Graf Ableit Üb V2

1.

Überprüfen Sie folgende Aussagen

An einem Tiefpunkt ist die Steigung der Tangente gleich 0. wenn ein TP an der Stelle x[sub]0[/sub] vorliegt, ist die Steigung links von der Stelle x[sub]0[/sub] positiv. An den Hochpunkten ist die Steigung maximal An den Wendepunkten ist die Tangentensteigung maximal oder minimal. wenn gilt f´(x)=0, hat der Graph der Fuktion f an der Stelle x entweder einen Hochpunkt, einen Tiefpunkt oder einen Sattelpunkt. wenn ein HP an der Stelle x[sub]0[/sub] vorliegt, ist die Steigung links von der Stelle x[sub]0[/sub] positiv.

2. Zuordnen

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[/img][br]Sie sehen den Graphen der Ableitungsfunktion von f (rot).[br] Welches Graph gehört zu f ?

[img 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[/img] 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[/img] 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[/img]

3. Aussagen über die Tangentensteigung

für die Steigung m der Tangente[br][img width=181,height=170]data:image/png;base64,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[/img]

m=0 dann verläuft die Tangente parallel zur yAchse. m=0 dann verläuft die Tangente parallel zur x-Achse. f`´(x[sub]0[/sub]) =m f(x[sub]0[/sub]) =m gilt m = tan([math]\alpha[/math])

4. Funktionsterm der Ableitungsfunktion

[list=1][*]Zeichnen Sie den Graphen der Ableitungsfunktion.[/*][*]Ermitteln Sie aus dem Graphen, den Funktionsterm der Ableitungsfunktion.[/*][*]Geben Sie, dann den Funktionsterm der Ableitungsfunkion ein.[/*][*][img 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owgiLCwMDJOwqYqNBlCU9XylOXwSBqigwC0MAM9LTXMoC1nGGZgL55tDq/udZDl5eVwz7TIyEg257iiyRCaquZtmQePpCE/oYYZ6GmpYQZtOcMwg/6quh/ZSqWSjJOwOccVTYYQVKVoUHhu8ISjjxZUhRbZa9eu7d+/P4/H++ijj3SkVTuDjx3NCDKEoKodO3YMGzGs5z96DvUaWlJVYkFVqJD95MkTOzu7F198sX///i4uLj179rSzszt58qS2tHK5XGOfxHYYQk1VY2Ojvb09tQZffPFFjUurbItsOzu7/v37T58+HYY+ZsyYMXDgQDs7uydPnmhLq7FPYgsMoanK3t6eXoP29vaNjY0WUYUE2Z999pm9vT1ZKGTR9OzZk94tIdNq7JPYAkMIqkpISNBWg6tWrbKIKguT3dbedu3utd7/6D1w4EB60NrFxeWV3q9I7ktg8IieM7nuJiIiorW11ayaEWEITVVvvvmmthocPny4RVTxLGZ/4/EG8HhTeLyZPJ49b8DAARrLhfcijzeTx5vK443k8fryeH+znGDOdNqAAVpq0FLGwrdHzYgOQnxNHLovFA5T4QJ8yLQhGv+XOTg4uExwIS/DBXjY/jDxNbFahmvWrIEd7lu3bll964imKm29EQcHB1vpjUgfSkP3hWJJGCR18d7FYom46WkT/AXp5eVFFoqLi4udnd3d6rt5N/PWi9aTcGNJ2HrRelntnxv/Ufskjx49MtMTIcIQsqrgL0i1GrSVX5C513Ph/oVYErZ47+Lj5cfJtZ8XLlyws7Ozt7cfOHCgi4uLg4ODnZ3d7t1/7lPR9LRJLBEHpgf6JPvAib+ZFzPJ/rdQKITNNnXtBrNPhA5DaKqSSCT29vbUGrS3t9c4zcPayBacFcBG12+XX3p+OnU7LNI+++wzcqSGHu8DADQ9bUo8nki235uObWp62gRdsE+CYZjGPdNMfyJ0GEJW1ZmKM6Pmjeo1oFe/Af1WrVpFb63ZVMUG2W3tbclnkiGLAakB5N732qzL3r/8sTwwPRBmGJkdWddYB/7ok2AYRsZJTNFMN+q5fszmbIq3o6MDHVXkOprWNs3lz6aq5wzJZDJnZ2dz3IPoIOCZ27gAj82N/ek/P/Xu3dvOzm7EiBEikUhjWn1+16paVHGH42C2IT+EwG63UCjEMAzH8cxM5mcsaCwiRnI2zltUVDR27NgePXq4u7vD1eAWVxV9MPr9Te/38+vXo0eP0aNHa/t/wh7ZCQkJEydOpPPEyD3I3Thjc2Nbn7V6eXkdPnwYAJCVlaVtfYT+ERuyh7NgzwJ4PuzKlSvJOInRmummrYhMz9lor7u7e2FhYUdHR15enravHJuq4C5+vfx7Ldu+rKOjo7CwsG/fvhZUxQMApKend3R0mINs4VUhJC8qJ0rVogIAvPzyyx0dHW1tbR0dHb169dKY1qBYJHk+LC7AhVeFFRUVamM3jDyRtiIyPWcTvY2NjSqVys3NzeKqyCOoxRJxR0fH0aNHR40aZUFVf1YV42Rfkl2CW3Eu3rsYdoUBAC+88AKZ1s7OTmNaQ6PsRZVFMOSCC/DE44k/5fwEm216n8SUJ9ItzFJk37p1a9GiRSj0RjKKMmAV3Ht8z8HBgcfjbd261YKqnq84BH9Um5JipqyEu1h+0X+XP5aE+ST7XLlzhbyLg4NDR0dHY2NjR0fHK6+8onZHaDzDz4O8LL08P2U+loR5b/VekbVieeRyeMAkXHLHyBNpLCJGcjbC29TU1N7e/uTJk6VLl4pEomfPnjU1NVlW1crslXN3zg3Z+/wI6rKyMnt7+87OTkupMkubrWpRBX7/PHahNkl31qxZ8Ifj0aNHvby8NCY3bmRU0aCIyIqAY0Chu0P9PvCj90mMfqIuhZmSs3He06dPT548ubKykuX7avMGpAbgAryvV9+ysrKOjg6ZTGbZPpJZyE48lQgJy72eq+Y6dOjQyy+/zOPx+vTpc/ToUY3JjR7zb33Wuvqn1fAb9cHnH/jM9VHrk1gT2W5ubl3OkmBNFXnSUkJOwujRo3v06DFhwgRyWzyLqGI+nl1SVQJHGWNzY6lz9PQ3E2ezkLHz9wPeh3CTcRITyTZFlZm8uo01VXk386gH9aIQZWeYbFWLavHexbgA99/lX/N7jXE5m0g20UHAULf3195jJo+ZO3cuI3NckRrtQ01VwokEOF8NtmUoqGKYbPiEuAAXXdE8CqNPzqbPQGx91hp9MBoX4G+Hvv2m55tkn8QKGEJTVcgPIbgATz6TjI4qJskmD/9bL1pvij5G5taqWlQRWRG4AB8+e/g7U98xfY4rCrWFpqqa32vUjjNFQRVjZLc+a4UkBaQG1PxeY3GyAQCKBkVgeqD3194Dxg2Yyp8aFRWl/z4sdEOhttBUlS/NJzcURkcVY2TnlOTAx4PxEBTIBgBU1lT6p/hPCJkwwGOAN+adnp5udM4o1Baaqrac3IIL8MD0QDJggIIqZhhqetoEe1qR2ZHw8RAhGwCQL82fJ5g3bMawweMHe8/yLi0tNS5nFGoLQVVEBwFP7dhycgs6qgBTe7Gm/pIK9968KL1oaFq6GTEGqdu7/cT2qeumOnk4DR0/NDQ0tLa21oic0dz11OKqyEMfs4qy0FGlZGQv1obmBvitTTzV9b6D+njNsTpz07FNE8Mn9hvdb9zkcVlZWUbkjEI7hKAqsURMjWQjogow0huB882pPyBM1GcOsluftUblRA31Guo0xmnarGkymYx+DeIMoakKxnkDUgOohz5aXBUwney6xjo4YSDucBxT+sy0ol7RoPDe4N3/rf4uY10+Cf/E0DmuKNQWgqrgwBy1k42CKmA62YmnEuECIUWDgu41Lmfz7RVx4saJ8UvGO41xcn/HHZ7cp39aFGoLNVWyWhn8d5138y/TaFEoK5MYqlZWwxnYal9ZE/WZdReU7wu+Hzp9qNMYpwlTJxi0jysKtYWaKnLZBzzbABFV0ExiCPax/Hb5UXvYpuszK9lt7W2BiYH93+rvNMbp49CP9d/HFYXaQk0VPH+aGslGQRU04xmqvF8JG2xytgBT+sy9c1W1snrKp1OcxjgNHDswJT1Fz7Qo1BZSqogOAv7EosbELK6KfG88Q6m/PA+JULdrYkQfC3uyXZdff53/utMYp2HvDJPf1WsfVxRqCylVlTWVEAC4thoRVeR7IxlStajmp8ynh0QY0cfOboOJuYmwTzLzw5n6zHFFobaQUpV7PReSTS5yRUEV+d7I0b70/HTvrd5YElZ0u8jQtF16GR+D1Oitb6jnR/D7je7Xb3S/LxO+7DItCuNqSKla+/NaLAlbkr4EKVXke2Nax9ZnrYHpgVgSFpEVoW3VjLa0+nhZ2yFWViNzn+HuNMbJdZzrTelN3WlRaIfQUSV/KIe/stIK09BRRfUaw9Dx8uNwPRi9g8WIPjb3PhbkCmCfZMq/ptTW1upIi0JtoaPq5I2TsCty64GGHYtQKCtjGIKHxc9PmU8dUGVQH8u7euPRuNMYJ6cxTtFfR9O9pFFr6+OPP4anggMAioqK+Hz+qVOn4J8tLS0LFy4ElKOHZ8+eHRoaeufOHbUM+X8cXNulZr72c+a1MQTPX4Q5Nzc3BwUFacxZW7bNzc2BgYHkn/Hx8efPn6desP3Edvqgepequrwvg16DGZLclzw/LP4Xc+3nyzLZ1U+qh70/zGmM04C3BpSUa15uDf5aW/Hx8ZcuXYLvt23bFhcXRx7jeenSJfieiqNIJAoPD1fLUH+ydXg1MkQQRHBwsEqlUiqVDQ0NUVFRGr8b2nKmJ1GpVEuXLqXG/kMzQnXED7ol2eTK8FJZqZn0sX8SQ8aJDGcP536j+73l/Za2fVyptSUSiX7++Wf4/qOPPnrw4EFAQAD8UygUwg1V+H89S3z27NlqGfL5/AcPHoSFha1cuZIU1tjYGBsbi2HY2rVr4S69RrTZYrEY7iOuVCoXLlx4/Phxg8jWmCQlJUUsfr4YrLKmEu66ISrVvNq1+5Hd0NwAg/MJJxLMp88iZ4x8EP1Bv9H9nMY4Rcdr7pNQa+v27dubNm0CAEil0i+++AIAsGrVqtu3bwMANm7cCN+QZHR2dubk5KxYsUItQz6fv2PHjs7OzuLi4u3bt8MPd+zYUVdXBwC4ePHirl27gCay6cfBqOUcGxtbVlYG08IFcgaRrTFJWVnZunXr4Pvc67mQbHq8j15W+t+XWa9hDJE7UJYqSq2M7Lrf60Z6j3Qa4+QyzuVS2SX6BdTa6uzsDA4OBgDs27fv+PHjAIBDhw798MMPAIDg4ODOzk5A4Q/DsMjIyHv37qllyOfzVSoVVOXn5wc/9Pf3Jy+YP38+MKrNnjt3bnt7O/V5DSJbY5L29nZfX1/4fr1oPZaEhe0PM0iVnve1DNmR2ZFwv2qig7AysgEA+4/th3GS8XPGt7S2qHnVamv16tXt7e2RkZGwz/Dw4cNPPvmkvb199erV8AK13gj9dtR+NoZh5IekzZw5ExhFNkwI9CZbY9tPTwJFqlpU/in+WBKWWqD1h1Y3I/vWg1uwwc4oyjCrPkuRrVQql8QtgXGSz+I/U/Oq1VZqaup3330XGxtLpl23bt3mzZvJg3L0IbuqqgoA8OTJE7KpnjdvHl2Vob0RX19f87XZcDsoLAnTGO+DhgTZSu2mNt6z/cR2uOJNek9K9+pOa5CXnTFIjd4Hjx64v+/eb3S//m/1P1t8lupVG1fLy8vj8/lHjhwh04pEIj6fn5eXBz/h8/m678vn8+Fvx7NnzyYlJcEPt27dKpPJlErlsWPHli9fDtNSs1IzjaN9a9asyc/Pp95XYw66S0Mtyblz59asWaNUKjf9dxOWhH0o+LC+od4gVXre1wJjkHB1+ppDa8z9zbNgmw0AOH7xeP+x/Z3GOI2bM67l6Z99ErV2SKVSYRjW0tJCpn369CmGYUpNzaTG+8LYyLJly7744gsyOq5SqdauXYth2CeffAK75kqjYiM7d+4E2tts+Kfu0lBLsnPnThgbgScEbTyyUUdaJNpsPa+D+1BS9wGyVrIBAEv+/bxPErkpkvSiUFt00xbPDgoKqq+v15Y2MTHRoPvW19cHBQURBHHt7jV9drdDoaz0ZWjTsU1wzIk8pc6KyVY1qd6Y8YbTGCdnD+fC689nEKBQW3TTZwySbvv27TPovps3b4ZjkLvzd0MMHtXpOlEWhbLSi6HWZ63M7ruAONkAgLyLebBP4jHLQ9WkAmjUFt3YVEV0ELBHuvHoRnRUafPqxVDhnUL4P6iosogRBTDiq81QIBsAsGzdMtgnCYwO3L59e1hYmNrcCYuoUjM2GSInVoglYnRUafPqxRDsiqgtdzNFge6zFREhu7G50WOWh0MvB/ue9oMGDxo8eLCjo+PEiRPhGKGlVKkZmwzBrojfLr+6xjp0VGnzds1Q09MmeHKX4KyAEQVdnq2ICNkAgDfefKN///7Tp0+HYeMZM2a4urpOnDgRRostpYpqrDHU1t4Ge6QJJxLQUaXD2zVDagc1mK6gy7MVESH7xo0bvXv3JrEm4XZ0dKR3S6yebDIqcqbiDDqqdHi7Zmi9aD05os6UAqATX0TI3r59+7Bhw+gDfkMGuUX+a8bV79dTXxd2rlX7hB3vyczd7JRG1uUs6qrHbkB2gU47euro5K8me27wXLN3je4rdRh5/hX5CfgDX23XG30vBi0yMnLIkCF0sge7uQZO8RCunm/x1/cTeIdil7BTGvhm3HOD56LkRezcznTronU8U3FG26Igq2+ztfVG/uHoeFp8pLmumvp6KJOqfcKC99L21Ydil7BQGuQuZ+QxiN2gzdZ9HdwEKCA1gL6S1+rJBgC89957rq6uXl5eJNYuri4jRrqrHt6zKbLJrki1slqftKiTXV37fNs+jfMVTSRbh6FD9pMnT957773evXsPHTp00KBBL738kr1Dj+GeQ+sfVtkU2XCuSFROlJ5pUSebXJ9cqihlUx86ZEO7ceMGHKn5KOwjx6EvOw59KezLYNPpVN79NdtnEPbyQI4AABMVSURBVPpkk7OXj5cf1zMt6mRvOLxBx/pk2yEbWkFBQUtry9hZY3u79uj3huOhEwdMIbu+six30dvfT+ChT3ZaYRoku6G5Qf+yMreqLr1aGWp91uq701fjDsLm1ocs2QCAS6WXnEe/1tvlheHThj2896vRZB+Y1b8sKxF9sskBmtjcWEPLynyq9PFqZaikqgSu4rx29xrL+lAmGwCwetNqxyEOjkNfClkbaDTZj3+90VxXjT7Z5Om1arsmdWOy0wrTsCTMP8Vf23Y5Nks2AGD87HGvutm9NvLV/YdSjSMbvtAnG26R7p/iT85eNrSszKFKH69mhuB8RSwJ07ZViln1oU/29ZvXB3g4wT7Jvaqb1kp2XWMdDI7BuSLGlRXjqvT0al5xeP1/17EkzHurt+iKSOMFSitdB6nDW/DXtX3R30Q7DnmpzxAH/xX4Q5n0t5s3Hsqk2l7avN9P4Bmd9qFMWpAQeShWw1aoTJVGZmEmXPl6WXrZlLJiVpWeXs2tI9xXBEvCVC0q9r956LfZ0Dz93n3Vze61kX0OnThglW023IQjbH9Yy+8NP/kO1Zi2rUn1/QQe+dJWVgyq0tOrmSE49Bi2T+tWKWbV113ILikrGTDGqbdrj+HTh0klJVZGdtHt578d95/9/kiIJ0mtWtq7hUdPrwnosqyYUmUS2WTvynx7UloH2QCAuMQ4x6Ev9xncc27YrN9rFEbQySzZ30/g3fpPyg/v9943vU9V/uFfzx7Jmu2S9k+7exdOGPq8W45tgesM0uYMuH0kXRvZ1/d+c33vN/qUlZ73NSPZ5ITs8qpyi+jrRmQTBDHJZ9Krrj36juj98/EfUCD7wpYVHUT7/eLTh5dMurT7y86OjnsXTqT9007tMrWX2nM1PW2Coxkbj25srquGSTSW1anP/f/7ydS9ng6HPh7XVHNfR1npWc5mJBseXhq6L9RSDHUjsgEAv8p+dfFw7u3yt+HTht2X37Y42c+aG8n3DfWPyfcGPa+oVARHM8g5ntrIPjDT+VHZRQCA6l7lschZusuqy/sy6NXwwHB9cvKZZI5squmorW92fOM49CXHIQ4BK/0sTjb1PflEBpH9/QTeFD+eRwCPelqLNrKplv6ufZdlpeO+zHrVH5hcn1x4p5Ajm2o6aosgiMn45Fdde/R7o88e4Q70ydbdG4G7JmFJGPXMaX3IzpjSq8uy0paWca86Q/C8YTj0yJFNNd21dankktvYAb1dXhg8ybX81iXEydb9vHGH43ABviBlQeuzPzfJ10Z2zr/cVfcqAQANslvnv43Qp6wsQzaM98UIY1hTQLfuSLZSqUzcndh32CuOQxymLZ1c++B/3ZRsWa0MRsb2nN2jLWfqn4/KLh78cFTaP+1ORPk8VTXoWVYseP8y2lf7uNZ3py+WhO06vUtpudG+bjEGSU9bX1/v7c/v7dqj74jeUTv+T89xRNTGIGOFsVgS5rvTt0JWYXTOyI1BkntBwfl9Sq7Nppg+7ZBcLncfP7i3ywtu77qcLD7Efptt4vPKHz8/5VFwVmDusjK39y8MwdOVFu9dDH8Rc2RTTc/a2pe1r9+wVxyHOLyzePy9uze7F9kbj26EozPVymqrIhvG+8iJXRzZVNOztgiCWLTsYzjHNTA+4MnDu92FbEWDAjbYyWeSDU2rZmiRrWpRwa4IGevhyKaa/rWlUCg8/jmyt8sLLu/0T/7vt92FbDhCBxtsQ9OqGVpkk6sn5I/lbCqgW3cnGwBw+Mhhl9dfdRzi8NaiNw9fyEKf7GplNbXBNigt3dAiW3BWgAvwBXsWsKyAblZANkEQn0ZG9HW1e23Eq/zYaRevnkKcbHKfVT13FOlOZIftD8MF+KZjm1hWQDcrIBsAoFAopnm9+6pLj0GTXQN3BjxS/Ios2YoGBfx3TTbY+qfVaAiRrWpRwX9G1AFVjmyqGVFbOTk5Y0YO6DO452j/kZ9nfaZtmqvFySZPHCcbbP3TajSEyCYj2WQnmzUFdLMasgmCWL16lYuL/T/c//7+Gs+0PA1TSixOdklVCWzU1ovWG5pWmyFBtlKpVP5xyN/8lPlKinFjkFQzblytvLzca8qkfwzs4fruAO9vp6Ud24HUGGTt49qgPUFYEuYn8JM9kBmUVocXoTHIxXsXw2nm7H+36GY1bTa07Ozsd0a5/WPIS28tenNOovepK4fRabPhBDjqJqv6p9XhRaLNBpQfEDklOewroJuVkU0QxLLQpaMGODiNcpweNyVAMO/mr5dQIFv+UB6QGoALcOo8bD3Tdg+y86X5Gnem5Mimmim1VV5ePsfba4SzvZuny+yt/KCUj+RyicXJThAn0I+M0zNt9yCbHHxS24OBI5tqJtZWdnb2e6MGuw/tA/skAYJ5ps8qMYXsWw9u+ST7aNwlR88n0uFFhWy4O7LaT2PWFNDNKskmCOLTiIjxTg4j3xo0PW7KnETvT9KDZb/dsAjZ5B5gAakBNb/XGPdEOrxIkF2trIb/krKLsy2igG5WSTYAQC6Xz/aaOt75pYmzxs/eyp+T6A27JeyTDcebsSSMuiW2EU+kzZAgm+xk0/dc5cimGiO1lZ2dPWXM65PcB368OmBOojeE+/K102ySLZaIYY1vOLyB/sPR0CfSaEiQTe77Td/ojCObaozUFkEQn366/O2Bf585+Z9x6Z9DuAOS/W7f0brFFLNky2pl8Nza0H2hj+oemf5EGg0JsmEkO/pgtKUU0M2KyQYAyOVybPqU8U4OYYsDdx9PnJPoPXPz9ADBvJKbv5ibbFWLKnRfKDzHQlYrQ7+sTPHy4Gab6fnpSppxY5BUY3BcLT093XPk4EmvD9idnLj9cPyM+Pdnbp6OJ2LnisV6jkHevV3+P8n1o1+F7/88SKFQ1NbWdnnf2se1YfvCYHWfvHHSUM0GeZEYg4RdkZKqEkt9t+hm3W02AIAgiOXh/zfe+WXvd9++fb1k38nd+HZsTqK3X7LPhbI83W12TVVlWXHR+TMnz585eWBdWHLkwqtXr5aUlFRUVKhUqs7OTo33bWtvgyvBcAG+O3+36aXBWlkZ7eXRD9dhWQHdrJ5sAOMkM6aNd3IIWxJ0/86tnwv3Qbjx7djPhfuoswJJshtr7t+6Xlx0Ju9KUYGk5KKk5OKhDctTVwbeuXPnzp07N2/eLC4u/u233wiCULtv09MmuIUILsDjDseRh1h0l7IyzsuDZ6pbUAHdbIFsAEB2dvbk0cM8h7vuTk5srqs+dulnCPecRO//d/Bzcj43JLux5n7p5aILZ0+XFV+AWKuRDe3atWu3b98m4VYqlU1Pm6IPRkOsE08lUs9m6UZlZYSXpzbfnH0FdLMRsmGcZLyTg9ekCbevlzTXVZ8s/s8HO3AId3Dqwms3C0iyb10vvnD2NMm0NrIh3L/99hvslkjvSUmsk88kq8X4ulFZGeHl4QI8X5rPsgLdZiNkAwAUCoWP15Rxr/UMXbSw/n5Vc1217Lcbn2d9BuGek+i9QbhWequkpqqy6EwetbWWlFzM/SkrBHvP7723fvrpJzW4S0pKnjx5cqbijJ/AD2KdUZTB7Jyn7kG2okHBmoKioqKxY8fa2dm5u7vn5eVpvMZ2yAYACIVCz5GD33UfkPbdn+sSDhXtJxtvbAt/4951+b+ISaZvXDo/bqzH33v1GuTqMsjNrU+fPmPHji0uLibJPld8LnJ3JL4Tx5Iwv11+9BmqJmru0osE2Qv2LNA2EGUOBe7u7oWFhQCAvLw8Z2dnjdfYFNkAgM8iP53Q/5Xp77x1raiAhFsul8T+tHpOovfMb6dj//b2/WpO7J4Ycd7PkpKL48Z6uLi4TJ8+nc/n8/n8GTNmuLq6enh4SG5KjhQc+TTlU99Nvj5f+uDJ+IKUBZL7EnNo7gZkW+RcPIIgVCqVm5ubRq+tkV1RUTF3xtRx/XqGBn0M+yTk6/adkjUZK2ev9Z69/vlr+vKpL738Eok1CXevv/fy/MRz7jdz4ct3g2/y8WT5Q7mO+3bHsjKAbG3/qsyqoLm5edGiRVxvhPQKhULP4a6eI9yofRL4qrhW/J8jB2L3xECyR80a4eLmwqeZq5vryJkj534z1+9bv6+yvhL/In78+LFVlpWeXt6B/x4oMLPx/rCysjKlUimRSJYuXZqWlvbo0aOysjKN15tbEoK2cMFHb/VzmDhm+N5dO8789xD5OvLT/rTvkrPSU9NTd/x768p3sHHayH571ttf7frqhwM/5OTkZGRkHD161NLPZEnjaTt82kzfrdOnT0+ePLmyslJHWhtsswEACoUC954+rt+fcRL4+p/k+vkzJ8mfjz9nZfbq1YveG3F0dKQGSa5evapSqay1rPTxss2Qm5sbj2Iar7FNsgEAQqFw8htDJw1zpvZJ7t4up5JN/oL08vIisXZzc/Pw8Lh9+zZJdkZGxjfffKNUKm/evBkWFoZhWHh4uFwu13hfNaMniY+PP3/+vP5PZItk62M2SzYA4PNV0eOdHKa/M5aMkzyUScuKi66cLyDJvvDLqXFjPXr16jXIzXWQm5ujo6OHh0d+fj6JtUQiWbhwoVKpVCqVwcHBEokEACASiSIiIvRRBZMolUoyiUqlWrp0KX3cXpvZLtm6vbZMtkKh8Jk+edxr9mSc5KFMqnGk5uesTHKkhtpa37lz57vvvtuxY4dazp2dnRiGGaSKmiQlJUUsFuuZliNbs9ky2eCPPgkZJzFidD06Orq0tFQt5+bm5rCwMB33pauiJikrK1u3bp2eaTmyNZuNkw0A+CJm9XgnhxmTJlwrKlCbEaWbbDgjau7cue3t7Wo55+TkXLx40SBV1CTt7e2+vr56puXI1mwc2dT5JPKKMvVZrOc1z2ItKSmBs1hnzpyplvODBw/S0tK03ZeMsVC9UqlULQm1M4NOWWnzosgQRzYAQCgUvjdy0KRhzju3Jei58uDJkydwip+vry+1zW5oaNixYwf191+XqhoaGrZu3UpNwrXZDHg5sqHFRK8c95r9+xPepM4nga+GB/KaqspT3362//MglUr19OlT6mqauLi4kpISmLNEIvnqq6/a2jSMWmi7L0xSW1tL/fDq1atxcX9OxECtrOheFFccWv06SD29FRUV2PvvjXNyCFoQIK8o038vVqFQuG3bNpjzggULqGM68AL4Rtt9NSbZtm2bUCjU84nYLyu6F8XWkWuzSRMKhe8Od33XfSB9PomOtesEQQQFBdXX12vLOTEx0SBV9fX1QUFBXDzbVC9HNtU+X7Vy3Gv2ME6i/64M586di4+P15bzvn37DFK1efNmbgySAS9HNtUqKipgnCR8yaLfHyn0JNvcqtAsK45sY7wWrK2cnBzPEW6TXu//w/e7ObL19KLIEEe2mpcgiFVRUeP79fSaOO5ywRmObH28KDLEkU33ymQyH6+p450cQoM+fvLgLkd2l14UGeLI1ugVi8XvjRrsOdw1I+U7juwuvSgyxJGtzfv5qujxzi97e75z8+oljmzdXhQZ4sjW5pXL5T5eU8c7vxS2JKj+fhVHtg4viqN93BikDm96evq7I9wmuQ/cvjne9PMgzeRFoaxQbB25NluHlyCIqBWRsE9y+MtPuDZbmxdFhjiydXulUulcb6/xzi/NnzxW+O9gRFRRDYWyQpEhjuwuvSKRaMqY1z1686J8p6KjijQUygpFhjiyu/QSBLE6eqVHb97bg15TKDRvy8i+KtJQKCsUGeLI1scrl8vxWTMmjXszIiKitbUVEVXQUCgrFBniyNbTm52d7enpieN4ZmYmOqoAGmWFIkMc2Xp6CYIICAjAcdzPz09tlxwLqgJolBWKDHFk6+89cOCAv78/juNRUVH0JWG2XFYoMsSRbZCq7OxsHMdxHM/ORuV8cRTKCsXRPm4M0iBV9fX1oaGhGIb5+vqWl5cjosoi9+XGII3xotAOaVMlk8n8/PxwHA8LC6PGSWy5rFBkiCPbCFWZmZn0PonFVbF8X45sY7wo1JYOVQRBxMTE4Dju7+9Pxkksrorl+3JkG+NFobZ0q5LJZGpxEhRUsXlfjmxjvCjUVpeqyDiJUChERxVr9+XINsaLQm11qYogiIiICBzHAwICqqurEVHF2n05so3xolBb+qgi4yTR0dH19fWIqGLnvhzZxnhRqC09VZFxEm3zSSyiioX7cmQb40WhtvRU1dbWBvskPj4+GueTWEQVC/f9C9lK7caNQVINhXE1/VWVlpb6+Ph4e3uHh4fX1tYiosrc9+XGII3xotAOGaQqIyMDwzAcx0UiETqqzHpfqhdFhjiyGVHV1tYWHh5OxkkQUWXW+3JkG+NFobYMVXXx4kUyTmLQaR5mVcWRjZYqFGrLCFWpqanUsRtEVLHgtQxD1ENV6MaRzaCqtra2qKgoOJ9ErU9i3WXFNkNlZWUTJkyws7MbPXq0tufnyGZWlVQqhc12TEwMdd2NdZcV2wyNHj360KFDAIDCwsK+fftqvIYjm3FVLM9xRaGsLMNQR0fH0aNHR40apdHLkc24KoIgIiMj1dYCW1yVWb3/H4A3LuQTOS49AAAAAElFTkSuQmCCAA==[/img][br][br][/*][/list]

f´(x)=1,5x[sup]2[/sup]-3x[br][img]data:image/png;base64,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[/img]

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