[code][/code]Du hast nun die erste Schaltfläche ("Prüfen") mit einer Funktion versehen.[br][br]Das Skript der zweiten Schaltfläche ("neue Aufgabe") soll dafür sorgen, dass eine neue Geradengleichung generiert wird.

[icon]https://www.geogebra.org/images/ggb/toolbar/mode_showhidelabel.png[/icon] [b][u][size=150]Arbeitsauftrag 1:[/size][/u][/b][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAI8AAAAzCAYAAACua1udAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAkKSURBVHhe7ZwFbBRNGIa/trgWKFJo0eIWIGgpFjxYgASCBQnFQpBgCQkUAoE0aCC4FA1erLi7uzvB3UvR+ef9mG2Oo7d3t3A/5TpPsunt7N7uzs47n8zM1UdISKOxgK/6q9G4jRaPxjJaPBrLaPFoLKPFo7GMFo/GMi6l6rdv36aNGzfyFhAQQMmSJVNHNN5ASEgI+fr6UmhoKFWoUIHSpEmjjpjjVDxbt26lQYMGUcOGDcnf359KlChBKVKkUEc13sD169fp48ePtGHDBqpduzaFh4dTtmzZ1FETIB5HvH79WoSFhYmYmBgRFxenSjXeyr1794Q0EiI6OlrExsaqUseYxjz79u2jsmXLUqVKlShlypSqVOOtBAUFUbNmzejWrVskDYcqdYypeB4/fkzBwcE6xklCoL3fvn1Lnz9/ViWO0dmWxjJaPBrLaPFoLKPFo7GMFo/GMlo8kiNHjtDu3bvpw4cPqsQaDx8+pIULF9L06dNpy5Yt9P79e3XEGidPnqQ9e/bQu3fvVEniIsmL58SJEzRhwgTq27cvPXr0SJW6z+rVq6lixYosmr179/62cAy6detGV69eVXuJiyQvniVLllDhwoV5TOvatWv06dMndcQ9jh8/Tt27d6fJkyfTsmXLqGXLlpQuXTp11DtJ0uL58uULu4WwsDCe04H1ePHihTrqHrA4OXLkoNSpU6sS78ej4kEsgQm3ly9f0qFDh/hzQjx58oQOHjxIDx48oG/fvqlS18F1z507x+bdlZFRA6wSKFeuHBUrVowFtH37dpeG5d3FmHg0wCqFuLg4tUf06tUrevbsGX39+lWV/ApGfc+ePUt3795l0dtjHMe9rFpPt1FzXAkya9YsMW7cOPHmzRtV4h758+cXo0aNEgEBASIoKEiUL19eREVFCRkPqDOEGDlypMiYMaOQ8YKQvVZIsy9kgMjH2rVrJ2rUqMETdgbSxQgZlAoZ3PK+fFmibt26olSpUiJ9+vSiQYMG4v79+3zMGdK18P0wAXz58mVRoEABERkZyfsGx44d43rMnTs3/rmnTZsmsmfPLmRjxR/HqzS2OXPmcB1k4CxKlizJx4ODg4W/vz9vqKt0kXw8NDSUj+PZ69SpI27evMn3ADIeE4UKFRIdO3YUgYGB8dcfM2aMkBZSnSXE8uXLRe7cuUVISAi/y/DwcJffgT2bN28Ww4cPF3fu3FEljvG428KSjv3793OPkY1MFy5ciO91iA2WLl3KFgDnIOOZP38+n/v9+3c+x4znz59T/fr1qXLlyhykwoLBiiCOQW82A/ENJgAR5CI2KVKkCFWrVo2f19l3bZEdgmSDU+nSpUmKhjOjLl268DVnzpxJAwcOpPPnz5PsJCQ7AsdGsMgFCxbk78uGYqsJy1G8eHHO1lAPWxCTXbx4ER2dZIemmJgYzuzAlStXaMSIEXz9M2fO8LVQtmnTJr6mJ/G4eLD+B2tDsNgoa9asJHtwvGuIjo6m5s2b80tLnjw5NyTOR4rqyMXZMm/ePI4x2rdvz2uN8Ll169acQTl7cVi7Iq0V5cqVi/z8/LisZs2adOnSJRZVQq7BHWbMmMGz1BA2FlehXhCAbdqNAFtaG0qbNi3vS+tBa9asoadPn/K+AeKxTJky8ec2bdqwa4dA8I62bdvG4sJ9cB1cQ1psduHudAIreFw8iCUcBZGo4NixYylz5szk4+PD2+LFi7nxzPy/Ac7Dd9u2bcuxi3QR/Bm921njr1ixghYtWsSzyMa9O3TowOn6ypUrf/vFt2rViqTpZ8EgBoGlq1evHmXJkkWd8QOIHBZj1apVfB6sqVncBoFIN8cWHELEPWCxISCjHljMNX78eM4gPclfzbZgkfr168cZDkyysUVERJD03eosx2CtEZbF4sXDWsE9QJAISLG00hHSr/NfGef8dF9sSLGxjknGeXyOVWAp0KD9+/dny4hOAZeaIUMGdQaxFYbbQweCaF1x1QCWG+urYDFhzatXr871tq8LLLkn+aviqVq1KluJ2NhYVfKDo0ePJui2kA7bmn18H24GIrDtrTDpttmMPYgZsKzWcAW2dO7cme+xa9cuhwN9iCvsn9keuE5Yw7Vr13JMAnfUo0cPdq9AJgG0YMECGjJkCM2ePZt69+7Nrj0hiwthGRkU7o2sNE+ePGzR4fJRBgtnW2fEkP+82zKja9eu3BObNm1KU6dO5eARvRWWAyAGwYtbt24dxzcIsG3Fg57cq1cv3oYOHcrXaNKkCTeSfdBpgGAcQXGjRo3Y5dkjszWSmRTt2LGDrQ/uIbMwbiCMCY0ePZp7PhraDATEcFUQiMyG2LpMnDiRTp06xUKAu0TdsY9OMWXKFH5+pOz2wAUhCZCZK8c8VapUYWuDWAr1RRkCcwgR12nRogU/p33s9Kfxky4iQn3+BaOi6EFWl6EiIM2bNy8HxLAoyEqQdaDXyPSUGjduzIJAT0Fvkmkwm3KcD2uCv4cPH+ZehUAQ7gjnGdfEav98+fLxs+I6GM7Hgn372MIAjQAxIFB1NAKM3o/YAkEu3ALqjjEUuEXcGxYL90U9jGvATeTMmZOfCz8QiIqKovXr13PQjEZGJ8B+ZGQk78NiIFPEdfFeEKtA9HjXCH7xbvAd1ANNhM8HDhxgV4364b0a1KpVi1KlSsUWGNZSpvY0YMAAHrR0lxs3bpBM86lMmTLxVtIRpr+egDlFQGdYCI3roEERgNtPUwwePJiF0qdPHwoMDFSliQdYQQwldOrUiTuKGX/VbXkzSJkRJGP8CbEH3CjiO1hYb5nG0OLxEMOGDeMf0U2aNInjOGQ+cD8YiEQa78wl/Atot6X5Ce22NP8LWjway2jxaCyjxaOxjBaPxjKm4sE0AUYtf3d5gubfAWuT0O7GXJoZpuLB8DmmCFyd7dX8++DnRxiTSmjS2B5T8WBACxOAmA/6Uz8l0SRedu7cyfOImLdzNDdoi9P/DIalA5jtxmQZ/tUKRksxIanxHrCEBaEJVij27Nnzp9WNZjgVj8Hp06d5rqZo0aI8g6vxLrAMBe7KnZkEl8Wj0dijU3WNZbR4NJbR4tFYRotHYxktHo1ltHg0FiH6DzGN5S906h7LAAAAAElFTkSuQmCC[/img][br]Die Schaltfläche mit einer Funktion belegen.[br][br]Wähle mit der rechten Maustaste die Einstellungen dieser Schaltfläche:[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAYYAAAFaCAYAAAAafPqxAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAENwSURBVHhe7Z0LmBXFnfZruCiXoKAglw9RIyYCohIhZo0hxmggIhK8YNa4QtgVze4qoruLG32I4SEb3ayS6O5GMEFwCW5AJYaQQCQYkRANIG4MaFZYEkAuch2R+wzznV9N16G6p8/MOTN9LjPz/niKvlR3dXXP6f9b9a/qqrKqFEYIIYQIaBEshRBCCIuEQQghRAgJgxBCiBASBiGEECEkDEIIIUJIGIQQQoTI2F31lVdeMS+99JLZsmWLUY/Wak499VTzF3/xF2bkyJGmTZs2wd78sHHjRvOzn/3Mhs6dO5tWrVoFMaIp0Lt3b9OiRQvz6U9/2nzyk5807dq1C2KEKD6xwjB58mSzbNkyc8MNN5hzzz3XlJWVBTHNmz179pif//zn5vjx4+aJJ54wHTt2DGKSZdGiRWbixInmmmuusde44IILzEknnRTEiqbAu+++aw4dOmQWLFhgrr76anP77bebM844I4gVorjUEIaFCxeaadOmmWeffda0b98+2Ct8Jk2aZNq2bWvuuusu85GPfCTYmwzl5eVm+PDh5v777zef//znzcknnxzEiKYINfI77rjDjBs3zgwZMiTvNVEhsqFGG8PixYvNV77yFf1Aa2H06NHmN7/5jTl8+HCwJzlw4Q0YMMB86lOfkig0A3r27GlGjBhhNmzYYPbt2xfsFaK41BCGDh06mPPOO0/uo1rAvYbhzod7Z/v27aZXr15qU2hG8Pf+4IMPzJEjR4I9QhSXGsLwhz/8QY3NWfD8889bH7EQQjQ11F1VCCFECAmDEEKIEBIGIYQQISQMQgghQkgYRFF47bXXzMsvv2wOHDgQ7KkfW7duNc8884z5/ve/b7taf/jhh0FM/Vi1apX59a9/bfbv3x/sEaL5IWEQtUIPNRf44juJ8Lvf/c48+uij5p577jHvvfde7DHZhHnz5plLL73UfinO9x90+Yw7LpfAfd55553mj3/8Y2x8PoLrBRgXp6CQa/Df2fpS48tnPrbhy14+smIsl1x49dVXbWmrsrIy2FM9vtA555xjhg0bZlq3bh3srZ3ly5ebiooKc/nll9uSJeuMKRM9/5e//KX57ne/a78rePjhhwv6pTbPB4PUtWvXYE8yTJ8+3ZZWGSLhlFNOCfYWB34a/NB4/gTWk/i+5cEHH7RfjFPSf/zxx83gwYPr9U0IQ7fw3Q0fHJ522mnB3obx5ptvmq997WvmySefNBdddFGwN78sXbrUrF692vzlX/6l/eBNiPrCO4vd5jsoAuv1eWcTF4ahQ4eau+++O/3VLqVDBuO7+OKLresgmyEkeMkZIuAb3/iGufnmm62h/OlPf2qNgOOqq64y3bt3NzfeeKMdxoMSqB+fb5q6MDhR4Otu3D0sXYmkISAwY8eONX//939v/24IAkNCMFBgrvzVX/2V/X0wdAhDlCTB22+/bR566CHzzW9+05x//vnB3vxC4Yfvh6699lrTrVu3YK8QuYPNJjByBQVllvUSB4TB57rrrqtatWpVVarUH+zJnmXLllW1a9euKvXCVx07dizYW1W1cePGqlSpvurWW2+tOnjwYLA3MymBqUqJiE3DrR89ejSIrar67W9/WzVo0KCqvXv3BnsKT0roqrZv3x5sJce0adOq/u3f/q2qvLw82JMbPBue8e7du6t+85vfZHze5D1VM6vasmVLVcpYB3tPkBKAqpQYVO3YsaNq165ddlsIUfrwrvLO8u7yDtfn3S1IG8PZZ59t/cnPPfecSWW2Tt8XLqQrrrjCVoXcuu9Gwp/MqKO51miaA4xz9dhjj5mPf/zj5stf/rL57Gc/a2bNmhVq5MUFQ/x9991nhz/5z//8z3SjLaXwz33uc2bz5s22dE9NgVqehkgRonHAu4rXhXeXd7guextH0Swr7Qi0R5Dxt956y/z7v/+7HSvG3+9w+1I1iHT7AzCQndsPNBg+9dRTdkjsX/ziFyZVy7D7wR37v//7v3b0WHzJ/jWaEvTOwa33pz/9yQ7pjJuCHwn893//tx05l3keOAb33g9/+EOzadOmGm4itmkv0mB+QjQuEAfe3eg7nS0FEQYMFI3EtAfgkyfTGPhvfetb1pfLRCU//vGPrSH/13/9V7vPH4eIdg8MPYac+CVLllgx8I9FFMaMGWN+8IMf2LRvu+02M3v27PTAZEyus379enstGj1Z0hbSFLslMn8DY/tTo2KJ4Xcjd77wwgt2no1+/frZWhi9ejiebprRsZ/4O9WntCGEKD68u/Wt6edFGCiJTpkyxTbiMdkM7opOnTrZvubRRkJK8UxWQsk1m8ZjGqFp4Maovfjii/Y8GmlpfMbY08MDkWGQu+hAd3PmzLF5YxIizqP24GobTYnPfOYzGRtjEdBvf/vbtqrJj4bwox/9yPzf//1fk61BCSFyI+81BnzcuC9WrFhRo0cSJfvx48fbYxoyzPS2bdusCNDziZrF/PnzbU2B9oxdu3alq1Nch66tLVu2tNt0EWyKwlAb1CDuvfdes3v3bluicAERp2uxEELkRRgosdJXHWPDFJW4LuK+YfjoRz9qvvCFL8TG5QLzIw8cONB2f5w7d66tSSAONKIyHacTBvqlN/d5DmjMpwvxwYMHgz3VvP7667HDiNOVUgjRvCha4zP06NEjkZ5F//Vf/2V7KiFCNKzOnDnT9rT5zne+Y91LzV0MfPg+BJcd7TY0+POtyMc+9jHbDgSIKcNM4LLD9cY3KEKI5kVRhSEbcBH5vYvioO2Chm3aD/xjabtobrNi0aBOV14f9tHGA3wUiHhSi6MRnx5HuPlGjRpl2yVolL7pppts3Nq1a+3800KI5kXJCQMGi+6r+MGZbP/pp582gwYNqtPdRC+kGTNmmEsuucSWis8880zrzoq6TJo6tNl88YtfTDc+s41Lzx8yghrD17/+dfOTn/zELvnq2PVeoJcSHQfovUSvMdpthBDNi8SFAT9/u3btgq3M4Ot+4IEH7CfbPl/60pesK4jhCPiwDQPFB1kMgeFcQpyLQfN73tBWwbcKiEHfvn1tgzeNy66kTJtDtCTNPhcvhBCimkTHSmpONPWxkmiwp7b1/vvv204CQojGBV3Q6YVIQT1XWy7LL4QQIoSEQQghRAgJgxBCiBASBiGEECEkDKJZwtfxNKq7wHa27N271w7YSGC9PtAwyKyG9KJzI9+SFtsuTfaz7efR5dvl16VDDzyXr1zuJZpeEjC6sctzNJDPXOEc0vQhv0nm2eGep8tvPq7RGJAwiGYHhmbChAnBVjVsF9MIYNTJw5YtW4I9xn6BvmbNGrsfg0WPwSgYL7qI8/0OXa/p6h13XKlAj0fuJVv4W/HBpQ9/p+jfLwnIF99OMYufg+vUR8waOzWEoby83I46GunFKiLQnTMfz4ihKfhhNrfB/QoJX3rDvHnzrDFgCStXrkyX3qOldb9k7+OXMONKte782tJgSHQMEKP+EjDyDBnPtzv8FqZOnWqvEWdQo/kkRAUOw+bHZzJ0rqQfdy2/FpBtTck9Xxe4R+6HD1jBPR+XX3cvLn1fFHgG7GckYCcKLP1n6ucxeg+ss4/jmR/eHec/K/LlnjfHswT3e2lO1BAGRiBlRFIJQ2b4kI6hI+ozgX1dDBkyxA7rUd8JNkTd9OrVyy4xJBggDDGGgC+++eASQ8M6Y0U5WGefb9gx4hguV8LEkDijy9IZMAdpMIlSkjAxlZ9P4FsYZxR94+pgOyoO5NUZQu6HUQR8g+vigPtmmHv/WeRCz549g7XkiOaRe0BYo/fJs+L5OPxnxWRVffr0Mf3797fbLp/u99KcqCEM/GgYgA6VlHGqCdV7Jh3CgGea86AhIMxujgQ33aZIFl58DIArnVNyxLA4GCMKA3LLLbeYdevW2cA6bh3+/j6uVOyMknMFObFxwdVKMD5R+CKf8wcPHmwDxuzWW29Nn4PRxl1EPqPg+vCvw7EYRQQPw83X/eDy6dKMloLdvXJt8sB9MNquK7m7eNIgrzwfnlNtYEtcyZzAeeSPZ5MNHOc/A9xkTF3rnjVLxJq/CR+bumfn3yf37wsYf3fGAXN/U/esgGfpnrN7dr5QNCdqDDvKbF7MjMZYReecc46dr7m+swA1NRjCm4mA+CqZQfvyIQzAj51RT6+//no7DAjzMzd0aPL6QK2R6QGZQ7opwYuPqwZjgzgARob5O3A1OOPOGF1uyBb+Jg5nSDBEpAWZSsEYqajfOh/gEuF+fDDs3IufTydYUfx75V7cM+Bed+7caZ9TtGbCMdkaeQfPmRJ4ku0gzgXEGGluiBtq9Bh+J3AORixgVGfulXuO3hMgCq7GiMC4Z9eciG18ZkRNShR33HGHHUTtwgsvVEgFfJRueO/27dsHTyt5GACQqvwjjzxiSyyIdVx+8hkoJfFy9e7dO8hV08I11Pqly7gaQX2h5IpBoQRKcNdIGudXx5hzL1FxyCdxtR8f7pk8ueCegd+W4+OELFeSdE1FRSFX4WsypEqFQtQgVVOo2r9/f9WGDRuCPU2DlPGpeuCBB6quueaa9L1F961ataoqVVuuGj16dFWqlmiPefzxx+0+4thHnB/vzvnJT35it/3jgf1ssx+4Dtfjuly/tjTdOeDSYRk9x92Hu66/7fIVva6fHrhzXJruGu74bIjeu8PdT/Ta7v5cfC7PANw9xZ3nrhW9b3DpuHy6e/f3NWa4Z95h3uVcUXdV0axwLgTXOElpm9F4KSE6N4NzQ/htELhA2EdcLjg/e7YleXfNaM+i2nDnuPtwcK8jR46061yffLieTux3rqPaoGZF2qRL+qRByNRLyifaxsA2OLeVK+nzbP34ODgmek3uiZ5K5JF54P2/l0sr2/sEOga45+fn3W9/ai5IGESzA/82hsYHo0/7AkaEwDr7HPjp77vvvqyNDI3HnAO4A3/2s5/Z9HAxuTYKH4ybM+LZwjm0XzhIn+twPde4jKGMurG4d/ZnC9eIChtD4WM0c4Vru/YF8uCny/wf/jMHJ9I+PFf3bB3RPLpG5mzvExcSLi5RTY1ht4UADbstROOG2pWG3RZCCJEIEgYhhBAhJAxCCCFCSBiEEEKEkDAIIYQIIWEQQggRQsIghBAihIRBCCFECAmDEEKIEBIGIYQQISQMQgghQkgYhBBChJAwCCGECCFhEEIIEULDbotYmuKw2xs3bgzWhGj6YNrrO+y2hEHEovkYhGjcaD4GIYQQiSFhEEIIEULCIIQQIoSEQQghRAgJgxBCiBASBiGEECEkDEIIIUJIGIQQQoSQMAghhAghYRBCCBFCwiCEECKEhEEUlN27jVm3rjrs3BnsFEKUFBIGUTDeftuYV14x5p13qsOrrxrzP/8TRAohSgYJgygI1A4QhigbNhizZUuwIYSwrFq1yoZiIWEQBWHbtmAlhq1bg5UCsnr1ajucuAvDhg2zwxT7vPjii+bBBx80hw8fDvaEqSveh7RHjx5d4xrA+aRDnkqRJ554wgZRGBCEefPmmQULFphDhw4FewuLhEEUhOPHg5UYaovLBxi5SZMmmSVLllhDTWDfXXfdZY19towYMcJMmTLFtGnTJtjTNOG5EET+caLAb+qOO+4wbdu2DWIKi4RBFITOnYOVGLp0CVYKAKVywuzZs0MTELGOOLzwwguhUv3+/fvNxIkT0zULv1QfrTHs3bvXjBkzJn1sbaVsV2PBCCAuc+bMMTfddFNGYSJP1Gpc2n4Nh+uOHz/ePPvss+l48sF+cNeKBv9arLv90doT9+HfC+vu2BkzZthr+c8ler3oM3v44Yftc3Pxme65uREVhR49egQxhUfCIApCz57VIUrXrsace26wUQBWrFhhLrnkEtOpU6dgzwkwUgMHDjRvvfVWsMfY6vyVV15pDSU1DGoavqFzYIQnTJhgS9Ycu27dOrNjx45Yo8f5rsaCGGAkb7nlFmsUqIVEIT3SnTx5cjrtAQMGWKPsRKm8vNysXbvWxhF6ph424gfcL+e5MHXqVDN48GAbgDyuXLnSnkc81yE4YfHhWPJP4NgDBw6YZcuWBbHV94ZwuHju8fHHH7frjunTp5uRI0fafdwz2358c6SURAEkDKJgfPKTxlx0UbUYnHGGMRdcYMynPx1EFgCMKMa6V69ewZ6aELdp06Zgy1iDPWTIELuOcAwdOtSKSxSMIwaYALzgY8eONUuXLg0Z2A0bNlhRwPCSXjZw3MKFC0NpDxo0yK77YGyJc/Hca7T9AwNMrYg8II7kjTySV84Ddx++wQfSQkAQKSes1C769Olj14mfP39+KJ68X3/99Tb/Dp5pv3797DrxXVJVxjgRai6UmiiAhEEUFGoHiMHllxvzsY8FOyMcPXrUfPDBB+bYsWPBnuLRNaVizmACwhFncBETSuIYOheuuuoqW5J37Nq1y774GELicwXj6VxV1E5yhfMRJAy1uz771q9fb/Pq8k3gXqLQEIprza9tsc79APFbtmyxtSA/rfrktamwdetWM23atIyNyKUoCiBhECXF66+/bg0ovPHGG9ZoJQUvH4berxFEIa62GkVtYAApkfth5syZIUOKEaA07tw82eAEgfOcCybOcNcGQvboo4/aNKLuqs6dO4ca4l2Ic2tlA/cYTau5Nl47lxrusqg4lKoogIRBlAyIwqWXXmpfkFNOOcWun3HGGWZngp9IX3bZZfZljXNd8ALzsvbv3z/YY2rUDhCOaC0CMtUkfDDAiATul0WLFtl8ZAP5os2ANoD6GuvFixfb0vytt94a7KmG/JSVlcU+jyj0kOnQoUPoWNbd34d48sl1RDXDhw+3YkzNwReHUhYFkDCIkgC30VlnnRVsnQCB+POf/xxsNRxeUgIGEoPrcKVa380C9BaiURcw5Bh0DHsUGnIxiBhgBw21cd85kP64ceNsI202BhlI2xkV8pGLe4bjMUquXcGHbWohfl5YRnsaAUaMtgv/WNoO3g6+XCSetPzGZO6dZ9Ccex6NGjUqJA7Lly8vaVEACYMoCTB67dq1C7bCVFZWBmvJ4Hr4+H519mHwoiVyDDgNqhyD7zxTozEGFsPLi+/SpKEWoxitXQAN2q7nkDO4pE8eojgxI5Au+XnmmWfMmjVrrLGpCxrLMd7RdgR3Le7ZT58lz4NllOix7du3t6ViJzjs55m5a/Xt29feW31rOk0FXxwWLFhQ0qIAZVUpgnUh0hw/ftwcPHjQvP/++/YFzzfUGHDFYCyjUHKNM1LFhlIwrqXm6j8Hag4PPfSQ/Y6iEL+Txs7cuXNtDbQQokCtDVcsBa4WLXKrA6jGIEqC1q1b21oDvZF8cKGcd955wVZpUVsjdlMkzi1El1baHUq15FtqUHO45557Sv55qcYgYil0jcHB9TC4uI9atWplzjzzTFvqKSUoJePjp9EVd0xzKim7thjXrsA3CZncZaK4NKTGIGEQsRRLGIQQySBXkhBCiMSQMAghhAghYRBCCBFCwiCEECKEhEEIIUQICYMQQogQEgYhhBAhJAxCCCFCSBiEEEKEkDAIIYQIIWEQQggRQsIghBAihIRBCCFECAmDEEKIEBIG0axgNjiGEY+GuLmZ80GmeaBrgzkf3DScbrIc8sy8zC+//HLB8l5qMKz06NGj7bKpsWrVKhuKhYRBFJTnnnvOTJs2LdiKh7kgmAhm48aNwZ5kYXKZdevWWYNCYB2eeuopuyw1mBjHTR/KnMH79++3Ajdz5kxzyimn2P3NEcRx1qxZdtmUQBDmzZtn54ZmVsNiIGEQBYUJ8jHG7777brCnJtu3bzdHjx61kwQVAjcZv49fMo+rUVDyd3HDhg2rUWp1M7sRKNkz65sDwz5x4sR0vD9VJuszZsyw5xCHALgaA+tMso/BYA7sxx57zNx0001mzpw55s4777TXiNZI2EdanAvEP/zww6F7868Pft5dXtz5cfjHE9h21Ha96DN2wX9eLv8uzk+bZ+7XGMijO450ua5/fG1pEce81c8++2w63s9HoXCiwG+SeaHbtm0bxBQWCYMoGL/97W/NWWedZT7xiU+YV155JdhbE4Sha9eudh7obdu2BXvzBwaKGgoG3m1PmTLFigVGh0B+XI0CAzR//ny7JG7y5Mk2OCOC4duxY0e6VjJy5Ejz6KOPpo31gpRhv+2222wcRmD69Ol23fH888+bSZMm2X0IgIP1JUuWmOHDh9tr33vvvfZ8akBPPvmk6dSpU3Bk7XA98hR3ffJO2u7eDhw4YOd1zgTG1b9X0ps6dao935Hpehg/njPrBM4ZPHiwPZZ74XkyhSq1JeK5BteKChkQzzMjfdZJg+s4skmrvLzcTtRPHKFnz55m9uzZQWz+iYpCMeeFljCIgoGB6d+/v7n00kttjWHfvn1BzAkoTR87dsx06dLFTkuISCQNJey+ffumS4asY0ScYcc4wJAhQ+wSbr31VrN+/XprVKJgsHHrOGOGaGCY3DzII0aMsAbQbWPI+/XrZ9e5Pvfqrg0DBgzIq1HIdH2EixodxtOJDGLZp08fux4Hx/r3RnoYd5+67teBEeZZ8ryA3wvbThy5xtixY83SpUtrnP/WW2+ZoUOHpo/lelzXkW1a7u9GoGCAeDhBzyelJAogYRAFASHYs2ePGThwoDn77LPN+eefH1trwH2EILRs2dJ07tzZupTijEhDwGC4Eq4LlCYx6BiBLVu21BAPDArCABgdSpPsI84vHZNXplHPtvReSuDPRpj9vLOOIa8LSt7uOdVWw8iEq6kgwI5NmzbZ2of7GxBwpVGyj8KxvXr1CraqDT+1PEcuaRWaUhMFkDCIgvDaa6+ZCy+8MO0z/exnP2tLpz4VFRVm165dVhCAF+W0006zpbZ8Q8l48+bNtnEX4sRj4cKF1qCQL+cCQVDw88e1MzQHnCA415pzB+UC51BjwxUUFVSer/83ILjaWa4kmVa28Huis0WmRuRSFAWQMIi8Q03hD3/4g/n9739vG10JvCy4jGh3cCAKgEF+/fXXbeBcSnWFqM537NjRGglqA9QasukRgiuF/OL+wZ3B+WVlZYnXcgoBot2hQ4dQ3lnfuXNnsBXGuZ4wbPU1sKRPO8W4ceOswPhQA8jWlcOx1AocnOMXKHJJK0kQPQQI4Yv+nkpVFEDCIPIOBp7aAj9+P9x444325XAgDBgHfNp+wK2U71oDtYHevXtb4+ZcRX7DIy+466XirwOlQmobtJ9wPn5q55aC6PH5hHyvWbMmXfPBrZOtawcDhV8dQ+3yynOhYb42EFHgfmlkz/Z67njcT65dwYeaB2kvXrw42FNdQ/F7XTl49osWLbLPGmgnwh3oyCWtJKGjAPfH38MXh1IWBZAwiLyDMFx++eXW6PsBI8TLumHDBlsroAcM/mz65vuhW7du6dpEEkTbDwgIz+23327jeVnvu+8+a2RcPMYSHzWGnxfdBeLwVd999912HTBy+LfdNXCRxLlJkoD0eYY33HCDLZmSJxphyRNxBw8eDDXC1gV59++tffv21rjF5Z3nRAMuBo9juV+uzfVWrFgRHJUZjCUiFvX9O7cc1+S5ufQJ1FAw5lzbhzh6huHWYx1hphbi2h1ySStpRo0aZZ+nE4fly5eXtChAWRUtZUJE4CMzjAqNwbxE9QVRePPNN+0LEAcfvFVWVtpGaVwwcdei7YHG69NPP902TIvCQc3hoYcesn38G/I7KAaIOcIQVxspBnPnzk3XaAohCogr70u7du1Mixa51QFUYxB5ha6pmUQBcCfdfPPN5txzz81oeFq1amVdShKF/IJLhRI0LhYHbiHaHUqxVOsTdQthFHHX4GIqFVzNoZRrCg7VGEQsSdUYROMCg0qDumtXwC1UCHdLQ0EQ6Cnm2hUoSFBjKMXfLrWwfLgVozSkxiBhELFIGIRo3MiVJIQQIjEkDEIIIUJIGIQQQoSQMAghhAghYRBCCBFCwiCEECKEhEEIIUQICYMQQogQEgYhhBAhJAxCCCFCSBiEEEKE0FhJIpYkx0o6euB9c2D7m8GWsXMiH0/9O6lTX3NS+66m9UmtTcsWLYNYIUQSaKwkUbIc2b/VHPlgsylreVJ1aFG9bJEKh8s3m/27/2Q+/PBDc6zimBUMIUTxUY1BxJJEjeHYoT3mwPtrTZmpMKee9alg7wn2/N+K1DWOmKr2Z5lTTz3VnNQ6JRipko3/gyxL1SRantQhtWyRSif1r6wsiBFC1IaG3RaJk4QwbHvjKdPh/11q2nXunqolVM8L7FNV2dN8sH2T2b1xuTX4/Ks6XmUqqyqDI4xp1e4Mc+pHrzZt23WwwsH8z0KIupErSZQkxysOp6z/9pS532qqKlI1g4pDqXAwHcrMe6Z9p/amW59hpuv515gzPv5F07XPNaZ732ttaNvxLHNg/16z6U+bzL69+8zRY0eDlOsPUyv6M305orOX8VKNHj3aLplYhcn83bSMbhvBjEsrF+qakD6XCetrO5Y8Mz0n9yNKH6YBZV7oYiFhEPmDumjlh6bq2F5jjhw2B3e9b/Zv25oOH2x91xzc82dTeaQ8CPtMxeG9qZBaHtpjhaWq8rCpKP+jObDjTXNg98YGGeFcwOjPmjUrtraEce3Zs6dZt26dnTUsn7ObMV9xvq8hSgs3N/R7771nDh06FOwtLBIGkTdwC1VVVJrjh4+YI+X7zKF9R8zBvRXhsGePObDrf4OQEoCd75j971cHU7nfdOjQ1nT+yFFTuW+d2bdtrdm1e1eQen7xaww+lMpvuukmO4Vk37597QvMMcOGDbMiQnC1DgfHuDiOi6a5f/9+M3HixPQxrmYC0VqAn1b02ChMbcn11qxZYyZMmGAWLFhgrrrqqlrPEcUDEfje975n/z7du3e380K3bds2iC0sEgaRNyqOV6bEodIcSRm+nZvfMx26f9p0639z5nDhl033i28xPQekwiduNT0vuNL06nOJOeuSr5jWH+lu9uzZazZu2BikXhwowVPFZy5kagwY58mTJ9uAweelnj9/ftr4spw0aZJZsmSJjec45lT2xQGDfeWVV9p9HMfxccabfRh7lu7Yxx9/PJSWg+N27Nhhnn/+eTNgwAAzdepUM3z4cHsOE9KL0gJRmD59utm6dav9TRVTFEDCIPJLZYUpq6w0LcvoYfRe6r93awnrQ6GsYrsxR/amEtmQqn58YI4dPWL2f7i/Ot0G4Er7fsmbbTeRfENgkveZM2da40spH5EYN26cvQawf+jQoWbhwoV2GxCZIUOG2HWOI37FihV22+HSQlTcRPIce/3114fSAidM9913n1xQjQBfFPh9FFsUQMIg8odtYzhuTKrWUN3N9ECqBlFuqir3ZRUqj32Y0pXDqWQ+MFVVx0xlSmD43qGhuNI+JW0X2GZ/rmCkR44cad1LGGpK6g5e+C1bttj2CJ9evXoFa9V07do1ZMCJp7Tvt6ewTlruOi7gIvJB3B544AFrYJyAiOISV6NzREVh1KhRQUxxkTCI/IEwVCEMx1OrhBSpdYNxzyIcr6g0FSkxsKelTk6dWZLgXuLlx8WEywaDHW1nSAqu4QsagVqEY/DgweZXv/qVrTHEuaNEYcFNOG3aNLNq1apgzwlKVRRAwiDyDp/KVB5LGXg+mamsMObo0dpDRfXy+LFULSElDo0FXm4MNeKwcuVKW0uitkBJ32fTpk3BWjXR2gHx0VoE63FpReEYGi6pxVB7oZuqKB78JvjbIeh+91PE4JFHHilJUQAJg8gblVUVVhQIFVWVdmnF4XjK2NcWEIPU8nhKRI7jiqKq4UKJEf3GAQOPKAwaNMh07NjRGmhKhQgGcNyiRYtsbyEH7p+1a9fa9bh4wLhE0+Ja9FiKq53QZoFIzJ49O9gjikGPHj1smwF/P2oNiANiwN+RGkMpigJIGETesN1VnTHHF2SXGP6gVlBHqKqoMJWp41OpVJ9bguDHx5XjfP80YlPax70EvPj0RKKbKPH0OKIkz7qDxmkajNlHOhzvxztIi2NdWlwLAXLX8sEQjR071ooMYkM+e/fubc/Nl5tLxIM43H///bYmhzjQJRVR4G9diqIAGhJDxJLEkBh/fuPHpt1Jx1JVhwOmfO8HptM5Z5vWLcpM1eGDNt7+8ryfHwLg/xqPHDxkKlKC0r57D7Px7c1m9wcnmWMn96xRmm7KYMRxLfntCKJxghjQ3rBt2zYrCgMHDgxi8gM1S42VJBIlCWHYs3eP2b9lhTm06x2bHj81lgSgl5H/8/PjbCXB+2W+d6h7qhjczZx22mnmis9dEext+rheThKGpgHigMHu169fsCd/SBhE4mCgGyoMh48cNuV7dpjdO7eZXe/vMoePHrauIWfw7SLy80tvRX6VLVu3N6d27Gw6d+lszjvvvGBv04W2C7qi7ty5s4brSYhskDCIxElCGBABGkiZb6F8X7kdBC9dI8gRRlZt37696XBKB9Px1I7BXiFEJiQMInGSEAYgnYrKCnOU7qep9fr+3Phht27V2rRq3cq0atkq2CuEyISEQSROUsIghCgODRGG3I4WQgjR5JEwCCGECCFhEEIIEULCIIQQIoSEQQghRAgJgxBCiBASBiGEECEkDEIIIUJIGIQQQoTQl88ilkJ8+czkNEuWLLETlwDj1jNfQCFGnhSiqaMvn0Wj46WXXjLPPPOM2bNnj52AhsA6+4gTQhQPCYMoOAwpTU2BGa2Y2YpZrAhuliviNFexEMVDwiAKjpvf+OqrrzZt27a168A6+8AdI4QoPBIGUXCYxQp8UXC4fe6YfME8yLSduMB0ofhkfZhWk8n2mVMijrrifUh79OjRNa4BblJ/8iQEzJ0718ybNy/YKjwSBtHsYEY0JuXHZYWhJrCP6TNzmSifSfinTJliJ94XIikQBQoJ7733Xt4LSJmQMIiCMWvWLDNx4kRrkIGJ0dn2A/uAY9hOutTEC0eYPXt2qLcV64jDCy+8ECrV79+/3+bD1Sz8Un20xkC7yJgxY9LHuvma4yAdjuH+EJc5c+bYCeIzCRP7XbrR2g3XefbZZ21e4uIhm/PZT1izZo1Na8aMGfZ4d4+13R/pjR8/Pn2Of57IDkTge9/7nv1t0NZ2xx13xNaqC4GEQRQEDMe6detMp06d0oajrsCxq1atqmHkGsKKFStsDyjSjsI1Bw4caN56661gjzELFiwwV155pc0DYkVNwxcHh5ujmVqHu9cdO3bEGnrOdzUWxAADesstt1iRoBYShePnz59vl6Q9efJkG/wG+gceeMCMHDkyHe/yAeRh5cqVNk+Zzl+8eLEVy4ULF5qzzz7bbNmyxRw4cMAej3BhtOq6v/Xr16fPIa+kQbqibni+06dPt123+R0WUxRAwiAKCkaZH302gWOThNIrxqxXr17BnpoQt2nTpmDLWIM9ZMgQu84LO3ToUCsuUZYtW5budgu4l8aOHWuWLl0aMsAbNmywooBhJr36wDVmzpwZEjeMtrs234EMGDDAChzXJg/kxbm8XD7Js4PtqFhedtllwVp299e5c2db4wDS4lj/WYp4fFHgmfHbL6YogIRBiFro2rVrqA0B4UBcoi4SDODUqVOtsXeBj/XKy8uDI4zZtWuXfem7dOmSkyhg6Hv27GmNBufF1Vh8sSO/5Js8YbQpyZMXP2/kNReyuT8Rj6u5xREVBbptlwISBlFUeDFwqRBYzye+wcwEcbXVKGqDUjtGwA/Rkj3uIgwAbptsId+4c0iPa+B+imtHyAQleZ6vny9CnNuqNrK5PxEGVyTtZrhEo5SqKICEQRQVemDwpTOB9XyDe4QSt+/ecWDoeIH79+8f7DE1agcIR7QWAZlqEj4YaIwoRn3RokWxJf+6wMePf9+5ihy+2PkuM65XVlYWe7+5kM39iZpg8PmtUCDwO1IgBo888khJigJIGERR8Q1NIYwOLyHh1ltvtULgYB2je/3111s3iYPeQu5jOww5Bt350X0GDx5co7GVhtm4njmkP27cONurJxuDzXXpDeSOxZhs3rw5JGDky90P+SUv5AlhoFHavxZL0stFmHK5P3ECxv/CfYg4UOhAHPj7UVOgxlCKogASBlFUhg8fnvZZs14IEAAaf32/O/swnlH3CgacHkEcgwsnU6MxBphGZV54lyY9gTCc0doF0KBNuwEuJeIHDRpk0/e7gDqcmBFIl3zffffdoXxQg3B5Ix8E5+LhnvzzWXK/LLMl1/sTJ0Ac3HAviANdUhEF/t6lKAogYRBCCBFCw26LWJIedhs3B41wlHbdeEh1QbsDjaZUxZPIQ9LgSsG3T+m7mLhaRrHzIWqHWgLvwLZt22xtgW9m8gnvnIbdFqLA1Na7SYgofJtAIee2227Luyg0FAmDKCiUYlz31LqCa0wtNVzjbaaGaCEygTg0homo5EoSsSTtSqIaTaNbNr1wfIo9ZowQjZWGuJIkDCKWfEztiTjgX80FhEGiIETuSBhE4hRizmchRP5Q47MQQojEkDAIIYQIIWEQQggRQsIghBAihIRBCCFECAmDEEKIEBIGIYQQISQMQgghQugDNxFLPj9wY6KSZ555JuPwGIz9zzAYbj4BIUTu6AM30ahghjFEgeEuEB0/sI84N2uaEKLwSBhE0bjuuutszcAP7APGVRJCFAcJgxBCiBASBiGEKDGYG5pQLCQMolly+PBhO5E9E+7kOkdEXbi0o+0nhNWrVwdHVU8NynEcT0Ph6NGj7TIO/9iGUFc6SV0nXzQ0f5zH+fwt+Nu//PLLJXe/CMK8efPMggULiuZSlTCIZgmN2/v37zennnqqWbZsWbA3WXi5MfQusD1p0qS08R8xYoSZMmWKadOmjd0uBUoxT0lCjzj+7gj0zJkzzSmnnBLElAZOFHj+tLkVay4SCYNolqxYscJceeWVNqxcuTJUYqQGMX78ePPSSy/ZqTspXVKq3L59uy1lss3+TKX7THBe7969g63aS7/kwb/W22+/HcRUw7nEZcrLE088kY6P1oowjBMnTkzHk5bDzxPrM2bMSOcDY8o+0vbTd/vdNnG14Z8bPZ50Hn744XSpnsA+n9ryD+THxRFcLY3lVVddZUvil1xyiXnsscfspPxz5swxd955Z/oZZTofsslffYmKQo8ePYKYwiNhEM0ODMD69etN//79bdi8ebMtSfqUl5ebV155xTz//PPWMGzZssX89V//dbrEP3ToULNw4cLg6OzgPIQBY1Ib5G/ChAlm5MiR9hwM56uvvhrEVhuu+fPn2yXxkydPtsEZNgzVjh07zLp162w86Tz66KNpAcIwMiE9cRii6dOn2/U4uH93zxhTmDp1qrnsssvsPtYxrps2bbLbzNWNgcuUHvfi543rk4ZvfMmPu/e4/NWWf9LhGu7ZkJ/HH3/crpN/tocPH27j7733Xnv+LbfcYp588kn73Uxt5zvqyl99KCVRAAmDKDjZfKPQ0BetNnAddejQwb58GOmBAwfGGnlefl5UDAZGBTFwRh3DiIGrzTeNwXSlSgLbdZ0D7t4HDx5sl5w7btw4ux4HecMtQj4RB0TD5R2i7iEMoZuQnrS7dOmSFpUoAwYMqGGk/PMR1s985jO21gIce+aZZ2ZM76677grlheu7+3TUlb9M8TxX7p1ruI8jib/++uuzEvFsz8/l+WVDqYkCSBhEQcE9w7zPGDNeqijs69u3rzWOy5cvD/YmBy8/riPfcGLkKSHW9XL36tUrWMsOXnbuwwVKn2vWrKlTGKmd9OzZM+RfZtuBUWLbPUPy7uAeGMzAGbZC0LFjx5yvR62GvHMPSbXx0FDLs4sKMrWvbGjo+XFQE502bVrGRuRSFAWQMIiCgnGECy64IGQ0/TBo0CB7jDs2STDK+JT9l591jFO+GqEdXItaB+0bDQEjQqmbZ4XRIv/1afMoBk4QnCuMEK0xNJSoIBOoBWRLQ8/3cS4p3E1RcShVUQAJgygYvCCOWbNm2ZJUXCAOeJGivv+GglHGmPovPYF90UbofFFXzYPaACVX35CwHQcGC389Lp+33nrLltzLysoa5NrIF662hjF0rq8koYblnl19aOj5cdCeQa2I37EvDqUsCiBhEAXFldL94IiLS9JQYywpweE6ikKJO64ROkkQIAwCfvnacK4iV4PhPIyKg3vwexqRZ/JOuhhb3GSUyN2zix5fbJzhJX80iidVU8PIcu9+YzDXoAdRNj2HGnp+JkaNGhUSB1ykpSwKIGEQBQNDz4sQDY64OM5JCmeA4tLk5aTRNNeeRrUR9VXTVfLuu++u854wGPfdd5817hxLj6MbbrghiK1ubHYhLl0am7t27WrbathHryJCIdsd4uC+xo4da40j+SJ/uNZozG2oe83BM6GhnmfiroFrkmcSB8cgVDxfxCDX87PFFwd6VZWyKICG3Rax5HPY7Sj0SYdHHnnELoVoqsydO9e2cxVCFBA6DbsthBAlDjWHe+65p2RrCg4JgxBCFJBiu/SyQcIghBAihNoYRCyFbGNwPUDyfR0hmhNqYxCNGgRBoiBE6SBhEEIIEULCIIQQIoSEQQghRAgJgxBCiBASBiGEECEkDEIIIUJIGIQQQoSQMAghhAghYRBCCBFCQ2KIWAo5JEah2LhxY7AmRNMH017fITEkDCKWpigMQjQnNFaSEEKIxJAwCCGECCFhEEIIEULCIIQQIoSEQQghRAgJgxBCiBASBiGEECEkDEIIIUJIGIQQQoSQMIiCsnfvXvtFZjQIIUoHDYkhYsnXkBgvvfSSWbJkSbB1gkceeSRYE0IkAQUuDYkhGgWdOnWyQtOmTRu73b17d43FJESJIWEQBWXgwIHmjjvuMD169LDb1113nd0WQpQOEgaRd2hXWL58uXUhZWpPcC6muMC5pJEEq1evNg8++KA5fPhwsKcattn/4osvBntyg/saPXq02ktEk0DCIPLOtGnTzIIFC6zx37BhQ7A3DAJAfFzgXNIQQhQGCYPIK1u3brWlfdoScBnhSoqDuEyBc0mDtAoFJf/x48dbYaINhPDEE0/Y/cOGDbPbY8aMqVGTmTt3buh4H47lnLh4d70ZM2ak46M1m4acn+/0RdNCwiDyijMcbdu2tcaExuc4nLGJC5wLhTZC69evN++88441itRoFi1aZCZPnmxmz55t1q1bZ3r27GmWLVsWHG3Mrl27zIcffmjjCDt27EgbV4zuhAkTzF133WXTc/G+64rrHThwwMbj8tqyZYtZvHixjWvo+ZDv9EXTQcIgRAY6d+5sawdAY/mAAQPMyJEjrbjRq2rQoEFm06ZNNh44fuzYsTaOwLEYUIwuAnLJJZfYAMRz7NKlS208+NfjGhzr0m/o+ZDv9EXTQcIgRA5QS8hEx44drcF0sM5nQhhWDOjUqVNDNaGrrrrKlJeXB0fXTkPPr4t8py8aFxIGIQoErhrcMH6YOXNmSExqo6Hn10W+0xeNBwmDaFZg5Pbv328OHToU7KmGbXzmtdUI6mLfvn1ptwuwXlZWZq/Zq1cv67OvbztJQ8+vi3ynLxoXEgbRrKCtoEOHDrYB2cc1IuNCqS80Pi9cuNCuIwo0PLs2icGDB9dorKVhN9uePQ09vy7ynb5oXEgYRF6hERMwLrgm/BK1T9SF4QdnmFxaDYE0pkyZYtd9f/rKlSvNk08+2SC3Se/evU379u1teq4hd8SIETaOdCdNmmSmT58euiaGN5v7auj5dZHv9EXjQoPoiViSHETv4YcfTgsCDZpXX321/WANo893CqQ/ceJEG58JDNf9998fbAkh6oL3q76D6EkYRCxJCgOisHbtWuvHP/fcc216UWHgQ7JM8B1Dv379GlSaF6K5IWEQiZOvYbcdUWEQQiRLQ4RBbQyioKxatcqKwrZt2+z2Ao2DJETJIWEQBQW3EiUZ112U8Y/YFkKUDnIliVjy5UpCGOJ6JsmdJESyqI1BJE6+2xiEEPlFbQxCCCESQ8IghBAihIRBCCFECAmDEEKIEBIGIYQQISQMQgghQkgYhBBChJAwCCGECCFhEEIIEULCIIqGGzfJD3HDZQghCouGxBCx5GNIDGf8HcuXL68x9zJzL1x++eXB1olZ1oQQucG7prGSRKLkQxiYjGfJkiXBVna4Gd+EELkhYRCJkw9hyDSyam0wa1uSM7etXr3azJ8/v9a5jMnjhAkTzF133WUnyE9i7mNe0m9+85vmG9/4hmpAoiBIGETi5Gt0VSbqwThnA5PpDxw4MNhKhmyEIR9IGEShaYgwqPFZFJS4BudMoVgN0YgHxpswbNgwmxcHeRozZkw6/oknnghiqnnxxRczngtz585NxyNOhw8fDmJqT5t0xo8fb2bMmJHxfCGSQsIghAeiMGnSJNsWgjGePHmydSmxjhF+9NFHzciRI+32unXrzI4dO6wYuHOpjbB05xKcwO3atcu0b9/exnEMbqrFixfbOI5x7qu4tGH9+vXmwIEDsecLkSQSBiECMPwY9nHjxtkSOeDOGjp0qFm4cKHd9sEVNWXKFDNixIj0uYiGaxPh3JkzZ6a3O3fubGsRwD7iN23aZLeXLVtmtwlA2mPHjjVLly5NC0tt5wuRJBIGIQLoOkspvGfPnsGeanr16mWXGGsMPyX7qCsn07nZgoGfOnVq2k1EoEdWeXl5cIQQhUPCIEQOUErHlYOrac2aNaZv37412hnqC4JD2n7waxxCFAoJgxABfFxHiZ+Sv0+cu4YSPe6lefPmWX//kSNHYs/NFmoltCmoMVmUAhIGIQKcq2j69Om2tA4Y/UWLFlnfPkYb95HfILxixQpbi+jWrZs9l3YG1yZAGqNHj06nVRuDBw+u0ZjMddTzSBQDCYNodsyZM8e6gHx/vjPAGHl6EuHfZz89lHAVse4ahBEOdx6l/Ntvv92my7mIA0viSOPuu++263WBu4hr+Wkn8WGdEPVBH7iJWPL1gVsuw2JoOAwh6g81VX3gJoQQIhEkDKKgnHvuucFa3fTr1y9YE0IUErmSRCz5ciUBjbNr166tMeS2g95BiIK6aQpRfxriSpIwiFjyKQxCiPyjNgYhhBCJoRqDiEU1huQ4vm17sJZa37otWDux34+Hym01j4HoceCn54g7LmladO8WrJ2gRY/uwVo10WP87ZbdTxzr7w+tB+nFXUvUjVxJInEkDCfA0DoDbNcDw4sBd+vppXecyA9OKKLCwdIJjr+P49x2c0LCIBKnKQuDNe6BAa944027dEbexcmwN12iYtH6EwOapJBIGETiNEZhiBp8jL0z/DL2oj74QkGgRuLWW10yIDiqNJEwiMQpVWFwxt83/DL6opj4IuFqH6UgHBIGkTjFFAbf+B97Y016uzEbfwyFw/nGwe334/2GWYg7xuGn5Yg7Lmni/hb8jXyix/jb2TSwu/TirtWYQCD4mzjROOnaLwYx+UXCIBKnUMLAS1+xeo0VgFIt/acNs+dSAL+h0z/GLoNtkTzu9xEVDpaZOgS49VLCCcTJw76YFo8kkTCIxMmHMPByOhE4+rNfFO1l9Y14q09cbNd937GMe9PG/Q7delRMXFwxcAKBWDS0ZiFhEImThDC4l+zIwl/YpXv58okz7Bj8qLGXoRe54gsF6xRqoFC/Z0Ag6iMUEgaROPUVBvciHfrB0+kXKkmihp9ltkZ/48aNwZoQydFi5y7T8g/r7HqrXy+zS7bZnzTHPjfYVFwx2C7rAtMuYRCJkqswIAgHJv+LdRElAYaeElKuxl+IUsO9E9Sc/RpIQ+H9aPs3X83Y+0k1BpE42QpDQwXBrwFQXZYAiOaAEwjX664hBSoEov2kr9d4byQMInGyEYbDTz1tRSEXXE1AIiBETRAIahZuPRcQhza3fzXYkjCIPFCXMCAICENd+EJQ7A9+hGhsOKHIViQQBgQCJAwiceoSht1nnhes1cSJQdvbx6pGIERCIA64nuoqkHX63av2vWuIMOR2tBApMjWe8WPs8P3H7Q8zzucphKg/ri3h9M3v2vcsE9Ev0OuDagwiFr/GUGOKzf95yxz/q78ONk7Q4ve/C9aEEIXg+IWfDNZO0OK/fmjMRf3tFLqqMYjikvohCiEKTJ7eOwmDEEKIEBIGIYQQISQMoqj86U9/CgUhRPGRMIii8c4775iZM2eGgsRBiOIjYRBFY/v2mqNTShiEKD4SBlEwqCEcPnw42DJmmzeLl6O8vDxYM/bYP/7xj8GWEKJQ6DsGEUvO3zFc1L+6/3QGXnvtNbNo0SLTtm1bc/7559shsPft2xfEhunYsaM555xzrJAcOnTIjBgxwgwYoOE0hIhi38PU++ij7xhEo4CS/yuvvGLXMfRr1qzJKApAHMdwLPzyl78M1TQawptvvmlFJi5861vfMkeOHLHX/7u/+zt7bEMhDZduNvz85z9PH++vC1FIJAwi7/z6179OG/k4qCEQMsG5pJEUN954o63BID5+eOCBB8zJJ59s8/If//Ef5uKLq6f9FKK5IWEQeSfTzGlt2rQxd955p7nnnntsGDNmjN0XR1I1hmyI1himT59ufvSjH9l9rnbh1yZoML/55pvTcZT0gWO++tWvmueee87ce++96VoS+92x0bQywTX+9m//NtQ4T74IwP5//ud/tvl06UZrG/51ifvud7+bPh/cfbtj/Lhs0hdNBwmDyDtf+9rXzKc+9alg6wQIQbduJwbaO/vss82Xv/zlYOsEnPulL30p2CoOP/3pT80//uM/2poFBvGpp56yhpTwne98xxpN4l5++WWzcOFCa4SpcTz99NO2hvLYY4/Zmgj7OZfjOH7+/PnWAPsGv74wmuaBAwfS+di6dav51a9+ZeNI/9vf/rbND/HDhg0zs2bNsnHAfVBjuv322208NaqdO3emRQ5qS180LSQMoiAMHTrUGn4HRtIXBQfH+G4ltjk3SSjBIzau5OuCbwSjfP7zn0/nv2/fvnY+XVcD8KnNDUXpGtHA+Lp7JM1rr73WtqM0lNNPP9184QtfsOukf9FFF5ktW7bY7XXr1tl7cPnq06ePFSzHihUr7PEuHpfaV77yFfPqq6+m77O29EXTQsIgmh2Z2hiuueaa4IjswUBS+sZlhLj47pcotJVQynbHukBJPd9gwHv27BlsVRv+Ll26BFvV8d///vdD+Ro5cqT54IMPgiNEc0LCIAoCXVV9dwml0Dj3Cfv8kjjbnFvKICgIC24aZ1xrq304d44fxo0bF8QWD1x+0XxR+3G1G9F8kDCIvIOxpIQe5cc//nFIHFhnXxTOffbZZ4Ot0gU3DMaUNgiW0YZZvuHo0aOHrTUUGmoLvtuHvNGG4CCebTUmC5AwiLzDx2px4FphfCR6xxBYz9SttcZHdiUCtRu/BxOGFVGg1oC7xodt1+jrBJHjEZLaahhAqb2srMy2FQDn59LwS7sIx7t8vv3227atxXHZZZfVaEwmT+p51DyRMIi8c8UVV2TshgoYV999FIVzSSMpMjU+0+XUr8FkAwabxmTXbkC6+O5dewWNyxjc2267zaZNrWL06NHWf++OZ1lX+4a7Du0RHE+30VGjRgWxdUM+6Dnl8kkjOPlw7Q6kT68rRIt4AgL3D//wDzUETjR9NCSGiCVfQ2Jg5BkSAyOZSQwwUhgyN7aShsTIDzSUIwz1aXQXpYGGxBCNGkrGfKPAh2x8k8Dy4x//eBB7Avb5x3CORKHhRN1CCDNuJVxMQkSRMIiCQU3Bdyl17949WDuBv8/VLkTD4RsGcK6riRMnmn/6p39Kf5shhI+EQRSNTB+4ieShnYD2CdoNCPT+0rMWmZAwiKJBbYBhMfwgYyVE8ZEwiKKCEPhBCFF8JAxCCCFCSBiEEEKEkDCIZIj0pRZCFIA8vXf6wE3E4n/g9tGPfjTYW03F6jWm/EvxX912+P7j5qRrvxhsCSHywdGf/cIcmPwv5vi27cGeE5z6k7mm1SUD7PwZ+sBNFIwWPWp+f+DY/7W7ze4zz7M/Wn68QohkQAR4r/Z+8jP2PYsTBUAUGoqEQeRMi+7dTJvbvxpsxXP4qafTIsFSIiFE7lA7d2JA4L3KJAhQ13uZLXIliVhqcyU5+JHyo80F52Y6edgX5XISwgODf3zrNnNk4S9sQao2AYij/aSvh4ShIa4kCYOIJRthAFe9bUiNAIGgFtL6EwNsNZh1IZoyvghUvPGmXc9VCBy8P4hC9L2RMIjEQRiY+H3Xrl0Z51Pwocp76AdPJ+YycgJBzQJUuxCNEScAGP/KbdvqVRPIRCZBcGzcuNF07tzZtG/fXsIgkgFhYNKc3bt3mzPPPNNOEpMt/PhddThpeAlc45oTDdUyRDGJGv+G1gBqg99627/5ap2/ecz65s2bzemnn25nDpQwiETgZ3H06FFTXl5uWrZsaU477bScxMGRT5GIwxcOXFPu5ZF4iPrgjL5dpkK+DX8U93umEJTtb5h3d8+ePaaystKceuqp5qSTTsr53ZUwiFj4WVBrYKIcXEos2SY0hNYvLzOtX3nVlL2/07Ra+3awt/BU9Otjqs7oYtePd+lsqrp0sUuovKBvel00LVrs3FW9TP3++A2yXRbMfd0y9XtkP7jjCg2/u2OfG2wq+/ap1++QmgGBIetxIbFkW8IgEsOJQ0VFhQ2s16fWUBtV23eYqjd/byoXv2S3jy+qXpYSZd26GkNw68GyrGsqRPZHjxPJw2/GEiztb8it74js844pJezvIxVaXHyhaXHRhaYstUziN8M7ixC0atXKhvqIAkgYRK34P49C/lSOLVxkq+rH3lhjX2oatxszzgXgfxzoGwLfRdDSm6wo6jqIGo+4jw2zcTc0lDg3Cu6VKM4gR4/HJeNwcb7x9tMqhMsmX/C34G/E3w3XZssBF9ntfP6NfCGob0FOwiAaFQgEhoKAaPj7hCgGzvi3+sTFVtRZ5tv45xsJg2hS+MJBqdStF6qxUDQtnNEH3/BDYzf+tSFhEM2OqFCwdLUPiUjTxxl7u0wF57prDgY/WyQMQtRBnJCAq5FAehn4xt22SB5ntF1JPr3tGXnW/ePcusgOCYMQBSAqHOCLh78e1zDrqLHtpeeIHpMP4gytM9Q+/nH+ut/ADmkj7h/vpRd3PZE/JAxCCCFCaNhtIYQQISQMQgghQkgYhBBChJAwCCGECCFhEEIIEULCIIQQwsOY/w9QwFkvJPmCpQAAAABJRU5ErkJggg==[/img][br]Wähle "Skripting" - "Bei 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[/img][br][quote][u]CODE zum Kopieren:[/u][br][color=#6557d2][b]ggbApplet.evalCommand("c=RandomBetween(-6,6)*0.5");[br]ggbApplet.evalCommand("m=RandomBetween(-8,8)*0.5");[/b][/color][/quote]Vergiss nicht auf [b]JavaScript[/b] umzustellen!

[icon]/images/ggb/toolbar/mode_viewinfrontof.png[/icon] [b][u]Den Code verstehen:[/u][/b][br]Nicht für jede Anwendung in GeoGebra steht ein eigener JavaScript-Befehl zur Verfügung.[br]GeoGebra Skript hingegen hat für jede Anwendung einen passenden Befehl.[br]Will man die Vorzüge von JavaScript nutzen und trotzdem die gewohnten GeoGebra Skript Befehle verwenden, so ist die Funktion [b][color=#6557d2]evalCommand()[/color][/b] die Lösung für dieses Problem. [br][br][b][color=#6557d2]ggbApplet.evalCommand("...")[/color][/b] wertet die angegebene Zeichenkette im aktuellen Applet so aus, wie sie bei der Eingabe in die Eingabeleiste von GeoGebra ausgewertet werden würde. [br]Mehrere Befehle könnte man auch auf einmal übergeben, indem man sie mit [b][color=#6557d2]\n[/color][/b] trennt.[br][br]So könnte der Befehl von oben auch lauten:[br][b][color=#6557d2]ggbApplet.evalCommand("c=RandomBetween(-6,6)*0.5 \n m=RandomBetween(-8,8)*0.5");[/color][br][/b][br][u]ACHTUNG:[/u] Es müssen englische Befehlsnamen von GeoGebra Skript verwendet werden.[br][br]Die typischsten Befehle finden sich unter: [url=https://wiki.geogebra.org/de/Skripting_(Befehle)]https://wiki.geogebra.org/de/Skripting_(Befehle)[/url] oder über die Suchfunktion auf dieser Seite.[br][br][u]TIPP:[/u][br]Sobald man einen passenden deutschen Befehl gefunden hat, kann man auf der GeoGebra-Seite unten rechts die Sprache auf Englisch stellen und erhält den entsprechenden Befehl für evalCommand("...").[br][center][img]data:image/png;base64,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[/img][/center]

[b][u]Anmerkung:[/u][/b][br]Hat man die beiden Variablen m und c bereits in der GeoGebra-Umgebung als Zufallszahlen definiert, so bewirkt der Befehl [b][color=#6557d2]ggbApplet.evalCommand("UpdateConstruction( )");[/color][/b] dasselbe wie der deutschsprachige GeoGebra-Befehl "[b]AktualisiereKonstruktion()[/b]" - die Zufallszahlen werden neu geladen.