1) Abra o Geogebra 3D.[br][br]
2) Na janela de visualização 2D utilize a ferramenta 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[/img] e construa dois controles deslizantes:[br][br][list][*]V[sub]b[/sub], no Geogebra digite V_b, para a quantidade de vértices da base, com as seguintes características:[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAlgAAABiCAYAAACMGK0+AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAB6sSURBVHhe7Z2FexRX98d/f8HbvoUWaQvFXYI7QUuQBHlxl+KlRYsUp0jRFilOcQ0UL27F3R1CCA4JBNfzm+/ZGTLZbFJaJsmSfD/PMw9kZmd2dnfuvd9z7jnn/p8QQgghhBBHocAihBBCCHEYCixCCCGEEIehwCKEEEIIcRgKLEIIIYQQh6HAIoQQQghxGAosQgghhBCHocAihBBCCHEYCixCCCGEEIehwCKEEEIIcRgKLEIIIYQQh6HAIoQQQghxGAosQgghhBCHocAihBBCCHEYCixCCCGEEIfxOoH14sUL2blzl6xZs0bu3Llj7iWEEJJYePr0qezZs1eWLftDLl68KG/evDGPEG/i2rVrEh4ebv5F3PE6gRUWFiYBAdUkdeo0snXrVnMvIYSQxMLNmzelWbPmkjLlFzJ9+gx5+fKleYR4A8+fP5ft23fIkCFD5eTJk+Ze4o7XCazHjx/LL7/8Kp07d5EzZ86YewkhhCQWbt26Je3bfyuZMmWROXPmUmB5GZhdat26jTpDjhw5Yu4l7jAGixBCiFdhCazMmbNSYHkhT58+kY4dO0mtWnXkwoUL5l7iznsJLDz0ly5dlhMnTsizZ890H+ZkDx8+LPv3H5DLl4Pk+fMXuh/ArXj58mU9dvToUXUDu/Pq1SvjmpfU7fjw4UNzr8jdu3eNfafexmU9fPhIzpw5K/v27ZPjx49rgyTEW8FzffXqVTl27Jg8evRI9+GZRTvYt2+/dlKIO7FA2woOvioHDhyUQ4cOa7t6/fq1eTQqaH/BwcGGNXlUY1dwHtpmeHhEGwK4xpUrV7QN4vjLl6/MIxGEhd1Xq/TUqVPqUSYkrolJYN25c1efz9u3b+vfGCessQDt611id3EuxhjXOcc9ti/EFuEY2i3GLvx78OBBHYdCQ0MjxYXhvzdu3ND337t3nzEmnnx7f+6grZ47d14uXryk74ktKMjVJg8dOhTlXtBf4PPhOK57794984hncH1cD/0GzsG5Dx48MI9GBu0b34MlkvA9BwUF6edEH4I+BXHRdjAWb9q0WerUqSfly1eQefPmab+D78QdXB8xdLjWgQMH5Pz5C5HG9YTOewksPOht27aXwoWLydat22Tjxk3SpEkzyZYth6RI8YVUrFhZ5s9fqA8IvvypU6dJ9er/k6++Sifp02eS5s2/0YB2+w+IB6FZsxZSsGBh2b17t+7Dg7xgwUIpU6acjBs3Xh/6wYOH6t9ffJFasmfPqe5KxGzZBylCvAUInT59+knu3Hll1arV8tdfO6Vduw7G33m0rfj6lpYpU6ZpO0EHNH/+AqlXr4GkS5dRUqVKK3Xr1pf16zcYz7fLkLFAR3z+/HkZM2as1KhRU3LmzK3XQ7soW7a8DBv2s061Wx02Ot/Jk6dKlizZxd+/qnaMdjCQjB49RjJmzKJtCmKMkLgmJoE1b958nTocPfoXYyw4IUOHDpNSpcroM4/9bdq0k+3bt3scC2CYr137pzFutZO8efPrOTlz+mhbW7p0mdy/f998pWgbzZu3gHz3XUc9hrEN7bFEiVKyePESNZrA/fvhsnz5KmncuKmORV9++ZXky1dAWrZsLRs2bHxrUFlAWKE9Y/yDwFu0aLHUrFlb0qRJb7T1r4xj9XQsdYm6YBk5crQx1pWX1KnTGtfPJd2791Djxy7CLEJCQmTSpMnatjNmzGxcM50UK1ZCevfuK4cPH4kiliBUfX3LqFg6deq0iiWM0TgX303VqtVl7tx5hqhyiTq8J+4X/cdnn6XQ16RM+aV+3pUrV+trAH4vXG/48BFSoUJF/d6++iqt8TuVlUGDBusx+2+aUHlvgdWhw/f6o7dt+60KqoCA6vLttx2MB7ah8SNkkxw5csuECb9pR1+yZClp0KCh0XC+M15bSb/wgIAahlo+ZF4xeoGFHxWNqGnT5sY1GknRoiX0Ae3Q4TudB86QIbMUKlREVq9e8/bBJ8RbgMAaMGCgMWBk0wEAHWClSv6GyGqvHXeuXD7GM5xJRowYKb/+Ok7F0f/+V0ufb3Ry6HzRyW7ZslWtZYB2gQ4SnWOqVGn0HBg8HTt2lkaNmqqYw3mNGzeJ5MaHpf39950kbdr00q9ff00ssVi3br1hMBWV0qXL6QDD7C0SH/ydwIIRX7duA6lfv6E+q40bN1MhVLFiFR3wISqQif7mTYQIgeEyceIkNWqw1a5dV8cvCKM8efLpe40aNdoYg1wiC8Y/xpRixXx1jIHwad26rdFmv9V2AuBNgrGfLVtOyZ+/oDRs2FjbX4MGjXXsg4gbP35CJK8NPMe4b3//avLNN62McbG00dZr671Uq+ZyQJQv7yfTps2QH3/so+0ar2vTpq0aYunSZTDEWyv1qNmBpwqvg3FUvHhJadGilXHNjkb/UUMFUblyXxvfydpI4yP6j6+/9tPxFH0HBBDuBd9l/foNVLDiehBKT5480f5gx46/tP/In7+Qfo+NGjWRH37ooZ47o1dSEQaBCGEFUejnV9HQBN/p9bEPfRLec/PmzQl+rH5vgdWtW3f56KNPDAVbUC1jWAD40uAaxN/wVOHBxSCArAOochyHGxSDR9asOfR1lrKGwGrRoqUUKVJM9uzZo/vwoyJdF4MQHj48iLDK0ehevXqt99G//0AVWTjG6ULibUBgDR36syRNmkw74+HDRxrP6W1tC2gTMCDQIaPzDAioqoYCOjQcRyfep09fFWew1p88cVnmoaFh0qNHT7U2kc1z9+4dfT06OPwLl3yNGrW0XWBQsg9S6AzRyaGThEcNYGoA7RQWPTzGFFckvohJYOHZxMD+6afJdeCGsMBxPPc4D55iGBwYC0JDXZ4XPMsQFxBMmPmAQII3F+fgXIgGtAfMxkAc4PWYaodQ+c9//is9e/ZSw8Rqr/gX5yHDEV4reI/Rpqz7ePbsuWzbtkONpAIFCul7W+0JoTMQYhCCEIfLl6/Q8dLV1kON+++vogbtFl5uhMDgujiO2Ztq1Wqo8bR69Vq9HsAY2L17T+0jMCbjPfB6jI/oezCThLYO7xSuZ4EQBRhw+Ix+fpXU44axGOei/4GnDiKxdOmyGvoD8DnwPUNo4nrYj/exPh+MOcRmoS+D+MRY77qXVxoWBLEGgVyrVm05fTphJ7K9t8Dq3LmrJE/+uXTp0i3KHOzx4yf0R0ufPqO6GfEF25k/f756ueDytOaIYxJYEGNFixaX3btd++3A/VmhQiV1tZ47d87cS4h3gE5u8OAh2qnC8wpXvh2IG1jkmF4YO3acdv52MK2BQaVFi2/exnYgVhGWIwwVuNzdQbuZMGGidtbwINunTNAWp0//XcUeLHiIMYi3rFmzq5ize7UIiWtiFlgLDGMklw76nsYCCJ0SJXylSpUAjfkBGKs6deqinpzZs2e/FQMWaA8wQuABwlQX/sZ1MA5h+gveFnfOnj2nwgpjEqYkPQFhVaRIcR0frdgpxEdhJgclKEaOHKVCxg7aOqYmIfY2b95i7nWBfuGnnwar+Jo0aYq5V/T+ChUqqjM8iJtyBwJo5MgxhtgrLL/9NumtQwMCq1KlKnq9adOm6z47t2/f0d8Bs1SWIQYw1kPcQkAiBtsC3+usWbNV6GGK9Pr16+aRCGBYwsuH32Lq1OkqSBMq7y2w4CpEBw4l7w7iN6DU4RY8cCBiGtACPxhiRmBpIHAORCewliwJVBcsplc8BQ9CNcPlix/89Omogw0h8QkE1sCBP6mxMXLkyCixEPA+oSPDNDosaHf++usvtb7htremBjAIIL7DXYwBtBkcw5SI5flyj0nBIIZBB+0KgxHaItoQAmkJiU9iEliIT4Rh0KpVW7lxI2qiFILQYdhjgwgCMPYRvoKgbHi8PIH3QJuBhwq4pgiLatvwVOsJMZHFipXUkBYYTGhfEEvWhr9xXq1adXWazroGBBamCDHGWVONdjDuYYoTYxkMLzuvXr1UAwwxTb/+Olb3IZFs7Njx2s5HjBilY6j7vaCPwHjr45NPp+qsRAAILHjuihf39ShWHzwIV+8dBNYffyw392LsR3/VQQUmrmEBwwxOF3jtFi5cZO6NyooVq/QzQj/8XdD+h4wjMViYuluxYqW5NwI8HJifrVzZXw4edLkX7axcuUrPfReBBVclLIXevft4zGyCUoZixgCBAEBCvAkrBgtW28yZs8y9EaDDQuwipi/crVawY8cOU2A1jBJ7ASDY0HZwDC57GCQ9evQSX99S2hkjtstdYAFkMKJ9fvLJpxp7tXz58ijWPSFxzd8JLMxm9OrVO1JQusWVK8EqamDYW7MZaD+IZYIHGFN97wIEVsGCrjYHUeQOZmUwfYbXwHMEzzTElrXh74YNG+kYlylTVo2fBHA84JrwHCG7zp29e/eq+MA0m3uSCb4Hd4GFbEd4ndOmzWCIpYr6vu73gs+N2R0E0dtneSCOEJvl51fZo/B8/PiJ9h0IX3gXgYXpQAhZeBCt8dsTyG7EvVavXlMrCyRUHBNYdvehBQQWPFiuBymqB+vfCCw8SJ4EFuZ2EYBIgUW8EbvAmj17jrk3AleH9a1OeyAF2p3oBBas0/XrN6pnF1Yo4iwwvYDpRExt5MmTX+MgoxNYyA5C+0uS5FPt8Pbv328eIST+eBeBhcw4TwLr6tUQqVOnfiSBtW3bNjVekBnrqTyQJyyBhTEsODiyUYP7gXcY7RnT+og3gsBx3yCEkGkHjxsy7YElsOAZQ1kGdywPFoSQuwfLLrDGjnUJLHi/O3XqrHFnCCr3dB/YcA5CFBo1ahxFYCE5wFNoDfoXZBW/q8DCd4/kHQismPoSeBn9/QM0aD86j2JCwDGBBbHkTmwIrOg8WLBKWrVqQ4FFvBK7wEKMgjv/RmChHSBuAhm3Pj55jWe/nvTrN0A9ZChZgpo8o0aN0akD9xgsC8Q2YpoDwfdIIMH5VlskJL54F4GFDDtPAgtiCG3BLrAQIwUPFrLv/qnAQtY6vGJ2ENM0ZcpUNWAwzXX06DF9L/cNJVRQBwoeMIgVYGURumZ2onqw3lVgWR4sxENhqh8Zf2PG/KoJYJ7v5YLeCz6/PQbLElhnz0YVOrhnZFa+q8AKCblmfK4AFVgoQREd+Nz4/PA0evIOJhQosAiJA5wUWFaA/K5du43Osbx2ZshEQjwK0sHtySR4LySSeBJYiEtBRhIypdBpo60iHguxE5wmJPGJUwLLisHCVBz+htcEIsMTKFnQtWs3rdeIdoQg9+gEFsB0OrzEqKlliad3wWmBhfdGAg2mIeFV+yc4LbCQBYngd4zf6JOi488//9R4U5RsQiB9QoUCi5A4wEmBZWXmoE4OUsQxPfDoUdQ2geBRZC8hQ+jnn0dEElgYmPr27a9Zg8hKQptat26DGfBeVS1yQuIL5wSWSzTA64tYJCRyQBi5g0w2FOhEyROUUEGgO+ITYxJY8BAjdgnjErxdnkAZgq5du8uQIcO0dAKwgtydEFgYG7EhaBwB7IgFc89QtoCoQX+AfsMab99XYCEQ3172AcYdvkd4zfFenn4f9IXoeyAIcW33hJ+EBAUWIXGAkwILgaQAniYIJNSisdLRLSCufvllrA4YiMtANWi7wAoMXKrTiujEEQ8B0K5wj8gKRuZQQs7uId6N0wIL5+M8jDfVq9fQZWTswFtVrVp1KVv2a/UMA2TVxSSw0F5Q0wltDMWC7UIDYCoOiSZofyjcaWW/Q2g5JbCs7wUCEoVFIWwGDBik358diMGaNWuaXq6JbzOP/63AwmdBNiKyMnfv3mvudYFaXfju4TlHGYYnTyLGa7wvQhhQ2BXZiwh2T8g4IrBgFfxbgRVdmQZkNLkLLIguCizyIWIJLHSAMQksrFYQncBCrBU6ZnSmAB0iyjYkT55SK8OjKjuE1A8/dNc2hw4MmUiwbPv3H/C2mrRVrBAZUBBaiCexQD0tTKPAM7Zo0aJIAxshcYUlsBBX5ElgwVD5O4GF598uGu7duyuDBrlKpSC4GoU5UdYAIgjT7PDeojacZYjAK4W6UdEJLBAUdNm4z+80wBxB9LgW4h4Ry4jq7xBCMIAQ8I1xDLzLFCGcCTEJLASt2wUWPHA4D9fEMbTv/v0HqThCrTxUaMeyOYjVstfJgsBCbJqfX8wCyyrTYH0GZC7CCIMxhuLESKKBiMNxeKQWL16spRqQYNO0aTMZNmy4evGaNGmu5+B7DQwM1BITCZn3EliYO4Vqxg+HtZrcQSFEPFyYa927N2pGAc7BubgGBhiABoN1oVBIDrV/AH40pMRCjHXp0jXK2k4AVj3EHB4wd0uCkPjGqifz+eepNMbDHViEzZo11yxAT7VxtmzZotWPUXXZSt1G54oCoYh5gGX68cefaMYSBgu479etW6eZS+XKVdB2iHiUW7duapG/ZMlS6P24FweG2EIBYFjlaLdWGyQkLoH3B+0BxThRY9EusOABwXOOekueCuJiCg6B1vACuRvbKHKJ61nLT2E9PXjJMNWF1RTsgm3btu3qKYNYsab3PIH2iDpUmC5EoggSRnB/EEnwJmE8soQJuHDhor4/RJ6nQHC0OXjasPQcxlA7+B4gZpImTa7eM/v3gvdAViKEZ+HCRYx7SKX3giWxkNmHwqSW99sCr4czA+srenJMwJmBVSLghYOTw/ocmArEUlpYKQJ9yccfJ5Fx48a9rSEGYQZDEV4urPKCe0mWLKV6rtBfoRSNp6SbhMZ7CSy4++BaXbFixVur2g4sZljeKJxoLRZpB+fgXFzDcllC/cJywDpSlugCUPKoiosaP/aHygI/KFy7GFA8WTWExCcvXrzUhZWRtYcO1h08/1iaA6Lo+vWodXpg0WP5HCw35e7BxWCEGjtYQgTThmgHlkcYS3ZgGZCNGzfqlF94+AOt+rxkyZIo1rEFvMgbNmxQ7xasbULiGgy+aA9oLwhKtwsUPJPwpmCazxrQ7SAecevW7brsC55ld+DtgbcGpYVQvR2V05HtZ3sLBWLManOejHo7aN8oJLpq1SqZO3eu3je8U/Y1CC2wD9d0jYuudmoH4x7GOmQCu5+P7wGFtNE24W22fy8WGP/gMYMDA44JfAa81lPFdBhY69ev13vx9F1BSOFzIWDdvUI8xmEUJcZvgdIzqOhuT7ABMBx37typ4gx9E0SZp8+cUHkvgUUIIYQQQqJCgUUIIYQQ4jAUWIQQQgghDkOBRQghhBDiMBRYhBBCCCEOQ4FFCCGEEOIwFFiEEEIIIQ5DgUUIIYQQ4jAUWIQQQgghDkOBRQghhBDiMBRYhBBCCCEOQ4FFCCGEEOIwFFiEEEIIIQ5DgUUIIYQQ4jAUWIQQQgghDkOBRQghhBDiMBRYhBBCCCEOQ4FFCCGEEOIwFFiEEEIIIQ5DgUUIIYQQ4jAUWIQQQgghDhPrAuv+/fuyePES6dKlq9SuXVc6duysf9+7F2q+ghACHjx4ICtXrpKePXtJnTr1pF69htK//0DZuXOXvHz50nxVVB4/fiwbNmw0zvtR6tdvKG3atJMZM2ZKcPBV8xWEJGyOHDkqQ4cOk82bN5t7CIl/YlVgnTlzRjp16izZs+eS9OkzGf/mlCxZskmOHLmlZctWsnfvPnnz5o35akISL8ePH5f27TuYbSWjZMuWQ9tLqlRpJG/e/DJs2HC5du2a+eoI7t69KyNGjJLcufNK2rTp9ZwMGTIb/88gjRs3ld27d7ONkQTNlStXpF279uLjk0/mzp1n7iUk/ok1gXXz5k3p0qWb0dlnktat28qaNWtVUG3cuEm6d++pQuubb1rJpUuXzDMISZyEhFyTDh2+VyOkZcvWsmLFStmzZ6+x7ZHff58pZcqUk9Sp08rw4SMlPDzcPEvk0aPHMnHiJDVYAgKqS2DgUj1n06ZN0q1bd2N/LmnatJlcuHDRPIOQhMWJEyelVas2kjLlF4aRkUeWLfvDPEJI/BMrAgvTGYGBgZI1a3adsnAXUXfv3pPvv+8kuXL5yLx58+XVq1fmEUISF69fv5YlSwIlWzaIoeZy+XKQeSSCrVu3SqFCRQ2hVV4OHDhg7hU5ePCQ+PlVktKlyxrGy35zr4vQ0DDp16+/5MyZWyZPniLPnz83jxDy4RMWFiYLFiySypX95bPPUkjSpJ8ZbaSIIbCWma8gJP6JFYH18OFDtbbz5StoWOCzPE5RTJs2Q9Kly6AxJoghISQx8ujRIxk48CfJnDmbzJw529wbmYcPH+lUe8GCGEBcFvrr169kypSp4uOTX4YMGWYYKa91v539+w9I2bLlpWXLNh6nFwn5ELl585bG9GL6HNOCvXr1VkO+aNHiaqwQ4i3EisB69uyZHD58RNas+VMDbT0JrNGjR+ugMmrUGH09IYkRPPu7d++RxYsXS1BQVO8VePz4ifTp01cKFCgs8+cv0H0IiIfoypMnv6xYsUr3uRMSEiItWrSU4sVLyr59kT1chHyoIF6xXr0G0rp1Ow05uX37jgwYMMgQWCU0gYoQbyFWg9w9genAdevWS6lSZaR8+QqaIUUIiZ7g4GCpW7e+FC5cTLMFwZUr2NdARde2bTt0nzvI4EW8Y8aMWWTp0mU6HUnIhw4SO44dOy7h4Q/176dPn0mvXj9KkSLFKbCIVxEnAgserKNHj8nEiZOlR4+eGjeCoFwE89J7RUj0IJ5x6tRpkjlzVp3qu379uu4/ffqM+PtXE1/f0nLw4EHd5w6m3gcNGixZsmSXWbNmx1jqgZAPFQgtCizijcSJwIKIGjx4sGZCffTRJ/Lf/34qDRo0+tv6PoQkZuBxWr16jRQuXFSnPyzvFTh58oRUrFhZypWrYPz/pLk3MojvwtQJBNacOXPZ1kiChAKLeCtxJrA2bNgg06ZNl3HjxqsljgxCTBP+8ccKerEIcQNZfyg6WrJkKU0/nzlzljx9+tQ8ivR0l8AqW/ZrCiySqKHAIt5KnMdgAQTtTp06XYPcAwKqybFjx8wjhBBkDc6aNUcKFiwsPj55ZcaM36Nk2qKIL6YIUboBQb+esE8Rzp49hwKLJEgosIi3Ei8CC4SGhkqrVm21SCKq7zIAlxCRW7duaWX2rFlzaFD7woWLPNawQpA7ltLBoLJnzz5zb2RQlLR3776SKVMWY+AJZBsjCRIKLOKtxIrAevLkiZw9e06tbPu0hh1Y00OH/qwCa/z4CfLixQvzCCGJk6CgK9K1azdd8gYFFDdv3hLtMjfIpMLyICjTsHbtOnNvZBAQjyrX+fIVkB07dpp7CUlYUGARbyVWBBbWhkLHXqFCRV3ywxOYJsRyHgUKFNKKvFwvjSRmLl68JG3btpd06TJJs2Yt5PjxE+YRz8CrNWbML1pocezY8ebeyBw+fFgqVaosjRo18VghnpCEAAUW8VZiRWChCGLfvv10wdkhQ4ZGiR8B27fv0AKIqIWFitOEJFawbmfnzl117cBu3XrIjRs3zSMxs23bdvH1LSM1atSU8+cvmHtdoDbQhAkTdamcn38e4bENEpIQoMAi3kqsCCx4o3bt2qXLdOTNm18mTZqs6xFiILl6NURWrlwp/v5VdcHn0aPHGIIsYgFbQhITmBpHhh+yaitV8tds20uXLqtHC4s0R2wXdAoRy1BZ3LsXqusNoh117NhJg90hzuBBxlJUWDrEz68yDRiSoKHAIt5KrAW5Y+DAummlSpWVDBkya8Au4kpQGBHZg0g9Hzp0mAb1EpJYuXz5stSpU0+SJk0mSZIkk5Qpv5QUKb6Q5Mk/j7QlSfKZ5MmTT5YuXWqe6QJxjm3atJN06TIaxkwBQ6RVkRIlfCVNmvRq4KCCO+MbSUIGAqtbtx/0+V+wYKG5l5D4J9YEFsCyOKjXg2B2lGPAAIEpwR49emmR0egC4AlJLBw6dFjbRq5ceXTLmdNHEz/cNxglEEyrV682z4wACzlPmTJNatWqraUdULrhxx/7qOcKbZCQhAzKmsBYr1KlqtaOI8RbiFWBZYGAXKSMozTD/fsPKKwIMYF3CW0iLCzsbzfENnoq2QCQlYvpQ1cbu8/ivSTRgJAUZK7H1D4IiQ/iRGARQgghhCQmKLAIIYQQQhyGAosQQgghxGEosAghhBBCHIYCixBCCCHEYSiwCCGEEEIchgKLEEIIIcRhKLAIIYQQQhzmXwusVedPSeVZv0nlhdO5cYv/bcE0qTx/qpy8431LL+0JCZbKcya57tHTvXPjFqeb8RzOniTbgy+ZT6j3cO7eHbMts61w85Jt1gQJPHPcfEL/Gf9aYO2/flUGbF4jA3Zs4MYt/rft62XAtvUS/CDMfEK9h7N3b8uArX8a9+jhvrlxi49ty1o5cfum+YR6D9cePnC1E7RnT/fNjVtcb4bO2RUSZD6h/wxOERJCCCGEOAwFFiGEEEKIw1BgEUIIIYQ4DAUWIYQQQojDUGARQgghhDgMBRYhhBBCiMNQYBFCCCGEOAwFFiGEEEKIw1BgEUIIIYQ4DAUWIYQQQojDUGARQgghhDgMBRYhhBBCiMNQYBFCCCGEOAwFFiGEEEKIo4j8P86lfBPQjjvIAAAAAElFTkSuQmCC[/img][/*][*]h para a altura do prisma e da pirâmide que serão construídos, com as seguintes características:[br][img]data:image/png;base64,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[/img][br][br][br][br][/*][/list]
3) Ainda na janela de visualização 2D, utilize a ferramenta [img]data:image/png;base64,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[/img] e construa os pontos A, B, C e D sobre o Eixo X nos valores -5, -3, 3 e 5.
4) Utilize a ferramenta [img]data:image/png;base64,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[/img] para criar dois polígonos, depois de clicar no ícone anterior, clique sobre os pontos A e B, em seguida defina o número de vértices como V_b, ou seja, valor do controle deslizante V[sub]b[/sub]. Repita o processo para os pontos C e D. Observe que os polígonos serão nomeados por pol1 e pol2.
5) Agora na Janela de Álgebra, utilize a caixa de entrada [img]data:image/png;base64,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[/img]e digite Prisma(pol1,h) e Pirâmide(pol2,h), para construir um prisma e uma pirâmide cujas bases serão os polígonos anteriores.[br][br]
6) Você sabe o que é um Poliedro? Escreva com as suas palavras.
7) Você sabe quais são os elementos de um Poliedro? Escreva com suas palavras.
8) Você sabe o que é um Poliedro Convexo? E um Poliedro não-Convexo? Escreva com as suas palavras.
9) O que acontece com o Prisma e a Pirâmide quando você movimenta o controle deslizante V[sub]b[/sub]?
10) O que acontece com o Prisma e a Pirâmide quando você movimenta o controle deslizante h?
11) Movimente o controle deslizante V[sub]b[/sub] de acordo com o polígono da base solicitado e em seguida preencha a tabela abaixo com as quantidades de vértices, faces e arestas:[br][img]data:image/png;base64,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[/img]
12) Você consegue ver alguma relação entre as quantidades de vértices, faces e arestas em cada um dos prismas e pirâmides analisados? Dica: Verifique as quantidades em cada uma das linhas e tente encontrar uma relação numérica entre as quantidades.
13) Caso você não tenha encontrado alguma relação, compare a soma das quantidades de vértices e faces com a quantidade de arestas, você consegue notar alguma relação entre a soma e a quantidade de arestas? Explique com as suas palavras.
14) A relação acima é chamada de Relação de Euler, você experimentou para os prismas e as pirâmides, com base nessa experimentação você acredita que vale para todo prisma e toda pirâmide?
15) Agora pensando em qualquer outro poliedro diferente dos prismas e das pirâmides, você acha que a relação é válida para todo poliedro existente? [br]
17) Quais poliedros são convexos e quais não são convexos? Observe que o poliedro 4 é vazado no meio.
18) A Relação de Euler vale para todos os quatro poliedros? Para qual(is) vale e para qual(is) não vale?[br][br]
19) De acordo com as respostas dos itens 15 e 16, o que você pode concluir quanto a validade da relação de Euler e o fato de ser ou não ser convexo?[br]
20) Com base nas suas respostas dos itens 13 e 19 escreva uma definição para a Relação de Euler.[br][br]