Cho hàm số \(y = f(x)\) có đồ thị như hình vẽ:
Câu hỏi: Cho hàm số \(y = f(x)\) có đồ thị như hình vẽ:![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAucAAALjCAYAAACxlqveAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAgAElEQVR4nOzdfXjU5Zn3/09IIiMhMEKCKQ8yCmjKQ80K1FRgCYpb1uLKWlxptQt9Omx/utvttt7eddtb2bZH2+29tra1tbvtUVy11Z+0xV+VYqU2CFgUsKlAN8pDByFsNAQnJMGJSeD3x5dwXcNDSMjMXN+H9+s4cnB+k0BO+DKZM9ec13kVHDt27JjOIJlMau/evRo/frwSicSZPg15UldXp5aWFg0fPlxVVVWu04k8Hh/AmfH48Bfuh7+c8/149kHpPz/txdd+SvrkD3KSX9T46fFRUFBQMMhpBgCQJe3t7Rm/AkDopBpNHL/QXR7IqSLXCQDAQL355pu6+uqrVV5erqamJv3ud79TeXm567QAILtSb5g4XuEuD+QUxTmAQOspzHfs2KHBgwero6ND8+bNo0AHED4ZK+cU52FFWwuAwLIL84svvlif+MQnlEgktGPHDs2bN09NTU2uUwSA7Gk9aOIhcXd5IKcozgEEkl2YT506VYsXL9YDDzygm266SVOmTKFABxA+9sr5yLHu8kBOUZwDCJyTC/PnnntOQ4YMkSSVlJTod7/7HQU6gPBp3m9i2lpCi+IcQKCcrjA/ube8vLycAh1AuHSmvTdJKiySYkPd5oOcoTgHEBh9Kcx7UKADCJXGXSaumOguD+QcxTmAQGhvb+9zYd7jdAX6kSNH8pQxAGTRYWszKC0tocYoRQCBUFJSoptuukkFBQV9Ksx79BTo8+bN00033XSiNx0AAuUQ/eZRQXEOIDDuuece3Xnnnf0usMvLy/XSSy9RmAMILntSS2mZuzyQc7S1AAiUcy2wKcwBBFprs4lLR7rLAzlHcQ4AAOB39sr5CGachxnFOQAAgN/ZxTk956FGcQ4AAOB3rda0lpK4uzyQcxTnAAAAfscoxcigOAcAAPA7e5TiSHrOw4ziHAAAwM+a90vdXV4cr5CKY27zQU5RnAMAAPgZ/eaRQnEOAADgZ630m0cJxTkAAICfNVv95hTnoUdxDgAA4Gd2cV6ecJYG8oPiHAAAwM8ONZh4+IXu8kBeUJwDAAD42ZGUidkQGnoU5wAAAH72ZtLEzDgPPYpzAAAAP0s1mpie89CjOAcAAPAzuzhnWkvoUZwDAAD4VbpN6kx7cWGRFBvqNh/kHMU5AACAXzXuMnHFRHd5IG8ozgEAAPyq3ZrUQktLJFCcAwAA+FW6zcS0tEQCxTkAAIBf0dYSORTnAAAAfmUfQDRkuLs8kDcU5wAAAH6VesPEIziAKAoozgEAAPzKXjkflXCWBvKH4hwAAMCv3kyamA2hkUBxDgAA4Ff26aDlCWdpIH8ozgEAAPyq9aCJmXMeCRTnAAAAfpRqNHPOS8vc5oK8oTgHAADwI/sAojGV7vJAXlGcAwAA+BH95pFEcQ4AAOBHdr85k1oig+IcQM41NzeroKCg1zcAwEkad5m4YoK7PJBXFOcAcm7dunWuUwCA4DnSYmI2hEYGxTmAnHvhhRckSd/61rd07Nix074BAE5i95wzRjEyKM4B5NzWrVslSXPmzHGcCQAEiH066MixztJAflGcA8ipo0ePauPGjbrgggs0ffp01+kAQHDYG0Jpa4kMinMAObV582Z1dnZq/vz5uu+++1RVVaVYLKZhw4bplltuUV1dnesUAcCf7A2htLVERsEf/vCHMzZ7ptNpdXR0aPDgwYrFYvnMC6fR1tam7u5uFRYWauhQRiq5xuPjVBdffLGGDx+e8b7vf//7uv3228/4ewoLC/Wzn/1MN910U5+/Tm1trWprazPet2fPHk2fPl2JRELjx4/vV97IPh4f/sL98Je+3I9B3e/oPd+4UpLUWTJSOz6zNp8pRoqfHh9/8Rd/UVDU0tJy1k/s6OhQR0dHHlJCX3R3d6sv9w35wePD+POf/6yqqqqM961fv16SVFZWpocfflh/9Vd/pUGDBqmtrU2PP/647rzzTn3kIx/RtGnTVFnZtxPwamtrtXz58oz3ffvb3z7xtXl8+AePD3/hfvhLb/cj1mo2g3acfwHf1/LAL4+PopNXuWx++kkCrJz7DY+PU1188cWnvK9nUsvDDz+sBQsWnHj/0KFD9fGPf1wdHR26/fbb9a1vfUs//OEP+/R15s2bd8ps9JdfflmSWDn3CR4f/sL98Je+3I+S9tdPxMeGjjzlVUlkj98eHwXHeplhlkwmtXfvXo0fP16JRCKPaeF06urq1NLSouHDh5+yOon84/GRHU1NTRo1apRGjx6thoaGc/5z7r33Xi1fvlz33nuv7rnnnixmiHPB48NfuB/+0qf7sfEx6f4PefGcW6V/eDhv+UWNnx4fBQUFBWwIBeBUeXm5JK9IBwAcx4zzyKI4B+DU0aNHJUlFRUWOMwEAH2lrNnHFBHd5IO8ozgHk1LBhw1RQUKC33nrrtB/ftcsbFTZz5sx8pgUA/ta838TMOI8UinMAOdWzCfThh0/fL/n4449Lkq6//vq85QQAvkdxHlkU5wBy6s4775Tkbdh84oknTrSxHD58WN/5znf0ta99TYlEQnfccYfLNAHAXw5ZxfnIse7yQN7R5Akgp2bOnKnvfve7+od/+Af93d/93SkfHzVqlJ5++mlfjK8CAN84fNDEbAiNFFbOAeTcHXfcoeeff17XX3+9zj//fBUWFiqRSOgzn/mMXnnlFU2ePNl1igDgH+k2qfV4cV5YJMU42yRKWDkHkBdz5szRnDlzXKcBAP7Xaq2alyecpQE3WDkHAADwE3szKC0tkUNxDgAA4Cf2AUS0tEQOxTkAAICfNCVNTFtL5FCcAwAA+EnTXhOPm+IuDzhBcQ4AAOAn9oZQDiCKHIpzAAAAP7F7zodRnEcNxTkAAICf2NNaRnA6aNRQnAMAAPiJvXLOKMXIoTgHAADwi860d0Joj5K4u1zgBMU5AACAX7y+3cRjKt3lAWcozgEAAPzCntRCS0skUZwDAAD4hV2csxk0kijOAQAA/OLNpIlZOY8kinMAAAC/aGs2celId3nAGYpzAAAAv2DlPPIozgEAAPzCnnFennCWBtyhOAcAAPALDiCKPIpzAAAAv6A4jzyKcwAAAD9oT3knhEpSYRGng0YUxTkAAIAfMOMcojgHAADwh+b9JqalJbIozgEAAPyAfnOI4hwAAMAfGneZuGKiuzzgFMU5AACAH7S8YWJOB40sinMAAAA/sDeE0tYSWRTnAAAAfmD3nI9kWktUUZwDAAD4ARtCIYpzAAAAf7CL89Iyd3nAKYpzAAAA19Jt3gmhknc6KCvnkUVxDgAA4BqbQXEcxTkAAIBrh63inJaWSKM4BwAAcI0DiHAcxTkAAIBrFOc4juIcAADAtY52Ew8Z7i4POEdxDgAA4FpT0sTlCVdZwAcozgEAAFx7M2niUQlXWcAHKM4BAABc43RQHEdxDgAA4FJ3l3Rov7mmOI80inMAAACXUo1egS5JI8dKxTG3+cApinMAAACX7FVzDiCKPIpzAAAAlzgdFBaKcwAAAJfsA4hGjnWXB3yB4hwAAMClQw0mvnCCuzzgCxTnAAAALrVabS1Maok8inMAAACX7OI8NtRdHvAFinMAAACX7J5zTgeNPIpzAAAAl9JtJh431V0e8AWKcwAAAFe6u7xDiHrQ1hJ5FOcAAACunHw6KCKP4hwAAMAVezNoxUR3ecA3KM4BAABcsTeDjmDlHBTnAAAA7tjFeUncXR7wDYpzAAAAVzraTczpoBDFOQAAgDvN+01MzzlEcQ4AAOCOXZzT1gJRnAMAALhzJGViRilCFOcAAADuNNR7v8aGMq0FkijOAQAAnCjo6pDSbd5FaZlUWOQ2IfgCxTkAAIADhe1vmQtaWnAcxTkAAIADRW9Zm0HjFe4Sga9QnAMAADhAcY7ToTgHAABwoOiQVZyXjnSXCHyF4hwAAMCBQnvlfHSlu0TgKxTnAAAADhS2NpkL2lpwHMU5AACAAxnFOdNacBzFOQAAgAPFb+42F6yc4ziKcwAAgDwb1P2OBr1zxLsojnknhAKiOAcAAMi7844cMhesmsNCcQ4AAJBng9voN8fpUZwDAADkWay10VyUlrlLBL5DcQ4AAJBnscNWcT6GGecwKM4BAADyrLCjzVwMLnGXCHyH4hwAACDPzm9pMBejEs7ygP9QnAMAAORZRnE+mrYWGBTnAAAAeVb0jtXWMowNoTAozgEAAPKooKuDOec4I4pzAACAPCo6tF8FR7u9i5FjvRNCgeMozgEAAPKosNU6gKg84SwP+BPFOQAAQB5lFOclcXeJwJcozgEAAPKouHmvuWBSC05CcQ4AAJBHhW/tNxcVE9wlAl+iOAcAAMijwva3zEVsqLtE4EsU5wCceOqpp1RQUKCCggLXqQBAXhUdTJoLNoTiJBTnAPKura1Nn/70p12nAQBOZPScV0x0lwh8ieIcQN598Ytf1P79+8/+iQAQNt1dKujqMNccQISTUJwDyKutW7fq/vvvV0UFT0gAIqhx14mwu7TcYSLwK4pzAHlz9OhRLV26VJL0ne98x3E2AOBAqvFE2DlyvMNE4FdFrhMAEB1f+9rXtGPHDn3gAx/QTTfdNPA/MFkntaekxl2qaapV80SpKlUnrX9EumSGNIb5wQB8pvXgifDo+cMcJgK/Kvjzn/987EwfTKVSamlp0fDhwxWPc4KVa42Njero6NDgwYNpCfABHh+nqqioUCwWO+3Hdu3apalTp6qoqEivvvqqxowZc2JSy7FjZ/w2lKm7S9q2Vnt/81OVbPu1yjoO9v7pQy5QekK12q9YpLfffY2ODSrs198H547Hh79wP/xj+O9+oAt+/W+SpKb33qL2xV9xnBH89Pi4+OKLC4r27t171k9saWlRS0tLHlJCX3R0dKgv9w35weMjUyKROO37P/nJT6qjo0P/9m//pjFjxvTvD+3ukjavkn76Balxl/r6QnDhkbdUsu3XKtn2a3UXn6/GygXad8WH1TGUPs984fHhL9wP9y5+Y78uOB4fUTHP5z7il8dH0fjxZ36a89NPEmDl3G94fJzqTP8vf/zjH6u2tlbvfe979Y//+I/9+0NrV0iPf0lqPv10l9eHXKS2oqFqSLWr6LyYEqPiGqNWFb+5O2MiQmHn2xqz7Zd6167fKvX+z6m1+hZW0nOIx4e/cD/8Y+Tz5gCiQWUXqbc6DPnht8dH0ZlWuSQpmUyqpaVF8Xj8jKthyJ9UKqWOjg7FYjHuhw/w+OibpqYm3XnnnSosLNRPfvKTvv/G1oPSg5/0VsxPVrNMmnmDVLVAFxV7bTT/7733avny5br33nt1zz33SJ1pqX6DtPlJadPKE5uwBr19WCNW3aMRG38i/T8/kabUDPwviVPw+PAX7oePpPadCIsT0zSO++Gc3x4fTGsBkFO333673nrrLX3hC1/Q5MmT+/abdm6SPjft1ML8pnukn7zlFdUzF0nFp+9vl+R9bNp86WPflf7jf6S7fiUlqszHm5LSV66Vnv52v/9OAHDOjqROhIxSxOlQnAPIqSeeeEKS9JWvfEUFBQUZbz0yrndvkb5+fca4MV3zCa8ov+leqeQcX3KcvlD62mavWO/R3SU99Fnp+x+V0m3n9ucCQF91pjO+t1Gc43QozgH4x7a10vJ5GaPG9JmfSbf957kX5bbCImnBHd5K+oQZ5v21K7yV+t1bBv41AOBMDh/0FgUkvTNkhI6eN8RxQvAjinMAOXXs2LEzvmV8zq7N0n03mRXskri30j1rSfaTildIX/m9dP3nzfuakt4PBrUrsv/1AEDKWDXvGjzUYSLwM4pzAO7VrfEK4/bjvZilZV7xbK9uZ1thkfSRb3or8z2r8uk2r8Xl2Qdz93UBRFfjrhPh28P7OVIWkUFxDsCpJeN06or53b/O3+mes5Z4K/SlZeZ9//lp75RRAMgma29LZ2y4w0TgZxTnAJxZ+C7p4StlnrDKE7lfMT+dionSd3Zmft3vf9Rb0QeAbHlj94nw7QsucpgI/IziHIAb7Sn9amGFinqGtpQnpHt/l78V85OVxKUvPmsK9O4u6Zt/S4EOIHv2bT8Rto+42GEi8DOKcwBuPPTZzHGJX3rWK9Bd6inQe35A6Ex7LTc7N7nNC0A4WCcdvzNkhMNE4GcU5wDy77c/ypyKctevvNYSP+jpee/5QSHdJv2fORToAAbOWpCgOMeZUJwDyK/GXdIjd5rr6z/vHRDkJ+UJ6V/XmwK9p8XFXukHgP6iOEcfUJwDyK/vfsSMTJxULS35stt8zmTkWOl//0oqjnnXqUbp/g+5zQlAcFktLV3DK3RsUKHDZOBnFOcA8udX/zezPeTDXzPFrx+Nmyrd+UtvJrok7aiVfv4VpykBCChrxnnXBWMdJgK/ozgHkB/1G6SffsFc33SPNKXGWTp9VrXA+yGix8rl3t8FAPqjKXkipDhHbyjOAeRee0r64Se93m3JK8pv/KLTlPrlun/yWnAk7+9w3030nwPoH7utZQTFOc6M4hxA7v3iq1JDvRfHK6TP/My0igRBYZH0z0+YU0RTjd4hRT0/bADA2RxqOBEeLS13mAj8juIcQG411EtrvmeuP/w1r0APmp4Noj0/VNStkVZ/221OAILjkFk576Y4Ry8ozgHk1k+/4B3mI3n92zXLnKYzIJOqpZut6TI//QL95wD6pufVQ0mdoyY4TAR+R3EOIHd2bpI2rzLXN/t0bGJ/XP95s5G1u8sbDZluc5oSgADoGSEr6WhsmMNE4HcU5wByx57OUr1YmjDDXS7ZUljk9cz39J83JTP/ngBwstaD3pskxYbS1oJeUZwDyI1NK7254JJX0NrjCIMuXiF97Lvmes33zN8VAE5mrZqrtIwDiNArinMA2deZlp5Ybq6v+yepYqK7fHJh1hJp5iJz/f2P0t4C4PSsGecaVuYsDQQDxTmA7FvzPWnfdi8uiUs3/ovbfHLlI9+UYkO9uCnpnYAKACezz0UYXekuDwQCxTmA7GpPSau+Ya5vuMsr0MOoYqL39+vxq3/PXCEDACmzOA/r90NkDcU5gOz6xVfNxqeSuHTtp9zmk2uL/reUqPLidJvX3gIAtgOvmnj0Ze7yQCBQnAPIntaDmQcO3frN8K8SFRZJt/2nVBzzrnfUZv4bAMCbSROHbf8Nso7iHED2rPmeOXBoTGWwDxzqjwkzpAV3mOuffoH2FgAGbS3oB4pzANnRmZbWPGCul37LHHUfBTf+izdiUfLaWx6+020+APyjcZeJWTnHWVCcA8iOTStNr3nFRGnafLf55FtJXPrkD8z1ppVSss5dPgD8oTNtXlGUzAFmwBlQnAPIjmd/aOLrPhOtVfMeMxdJlbPN9UOfdZcLAH+w+81HjnWWBoKD4hzAwNVv8N4kb2PkrCVu83HpY981P5jsqJW2PuU0HQCOHag3cXnCWRoIDopzAAO3+n4TX/OJaL9sm6iSqheb65XLpe4ud/kAcMvuN6c4Rx9QnAMYmMZd0uZV5vq6z7jLxS9u/rIZrbh7S+a/D4BoSbeZmLYW9AHFOYCBWX2/WRmevpBJBJL3b/CBfzLXT7B6DkTWoQYTjxjjLg8EBsU5gHPXelCqXWGuF9/jLBXfuf5zZp7xvu3S6m+7zQeAG3ZbS8+4VaAXFOcAzt1Lq8xLtpOqvcN44Ckt805I7fGLr0rtKXf5AHDDLs7HTXWXBwKD4hzAubM3gl57m7s8/KpmmdkA1p7yCnQA0dGeyjwdlJ5z9AHFOYBzs/Upr11D8p5w5tzqNh8/KiySlnzZXK/5ntS8310+APLrSMrsN4kN9d6As6A4B3BunvyGia/+eDQPHeqLObd6LT+Sd0ogq+dAdDRYM85ZNUcfUZwD6L+G+sxDh679lNt8/O7DXzPxsw+aVxwAhJvd0kK/OfqI4hxA/617yMRVC5hAcDZTaqRp8831Y19ylgqAPLLb2KJ8OBv6heIcQP90d0nrHzHXNUvd5RIkH/mmaf3ZvEpqSjpNB0AeHHjVxBUT3OWBQKE4B9A/9RvMalC8wls5x9klqkzvuUTvORAFtLXgHFCcA+ifFx438fSF5ph6nN0Nd5m4dkXmZjEA4WMX57S1oI8ozgH0XWdaeuExcz37Fne5BNH0heagpu4u6XF6z4HQ6kxLB6wfwMdUussFgUJxDqDvXlplTrmsmChVznabTxDZp4ZuWsnkFiCsDh80M87jFcw4R59RnAPoO3tKy5xbmG1+LqbUeG89fvXvrjIBkEu0tOAcUZwD6JtUo7Sj1lzXLHOVSfAtvsfE6x9hcgsQRsk6E9PSgn6gOAfQNxsf83ooJa+dpTzhNJ1Am1JjJjd0d0mrvtHrpwMIIHvlvGKiuzwQOBTnAPrGbmmZy2zzAbNPDX3uR1LjLne5AMi+ljdMXDrSXR4IHIpzAGfXuMu8RBsbKlUvdptPGJw8ueVJVs+BULHbWkbT1oK+ozgHcHb2iaDT5kslcXe5hMmN/2Li5x/JfBkcQLDR1oJzRHEO4OxqrZaWGlpasmbmIvOk3ZmWnn3QbT4AsscuzocxrQV9R3EOoHc7as00kdIy6YqFLrMJn4xTQx868+cBCI7GXVK6zYtLyxiliH6hOAfQO3sj6F/eymzzbKtebA4naUp6BxMBCDZ71XzkWHd5IJAozgH0bttaE8++xV0eYVUSl675hLnmUCIg+Og3xwBQnAM4sx21UvN+Ly4tkxJVTtMJres+Y16R2Lkp87AnAMHTUG9izoRAP1GcAziz7b81cc0yWlpypTwhzbnVXP/iq85SAZAFbc0mZsY5+oniHMCZPW+NUJw8110eUXD958wPP9vWSru3uM0HwLmzDxVj5Rz9RHEO4PQad5kpLbGhUuVsp+mE3ripmZNwNjzqLhcAA3P4oInpOUc/UZwDOD374KHqxRw8lA/X3mbi2hVSe8pZKgAGYN92E49KOEsDwURxDuD0tln95rS05Me0+WaVrT3FoURAEKUazYxziRnn6DeKcwCnakp6U0Mkr6WlerHTdCKjsMjrPe+x+n7v5FAAwdFqtbQw4xzngOIcwKl21ErdXV48qdockoPcq1lmntBTjZmbcgH4nz1GcQTFOfqP4hzAqV543MQzb3CXRxQVx7wCvcfaHzpLBcA5sPeK0G+Oc0BxDiBTZzrzEJxZS5ylEln2oUS7t2SuxAHwtzd2m5iVc5wDinMAmV5aZfqcx01lM5MLpWWZYxVX3+8uFwD9k2o08ejL3OWBwKI4B5Dpj8+Y+Kqb3eURdYvuMnHtiswnfAD+ZR9AFK9wlwcCi+IcgNGZljavMtfvXeQul6ibVC1NmOHFnWnpmQfc5gOgb+w2tESVuzwQWBTnAIzXNpnNTOUJaXSl03Qi7/23m3jTSjNBB4B/MUoRA0RxDsCwp7TULDWbEuHGrCXmZNaGeulPtU7TAXAW9qp5z4FiQD9RnAMw7JaWafPd5QFPccyb3NKDjaGAv+3bbmJaWnCOKM4BePZtN5sOY0O9nme4d/UnzCsYW5/yTm8F4E/2jPOeV72AfqI4B+DZtNLENctoafGLkWOlObea6yeWu8sFQO8OvGrisvHu8kCgUZwD8Lz8tImv+IC7PHAqe2Po+kek5v3ucgFwZgesnvMxbKjHuaE4B+C9FJus8+LiGC0tfjNhhlQ524u7u6TnfuQ2HwCnd9ia1MIBbjhHFOcAvI2gPWP6KmfTK+lH195m4hceZ6wi4Ef2hlCmteAcUZwDyDwVtOr97vLAmVUvNqcNMlYR8J9Uo5Ru8+KSOKeD4pxRnAOQ6jeY+IqF7vLAmRXHvI26PdZwYijgKz3TriSvpYVN9ThHFOdA1O3bbjYYlsR5KdbPrr3NPOG//BQbQwE/adxlYr6PYgAozoGoe2WtiWcuYrXHz8oTUtUCL+7uyhx/CcAte+WclhYMAMU5EHV2v/nkue7yQN9c+UETP/djNoYCfmHPOL9wgrs8EHgU50CUpdukbcdXzguLzKos/GvWEjNNZ992NoYCfmGfDsrKOQaA4hyIsh21ZuU1UcUTShAUx6RrP2Wu1z/qLhcAhn0A0aiEszQQfBTnQJS9utHEnAoaHFfdbOKNj2Wu2AFwo8EqzsdNdZcHAo/iHIiybdZm0EtmuMsD/ZOoMieGdqal2hVO0wEiL91mZpxLvAqJAaE4B6KqPSUl67y4OCa9Z77bfNA/V3/cxGwMBdyyV80Zo4gBojgHoqp+gynoJszwCnQEx8kbQ3t+0AKQf60HTcyqOQaI4hyIqpefNvG0a9zlgXNTHJPm3Gqu1/7QXS5A1NkHEJUnnKWBcKA4B6JqzxYTM0IxmOYuNfHGxzJ7XgHkT8sbJmZSCwaI4hyIIrvfvLAoL5MFvv/97+vKK6/UkCFDNGTIEM2YMUPf/va3dfTo0Zx/7dCaMMN7k7zCfONjbvMBospeOR9+obs8EAoU50AUbVtr+s0rZ0uxoTn7UkePHtV1112n22+/XS+99JLefvttvf3229q6das++9nPat68eUqn0zn7+qE3/zYTb2DmOeDE69tNPIHJVxgYinMgiv60zsSXvz+nX+q+++7Tr3/9ayUSCT399NPq7u5Wd3e3nn/+eV1yySV6/vnn9dWvfjWnOYTaexeZzbw7ajNX8ADkR6rRxGwIxQBRnANRtPUpE/fMy86R//iP/5AkPf3007ruuus0aNAgDRo0SHPmzNGTTz4pSVqxYkVOcwi10rLMMZjPPOAuFyCKWg+aaS3FMWnEWLf5IPAozoGoadwlHdrvxSVxaVJ1Tr/ca6+9pmPHjmny5MmnfGzqVK/XvampKac5hN7Cz5n4+UeYeQ7kkz3j/KKp3j4eYAAozoGoseebT5vv9Ink97//vSRp+vTpznIIhSk15uCT1oPSn2pdZgNEi93SUlrmLg+ERlEymTzjB1Op1Ilfe/s85EfPprl0Os398IGgPj7KXnpaPds/D5W/W4ezmHtFRYVisbMfZpROp/Xoo4/q7rvvVnFxsTs6D0gAACAASURBVL7+9a/36+vU1taqtrY24311dXVatmyZEolEoO5Htlzw7ms1/Hi/efuq+9RU6vaUwqA+PsKK+5E78T+u0/HjwHR4yCgd6sO/L/fDX/x2P4r27t171k9qaWlRS0tLHtJBX3R0dKgv9w35EbTHx7vqzWbQvYPfpcNZ/r+USCR6/fiNN96oX/7yl5Kk888/X+vWrdP73ve+fn2N2tpaLV++PON9y5Yt07JlyyQpko+P5lHT1fP6w/l/+q0aXtuhrsG5m8LTV0F7fIQd9yP7Bv/Pn08U52+cV6YD/fj+w/3wF7/cj6Lx48ef8YOpVEotLS0aPny44vH4GT8P+dHY2KiOjg4NHjxYFRXsBnctiI+P4ua9Gtzm9XcfPW+IRlxxtS4oGpy1P78v/y8bGhr0gQ98QP/93/+tPXv26G/+5m9033336SMf+Uifv868efNUUFCQ8b66ujqtWLFCNTU1mjt3br9zD7zx4/VO7aU6743XNKj7Hb37jRd1eM7HnKUTxMdHmHE/cif+TupEPHz8ZSrupa7qwf3wF7/dj6LeVrmSyaRaWloUj8fPuhqG3EulUuro6FAsFuN++EAgHx9NdSfCQZdcofETL8t7Ci+++OKJeOPGjbrxxhv193//97rgggu0cOHCPv0Zc+fOPaUAv/fee7V8+XIlEgktXbr0DL8z5P7qk9LDd0qSRmz7lUZ8+P8421MQyMdHiHE/cqil4UQ4avrVUkXirL+F++EvfrsfbAgFosSebz6lxlkaPWbNmqWHH35YkvTlL3/ZcTYhsOAObwKP5J0Au2eL23yAsOvuMtOvCouk8oTTdBAOFOdAlLyy1sRTr3GXh2X+fG9G9x/+8AfHmYRAcUyqWmCuNz/pLhcgCpqSZvpVeYIxisgKinMgKpr3SweOz+MtLJISVXn5svF4XAUFBWpoaDjtx7u6vCe2vkx5QR/MtVp6nn1Q6ky7ywUIO/tE3gq3E5IQHhTnQFTY880TVab9Iceuv/56SdKPfvSj03685wTRq6++Oi/5hN60+dLI4ycUtqcyT4MFkF32AUS0tCBLKM6BqNiz1cSVs/P2Ze+809ug+I1vfEMPPfTQiZXyI0eO6MEHH9Tdd9+twsJCfelLX8pbTqFWWCTNudVcr3vIXS5A2L2x28QVE9zlgVChOAeion6DifPYb/6e97xHP/rRj/T2229r2bJlKi4uVkFBgUpKSvTpT39aR44c0cMPP8wpodlkt7bUrfFamgBkH20tyAGKcyAKOtPe9I4eE2bk9ct//OMf10svvaS//du/VWlpqQoLC1VRUaGPfexjeuWVV/ShD30or/mE3phKaVK1F3d3SesfcZsPEFbpNhPT1oIsYVsxEAWvbzcbA8dNleL5P8Rq5syZ+sUvfpH3rxtZV90s7dzkxesfla7/PJMkgGyzX5Vi5RxZwso5EAX2vOs89pvDob+81RTj+7Yz8xzIts60mXFeWibFhrrNB6FBcQ5EgX34UOUsd3kgf0rLpOrF5rqWjaFAVr2ZNBOwWDVHFlGcA1Gwo9bEl+S33xwOXXWziTevMoUEgIHbt93EYyrd5YHQoTgHwq5xl5Rq9OJ4BSs8UVK1wMyzTzVK29b2/vkA+q71oInLx7vLA6FDcQ6EXc+mQMmb4MGmwOgojjHzHMiVfTtMzKIHsojiHAi7bb81Mf3m0WPPPH9plXdqKICBs08HHTHWXR4IHYpzIOzsVobR9EVGzoQZ3vhMyZsuUbfGbT5AWPS0C0qsnCOrKM6BMEs1mjm8hUXSlBqn6cARe2MorS3AwHWmpQPWyvlIVs6RPRTnQJjttmZbj5vKHN6oql5s9hpsW5t5cAqA/ks1MkYROUNxDoTZrhdNzOFD0TWm0rS2dHdJ6x9xmw8QdHa/eaLKXR4IJYpzIMy2PmXiy9gMGmnX3mbiF3/uLg8gDOwZ56Vl7vJAKFGcA2HVnsp8Arm02l0ucK96sTdaUfLaneyVPwD9k3rDxOOmuMsDoURxDoRVss70RJYnvDdEV2lZ5oZgNoYC587eDMrKObKM4hwIq2SdiTlaGpI05xYTr3/E/PAGoH/sV54umuouD4QSxTkQVq9uNDH95pCkKxaaiT3N+zPbngD0nT3jPF7hLg+EEsU5EFb1G0w8YYa7POAfJXFp+kJz/cwD7nIBgqqhXkq3eXFpGW0tyDqKcyCMmveblZ3CIsYowrAPJHppFa0tQH8dss4JoGUQOUBxDoSRvWo+upLDh2BULTCnGbYelOrWuM0HCBq735yN9sgBinMgjOxJAoxQhK04Js251VwztQXon307TMwYReQAxTkQRnu2mnj85e7ygD/ZrS11a6TOtLtcgKCxN4P2vAoFZBHFORBGbAZFbxJVpqhIt0kbH3ObDxAke7aYeDQ958g+inMgbBrqvdNBJW8z6Dhm8OI0Zi4y8QuPu8sDCJpma0NoospdHggtinMgbOxVnWnz2QyK07NbW3bUmh/oAJxZ4y4Tl8S9BRAgyyjOgbCptw4foqUFZ1I5W6qY6MWdaekFWluAs7KLc16VRI5QnANhs3OTidkMit5ce5uJ1z/qLg8gKJqSJmaMInKE4hwIk3Rb5pHskxijiF5ctcS8LL9zU2YvLYBTNe01ccUEd3kg1CjOgTBp3m9OfIxXMOYLvRs5VrrkeOtTd5dUu8JpOoDv2SvnPW1hQJZRnANhYh8+NKXGWRoIkJqlJn75aXd5AEHwuvXKJD3nyBGKcyBMdr5o4rGcXIc+mLnIOzVU8lpb7KPJARjdXZkbQlk5R45QnANhstsao8j8XfRFvEKavtBcb1rpLhfAz1KN5jTdeAVjapEzFOdAmNibQSnO0VdzbjHx9t+6ywPws9aDJi6Ju8sDoUdxDoRF4y5vZUfyXm5lMyj6qmqBKTbqNzC1BTgdWlqQJxTnQFjY883ZqIT+KI5J1Yu9uLuL1hbgdPb+0cSjK93lgdCjOAfCwt4MmuDwIfTTlR808QYOJAJOYW+WHn2ZuzwQehTnQFjYTxz0m6O/ps03rVC7t2S+hA8gs91rVMJZGgg/inMgDLq7Mttaeg6WAfqqsMi0tkjSuofc5QL4kb3hnrYW5BDFORAGTUkp3ebFJXE2g+LczLjBxBsfM6fNAlHXvN98jy0t43sscoriHAgD5psjG6bUePObJa+tZc+WXj8diIympIl7HiNAjlCcA2Gwy9oMOnmuuzwQfLOWmPiFx93lAfgJCyDII4pzIAzqN5iYMYoYiLlLTfzSKnd5AH5yqMHEbAZFjlGcA0HXmZZetzYqTWAzKAZg3FTTT9uUzNxoDERVss7EjFFEjlGcA0H3ZtIr0CVvo9IINiphAAqLpDm3muv1zDwHMnrOaWtBjlGcA0Fnt7SMqfSKK2Ag7AOJNq00P/wBUdSZZkMo8oriHAi6A6+auHK2uzwQHhNmeD/oSVKqUXplrdt8AJeSdWasaHnCe4USyCGKcyDoMg7GoBcSWXLVzSZmagui7M2kicdw+BByj+IcCDp7xNekand5IFxmLjLx5lVSe8pdLoBLB+pNXJ5wlgaig+IcCLLm/VLrQS+ODWXEF7InUWXGcqbbpJefcpsP4IrdOpi43F0eiAyKcyDI7BMcx02VimPuckH42K0tm37uLg/AJbuthZVz5AHFORBkDdbLrcw3R7bNWmKm/9StobUF0WTPOOeQN+QBxTkQZDtfNPF4Xm5FllVMNDOdO9Ne7zkQJalGM0o0NtQc0AXkEMU5EGT2is6lbAZFDkybb2KmtiBq7PnmFROdpYFooTgHgirVaJ44Couk0Yz4Qg7MucW0tmxbazYgA1HQwKQW5B/FORBU9nzzRBUngyI3xk2VLjm+n6G7S3qJ1hZEiD2p5SL6zZEfFOdAUNkrOpewGRQ5ZE9t2fKkuzyAfLPbWi6c4CwNRAvFORBU9mbQSVe6ywPhV7XAxPUbzAY5IOzsfT09m6OBHKM4B4LKbmthvBdyaUylGdXZnvLGKgJRYM84Z0Mo8oTiHAiqnraW4hi9kMi92beYmAOJEAVNSfMqUbzCG6UI5AHFORBEDfWZTxqcDIpce+8iE29eJaXb3OUC5IO9r4dXJ5FHFOdAEP2p1sS81Ip8KE+Yntt0m7T1KafpADnHjHM4QnEOBNG+HSampQX5Yk9teZHWFoSc/X22fLy7PBA5FOdAEDXuMvHoy9zlgWipWWZaqDav4kAihJv9fZaVc+QRxTkQRHYv5OQaZ2kgYuIVUuVsL+7ukjatdJsPkEv2RCyKc+QRxTkQNKlG6dB+Ly6O8aSB/Kr+oIm3/dZdHkAutae877U9+D6LPKI4B4Jm5yZv1VKSRiWkwiKn6SBiZi4yI+W2PuUVMUDYHNpvvs+OHMsYReQVxTkQNHYfZE+LAZAv8Qpp2nwv7kxLLzO1BSG0e4uJGaOIPKM4B4LmwKsmHn+5uzwQXTNvMPELj7vLA8iVN3abuGeEKJAnFOdA0LxubVIaU+kuD0TX9IVmassra5nagvCxN92PGOMuD0QSxTkQNAc4tQ6OlZZJ77FaW15a5TYfINvsA4hYBEGeUZwDQZJqNBvwxlR6/b+AC/aBRBsedZcHkG2d6cxXKFkEQZ5RnANBsqPWxKNZzYFDMxdJJXEvrt8gNe93mw+QLc37vQJd8hZAWARBnlGcA0Gy3zpOmrm7cCk2NPNAos20tiAk7MOHyhPO0kB0UZwDQWJvUpp2jbs8AEmaYU1tWU9rC0LCfhWIRRA4QHEOBIm9osN4L7hWvdhMbdm5idYWhMOerSYeN8VdHogsinMgKDrT0ptJLy6O0QcJ90riZmqLJL3wmLtcgGyxD3pjEQQOUJwDQZGsM5uULq12mwvQ4/L3m/jlp93lAWQLPedwjOIcCIqeVXOJPkj4x6wlUmGRFzO1BUHXvN+Mqy2J870WTlCcA0Gx60UTj6UPEj5RWiZNO97awtQWBJ3d0jJirPnBE8gjinMgKOyV81EJV1kAp7rygyZmaguCzC7OL+LwIbhBcQ4ERf0GE/fMlwb84OSpLfbR50CQ2GdJ0G8ORyjOgSBIt0mtB704NtRrJQD8oiSeuUl5I1NbEFCvW5tBL5nuLg9EGsU5EAQ7N5l4HC+1woeuutnELzzuLg9gIA5YB72xcg5HKM6BILD7IMdUussDOJPqxWbzXLJO573xmtt8gP5qPWimDRUW0XMOZyjOgSDYaU1qmXSluzwGYN26dVq8eLGGDRum8847T0OGDNE111yjn/3sZ65TQzaUlklVC05cnv+n3zpMBjgHDdaq+ehKs48CyDOKcyAI7JXzAM7d/epXv6qamhr9/Oc/V2trqzo7O/X222/rueee04c//GEtXbrUdYrIhis+cCIcsu3XDhMBzkGq0cQjx7rLA5FHcQ74XXdX5ol1l8xwl8s52Lhxo774xS9q8ODB+vrXv66DBw/q2LFjamlp0Te/+U0VFxfrv/7rv/Tggw+6ThUDVb3Y27AsafD+bYq1Np7lNwA+svePJmZvDxyiOAf8LtVoTqwrLfMmYwTIt771LUnSd77zHd11110aOXKkJGnYsGH6/Oc/rx/84AeSRHEeBqVl0pSaE5ejdj7nLhegv5J1JmZSCxyiOAf8zn7CCOBm0N/85jeSpI997GOn/fhHP/pRSVJ9ff1pP46Asaa2XPD6Sw4TAfrJ/l7LZlA4RHEO+J39hJGocpfHOTp8+LCOHTumoqLTH4N99OhRSdJ5552Xz7SQK5NrTkxtiTfUqeit/W7zAfrCntQSG+ptCAUcKUomk2f8YCqVOvFrb5+H/Ein0yd+5X64l6/HR9lrWzX0eNw8dKxafXzvKyoqFIv1b8LBE088IUm64YYb+vx7amtrVVtbm/G+uro6LVu2TIlEgseHYxdOnKXzX10nSSrc9ISSF7C5zjWez3tX/OZujTked5aMVMO+3P5Qyf3wF7/dj6K9e/ee9ZNaWlrU0tKSh3TQFx0dHerLfUN+5PrxMeKAmRfd0Fmst3x+7xOJRJ8/t62tTV/84hdVWlqqL33pS33+fbW1tVq+fHnG+5YtW6Zly5ZJEo8PxzrGvk+XHS/Oh9T/Tq9NvtFxRujB8/nple/eeKI4P1w6Om/fQ7gf/uKX+1E0fvz4M34wlUqppaVFw4cPVzwerE1oYdTY2KiOjg4NHjxYFRUVrtOJvHw9PkqONJ2IL3jPHA0rLc/Z1xqo/vy/PHr0qBYvXqy2tjY988wzuvTSS/v8e+fNm6eCgoKM99XV1WnFihWqqanR3Llz+/xnIfsGjfqQjtbep0Hd72j4/2zTJSOGqNvH/2+jgOfz3sXrzffZwsuuUm+1UTZwP/zFb/ejqLdVrmQyqZaWFsXj8X6thiE3UqmUOjo6FIvFuB8+kJfHR6pRaj3+pBGv0LhpM3PzdRxYsmSJXn31VdXV1eld73pXv37v3LlzTynA7733Xi1fvlyJRIK56T7w9sT3nWhtGde4VZr2KccZRRvP52dx2LSxxKfPVzzH/0bcD3/x2/1gQyjgZ/aJdQGc1HI6XV1duvHGG7V69Wo9++yz/S7MEQxHpv21uah9yF0iQF/YB72VJ5ylAUgU54C/HTjpOOmAa25u1sKFC/XLX/5S//qv/6qJE4N32in6pn3aX+vYoELvYucmMwkD8JvuLlOcl8QDeQozwoXiHPCzpHViXeJyd3lkwe9//3tVVVXpmWee0de//nX98z//s+uUkENHzx+m5vHvM+/YtNJdMkBvGndJnd40NI2uPDEKFHCF4hzws33bTRzgl1pXr16tefPmqbW1VU8//bTuuusu1ykhD5omXW0utjzpLhGgN/UbTMzhQ/ABfjwE/CwEPef19fVavHixhg8frnXr1qmyMph/D/RfakyVjg0qVMHRbmlHrdfaMpKZ5/CZA6+a+MIJ7vIAjmPlHPCrVKN3ap0klZZJI4JZ1Nx99916++239eabb+rd7363CgoKzviGcHlnyAilL6k273jhMXfJAGdi7+0J4CnMCB+Kc8CvmpImHpUIbB/k6tWrXacAh45UXW8uNtPaAh+yX6GcMMNdHsBxFOeAX71u9ZsHeHpAOp3WsWPH+vSG8Gmf9tfmB8v6DebVIMAP0m1mIaQk7r1KCThGcQ74ld0HOfoyd3kAA3D0/GGZrQIbaW2Bj+zb7o1SlKRJ1b1/LpAnFOeAX9mTWuiDRJBddbOJX3jcXR7AyULyCiXCheIc8Kt9PGkgJK5aYmIOJIKf7Nlq4nFT3OUBWCjOAT9qT2UWMCE4HRQRNnKsaRno7mJqC/zDntQyjhnn8AeKc8CP7FXzcVMDO6kFOGHOLSZ++Wl3eQC21zaZmEkt8AmKc8CPknUmpqUFYVC9WCqOefGOWm+OP+BSU1LqTHtxecL8/wQcozgH/OiN3SbmOGmEQbxCmlJjrpnaAtfsVfOAnsCMcKI4B/zIniAw/nJ3eQDZZLe2bHjUXR6AJDXuMvGkK93lAZyE4hzwI/t0UNpaEBZXLJRiQ704WceBRHDLntTC91n4CMU54DftqczivDzhKhMgu0riUuVsL+7ukjatdJsPos2e1MJZEvARinPAbw7tNyfWjRzrFTRAWMy8wcTraW2BI60HTVtLYRHjauErFOeA37zOyaAIMXtqS/0GDiSCG28mzSII42rhMxTngN/YLS2s5iBsSsuk98w31xxIBBd2WpNaaB2Ez1CcA36zb4eJKya4ywPIlatuNvHmJ93lgeiyx9VWznKXB3AaFOeA39iblFg5RxjNXGT2UtDaAhfqN5iYSS3wGYpzwG/oOUfYxYZ6YxV7MLUF+fZm0sTjOOgN/kJxDvhJqtEcJ11axqQWhFf1B0384s/d5YHoaUqaGfuxofScw3cozgE/2WetmvNSK8KsaoE5kGjnJlpbkD/2yaBMaoEPUZwDfmI/aYyh3xwhVhzzxipK3ki72hVO00GEJOtMfBEtLfAfinPAT5J/NPH4y93lAeTD5Lkm3sLUFuTJgVdNfMl0d3kAZ0BxDviJPeOclXOEnX0g0e4tmf//gVyxN90zEQs+RHEO+EmDNUaR4hxhFxvq9Z73ePaH7nJBdNhtLZdWu8sDOAOKc8AvOtNm5bA4xgQBRMO0a0y8eZW7PBANTUkzEas8YV65AXyE4hzwC/ulVjYpISqqF5tpGQ31XnsLkCusmiMAKM4Bv0g1mngI880REfEKadp8c83Mc+TSzhdNPHaKuzyAXlCcA35hr+jQb44omXOLibc+5S4PhB9jFBEAFOeAXxzca+JxrOggQq5YaHp/923PLKCAbLI33Y+jOIc/UZwDfmE/acQr3OUB5FtJPHNqy3M/dpcLwqtxl9l0H69g0z18i+Ic8At7tfCSGe7yAFyo/qCJN610lwfCy95sPG6q2YgM+AzFOeAH7Skp3ebFhUXSyLFu8wHybeYib+655G2OZmoLsm2XtRl0Agsg8C+Kc8AP9nFiHSIuNlSavtBc09qCbGvcZWL29cDHKM4BP7DHKLJqjqi68qTWlu4ud7kgfE5uawF8iuIc8IM9W03MkwaiavpCb3OoJLUelPbQ2oIsaag3iyAlcb7PwtcozgE/aN5v4tGXucsDcKk45p0Y2mP9o+5yQbic3DrIZlD4GMU54AcHrDGKoxLO0gCco7UFuWCPquXwIfgcxTngB28mTczsXUTZlBqptMyLU43Sn2pdZoOwOPCqiS+b5S4PoA8ozgHXmvd7/bWSN7GC4hxRVhyT3rvIXNc+5C4XhMfOTSam3xw+R3EOuNZzYp3EwRiAJM1dauKXnzJnAADnovVg5hhF2lrgcxTngGt2L2S8wl0egF9UzjYjRdtT0o5ap+kg4OzTl8dN9V6dAXyM4hxwbe8fTXzJdHd5AH4y02pteeFxd3kg+OwFEE4GRQBQnAOucQARcKqrbjbxy09JnWl3uSDYXt1oYhZAEAAU54Br9vzdMZXu8gD8ZFJ1ZmvLS6vc5oPgsk8GTVS5ywPoI4pzwDX7ACImtQCewiJpzq3m+o/PuMsFwZVuy9x0T1sLAoDiHHCpod5MoigtY0MoYLv8/SbetJKpLei/3VvMQVYVE9kMikCgOAdcOmStmtPSAmSaUmNeTUq3SVufcpkNgmiP1dLCqjkCguIccMmeIkBLC3CqWUtMzNQW9NeerSYef7m7PIB+oDgHXDrUYOJRCWdpAL518tSWntN0gb543dpwz8o5AoLiHHDJntQydoq7PAC/SlSZCRvdXVLdGrf5IDjSbdIB69VJJrUgICjOAZfsthZmnAOnN32hidc/6i4PBEuyzmwGHVPpbboHAoDiHHCluytzjOK4qe5yAfzsqpu90YqStG2tN/ccOJtknYkvoaUFwUFxDriyb7s59TA2VCqJu80H8KtxU6XRx6cZdXdJLzzmNh8Egz0bP8FmUAQHxTngir1qzkYloHdzbjHxpp+7ywPB8domE0+qdpcH0E8U54Ar9kuujFEEenfNJzJbWxp3uc0H/ta4y0z2KSxiMygCheIccOXgXhOPvsxdHkAQlJZJlbPN9UZaW9ALe/FjdKXXOggEBMU54AoHEAH9M9tqbdnypLs84H97/2jiS2lpQbBQnAOu2MX5RUxqAc5q+kLT2rJ7S+Y5AYBt9xYTT7zSXR7AOaA4B1zo7so86bBnEgWAM4tXSDMXmesXHneXC/zN/sGNlXMEDMU54IK9ma20zKwGAujdVTebeNNKd3nAv5r3m2lYpWUsfiBwKM4BFw4xRhE4J1ULzJkADfW0tuBUe6yWlkurWfxA4FCcAy7Y/ebxCnd5AEETGypdtcRc09qCk9mTWug3RwBRnAMutLxhYsYoAv0z8wYTP/+It4cD6LHttyam3xwBRHEOuGCvnHM4BtA/VQvM+NGmpLR5lcts4CfdXZmtTpwMigCiOAdcsF92LS1zlwcQVLOs1pb1j7rLA/6SrJPaU16cqOLwIQQSxTngQqrR+7WwiBnnwLmwW1vq1piCDNFWv8HErJojoCjOgXxr3i+l27w4XiEVx9zmAwTRpGrTEtaZ9gp0wD4ZdPJcd3kAA0BxDuRbz6q5ZPpmAfTflR80MVNbIGW2DI5hvjmCieIcyLcDbAYFsuIvbzUxrS1oT5nNoLGh0jhaBhFMFOdAvtkr58MvdJcHEHTlCWnafC+mtQU7N5mxmhNmcPgQAoviHMi3PVtNzMuuwMBUW60t6x5ylwfc222dDFo5210ewABRnAP5Zq+cjxzrLg8gDKoXm3F529Z6G64RTX9aZ2JOBkWAUZwD+WYfQFQx0V0eQBiUlknTF3pxd5e0/hG3+cCN7q7MzaCsnCPAKM6BfGo9aFbOi2McQARkw9ylJl7/qOk7RnTs2+59f5W8jaAlcbf5AANAcQ7kk93SwuFDQHZMm2+KsX3bpT1bev98hE8DU7AQHhTnQD7ZTyCj2QwKZEVhkXTVEnNdy8bQyNn+WxNPot8cwUZxDuSTXZzHK9zlAYRNjdXasmmlOYUX0fDaJhPTb46AozgH8qnlDROPvsxdHkDYTKo2o0lbDzLzPEpaD5rDh0riHD6EwKM4B/LJnsPLyjmQXbNvMfH6R93lgfx6Za2JK2dz+BACj+IcyCd7QygHEAHZ9Ze3msLs5afM9A6E2/4dJp48110eQJZQnAP5km6TDlkHpLByDmRXeUKaXOPF3V3S88w8jwS735yN9ggBinMgXxrqzfzlkWPNqYYAssfeGLqOqS2h190l7TxenBcWSVNqnKYDZAPFOZAvdktLecJZGn7xv/7X/1JBQYHrNBA2Vyw0rS3JusxTIxE+9RvMZJ5EFYseCAWKcyBfDlhjFCNenK9evVrf/OY3XaeBMCqJewV6D1bPw61+g4l7WpqAgKM4B/LlwKsmHpVwloZrv/jFL3TjjTe6TgNhZre2PP+IaSdD+Ox60cTTrnGXB5BFFOdAvthtLeMvd5eHI4cPH9Ydd9yhD37wgxo0iG89yKErFkqlZV7cgoZJ2wAAIABJREFUetCb3ILw6e6SdtSa60SVs1SAbOIZEsgXu/d15Fh3eThy0UUX6YEHHlAikdC6detcp4MwKyySapaZ6+d+7CwV5FDjLtNvPm4qE7AQGhTnQL40W2MUI3iCXTqd1t13360dO3Zo5syZrtNB2NmtLXVrmHkeRtusw4cmzHCXB5BlHKMF5EPjLhMXxyI5UaChoUEjR450nQaiYtxUaVK1N2avu0vatFK69lOus0I2bfutiTl8CCHCyjmQD/u2mziiKzwU5sg7e/V8zQPu8kD2dXd5r4j0iOj3VYRTUTKZPOMHU6nUiV97+zzkRzqdPvEr98O9/jw+hu7dpePb09R2fpkOhvT+VVRUKBaL5fzr1NbWqra2NuN9dXV1WrZsmRKJBI8PH/DD80dhxXSNOW+IBr1zRNq3XQdeWK13Rk92kotrfrgf2XTegT9pdKf3nNh1wVg1dJ6vYwH6e4XtfgSd3+5H0d69e8/6SS0tLWppaclDOuiLjo4O9eW+IT/68vhIJHecKM7fOjY41PcvkUjk/GvU1tZq+fLlGe9btmyZli1bJkmh/vcNGtfPH+clZunC156VJHXX/pf2zvq0s1z8wPX9yJYx235zIm561+VK7tvfy2f7V1juR1j45X4UjR8//owfTKVSamlp0fDhwxWPx/OYFk6nsbFRHR0dGjx4sCoq2JXuWn8eH2Ubm0/EQyb+hXp73AVZvv5fzps375TTRevq6rRixQrV1NRo7lz6T13zy/NHwawl0vHifPRrv9HRJV/VsUGFzvJxxS/3I1vKN+45EZ9X+b7AfU8N2/0IOr/dj6LeVrmSyaRaWloUj8fzshqG3qVSKXV0dCgWi3E/fKBfj4/O1hPhyAlTNJL7NyBz5849pQC/9957tXz5ciUSCS1duvQMvxP54pvnj3F/L/36a1LjLhUeeUvjD++Uqha4y8cR39yPbOhMS8nNJy5Hznx/4L6nhup+hIDf7gcbQoF8sMcojql0lwcQNYVF0lzrh7Unv+EuF2THa5vMoW7lCQ4fQuhQnAO5lm6TmpLmuufkQgD5UbPMG2EqeSdKNtS7zAYDtXOTiStnez+AASFCcQ7kWqrRG/sleSeDlrjvZwMiZeTYzFaWdQ+5ywUDt/NFEycud5cHkCMU50Cu9bz8KnkvwQLIP3vm+cbHzA/MCJ76DSa+aom7PIAcoTgHcs1+CZ3iHHCjaoEUPz5NqCmZWeAhOPZtl1oPevHIsd4bEDIU50CuHbI2g45KOEvDb44dO6Zjx465TgNRURyT5txqrmltCaYdtSaunO0sDSCXKM6BXDvwqomHX+guDyDqrv64iTevktpT7nLBuXn5aRNP5jwDhBPFOZBrds85YxQBd8ZUmrF77Slp/SNu80H/dKYzJ7XMXOQuFyCHKM6BXGvcZeI4J7sCTr3/dhM/92N3eaD/XttkXu0YN5XvpwgtinMgl9pTZuW8sEiqmOg2HyDqZi0x40yTdZk9zPC3Pz5j4vfMd5cHkGMU50AutR40I9viFeYgFABuxIZ6hxL1eOFxZ6mgn7Y+ZeKp17jLA8gxinMgl2hpAfznqptNvP4RNoYGQfN+6cDxsbTFMVbOEWoU50Au7dtu4p6NaADcmlTtvUlSuk2qXeE0HfRB/QbzKuSl1bwKiVCjOAdyqbXZxCPGuMsDQKYF1sZQWlv8b8uTJqalBSFHcQ7kkt3WMoKT7ADfmLnI6z+XvPF89og++Et3l/TKWnNdtcBdLkAeUJwDuURbC+BPsaGZJ4auecBdLujdtrXe5npJGjmW76UIPYpzIJcOHzTxsDJ3eQA41YLbvRGnkrRpZeaBYfCPP60z8RULzT0DQoriHMiV1oNmtSc2lLYWwG/GTTUbQzvT0uZVbvPB6dmz6Kve7ywNIF8ozoFcaag3ccVEVnsAP7r64yZ+7sdmIgj8oXm/tGeLFxfH6DdHJFCcA7nSlDQxJ4MC/lS92GwM3b2FjaF+88Jj5gemCTMYoYhIoDgHcqV5v4kpzgF/ig2VrvmEuX7ux+5ywanqN5rYPjwKCDGKcyBXWt4w8eASd3kA6N3cpSbe+JjZKwK3uru8w4d6TKlxlgqQTxTnQK7YK+ejEs7SAHAWiSqpcrYXd6alNd9zmw889gjFMZXeBl4gAijOgVyxZ5zT1gL42/utE0PXPOAV6XDrxZ+bmJYWRAjFOZAr9sr56Ep3eQA4u+rFUnnCi1sPZo7vgxsvWaMte17ZACKA4hzIhXSb9yZ50wVK4m7zAdC7wiLpL60TQ1ff7y4XeNOuelpaSuLS5BqX2QB5RXEO5AL95kDwLPycGdVXtyazNQ35tWmliafN55wIRArFOZALh6zinE1MQDCUxKVZS8w1q+fuvPy0ia/4gLs8AAcozoFcsFfO4xXu8gDQP9feZuLnH5HaU+5yiap0m/Ta8cOgimPSzEVu8wHyjOIcyIV9O0w8/nJ3eQDon0nVZp52Z1pa/W2n6UTStrVmWs6l1ezZQeRQnAO5YB9iQs85ECzzrdVzxirmn93SMnmuuzwARyjOgVxo3GVi2lqAYKlebM4maD3onRqK/OhMe+1EPa5acubPBUKK4hzIhYZ6E3MAERAshUXS1R8316vv946SR+7VbzCvVJQnvJNBgYihOAdyoaetJTbUjGYDEBzXfsr0OifrvD5o5J7d0lK1wF0egEMU50C22S0trPoAwVQSz2ypePIb7nKJkro1Jr7qZnd5AA5RnAPZZre0DGHKABBY13/OHH6zo1bavcVpOqG3e4v5/lkS9ya1ABFEcQ5kW6rRxKycA8FVMdHbHNpj5XJ3uUTBhkdNfMVCWgIRWRTnQLa9sdvEoy9zlweAgbvhLrN6vvWpzAPGkF32lJY5t7jLA3CM4hzItn3bTVxa5i4PAAOXqJIm15jrtT90lkqo1W8wG+njFdK0+W7zARyiOAeyzT7umzGKQPDZYxXXfC/zMY7sWPeQiWctMa9WABFEcQ5kmz2tZRgr50Dg2YcStaek1d92m0/YdKall1aZ67lL3eUC+ADFOZBNrQfNhtDimDRirNt8AAxcYZF047+Y6zUPSOk2d/mETd0a09IybqrXSgREGMU5kE32y93DynhpFgiLObd6J1ZKXiH57INO0wmVTT83MbPNAYpzIKvslpZ4hbs8AGRXYZE397zHmgek7i53+YRFuk3abLW0TF/oLhfAJyjOgWyyJ7Xw0iwQLtd8wkxgakpK29Y6TScUtj5lWoRoaQEkUZwD2XWkxcSsnAPhUhzzJon0ePIb7nIJC3tKC7PNAUkU50B22W0twy90lweA3LjuM2YvyY5a7w3npj1l/v0Ki7y+fgAU50BWvU5bCxBqFRMzi8hH7qT3/Fy98Jg3RlGSJlVLI5luBUgU50B2HbGmtdDWAoTTjf9iVs93b8nc0Ii+s6e00NICnEBxDmRLus3MOJcozoGwqpgoLbjDXP/q393lElTN+6U/1XpxcUy6akmvnw5ECcU5kC0N9ebl7YqJUmyo23wA5M4Nd5nH+M5N9J731/pHzPfLqgVSSdxtPoCPUJwD2UJLCxAd8Qrp2k+Z65XL3eUSROsfNTEtLUAGinMgWziACIiWG//FrPjuqKX3vK921JozIUri0rT5TtMB/IbiHMiWfTtMPP5yd3kAyI+SuHT1J8z1E8uZ3NIXq+838VVLaGkBTkJxDmRLO20tQORce5u3oVGSknXeeECcWfN+6eWnzPV1n3GXC+BTFOdAttiTWpjXC0TDyZNb1jzgLpcgeO5H5tWFKTXSmEqn6QB+RHEOZItdnJeWucsDQH5d/7nMyS1bn+r986OqMy0992Nz/f7b3eUC+BjFOZAt9oZQVoOA6Dh5csvjX6L3/HQ2rfTaWiTv32zmIrf5AD5FcQ5kQ7rNHEMdG8qMcyBq7MktyTqvEEUme9X82tvMKasAMlCcA9nQUG/iionu8gDgRklcWnyPuf7pF7wf2uFJ1pmDmopjma80AMhAcQ5kg/0kzFgwIJoW3CElqry4KSk9+Q2n6fjKM9ZG2aoFTLQCekFxDmRDU9LEI5jUAkRSYZG09Fvm+v/7v6bHOspaD0rPP2KuGZ8I9IriHMiGA6+aePRl7vIA4NaUGu9N8vahPHKny2z8oXaF2ZMzqdr8+wA4LYpzIBvsMYq8XAtE2//f3v3HR1Xf+R5/D0kg5AcMBDQtVAZEFwsKW0WrtSVQ6sPKj5Zf+5B9AILFR9uF9q69oGuKAgWv+ON2vcV6taZLKG1lxcX1wU/LtQS3XMTt1liMF7v8SLZgA0kgk18MJOHcP8bJOQmTZEgy8z2Z83o+HnnkezKT5AMnk3nnO9/z+T7wj/bFjge3Skd/Z7Ye05y936d8y1wdQC9BOAd6AuEcQERggvTlBfbxlpXeba34doG97C/TL31xrtFygN6AcA70hD9/aI/p1gJg4bOtNyb6bYHZekxoDEnbn7SPpyzlgnkgBoRzoCc4Z84J5wCyh0jzHK0Vt62V6qvN1WPCO7+0Z81TUsO9zQF0inAOdFNKw3n7Jev0LDbWABB273J7mVt1eetZ5GTX3NS6feK9y5m4AGJEOAe6Ke3scftg2BhzhQBwl7T08PKWiB3P2RvxJLt/+2V44yEp/P8w+4dm6wF6EcI50E2p5x19jJkZAuD05QXh9oERLy5J/p1DG0PSPz9uH89cEV7mAyAmhHOgm/rUnbMPMrjYCUAbf7fJvji0olTa+4LRcuLu7QJ786XsIdI3HjVbD9DLEM6BbkqtKrMPho4wVwgAdxo2pvWyjm1rpfJj5uqJp/rq8L8v4puP2n+YAIgJ4RzoplZrzj83zlwhANzrm/8gXX9beNwYkjYuTM7e5//2S6m2Mjz254YvBAVwVQjnQDf1CdXYB/TwBdCe5Vvsbk7/+a60fb3ZenpaY0h682n7eMZ/D18MCuCqEM6Bbmo1cz40YKwOt9u/f79mzpypAQMGqG/fvvL7/Zo/f74OHjxoujQgMYaNke77e/t4+5N2H/BksPcFe6350ACz5kAXEc6BbujbcE59LjWEDzL9dk9jtLJ582ZNmTJFO3bsUG1trRobGxUMBrV161bdfffdeuGFJL9ADoi4f53dcrW5Sfqn75mtp6fUV0tbVtrH969j1hzoIsI50A2pFx0t0TL8bEAURUNDgx5++GFJ0tKlS3X8+HFZlqXS0lItWrRIkvTEE0/o8uXLJssEEiMtPdy9JfK74j92Sv+6wWxNPcH5R0ZggnTX/eZqAXo5wjnQDf2Dp+2DnOHmCnGxHTt26Pz585o1a5ZeeeUVjRo1SpI0YsQIbd68WXfddZfOnz+vnTt3Gq4USJAbvth6ecuvH5Pefd1cPd11cGv4QlAp/EeH848PAFeNcA50Q0b1f9kHdGqJKhK6FyxYEPX25cvD61L37t2bsJoA4+5fd+XmRL1x/Xl1ufRLx3KW2T8Mz5wD6DLCOdANKc5lLf5rzRXiYidOnJAkjRkzJurt48ePlyS9//77CasJMC4tXcrfY7/iFqqTnp/f+9orblnZ+iJQ5ysCALqEcA50Q3pNuX3A9tRRHTlyRJJ04403Rr199OjRkqSSkpKE1QS4QqZf+m+vtm6vWPBdszVdjf/YKf3freFxSqr096/SThboAYRzoBv6NpyzD4ZFnxn2ulAoJElKTY2+BrVv376SpEuXLiWsJsA1xtwtPbjRPn67INyS0O1qK6WXH7Jn+mesaL1MB0CXEc6BbmgVzulxHlVjY2NM92tq6mUv5wM95WvfCb9FbFkpnT5qrp5YvLgkvN5cCofyeavN1gMkEcI50A2turWwrCWqfv36xXS/9mbWAU94cKM989wYkh75a/cG9B3PhZe0RPztU/Q0B3oQ4Rzooj6XGtSn+dOlGNlDWGvZjvT08JN2ezPjkY9H7gd4Ukqq9L0t9h/5jSHpf3zdfR1c3n299WZD3/wHaWyesXKAZEQ4B7ootbLUPmC9ebtuvfVWSdKxY8ei3h7p5nLzzTcnrCbAlXJHhy+qjFwgWlEqrZkslUd/7CRcaXF4nXnEsDHh1okAehThHOiitKoy+4BZ83YFAgFJ0kcffRT19g8++KDV/QBPu3mq9O1XWgf0tZPNz6CXHwvP5NdXh4/9ueFWkOlZZusCkhDhHOiiPhdq7IPc0eYKcbl77rlHklRQUBD19k2bNkmS7rvvvoTVBLha3uLWu2xWnZKe+LK5GfSqU9K6r9kXgKZnSY/u4CJ4IE4I50AXpTpnzq+93lwhLjdnzhwNGjRIe/bs0ZIlS1RWFv5/Kysr05IlS7Rnzx4NHDhQM2bMMFwp4CJfXhAOwJELLSMBOdEz6KE66blZ9vdNS5dWviFdf1ti6wCSQH19fUz3I5wDXZRSW2EfsKylXampqcrPz5ckFRYWKhAIyOfzKRAIqLCwUJK0ceNGZWXx8jjQyoR7wxeJOpe4LBsZ3qwoEUJ10o/nScd/b3/s7zaFl94AuCpr1qzRHXfcoYqKik7vSzgHuqhVOGdZS4dWrFihHTt2aNq0acrOzlZKSoqys7M1bdo07du3TwsXLjRdIuBOX5zbegZdkn54p/RP37M3AIqHilLp4Zuk4r32x779ivSl++P3PYEkVV9fr9dff10lJSWaPHlypwGdcA50Ub+T/24ffJZuLZ2ZPn26du7cqZqaGjU1NammpkY7d+7U1KnMwgEdmnBv+OJL5yt0e1+QHpsY7qDS04r3hvusV52yP/a3T0lfXdrz3wvwgMzMTO3fv19jx46NKaATzoEu6nOpwT5gWQuAeBqbJ/3j/wsH9YjS4nBA3/Fcz8yih+rCrRKdXVlSUqWH/ne4nzmALhs6dGjMAZ1wDnSF46KspoG55uoA4B2R9oULn7WXuTQ3hTcFWpQtHdzatZDeGJL++fHwMpa3HV2V/LnS6v3S177TM/UDHhdrQCecA13heLm3adBwg4UA8JwZK6T/eaR1x5TGkPS/5ktLBoXDeklR+GPtaW6Sjv5O+pf10nc+F37vXMYy4V7pmfelMXfH7Z8BeFEsAT3VUG1A7xbp9yvpcuZgg4UA8KTc0dL6Q+EZ770vhJekSOH3O54Lv0nh5TDZQ5RzOUU+9dfQok+k0DnpbKlUW3nl1x0aCK8v/+Jcu0sMgB4VCeiTJ09uCej79+/X0KFDJUm+/fv3W0VFRVE/ORAIaOTIkTp58qRKS0sTVzWimjBhggYNGqTz58+ruDgOFwEhZndX/k5Tz74tSfpw5L16vf8dhitCUVGRDhw4oLy8PE2aNMl0OZ7H80fiZDXVKa/igG4J/lF9L1/q0teoSRug9wZN1HuDb9elPn17uEK0xePDXUydj4aGBm3btk2lpaUaO3as3nvvPWVmZvpSi4qKtHbt2qiftHjxYo0cOVIHDhxo6UcMc55//nkNGjRIZWVl7Z4zJMZTN0tTP23Q8qdTZ7T215wPtygqKlJ7Ew5IHJ4/Ei89RcobKs0ZLk29Rgpkdnz/6kbp/5yR/uWUtPMvNaprelvS2wmp1et4fLiLyfOxbNkyFRQUaOjQocrIyJAk+YqKitqdOZekvLw8nuhc4sSJE/rCF76gP/zhDxo1apTpcjxtzqnXNS74oSTp+eZbFbyF3S1Ni4TyvLw85eXlmS7H84qLi+X3+1VdXa0JEyaYLseTPnvhE/kbqzX40jlV/uWU0tPT9ZcLlq4dcb3O9R2s8vRcNflYumICjw93MXU+6uvrW2bOx40bp8OHDyszM9MnqwObNm2yioqKrMLCwo7uhgRZvXq1Jclas2aN6VLwg3GWNU+WNU9WwaNLTVcDi8eH23A+3IXz4S6cD3cxcT7OnDljjR071pJkjRs3zjp79qxlWZYl0a0F6JrIxVeS6lLZdh4AAMTm7NmzmjJlikpKSjRu3Dj99re/bbkYVCKcA1evMSSds1uOEc4BAEAsOgvmEuEcuHo1lS0bfZy6INZsAgCATsUSzKVO+pyPHDlSUrjFDMybPHmyfD4fF7uZ5uhx3td/DecDiILfV+7C+XAXzoe7JOJ8xBrMpU7C+YgRI1RWVqYRI0bEpVBcnUmTJtG/2Q3Kj7UMr7nlLl3DOQGuwO8rd+F8uAvnw13ifT7q6+tjDuYSO4QCV89xMagy/ebqAAAArpeZmal58+bJ5/N1Gswl1pwDV6+yzB7nDDdXBwAA6BVWr16tw4cPdxrMJcI5cPVOH7XHn/0rc3UAAIBeI7IDaGcI58DVqq20x/5cc3UAAICkQzgHrlaV3eNc2UPM1QEAAJIO4TwJHDhwQHPnztWAAQPUt29fZWRk6Ktf/apeffVV06Uln+YmqaLUPs4d3emnPPLII/L5fPGrCd2yf/9+zZw5s+Xx4/f7NX/+fB08eNB0aUmBn3+zeH5wlxdffFF33HGHMjIylJGRodtuu03PP/+8Ll++bLo0SNq5c6d8Pp/531lWB06ePGkVFRVZJ0+e7OhuMGj9+vWWpHbfFi1aZLrE5FL5Z8uap/DbQ7md3n3Xrl0t5wLxtXr1akuStWbNmpg/p7CwsMPHz8aNG+NYcfLj598snh/co7m52fr617/e7rn4yle+Yl24cMF0mZ5WW1trDR8+3PjvLImZ817t4MGDWrVqlfr166cNGzaosrJSlmUpGAzq2WefVVpamn7xi1/opZdeMl1q8nCuN0/P6vCu27dv1+zZs+NcELqqoaFBDz/8sCRp6dKlOn78uCzLUmlpqRYtWiRJeuKJJ5jR6iJ+/s3i+cFdfvzjH2vPnj0KBALatWuXmpub1dzcrHfeeUejRo3SO++8oyeffNJ0mZ62atUqnTp1qvM7JkJH6Z2Zc3ebM2eOJcl6+eWXo95eUFBgSbLGjx+f4MqS2KFt9sz5k/dGvUswGLSWLVtmSbL69+9v/K9wr7jamfOtW7dakqxZs2ZFvf2uu+6yJFlvvvlmT5aZ9Pj5dweeH9zlhhtusCRZJSUlV9x25MgRS5I1fPhwA5XBsizr97//vSXJys3NNf47S2LmvFf7zW9+I0l68MEHo96+ZMkSSdLRo0ej3o4ucOwOqmFjot7luuuu009/+lMFAgEdOHAgQYXhau3cuVOStGDBgqi3L1++XJK0d+/ehNWUDPj5dweeH9zlT3/6kyzL0uc///krbhs3bpwkqaKiItFlQdLly5f1wAMPSJJ+8pOfGK4mjHDei9XU1MiyLKWmRt/oNfJyfN++fRNZVnJrCNrjjIFR7xIKhZSfn6+SkhJNnDgxQYXhap04cUKSNGZM9D+yxo8fL0l6//33E1ZTMuDn3x14fug9Dh06JEm69dZbDVfiTU899ZRKSko0bdo0zZs3z3Q5kqToj1okhW3btkmSvvGNbxiuJIk4O7UMjr476OnTp5WTk5OYetBlR44ckSTdeOONUW8fPTrciaekpCRhNSUDfv57B54fzAuFQvrVr36l/Px8paWlacOGDaZL8pxjx45p3bp1yszM1Msvv2y6nBaE8yRVV1enVatWKTs7W48//rjpcpLHf31oj9tZ1kIw6R1CoZAktTuzGJlRvHTpUsJqSgb8/Lsfzw/mzZ49W2+88YYkqX///jpw4IDuvPNOw1V5z0MPPaSLFy/qmWee0bBhw0yX04JlLUno8uXLmjt3rurq6vTWW2+1OzOILmiotsfsDtqrNTY2xnS/pqamOFcCJA7PD+5w+vRpTZs2TaNGjdKFCxc0c+ZMbdmyxXRZnvLzn/9cRUVFuv322/X973/fdDmtMHPuIrE2vf/0Yt523X///fr4449VXFysz3zmMz1RmidFOx+Nc6XUTz/cf/gNCjV3fj7gTv369dPFixc7vV97M+tAb8TzgzscPny4ZXzw4EHNnj1bixYt0qBBgzR9+nSDlXlDRUWFVq5cqZSUFG3atMl0OVdg5jyJNDU1afbs2dq9e7f27dvHL94eNqSfHczrmqRQs9l60D3p6emS2p8Zj3w8cj+gN+P5wb2+9KUvtcyar1u3znA13rBs2TKdP39ejz32WNQOOqYRzl3EsqyY3qKpqqrS9OnT9cYbb+hHP/pRy8Vs6Lq2/+8VRw613Jb1V7d1eD7gfpHOCMeOHYt6e6Sby80335ywmoB44PnB/aZOnSqJ7lCJErkgev369fL5fK3eItoeJxLhPAkcOnRIEyZM0FtvvaUNGzboBz/4gemSklONY3dQ1pv3eoFAQJL00UcfRb39gw8+aHU/oDfi+cEd/H6/fD6fTp8+HfV2XqmDE+G8l9u9e7cmT56s2tpa7dq1S48++qjpkpLXOce2vu20UUTvcc8990iSCgoKot4eWYd43333JawmoCfx/OAeM2bMkNT+75uf/exnkqQpU6YkrCYvi2V1gslXxwnnvdjRo0c1d+5cDRw4UO+++y4hIt6qy+2x/1pzdaBHzJkzR4MGDdKePXu0ZMkSlZWVSZLKysq0ZMkS7dmzRwMHDmx5UgV6E54f3GXlypWSpKefflqbN29umSlvaGjQSy+9pPz8fKWkpNDaEpII571afn6+Lly4oLNnz+qmm266Yt1UtDVU6IbqM/aYZS29XmpqqvLz8yVJhYWFCgQC8vl8CgQCKiwslCRt3LhRWVlZBqsEuobnB3e55ZZbVFBQoAsXLmjx4sVKS0uTz+dTZmamvvvd76qhoUFbtmxhl1BIIpz3art37zZdgrc4dwcdGjBVBXrQihUrtGPHDk2bNk3Z2dlKSUlRdna2pk2bpn379mnhwoWmSwS6hOcH9/nWt76l9957T7NmzWr5fZObm6sHH3xQf/zjHzV//nzTJcIlaODbi0V2OESCOJe1ZA+J+dPo6OJu06dPp69wHPHzbwbPD+40ceJEbd++3XQZ6IAbfmcxcw7Eqt6xO+iA2MM5AABArAjnQCyam1p3a2HNOQAAiAPCORCL6vJwQJfCwTyNXrQAAKDnEc6BWDhnzXPocQ4AAOKDcA7EIlRnj9NprQcAAOKDcA7E4mypPWZ3UACQwXKsAAAKxklEQVQAECeEcyAWn3xsj3OvN1cHAABIaoRzIBa1lfaYmXMAABAnhHMgFs4NiDL95uoAAABJjXAOxKL8mD3OHW2uDgAAkNQI50AsKkrtMeEcAADECeG8FwkGgyouLlYwGDRdirc0huwNiFJSW1ophkIhlZaWKhQKGSwOcCceH+7C+XAXzoe7uO18EM57kZMnTyoYDOrkyZOmS/GWdtoolpeXq6ysTOXl5Vd+DuBxPD7chfPhLpwPd3Hb+SCcA53584f2mCUtAAAgjgjnQGecu4P6c83VAQAAkh7hHOhM1Sl7PGCIuToAAEDSI5wDnXHuDnotu4MCAID4IZwDnTnnmDnPZuYcAADED+Ec6IxzWQtrzgEAQBwRzoHOVDtaK+UMb/9+AAAA3UQ4BzrSGKJbCwAASBjCOdAR56x5elbL7qAAAADxQDgHOlJ+zB4zaw4AAOKMcA50hItBAQBAAhHOgY44wzkXgwIAgDgjnAMdCZ6xx8ycAwCAOCOcAx2prbTHA681VwcAAPAEwjnQEWe3lqEBY2UAAABvIJwDHalxzJznjjZXBwAA8ATCOdAR5wZE1wSMlQEAALyBcA50JLKsJdMvZQ8xWwsAAEh6hHOgPdXlUmMoPGa9OQAASADCOdAe58WgtFEEAAAJQDgH2lNRao8J5wAAIAEI50B7mDkHAAAJRjgH2uMM52xABAAAEoBwDrSn+ow9HkCnFgAAEH+Ec6A95cfs8eDh5uoAAACeQTgH2sOacwAAkGCEc6A9tZX2OHe0uToAAIBnEM6BaEJ19sx59hApJdVsPQAAwBMI50A0zllzLgYFAAAJQjgHoqk6ZY9Zbw4AABKEcA5Ew8WgAADAAMI5EI2zjSLhHAAAJAjhHIimtsoeDx5mrg4AAOAphHMgGueylmwuCAUAAIlBOAeiIZwDAAADCOdANOcc3VrYgAgAACQI4RyIxjlznp5lrg4AAOAphHOgreYmqb46PE5JpVsLAABIGMI50Na5NhsQpaSaqwUAAHgK4Rxoi4tBAQCAIYRzoC3nBkRcDAoAABKIcA605Zw5J5wDAIAEIpwDbTl3B+2Xaa4OAADgOYRzoC3nzHnOcHN1AAAAzyGcA21VObq1EM4BAEACEc6Btpwz5xl+c3UAAADPIZwDbTm7tQwbY64OAADgOYRzwKnqlNQYCo8z/VJ6ltl6ktgjjzwin89nugwAAFyFcA441VbaYzYgipvdu3fr2WefNV0GAACuQzgHnJzh3J9rro4ktn37ds2ePdt0GQAAuBLhHHCijWLc1NTUaPny5ZozZ4769OFXDwAA0aSaLgBwFWcbRZa19KjrrrtOwWBQgUBAr732mm6//XbTJQEA4DpMXwFOzt1Bs3PM1ZGEQqGQ8vPzVVJSookTJ5ouBwAAV2LmHHByrjkfzLKWnnT69Gnl5PAHDwAAHWHmHHByLmsZwLKWnkQwBwCgc6mlpaXt3lhdXd3yvqP7ITFCoVDLe85HfAz75D+V9un4k8sZuuTxx0dubq7S09NNl3GFoqIiFRUVtfpYcXGxFi9erEAgkLTnozfxwuOjN+F8uAvnw13cdj5Sy8rKOr1TMBhUMBhMQDmIxcWLFxXLecPV+1zN2ZZx2bl6XQrx+AgEAq2OY904yLKsOFQTVlRUpLVr17b62OLFi7V48WJJ4vHhIsn++OhtOB/uwvlwF7ecj9QRI0a0e2N1dbWCwaAGDhwov9+fwLIQTXl5uS5evKh+/fopN5ce3D3N13RRKY0XWo4/c9Nfd3h/Lzw+3PpzNnny5Cv+SCguLlZhYaHy8vI0adIkQ5UhwguPj96E8+EunA93cdv5SG07K+ZUWlqqYDAov99/xewZEq+6uloXL15Ueno65yMeKkrtsT+30/9jrz4+4jkjHqtJkyZdEcDXrFmjtWvXKhAI6IEHHjBUGSK8+vhwK86Hu3A+3MVt54MLQoEI5wZE7A4KAAAMIJwDETWONoqZ5l/WAgAA3kM4ByLocQ4AAAwjnAMRzh7nLGsBAAAGEM6BiOAZe5zNhjkAACDxUk0XALiGs1vL0ICpKjzDDV1fAABwG2bOgQjnBaEsawEAAAYQzoEIWikCAADDCOdABOEcAAAYRjgHpHAwbwyFx5l++pwDAAAjCOeA1HrWPHuIuToAAICnEc4BSaqvtscsaQEAAIYQzgGpdRvFHHYHBQAAZhDOAan17qD0OAcAAIYQzgGJ3UEBAIArEM4BSap1bEDEBaEAAMAQwjkgSeXH7DFrzgEAgCGEc0CSahwz56w5BwAAhhDOAUkK1dnj9CxzdQAAAE8jnAP11faa87R0+pwDAABjCOdAAxsQAQAAdyCcA9Xl9piLQQEAgEGEc4D15gAAwCUI58DZUnvMshYAAGAQ4RxgWQsAAHAJwjlQV2WPB15rrg4AAOB5hHPAuTto9hBzdQAAAM8jnAPOC0JZcw4AAAwinAOsOQcAAC5BOAfqHZsQpaWbqwMAAHge4RzeFqqTaivtY2bOAQCAQYRzeFttpdTcFB6z3hwAABhGOIe31ThmzQnnAADAMMI5vO3cKXtMG0UAAGAY4Rze5rwYlJlzAABgGOEc3lblmDknnAMAAMMI5/C2yjJ7nHu9uToAAABEOIfXOTcgyvCbqwMAAECEc3gda84BAICLEM7hbaw5BwAALkI4h7c5WyleEzBWBgAAgEQ4h5c5dwdNz5LS0s3WAwAAPI9wDu9yrjdnAyIAAOAChHN4F+vNAQCAyxDO4V2sNwcAAC5DOId3OWfOWdYCAABcgHAO72oI2uPsHHN1AAAAfIpwDu+qKLXHg4cbKwMAACCCcA7vqi63x6w5BwAALkA4h3c5Wylm+M3VAQAA8CnCObzLOXOew7IWAABgHuEc3lRfbYfzTD99zgEAgCukmi4AMKIhTktaTn0kvfm09Ifd4W4wKanStaOkb78i3Xhnz30fAACQlAjn8CbnkpaemjX/+KC07mvSpQv2x5obpT+XSBfre+Z7AACApMayFniT82LQ9Kye+Zq/zm8dzJ1u+krPfA8AAJDUmDmHNzl7nPdUG8Xj/26P562RZv8wvKyluSn8HgAAoBMkBnhTPJa1OGfN5z4u+T59YYpgDgAAYsSyFnhTbZU9zsrp+a/v46EFAACuHlN68KbyY/Y4d3S3vlTgkZFXfvBvfPb4NatbXx8AAHgH03vwplCdPc5kd1AAAOAOhHN4UzzWnAMAAHQTy1rgTbWV9ribrRRLnzmpQCDAUhYAANBtzJzDe2or7T7nmX4pe4jZegAAAD5FOIf3ODcgyvDT6hAAALgG4Rzew3pzAADgUoRzeE/VKXucM9xcHQAAAG0QzuE9zotBaaMIAABchHAO73GGc5a1AAAAFyGcw3uqz9jjrBxzdQAAALRBOIf3NDi6tbCsBQAAuAjhHN7j7NbCBaEAAMBFCOfwHmc4ZwMiAADgIoRzeE89y1oAAIA7Ec7hLY2h1jPng1nWAgAA3INwDm9pu948JdVcLQAAAG2QTOAt8Vxv/prVs18PAAB4DjPn8JZQnT1mvTkAAHAZwjm8xTlzzu6gAADAZQjn8BbaKAIAABcjnMNbGoL2ODvHXB0AAABREM7hLSxrAQAALkY4h7c4NyDK4IJQAADgLoRzeEvVKXt8TcBYGQAAANEQzuEtLGsBAAAuRjiHtxDOAQAAAAAAAHTm/wMp4oc1DiUr4QAAAABJRU5ErkJggg==)
A. 2
B. 4
C. 3
D. 1
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT Quốc Gia năm 2019 môn Toán Trường THPT Cù Huy Cận lần 1A. 2
B. 4
C. 3
D. 1
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT Quốc Gia năm 2019 môn Toán Trường THPT Cù Huy Cận lần 1