Cho hàm số \(y = f(x)\) có bảng biến thiên như hìn...
Câu hỏi: Cho hàm số \(y = f(x)\) có bảng biến thiên như hình bên dưới đây.Hỏi đồ thị hàm số \(y = f(x)\) có bao nhiêu đường tiệm cận?![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAc8AAABoCAYAAACXFnvJAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAgAElEQVR4nOy9eZhdV3Xm/Vv7nHtrrlKVqkqTNUu2JkuW5XnAA8ZAPCQYSBgcno/JHdN0AklDwF8nuJ0m6SYYB/IxphM/ScDBxsbGQINJGNwOhuB5liVZ81RSaah5uPfs9f2x9zn31CSX7BpV530eqW7de+vec/Y+Z6+91nrXu0RVlQwZMmTIkCHDqGEm+wAyZMiQIUOG6YbMeGbIkCFDhgwnicx4ZsiQIUOGDCeJcLgnh0uDisi4HcTgb5MhzwCqKKBiQMEQgYJKAAKS+pzxO9KRYa0dMEavfbzUn4f/e1UECyoggvWfK0zOeWbIkCHDlEHaVIh1T6kZtDjGa6iBUa7L1lqMMf7z/Io86G+HGM9jx45x+PBhrLUEQYCqjqvhBLCQGEA0Np5DTap7WRAF1PqnSwM1WcZTRLA2njg3Xic/ZmnzH0P9U9a/brDiRsegmfHMkCHDzIam1nuxKOJXxvTqaFMO2eiDrfPmzaOyshJVTQxpGkOM55133sn+/ftpbm4e4IGOu+fpbcdI3xKffqgFQIgIASGgCChWguRDJtKoxAP73e9+l9/5nd95HcYTv2UwCEVMskFQIlOGYJONg8TGNLOeGTJkmOnwa6LGLoVEQGwPIr9mCioRsRNywo9TZfPmzbztbW/jmmuuGdZwwjDGU1X50Ic+xOmnn46IEEURQRC87vN7VQzneKWPy/9viLx5DEAFQVFRSoHMyam82bZtG5/4xCde95ipPweDM5yqgAT+tck+ywwZMmSYeojXRB3wTCkFKGpRgdF6nj/4wQ8S53Gk6OuwOc84DGmMwRgz7mHbAWc9wle5t2hiQGzq7QJokgucWHdscH44DnePfsxs6rH4c5RSxFYCBCUS8QEJNwKScb0yZMgwg6FDHsfroyG2GKLeWohFYm/0VZZma+2rGk44AWHotYYeXxvinN5AqpAmeUSLMYLaiGKQQ1QxGjkjagIUQ1CyNhMezkyPl4iMOk+salEtEY1EQKxFECJjsNYHIgSk2I+agEgMIJgsajtuiDeO6Y3R4BTGxN0bUweDx2PwdW6MGUC0mElIj0c8TjNxHMYaA/hA/omYUom4YG3y3ihyY65R4mKoRhgjWCsYY0HAWgas04Pv5XjeRIQwDIcl0MIIPqyIJB7nZC0SkY38IEWIRKAFRKBfhYIV0AjUlpzW5L+JDWjGYxU/Tv88MdyxRlGUPFaNiHdJEVCMk9+qCBFYS2SH5SJnGAOkd5xRFPHDH/6Qq666ittvvz1ZHAuFwiQf5eQhHgNrLffffz/vec97+P3f/30+9alPcfz4cYrF4mQf4qTBWsuTTz7JO97xDj7+8Y8PMKIZxgha+hlfh1aVoo28g+U2b0iEy3cpYImiKPFJrS1tcOLPGA6DI67Dhm0HT3D8oRM78ekdrfvpdhkRisUQcay9CzUV1FWHtHd0cLxQoLGxgUBdflAxJL7YJFy0Jz9ubqEOwsCXufjPEIMoBFrg+JGjdPcUqKmtpaamBlQJRZ1HboLMiI4D4jl84YUXuPPOO1m8eDFdXV3JDReGYfK+mQhVZceOHfz93/89X/7yl2lsbOSTn/wk3//+97nxxhuT98w0HDlyhNtuu42VK1dy9OjRIV5ohtcGHeGXOI0Hws8ffpj62jrO2XiWI1mqYMRHAowhKkZEUYGjR44RRUUaGxvJ5/MnnKN02HakOQwHW9R0+HHivM44ZOsylu6ALYEB1PLoI7/gv97yWZauOp8v/vc/5Kb/9BEO9pfzk5/cT7UWECLUlJfYupPgLA8er1cfuzhsACpKV3c337rr2xzt6uXGd72TvuMH+PNb/pwla86israJ637vd1m1cAFEfW5cCEZds5RhdEiXHK1du5Z77rmHO+64g66urgE32kwM2UIpnP2b3/yGhQsXsmjRIkSECy+8kIceeoj3vve9wMwMVzY1NXH//fdz33338aMf/SghDc7EsRgvxHedemfDhW3hwIEDaKGI2ggjAmrYtWc799x9D7Pqm3j/Bz/A3ffcxQ9/8BPWrT6D+fPn8Y53vMM5JAy/Vg+OIo6aMDTxGHpgRnCep0Zs2HgW//PWW/iDm/8r3/rRhdx2x9/SPKuOKrUUJQRCQnUu+mioyJOCOKzsrbtCwsxVa/nOd77DhRecQ0V5GQ/94H5+8NDPuPnjt3DZRRfS393NL376r6yaew1RvoyiVXJkOc+xRjpXFUVRMj9pAYyZbEDjzUVLSwtz585Nnm9qaqKvr29ACmOmIh6DCSFazlCIeGKlKiIGayNUi4hxRMu+3jYefOBB3vnO36Ojq53P3/4FHv3149zxhc+xdPEiNr/4Ii+/vJlzzz0PSDm0J+l8TUnj6UKYBquOHVVR1cB5Z2/gwnWLKdTWsHjFCmpsD6oFVMoIgEiUYMqGSJS9e3bzN3fcQUdnl6NMi7gyTlGuu+5a5sydy9q16xERdm9+kYMHj7Jh0yZCEfKVNVRXVNDeeYzZDc2eaZvdmK8Hg0MxbW1t9PT0oKrU1tZSUVExYCEcTAqbqUhvKNLPxeMTs81nItKKNDN5kzWmGBK3dU7SI//3Eb717W9jVdm6fTtVZTnuu/cBqquruO7N53H2uRdx2tJlaHSML391N6evOo/Fi+ahtsDcptk8vn8/VsDEHAcg0Lh+fnRzNkWMp0Mq6IkiGJNLPABrLY0NNbyydRtFq6gBVNOlsART2KAsWDCPz/31/wQEgtBVrHo1pWKhnwce+C6HWloQgf/9T9/m8gsvJl8oohVlBKbAkS6oqqjDOKrYhJfknIqICQPGGB5++GEee+wxgiDg7W9/O+vWrQNKocqZbhjSKC8v58UXX0yMQ0tLC/PnzwfGV0xlqsOR/6BYLGb5zjHC0KvJoiiXvuFiLr70YsTk+Kdv3sXcOXVcceWbwQjFjv3c9/2fsn7jel7Z/DLPPv0k77/5CrRoMMalyCrKy5NPHzJLo5y2KWU8Y6SZUAcOHKCrq4uWPVv57Xe9mz+7435e2foW5tWXc1rTXNRCZHygVn3V55S8fwURp4ARRRYTGAxgVSnL57nyisv5xle/wp4du7j23b/PW6+4gh/fex/V8+fR2rqLjWe9gYpcBVYLmEAhEYbI8HoQBI6wdc0113Ddddclz8eGIQ7hxjmstDGdaYgNwsUXX8yDDz5Ia2sr1dXVPPzww1x//fXAzCQLxYg9zzAMh2hdZxhLONch2aAIYIVQDGoN+eq5nLl2JX9+y/9Lx5EO7vz7b9AbFbnvnu9RP7uSgwcP8aarrwIboSZEUAKsk3olTv+9+vo6Rdi2QxFfeC+88AJ33HEHt37m02zYcCaVt9/FAw98nw+8//ewalIKEu5kXWpxCrJtRVB1hybGYCNLEJhEu7apsZH/9t/+DCKlLwwwEnHJZRfx+LObWb5mExvWLAQixOTQyDr1qYxv+7oRRzaglNMTEZ599ln+8R//kaeffhprLX19fXzkIx9hwYIFwMw0EqqutGrt2rW8/e1v56abbqKmpoZNmzbxxje+cdj62JmCo0eP8ulPf5p9+/Zx4MABbr75Zm655RYWL1482Yd26iDRcXUwYihYJZ/LkS+rAgtBEIENOGvdBWz8wnk+NRYSFSMKnf3s2buby6+4gjlz52KM82OT5hvExnigSMJI17PooFduv/12rr322kSeb7KQDqmpKhbrSjUioTsI0EAot0qgEAVgKCLq9G4nwyH7gz/4A772ta+NqMBfyhEJVkEkfh+oLTrRA4mNf4ASEdkIkTyRFfJhNzYqx4ggxnrJvmxn+1oxuMg/PW+xlxnFRdcpnFwt76mFdPOD9LjE4xiP10wkDaU3z3G9YUagGmN4RwMU6x0RlZIQfGCt07gNDBQFY4qoFFCbQyKDDYoYyTm1NusJgcYQ4Lp0RQReHdfygx/+CBCuvfba0cvzxW+KF5CJVxsqIS0+YCR09Y1BP2XGUEyMpGJUnBGKz2ECjzG9QzlRqEZSO3KTXoA1QkxA3EnGEmEig0qIDQJCVfKBYqlwFGSxmc0cAwxXogUD1YXSQiET1SRhKmO4sYifB2ZUPji+14fbhMWvzdTrZNwhTqrUmACrmtCIxPi0GEoYAASuhaMRDIIxef/3gAlSTTYADdzaiqAa+OClDolMpTGsMPyJikYnDTGDTcAohLi8X0p0ovT/BB9qTBCA4aXdkiOT1G+KP1C/M1V3PoJL4BqxGFz/OVGnd2uSyZX0p2YYQwy34A2X2pipGM25z5TxGW6tHCzROVPGYuIgyWKqWuqgpaLJuu96Hrs104rBoKhRVARRQSi6dVYEg5NDVa+Yrp52muY8jIRhCUN33nknjY2NI4YgJwMlrzLyYU38TiEW+y0gOvElHPEYPf3009x+++0jv2+Y52SEF1UiP4EBKoKxijWCoQgYXFPX7KYcL2QlBhleDYOvkXQzjYwsNLFIPE9vVCPj0nkAVtRroeONp0GlmNgKt9aKsylSWl9ffvmlpMXkSNHXYcO2V155JYsXL06YhlMhHGMB1PlpESASYVRRQt9xxGLUe24TeN3Gg/vkk08mjEMYuuEYdUhZ4wnH74g8s1aNi+eLE4HIFG7HB9ZarLV89rOfJYoibr311ixvlWEI0l7nz372M1pbW2lra+NDH/oQwICUV4bxhl8LfUTOio35uCjWPzKlNVhdgkyltJIqINaH3kX5xc+rB1R9xLKcaQxh2wIsWrSIlStXui+alNj9YJqwolisGgIrWAMqRQKrWA0pBk42IJgkeT5Vpa6uLhmzwYSKQe9m9AcY06YHb16yMpXxQiz+PmvWLAqFAmecccZkH1KGKYp4cX3ppZcQEYIg4PTTTwdmNrFsUjBAJmhwWiv+PcJ5loKKIx6JBk6tSCyiQWI/tm7ZMiTyOthWDtG2jRf+iaxlU6zru6YCEqGiWBVXiqKOCYX0oVKJWMWIJcJwtLWFXzz8CG94829RW1OFqBAYmXDJ13iDMViJZoR3n+SnDxeKnvgbMk2MOhFpZLovFoM7Ck338xlLDM7xDedZTcSYpY8jvcCleQcTFS2Lr5XBP6cbhsvrjxSCntrnlzaeg4/TkHBMxPmjsdiM+FaPsfGMr6cTRRCmSJ2nbwDtiTQKrpxD1aU1jRBJgLURlhCN+jEm4nv3P8jdP/hXLr76zYQxByf+gAnG+I2bH5cpgMGyY3ELr/gCO1WQnstT6bxeL9L5n97eXrZs2UJ7ezv19fWsXr16UtI8I5FzJiLvOLgWcDpfL4M3I1BSTEo/N/XreOUEjNHUWqqxulD6d00kyEdT5zk1uqqoic/F67a6ko2cz/tFGtCPkBdQtZgwhy20s3XrVn77xg9TXVOTEIlExQkETzAGj9fU3p2dPNI1j4NF0tM1uafCeU/KPTBNENdz3nvvvfzyl7/kwgsv5J/+6Z+47bbbuOCCCybkGkgby8GLXPranIi5G3ytTOdrJt4Mp0uPoigalhx1qmNwJG24c54iTAiX2FVcLzZFHDNK+hHtpWigXwLURgRBN9YabGRYsWY1b3nzBQRisMb19cxIqOODwYayp6eH733ve/T29gIzsw3VTEOsMNTS0sJdd93FJz7xCd73vvfx6U9/mr/6q7+aMK8k/g5rLf39/fzwhz+kvb0dOHXSB5OBOOxsraWjo4MHHnhgwGvZmA7ElFnxhqkspdDfy/NPPcbll17JfzzxMhh48J5/4H/d/kXI1XLDO99GU20tgUJRjWeiZhgPpI2jiNDd3c3XvvY1Ojs7p3W4ajpjMkKFxhh27tyJiLBkyRJEhHnz5rF169YBnVbGE3HKQETo7+/n61//OkePHgUGGtYMo8dgTsORI0f46le/mogEZPf4UEyNnKcPNKsOjK8XCwX27tlJEFme/M3TXLVxMavWreOFA5vpM2XU1uRikSEiCVIfNfGTPN1zHqNBfBPF4R1r7QDRdDg1CuSnSw4rbSgGh9THE93d3eTz+cTTLCsro7q6ekQForFG+rwLhQJAEl6EkZWQxus4psv1ciKkNyRxuRYwrFrSdD3Hk8H0yXmSCrcAiBJoQFlFLVdf/xYe/s0Wjh04CDaiYKq58k2XIcYVvBopeLmmHJE4EtVkVKXOhJwnwNatW/nGN77BsWPH2Lx5M7fccgtNTU38xV/8BWVlZafEeU+H/NW+ffv48Y9/TKFQYOnSpVx55ZXkcrlx/c70gpo2VnE+fCQ94LFEOr/+yU9+ko6ODp577jluu+02Ghsbuemmm1ixYsW4j0WMUyXnGc/trl27+PznP09bWxsvvfQSH/vYx5gzZw5/8id/QnV1NXDqrW3DYTQ5z6nheeLVIdSHB8RiCEDyIIb6ukp27W+lq7ufXXtbueCyM8mhvtgVPD0qYSZPxr5ouu88Xw3xTn7FihX89V//NcePH+c973kPn/vc52hqakoWtVPhxpoOnkRtbS2bNm0iiiJqa2snJN8Yz219fT09PT20tbVRV1fHoUOHaG5uHhDiG+/jsNZy++2309nZybvf/W5uu+02Fi1alLwnY9ueHOJ5W7RoEX/7t3/L9u3b+ehHP8qXvvQlwjAcQBqarud4Mpg2nqcr+RcvO2fBM2cRg0jIsqWL2PzSk/z80cfYsG4NleXlmEgQUSJxha1GvfarxIzdicWp7nnGi9FgBl58caVrXKc7poMXUVNTw/r16wd0Opmo+so1a9bQ3NzMj370I971rnfxzW9+kxtuuCFZZMbb8xxuER9cRpWxbU8O6ZB37NmnN0ODx/ZUxzRh2zoVHce2BUUQAsSKE/uljNq6Kp57/lc0NMzmtPmnYRSMKDYquBZdXpLP83Qn+4ROScQLYmxEGxoa+OEPf8icOXNOKcM53RAEwYQtaPGiWllZyRe/+EWeeeYZbr75Zq644go+8IEPJMcyEYjPubq6mu9///ssXboUYIDARYbRI127bYxh6dKlPPTQQ4RhOIQsmMFhWGH4iYQzmF4qSfwumsCbdddFJF9Zwcc+eTMbz1yLaogRQBUJAl+a4vRfYz3DDGOPV1uQsptq4hEvahMlShDre4oIzc3NfO5znxvynvG+Dk50HWbX4GtHfC2NZCizsR2KKeB5Co7iE4JEiPQBEZFxwdyOtuMcOdLJ9W97D/l8uZtEVTAyqM1XLL2UTXKGDBkyZBhfTLrxTBQG1T2yBCAFfvnwPVx7zbX83T/+mLde8w6qcnly4oQQAiNgLSLGyyr5HIhMFSG7DBkyZMhwKmPKsG3jWk+hAASceebF/PfblrB4yQrCwGAtGEk7mlL6M/9oMklg051tl6GEU4E9mWH8cSqxbTMMxGtm26b/OH5uXGPecYctDYAcKsKshvlsapiHWEWNEKnzS+M/EMQ1YUnH5Qf9nAgMHtyJYBxmGF+kGXZZrifDcBhOR3cwMxWydWA6YrDtS4uQpDFsP88HH3yQefPmDXhu3BcRBcW1IBMpIoRYiXy3FYuoTVi16kO1w8vx6YRnPa21bN26lW9+85tAllyfzkh7EK2trfzzP/9zNp8ZhiBtPJ944gnOOOMMnnrqKe66666kdGukRTfD1Iaq8uSTT3LFFVdQLBZHrKEe1vOcP38+CxcuTD4ofn78DzrOgFrEGtQUiYxFUAILYEDEm0cZ1kxORqmKtZaamhoWLlyYLbTTGIN1UcvKyrI5zTAs0oZx586dgBOPSF8vmfGcnlBV9uzZM6SudfA6MKRURVU555xzWLlyZfIH4xm+0tQ/o4qoomKwAsZaRCPUCFaEQIWY46SDDifWuC39MjGIvZS7776bN7zhDUkj3mzBnX6I5zKKIr773e9SU1PDZZddls1lhiGIFbUAjh49SktLC4sXL+bSSy9NPE/IwrbTEapKR0cHwAlr2Eec2YkSV3awXtPWomIBi6EACJgQ1GCsIcK1K1UirLrqUGd5FdT93WTwbdN5z2yhnb4YrJp0MgSQeAM49Fl3XWpMaFMd8d0ZxhdjOUfDCabHiPNkGSYA43A7pe/7WGVpOAzLto2RvjjG14iKD7f6fypYG2BE0aifI/t38pm//ALnXPMebrzmErY98Qh/d+9Pue2v/oJKLJEIIUVcvahMeFeVwR0tMsbd1ENaRvDAgQOUl5dTX18/4D0jLYRD5zNmuJVg/XcYXHMC8OQR7QEMVsq8oIfFUsSYACXIqpLHDScxR/Q6XW3JAwZUsRROOEdpj2SwmED692wtGFsMnFUtGU112594/Lu6ujh06BDWWurq6mhsbBy1Clp6DoMgGEICizEltG3BC8M7jT2Xy1QBimjUz1NP/Ad7du2m5cf/zo2/dRF1s6roLwr9Vqg0FiVENPAln5pp22YYAmstfX193H333Xz2s5/lxhtv5NZbbx32va92D2gsJKkAxv8OVhUxEKt3KG6RtlGEFUsgofs7CShq6So1JrtWxhpD5sirkg2YI8+fEFWsWqxajASOczHKORqOcZvd+2MJF01UIMIkAqxODkeTZyylIn9rLV/5ylfo7u7GGMODDz7ID37wA5qbm0c9N6PRtp0ydZ6lr3OBWRXcxRyEXHXtW2jtLvC/v/s4xgpBRRPXvOVNlAeKIhh1ZCMfOGUyQ7fZTnNqQkTYs2cPO3bs4MYbbwRG9gpeLWyrA64vJbKW5198gRUrVlCez4NaxPj3RSEiARiDpUCgoFGIDTzlbeIDJTMCg+dIFV548QUWLlpETWWlnyOX+jE2dIIrEqBScA5NFKKB82aCEeYoq/OcWLiVXVMrvAz8TUpz8ZGPfIR8Pg84NvS//uu/8t73vnf0aZjXWuc54TuoxBf35SeacpFFEMlRWzeLztYWisUiL2w7wNo1q8iposbt/UUtKoF7/8Qc9QBknufUhrWWZcuWceutt/KFL3yBzs7OE2qkjnwPlOJE4m/cQqGfb931LT7+8Y9T3jjbX38RnR2dtB1pp6q6gZr6PL94+Ofce/cDzKpp4A8++p9ZuGSe6wgkGalkbDF0jkC4+567ed/73kfN0iV+jiw93d0cO3ScispZzGqs5Je/+nf+5Zv3UhaU8dGPfYzFyxZgBIwMLwN+qnRVmbJQEnaoC6JTik4mcKEEa6Nk/KuqqgDo6uqiu7ubBQsWDCByvRpG5Xm+xlMadzg1IeeYCyHz5synrNDLE889Sb6qgnnNzRgKKAWEPOiUPZUMUwRjJaCezrm4oJG6VFmSs7fs37+f+x/4Hkfb+6ipnc2mlQ184Yt38v/9wz8yrwLu/va9/PZ7b6SuunJSmref6hg8R9Y3j0jP0ZHWI3zn3u9w+HgvlVX1XHrWQv7ys1/kr778d5y5sIFv/fO/UDnrBpobG7I5miz4VJybM/9TBqb5XO7a3d8xUWvHjh18+9vfZuvWraxatYpzzjlnzDc1U8TiWNLEX/Fj4lxmiCSkoixP7/ED7NrfyfXXnO8i33F+giKMsDPMkAEG7iDjUEx8o6VVREZzg7lyliJPPPEk+w8cpL9QYOvLW3joxw8xq7aG2qpKgrCKy6++ltUrF9C67yXe/6HPcN27P8xpzQ2USxcXnr+C7btb2LB22bie90yFKqhann76aXbt3oOK8PLLL/PTf/s3Xpwzl5qKcioq6zj3kqvYeOZy2g5t46b/9BmuuP59rFq+kFB6uPSS09m1t4XGptmTfTozFo4LLViLz3CC0VgT3YKNHPlLB9b9z58/nw9+8IMUi0Xe//73c/fdd/PBD35wTI9tauQ8kx1FaXcRRUWECDE5Igy58gpueMcNvOHyiygLjJPtUzBEqAa4vEYcAZ/4sEmW85j6GE5GERwdPQ7nDM5fDTuf/qkwCAnDnGucFwSEYUAulycMclgTuHx81M/e7dto6+xl9ZlrCUQhKrqb3ghWB2bnMowV/PpgAsIw5wK4JiQIQ3JhjiDMoSbAIhjbT8veXexvOcz6szcSiiJREY1c84mR5ijLeY4/FIgsrm+zujikRhFiAsR4upAlsR1x2DYMQ5qamlBVbrzxRh566CE++MEPnoI5z1gxKPYO1BKgifh7T7/luc3buOm//GcqaqsxxCrxikgOCBBx8n3iw70TjSznObUx+AZIlxoMLjt4dbYtGAnYePbZnIXQ1dvLr594nKvedDVzGhsxUcShI8e473sP8MC3dvHM08/zJ//1Dzm041n6T2+mgOHXzx7id999CXnP7MwwtlB1c7d+/QbOXH8WRVX+48knuOKKN7Ji6RKMjTh2vJN7v3c/D933Cs898wJ/+PE/pLNlC51Hm6mpqeLRJw/yW9efRdkJ5ijLeY4vXJ7Sr+nWqc1JEG9oDEUR1DibkfdRpSiK+Jd/+RduuOEG8vk8P/nJT9i4ceNJzc00Ytu6XUMpH+FyEru3b+dPPvlnvPG3rufyN15GVWMDxhacCpERhABVR/+HAkreJ5cztm2Godi6dSu33347nZ2dqCo333wzn/vc56ipqRlQx/XqnoQkP636JgU2DhUqiKG5sYEb3/V2Otu7kLJqZtdX0nGkhb/4zJ/Ta8t4/0f/iIq8wVBENSMMjQtc5wgfkXI/bSyEgKF+Vg3veefbaG/rgFwlsxtq6Gk7zN984fMcOtbDB//oE9TXVo44R5nnOf4QVQIs7f3KvtY2OotCezGgUARb6KPQ1UZNheGCM5cTptIwXV1d/NEf/REiwrnnnsuHP/zhk5JLnHaepwtei/ccDQ2zm7jppps4bclyFi9ejAXyWAhc/09VcUZUFYmLmTO27ZRH+lKMC4xKZUbpdzmWZKTQ3V8kUvVhNMC4ec6jlIdODjExaTK8wTvjjDP4xje+QRRFwEDptJiJNyrP0+/vBCEQIZ/P8973vIdZdXW4GhX3/dVVddTW1GEVhIDZTQv5X5//AkWrvqDbuLChp7Qk98EwTQ+GajbP4OtLBz2Q0ujEYivqy9cE8WUo8HvvfBdzm+e4KJVncVZW1lBdXeOuKQxlDQu49X/8JUULVnzPYEZeCzPPczjE4gVeNGbQcIh/C9iEOT6ulokAACAASURBVBvXb7q13LOkE9K0pYDw0OO7eLYlojuoQ62lUnqpt0d4+xVrMJSiSarKTTfdxIc//GH3fa9hXZ5GbFvjiVOm9HtoqKmfzdVvuToZWFAkcLU78fvdHAkQTEq4NsPrxUhGQVEtAiGdFu7/1TZe3NFKvqyWfjWEFWVUGOW0fDvXX7qO2qoKjCqBwYdgB32qSPLZYfj6LnuRgCD1EXljOGvtutLrJn4fgPXZB7chBAj96xaIAGxEYPv9H+WcJCWl9/hsbPoIXtfxnzpwm6t4m0XyWwRqMZJDxcQOKKtXrSYQi5E+X92QxxgXjjUS18v5a8TACdRLM5wIGv/3atdpLIAQUIyNJ0pgI+cKaQACkUJFLuTsjSt5+adb6Y0KYAzFyLJm1XLWLZlDubjN6ERuXKaI8UzDJPTjePCHexQj/Xy2pEwXpJc6T/FSm3o1ti4GJCIvAcsXzeWJVzo42GkpSo6ws48608GVly2jurIMFIxJL6el0Op4Y8g3DHhi5AVYUEK1tPdZxOSoCpQgzq1579W47XhmL08WAhBh1CIaXxwCGoEYCpoHgTBZN7IBHneUbnsArC8AElVyGgGuAYg1ods0aq/b45gyikVLpSnQVBnQ09aDGENztXDVOQupzplhIjPjjymS85z+yMbtZOAk/l3Zc2xAA//IugUOIbKCCQRjYWFTNVUV5RzuDok0pEb6uWDVaaxb2kworiJYrfc4xYX0h2L0TLsJm08V+nr7eeKl7Zy1/nSaqsQpNMe7d3UhZrehSBvi7DpzLiWOZUkc6BcgxKrr0qRqgQBVnKawRGAVAncVBq9jfrOc54lQ4p6kh0Ti3zX1FhX/pCRhW2sMBQlRhbb2Hp56fivl1bN40/lL+e7PXyBS5epzzmBeeeAFMmXgF71OTKOc5/RHlvMcLeJ8iKvgcvk9l/tzqsQG441nf2A43t7D3p27aestcsaiOg6+3AHaw6YlFfzWOadRHRhX9hGkDUucPx+42R3tjEzUPRAv9rNqK1m+5DQefXIrG9cvZ2FdJSFxKDE5KDLvaARIktQhIu6RAoEIoq4/Ux/Q32+YlVPyYnA9D0lqyl/zV2c5zyE4UXZeEuU4v9H1kRX1KU6xEYFx5K62HuWlV3bT39XJmWtXUl9XRQTsWFSDBCGbVjRSJkXHwg1yjOX9MY3YttMf2bidDALw+WoBF1rDyV1EQJcVWo91sH3PYURh+cI5rGmo4VCPsmf/81SEcN0Fi6grc3+rRpIar/SOMY2TmZWJ9iSMERbNraeiPOTXz22HNYtZUF9NXh2j3B3U5LDIpwV8yF9dERs9ReVoT5H2nl5aj/ax52AHBw4f48wVs3jjhqWefRsReJLQax3VzPMcHiONgNPi0gFvjJ3QuNWkiqGrp8iufYc40NLBsmVzmL96KbnQEPi/fst5KxBjqDKaRJg0ssgY9k7NPM8JROZ5Do+RRAYKEUgoiDoPARthFfYeauPlvYcJK6pZuqiZpoZqykTIi2VulXDFmgYaG2ppqsm7ZU+M/wlpj3O40Z9qnifgC78hh9JcV82l65fzyLM76Fs2n2Vz6giNY++ml3hr7TCkp0EJpVMW8VJb2nyJerEJz8p+6P8+zuajZRzqLhIVi6gNyEuR6xYvcGQuG/lQryRs2teKzPN8NXjzmDZCSVWFE0BQEVSgGEXsPXScLbsO0jS7gfM3raQ6L4QBA8K8zdU5ACKEogkI4/tjDMd9GrFtM5zqSHZwIlg1mFA8SUjp7LNs23uIvYc6mFUTcu665dRVhL4exNV5GWupFLhozTwQlyvtQwglzpxOT4hPADkFFWiqKedN56zg4ad3cryzm40r5hEawVp1uiAiiYbnwJq10bAbTwXooEc+a64RCuTyORrmNHNgbwvHpQoJ8lRKP2cubGJxQznGWpASYz/D+CGdOLEK+MYdCljrIufgSHGHjnTw7PZDlFWGnL/xDOrLDGCJrGLUCb8rgQv32iLgWvvZJCEzCYShCf/GDDMOafUeay2BREQacKSzj50Hj9PSepQFcxq4YP1iasrLCA2INxZoP44oE+L4ef0oZURekjF2OKer+VScEYwi65svQ01ZyOUbl/PY5l088fJezlo+n4pcLEHp/qq0E04XaswEJFIqqe2Cus1F4ATC16xewjOHlKd3daEaUhn2c97qRio0woirscWYjKM/rhh4XYqI75lqwLiq5qgY0dHTy+adx+jr62P9ygU0zSrzpV0utJ4zFnfv+3lScUYYF3APk0cTvwJkOc8xQjZuwyM2nPGirwhtfZanN2+jr7ef+XNn84ZzVlMZuuyeUZcIsT4ki82hIkRiHJ1IfQ9XlEAtYi0Ese+pQ/yv0u539GT2Cc1hiSGyrnZUvbKWqFCTM1y0fim/euYVHn9xJ+evXUw+GFjHppo2IzBZO/CJhuINIP7srWKME9NQUV7Z0cKCWkPfvEq27+9gQWMlS+fVEajPuRlx4/w6CxyynOeJMCi/GYfI1Y1Xf6Rs23WAfS1HWb5kIQuaF1AVugiCWEUlRGwOFYt6DduYPxdJ6KMNlkAtVkK3JmRs2+mJaZvz1EG/iB30WhwajPxP4/JNAtZqsl67zJHF+l1hrBliRCgi9Cu0HGljx6599FvL6SuWM6e+krxATtTFcRDXNFotBiFCMOLVgxJmXp7AgNXIfUfMQh0h1ymDbuDRYCLvAdWSgRcBEZNsNKrEcPFZK3jhlf389D82c+m5q6nKGUza61RS5+7P1u/c48mVOLQ1ndOi8bH7EJ6ITc6OIMBa6OyzPP7CdsrKQ958zhKOdVnufvARLlu3jup8gFonKO6GTN2l/jrptjMq5xlvgONwT/KkDLy0rL/2SmEhVL23ibJ1Vwu79h1m3txGrrx4PTlVAi1iRBLlLbEuxSMSlpi4DNweGiApU5KxjSFkbNsJxLQdtwG2xQu0DotU3VYSPsQZPZ/LdLeM9SVbTmKuuz+i9Wgbu/YdxATlLF2+mMbaSqqC0r7fvT820qWQZJDcgOqZke4wnMExICkazQjHnSywQ072BEMygZ6EDPwvZfzcOJcDa5fNI19ezb8/8TJnr11KQ005JrIYzzI2RihGEWEgqWlK8xjjZSf54OkHLf1UC2osKoqKoagBrcf7eOGlncxbUM+SRU3kEKprAm68aj31s6rJqfouHPFIOEHxZAPyWg5ppnqeSRRpwBMkJk7ixtQBViFSoWih9Wgb23fto6Kqik0bVjK7upxcQiIKk43kgD27nx+T+oYgeRzg2lI67sBYjnzmeU4gpq3nmQ77iaQW2sF5xKC0JnsvydgIiPzbDdZ3slCFPqvsONTGy7sOMru2ilUrl9BYXYXBEhhJeU9TD1PtHihDOWN+DWFwGo8+u5ULNyxnVmU5IYIRJwQQBFIqBU1b4PjngNOY/HMaFYYJGlisr88MUFH6gJajXTzz9E42rV3Iwjk19Ks3jwLz5sx2GTEl0UNOfdzrxkzyPONNs6f84B7FueOi39UGoOLJPK7GtjuKeOK5XSiwYulCFjTUEtoCgd/QTEVkbNsMr464S/sg78QycD8Zv8Ol7p0KkBXBknOhRhuBUdp7CmzbfYDDxzpoqK3i6vNXEfh8VGBwHhNCaf+Y4dVggLxYls+ppqF6BQ8//hJnrVvJotk1IAZrI0K1XnAnpQ89wEQMzo1OU4ilqEWM5ukvGF7cc5jdB1q48g2rqAqUCEOZFwS26jZ5Jc9h+NB+htHBeXhFlAA1IYqrs3bxJsekDYiwqvSJoas/YtvOfRxsOc7aVYs5rWkWeRRshBpXkzudV4HMeM5wlGgXUkqVkY4klqTP3LLszarGQrJKj1pa2nvYe7CL40cPsWLRPFYsmU91WZ5ALVroR8IAtYZIggGhlwyvDpeFNoRaoKG6nCvOXcOjT2+ha+ECTl8wmzIToGpSHsEwu3k/V+mZnGoYYOJ0+NdAUAno6C/yzItHCI3wxvNWU5azWKuEUQFsSKwHrH70JBN6f91wAQ03hqJRaiviutdYEfo1oMdG7GppZ8+u3Sya28gbz1tLeShugwdYX9c53ZnOmfGc4XC0npj6XTKgpV4VUSpvKKAul1nEUEA51lnghc2vUMSwaEEz608/k8rAGccAz4QMQwSLik3EoDOMHvHmxUpIiDC7qpzLzlnDr57aQtRfYPWSueSNo+ubOIcXlwfFH8D08zvVJ8GsdeE963PjHX0Rjz75CvNnz+b0JfVU5QPi5tfG4HL3UmptFcscT5fznqpQhKLXoA418nXagho3/kWUA+29PL95B7OqKjn/rFXUVuQJVJ3UpE/JG7+2yJDoyPRCZjxnPAb2IEmH90qlEC5UazWkIEKvVXYdPMrOfUcwUR8bVi9nTl05IRZDETRI+lGKZ99aEd/YtkCpbjPDqOCNoIgkDmRtLuDKTav4zXPbeWbzbtatOo28BIQigMUYsJElHKz5O80WqyiyEBiK1qXTdu0/zubt+1mzciELmqrIi/WdUwwq4hrxeKVkk/hGwzSy9j+n12hMLsTRZkHEl4t446mG1vYuXnxlD70RnLtuJbPLDQbBChRVCI0rJXEceh8hmea54YxtO0aYzuM2MDOmbnVW75WKM3KRQmdfkQNHWtmx7xB1tY1sPH0eDTWu3CRQRaxFTamkpUSNdV1OHL/Wl8JM4XGaquzJAB80V6eHWwZccOZSntyynyee2876NUupLnOEDSRu0ZbiRCadZqbOOaUx+KhUIPLpgX5r2bFjLwdauzlz7XJOm5V36kzqxDOUCFQwaigghMOGaIfyQ1/X8c44tq2So4hVQ0ECimLo7inyyu4DtLcdZ+miucxrrKfSKEaLYAKfLojLVWL2vOc8TGG95oxtO4GYvmxbkvZXIl69xUKE28kXgN5+5eVd+zl4+DgL6qu5aO1K6qoCvxMFMK5oPQgRyWG0iPi+iXGOJPCizxG5KU8XmnL3gL93VSDQyHn14ggXYShsWrWAZ3Yc4NHHXuCyizaQE5/yUwWxqXPw+apJOYnRI72kioGiwktbtnO8o4vzNq6lKm8oWqVMQdUSBQHGFH03Hi8koYMyaiOc9Osdi5nEtgWIrGtQbRC27TzIK/vbWXBaHeetWEW1CIH2owREQZmT1YwKTrtaAlQCrF8PXB+lqRsJyeo8JxDTetySui3nF0beaB5t72L77sO0tXWxeF49b7lgDYGrUacYqZPRE3CmVlzJp3Eieq723DeH8pJa1udSp+5+02HKehJqB6gKWWOIMFgD65fPpam2kocffpyzN62lobYcQVyfEY0D8yV62FSEDnpsgc6eXh57+iVqZ9Vy3rlnUi6Qs85IqvEhaiKUgKKv+Qu0gOiJFY8zz/PkEM9HrxgOHj7Glq27mT2rmjeds4zyfOC6zaoTOEAc07mIYAIXIRCN5ypmU8Tpoqk5XpnnOYGYWM/TEXlGZg+mnte4uyGoD6WqLyhWMUgscQdExtBjhcMdXWzdeYioUGT5aY2ctXIBVWVhkkNyNStxPqkkvxcISa4zPg5Rl9tIK4BM3f2mw9S8B7yXL373Is57F8/CMCosaKpD167kqed3ser0BSxqrAFrwBZc82dxPQ8DPxevtmyNzZkrqOtiohKWcuFWEeuiE2rMALMe2YjIBBw+1skTz25m5cplLJhTTx5LjpKqlItCu4Xb+rrOmIgybFHKMCc0IzxPhXgNGMjGdgxZl0f35EAJHckPp+IEilWhKCGH27rYvmMvUTFi0/qV1FZWkkPdUqAk8yFAYKTE3B+s/iODFImmILI6z1MaozFB1rX7oSSknBjO+FPELTeFIGBHSydbtu+hLBeyYtEc5jfWkDOlbzLDfp0kn1P6LfVaItc3dW+U6YHSWMYwpJRXxIXR5zbWkMvneOyZbciapSxqqCIX5IiiIhKIExmQiQ2aK+4iElG/mfMLduBUZZzEWtzR0RCZkB17jrBt527OWr+K2XVVLq8ek4AcpXbA1rH02CcFXuVim1nXojecIqDpuY+76MYFaIbAFgDFRhYJQ4oa0FW0PLdlBx2dvZy+ZC7zm+sxQIBNNbeOYxupuRkyyKUtzakw/pnxnIbwqrGkL8YYaUpI3K4nkcHD9T30/gpWlba+iF0tR9m99wjVtZWcf9YKZlWE5KLI6YNYdQvz6+x7mGEiIITGMq8uz5suXM3P/+Nl2pfMZdlpjVQEOXJqXT7axNeF+5vxDJwpQuQ9jYDIsbEBlZCi/+JQLGojIgnoiSzPvLiLnt6Ii847k+p8QI6il18LKck4Zhg1xJHF1LNf/VPOu9QINEIIUQ1QI669WxDS3m/YtvcIB1qOsmhRMxvWzCJAENeLwT0eklieOWtElvMcI0zkuKWKSZLnRuZRlvqNWB+miRS6e3rZc+AIu1qOUN80l7PXL6Wxqpw8Fo0irwNqwEa4DGjuhDmkUwnTNYelUUQQBKhGlIfKJeeewaObD9JbOMyaxY0YAyEl4fmB1Bz/GeNwXKlkht/04bxNjcAY3w0lpK034vkXtxPmDeeevZy8CEYBG+B0lwtgDKpTY88/3XKe6WNL1hDPeHWiB0JBA/qtsL+1my279tPQUMems5ZQX54n53OZKopRQdV6tqEM+NxTAVnOcwIx0WzbwZ/u0j3pgKzrVKASUJTQV75BR2+BF7fsoq29m/nNdVx67lrK8iE5IIgiBOt6HqrLiRLksAQYprYe7Vhiut4DQWBQ67pTFK1SVZHn4nXz+c3mFh5/aS8XrZpPaHxvRBl0zQzj0Y1VztMkYo8BllzpOY1QFQoYjnb289hTW1m0oIEzls0nL9Z15zCGSF2e1pgiUPRh56nhgU6LnKefSZ8tTz0DLnNuiMQSqXC0o48nXtqHlFWwfu1SmqpCchQJtB9TFIwJfW7TJuz80vmWPM+pNgIni4xtO4GY8HEb9DUaN7uLuwuo77yOa/Ozt7WdVw600dbRxZrl8zl7TTU5YwixBLYXJMQaJ+YcJDtRS1zWLDBjronp4kkMhfiWWxGBCcFaygPDhWvm8vwrB/nlszs5d80iKstCjOcfBeKdB1/wDmPtPbg8p9qiCx/62r9IBUyO/qKy9/BRnn95J+dtWsvs6jLyOHamGIvFOq1xQMn7j5wafO3p4nkmR2Qj4kgUIkQERAJFhK4ey5ZtBzjWcdwZzZpy8mIIbJxDLhCFxoV6k09OrwvxtTP1zv+1IPM8JxAT6nlqTBwHfD0miOuv6VluVqCrGHG0vYctr+wkMAFLFs6lec1C8sbVaeVEvcSW8YQg177K+nyqz5KQUwtiErWgUx3T9R4oxR0kkekLKQKGjcvn8fLug/zq+e2cu3Yp1eU5DBBZdV1uoMT68hizM9cgZqZhrEsf9EZC0Vq2vHKAo0ePcdE5a2ioyhOKZ4P6zihGPIGFgCI5IG5OMDUwHTxPa31hiIgzoJ5EGCF09fezt+UYO3cfZMlp89lwxmqnQ0sR1zEpwEqAJe8jT3F9Zhoy6OfUmZ/Xioxte6oiYbiZpF7KKgntPFJlx+4DbDnQRkVVOWecsZy5deXkbYSRfqc0IwFWnYKQSCngkuzpRRIWJBRBc9P/jjiFEW+nRMVJ1RlFRTDWkMdiUVYsnUtYUc6vH3+W8zatp7Yy7wsL8O6n8z7HuK2w2+ZJqTyioFDA8thTL5PPlXH+pjVU54JEL9UGihXxtYNe2CHduzXDScEIWOuZD5LDiqu43HfwMNt27qGuvoHLzl9HVQgm8nEmTx6KyV6Cwaj3NZ3rmvqGU8dongwy4zkd4RVULK6+0oqr+uzs6WP77kMcOdZGTW0VF21cTlU+R16UENeeCSsYsai6/IXrc2B8oYB7ZBIfxnuhUjbmS2qGMYbGgtuu1tbGuSfF19qGBBaWzZlFVdkqHn/qBVavWMT85tmgdtzz2Yrb3BUFDh3v4vkXt7FgXhMrFs8nJ0qQ9Id015nR+PorLVFBKtqSYbRQ1BYRMb6ZAxw62sn2nfvJh5azN6ymqqycMuMJXEFIZK3vs+miBS4rauN4BiOxal0OPf3LqY3MeE45aOoCJVUD556LF0Y1zgG1amnr6GXvvhZajhxj7ry5bNiwkuqKMqooYmwfrku7cTnQIPALlCNtiNeejYN+Jck9RxhS7zkEzIj7YdrCzVvkZtXEEmiOGWklBxjyRChC46xq1q87nc2bt1IsFlk0vxlVRbSIk/2L/VEXxkcEGbwoakopKimC1yQqMuAaFihYiAzsbz3Oiy9tZ9XKRSye00ROcP0dRcAYhCCRFlQpFfEbTdqxDzyOUxCDPezhi4mkFIBi4JiXarjdfFgVIgyd/f28uHUP3X0Fli+Zx7zGOkKEnP8DK6FraO879ASq5JIa0cAThbKNS4zMeE4pWO/wycA9tlpHupCQogh9uMWovb2Hbdt2UOzrY/7cJt5w4UbXvSARoQmQwPjFbSAZxO/vfZprQMA2tebJgEL8DFMY4ogdgiS6wYKAb1oMgvgC+QobkauppGL9On7zzAv0Fi2nL2ymTCMiI7S0ddFQXUneWIoYCIRQ/RUiJY0aiY0rPjirMTnIQhCi1qJi6DeGfiPs3r2f3Tv3cuFZ66ivqSTwAhwEpWUo8V7E1RCa9As+hHsqG84YQx24tAGV1FM64N3x/MQvKdCpATt2HeTg/kOsWDyHhQuayRvj5lBI1gDBEcjizxqoPTvKyNMMmJsYGdt2jDB246bJjtLdFnEpgc8+9hc4cPgoew4cpb+/j1UrlzJ7VjWhMeQMoIpJC4r40MuJ6/lGOubRvetUw1RnT54YqcjBoOfdZWDBFhE1VJaFnHvOOp59cQftvftYuXIhew718uN/38q1F53O2uZKjEQESRTfeTvxr3GI1TG7S3l4l05wcggCdPcUePal7QgRl150NmXGuP6Owx7nwFMZ9tcpMiXjxbZNm8ORnnGIAHGdZ0R9QwYBa8GE9APb9x9jz54DNDfUcekFaykLAwLrvMr0p490HAN+myLjPhHI2LYTiLFh2zo2W7zrU3zOSgyqLovV3dXDkUOtrFg4j8bGWYTG+Pf4sJaA2ghjYs8ym8OTxal9D4jPZzmh/oogYMPqJTyzrYVfPH2Q53Ye58Axy9PbjrKsuZJKAbG9oHkvASguHOg/Kwn1e5fDquup6biaQk9vH489/hxz5zazfMkC8kHg9JRhqOYp089xGW+27UjZRTcDbl0wUnQdi9RJNEYEtLZ1s3n7AcJ8nrPXLWdWdbmLNUWuPlOGU2rK1JsSZGzbaYo4gOqiKeKZci5XWVdXw7lnrXXv0fjm8uFetYgRJ78Wv5ghQwqJtKNAiBKqJcwFLF86h18+tIXdrX0oIc/sOMQV584jDCMqjE28GRdKtd4XCgZdYkmbY8QIra3tPPXMC6xfezrzmhoQawkFjEjpugWyxMBQjEDHGfJUpE4o31pFxdDRa3l+y04Kvf2csXwxzbOrMFgCVUwAjkBkUx+StEbKcJLIjOdURTpUIJKETAIjaGQxxtOINN4VxeZWiKIiQZBNbYbhoT6yIeKEMPp7i/zy11vY09JJwdQhCMd6ijy7q5PLz6h1oV5PInFREZtERkohLU8swnXZKFrQQj8XnL2WhvpaxCpBYFx7qgG0zAxDMDiVdsK3ORZtdzFi2+79HGo9zvKlp3FaYw0VgZQYyuI2KxZNmLRK3CAwzltn++2TQbbCTjFYiwvFGLDWOmECMVh1TY01sj7JXwoPJcxGf+UHYX6yDj/DVIcIEnjPz7NLOju7aWvvoLwsR2/RLbZWlZe3H+DcpTVUhAYzKKQnXtZPVShERcIgwHptXRHIi7J43mwfEdFS+Mt9erZKjwLFYpEgGCpMInE9N0JfBPtajrFt90Hqm2ZzwabTqc3lCBIBFC9w4gmCxqR59XFvzcxwvhZkxnOKQX1OSaMI48tKIlUwrg9nIKB6ol6eM6rUKsNrQMKWdespTbNree/1F3GwB3btP8ahQ+3sPWg5dnA/h1vnUD+3zjczZoAOuABbtm7l/vvvp7evj7M3buDaa6/BeBXV0tZO4m8c5mhMdp0OgosjWcLQeMKKEPdxFXFGVcRw6FgXz27bT2VFjgs2rqS6LMSIY8waLaJYlNwA1mzm748dMrbtGGEs2baoy1tqFGHF11tadYXsGrmd56t8j5Q+LcNJYnqzbU+MNMcyDsMaUaqxLCtXli2rpbi0js7CaXT19lEW5rDiFnHjPyBRN1V45JFHeOtb38KsWbN461vfSn19A5dccjHpEoehNNm0udTUz+llRsdN21bVEQS97KZLz9jEew/CkP6+fo60dbBuzUIaqiopN7HYvqI48hAS+OeCEhs6heG8zVPran/tyNi2E4hXZdsOU6Y19AWXXnL/QUdHBz2FiLKKCiqqqnFhMsUIKcbjMFBflSVDvizDKHCq3wNGcWoy4grjizhFn5CipxOF1OcN9blyil731oV53R9bcbE/I8IH/p/3+TZhcPXVV/PY449zyaWXDvnOIaOYPDG4DGN6jffJsm39kpzKMvpn/d4hGQmrdHZ1093TQz5fTnVNDbEYhaoll8uxetl8VDQRlIgsBF7QwknsJUWcI1RpqpvUZE+TEbdiZGzbqYLU+qBYl+hPaPqOOt7T3c3dd9/NsY523vW776K7vY9PfPKTLF65iPqGOt757ptYsXAuQYC7KU6wUS8RMqbXQpRh/JGmh8S58uQqkcCxUIxJDKwQuty7cd5nyVEUt3Abx9w1IrS2tnLBBReSdPZJFh5mbC5hSGRP4vIep9ulKqBFhF7u+fbd7G7p4prf/h2qg04+8ek7mD2nmXkNdVx//bWcfuYa8upDssYpMQVqUQI0ZXyN39wkczDaQtoMJ4XMeE4IFCgSRZHb3UnMdnM7mmKhwH3fuZcz162mvLaM7z94Hz9+6Alu+ugfc/nlG+ju7uChnz3FsjlvxOYCV46S0fszvFYIxOpSiYKUeG0iiQ2sS56JiCMBRO1pDAAABhFJREFUKUTqO2pYVwZlbUnl4NFHf8mePXu49NJL/HM6gCg0cjnEqU1ViTyJylqLMcbVYIt6qTu3q46s5Z6772HlymWcefZcHvn5z/j1L3/OFW+5gd/93WvJ97bzs3/7KU1nLKcxKCckIrIGTM7RflIRpvRIypAHg5GtIa8HmfGcIOzbv4sv3P43dHb1JuxZAJGQ377ud2hsmMfGjeegpo/9W3awY99hNpy/kbyJkOp6GioMXe0d1M1uQMV1Sjh1l5wM4w4ZutgOWID9f+kFuKuri69//ets3bqVWbNm8bGPfYw5c+awe/duPvOZz/Cnf/qnzJ071+nkpozl4N9nChKDqUpraytf+tKXaD3U4l7zBCCjlsuuuhpqF7PunCso0w5y3fv4/Bf38Ke3Xkh1aMnl+phTV8aBI23UzysHcphi4JSfghHG9WSGe+ZNzZggM54TAmHB/GXc/vk7nFC3ApLzr1kK/Z08+L0HOXr0CMWomzv/+S4uvfBcQmsoWgF66ekuUlZVgYoFa2BmtNbMMIVQU1PDH//xHw8whK2trXz605/mhhtu4M1vfnNiLGKDqaoYMzM9HGMMUeQIfk1NTdx2222+Ptt1xTQSIfRQ6IfvPfBvHNt7gOpq+PyXvsolF19EWeA7yZgqjrVb1lbXoQqRKDN0SKcUMuM5EfC7eFWXm3B1Wi7kFUVF8vkKLrnkEr76lS+zfedurrnhHbzl8mv4P/d9l6bFDRw7fJAlK84mX1lOIBa1LheVIcNEIjaIsVEUET71qU/R3t7O0qVL+cUvfkF1dTVnnXUW+Xw+yffFHthMg00p+cRjVvRho8DpPKHkyQf9vPWq8/iHr3ydZ7fvZPW5V/C+d7+bh/7PvzFnTjNHWttpap5LU3W57y4TIBLFDC4y13FyMOwKbK31BfqnLuNwrDB4lx3/G1jcrCARiEW8zJ7xvH+RHKIwf/5i/uzPb0NFUBXEChddcg6PPf0bFi9ZyYaz1xKH0cTLbGU3zdhiuJKDmbrwD4fhSqSuu+46ent7aW9vp6Ojg/7+/hMyFE8VxOtjsVgESsSgYrFIGLplNb3RiH93ddrq24W5TpkqAVW1hv9yyyexlBOJIUc/V77hMn7x74/QOH8+5114NoEUCCRENXCGU4pAJogy1lDVZH7TJSuDr+dhjWcceolxKt8Erxfx2Fhrk0V3+MVWPBO86Mg+6qgaA4ZWQlyPd1AjLFu5nGUrl2IlSMpPrJgSoSPDmGLwBijbOA5Eejzin29729sm85AmFUM3yRAEAVEUYYwZ4nw4om0Rz4kFQlAhEkPBG9ycQk4VTI558+fye+96JyoWod/VempA5D/TDNEWzjAWSDtD6bkcjGGNZ2wARCSJ2WcYHeIxGyKrpT68InEox/P3NV3nZhCNiMTE5euAOD3QYoQNA6wan+7MaObjhfSGCIaWG2TIkL5G0uHZ2KDGa8DQa0dI+vaiiUTeQPmKuOYkSuprXd1mAFYgKBDhmtsbLRUdZRgbjLY71hDjGYbh/9/eueQoDMNg+Lc7Ys8pQVyC67HhDkiIMyBR6n8WjmnaAmJGIEaDvw1VaMojTZz6ifV6jfl87qEVD1zkk4mNxmazwXK5HKhopic3uAhNaUuAslRthJh4YDoVSqJTQE3wZWe0jYLwGLzyKJo8kVpVu91uYWZYLBZv/lbJXyTmPUns93scj0ecTifsdrvL+8B0HejDXYla7MWRwfPQKjuYeHlCQAEKlMVXQlt0ohCUcoSv/rEfBkkcDgesVqu7nuLC0dYoVFZmdjUpcTLFSwL1TynX1LYxNerpUse4RcC6e+IRDVsoCJOZp+tD7FO7InObnDUvoLZ3foLtLvk9dShKEMfRPhWevdj0RAle0FrM7Z9ux+wA+4KpFsegM86cuUFHgJmVfgK4233en8+mHrsY50k2vrHwjI5jcgG5z/g/m04aV8/2hYOHweEcvPZ5KoGmZCXxdonPkf8dXP4u8t5PHuWeOr/2SB70qc+BeUtonxhmHbqZR1zFS2FZEUptFJa+l4DcvD+fTT12t7QIV4VnkiRJkiS3SR/8JEmSJPkh38FYfaGXFPAAAAAAAElFTkSuQmCC)
A. 4
B. 1
C. 3
D. 2
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi giữa học kì 1 Toán 12 THPT Việt Đức Hà Nội năm học 2017 - 2018