Cho hàm số \(y=f(x)\). Hàm số \(y=f'(x)\) có đồ th...
Câu hỏi: Cho hàm số \(y=f(x)\). Hàm số \(y=f'(x)\) có đồ thị như hình 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dJMyU/Dqq6/irbfeQkVFBSIiImjYZARLly7VD5O++eYbocuplqZNm+Lll1+GRqPBjh07hC6n1kw+ZA4dOoSHDx8iICAA3t7eQpdTbUuWLIG7uzsuXbqERYsWCV2OWbtx4wY+/vhjAI/We67sPuZiFRYWBuDRBLCpMvmQ4SZ8Q0NDBa6kZhwdHbFmzRoAj842/d+btxPDYIwhMjJSfzSJ+9CaipCQEABAfHw8VCqVwNXUjkmHTEVFhX6oNGTIEIGrqbmBAwfijTfegFqtxvjx46u8pzOpvdWrV+PkyZNwcXExycs6PDw88MILL6C8vByHDh0SupxaMemQSUhIQEFBAVq2bImAgACD7HPnzp346KOPDLKv6li+fDkaNWqEM2fOYPny5UZr1xJkZGToT7pbunQpXF1djdLuwYMHMWvWLDDGDLK/wYMHAzDhIZPQM891MXnyZAaATZ8+3WD7bN26NQPw3NtZGFJcXBwDwGxtbVlqaqrR2q0NUzq61L9/f0Fq7dixIwPAzpw5Y5D9/fnnnwwAc3Z2ZhqNxiD7NCaT7snwMVTihizl5eUG2+fzjBgxAoMHD0ZpaSkmTJhgtHbN2ebNm3Hw4EHY29vzdtJdVbj3kFqtNsj+AgIC0Lx5czx48ABJSUkG2acxmWzIXL9+Hbdu3YK9vT26du0qdDl19t1338HR0RHx8fH6yw9I7eTk5GD69OkAgM8//xzNmjUTuKK6e+211wAAhw8fFriSmjPZkOFe7ODgYMjlcoGrqTs3Nzd89dVXAICZM2fi7t27AldkuqZMmYL8/Hx0794d77zzjtDlGASFjACOHDkC4NGJbeYiMjISwcHBKCws1C9qTWpm9+7d2LZtG5RKJX744QdIJBKhSzII7sv04sWLyMnJEbqcGjHJkFGr1fp1Nvr16ydwNYa1du1a2NraYu/evYiLixO6HJNSUFCg77nMmzcPrVq1Ergiw3FwcECXLl3AGNN/wZoKkwyZpKQklJSUwMvLC15eXkKXY1Cenp5YuHAhgEfdfnNZ59UYZsyYgaysLHTs2FFUK90ZCveFampDJpMMmaNHjwLgZ6jEda+F7GZPnToVXbp0QV5eHqZMmSJYHabk8OHDiI2NhVwux7p163hZqqO6+HoPcfMy1JMxgvj4eABAnz59DL7vkSNHomvXrvD09DT4vqtLKpUiNjYWSqUSW7du1V86QSpXXFysP/Q/e/Zs+Pv7C1rP8OHDERQUhLZt2xp0v4GBgXBxcUFOTo5pXYYi9Ik6NVVcXMxkMhmTSCQsNzdX6HJ49cUXX+jv25Sfny90OYwxcZ6MN2nSJAaA+fr6svLycqHL4dWQIUMYAPbdd98JXUq1mVxP5rfffkNFRQV8fX1N6mra2pg5cyaCgoKQnZ1Nw6YqHD16FGvWrIFMJkNsbCwUCoXQJfGqZ8+eAB5dUmMqTC5kuBe3V69egtZhDFZWVoiNjYW1tTW2bNlCw6b/UVRUhMjISADAv//9b3Tq1EngivjHhcyvv/4qcCXVRyEjcu3bt8f8+fMBPLrVS15enrAFich7772HjIwM+Pr6Yt68eUKXYxQBAQFwcnLCvXv3kJKSInQ51WJSIaNSqXDhwgVIJBJ9oluCWbNmoXPnzsjJyRHdPaWEsn//fsTExEAmk2H9+vVmP0ziSKVS9OjRA4DpDJlMKmSSkpL08zH169fnpY3bt2/j1KlTvOy7tqysrLBhwwbY2Nhgx44d+PHHH4UuSVD5+fn6YdJHH32Ejh07ClzRk7KysnDy5Ene9m9qQyaTCxkAePnll3lrIywsDD169EBmZiZvbdRG69at8cUXXwAAoqOjkZGRIXBFwpk0aRKys7MRFBSEDz/8UOhynjJmzBj06tULN27c4GX/XMiYyhXZJhUyXA+jS5cuvLXx4MEDaLVaUZ5pO2XKFPTt2xcFBQUIDw+3yJX01q9fjx07dsDW1habNm0S5Y387t+/D8YY7t27x8v+AwICYGNjg4yMDNF9GVbGZEJGp9PhzJkzAPgNGTGTSCRYv349XFxckJCQgMWLFwtdklGlpaVh6tSpAIDFixejdevWAlckDLlcrj+S9vvvvwtczfOZTMj8/fffKC4uhqurq6Bn4wrN3d1dvwD5xx9/jHPnzglckXFoNBqMGjUKxcXFGDBggNks4VBb3BpKFDIGxL2YltqLeVxYWBgiIyOf+OCZu7lz5+Ls2bNo3Lgx1q9fL3Q5gqOQ4YEx5mNMyfLly9GmTRukpqZi4sSJQpfDq0OHDmHRokWQSCTYtGkTGjZsKHRJguNC5uLFiygrKxO4mmczuZAxh6U2DcHW1hZbt26FUqlEXFyc0dexNZbMzEyMGTMGjDHMnj0bffv2FbokUWjQoAF8fHyg0WhEP2Q2iZDJz8/HjRs3npjwIoC/vz9WrFgBAJg+fTrOnz8vcEWGpdFoMGLECOTl5aFHjx5YsGCB0CWJiqkMmUwiZLik9vf3h1Kp5LUtb29v2NramkyXfMKECRgzZgzKy8sRFhaG/Px8oUsymBkzZiApKQmNGjXCTz/9JOgaMTXh7e0Na2tr3u/z1LlzZwCgnowhcN/QQUFBvLcVFxeHK1euwN3dnfe2DGXNmjUICAhAeno6Ro4cCa1WK3RJdbZx40asXLkSMpkM27ZtM6m/x7p163Dt2jX4+Pjw2g7Xqxd7D9YkQoZLamMMlRwcHNC8eXPe2zEkGxsb7Ny5E87Ozjh27BhmzJghdEl1cubMGf1k9qJFi0zuOjU7Ozu0aNGC93YCAgKgUCiQnp4u6gtnTSpkjNGTMVWenp7Ytm0bZDIZVqxYge+//17okmrlzp07CA0NRXl5OcaOHWvygcknhUIBX19fAOLuzYg+ZO7evYusrCzY2Nigffv2Qpcjan379sXSpUsBAJMnTza5BaeLioowYMAAZGVl4aWXXjLZoDQmUxgyiT5kuF5MYGCgyUz8CSk6OhpTpkxBRUUFhg0bhj///FPokqpFrVZj6NCh+Ouvv+Dp6Yk9e/bA2tpa6LJEj0LGAIw5HwPALC46XLZsGUJCQlBcXIx+/frxdjWwoeh0OowZMwbHjh2Di4sLDh48iEaNGgldVq0xxsAYM0pbFDIGYOz5mIiICLi5uUGlUhmlPT5IpVLExcWhe/fuyMnJwSuvvCLapSEYY4iKisK2bdtQr1497N+/3+RvyhYdHY2GDRvi/v37vLfl6+sLpVKJzMxMZGdn895ebYg+ZP744w8AxuvJnD59GllZWfjnn3+M0h5fbGxssG/fPgQGBiI9PR29e/fG7du3hS7rCYwxvP3221i7di0UCgV27tyJl156Seiy6uzUqVPIz883ym1L5HI5AgICAAAXLlzgvb3aEHXI3LlzB3l5ebC1tTX5bzchODo64siRI/D390daWhp69uyJ1NRUocsCAGi1WkRGRmLNmjVQKBTYvn27Wd3X3Jg6dOgAAKKdfxN1yFy6dAkA4OfnB6lU1KWKVoMGDXD8+HH4+/vj5s2b6N69u/51FUp5eTmGDx+OdevWwdraGtu3b0dISIigNZkyCpk64F407kUktdOgQQMkJCSgW7duyM7ORo8ePXDgwAFBasnJyUHv3r2xc+dO2NnZYf/+/RQwdUQhUwfcNy435iS15+zsjKNHj2Lw4MEoLi5GSEgIFi1aZLSjIMCjSfygoCCcOnUKjRs3Rnx8PC+3GrY0/v7+kEqlSE1NFeUBC1GHDPVkDIu7/GDmzJnQarWYPXs2Bg0ahJycHF7bZYxhxYoV6N69OzIyMhAQEICzZ8/SGdwGYmtrCx8fHzDGBB8KV0a0IVNSUoLU1FRIpVL4+fkJXY7ZkEqlWLx4MbZu3QoHBwccOHAA7du3x9atW3lpLzU1FcHBwZg2bRrUajXGjRuHU6dOwcPDg5f2LJUhh0xFRUX49NNPDXbag2hDJjk5GTqdDl5eXrCzszNau1xb5n6zsOHDh+PChQvo1q0b8vLyMHLkSPTu3Vt/ykBdFRYWYs6cOWjfvj0SEhLg7OyMTZs2Yd26dbCxsTFIG2Jlb28PwLjvIUOGjIODA3r16oW2bdsiKiqq7mHDRGrVqlUMAAsLCzNqu0lJSSwmJsaobQpJq9WypUuXMgcHBwaAAWCDBg1i8fHxTKfTPfX87du3MwCsf//+le4vPT2dzZkzhzk6Our3FxYWxu7evcv3ryIa586dY6tWrTJqmwcPHmQAWKdOnQy2z88++4wBYAqFgk2aNIllZGTUaj+iDZmoqCgGgH366adCl2IR7t27x95++22mUCj04eDp6cnee+89duzYMfbgwQPG2NMho9Fo2KVLl9iyZctY3759mVQq1W//4osvshMnTgj4W1mOrKwsBoAplUqm0WgMsk+dTsf69eun/3sqFAoWFRVV47CRMFa9wwtxcXGIiYkx2rU9Fy5cQFFREfz8/NCgQQOjtEmAsrIy3LlzB9nZ2dBoNE88plAoIJVKUVZWBplMBrlcjvLy8ifeExKJBPXr14e7uztcXFyMXb5F++2336DRaPDiiy+iXr16BtmnWq3G+fPnUV5erv8/hUKB8ePHY86cOdWbW6tuGvXv31+faPRDP/Rj2T9SqZSNGzeOlZWVGa4nc//+fZw6dcoo51Xk5uZi/PjxUCqV2LZtGyQSCe9tkmcrLy9HTk4OEhMT8dNPP8HHxwfvvPMOGjRoACcnJ6HLI3i0DOu+ffswatQojB492iD7PH36NBYuXKj/t1QqxciRIzF37tzq38GzRoMrIzlw4AADHo3pibg8b+KXCGf16tUMMNzBkps3bzJnZ2d9z2X06NHs6tWrNd6P+O5WDuDy5csAoF9akBDyfNznhfv81AV3O5rCwkKMGjUKc+fORZs2bWq1L1GGzN9//w2AQoaQmuA+Lzdu3IBara7TeTpz5syBl5cXNmzYUOtw4VDIEGImHB0d4e7ujszMTKSkpNT6TPmioiJERkZWf87lOUR3xq9Op8PVq1cBUMgQUlPcZ4b7oq4NBwcHgwUMIMKQSUtLQ2lpKerXr48mTZoIXQ4hJoW7o4ch5mUMRXQhwyUw3f6EkJozRE/G0EQXMty6qDRUIqTmuM+NMdYXri7RhQw3H1PXGW1CLBH3uUlLS4NarRa4mkdEFzLXrl0DIL6QKSgowJIlS7BlyxaTvTdTWloapk+fjhEjRiA0NBQxMTFPXJNCDOPq1auYNWuWIPMi9vb2cHd3h1arFc39tihknqOwsBDLli2Dn58fZs6cabK3Sjl16hT69u0Ld3d3bNq0CV9//TV++OEHTJ06FaWlpUKXZxZSUlIwadIkBAYGYu3atSgqKhKkDu6zw40K+HDt2jV8/vnn8Pf3h5+fH9LT01FSUoJ3330Xzs7OiI2N1T9XVCFz584dqFQq2NnZoWnTpkKXA+DROQOjRo1CdHS00KXU2oMHD/D++++jUaNGGD9+PBQKBVq2bImpU6fixx9/xPbt24Uu0eRptVoAwIIFC9ClSxdBa+FChvvC5quN999/H6Ghobh+/TpOnz6Nbdu2oUWLFvj888/RtWtX/XNFFTLci9KqVSvRXBTp4eEBV1dXODs7i6ammjp58iTOnTuHnj17PnExY+fOnfXfOoWFhQJWaPqsrKzQunVrODo66lfGE0rbtm0B8NuTAR5dLNmjRw/I5XLExMRArVYjOjoaUVFRT5xnI8qQ4V4kUndarRa//vorNBoN2rRpAysrK/1jLi4uaNasGZKTk3Hz5k0BqySGZIyeDMfHxweurq7Iy8vDkCFDnnh/cUQZMmKZjzEHZWVlSE5Ohlwuf2rxLxsbG7i4uKCkpEQ0k4Sk7rgv6ZSUFN6XZuG+qDQaTZVtUciYubKyMhQWFkImkz21WppEIkG9evWg0WiMcnN4Yhxubm5wcHBASUkJ7/c/j4+PR3Z2Nu7cuYP09PRKn0MhY+a0Wi20Wi0kEkmlt/qVyWRgjD211CYxbcYYMqWmpuLChQv46KOPoNFocPHiReh0OuTk5OgnwgERhYxKpUJmZiasrKzg4+Nj8P1//fXXUCgUkEgkz/xxd07O4+cAAAVwSURBVHcX1XUfdWVtbQ07OzvodDpUVFQ89bharYZMJoOjo6MA1RG+8HUYu6SkBCdOnMDVq1exefNmvPnmm+jSpQvq16+PhIQE/Prrr0hMTHziIIlolnpISUkBALRo0QLW1tYG33/v3r3x1VdfPfdEOjs7O7O6MNPGxgbNmzfHmTNnnjqCVFFRgYKCAiiVSrrZmpnh5mUM3ZM5d+4cQkJC4ODggG3btqFVq1YoKytDly5dsHXrVtjZ2WH58uVP9JpFFzKGvMT8cYGBgQgMDORl32KmUCgQFBSELVu2IDMz84nHVCoVcnNz4ebmBi8vL4EqJHxo1aoVABh8Qv/ll19GcnIyHB0d9XejUCqViI2NxX/+8x94eno+tViWaIZL169fBwBehkqWrk+fPnB1dcWFCxeeuJ4lIyMD6enp6Nevn1n13sh/P0eGDhmpVIqWLVs+dbsbW1tbtGnTptLV+EQTMtyLIdaQKSoqAmPsiQktU9GmTRtEREQgPj5e/zprtVrs2rULTk5OmDhxImQy0XRqTZpGo0FJSYng7xVvb29IJBLcvn0bZWVlgtUBiGi4xL35uW6eWKSlpWHjxo1Yt24dAGDz5s2QSqUYNmwY2rVrJ3B11WNlZYUPP/wQVlZWmDhxIl5//XXcuHEDycnJWL9+PS2rYQA6nQ4JCQnYsmULkpKSUF5ejgULFiA0NBQjR440+m1jbGxs4O7ujjt37iA1NVXQ9Zmqfd8lvjk7O6OgoAA3b95EixYthC7HbBUUFOCvv/6Co6Njld3bZ/n5558xbNgw9O/fHwcOHOCpSmIIwcHBOHHiBHbt2oUhQ4YIVocohku5ubkoKCiAtbU1mjVrJnQ5Zs3JyQk9evSAv79/nVazJ+LH17xMTYkiZLgXwcvLq9ITxgghNUch8xixT/oSYoooZB7DHb4W26QvIaaMQuYx1JMhxPC46Ye7d+8KuvohhQwhZsra2hoeHh5gjAm6bKwoQoZ7AWi4RIhhiWHIJHjIZGdnQ6VSwdbWFm5ubkKXQ4hZ8fb2BmDhIZOamgoAaNmypcCVEGJ+PD09ATw6c10ogocM98tzLwYhxHC4q+u5L3MhiCZkaKkBQgyP+1xRTwbUkyGED9zn6vbt24ItsSp4yHDdOAoZQgzP3t4eDRs2hFarrXKhb74JHjLUkyGEX9xnS6h5GUFD5uHDh8jOzoZEIqGjS4TwROh5GUFDJi0tDYwxuLm5QalUClkKIWZL6CNMgocMQEMlQvgk9LkyFDKEmDnqyYDOkSGETxbdk6HD14Twj5vzVKlUyMnJMXr7gobMrVu3AFDIEMIniUSi/4zdvHnT6O2LImTo7gSE8Kt58+YA/vuZMybBQiY3NxclJSVQKpVo3LixUGUQYhG4L3KLChnul23WrBkkEolQZRBiESyyJ0NDJUKMh/ucCXH9EoUMIRbAoodLFDKE8M8iezLcoTS6MJIQ/rm6usLGxgalpaVGP1eGejKEWAjuPvPGHjIJFjJct41ChhDjEGpeRpCQycnJQWlpKZRKJVxdXYUogRCLI9S8jCAhwyVp8+bN6RwZQozEonoyNB9DiPEJdUIehQwhFsKiejI06UuI8XGni1jEnExGRgaA/x5SI4Twz9XVFQqFAiUlJbh//77R2qWQIcRCSCQSNG3aFMB/P4PGQCFDiAXhPnNmHTIqlQoFBQWwsrKCm5ubsZsnxKJZRMhwv1yTJk0gk8mM3TwhFs2iQsbDw8PYTRNi8biQuX37ttHaNHrIcL8czccQYnzcl7tF9GQoZAgxPhouEUJ4xYVMVlYWKioqjNImDZcIsSB2dnZwdnaGVqtFZmamUdqUMMaYUVoihFgkQW/uRggxf/8Hxexh1CWaLnEAAAAASUVORK5CYII=)
A. \(m < \frac{{f\left( 1 \right) + 9}}{{36}}\)
B. \(m \le \frac{{f\left( 0 \right)}}{{36}} + \frac{1}{{\sqrt 3 + 2}}\)
C. \(m \le \frac{{f\left( 1 \right) + 9}}{{36}}\)
D. \(m < \frac{{f\left( 0 \right)}}{{36}} + \frac{1}{{\sqrt 3 + 2}}\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Trường THPT Chuyên Quang Trung - Bình Phước lần 3