Một khối cầu có bán kính 5dm, người ta cắ...
Câu hỏi: Một khối cầu có bán kính 5dm, người ta cắt bỏ 2 phần bằng 2 mặt phẳng vuông góc bán kính và cách tâm 3dm để làm một chiếc lu đựng. Tính thể tích mà chiếc lu chứa được.![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAN0AAADQCAYAAACDWmTEAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAgAElEQVR4nO2dX2wjd7XHv6Gt6q6K1l0hOttKxIu6N5NSmolQlclWJZMn213UdRC0zpPjhzYJD8QWuiQRBScSkrcq4IQHsluo7AiJBG5RnId77fDiMdBmUqp6IpXaaVfyLCB5you9Kq1nC+h3H7I2cbLZOsmMZ8b+faRqG3syc+zMd875/TnndBFCCCgUSsv4jNkGUCidBhUdhdJiqOgolBZDRUehtBgqOgqlxVDRUSgthoqOQmkxVHQWR5IkfPOb38QPf/hDVCoVs82h6EAXXRy3LrIs46tf/So+/PBDOBwOuFwu5PN5s82inJC7zTag05FlGZVKBaqqolAoAACy2SxisRheeeUVfPjhhwAATdNw7do19PX14cyZM+A4DqdPn4bP5wPHcWZ+BMoRoaJrAaIoolAoYGdnB263Gx6Pp/5eOp3GxsYGnE4n+vr6AACRSAQulwuPP/44Tp06hY8//hgAcO+99yISieDMmTN1sTqdzoZrDQ8PQxRFcBwHp9MJjuPQ09MDv99/4FiKOdDw0iAWFhawvLwMWZbB8zw4jkNfXx98Ph8YhmnqHJqm4cknn8T29jbuuece/PjHP8a3vvWtpn635jkLhQK2trYwPT0NlmXr76fTaTAMQ72kCVDRnRBRFLG+vo6enh5MTEzUX1cUBaqqguf5E19jYGAA3//+9/G1r33txOeqMTs7C1EUIUkSfD5f3QO7XC7drkG5PXT28oioqopEIoHR0VE88MADmJycBAAIgtBwnMvl0kVwAHDq1Cncf//9upyrRjQaxebmJqrVKgKBALa3t+H1eqFpmq7XoRyEjumOSKVSwfr6OtxuN6LRqO09g8PhgM/ng8/nO/CeoiiYnZ2F2+2G3++Hw+EwwcL2g3q6O7C6uorR0dGGpz/LslhbW8PExETLBFebFGk1DocDbrcbGxsbOHv2LCYnJ+szrJTjQ8d0+1AUBVevXkUikQDHcQgEAvD7/WabZTq1sPrq1auYmppCKBQy2yTbQkW3h7m5OSwuLsLv92N6etr2oaNRaJrWEGqqqtr0jCyFiq4BRVHAMAwduxyRc+fOgWEYRCKRhjVIyu3p2DFdIpHAyMhIw2sul8uSgqsthFuVYrGI8fFxTE5O1hfnKXeAdBhra2uEZVkiCALJ5XJmm9MUgiCQTCZjthmfSrVaJbFYjDAMQ6LRqNnmWJaOWTIQRRGzs7MAgKWlpQPrapST43A4EAqFMDY2Rtf77kDHhJeqqmJ6ehqbm5tUcAbjdDoPTKxcuXLF0iFyK+kY0fn9/tsuAFOMR9M0bG1tobe3F+l02mxzTKctRSdJEvr7+6EoitmmULAbdsbjcaytrSEcDiMYDHa012sr0WmahtnZWYyMjLTVOptZO1L0hud55HI5MAyD3t7ejt3d0jbrdJIkIRgMgud5xGKxtrhJ2xlZljs2ragtRKdpGnp7e7G0tEQXZ23K/l0u7UxbiI5if0ZHR+F0OhGLxdpefLYd03XSQNzqO1L0IB6PQ1EUeL3etv+sthTdlStX0N/f3zELsOFwGLIsm22GoTgcDqRSKbAsi+Hh4baeebad6CYnJ7G4uIhMJtP2YUgnsrS0hPHxcQwODkJVVbPNMQTbbAOrVCoYGRmB0+nE5uYmnZ1sYyYmJsDzfNumC9lmIqW/vx+CICAWi5ltypHYn2umKAoURTkwThMEoWF7miiKEEURN2/exC9+8QtcvHgRLpfr0ONq1Nb0XC5X26xTthu2CS9TqZTpgqtUKvWbfP/CbiKRwPDwMHp7e9HV1VX/L5lMNhwniiLm5+exs7PT1DVPnz59pCf+8vIy5ufnD6TXzM7ONtg1PDyM4eFhJBKJhuMURYEoipYaQ2qahoWFBbPN0A/zEhysR7FYJMViseG1lZUV4nA4CADicDiIIAhEEAQSj8cP/G4mkyH5fF53u0KhkK5pSNVqlWQyGZLJZA583qWlJSIIAuE4jgAgAIjL5SIrKysNx+XzeVIul3Wz6U6Uy2UiCALx+XykWq225JpGYtnw0uhiqJIkIZ1OY3t7u16U1el0Ynp6GjMzM/XjVFWFw+Ho6DFk7bvZ63EvX76M+fl5ALvbu1wuF7q7uzExMWHIWEzTNExOTkKWZaRSKVuP9ywpunQ6jWAwiFQqdSLRaZoGSZIgiiKcTmdDMZ1CoYDV1VUIglAvP045OpVKBbIsQ1EU7Ozs4NKlSw31PldXV1GpVMBxnC51QGdnZ7G6uopMJmPfMau5jvYgqVSKMAxz7HCqWCySsbExwrIsAUAEQSChUIisra3pbCmlGZaWlojf72/4e8zMzJBSqXTsc8bjcTIzM6Ojla3FUqI7quBKpdIBMZXLZRKLxcjm5qYRJppCLpdr2fjJSMrlMkmlUiQSiRwYm9mhHIVeWEZ0pVKpKcFtbm6SUChEWJYlDMOQsbGxthhc3wm71Eg5LtVqlXg8HuJwOIjP5yNLS0sn8oRWxzJLBgzDIJ/P33FsNTg4iGAwiNOnT2NlZQWlUgnxeJzuTLE5tS1g5XIZgUCgnmW+v1rb7dA0DXNzc7baEmjJiRRgd4CuaVrDLNXt+rF1AsPDw4hEIh1X26VQKDS09zrs7x8MBqGqKtbW1mzxADbV02madmBja6FQQDAYxNmzZw8sLHei4DqZvYIDgJdeegnnzp3DwsJCg2erRTvhcLjVJh4LU0UXDofrZfFUVcXk5CQGBwfR3d2NYrHY0O+NQolGo4jH48hmszh37hyuXLlSfy8ejyOdTje8ZlnMGkzGYjHicrlIuVwm1WqVuFwuEolE2mKWTm/03pHSDuRyOeLxeAjHcfXX8vk8cTqdlp+5NmVMJ4oiRkdHkclk6iFEJ6XrU/Rj/7hPkiRwHGfpe6nlolMUBf39/YjFYhgbG2vlpSkUS9BS0Wmahqeeegpf/OIX8fvf/x7FYtHSTySKvVBVFV6vF6lUCpIkoVKpWPLB3tKJlMuXL+MrX/kKfve73yGVSlHBNUkn1EjRA4Zh4PF4MDIyAo/Hg8XFRUvW1myZ6GRZxsbGBj772c9iYmKCbjBuEk3T8Pzzz1sqv83KRKNRqKoKRVEQj8cRDAYtt3DeEtFpmoZgMIh4PI7XXnsNzz33XCsua3t++ctf4vOf/zxkWUYgEKDerkn8fj9WV1fBcRzcbjcuX75stkmNtGKKdGZmhkSjUbKxsUEef/zxVlzS9lSrVXLmzJl6Iuldd91Fnn/+ebPNsgX5fJ584QtfIITsfo+CIFhqGcFwT1fLZ5uZmcG1a9doWNkkiqLgX//6V/3nf//73/jDH/5gokX2weVy4Z///Gd9GWppaQmTk5PWCTONVHS1WiUsy9ZLApTLZcIwTNtnBejF8PAwue+++wgAcurUKZJKpcw2yRasrKwQv9/f8Fo0GrVMDp6hoguFQiQWizW85vP5aEJpk5TLZbK0tERcLhf5+c9/brY5tuGwe4zjOEvs7DFMdMVikbAse8Crra2tEZ/PZ9RlKR1OqVQiLpfrttFUJpMhgiCYYFUjho3pwuEwotHogbU4n88Hl8vVXiXVKJZA0zSMjo5iZWXltmvAtXo4+7NXWo4RSt7c3CQ8z9/xmLGxMRIKhej4jqIL+Xye8Dz/qePefD5POI4z9b4zRHTNxs6xWIxwHGep6Vwr0i41UowiGo0eabx2u7mGVqK76OLxOBkbG2v6+NoTamZmht5Yh9DuNVKOy9575yieq1wuE5ZlTavDoqvoanlxx/kw0WiUsCxLYrEYDTn3QUXXSD6fr5dZPG6UFIvFSCgU0tmy5tB1IuXKlSvw+XzHqr47MzODTCaD69ev49y5cwiHw5bcrEoxj9XVVXi9XoyMjGBoaAj5fP7YBWwnJiaQTCbNacell3pP4uX2U6tdybIs4XmerKysdLT362RPVywWSSQSIQzDEL/fr+sGAbO8nW6iO+pYrlk2NzeJ3+8nTqeT+P1+srKy0nFjv04TXT6fr0+y1cp4GDH+qlarhGGYlt9PuonO6NX+arVa397jdDqJx+MhsVjMkC45VqMTaqSkUql6EWGWZVv2mc2YydQlczyZTGJ5eRlra2t6RLxNkU6nsbGxgXQ6DU3TwPM83G43OI6jm6otTq2xiyRJ2NjYgCRJEAQBbrcbHo/nQOk9I1FVFYODg8jn8y1LqtZFdP39/YjH46bd7Iqi1P+AsiyjUCjA4/Ggr68PPM+D4zhbt1ayO7IsQ5Zl7OzsIJ1Oo1AogOf5+oOS53lTqwiEw2F0d3c3dHUykhOLTpZlBINB5HI5vWw6MZqmIZ1OQ5ZlbG1t1bOuWZbF0NAQXC4XeJ5v6RO1E6h5sJrACoUCJEkCy7LgOA49PT3weDyWi0RUVUV/fz9KpVJLrndi0QWDQQwNDVmyAMxeVFVFoVCAKIq4fv06JEmql29jGAY8z+P06dP1BvNWEqQsy3C5XJaocF0TVu373NnZgaqqkCQJAOqRRU9PD1iWNd2LNYvX68XU1BQ8Ho/h1zqR6DRNw9mzZ1EqlWzxxd6OQqFQv2lu3LjRcEM5HI66CHt6euo/A7uJkq1qStjKXgaSJEHTtHqzRwDIZrN1se3/TvY+tOx6DwC7a4Dr6+tYWVkx/FonEl0ikUA2m0U8HtfTJsuw/6l+8+bN+hNdUZSGPgw1QdRuxr0cJtBmb9RmRVd7gOynJqS9ZLNZAP+JAPbb5HQ60dfXB2D3s+194LQjmqbh3LlzyOfzhkcUJxJdp3aTuR2iKAI4eBMDwPXr1w80SgFuL4aTUPM6++F5Hvfee2/Da3sfElYKpc1kcnISfX19xvfQOO5aQ7FYJC6X62QLFpSm6LTFcbNoJiVND4699zKRSCAQCOipfwrFVHieR6VSMXzP77FFt7y8bPkZy3aB4zhLzFx2AoFAAMvLy4Ze41hjOiuuzVEoelAoFDAyMoJ8Pm/YNY7l6ZLJJC5duqS3LRSK6bAse9sOwXpyLNFls1k6Y0lpWzweD9LptGHnP7LoagPNdl6z0YvUeBe6urownjrwxu1fPwTatae1uN1ubGxsGHb+I4tOFEXb7z5oCdcW8Z6P4P2FC3gluU9dXh9ewAvweZs7VTgcpl17WojH44EoioaVYT+y6NbX1+l4riku4uItUV149Pzu/1xbxJNdXRhffA/vXHgUWHxy1+MtLuLJrnGkrt361zyjKQAcDgc4jqvvPtKbY3k6Op77dFIvn8f5ri4EsIzXpx4BkML4+RAe+z8C37sh4NmL8E69iBdwAe+8+xsAr+DpwG/MNptyCyNDzCOJrjaj06qNvnbGe5WAvL8AhF5GCsC1xR/ilRf+D1e91/DeOxfw7MVHgFQSr1x4DC8++hjeuLCA9198DG9ceBTnzTaeYuhkypFEJ0kSnUA5Co/8Fx679b/vv/sGXvB5cW0xgBCexcVHgGvvvYMLz/43zuMdXHj2IvDe7r+PmGo0BdhdOlAUxZBx3ZFEt7W1hYGBAd2NaDfGu3ZnLbu6kvCRq/ACOP/oBbzydBcCvwHwRgjnnxzHy78Bnr0I/G/93zfwxi3PuBe6I6X1OBwOuFwuQ7aEHWlHCs0qoHQSRmUdHMnTybJsuVR7CsUo+vr6sL29rft5mxZdoVAAwzA0zKF0DDzPG7Js0LToqJczD7ojxRyMmkxpWnR0EsU86I4UczBqMuVI4SVN66d0GizLmic6VVVpwVZKx+FyuXRP82ladIqi0J0olI6ju7sb169f1/WcTYmuNoinM5eUTsM0T0dDS3Oxx46Ua1h88tZOnCcXca328hFzB62GEaK7u5mDaGhpLrFYzGwTPp3U/wLLBGT/xlGvDy8ATecOWg3TPB0VHeXOpDD+dAih83s8WpvkDtaqXevZJrnp8PLBBx/U7aKUdsOLq2Q3lemdp5/E4rX2yh3U29s1JbqbN2/S8gwmYpsdKY9cxLMXgHdfbq/cQYfDoeuuFDqRYgPssyPlfbyLZ/EoaO7gnTh2hWcKpUat6llXVxK+16dw8QS5g51AU7OXFMqd8F4lIFf3vDD1OsjUIQe//vqtfwkOO8RqPPTQQ3j//fd1yyOls5cWR1EU/OUvf0E6nTasJBzlcL797W/jtddeQzgcxs9+9jNdzkk9nYUpFAp44okn8NFHH+GnP/0pMpkMtra2zDarbdnbfRYA3n33Xbz66qv45JNP8Mknn2B6ehpPP/30iR0QFZ2F+clPfgJN00AIQbVaxdtvv40nnngC999/P4DdnSp7F85lWUY4HD5wHqscJ4oihoeHDxwnCAIymYzpxymKgvn5+frPxWIR1Wq14XdEUTxxt6qmaqTQ2ijm8KMf/Qhzc3P46KOPAAD33nsvfvWrX+HMmTMAdvfC7k0s3v+krmGV4+yGoij40pe+hI8//hjA7ucpFosn35LXTOdI2gnUHEqlEnn44YfJ3XffTe677z4yNTVltkkdRyqVImfOnCEsy5JcLqfLOWl4aWEYhsHf/vY3fPnLX8b3vvc9+P1+s03qODweD5555hkMDQ3p5rWbmr00YtMnpXk+97nP0c0JJlKpVHTN8qCL4xTKp0BF14EEAgG6TtpGNDWm6+7upuGliZx0ippiLaino1A+Bb03/Dc9kaJ3cRYKxS7ovQ2Szl7agEQiQb9/k1BVFU6nU9d80qZExzCMrunqlKOxvLxMRWcSRuSSUk9HodwBIzJsmhKdEcVZKBQ7YJroABpiUjqT69evo7u7W9dzNi06GmJSOhHTxnSAMd1LKM1Bd6SYhxF9GZvuOZ5MJrG8vIy1tTVdDaBQrIqmaXjggQcOJLKelKY9HcdxNikDR6Hog1Hdh480pqtUKvYoemoRaqXpGppn2LyhRichSRJ4ntf9vEfae2lU4/O25Noi3vMRvL9wAa8k9yjM68MLeOFIDTUWFhbow84Etre30dfXp/t5jyQ6GmIehYu4eEtYFx49f6KGGouLi1R0JmB6eAkAAwMDtARck6RePo/zXV0IYBmvT73fVg01OgFN06AoCliW1f3c1NMZhPfqbhcbhF7G4mJ7NdToBCRJAsdxhjTOOZLoXC4XnE4nFV6zPPJfeAzAu+/Shhp2QxRFDA0NGXLuIyexCoIAURQNMKV9GO/a01CDXMV/04YatmN9fR0+n8+Qcze9OF5DFEXMz883VMalGMvCwgLGxsZs0He8PahUKjh37hzK5bIh5z+y6DRNw9mzZ1EqlWijSEpbkkgkkM1mEY/HDTn/kcNLh8MBnudpiElpW7LZrGHjOeCYhYncbjc2Njb0toVCsQTJZNKw8RxwTNH5fD4kk0m9baEcwtzcnNkmdAySJIFlWUPHz8cSHV06aC172zdRjGV5eRmBQMDQaxy77mUgEMDy8rKetlAopqJpGtLptKGhJXAC0fn9fiSTSdqSl9I2pNNpcBxneLOWY4uOYRhwHId0Oq2nPRSKafz617/Gc889Z/h1TlRWnYaYlHahUqlAFEXDQ0vghD3HPR4PwuGwIcVbOolacvDeOiiKotQLQQUCgfq6qMvlajhO7zZOncrq6ip8Pl9LNnwceUfKfsLhMLq7uxEKhfSyyZYoioJkMlnPe9vZ2YGqqggEAg1dd+bm5g7MRjocDiwtLTUcl0gkbhtF7D/fwsICwuHwgeMikUjDUkPtfBzH4fTp0wB2hwgej4cWPQIwODiIWCxmSKb4fk4sOlmWEQwGkcvl9LLJUoiiCFEUcfPmzXrWvCRJmJ6ePnBTb29v129olmXBMMwBz2QWNc8pSVJ98uuDDz7AwMDAgYfC+vo6nE4nGIZBT08PgN2ophU3pBm0+h4+segAYGRkBIFAoCXxsJ7UbkRZlrGzs4NCoYBLly41eG1JkuqTRYIgANjNK2znkE6WZVQqFaiqWi+7KAhC/fMDwOXLl7GxsYGhoaH6A4bneVvux231/auL6Kzu7W6XBby6uopwOAyWZTE0NASn01mfLjYiW/i4VCoVJBIJy4XvhUKh7jk/+OADFAoFiKKIlZUV+P3++nFWH3Oacu8SnRAEgWQyGb1OdyI2NzdJJBIhPp+PMAxDHA4HCYVCZpt1LIrFInG5XGabcWzGxsYIAMJxHJmYmCBLS0ukWCyabVadmk2tRBdPB1inGG2hUEAwGATP8+jr6wPP85byXEdFURQMDw+jWCyabcqJEEURkiRhe3sbkiQhk8mYPtZVVRWDg4PI5/MtDYt1Ex0A9Pf3Ix6PG1JBaS+1mcKNjQ2IoohyuWzLsUQztIvo7oSmaejt7YUgCHC73S2bujdr5l3XnuORSMTQzblzc3Po7+/H4OAgtre3MT4+TpNp2wCHw4G1tTUMDAzg6tWreOCBBzAyMoLV1VXDrqmqKpLJJCYmJgy7xmHo6ukAY71dIpEAx3GGe1Ir0Qmebj+VSgXpdBqVSsUwUZi6vqz3IDGVShGPx3Oic+RyOTI2NkZisZhOVtmXcrlMv4dbxONxEo1GSblcPtF5isUiYVmWVKtVnSw7GrqGl8DuIqrD4ThWkqsoihgeHsbIyAj6+voaFm07FafTabnlArNgWRY7Ozvo7e3F3Nzcsateh8NhRKNR84YlRig5l8sRnuebfpJUq9X69H48HjfCJEobUSqVSCgUIgzDkGg0eqTf3dzcJDzPG2RZcxgiOkIICYVCRwqL1tbWTHP3FHtSLBbJzMzMkX6H4ziSy+UMsqg5dJ9IqaGqKrxeL1KpFM1AOAFW3ZFiR6yylqz7mK4GwzAIBAJ46aWXDrxXqVQQDAZp1nkTVCoVLC4umm2GLdA07dBlBk3TEA6HsbS01GKrDmKY6AAgFApBkqSGnnaapsHr9aK7u5uur1F0RdM0vPTSS1hYWDjwXjgcxvT0tDWiLqPj1/3Ts/F4/MRLCp2E3fdetppSqUScTmfD/EAmkyGCIJhoVSOGejpgN9N5amqqnmjZihJn7YKqqvjOd76Dv/71r0gkEmabYwtqibm1MLNSqSAcDhtWIv1YtErdgiCQ3/72tweeQpTDefTRRwkAAoA4HA66nNIkKysr9WhqbGzMct9by0RXKpUIwzDkmWeeadUlbU2xWCT3339/XXS4lR5D+XSq1Sp55JFHyPr6uiWHMoaHlzUYhsHk5CT++Mc/tuqStsblcjVMNN111124ePGiiRbZh0KhgHvuuQff/e53rRVW3qJlogOAH/zgB7jnnnvw5ptvtvKytuV//ud/8NBDD+HUqVN45pln8OKLL5ptki149dVXcePGDXz961+3xmzlPgxbHD+My5cv48aNG4hGo628rK2hJQ6Pxn333QdBEJBKWbOvbctFV6lU4PV6EY/H6xWnKBS98Hg8eOutt3Dt2jXL1mZpueiA3RyxkZER/P3vf8ef//xny345FHsxMTGBeDyOnZ0d00tB3ImWjulquFwurK2t4TOf+QwGBwfNMIHSRqiqimAwiDfffBMbGxuWFhxgkuiAXeG99dZb+Mc//oGHHnqoXl+RQjkKiUQCw8PDGBoawttvv91Qm9OqmCY6AHjwwQfxpz/9CQDw1FNP1fsiUCifhiiKGBwcRDabxebmpq0Snk0VHbC7fvfGG2/gG9/4Bh5++GEMDg4iGAxSz0e5LYlEAoODg5ifn0csFkNfX5/9Ns6buTJ/O6rVKonH44RlWSIIAllZWTHbJIrJlEolEolECMMwZGxsjGxubhJCdrd4cRx34poprcZyottLJpMhfr+fOJ1OMjExQVKplNkmUVpEqVQi8XicCIJAGIYhkUiElEql+vt2FRwhBmaOn4TLly+D4zh4PB4Au2t7q6urWF9fhyRJ8Pl8cLvd8Hg8dLmhjSgUCkin01hfX0ehUIDH40EgEDgwORIMBiHLMjKZjD3//mar/nZkMhnidDpvuzu8XC6TeDxe94A8z5NoNGqZPgqU5imVSmRlZYVMTEwQl8tFWJYloVDojn/LWCxmWw9Xw5KeDth96nm9Xvj9/jtuGZMkqe4BRVEEz/Nwu93geb4lTdspzSPLMmRZxtbWFtLpNDRNgyAIGBoaaro5paZp0DTNnh7uFpYVHfCfLWMsy2JpaampWapaP7mtrS3IsgyHwwGO4+rNRKgQW0NNYDs7O/WSHSzLguM4DAwMdHQHWEuLDth9ss3OziISiRzr6VZr+lh7wsqyDE3TwHEcXC4Xuru7IQiC5frS2QVRFOvNI7PZLDRNgyRJ9fL3PT094Hn+2A0jNU1DIpEwpeeAUVhedEZQqVQgy3K9E2s2m63fOLWuorXWv7WfAdhit4Oe7O3EWuvOms1mG36uPbB6enogCAIcDodubZJre3RZlkU8Hrffetwh2FJ0Rqa6FAoFqKpav+F2dnbqu2REUQSAhqf20NAQABy42faK1UrUxAL85+EDoN5NFfjPd7DX+3Mch9OnT7esBbQkSfB6vYhEIm1X89N2olNVFf39/VhaWjKtx7kkSfWanTUh3rx5s6HUYO3G3cthIazD4cDAwMCxbLlx40ZdOHuphXn72SsWp9OJvr6+A7aZ/cC4cuUK5ufnsbKy0pbRhe1EB+w+rUdGRjA+Po6ZmRmzzWmaveHaXg4TSDPUeqXvR88wr5XUisJOT0+37USLLUUH/Kdse7vF+5T2x/QNz8eFYRhsbm5C0zSMjo6abQ7lBBzXy9sV23q6vdAaIvakVghWkiRkMpmO+Rva1tPtZf8fi+bkWZ90Oo3e3l4wDINcLtcxggOAu802QG9qs5tTU1O2mmTpFCqVCkZHR6EoCtbW1mw52XNS2sLT7aX25MxmsxgcHKTJsBbD4XDA7XYjl8t1pOCANhnTHUYikcDs7CzGxsYwPT1t602ylPah7TzdXsbGxpDL5QCALimYQG0bVzAYNNsUS9HWnu4wKpUKHA4HFaJBqKqK+fl5rK6uYnp6GqFQiH7Xe2hrT3cY6XQa586dw8LCAm3BrDOzs7Po7e2F0+lEsVjEzMwMFdw+OlJ0fr8fqVQK2Wy2Lj6KPvT19SGfzyMajdIx9CF0ZI8nTdMAAAGrSURBVHi5F0mSMD8/j0KhgHw+T5/KR0CSJCiKAr/fb7YptqIjPd1eeJ5HKpVCLpdrEBwNO29PpVLBlStX0Nvbi9HR0XqaEKV5Ol50NfaHQslkEmfPnsXs7CwURTHHKAuhaRqCwSDOnj2LbDaLWCyGYrHYVhndraLjw8s7USgUsLi4iNXVVfA8j0uXLsHn83XUlqW9rK6u1jPFKceHiq4JNE1DMpnExsYGxsfH23YnhaZp9bqT6XTa1EThdoaK7oT09vaCZVm43W7besF0Oo2rV68inU7D4/HY+rPYASq6E6KqKkRRxMbGBtLpNIDdcgeZTMZkyw4iSRJkWQbDMA0erFakyePx0NnbFkBFpzOqqkJRlIYQtFKpYGRkpF7zseZBjC7uoygKFhcXIcsyRFGsl8UbGhqyVWupdoOKrgXUqm5JkoSdnZ36bKiqqsjn8/XjFEXB5OTkgSJFLperQSSKoiCRSDRU8BJFEYIgNHhYRVGQTCbBcVxbFvixK1R0FqJSqUAUxQPVvQ4TXa0U4GHFiSjWhIqOQmkxdHGcQmkxVHQUSouhoqNQWsz/A64xNbalDNaKAAAAAElFTkSuQmCC)
A. \(\frac{{100}}{3}\pi \left( {d{m^3}} \right)\)
B. \(132\pi \left( {d{m^3}} \right)\)
C. \(41\pi \left( {d{m^3}} \right)\)
D. \(43\pi \left( {d{m^3}} \right)\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi HK2 môn Toán 12 Trường THPT Đoàn Thượng - Hải Dương năm học 2017 - 2018