQroNAO6y81CJVFRX6spy2VTWasP9aLYBG+HS7dWk2wAQc/k73tRHlrFDR8vkERm6AtyLZhuwES7dXkO6DQAxpRLt4sqdurJcNvUSfQS4G802EAbpNgA4r2Bnxx1I1O4js9Km6wpwN5ptIAzSbQBwVk19rby7d5OuLEszlxh3+QO8gGYb6ATpNgA4p2DHW9LS2qIrk7pT5HnjsnQFuB/NNtCJ8On2OtJtAIgidafI1SVrdWVZMnmRxMfF6wpwP5pt4Bzs0+3DpNsAEEVv714rjc1NujL1SegjF2d0DEAAN6PZBs6BdBsAYqu5pVne3LVaV5ZFGRcYDTfgJTTbQBeQbgNA7Gyr3CHHT53QleXSyRfrI8A7aLaBLiDdBoDYeeH9V/SRZeGE84yLIwGvodkGuihcul1Ytl5XAIDe2rB3oxw6flhXluwp3Jod3kSzDXRRuHS7sGQt6TYAREBr25/lW/N1ZTlv3DwZPnCYrgBvodkGuoF0GwCiZ+O+96XqxBFdmUJtf66YtkRXgPfQbAPdQLoNANHR2toqL215TVeWuWNmScoAUm14F8020E2k2wAQee+Vb+mYaodCcvWMy3UFeBPNNtBNpNsAEFkq1X5l60pdWWalTSfVhufRbAM9QLoNAJHzfsVWqaw9pCvLVaTa8AFXNdsnTpyQX/ziFzJ//nzjV0fTpk2T73znO3LoUMc3IOAk0m0AiJyXbdZqzxiVKamDRugK8C7XNNuqof7MZz4jv/71r+Xmm2+WV199VW6//XZ59tln5dZbb5W9e/fqzwTcgXQbAHpv4Lhk21T7yhmX6SPA21zTbL/55ptSWFgojzzyiHzzm9+Uyy+/XO6++26j2S4pKZHnnnvOWNMFuEVn6XZcAiu0AKArhs9L00eWzNTJMjq543nAi1zREbS0tMjOnTuN5SNz587VZ02TJ0+WRYsWyfbt26W+vl6fBdwhXLqdnDlcVwCAcLYe2C59UvrpyvKhaTn6CPA+VzTbcXFx8o1vfENeeOEFSUlJ0WdNjY2NcuzYMV0B7hIu3R4yLYW12wBwDnZrtSePyJDxw8bqCvA+1/+ue/369bJq1So5//zzpV+/jn/7BZxml24nJfeVwlLWbgNAONsqd8j+6gpdWZZmXqqPAH9wdbO9detWue++++SCCy6Q6667Tp8F3CXs2u1SdiYBgHBe2vyqPrKoRFsl24CfuLbZLisrk69//evG8Y9+9CNJTU01jgE3CrszCek2AHSw/eBO21Sbtdrwo1DbI+pbfKit+x588EHjIsjFixfrs6YHHnhA7r33Xlm2bJkMGDDA2IVk27ZtxrZ/TU1N8sQTTxj7bav13GqXEnWhJOBG6or6lHmjdGVqqK6Xsn8US0tTiz4DABh33VTpN3KArkynquqk9B/bdAX4R5zaTq+nj/z8fNvzZz+efPLJTpPphIQE+ehHPypXXHGFsQXgTTfdJEOGDJFnnnlGZs2aZXz8hhtukOLi4g7/7rS0NONx9vlYPrr6OkTzwRish1Pj2PV2sdyS+8kPljyp5xs/lSv5W9+y/fxoP5gT5oMxWA/F7nwsH3w9zEeQx7D94C752G03G98j23+/fOHXf7P9/Fg8mBPmgzGYD8XufE8fMV1GorbwO3sA999/v/6oyBtvvGGk4GqNtmrQx48frz8CuF9na7cbmxt1BQDBZrdWW90pcmbaNF0B/uKaNdvqYki1TORDH/qQPPzwwzJiBLdohfeEW7u9umSdrgAguHYdLpE9R/fpynLldO4WCf9yRbN96tQp+c1vfiNr1qwx9tx+/PHH5cc//vEZj6effloaGtjZAe5Gug0A4dkFDw3H6mXO6Jm6AvzHFc12TU2NbNy40Th+7LHH5J577unweP3116W5udn4HMDNVLrddPLMxpp0G0DQlVTtkaJ9m3RlqSo6oI8Af3JFs62WjKxYsaLDeu72j0cffZSb2sATVLpdXVylKwvpNoAge/H9V/SRZeSg4VKz+6iuAH9yzZptwE+OFR9m7TYAaFsOFEvpkT26slwz8wp9BPgXzTYQBWoZCWu3AcD00paOO5CMHTpaZqVN1xXgXzTbQJSwMwkAiLy7b5NUVFfqykKqjaCg2QaiJNzOJGvK1pFuAwiEltZW2321J6aMkykjMnQF+BvNNhBFdul2Zc0h0m0AgfBO6Xo5crLjBZDXz75aHwH+R7MNRBHpNoCgamxukpe3rtSVRa3TVuu1gaCg2QaijHQbQBC9vXuNHD91XFemUNufa2exVhvBQrMNRBnpNoCgaWhqkNe2v6kry4Jxc2XEwOG6AoKBZhuIAdJtAEGSv+MtOdlwUlem+Lh4uWrG5boCgoNmG4gB0m0AQaGa7Nd3vq0ry8IJC2RIv2RdAcFBsw3ECOk2gCB4tfh1YxlJe4nxCXLFtGxdAcFCsw3ECOk2AL87Vlctq3a/oyvLJZMuloF9BuoKCBaabSCGSLcB+NkrW/OluaVZV6Z+iX0lZ+piXQHBQ7MNxFDYdLuUdBuAt6mb16zb866uLKrRVg03EFQ020CM2abbtaTbALztxfdfMW7P3p5aOqKWkABBRrMNxBjpNgC/qaiulI37N+vKoi6KVBdHAkFGsw04gHQbgJ8U7HhLH1mG9h8iizIu0BUQXDTbgANItwH4RemRPbJ+70ZdWa6azg1sAIVmG3AI6TYAP/jHey/pI0tacqpxa3YANNuAY0i3AXjdu/vek71H9+vKcsOca/QRAJptwEGk2wC8qrG5SZZtWq4ry4xRmTJp+ERdAaDZBhxEug3Aq97ctVpq6mt1ZYoLheT62VfpCoBCsw04LFy6XVi6XlcA4C4nG07Kyu1v6Mpy4YTzZPjAFF0BUGi2AYeFS7cLS9ZKA+k2ABd6ectKqW88pStTYnyiXD2DHUiAs9FsAy4QLt1eQ7oNwGUOH6+SwtK1urJcMW2J9E/qrysAp9FsAy5Aug3AK/656eUOt2VX38O4LTtgL5Sfn3/mO6YbioqKJCsrS1fOyM3NNZ7z8vKMZye44XVgDBY3jCMnJ0fa3lu66pq65npZtmeF8dze+cOzZMaQKbrqOuaEiTFYejIvI42vh8mrYzhQd1CW739dV5ZLUi+UjEHjdNU9zEsTYzC5YQyRnpOh1jb6uNsKCgokOztbV85IT083nsvLy41nJ7jhdWAMFjeMIxQKSU/eWiu2FcjyrSt1ZUodNELuyrlDkuIT9ZmuYU6YGIOlp/Mykvh6mLw6hode/ZVU1h7UlWn0kDS5O+dOXXUf89LEGExuGEOk5yTLSAAXCb92m323AThr3Z6iDo22cuPc6/QRADs024CLhF+7vY612wAco25g86/NK3RlmZk2TcYPG6srAHZotgGXId0G4DZv7Hzb9gY2H551pa4AhEOzDbgM6TYANzl+6oS8WtzxosiLJl7ADWyALqDZBlyIdBuAW7y89TVpPOsv+n0T+8iV03N0BaAzNNuAC5FuA3CD3YdLje87Z1uayQ1sgK6i2QZcinQbgJPUjWvyiv6pK4v6vnTJpIt0BeBcaLYBlyLdBuCkN3etloO1h3VluX72VRIfF68rAOdCsw24GOk2ACeonUeWbznzBlvKiIHDJWvMbF0B6AqabcDFSLcBOOGfm15u+x7ToCuLSrUBdA/NNuBypNsAYqn0yB4p2rdJVxZ1A5vpo6bqCkBX0WwDLtdZut3Y0qQrAOg9dVHksxv+ritLQlyCfJTbsgM9QrMNeEC4dLuwZK2uAKD3wl0UeXnmpTKk32BdAegOmm3AA0i3AUSbuijyla35urKoJjtn6mJdAegumm3AI0i3AUTTsk3L5VTTKV1Zbsq63lhGAqBnaLYBjyDdBhAt6qLId/e9pysLF0UCvUezDXgI6TaASOOiSCC6aLYBD+k03W4m3QbQfVwUCUQXzTbgMWHT7VLSbQDdw0WRQPTRbAMeEy7dXlO6nnQbQLdwUSQQfTTbgAfZpdsHag6SbgPosoP1h7koEogBmm3Ag0i3AfSGuijy7YPrdGXhokgg8mi2AY8i3QbQU+v3FEl1Q62uLFwUCUQezTbgUaTbAHriWF2NPL/xBV1ZhvUfKldMy9YVgEih2QY8jHQbQHc99+7f2/5C3qgry01ZH9ZHACKJZhvwsM7S7aaWZl0BgGn9no1SXLlTV5bzx8+TzNTJugIQSTTbgMeFS7d31O7WFQCInGyok39s+peuLAP7DJTrZ1+tKwCRRrMNeFy4dHt79W7WbgP4wN82vmg03Ge7ce610i+xr64ARBrNNuADdun2sYYa1m4DMOw4tMt2T221n/ac0TN1BSAaaLYBH+hs7TbpNhBsDc0N8pf1f9OVJSGUIDfPv0FXAKKFZhvwCXYmAWDnxfdfkeq6Gl1Zzh8x11ivDSC6Qvn5+a36uNuKiookKytLV87Izc01nvPy8oxnJ7jhdWAMFjeMIycnR9reW7qKnY1HtkjRkc3GcU1NjQwePFiGJA2Wa8cslYS4eON8LDEvTW55bzg1L9vj62GK1RgO1R+Rf+17TVeWUf1GSOqhIcxLjXlpYgymSM/JUGsbfdxtBQUFkp3t7Ab46enpxnN5ebnx7AQ3vA6MweKGcYRCIenFW6vHaupr5eH8R43nqqoqSUlJMc5/ZM7Vcsmki4zjWGJemtzy3nBqXrbH18MUizE0tzTLQ6/9Sg4fr9JnTPFtf/G+54q7ZOM7RcxLjXlpYgymSM9JlpEAPsLabQCnrdhW0KHRVq6cfpkM7T9EVwCijWYb8BnWbgOorD0oK7e/qSvL6OQ0yZ6yWFcAYoFmG/AZ0m0g2NSvv/+89q/S0tqiz5jiQiG55fybjGcAsUOzDfiQSrf7xZ95kwrSbSAY1u8tkv3VFbqyqEQ7ddBIXQGIFZptwIdUup2ZPElXFtJtwN+O1dXI8xtf1JVFrdFWa7UBxB7NNuBTU5MzbNdurylbpysAfvPHtc9KQ1ODriy3nJdr7EICIPZotgGfUstI7NZuF5asI90GfGjl9jektGqPriyLJy2UiSnjdAUg1mi2AR8LtzMJ6TbgLxXVlfLylpW6sowcNFw+POtKXQFwAs024GPhdiYh3Qb8Q72Xf//OMza7j8TJZy64meUjgMNotgGfC5tul5JuA37w4uZX5NDxw7qyLJ22RNIGp+oKgFNotgGfC5tutzXbpNuAt+0+XCpv7SrUlUU12Uszl+gKgJNotoEAIN0G/KeusU7+uPY5XVnUshG1fEQtIwHgPN6JQACQbgP+8/S656WmvlZXlmtnfsi4MBKAO9BsAwFBug34x/q9G2XLgWJdWSakjJNLJi3UFQA3oNkGAoJ0G/AHdZfIv218QVeWpIQk+fT5H5NQKKTPAHADmm0gQEi3AW9rbW2V36/5i9Q3ntJnLDfMuUaG9EvWFQC3oNkGAoR0G/C213eukj1H9+nKkpk6WS4YP19XANyEZhsIGNJtwJsqaw9JwY63dWXpl9hXPrngRl0BcBuabSBgSLcB72lsbpSn1jwtx08d12csNy/4qAzsM1BXANyGZhsIINJtwFv+sv55OVjb8S6R88bMkVlp03UFwI1otoEAIt0GvGNN6XrZuH+zriypg0bIx+ffoCsAbkWzDQQU6Tbgfmqd9t/fe1FXlsT4RLntok+1PSfoMwDcimYbCKjO0u2mlmZdAXCKWqf929V/sv1t0ycW3CgpA4bpCoCb0WwDARYu3S4sWasrAE5R67SrThzRlWXhhPNk7uiZugLgdjTbQIB1nm6zdhtwytu73wm7Tvsjc67RFQAvoNkGAi58us3abcAJ5dUH5B+bXtKVpU9CH9ZpAx5Esw0EHOk24B6nmk7Jk4V/lmab6yZuOe8m1mkDHkSzDYB0G3CJP6/7qxw9eUxXlosnXiAz06bpCoCX0GwDIN0GXOCtXYWyuWKbrizpyaPkI3Ou1hUAr6HZBmAg3Qacc6CmUpZvzdeVJSk+ST6/8BaJj4vXZwB4Dc02AEO4dHtN2XrSbSCKTjSclCfe/qPUNdbpM5Zbzr9JhvYfoisAXkSzDeADdul2RXUl6TYQJepCyCfe/oMcq6vWZyyXTLpIZqVN1xUArwrl5+e36uNuKyoqkqysLF05Izc313jOy8sznp3ghteBMVjcMI6cnBxpe2/pyhk9fR02HtkiRUfO3N93aJ9kuXbM5RIf6t6vspmXJre8N7w8LyPJTWNYdXCt7Kwp1WctgxIHyo3jo7tOm3lpYV6aGIMp0nMy1NpGH3dbQUGBZGdn68oZ6enpxnN5ebnx7AQ3vA6MweKGcYRCIenFWysievo61NTXysP5jxrP7d0w5xpZPGmhrrqGeWlyy3vDy/MyktwyhoSxfeXv7/1Ln7Goddp3X3aHjBg4XJ+JDualhXlpYgymSM9JlpEAOEPYtdulrN0GIuVA3UH5p82Na9QP+c9d+ImoN9oAYodmG0AHtmu3a1i7DUTCkZNHZWXFKmmxSc6unrFUMlMn6wqAH9BsA+iAdBuIjobmBnl81R+k0eZ9NHf0LLls6iW6AuAXNNsAbJFuA5HV2vbnqTV/kUPHD+szltFD0uST592oKwB+QrMNwBbpNhBZL76/Qoord+rKot5rX7jo05IQl6DPAPATmm0AYZFuA5Gxcf/7UrDjLV1ZVIOtGu2z32cA/INmG0BYpNtA71WdOCp/eOdZXZ3pEws+aiwhAeBfNNsAOkW6DfSc2q/+f954QldnUhdDZo2ZrSsAfkWzDaBTpNtAz9Q11stjb/2uww2ilDH90+SamVfoCoCf0WwDOCfSbaB7Gpub5PFVv5fK2kP6jCVtcKpcOupCXQHwO5ptAOdEug10nbpZzVNrnpY9R/fpM5bhA4fJnZfcJolxifoMAL+j2QbQJaTbQNc8s+F52Va5Q1eWgX0Gyh2LPy/9k/rpMwCCgGYbQJeQbgPntnzrSlm/Z6OuLH0S+rQ12p+TIf2S9RkAQUGzDaDLSLeB8N4p2yArthXoyhIfFy9fvPgzMmpwqj4DIEhotgF0Gek2YG9zxTZ5bsM/dGUJhULy2Qtulokp4/QZAEFDsw2gW8Kl26rhBoKopGqP/P6dZ6S17c/ZbphzrcxMm6YrAEFEsw2gW8Kl22opCek2gqa6rkaeePsP0tzSrM9YLpt6qSzKuEBXAIKKZhtAt5FuAyJHTx6T/379f+VU0yl9xrJg3Fy5ZuZSXQEIMpptAN0WLt1eTbqNgKg6cVR+9cYTRrJ9tumjpsonF9ykKwBBR7MNoEfs0u0DpNsIAJVoP/Lmb2wb7fTkUcYFkQBwGs02gB4h3UYQqUY7XKKd3G+wfH7hLZIYz90hAVhotgH0GOk2guRcjfa/X/pFGdp/iD4DACaabQA9RrqNoKDRBtBTNNsAeoV0G35How2gN2i2AfRKZ+l2S9sfwMtotAH0Fs02gF4Ll25vr96tK8B7dh0ukZ+tfMS20Vbz/f9c8gUabQDnRLMNoNfCpdvFbc02a7fhRVsPbJfHV/1B6hrr9RmLSrS/suTfJGXAUH0GAMKj2QYQEXbp9rGGatZuw3MKS9fJb1b/0fYviiTaALqLZhtARIRLt9mZBF7yavHrkvfuP3V1JhJtAD1Bsw0gYtiZBF7V2tpqNNkvb3lNnznT6OQ0+Y/LvkyiDaDbaLYBREyn6XYz6TbcqbmlWX7/zjPG8hE7k0dkyJcv/YL0T+qnzwBA14Xy8/Nb9XG3FRUVSVZWlq6ckZubazzn5eUZz05ww+vAGCxuGEdOTo60vbd05QynXoe65npZtmeF8VxTUyODBw82zl84Yp5MS55sHMcS7w1LkOdle+3HoJY4vVaxSg7UHTTqs40bMFqWjFoocaHIZlPMSwvz0sQYTG4YQ6TnZKhV/e6shwoKCiQ7O1tXzkhPTzeey8vLjWcnuOF1YAwWN4wjFAoZv5Z2kpOvw4ptBbJ860qpqqqSlJQU49yowalyd84dEh8Xb9SxwnvDEvR5edrpMRw+fkT+sPYZ2X+sQn/kTIsyLpSPzr1WV5HFvLQwL02MweSGMUR6TrKMBEDEhVu7He7X9ECsqa39Hi74ddhG++oZS6PWaAMIFpptABHX2dpttT4WcNKmo9uMrf3qG0/pM2f62LyPyOWZl+oKAHqHZhtAVKh0u198X12ZSLfhpMbmJvnDO8/KhqpN+syZEuIS5AsXfdqYuwAQKTTbAKJCpduZyZN0ZSHdhhOO1VXLr954XDbuf1+fOdPAPgPk9sW3yvRRU/UZAIgMmm0AUTM1OYO123BcadUe+dnKR8Kuz84YPl7+7+X/LhNTxukzABA5NNsAokYtI7Ffu72WdBsxoebar996Uk421OkzZ1oyZZHcsfg2I9kGgGig2QYQVfY7kxwk3UZUHT15TH75+uPy16Jltn+xS4xPlM9d+An58KwrJS4U0mcBIPJotgFEVbidSVSzTbqNaNiwd6P8v5X/I2VH9uozZxqcOEi+dtmdMjt9hj4DANFDsw0g6uzS7Ypq1m4jstRWfn9a+5z8ed1fw27rpxrs68ZeLiMGDtdnACC6aLYBRB3pNqJNXQT50Gu/lHf32W/rp5aKXDfrQ8bSkcS4RH0WAKKPZhtATJBuI1pe2vKa/OqNJ6S6rkafOVNifILcct7HJHvKYn0GAGKHZhtATJBuI9JUc/3Im7+V14pf12c6Gj9sjPzfy78iWWNm6TMAEFs02wBihnQbkaD+cvZa8Rvy4IpfyO7DpfrsmdSykSumZcuXL/03SRkwVJ8FgNij2QYQM6Tb6K3iyp3G2uyXtrwqjc2N+uyZhvRLbmuyvyhXTr+Mbf0AOI5mG0BMkW6jJ47V1chTa56Wx9/+vRw+fkSf7WjBuLnyjSu+IuOHjdVnAMBZNNsAYop0G931avHr8l8v/1Q2lW/VZzpS8+ozF9wsn1xwkyTFJ+mzAOA8mm0AMUe6ja7YXLFN/rvgf+XlLa/pM/Yuz1wi937oqzJ39Ex9BgDcg2YbQMyRbqMzOw7tMprsJwv/LHuO7tNnO5o8YqLcc8VX5eoZlxu3XwcAN6LZBuAI0m2cTTXWv37zSXnsrac6bbLNJSMflzsWf16GDxymzwKAO9FsA3AE6TZOO1ZXbTTYKs3edbhEn7V32dRL9JIR9s0G4A002wAcQ7odbFsPbJffrP6j/NfL/89YOtKZ1EEj5GuX/R+5ZuYVLBkB4Ck02wAcQ7odPE0tTbJq9xrjhjSq0VYNd2dSBgyTW867Sb6+9CuSnjxKnwUA76DZBuCosOl2Cem2n9Q3npLnN74gz5Qsk79tfFEOH6/SH7Gnbkxz8/yPGktG5o+dq88CgPe4qtmuq6uTRx99VObMmSOhUEiWLl0qzz//vDQ1NenPAOA3YdPtMtLtSDpy8KQMGTBGV7FRU18rb+xcLb98/XG5/8Ufytu735Gm1s6/nw/qO1A+Ovdao8k+f/w8fRYAvMs1zbZqtL/xjW/It771Lbnlllvk1VdflYsvvlhuvfVW+fnPfy7NzfzQBfyKdDs6jlXVyd9+t0l+8h8r5fv//opcOe8++d4dL8uf/2e97N7aebLcU+pOj6/vfNtosB946SH556aXpOzIXmltbdWfYW/8sDHyiQU3yn0f+posyrhQ4uPi9UcAwNtc02y//fbb8tRTT8kvfvEL+eY3vymXX365fPe735V7771X/vSnP8nOnTv1ZwLwG9LtyCtavV/+887l8sa/dknF3hp9VqT6SL2sfX2v/PK7b8rLz23TZ3tn9+EyeWVrvvzvqqfkoVd/Kcs2vWw02F1x3rgsuSv7dvnKki8Zx4nxCfojAOAPrmm2t2/fLkuWLJHLLrvMWEKixMfHy6WXXiobN26Uw4cPG+cA+FO4dHtN6Xpdoaue+vla43Euy9ua7W9/4V+66rrG5iZ5a1eh/Hb1n+S+Zf8lj7z5G3llW75sP7hLTjWd0p8Vnloq8qFpOfK9a75hpNljh47WHwEA/3FNs33nnXfKsmXLJD09XZ8xlZaWSlpamvTt21efAeBH4dLt1aVrSbe74a2XdxupdledqG2Qp3+9QVcd7a+ukHfKNsjf3/uX/Or1J4zm+t5/PmDUWw4US0NTg/7Mc1PJ9eVpi+W7V39DPjQ9Rwb2Gag/AgD+5aoLJNtraGiQl19+WR566CG56aabZMaMGfojAPyKdLt3Gk41y8p/7tBV172++j15buUKWb51pTy97q/y2Fu/k0fe/K386JWfy89X/lqe3fB3I8kuPbKnW821kjF8vHx8/g3yw+u/baTYYwak6Y8AQDC4stl+5plnpE+fPnL11VfLpEmT5P7775d+/frpjwLwK9Lt3jlUflyOHq7TlaV2YIWUjXtbDi4slG1T/9XhoT720o7lsmJbgazfu1F2HNotuw+XStWJo/rf0D1jhqTLFdOy5b4r75b/c8kX5ILx8yUpPkl/FACCxZXN9syZM43dSB555BHZu3ev3HjjjVJcXKw/CsDPSLd7rrK8Vh9ZmuJPyf70d6Wu7zF9xl59fc+3WB3Wf6hcnHGBfO7CT8j3r7tPvppzh1w5/TLjPAAEnboSsfP9mCJAbd/34IMPGjuKLF68WJ81PfDAA3LffffJ+vXrZcuWLXLDDTfIkCFD9EdFtm7dKp/85CeNiyd/+MMfyl/+8he5++67pba24w8VAP4wfF6apMw7826Bp47WSdk/iqW1Jerfsjxr5rhrZVbbo71TQ49Kdea5w4pTjcelqrZEV51rqD4ldQeOS/2Rk3KyrcFXNQDAXqj1XJufdqKgoECys7N1dW6rVq2ybbbVMpFw1Nrte+65x2jE1RaAKSkp+iOm0xdUlpeXG89O6O7rEA2MweKGcagddXrx1ooIL88JdTOUh/MfNZ7bu3HudUaC2h1Bem+8t6Zcnvx/7+jK1BLXJDsnvSotoRY5deqUsUTPTsrI/jJq7GBdWdRWfGpZyMSU8TIhZVzb8zjpl9jzZX1B+np0hjFY+H5pYgwmN4wh0nMypstIFi1aZAy+/UM12vX19cbNbD7xiU9IdXW1/mxTS4v5AyIhIUHi4lx7PSeACGLtds8MT+u4u0dcS4KMLp8v/erMJR1xLfGS0JwkSU39JalhoPStT5b+dcMkc1imXDr5Irl+9tXGchC197XaNeRH139HvnzpF+WamVfIjFGZvWq0ASCIXNG9qm39MjIy5I033jCWk7S3Zs0aefHFF2X+/PkyeHDH1AWAP7F2u/tGjBogw0b015VlwImRMn7vRTKycKFM3XmlTN61VDJ2Z0tG6aUyYc8iGbd3oXx8zk1Go60a7tnpM4y9r9V+2ACA3nFNVHz99dcbN7C57bbbjNuzv/baa/LjH/9Ybr/9dsnKypIvf/nLxk1uAAQD6Xb3JSbFy7Wf7P42qUuumSSZc0bqCgAQSa5ptkeMGCG/+c1vjIsfH3vsMVm6dKmxBaC62Y1aq52amqo/E0BQkG533/zFY+S6W7recE+dPUJuuHW2rgAAkeaqRdADBgyQu+66S7Zt22as596wYYNRq/MAgod0u2cuv2Gq3P3DJbZLStr79FcWyJ33L9IVACAauOIQgKuRbvfMuMlD5T9+nCM5H55iLBEZlNxHmppPyYSpw+TiKyYYzfiCS8bqzwYARAvNNgBXI93uuf4DE+X6z8yUO759sTzw+NXy19V3y13/dal87N+yjGYcABB9NNsAXI90GwDgVTTbAFyPdBsA4FU02wA8IVy6XUi6DQBwMZptAJ4QLt0uLF0rLa0tugIAwF1otgF4Rrh0e3XJOl0BAOAuNNsAPIN0GwDgNTTbADyFdBsA4CU02wA8JWy6XUK6DQBwH5ptAJ5jm27XkG4DANyHZhuA55BuAwC8gmYbgCeRbgMAvIBmG4AnhUu315SuI90GALgGzTYAz7JLt8urD5BuAwBcg2YbgGeRbgMA3I5mG4CnkW4DANyMZhuAp5FuAwDcjGYbgOeRbgMA3IpmG4DndZZut7b9AQDAKTTbAHwhXLpdXL1bVwAAxB7NNgBfCJdub6/exdptAIBjaLYB+IZdun20oZq12wAAx9BsA/CNztZuk24DAJxAsw3AV8LvTLJWVwAAxA7NNgBfCZ9uryfdBgDEXCg/P7/H+2IVFRVJVlaWrpyRm5trPOfl5RnPTnDD68AYLG4YR05OjrS9t3TljCDPibrmelm2Z4XxXFNTI4MHDzbOXzhinkxLnmwcx5Jb3hvMSxNjMDEvLXw9TIzBFOk5GWpto4+7raCgQLKzs3XljPT0dOO5vLzceHaCG14HxmBxwzhCoZD04q0VEUGfEyu2FcjyrSulqqpKUlJSjHPpyaPkqzl3SFwotr/Uc8t7g3lpYgwm5qWFr4eJMZgiPSdZRgLAl1i7DQBwA5ptAL7E2m0AgBvQbAPwLZVu94vvqysT6TYAIJZotgH4lkq3M5Mn6cpCug0AiBWabQC+NjU5w3btdmEpd5UEAEQfzTYAX1PLSOzWbheWcFdJAED00WwD8L1wO5OQbgMAoo1mG4DvhduZhHQbABBtNNsAAoF0GwDgBJptAIFAug0AcALNNoDAIN0GAMQazTaAwOg03W4h3QYARB7NNoBACZtul5FuAwAij2YbQKCQbgMAYolmG0DgkG4DAGKFZhtA4JBuAwBihWYbQCCRbgMAYoFmG0AgkW4DAGKBZhtAYJFuAwCijWYbQGCRbgMAoo1mG0CgkW4DAKKJZhtAoHWWbre2tuoKAICeodkGEHjh0u3VpWt1BQBAz9BsAwg80m0AQLTQbANAG9JtAEA00GwDQBvSbQBANNBsA4BGug0AiDSabQDQSLcBAJFGsw0A7ZBuAwAiiWYbANoJl26vKV1Pug0A6DaabQA4i126vf9YBek2AKDbQvn5+T2OaoqKiiQrK0tXzsjNzTWe8/LyjGcnuOF1YAwWN4wjJydH2t5bunIGc8LU0zFsPLJFio5s1pVpWJ8hcu2YpRIXCukzXeOW9wbz0sQYTMxLC18PE2MwRXpOhlp78XvRgoICyc7O1pUz0tPTjefy8nLj2QlueB0Yg8UN4wi1NWNOLzlgTph6Ooaa+lp5OP9R47m9G7Ouk4snXqCrrnHLe4N5aWIMJualha+HiTGYIj0nWUYCADY6W7vd4nBjAADwDpptAAgj3NrtQtZuAwC6iGYbAMIg3QYA9BbNNgB0Imy6XUK6DQA4N5ptAOhE2HS7jHQbAHBuNNsAcA6k2wCAnqLZBoBzIN0GAPQUzTYAdAHpNgCgJ2i2AaALSLcBAD1Bsw0AXUS6DQDoLpptAOgi0m0AQHfRbANAN5BuAwC6g2YbALqBdBsA0B002wDQTaTbAICuotkGgG4i3QYAdBXNNgD0QLh0e03pOl0BAECzDQA9Ei7dLmxrtkm3AQCn0WwDQA+RbgMAzoVmGwB6qPN0u0VXAIAgo9kGgF4In26v1xUAIMhotgGgF0i3AQCdodkGgF4i3QYAhEOzDQC9RLoNAAiHZhsAIoB0GwBgh2YbACKgs3S7te0PACCYaLYBIELCpdvbq3frCgAQNDTbABAh4dLtHbUlrN0GgICi2QaACLJLt6vqj7J2GwACimYbACIo7NrtEnYmAYAgotkGgAizXbtdzc4kABBENNsAEGGk2wCA00L5+fk93pOqqKhIsrKydOWM3Nxc4zkvL894doIbXgfGYHHDOHJycqTtvaUrZzAnTE6Noa65XpbtWWE819TUyODBg43zC0fMl8zkScZxrDEvTYzB5IYxKMxLE2MwuWEMkZ6TodY2+rjbCgoKJDs7W1fOSE9PN57Ly8uNZye44XVgDBY3jCMUCkkv3loRwZwwOTmGFdsKZPnWlVJVVSUpKSnGudHJafLVy+6QUNufWGNemhiDyQ1jUJiXJsZgcsMYIj0nWUYCAFESbu22Wk4CAAgGmm0AiJLO1m5zV0kACAaabQCIIpVu94vvqysT6TYABAfNNgBEkUq37S6IJN0GgGCg2QaAKJuanMHabQAIKJptAIgytYyEtdsAEEw02wAQA+xMAgDBRLMNADEQbmcSdQt30m0A8C+abQCIEbt0e9+xctJtAPAxmm0AiBHSbQAIHpptAIgh0m0ACBaabQCIIdJtAAgWmm0AiDHSbQAIDpptAIgx0m0ACA6abQBwAOk2AAQDzTYAOIB0GwCCgWYbABxCug0A/kezDQAOId0GAP+j2QYAB5FuA4C/0WwDgINItwHA32i2AcBhpNsA4F802wDgMNJtAPAvmm0AcAHSbQDwJ5ptAHAB0m0A8CeabQBwCdJtAPAfmm0AcIlO0+1W0m0A8CKabQBwkXDp9pqy9boCAHgJzTYAuEi4dFstJSHdBgDvodkGAJch3QYA/6DZBgCXId0GAP+g2QYAFyLdBgB/oNkGABci3QYAfwjl5+f3+Lt2UVGRZGVl6coZubm5xnNeXp7x7AQ3vA6MweKGceTk5Ejbe0tXzmBOmLw8hrrmelm2Z4Xx3N5FIxfI1MEZuuo65qWJMZjcMAaFeWliDCY3jCHSczLU2ouIpKCgQLKzs3XljPT0dOO5vLzceHaCG14HxmBxwzhCoZDj6SNzwuT1MazYViDLt67UlWnMkHS5K/t2Y551B/PSxBhMbhiDwrw0MQaTG8YQ6TnJMhIAcDHWbgOAt9FsA4CLhV+7vZa12wDgATTbAOBy9ul2Bek2AHgAzTYAuBzpNgB4F802AHgA6TYAeBPNNgB4AOk2AHgTzTYAeATpNgB4D802AHgE6TYAeA/NNgB4COk2AHgLzTYAeEhn6TYAwH1otgHAY8Kl24Wl63QFAHALmm0A8BjSbQDwDpptAPAg0m0A8AaabQDwINJtAPAGmm0A8CjSbQBwP5ptAPAo0m0AcD+abQDwsLDpdgnpNgC4Ac02AHhYuHR7TRnNNgC4Ac02AHicXbq992g56TYAuADNNgB4HOk2ALgXzTYA+ADpNgC4E802APhAuHS7kHQbABxFsw0APmG7MwnpNgA4yrXNdmtrqzz++OOSlZUlxcXF+iwAIJwO6XZLizQePSKvrfizlPzyF/KdmdOl/C9/lqrXC+RkyW79SQCAaHJts71+/Xr5wQ9+oCsAQFecTrebj9fK8e3FcnL3binds03e2pQv5w8bKhV/e15KH/mVbPvWvbLvD0/pfwoAEC2ubLaPHj0qP/nJT6ShoUGfAQB0hWq0J245IMeLi6X5xAnzZEhka3KTjBw5sq1oNU61NjdL5QvL5L3bv2jUAIDocF2z3dz2A+CJJ56QpqYm+drXvqbPAgC64sDfn5fxG0qlf3Nbh63+Ewq1PYXkcN9W2Ta0WX+Warhb2z4m0njsmOx96knzNAAg4lzXbL/11lvypz/9Se677z5JS0vTZwEA51Jfvl8q/ponA5pCMrMm0Wiy4/r0kX6TJsmgWbNl73WLZdr3fyiDps0wPl9dG6Mc/NeLUlP0rnEMAIgsVzXblZWV8vOf/1w+//nPy4IFC/RZAEBXVBXkS4ux/K5Vph+Lk4EJfWXgzFmSmDxEQklJcqCuSjYl1crU//y+jPrwR8x/SKt4Pk8fAQAiyTXNtlo2onYfSWr7gfDZz37W+NUnAKDr6ivKjWf1/bN/U0iWXHCtUbd3ehvA0Z/+rAzImNR2ZC4nqdu71zgPAIgs1zTbK1eulGeffVa+/e1vy9ChQ/VZAEBX1ZWVtf13q7E8pG9auuTkfKzjvtvHymVT+RbjuO+Yscaz+vzmkyflVGWlUQMAIkfFx+aivSi69dZb5cEHH5SdO3fK4sWL9VnTAw88IJ/5zGfk05/+tHzuc5+TL37xix+k2mrt9kMPPSTPPPOMZGZmSn19vZF+f+tb35La2lrjcwAAprxFF8qApCRJSUmRpAkTZeTXvi5vlhbKm2WF+jNMSyddKheMmS/V//ib1L62wvh+evJknfxH0Xuyvfa4/iwAQCTEqUSjp4/8/Hzb82c/nnzySUlNTdX/kx2tWrXKeHzpS1+SuLg4o9lWD9WAb9y4UaZNmyZXXXWVnDhxQr7yla9ITU3NB/9udRGlerT/34v1o6uvQzQfjMF6uGEcit35WD6YE+YjSGOYuSRbRowYYXwfjautMb43XjVvqYwbPkb69OljzMthg4bKvMlzjY8lnTxpfG5ycrJRbymvsP33RvLBnDAfjMF6KHbnY/ng62E+GIP5iPScjOkykkWLFnUYwP3332+k3erFPfvx3e9+V6ZMmSJ//OMf5Xvf+54MHDhQ/5sAAGfrmz667b/N3ww2HD0qB//1grGM5LMX3CxTRmTI3FEzJXfeR2Tc0DHS2Pbx6o3mDiRq15I+w4dLPN9jASDiXLFme/z48ZKdnd3hoRrt/v37y3nnnScLFy78IJkBAHTU54PfIJoNt9o/WzXVqYNHyu2Lb5VrM6+Q2enTjY/t/vlPpaW+3mi0VY7Tf5K6WBIAEGmu2voPANBzabkfl/4TJ+rKbLjfu+OLUpH3rBx5vUDqt2yWyhf+KRs//1k5XrzNaLT1p8mYW28zDwAAEUWzDQA+Munr39RH5vIQpfy5Z6TkkV/K4Uf/R/b94SlpOnnCuC5GJdqtbf+V+d3/lKRhKcbnAgAiy9XN9qc+9SkpKioydiIBAJxbUspwmf3IY9J31Kh2W02ZTXddnblsRFFNtjL+S7fLwBkzzQIAEHEk2wDgM0kpKTLzF7+Skdeom9rodSJtz8ZOTvp40IwZMv1HP5Hhl19hnAEARAfNNgD41NjPfV5m//oxY5nIhNvvlCdLSmXyvffJrF/8UqZ+9wHpn5GhPxMAEC002wDgY2ottlomknLZ5fL8vnJJzpovfUal6Y8CAKKNZhsAAACIEpptAAAAIEpotgEAAIAoodkGAAAAooRmGwAAAIgSmm0AAAAgSmi2AQAAgCih2QYAAACihGYbAAAAiBKabQAAACBKaLYBAACAKKHZBgAAAKKEZhsAAACIEpptAAAAICpE/j8/6FUImKHyygAAAABJRU5ErkJggg==)
Consider the graph of shown below. Find
.
Skill
Find one-sided limits and infinity
ruwinidilkiLv1
31 May 2024
Rozalliene HomigopLv10
5 Feb 2021
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