Đường cong ở hình bên là đồ thị của một trong bốn...
Câu hỏi: Đường cong ở hình bên là đồ thị của một trong bốn hàm số dưới đây. Hàm số đó là hàm số nào?![](data:image/jpeg;base64,/9j/4AAQSkZJRgABAQEA3ADcAAD//gA7Q1JFQVRPUjogZ2QtanBlZyB2MS4wICh1c2luZyBJSkcgSlBFRyB2NjIpLCBxdWFsaXR5ID0gOTAK/9sAQwADAgIDAgIDAwMDBAMDBAUIBQUEBAUKBwcGCAwKDAwLCgsLDQ4SEA0OEQ4LCxAWEBETFBUVFQwPFxgWFBgSFBUU/9sAQwEDBAQFBAUJBQUJFA0LDRQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQU/8AAEQgBPwFmAwERAAIRAQMRAf/EAB8AAAEFAQEBAQEBAAAAAAAAAAABAgMEBQYHCAkKC//EALUQAAIBAwMCBAMFBQQEAAABfQECAwAEEQUSITFBBhNRYQcicRQygZGhCCNCscEVUtHwJDNicoIJChYXGBkaJSYnKCkqNDU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6g4SFhoeIiYqSk5SVlpeYmZqio6Slpqeoqaqys7S1tre4ubrCw8TFxsfIycrS09TV1tfY2drh4uPk5ebn6Onq8fLz9PX29/j5+v/EAB8BAAMBAQEBAQEBAQEAAAAAAAABAgMEBQYHCAkKC//EALURAAIBAgQEAwQHBQQEAAECdwABAgMRBAUhMQYSQVEHYXETIjKBCBRCkaGxwQkjM1LwFWJy0QoWJDThJfEXGBkaJicoKSo1Njc4OTpDREVGR0hJSlNUVVZXWFlaY2RlZmdoaWpzdHV2d3h5eoKDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uLj5OXm5+jp6vLz9PX29/j5+v/aAAwDAQACEQMRAD8A/VOgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgDwG7/aHtbL9svS/g68safafCcur53j5rrzxtiC4zuEMcsnX7pFAHvoOaAFoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoA/DTxh+0AY/+Cp7eO47n/Q7DxamkeapUA2yYsX5zjaU3856GgD9yI/4vrQA+gAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAhmlS3jaSR1jRRlmY4AHqTQBhaL498NeJNZv9K0jxHpOqapYKr3djZXsU09srZ2mRFYsgODjIGcGgB2sePPDXh7XdK0TVfEOl6brOqsyafp95exRXF4wxkRRswaQjI+6DQB0AYHoc0AcJ8bfiAPhZ8IPGfi4uqtouk3N5GWXI8xIyUyPQtt/OgD+ZqW4kmmeeR3eV23NIxJYtnJJPrQB/Sh+zL8TpfjJ8AfAXjK5lWW/1bSLea9ZFCr9qCBZ8AdB5ivgelAHqNABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQBma1o1j4i02fTtUsbfUtPuBsmtbuJZYpF64ZGGCMjv7UAfn/wCDPB2jfA7/AIK0S6P4U0u10PR/Fng5ppdOs4Vht4mwHby0UALl7MMcDqzeuKAPbf2k/g14a+L3x6+Dhjs7qXxx4f1FNa+3QTskNjptvMkjmVcFSZJljjRQATvc5whoA+o4020AfEH/AAVz+KB8Dfsqz+H7dsXnizU7fTjtYqywRn7RIwwehMUaHPUSmgD8OtpFAH7X/wDBHj4oxeK/2bNS8KTTKdR8K6vJF5WSSLa4HmxMewzJ9oXA7R0Afe4OaAFoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAQjNAH55ftVa+3wz/wCCkvwU8TRabf6zPeaHcWS2GmRCS5um/fosaAlVyWkHLMqjJLEKCQAfY/wk8A3vhi31HXPEUyXnjTxDKt3q1xG26OEqoWO1hOB+5hUbV45Jdz8zmgD0egDj/Hnwm8FfFSG0h8ZeEtF8VxWrM9vHrNhFdLCWADFBIp2k4GcelAHgV3+y58HE/aQ0vSh8LPBo0uTwrdXT2f8AYVr5TTLdwKshXZjcFZhn0JoA948B/BzwL8LTeN4N8HaH4Ua92i5Oi6dDa+dtzt3+Wo3Y3NjOcbjQB2gG0YFAC0AFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQA1vun6UAeI/Ef9rv4Z/Cf4nWfw/8Sa3cWnii8s1vLezhs5ZzNuYpHEmxTulkYELGoyTj1oAveB/h5N4r8bw/FLxfpENr4mWzex0awfDyaPZO5Yhm6G4lG1nI4TARcjczgHsOBQAtABQB5Je/8nVaP/2Jt5/6W29AHrdABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAeT6B+0P4e139ofxJ8HYrTUYfEmiaRDrMlxNEotp4XaMHy2zklTNGDkDkkD7tAHrFABQAUAFABQAUAFACMNykUAYE/gjQLrxJD4hm0XTpdfhj8mLVHtUNyic/KsmNwHJ6HuaAN5V2rigB1ABQAUAeSXv/ACdVo/8A2Jt5/wCltvQB63QAUAFABQAUAFABQAUAFABQAUAFABQB5P4r/aG0Dwj8d/BXwnuLO+uPEPiqzur23nhVfIt44UZsyEtkbtjgYB6DPWgD1ZW3UAOoAKACgAoAKACgAoAKACgAoAKACgAoAKACgD4q1+5m8Kf8FXvC0sUSmDxR8P59OkY9f3M0k5I98wIKAPtWgAoAKACgAoAKACgAoAKACgAoAKACgDyS9/5Oq0f/ALE28/8AS23oA9boAKACgAoAKACgAoAKACgAoAKACgAoA+ItakHif/grDoURQyJ4d8ByNkchGkkkIJ+olx+IoA+2oxgUAPoAKACgAoAKACgAoAKACgAoAKACgAoAKACgD4k/ajSXw7+3z+zBrwPlRXx1LSS/rlBwf+/o/OgD7aDA9KAFoAKACgAoAKACgAoAKACgAoAKACgDyS9/5Oq0f/sTbz/0tt6APW6ACgAoAKACgAoAKACgAoAKACgAoAKAPiv4J2974j/4KZ/HvWPLX7DoHh7S9GZz13zpDOmPwjl/KgD7UoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoA+Kf+CjcVr4b1v9nTx7c3Jt/wCwfiPY2sjZwot58ySkn2W1H/fRoA+017igB9ABQAUAFABQAUAFABQAUAFABQAUAeSXv/J1Wj/9ibef+ltvQB63QAUAFABQAUAFABQAUAFABQAUAFABQB8Uf8E+Ym8SfFX9qPxw9217/a3j2bTIZicg29o0vkAewjuFX6AUAfa9ABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFAHx3/AMFWdAGtfsZ+J5xB5s2m31jextjmMidUZx/wCR/zNAH1R4O8RQ+MPCWia/boY4NUsYL6NG6qssauAfoGoA3KACgAoAKACgAoAKACgAoAKACgAoA8kvf+TqtH/wCxNvP/AEtt6APW6ACgAoAKACgAoAKACgAoAKACgAoAp6tqCaTpd5eyf6u2heZvoqlj/KgD45/4JQWKj9mjUdXwd+s+JtRvWY/xfOqA/wDjtAH2lQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQB4J+3R4efxN+yH8V7RF3PHoVxdj28kCYn8kNAGx+yB4gfxV+y/8LtTdxI83h6zViPVIlQj6gqaAPY6ACgAoAKACgAoAKACgAoAKACgAoA8kvf8Ak6rR/wDsTbz/ANLbegD1ugAoAKACgAoAKACgAoAKACgAoAKAPOf2h/EB8J/AX4ka0AWOn+HNRulA65S2kYD8SKAPL/8AgnN4XuPCX7GXwytru3EFxdWMuoMAPvLPcSzRsfcxvH+lAH0tQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQBzvxC8JQePvAXiTwzdOY7bWtNudNldRkqk0TRsR+DGgD5r/4JbeJl8RfsWeC7cy+Zc6TPfadcDujLdSuqn0Ijkj/ADFAH1tQAUAFABQAUAFABQAUAFABQAUAFAHkl7/ydVo//Ym3n/pbb0Aet0AFABQAUAFABQAUAFABQAUAFABQB8s/8FMfFUvhX9iv4iyWt19lvL6O006L1kWa7hSWMf70Jl/DNAHt3wV8Nr4M+D/gXw+hLJpOg2NgpbriK3jQZ/75oA7igAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgBrfdoA+K/wDgmy8mgXX7QHg2S3jg/sf4g3twvl8ALMqqFA7ACAfnQB9rUAFABQAUAFABQAUAFABQAUAFABQB5Je/8nVaP/2Jt5/6W29AHrdABQAUAFABQAUAFABQAUAFABQAUAfE3/BU2ZtS+Ffw78KJH5sniLxtp1oqdzjfwB75FAH2jawLawRxIMJGoRfoOBQBYoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoARvumgD4l/Zg2eDv+CgX7TvhUuw/tBdN16CP+Fg8StK2PUNcKPzoA+2V6UAOoAKACgAoAKACgAoAKACgAoAKAPJL3/k6rR/+xNvP/S23oA9boAKACgAoAKACgAoAKACgAoAKACgD4s/bFtf+E8/bA/ZS8ER3SReVrV94luEbk4so454+PRvJmWgD7ToAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKAEb7poA+LfFUjeCP+CqPgu8S2VLXxp4DudLeZSAXmglknZm9wkMKj6+1AH2iv3aAHUAFABQAUAFABQAUAFABQAUAFAHkl7/AMnVaP8A9ibef+ltvQB63QAUAFABQAUAFABQAUAFABQAUAFAHxPcN/wmP/BWCA/ZQY/CXw/8vzGOcSTTOwdR2O24K/gaAPtigAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoARuRQB8Sfttxr4S/aj/ZZ8aFJUT/hIptDmmiOP+PgRqiH2Ys/4A0AfbSfdoAdQAUAFABQAUAFABQAUAFABQAUAeSXv/J1Wj/8AYm3n/pbb0Aet0AFABQAUAFABQAUAFABQAUAFADWoA+Jf2UjH42/bu/ai8WB2kj0qbT/DsDNzgorrKoPs9sP++qAPtygAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKAPjP8A4KraVdR/sy2Pi/T5PJ1HwZ4m03XbeQfe3CQwjH/Ap1b/AIDQB9eaHqttr2i2Gp2b+ZaXsEdzC4/iR1DKfyIoA0KACgAoAKACgAoAKACgAoAKACgDyS9/5Oq0f/sTbz/0tt6APW6ACgAoAKACgAoAKACgAoAKACgCpe3MVnay3E0ixwRIzu7nAVQMkk/SgD43/wCCWouNd+DPjfxxe+S9/wCMfG2p6xLLGvPzFFKk9wHV2H++aAPtOgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKAPDP23fCx8X/smfFPTlWNnXQri6XzBkDyF87P1AjOPfFAFj9jDxV/wmf7Knwt1UtEzvoNtA/lHIDRL5RH1BTB980Ae10AFABQAUAFABQAUAFABQAUAFAHkl7/ydVo//AGJt5/6W29AHrdABQAUAFABQAUAFABQAUAFABQB5b+014rTwP+zx8SNeYx5sdAvpEEhwrOYXVV+pYgfU0AcF/wAE9vB8ngz9jj4Y2s0Yimu9N/tNsDG4XEjTIT7lHSgD6PoA5zx74mk8G+CfEWvxQLctpWnXF8sLNtEhiiZ9uewO3GaAPhb4af8ABZz4W+IZ4rbxh4b17wjK5AN3CqX9qowOWKbZBznhY2oA+pPh3+2B8GvinLBF4b+JGgXlzNtEdpPci2nZmOFURy7WLEjoBn25oA9ljbcuQcj1oAfQAUAFABQAUAFACHpQB449l8dzNJ5Wr/DxIyx2CTS79mC5OASLnrj0x34FAD/sXx9/6DPw4/8ABTf/APyTQAfYvj7/ANBn4cf+Cm//APkmgA+xfH3/AKDPw4/8FN//APJNAB9i+Pv/AEGfhx/4Kb//AOSaAD7F8ff+gz8OP/BTf/8AyTQBQ1vw78cte0i+0y+1P4bz2V7BJbzRNpN+Q6OpVlI+09CCaAPmD/gnLe/FwfAvVPBWg6h4Ns4PA3iK/wBDlg1exu5bjzBJ5zuWjmQbS8zgfL/AetAH1d9i+Pv/AEGfhx/4Kb//AOSaAD7F8ff+gz8OP/BTf/8AyTQAfYvj7/0Gfhx/4Kb/AP8AkmgA+xfH3/oM/Dj/AMFN/wD/ACTQAfYvj7/0Gfhx/wCCm/8A/kmgA+xfH3/oM/Dj/wAFN/8A/JNAB9i+Pv8A0Gfhx/4Kb/8A+SaAD7F8ff8AoM/Dj/wU3/8A8k0AH2L4+/8AQZ+HH/gpv/8A5JoAPsXx9/6DPw4/8FN//wDJNAB9i+Pv/QZ+HH/gpv8A/wCSaAPMLuz+Nf8Aw0lpSnVfAX9qf8IrdFZP7MvfI8n7XBuG37RuL7tvOcYz3oA9P+xfH3/oM/Dj/wAFN/8A/JNAB9i+Pv8A0Gfhx/4Kb/8A+SaAD7F8ff8AoM/Dj/wU3/8A8k0AH2L4+/8AQZ+HH/gpv/8A5JoAPsXx9/6DPw4/8FN//wDJNAB9i+Pv/QZ+HH/gpv8A/wCSaAD7F8ff+gz8OP8AwU3/AP8AJNAB9i+Pv/QZ+HH/AIKb/wD+SaAD7F8ff+gz8OP/AAU3/wD8k0AH2L4+/wDQZ+HH/gpv/wD5JoAPsXx9/wCgz8OP/BTf/wDyTQB8uf8ABRzVvjDpf7Nd5oWvX3g+8tPFGq2OirDodjdQ3JdphKuGlnZQCYQp+U8MfWgD6H8F+EPjh4P8IaHoFhqfw7gsNKsYLG3ifSr8skcUaoqk/aQMgKOlAG59i+Pv/QZ+HH/gpv8A/wCSaAOM+Mdr8cB8JvGxv9W+H72I0S989bfS75ZDH9nfcFJuCA2M4yDzj6UAfz1nrQBYtreW6njhgR5ZZGCpHGpZmYngADqc0AfWvwB+GP7Y9nHbxfDjT/HmjWHIjiuLlrG0Uey3LLGPyoA/VD9m/wAOftR6PDa/8Lb8U+CNZsmIeSK0spTqCqVB2GSMRQhlPH3Hz/eoA+mIwRnNAD6ACgAoAKACgAoAKACgAoAKACgBknagD4l/Y9j/AOEC/bH/AGoPAhSOFJdSs/EEEaPkbbhC5IHriZM+5AoA+3aACgAoAKACgAoAKACgBGOBQAzzD17UAOVty5oA8mvf+TqtH/7E28/9LbegD1ugAoAKACgAoAKACgAoAKACgBD0oA+Jv28LYeP/AI8/sxfDlIluf7R8US6zdQlzxb2ixu+5fQoZMH/YNAH2unCjigB9AHP+N/DI8Z+Dtd0Brg2o1SwuLFp1XcYxLGybgMjON2cZ7UAfInw1/wCCSHwK8DRxPrVtrHje+AUs+r3pjhDAfNsigCfKTzhy+OOaAPpr4dfAf4e/CNMeDPBeieG5SnltcWFjGk7rnO1pcbmGQOCaAO+8v3oAfQAUAFABQAUAFABQAUAFABQAUAFABQAhGaAPin4izr8Lv+CoPw31qGGCGz+IHhK68P3krLgmaB2nVs/3mMdtHz2FAH2vQAUAFABQAUAFABQBQ1HULfSrK4vby5js7O2jaWa4mcJHGijLMzE4AABJJ6UAfJPhP9oDx1+2P4w1fTfhFer4L+FuiXX2TUPHc1ss99qUw5aGwjf5EG0gmRwxG5TjsQD0Lxx+zfr914cvJfCPxb8daR4xjhP2TUL/AFg3VrLKBlRPasnk7WI58tFPcelAHIfsG/tYa1+0L4a8R+HPG9lHp3xI8HXf2HWI4QqpcYZkEoUEhWDI6so4yARw2AAer3v/ACdVo/8A2Jt5/wCltvQB63QAUAFABQAUAFABQAUAFABQA1vuntQB8R2SD4kf8FWL66ZVltfh/wCCFgiO4fJcXDklgPUpcuv4CgD7cX7tADqACgBNw9aAG7155HHXmgBN679u4bsZ255+tAElABQAUAFABQAUAFABQAUAFABQAUAFABQB8Rf8FKQfBEnwS+K6syQ+EPGdsl/KkJcx2k4JkkYjoB5QUepkFAH22rBulADqACgAoAKACgBCcUAfnR/wVq+Oeu2+meE/gd4Qilm1zxnKj3iW7DzZYTKI4LZR6yynnkf6sDkMcAH2r8CPhJp3wM+EfhfwPpaRrbaPZpC7xrgSzHLTSnjkvIzt/wACoA7m7uIrSGSad1hhjUs8khAVVAJJJ6AAetAH5ff8EoL5/Hn7SXx98eWSTR6JqkzyxiRcc3F5JMgb/aCA/maAPvC9/wCTqtH/AOxNvP8A0tt6APW6ACgAoAKACgAoAKACgAoAKAGyfcOaAPib/gn1DH8Rvid+0T8Y1kjubTxH4tfSNLlWLaTZ2gOxwf8AbSaHPvGaAPtocCgBaACgDn/FHhWw8XaLdaRqS3LWNx/rFtLya1dhnON8TowGeuG579aAPzr0P/hIP2Pf26vEnw08BJNdaF8StHjvNBs9UmkmtrDUCSPPldjudIzHcMyqdzK0a5yAQAfVvwy/Y18M/Dv4wj4py+JfFPiDxxNYtZX11qepb7e6ZwA8hiC/KPlAWMNsUBcLkAgA+hl4AFAC0AFABQAUAFABQAUAFABQAUAFABQAUAeBft1+Bf8AhYn7JPxP0hY/NlXSmvo1/wBu2ZbhT/5CoA2v2Q/Hr/Ev9mf4beIZp2ubu50W3juZXfczzRqIpGY/3iyEn3JoA9joAKACgAoAKAGv2oA/L39rXTBY/wDBV34H6jrKhNJu10xbSWUfKZkuJgqg+olZPxYUAfqCzbUz14oA+Of+ClH7RI+GXwcm8A+H0n1H4g+Oo20vTtOsFMs6wOQk0mxfmO5SY1AHLN/smgDtf2Df2YP+GX/gNYaHqEEaeLtTk/tHXJUKuROwAWEOMgrGgC8EjJcj71AHc3v/ACdVo/8A2Jt5/wCltvQB63QAUAFABQAUAFABQAUAFABQB5x+0L44Hw1+Bnj3xRvMTaXot1cRuCAfMEbbMe+7bj8KAPKf+CcfgOTwB+x78PoJojFcanatrMm4glhcuZUbj1jaM884IFAH07QAUAFAHHeI/ir4N8H6q2k654s0PR9UFq999iv9Rhgn+zrktLsZg2wYOWAwMH0oA/PH9svWtf8AC/xI+B37TmpRz2Hhy18Sx2MWmMmJrfSXVZI2kUqCJZkS8cqR8geJD8ykkA/RPwv8QtG8Y6lqttol2up2+mtHHNf2zB7YyspYxLIDtZ1XaWA6b1zzxQB1Y6UALQAUAFABQAUAFABQAUAFABQAUAFABQBRvrCDU7S4tLqFLi1njaKaGVQySIwIZWHcEEjn3oA+Of8AgmhfS+EfCXxJ+Dl7PLNdfDrxXd2Ns8qhS9jKzPE55+8zrOxwBgOtAH2pQAUAFABQAUAFAHhf7U37KPhP9qvwnZabrr3Gl6xpkhn0rX7AD7RZSEDOMn5kJCkqSM7QQQQDQBkeH/B37S2mWyaFdePvAN7p0MXkp4on0G7fUnwMB3tRcLDu4Gf3h70AW/hV+yF4X8A/EG++IuvX194/+Jd7nzfE2uhC0IIAK20IHlwKANo2jIXK5wTkA9+TO3mgDya9/wCTqtH/AOxNvP8A0tt6APW6ACgAoAKACgAoAKACgAoAKAPjD/gqLr11ffBPw18N7CQrf/EDxNYaOVCbm8lZVlZl9xIkP4E0AfXeg6Na+HdEsNK0+BbWwsbeO1t4I12rHGiBUUAdAAAOPSgDUoAKACgDyrxt+zZ8NfiR8R9G8deJvB9jrXinRlWOyvrouRGFJZd0e7y5CrMSC6nB6YxkAG/8VPhR4T+NXgy78KeMtFi17Qbh0eS0kd4/mQ5VlZCrKQR1U56j2oA1/CXhPRvA/hvT/D+gaZb6Ro2nwrBa2VpGFjiQDAAH9Tyckn1oA36ACgAoAKACgAoAKACgAoAKACgAoAKACgAoA+IdHi/4Uf8A8FPdSt5FaPRfi34b+0WrhMINRtBmSPOevlxO595kFAH24rbs8YoAdQAUAFABQAUAFABQAUAFAHkl7/ydVo//AGJt5/6W29AHrdABQAUAFABQAUAFABQAUAFAHxB8RUX45/8ABSrwD4YytxoXwt0OXxBfIVbBv5yBChOcZTNtIDj+FwaAPtxFK9aAH0AFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQB8Uf8FLdHuvCnhb4c/GfTYBPc/DnxLbXt3tC7vsU0iRuAT1Jk8lcf7ZPagD7F0PWLPxBpNlqen3Ed5YXsEdzb3ERyssbqGRl9ipBoA0qACgAoAKACgAoAKACgAoA8kvf+TqtH/7E28/9LbegD1ugAoAKACgAoAKACgAoAKAKF9fwaXaz3V1NHb2sCNLLNKwVY0UEszHsAASSTQB8Z/8E7LJ/iVrnxf+PV1HJH/wnfiGWDSI5lAdNNtiVjPDHklthBHBhz3oA+26ACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKAOL+MPw6s/i38LPFXgy+2pb63p01kXbOI2dCFfj+62D+FAHz/8A8E2fiHdeI/2eYvBetlrfxf8AD6+m8M6tYzNmWAwuREDyfl2fID0zEwHAoA+tKACgAoAKACgAoAKACgAoA8kvf+TqtH/7E28/9LbegD1ugAoAKACgAoAKACgAoAKAPlz/AIKJfFib4b/s3azpmll5PFPjCVPDWjWkR/ezS3B2vtGe0e/n+8yA4zQB6z+z18KYvgf8FvB3giJklk0fT47e5mizsluMbpZBwOGkLEcdCKAPSqACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKAGuMqaAPhfXG/4ZX/AOChVrq8yiDwH8ZrVbSefLBLbWIRhS3PR8r17zt0CnIB90R/cHGKAHUAFABQAUAFABQA1m29s0AJ5ntQB5De3MS/tV6MhdQx8HXgC7hnP223OMfn+VAHrwkHpigBQ1ADqACgAoAKACgAoAa77BnGaAPhXV5D+1d/wUJsNNTMvgL4NW/2u6ZcNHdaxLjYhOf4Dt/G3cfxUAfdlABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAnUUAeDftl/s/J+0T8EdU0O0Bt/E+nsuq6BeoxR7e+iyyYbsHG5Dn++DwVBABS/Yr/aLf8AaH+DlpdauwtfHOhN/ZPibTZFEU8F7HlWkeLA2CTaWAwACHX+AigD6HoAKACgAoAKAPnf45/txfC/4E3x0W91WTxJ4ydhDb+FfDsf2y+lmLBVjYKdsbZ7OwPXAPGQDyRfFX7Xf7S8IOg6NpH7PfhSX5hfawv23WJkO4YWIqQnGM7kQ9w3agCWP/gmda+NUE3xT+M/xC8eTOyyS2n9oi1snIAGDEVc9R1VlNAHP3P/AATZ+AcHxy03wqPCd4dKm8NXGoODrF35huFuYY1fd5nZXbgDHPSgDom/4JkaN4OJm+F/xd+Ifw+nEhljtodTFxZocEcRbUY9erOaAKrat+2F+zXEW1C00b9ofwnGQWns1+w6zAgxkbAAHHXosrHqSB1APU/gd+3l8MPjTfroEmoT+CvG6S/Z7jwt4oj+x3aTZwY0LfLIc8BQd3Iyo6UAfSEbFgTQA+gAoAKACgDw79r79oe1/Zu+DWp+IFxceJL0/wBnaBpyp5kl3fSDEaqn8QXlz7LjqQCAYn7Ef7Ptz8BPgpbQa+DN458QzNrXiO8lYvM95NyUZ+pKKQvBxu3kdSSAfRlABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUARyKWxgc0AfDP7Sfw38WfsvfGST9o74X6dLq+kXiiLx74Vt0BN1bjObxBn768McdGG45VpKAPqv4PfGbwj8dfBNl4s8G6xDq2lXIwxQkPBJgFopEPKOuRkEd89MGgDvdw9aADcPWgDwv4/ftkfC79nW3mh8TeIFuvECbfK8OaSBc6jMzYKqIwQEJBBzIVHI55GQDwP7L+0x+2i26Sa4/Z2+GDDAhQlte1FSchicBolAz3TqOHzlQD6E+Af7Ifwx/Zxtoz4T8OxNrJXZPr+oH7RqE5wAzNKR8u4jlUCr7UAe3UAFAHkl7/ydVo//AGJt5/6W29AHrdABQB438dv2T/hn+0XYPF4z8NW93qAiMcGsW37i/t+DtKTLydpOQrZXPUEcUAfOB8N/tK/sXbJdDvZv2hPhfGdp0q+YrrunRgn5kfkyADA4L+yIOaAPcvgD+2p8L/2g/JstH1k6L4r3NFP4X1xRbajDIpIZNhOHIwT8hPHXByAAe/8AmLnGaAE8xaAOR+J/xU8K/Bvwfe+KPGWtW+h6JaDD3NwSSzEEhEUZZ3IBwqgk4PFAHx/8AvBXiX9sn402nx9+ImmXOleA9DYjwD4XvVUEg4/06ZRnLE5YZPLBcfKi5APu9M7eetADqACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKAIJIlkDBgGVhggjIx3oA+QPiF+wPNoPjK68cfAHxvdfB/xLef8AH/p1rGJNIviGLKXg/hILNxhl54VTkkAism/bn0G3t7Bk+DfiJl+RtUuxfxSuAeGkWNo1Bx/cSgDMuv2dP2rPi9PJH8QPjppngjSJnYvp3gCzdWRCeESdhHIOOhZmI9+4B7B8Cv2JPhN+z9PFqPh/w79v8Rrkv4i1txd6g7sMM+8jajNk58tV6n1NAHvaptXH40APoAKACgDyS9/5Oq0f/sTbz/0tt6APW6ACgAoAYybuckUAeFfHn9i/4T/tGfaLrxb4ajTXJY9i+INMP2a/jwu1W8wDDlRjAkVgNoGCOKAPGLT9mj9p/wCDkyp8NvjtaeLNGiYeTpPxAtGmOwEkRtOod8Y7qV/CgDSu5/25tYgu7BLb4M6GXUompwf2g7x5H3kV2kXI7B0x7UAN8EfsE6h4z8ZWnjH9obx3c/F7V7M7rDRXiEOj2bEgswh6PnaONqqR94NxgA+xbe2jtYkjhRY4kUIkaABVAGAAOwHTFAFqgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgAoAKACgBu0elAC7R6UALQAUAFABQAUAeSXv/J1Wj/8AYm3n/pbb0Aet0AFABQAUAFADdq+g/KgA2j0oANooAdQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFAHkl7/ydVo//AGJt5/6W29AHrdABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQB5Je/8nVaP/2Jt5/6W29AHrdABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQBzMng2xfx7beK2ab+04NNk0xV3Dy/KeVJCSMdd0Y5z3NAHTUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAFABQAUAf/9k=)
A. \(y = - {x^3} + {x^2} - 1\)
B. \(y = {x^4} - {x^2} - 1\)
C. \(y = {x^3} - {x^2} - 1\)
D. \(y = - {x^4} + {x^2} - 1\)
Câu hỏi trên thuộc đề trắc nghiệm
Thi Online Đề thi THPT QG 2018 môn Toán - Mã đề 101 có video HD giải