Herleitung der Formel (Prozentanteil)

In einer Schule sind 700 Kinder. Berechne, wie viele Kinder dieser Schule vermutlich mit der linken Hand schreiben.
Ungefähr 1 % der Menschen weltweit können sowohl mit ihrer linken als auch mit ihrer rechten Hand schreiben. [br]Berechne, wie viele Kinder das in einer Schule mit 300 Lernenden vermutlich sind.
Mit welchen Formeln lässt sich der Prozentanteil berechnen?
Leite anhand des folgenden Beispiels die Formel zur Berechnung des Grundwerts her.[br]Verwende dazu die angegebenen Variablen.[br][br][i]280 sind 35 % des Grundwerts G. Berechne G. [/i][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAcUAAACrCAYAAAAXSIcaAAAAAXNSR0IArs4c6QAAAIRlWElmTU0AKgAAAAgABQESAAMAAAABAAEAAAEaAAUAAAABAAAASgEbAAUAAAABAAAAUgEoAAMAAAABAAIAAIdpAAQAAAABAAAAWgAAAAAAAABIAAAAAQAAAEgAAAABAAOgAQADAAAAAQABAACgAgAEAAAAAQAAAcWgAwAEAAAAAQAAAKsAAAAASx9I+AAAAAlwSFlzAAALEwAACxMBAJqcGAAAQABJREFUeAHtXQdgFEUXfql0CF16770qglRBKUrvXQQpShcFpKl0RKRKR5qC9KZIL9Kr9I4gvfckJNn/fQN7/+Vyl7uEu8uVN3rc7e7s7Mw3m/nmlXnjo3EiSYKAICAICAKCgCBAvoKBICAICAKCgCAgCLxCQEhR3gRBQBAQBAQBQeA1AkKK8ioIAoKAICAICAKvERBSlFdBEBAEBAFBQBB4jYCQorwKgoAgIAgIAoLAawSEFOVVEAQEAUFAEBAEXiMgpCivgiAgCAgCgoAg8BoBIUV5FQQBQUAQEAQEgdcICCnKqyAICAKCgCAgCLxGQEhRXgVBQBAQBAQBQeA1AkKK8ioIAoKAICAICAKvERBSlFdBEBAEBAFBQBB4jYCQorwKgoAgIAgIAoLAawSEFOVVEAQEAUFAEBAEXiPgL0jYjsD69evp9OnT5OsrcwnbUfOMnH5+fnT27FnKlCkTBQYGekajpBUxQgC77LVq1YqCgoJidJ9kdi8EfGQ/Rds77K233qJcuXJR/vz5bb9JcnoEAiDFefPmUdWqVSl16tQe0SZphO0IhIeH05w5c2jhwoXUqFEj22+UnG6HgEiKMegySIgdO3ak5s2bx+AuyeopCOzYsYNGjhypJkae0iZph20IgBT37dtHPj4+tt0gudwWAdEDxrDrwsLCYniHZPcUBCIiIujZs2ee0hxpRwwQwN89iFGS5yMgpOj5fSwtFAQEAUFAELARASFFG4GSbIKAICAICAKej4CQouf3sbRQEBAEBAFBwEYEhBRtBEqyCQKCgCAgCHg+AkKKnt/H0kJBQBAQBAQBGxEQUrQRKMkmCAgCgoAg4PkICCl6fh9LCwUBQUAQEARsREBI0UagJJsgIAgIAoKA5yMgpOgGfXz+/Hn64Ycf6Pjx425QW6miICAICALui4CQoov33bJlyyhPnjyKFAsVKkR79uxx8RrbVj1Eh3n58qVtmS3kQpQRBGn21hQaGuoy7Uc/oD4xSdu2baP58+fH5BbJKwg4HAEhRYdDHPsHPHjwgD755BP666+/6Pr16/TFF19Qjx49CITi7gmDYffu3d+oGZ9++qnC5Y0KcdOb//vvP6pcuTKtXbvWJVpw+/ZtqlWrVozqsm7dOrXrTIxuksyCgIMREFJ0MMCxKf7cuXO0adMmmjlzJr3zzjtUsWJFVUynTp0I1x4+fGhzsZjB2xKvFbP8sWPHUqlSpahr1642lx/bjJs3b6a0adPG9nZ68eIFLV26lAICAmJdhrveCDV6kSJF6MyZM6rPnBGTE88ICQmxOCF7/vw57d692+J1c1hjcpcoUSJzl+ScIBBnCAgpxhn0lh+M3RgGDx6sVKUFCxYkbFuElDFjRsLgExwcrI6tqQ5xfeDAgVShQgX68ccf1T3m/tHzgYSbNWtGEyZMoKNHj5rLSkeOHKG5c+fSypUrVV3MZrLhJAbY5MmT25CT6PDhw1Hqg70tM2TIQEmSJLGpDE/KBI3B/fv3aefOncrOfO/ePYvNwyQK5Gmcrl69SsOGDaOePXsS3jVrCSr7Dz74gPAu9u7d2yzx6btHWHsnjZ+Frdgg8UoSBFwJASFFV+qN13UBMWGwuHjxIqVMmdJQQ11tqg9A+IZUly1bNipdujQNGTIkko0JxDpx4kTq0qULDRo0iPr162coy/gHyvH396fixYurbbGwRVbSpEmNsygCrFGjBhUrVkypcBs2bKh+G9uRrly5Yng+BsfoBkg80xYJB2VMmTKFihYtSnXr1jUMyL/88guVLFmSEiRIEKmenn5w8+ZN2rp1K3344YfK1ly2bFmaPXu2odnY3giqdqQbN25Q7ty5VT8ZawvGjBlDP//8syLL8uXLq0mOoQCTH3hWmTJllMYCmGNyBaI1TXh/0J/G7wPyRPcOpEuXTr3jpmXJsSAQlwgIKcYl+haejQEmVapUyt5irB48ffq0kowSJkxI165do/fff18Nbn369CGQ1NOnTw0lQj357bff0ooVK5T0B9vT+PHj6datW4Y8xj9AqDNmzCA4P6RJk0YRrfH1vn370uPHj+nSpUsEyQTqS0iwGDSRYFMCcT158kQNjC1atFD2UEvEhzZgJ/tDhw6pMo0HbVXg639AntOmTaPLly+r9oCwISlv3LiRateubZzVK34vX75ctbNp06bq++OPP46kBZg8eTItWrRIXWvfvj1Vq1aNMmXKpN4DHSD09YULF5Q9Ehsn4z1Bf5qmR48eqfcKE6vvv/9e7SeIPOgL04T3FH2D/kcCGYJAYWe09M6lT59evcemZcmxIBCnCPDLK8lGBHhmq/Hu2zbmjn02JhKtSZMmcKvUWNozFMQqLI0HGXXMKjAtWbJkGtsADdeNf7B6TGN1q8aDlOF0ihQptH/++cdwbO7HRx99pPFgFukSk5DGBKixGtNwnglaY/LWWKJV55jgNB7kNN5vUGM1rMaqMY13qNdY2jXco/9A+3LkyKHxIKraiHaibThvS9q7d6+6z7htttz3pnny588fCYM3LS+m9/PEQWMJUWPpWONJkbqdJUeNJw4aT07U8XfffaexZkDjiYsWP358jScxWp06dTTeHNvs45AvKChIY3VslOs8EdJYOjecZ3W1ejarbw3n9B+4nydyhveLiVDjyZXGHtMak7CeLdI3q+g1titHOueqB/gbQP8vXrzYVaso9bITAiIpxumUxPzDMePGMgykP//8k2bNmkWdO3em/fv3K3sfzkO9CWnSVM2Ja0jYDBdlGKsXIY3p9slXuV79C+kPEkalSpVo+/bt1Lp1a+PLdPLkSeIBVt177NgxZY8qUKAAQQ0Hux4Syoa0gGUW8JBFvZm0CSpV08TvrlKDtmzZUkkUkBjxfLTblrRlyxaqUqUKJU6c2JbsHpEHmEF1incAKk/0K3BDP8M5Cu8IEvr8wIEDhLWtUKtnzZqVcubMabDJopzRo0crtSr6DupV4AiJ3DjB5ou1sbAhIkEtC+0ET9IIXqOmCe8HysG7hAStRL169VR+2D511b/xfbAHQxqFnVySIOAqCNg2CrlKbb2oHnnz5lUDFexDcICBahRehxjkkKB+hKOKJSLBYAdVlj4YwWMVakdz3n7wcIXzDMqDnc7UeQUDJgbfEiVKKK9HqGJBjt26dVN1wT8oF3UBIebLl0/lw+CNQdw0gZgx2PKsm7DsJFeuXJQ9e3bTbBaP4eTjDA9ZixVw8gVMAFiaU44uUF3DyQieu8CZJW7VF6tWrVL9DSxBlvDM1dXLeBd0OyD6Eqpt5Mf71K5dO0Wepn0O4osXL55SiYNIp06dSqxFIKhroXpFvxknkDQmaVCHI4EUkR8qdTj6oAzTBHs5JnUs+ZtekmNBIM4QEFKMM+ijfzAGPCTM5v/++29FWnBM0BPsjrAV6TYc/bz+Xb9+fWWThNSAtHDhQoINx9wyCDj0wMMQdsF3331XOd3o5eAbQQMgCYDEYFdEffT66fkwwEJKgNPHyJEj1WkMoLhHT6grjjHIg/QhjQwYMMDsgKnfY/oNcobkWrFiRdNLHnsMRynYezFxAG4nTpxQxAdbHaQsfGA7xEQBEjwmKJMmTVKOUwAF6xnv3r1LBw8eVLZDECzKwSTot99+I1avGjQId+7cUTjCyzhz5sxq8gXvX/QbHJ6yZMlCgYGBZoNIYHIFWzaIETZKSLAoA32GCZlxQt+DEDEJi84z2vge+S0IOAUBnsFJshEBZ9kUUR3YMFgaVHZBHvTM1vDrr7/WeNAxew0neYG8xgOYVrhwYWWD49m+xby4ABsUO+ZorALVeKavvvUbxo0bp7GUqrG6Sz9l+GZCVc/hF1ZjFazhPA/Eyq7E0ojG6l+NJQNld2QpRuNBU2N1m8bErjHRGu6x9oM9ILW3335bYy9Ha1ntfj2ubYrAi51ezLaL1dQaS3Yaexlr/fv3V/3NEqUhL+yMsAHDzgcbI2sQ1DUmUWUr4zWwGnsfq/tgZ1yyZIn6zSpQ1bfTp083lMVeyBo+6EPjxJMlVQfYw9kbWl2CnRjvxDfffKOOWQ2r7JRMhuqYnXaUvRo2ZSZdbcGCBYa6GZcd17/FphjXPeC852OWLslGBJxJiqgSBi84rFgixdWrVytSsXQdZcCxBuQJIrKW4CiBvKxuU4OeMfGAKBs1aqSx3VDr0KGDGrxYjarxOkhFpry2UeOAAxoGZ+MEwoQzEEt2GgjNOMEZCOXBKcPWxCpcjZeWWMyuD/YWM7zBhbgkRVafayylaay6tNgCliA1lr40TH5YdW3Iq2MCR6k1a9YYnKNQEKvVNY4MpLEns8ZezBrK0BPKYWlfQz8bJ/QX3hFMuNq2bWt8SWMtgCJTliwN53ft2qWcrkDacOphqTaSwxKctUCkbANV5Ub3PhsKdfIPIUUnAx6HjxNSjAH4zibFf//9Vxs6dKgGr0NzCaQV3SBp7p7ozsGDEdICO1MoSdU0L2b9rBrT4OEIL9hy5copr0ZW0ZpmtekY5bGazmL7TAthu5gacFEHcwkki8Ea3qmOSHFJimgPCMxaYhW4xvY+h0tbIC70B9u8I1UJUj8v64niSQwv2VOnTmmsno2U3/gA77mtHsjG9znjt5CiM1B2jWf4O0VHKw+JFQKwx1hacI8C4e0ZEwcVa5VA5BvYnSwlONJg8T4+9kgoD+HKbE2weWJtpqXnw9aF9Xu6566t5bpLPnjzWku8DMZaFrtch2MNvFpNExx24GBlmmDLNmfPNs5nzjPa+Lr8FgScgYCQojNQlmfYBQE4AW3YsMFiWb169bJ4TS4IAoKAIGALAuJ9agtKkkcQEAQEAUHAKxAQUvSKbpZGCgKCgCAgCNiCgJCiLShJHkFAEBAEBAGvQEBI0Su6WRopCAgCgoAgYAsCQoq2oCR5BAFBQBAQBLwCASFFr+hmaaQgIAgIAoKALQgIKdqCkuQRBAQBQUAQ8AoEZJ1iDLoZOwwg0DF2nJDkXQggIDrH21BBzKX/vavv0VpsiabvOON9rfeuFvsgsI53NTn2rUX0mBs3bqgdI2JfitzpjghgQoQdQhImSmjYUcId2yF1jiUCPEpiMoTdQho2bBjLQuQ2d0BAJMUY9BLHGiUOmky8Q0AM7pKsnoAA9hasX68+DfxyEOXKmYsitAhPaJa0wRYEIDbwHszNP2lmS27J4+YICCnGoAOhPkG8R966KAZ3SVZPQSBhwgSUL38+KlqkKHHgak9plrTDFgSYFBPyPpWSPB8BIcUY9rHYFWIImAdl5x0IiXdyUB8hRQ/qWFubIpYmW5Fy63ziferW3SeVFwQEAUFAELAnAkKK9kRTyhIEBAFBQBBwawSEFN26+6TygoAgIAgIAvZEQEjRnmhKWYKAICAICAJujYCQolt3n1ReEBAEBAFBwJ4ICCnaE00pSxAQBAQBQcCtERBSdOvuk8oLAoKAICAI2BMBIUV7oillCQIuiIC/vz/hI0kQEASsIyB/KdYx8sgcjx49ohMnTtChQ4fo4sWLKth1hw4dKF++fJHai2AFx44do//++8+waB3nEDIXC9iTJElCNWvWjHSPHDgeAZAcAgmcP3+efH19KVeuXFGi7AQGBtLNmzdp8+bNpPF/NarXoKCgIBXc2rSGKAP59eAEAQEBKgsCYTsr+QX4qXBq4aESLchZmMtzoiIgpBgVE48/069fP5o6daoaHKtVq0YlS5ZUg2u5cuXo3r17kdq/bNkyatWqlRp0Ef/Tz89PDcIYRJEyZswopBgJMccfIDj5hfMXqGGThnTj5g0KjQilJfOXUPkK5dVkBTUAaR4+eJiqflyVShUuRS/DXtLEyRNp0cJFlD59+kg7PqAvnz59SnPmzCH0N8rMlj0bjRk1hooWLUrBwcEOb1RAggA6ufYMPbr+mMq05/o+ZzLm0GqSBAFnIyCk6GzE4/h5H330EZ08eZKmTJlCjRo1MtTm559/pvXr1xuO9R/Tp0+nmTNnUtOmTfVT8h3HCECaq1W/FlWvWp3GjxtP9erWoy1bt1CFihUUKSIaGbY4a9KqCX3e/nMa/sMwolCiJs2aUu6iuen6+euUOHFiQytAoAh2vv/YPvqq21eUO08e2rJ5C5WtUpb+XPknvV367UgkarjRTj98fH3oweUHtKz7GvJlwk+ZPTnlqpSDwkLC7PQEKUYQsB0BIUXbsfKInOPGjaM0adIotafeoLVr11LXrl1p69at+inD961btyhDhgyGY/kRtwhASgwJCaE2zdrQN/2/If9AP3ry9AklSJDAUDE/P186ePAoBfgE0Pfff09P7z9T0n3O7DmpdKHSlDp1akWa+g0g2fuP71Ovz3vTwEGDlBq2WbNmVKlKJfrkk0/o1MlTr8nWwi5zryU6H4h2rEBAHXEKKvaIcAv36A/nb+Q/tpKfEaFRvlp5aP2QzZS9XFajHPJTEHAeAuJo4zysXeJJOXLkMBAipInhw4fTxx9/TDNmzKB33303Sh2xXRYGXOwlt337dpo2bRrNnz+f7ty5EyWvnHA8AiCaRLxbw8CBA+lF8Au6deM27Tm4h8qWLWtQncI2eOLkCSr1dinyi++rSAdEOmvBLBo2dJghn17bmzdu0vkr56ndJ+0I/Y0P1KkN6jeg5GmC1LthTLr6fRoT3rO7z+nprWf0+NoTunfpPt08douuHrxOVw5co1un76pn6/ktfWvhEXR+6yUq3qQwfTCosirzv8PXLWWX84KAQxEQSdGh8Lpu4XCw6dixo1KjwVkjW7ZsZiuLWfyYMWNo27ZtSsKE/REbLbdv355WrlxJsElKci4CIMZnz15Jf6tXr6Y0qdJQhfIVlN0QNQGpFS9WnAYMGUAtm7aiQSz9zZ49i4oVKkYVK1ak58+fR6rw9RvXKVXCVJQxU0aDEw76HY5Ujes2UepzvCvGyY8l1Mu7r9KKHmspXpJA8mXp1D8ee7nyxy/AVxFv/GTxqf6Ej1hkNL4z6u9nD17QfVafNvy5NiXLkJQK1y9AJ9acocwlMlJ4mDjdREVMzjgSASFFR6LromWD1CpVqqQGR5Bct27dqFSpUsrGCC9G3YkG1cfekbA1zps3j6pWrWpo0cKFC6lly5Z07do1cfc3oOK8HyBGSIRT50yl7wZ/R4HxAg2kCO/gYsWK0d9b/qbefXpTocKFKIL/mztrriJM41qC/O7evUtp30pL8RIERrmeIkUKRcCmW2XBQzTL2xmpx75OBJsgyuEvIr9Xv/EMqEODH4cYPy7K74CEAXRuyXFKmj4JE2ISlb9ky6L0e8eV4mgTBS054QwEhBSdgbKLPSNlypS0ZMkSpRKFmgyD4pkzZ+idd95RxAf1KAZcJKhL4XGKQc84web0ww8/0Jo1a6hOnTrGl+S3ExBImDAhbdq0ie7fvU8NGjRQxGX8WNgJ4UG6ZvUaervs25Q2VVrqP6A/zZ4/m2ZOmUlJkyVV2dGvkByTJUsWhYRwDUt34JQDZxzT5Rl+/r60feIeunfhniJGY4kQwmH8pPGoar+KihyN66Z+cwa/eOzJzBLm4UXHKGeFrPTyRRiFMIkmSZ1ITcz+3XuVspXJTC/F4SYKfHLCcQgIKToOW5ctGYRnLPXpFYVdsUiRIrR06VKDtykGQ3MJkkr+/Plp3759QormAHLwOZBe5887U+eOnaN90rbt2+j61eu0a/suJQU2atyIGjRvQFv/2qocdtCP0AxA5WounT5zmvLmzasmRqbXselysrcS8/KJ0FekaJyBSS9BUAI1mcIaSdMUmDiQtvywgw4tPEphLHUeWPCQ9s09QrAvQsLkomnr2J2UbWlz01vd4vj27dvq7wi4QgtTvHhxwpIm08mlWzTGyyppfsTzMhC8rblz585VqtL48eNHaTrUZRgorSX8ce/du9dAntbyy3X7IQDsFy5YSA+fPqS2bdpaXC6RIFF8Gjp0KPX5qo+hT1csX0EFChegHTt2UPny5RUxZsmShU6dOUlPHj59RWLc//o7sHHrRpo0bpJa1G/agvDgcCrSsJCS9kyv4VhjNW4o1huaSS+DX1LhOgXo4b+P6NzWi1T3p5qUgG2Qfv4sPbK9MuJlOP3S+Dc69cdZylU5u3lp00y5rnLq22+/pXPnzlHSpEmVTRZmhg8++IC++OILKlOmjKtUU+phBgGP9z6FLWT8+PE0cuTIKOofM3h4xakhQ4YoV3t94IMN6sCBA4TF+//++y/Vrl3bgEPbtm1V5BvDidc/WrduraKjfPjhh6aX5NiBCKDPoM6eOH0CjRgygpKnSK6eZmwHxgkQ54N7D+nggYNUpVIVtQAffws4n69AXjp16hTpUWsKFChAyZIH0YBBA1hVmogwWUqaKgkNGjyI0qZJSzVq1DC/gJ816i9fvKSQpyFmP5YIEfWD52qSdEno8c3HlDpXKqUmTZMnNaXMkYKSZ0pGbxXk535flf76fguFM0G6W8KY88cff9DixYvpyJEj6m8IZgt4eGPNL7yBJbkmAh4tKcJWUr9+fTXQw7sSthcsSfD2BJVn48aNCX+kCNMGnODmD5Xq77//rn7rGAG30qVLK8kS+CG6Cda+QX2H9Y2mg7F+n3w7BgGos69cuUIPbz+idp+1U+Ty4vkLWrtuLVWpUkX1KSY5SOgbkOiDhw9U5CHYjlesWEG7d++hkd+PMhAd1HrLFi2j+k3r0e49u6lg4YJ07MgxuvvoDq1ZujaKt6q9WhbKZIplG+W7liFftk9GMGnrKfRZKBVhL9Qdk/bQjWM3KUvpzKxmdZ/F/MZ/F5iIvPXWWzRhwgTq0qWL8vqG6WH58uVUuHBhvckWv7VwVm2HPOLrke36Fm9w4gWfeBwEwi+qxsmJVbD7ozyWFOEUACkGAz5IAOusMMOWRGrgxCwWTjZw7Qcxws4ICQF/wMYJ6+EQExWSNhZyYwBFmDhIkPgtybkIgBQhzQeHBtPEnybSoYOHaPHaxZQldRaqUKGCoTIgQ6juoK6r9EElSpIgCT158YSK5C9Ca1asoUyZMhlUovhbyZM3Dx3ae1iRIiIe1ahag95//33lYKOTrKFwO/2AZyrIr0CtvCwNviJyvWi8hyFsq2z+SwNlm3QnQtTbYO4b9tkNGzaoZU7w/N7KATPMrQ+OfC+bMzTgE/lvM3KeODri98zTkseS4tixY+nq1at09uxZg5rI0zrvTdoD1Vny5MnVx1o5mOX++OOP6mMtr1x3LAJQuynJvWEjWvz7YsqQPgMtnL6Qan1USznLGC+dePLkCQ0YMEDZshB8Actt8uTJzRJiSBRTAogPhPt+lfc5cHh1JsxwNaF0FCECpUSpElLzeY0oYcqEZDYIOPNAohQJDfZNxyLrvNLxt9e3b181Aa1bty79888/lDZtWudVQJ4ULQIeSYp//vknwW62f/9+IcRou18uuiMC0HggMg0IS1fTITqRaVLSFpMoPB+RID0+efLUNFukY5Cubu8y1RpEymiHA+yKkbFYOvOE+Lp81NlT09dff62kfsQgRnAMSa6BgMc52sAVGrYv2L3gQCBJEPBEBCARgjDwbSwdmmurnseRUp+559pyDssvvDkh2hDMO9idJC4TJkBmP2yX9sGHJ2L49obkca3s378/VWf1T8+ePb2h/6SNgoAg4MYIwDTx1Vdf0YgRIyyuFX2j5vHESRFaoiDy4YAPPon+vzuKXq4PO9lhzSkmTZii4IPjMJ5wwbEOARyusB378aPH+i0e/e1RpIhlBb/88gtNmjTJoztNGicICAKegwDsi3BuwobQdk9svzxx/Di1b9aYCuXMRT0++4yMfXg1lv76de9BGTNk5PjHWSkbr1nFJ3vWrJQje3bKyd76+fLkpSKF32FnuxFxJy2GvSAt+AHW8tgdItMCPcamCA+6hg0b0pdffqkCV5s2VI4FAUFAEHBFBODFjV1Odu3aRZkzZ7ZPFSEhssf9wK/70qyZs6hHj570Wbeu9FnrVnT+9GnKV7AgaTxm3nv8mBYs+JVWrFpBSVOmYs75P+lAXerHzldwDIrH3ukp2JsZARmcncIvrafQXUO4vk/JL21JivfhDHbEdZw85zGkiBicWIcFW6IkQUAQEATcCQEsf/nrr7+oSZMmdqk2VKIrfvuN5syZR0dPHKOU6dJxuf7K21w5Zb1eehXGxMi8RwXzF6CEfI8iPX1ZFhNrXCUt+D5FPLzE0SGeUsi6lhRYdQr5ZapAIaubUuj2vhRYYaTDquY4uuUqQxd94cIFVXlrXmRwBoDbOD7QY8c0/fTTT2rJgKM95mJaL8kvCAgCgoA1BLB+8eDBg9ayqeuwEVpNHHMVcYw3b/6LUnLoRjYY0tHd2+ji5WuULU8eJSWijACWAMPCfOkpr1fmBaH0ksfh27xX6o1bN8knwJ8/AXBbtvo4e2cIv7abQv9sRyEbOlNApbHkn7s+S76pKKBMfwo7u5QoLOYcYWsdHSIpQj/+6aefcuSM3aoeUGsi3JFxAkliH7/feDaDHRuwVsc4lShRQoUeMz5n6Tc8TvFCrVq1ylIWOS8ICAKCgMsigOhSt27dsl4/luLuMWklZ6KLbim/xhGnsrJtUCUmustXr1DVah9R//59KDkH61BqUi4rOe+AkitXDurcqRMF83KcA/v20/MX7HDDPJgjRwZatmI5Zef1rZqFgPGmFQ6/vosiru1Rqk4KfUxayBO+lx10Qh6Qf6FPyT9PA9NbzB77JklPEY//Jd+UeSkgfwtDHp/AZCzNhvLnJbffMZF07C4pgqCwFAJro/bs2aM2osW6QdMEV2TE2gSBtmvXTm2Dg41vQW7Y4X3q1Kmmt1g8HjdunCoLocokCQKCgCDgbgjArmhuralpOyC5IQj88WPHyIelPGsJdsWNmzdTjfc/4ChULagbB4dnI6FB+vNjYpw6bQoTYE4VtGHZmtV05PgBOnbmMDVv2YreKV2WzvAYbZsGjgPJP7rCDjF3OcYgS5lJs5Bf+tLkn/NjJsR25Jvaekg7vT0+CdPwTx/yL9BSP6W+Xx6exGWW5bYniXTengexkhR1Vag5oLDLAkKCde/eXYUO69OnD9WqVStKneGCjP3gQIzmyolyQzQnpk+fTohKL2HcogFJLtkNAf39t1uBUpBLI4D+ftMxyloDjQMxRJcXEtuK9X+SD9sCrUlvGhsLu3/WkabNWEiBPNJPmzqLFv26mCZPnUQ16tQljQM+wIaYPVs2Gjl6lCJKY0eaLwcMpIvnz9I4jg42+eefDURquX5MYnkbUsTdAqQ9v00Rz2+S9vQWRTw7w34xfuSfIyoPWCwrXnImvsTkEy+Iwm/soYhbhyns5ELSWG2aoOlWi7fZ40KsSHHYsGHsvpuNsNGsaUKoKBAhEiLxY3mEqWoUnqIIKI3NS9/0ZYPNEg42MFQ7IyHaB8JnycDoDLRd5xmInYs+x/54IRwmLTzi/156rlNLqYlDEGBVIpwdHRn8ADGIg4KCrFYf9sRdW7ZQqtSpKQ8HFYcHqcXEhFexYkUqV74cZeHlFUHJgtiktZcaN2xNhw7noly5cxu8TY29Tv9fnqZCCq7kWLkRLFHaolaMuHuSQtkOqMUPIt8AXhMZLxn5xGeCY6kxJh6jPgEJ+d4gCjsylTR/jsnMkmNAgRbkl78l2zn5mgNTrEgRyx6skRk6uVKlStSrV68oO1PAxRcSJZxqQI5Tpkwh7PZ++fJlatWqFY0ePdrmJkP9il3IEdfR0QkBszt37kzdunVz9KOkfBdEABOiD2pXe7X7hJmNc12wylIlOyHA8V7Y5hZsddyL7eMQ5N2mHXxAirv2UP58eSkPdtiIhhR9mBTr1q0TqUq58+Wj+XNmq91w+nFcXA6HFOl6pIOIMJoxYybVrFWT/HhCyHMDq8k3dUGK33jTKwJkImU9Kv+OzvoZXZERFK/6bCbUTFwGOxc5cBmGcS1iRYrYUcFaggoVXqSQBrGZKex9WKSK30jY5qZ3795qI86svFAUUWiw2SnypEmTRq03tPYMXL948SIV5DU3zkiQEhB9QvYQdAbarvUM2HzgLj948GDKlj0bq5Jcq35SG8cigMl7mzZtHKYhgj+F8S4nlloDlemXgwYymYWxivJ5tISjBBfYD7nuynOG1x2SX6Aak7EyAOfwGh9nwSI/k6U/X1eqYh7fsY3XN19+RQ8ePKHPWQiwXTPGBMjPeNOkYVcQ3jILaxN9fLkNTkyxIkVb6gfPUiyzOHr0qCK6S5cuUbVq1dRaHBAjnGPmzJlDderUUTMknWix3Q12ZIA0pp+L7nnXr1+nnDlzRpfFbtegPoHr9HvvvWe3MqUg90EAKtRixYpRoUKF3KfSUlO7IACTD7ZYc1Rat24dzZ0716bitWevg7pHI4Fh4f0z3hruGEezKczvK7Rpd9gJctLkybRx404aPnK4WqYBObHzZ52peIliNH76LJaHI+j00UP0eafP6f79R7R91zZKyoKNefWqTdWNVSYfJRX6sN3zXqzuf5ObYk2Kf//9N88iHph1okGFFi5cGKVeCMOGrWwQET4dLyaFVGiaoANH3FKoqmwhRewJiC2QnJUcaVdwVhvkObFHwFrw7diXLHe6MgL4u7ddWopZS7C93R1eZpGH1w/aLbFvx5kzZ6hRw2bk5xtO/iwxBgeHsi9ILtq5axPlLVJUSZoBrI6d/+t8ql6tOpUskId8WHq8fvM+j+sf0Mrx4yhRYDynE6KOgU8gx2TlZRk2rMrUb7HLd6xJEdsyQQ9es2ZNm/XskBRBeFBDWiI8zGigqrCVfGCfhP1SkiAgCAgC7ogAtGJwFISfhb0S1KxYFnfy/Cl6xKHcXrKQkYBNWCmTJVP7ZirVKz8MEiDWM+49tJ/Os2MkHCXf4uM0Kbku4TwR4MlAXCXfNEUp4s5Rpz8+1qSIJRcxTcm4Q0B4+FgiRXiSwqHF1uUViDKPnawlCQKCgCDgbgjAMx/j15EjR+xedUi2iZjkEoFsoWrlYyQs7DdOIMYkPOYW54ApyAMi1F5GzmOc31m/A98bzov/OQi4kxNbXu2ftrDL8IkTJ6IUjH3DoOqENGgpTZgwQdntYL+xJeVjAzHKlSQICAKCgLshgCAmnTiajMOcBUGGuu1R/7YAkiJDEKeVfBZut/tpn0RpyTdFXruXa63AWEuK0RU8atQoggQ3bdo0pVqFHQbrCcfyIlCQHtL9+/fVdYSDg4cq8ixfvlwtzwCp2ioplilTRnm5buaoDZUrV46uWnJNEBAEBAGnIgBpDUvPsAbRdBkbIn0hgMmNGzecWid5WPQIOIQUx4wZo5ZeHONQRFCF3rt3jxD+DbMirENE8mXvKFzH+kJIj7AL4nv9+vUx8u7E8g2sHfzmm2/U1it4CU1fvughkKuCgCAgCDgGAYSthN8FApkY2wzhXFOjRg21PttaeEofrNFz8IL1WLeew7l5WnJIixD7FAvx4WWK6C9Yf4gA31jrpSfMnBYsWKAkRKhaIS1m56gLsUnYISNr1qxq2yiQo57w7GvXrqlnoA54+YQwdXTkWxAQBByNwLJly9T4Yzz2wacCmyR06dLFbFSwKHUC8Tgw1meU53n5CYeQIjDFmh5zMU9N8YaatDAiM7xhgiqidOnSiozHjx+v7JZNmzaltWvXqpLhVYXA4wg7Z6tq9g2rJLcLAm6PAMwc8BaHOURSzBCA1gpe+hhv8BsJS80gIULDpZuSYlaq5HY0Ag5xtHF0pc2Vj0X1V69eVV5cGTJkoBUrVtDq1auV7RIbEIMQsXYSUizWNkoSBASB6BHApBJbGqVPn15FnIo+t1w1RQAL/mE6AiHCZwIfqFL/++8/NTaZ5pdj10DAY0gRcGLJBwIEDBkyRAUlz5QpkwrLhhezXr169Nlnn6kFrTt37nQN9F24FitXrlSqbxeuolTNQQhAvQctz7lz55SdHssF4CyCc3Cis3UNsYOq5zbFQkKETwVIEWYcSIiQuhGvGefgYAMHxNOnT9NjXksoyTUQcJj6NC6b17VrV+rYsaN64ZYuXUo/87YnCAcHmyJeVGeFhYtLDN7k2Y0aNVIBg4cOHUr9+vV7k6LkXjdEAAM49jTFZBLBMZCwMw68u/GBk5wk6whgrEGwEtgPER4QhJiad7dIlSqV2jtRlx5BkIgDHZONEKw/XXLEFgGPJEWAgeAAWMMIxxvd+QaDPJx7hBQtvy49evRQm0PDU3jr1q1Cipah8tgrsHtBwtEJEQ1dtWoVFS1aVA3yHttwBzSsQYMGNHDgQOVZD2dCECO+oZKGmQcOh/B3MPZMdUA1pMgYIOCxpGiKAULSDR48WLlGm16T41cIYEYLxwB84EqOdaOSvA8BONWAEGfPns27tbdV+6FOnTqVrly54n1g2KHFMOdIch8EvIIU4ViDbVkQjFykxKgvJ+xFLVu2pOMcUX/Xrl2UNm1aNSg+x9Y0krwOAexUM2LECGrDWyXl5o1oIe1AywK1nyRBwNMR8ApSxCbGWAOpq1E9vVNj0j5I0NjKC2GmDh8+bNj9GyodOFxI8k4EMEnCml4E8cfmt1CrSxIEvAEBr7CYf/nll4QwcOIgEPmVvnnzpoqkDyka6zlh3zBOcACQ5L0IwDkEcYoRiGPx4sXeC4S03KsQ8ApJ0at6NAaNxYC3aNEitW2N6W0S+ccUEe87xjpF2MPgYIPlBIjKUrt2be8DQlrsVQh4haToVT0ag8bCdoR93CQJAqYIYP0c1tNhsfm7775Lk3nH9jp16oizjSlQcuxxCAgpelyX2qdBojq1D47uWoq+RhETJ6RmzZqpqDZwwJF3w117VeptCwJCirag5KV5RIXqpR3PzUYcYahLYUvUSfDbb7+lHTt2qHBl3ouMtNzTERCboqf3cCzbh1BeiN0oyXsRwF5/sCXC7oxAGPBUxsJzSYKAJyMgkqIn9+4btA27nCB4uiTvRQDbvV26dIngcINILJAelyxZoiKweC8q0nJPR0AkRU/v4Vi2DwMgNnyW5N0IwEO5ffv26uPdSEjrvQUBkRS9paelnYKAICAICAJWERBJ0SpEkkEQEAQEgdgjgP0Tb926pXboQai8jBkzxr4wudPhCAgpOhxieYAgIAh4KwLYkxLxY7HrCLaKgkc3dsjA5gStW7f2Vlhcut0erz6Fxxw285QkCAgCgoCzEcAGBOfPn1f7J7548YJOnDihdh5B6Mk8efLQ7t27nV0leZ4VBDyaFLHGCh6U27ZtswKDXBYEBAFBwP4IQDJEQHUkfYNz7K8Ir95evXqp3XsmTpxo/wdLibFGwGPVpytXrqRWrVrRtGnTqEmTJrEGSG4UBAQBQcDeCCRKlIg6dOigdqfBLjUgzy5dutj7MVJeLBDwSFL8448/1NqqNWvWSGzPWLwUcosgIAg4BwHElYUKtVy5clSlShXKmzevcx4sT7GIgMeR4rVr16hRo0Y0fPhwIUSL3S4XBAFBwFUQKFWqlNoAvVOnTrRlyxar1dJCnhBp4ZzPx2reuM3AW8/5BZJPQMK4rUYMn+5xpPjdd9+p0FTdunWLIRSSXRAQBASBuEGgTZs2hNiycMSxGkkqIpQowk02APdxP7cV96txNO/s7du3afbs2TR27Nhocr3ZJQmS/Wb4ufvd0v/u3oOxq7+j+x1rFwsVKkSzZs2yoYKQEN3pY0OTXCiLR0mK3bt3p6pVq6p1QI7AGH8YV69epX/++ccRxUuZLowAdoxA/E94DTp6gHRhGLy2agiOHxwc7ND2f/TRR7Rq1SqHPkMKt46Ax5DinTt3aPny5bR69WqHDVoYGL/55hv1sQ6t5PA4BHz9qG69emzPYVuJJK9EwJETomLFiilNF9YzJkiQwCvxdYVGewwpwoMLbs6O3Ek+JCSEJk2aRI0bN3aFvpM6OBEBRCQp8fbbNHzsOGXzwdZakrwEAUyCWEtUs0olw96Sjmg5QsBBGxEW5hr2Qh9+58kvQNkvNSZqPfn4stUtAZxnGBeFDR+/DCWNx0fg5O7JY0gRe7/BWO3IhM1WsZ9cypQpHfkYKdtFEfBjSTExT7yS8W70Qoou2kkOqBb+7iEh+nL/OzJh0u3LhINPXCQlBfOzNZ7w+fDuKBtZ6wbt23vvvUdNOCSdTowPHjyg8UOG0El2CoJKOWvWrNSmbVsqxstLtKdP3Z4Y4wZ9B/Q4XJkbNmzogJIjF6nvQh75rBx5DQKvNad4D+TjHRjg3XaGwvzChQuErbpgpnFkgqR35959unD5Mvn4v5KLQIj/8XK2NWzTPM928/ffrUBdv+jGkz+NRo0cRdXKV6aHjx+TT6LENHPGTFq3dh3l5Y2nS7P25PnzF/RRrTr0VdeuRAEsWbp5cqikCKeUFClSKLWmI3GCygHPQuBdSYKAICAIuCMCGzZsUBFu/F8TlcPawKrP+vUb0rWrV+jixfOvfDCYKC9fuUItWnzC9kw/6t27D33RszsF+vnRS54Atm3ekpo1aUl/cMjMZcuW0oTxP1FpDjjAUc5VNW/fvUulipWk/PkLcKDzVkradFj9HVywwyRFxB3NnDkzffrpp5H08Pfu3aPDhw8TRHB7paNHjyqVphin7YWolCMICALORODZs2e0efNmh/sr+LADz6Qxo+nm9euEZx48fIgIJMzEd/vWTWUi/PGnn6jXgEEUAG0Ikx5kv/mLfqXLl87T6cN71didOkMGZUPEdXzS8JKSeXNn0+RJP1OEo0ndwR3jEFKE08tnn31GQ6B3PnlSGY/RjoMHD1KuXLmUjrpw4cJ04MAB1Tx879+/X/2GrQYepD169FAf7EVmLe3atYuyZMnCkrv7i+7W2irXBQFBwPMQwPgHm6JD4zQzyf3HKtP+/b+jWTOnsi0wMwcLOPnKBsjq0zu371DSpAmoDntYa88eGWyDID0KiEc1a9akv9ZvoMDAQPI3GWs1JtgyHMP1+fPH9JSlRuWM46bdZHdSxDZNCHA7dOhQqlatmtoyBUSH8/AMhTPMUzbGIqRRpUqV6P79+zRs2DD6iWcnX3/9tXJkwT5jIEqQK1SiyBNdQt5MmTKpKPTR5ZNrgoAgIAi4IgIjR45UQkRM6wY/1VcKTOt3wnnmhxGjqH7d6vTehw3Ueu5zZ88ayC8Da/bixQugQFNJjwkTYeWSBSVj0ntOAXw93NRDlgnXh4kShPnEzZ1t7E6KUJci9mjnzp2V2hSECAkOJPnw4UPq16+f6j1816lTh5o3b05PnjxhPfUyJc5jmyfsgbhjxw7as2cPFSlShLDVSnTp4sWLSlUbXR65JggIAoKAKyKAjQsgKcZ402G2AzasW5cmjh9vcJix1D4fJqtz7C26bNkqGvbDD7zM4gllZu3aFR5r2ZtG3fb40SN29ElAvmxHjJSY8Ngdlf5hM1XJEsUpkB2BnvJY7uP7/+UXPnxPMDviQOBJlTatwdYYqRw3ObCrow2IDNId7IZIcC2Ghx6iQdSvX18tTMVaHD2BQCtWrEg4d+zYMcO+Y/p1fBctWpTOnDljfCrK75s3b8oyiSioyAlBwL0QgAckhll4enqLlzd8K5o2bUqDBg2K8RgGrGCiSs/2Pd3hxWKP81jcuWNHatykPqXFGMxEiA2Qly5Z8ooUeZxOlz4d3br9gJ4+e0qJsQ5RkSE/JSCQ/t6winbv2U+zFv5GZd/dSNOnzqAffp5Cfi9DXoUlZ6Ls1rYdlS1XiQJZItUQ/QcSphumGEuK0Hv37duXEEHGNGXgzlm7du0rbya+iBcbLzqkxbQ8ezB1hEmdOrUqAgZf02t62SBL7FAdXQpnnTc28JQkCHgqAp5OEglZbff4RTCdvnGHrt5nKcRNB9SYvn/YuADbR/Xu3TumtyoPzyIlS1LqNGmsTiLCePF9yRKlqEevnq8IlMfkUqVLsffpNXoR/sqhplKFipQzRzbq2KEz7T10kC6zd+p+dsT5qmcvql27Ho2f+BMliR9IX/btQ0f/OUpFc+elDp+2pz59+lDpwsXp5KmzNGr0MGLjqNsSIjohxpIipL9Dhw7RXTam6qSm92b27NkJH9OkE6PpHzYkQKhWk/JiaHMLVm/duqXijI4aNcq0yEjHWEwP1ayk2COAiQsmF3AH95YBKfZoOe9O9IUf+oQfiUgnpn9DxjVB3uiuIy/y6Pms5TUu25G//XhMmbvzEHWbsZigkQuMH4+Oj/6KEpg4cziyDnFRNjYvQKxTLCeLbdJ4OZotyY/7ffg43iiBJTj0uw+/S++8V56CghJSv5496ccpk9S1vzb+Ra15c/bqVWrw+6bxeOBD75QpTgcO7aWsTIJYwJ+ax9ute3bRbl4bjvpjI4au3bpQi08+eRXVBhKmG6cYkyJIbP369TY1WVefohMgCUIihCpV9xKdPn06fcJAwo5oLrTR77//rhxtMJOKLsGT1ZqKNbr7vf0asOvVqxcdP35cBUDAJAQDp6S4RQB/J9u3b6ef2WYUHvaSWrfvQPkLFFBaEWhlMInB3xYWe2NZ0j62wVesXFl5eEOjY9yHiMR0iwevbTyQHeG8KYKCqDGr7WC6QDlxlQL9/WjP+SvUd8FKWtizLRXPmpF8eExNyG1376E1ekSxJhFjH76TJEkSfWY7XdUj0qA4nRjXrFtLWzdtVtIjziVi1ecS9v5/cv8ePWWnmkSsRk2KCF6YkPExv1RKrYqyylSoQGWqVEVp/H/Eq+t2qmtcFhNj9WlMKgtPJH12C/Up/gBBhEhTp06lrVu30rhx4whxJU2XXsBOiF0v9PzRPbd27dpqQMcifkmWEUDEH9Mo/JD6sdt31qxZ6c8//6Q//vjDbGQgqMuxVyWCFmNABuZwcJLkGARAaKdOn6amdT6mgsWLU/mq1agNk1j5smVpxsyZBnMD/sZOc773eYCazucrsEps7969hqgoMCtgcvo9913BHNmpO6vrzp8/T7/xhLNy2XeVhsWclsYxrYpcKqZdvtzOtiwhjmhem6oVyE1J4gVSYlbReTIhQgOG5Q2LFi1yaKzmyGhHPdKY6DLx33IrLLZ/PXYixBsIDzbFt1KmoiSwD/KxxsKMIkSjYhDrVHv2hD9PPYYQ0TyHkiJCFumkiJnq5MmTlUE5Xbp0NHz4cLVYFYSIQXnevHkGuPFHC+nv888/V4Ow4YKFHzVq1FADtO7gYyGb156GarRWrVqKEOfMmWPAARMPYIe+mDhxouoHLCAGcf76668q32P2KINXHIzyf//9t3IKADliklOiRAmaP3++oTz5YT8E8HexesUKqs+RRH4c+h317dOb5rNTRPCjB1SlShWlccHTIE1ieVO7Du3pxPF/aPSEidSwTm3CwAvtzGaOCZyPlzVt37SRnSR+pYu8Tm3ZsiV0iNcM1/j4Y6rHeXXNjf1qb1tJASwlzt7Ja5V5wK1ToiAF8zcmAyBKd9dTfPHFF1QPO6qYJGhlMN599dVXykvf5HKcHEJClPR/BGKsPv3/rdZ/4Y8SAWN19czH/EeI/ehg/4M9Uo/xB/IrxyGD4M4LmxY22uzJeu4f4DpsQ8JsGS8gPLimTZtmwx3elQVrQPft26ckQeCqJ6wjRcL6UD2lYaM9PNp+/PFHRYCjR49Wkvx1joCB/tSlirYcABgLjbF/JQInIGiwJPsiAFsb1oPxHJ3uP3qicE6eIRNV4HXAulbk0qXLdOrgfurAwTIePX5KzVu0IJgdevboTkuWLqObvD64Mq8HnrdwvrqOSerDh49VRQcO+ZbysvS4ZOlSqsOSv/53at9WWC4tPDyCZm/bR03Kl6KEgQHkz+19zhJLCKtzYU9MwM43wS+5/WFxp961XHvLV6C6XrdunVKLAlPdCRBrtd/mWKGYxGBiKck1EXCopAji+/DDDyPNRCExYpdpnRABS1lWCSGgN6QSECY8WEGIMZnBwAMKqlbcG11q0KCBUuNC0smfPz/H+muhyCImz4qufFe7BhUNsIGq+q233jKE14MtA1jDyck0dejQgc7yol70B3BBYARsy6UTIvJjRl+Z7VcgUeSVZF8EsKdebZ7oreJdCoaPHkPJkyWh4RzkokXTJmqQ1d/Xf479o8isMO/ajnPQCvwwdiztZIn/5s0bFI8lzmAepJl/ovw9wUGtcavW9Ptvv0W5Zqk13O0UwCrZeDx5VcTFZJbg9cffz/bhBLLJE67X1Zt3qW7xglyGP7Wb9Ttl+GIwZe36HWXp/j3VHDWd5u88qCRHS/VxxfMgQvQF/Cf0fsK4lJVNFF26dFGaGf28K9bfvnVyPynUoZIiVEBz5841zJSiA7tixYqEj3EydhQwPm/udz6O2A6VH9SEWC8JydNcmjBhAl3jaPBQL0H6QTQcrBMCcWCpiSclECGkOdgJMQGA6gaDLRIIbePGjQov0zZjsIRKDVJ+smTJoth79fyQVuCFDBujJPsjkD1HDvqLya1OrZo8cVtPxzhm8GB+t/U+xCTlCgdxxp53mPAgQRJEX6dIl57f8+uUlPvvEQfH8DVaaK3XFHk/ZG3BkH591eCNgdra31w475pw7tZtunrvIf334BHde/KMXrA0F49VodUL56GCGdMxAb9aDK4/x9I3lmCEMJHmSJOSnoe8pC5V3qVcqVNQMJNKOp4EbDhxjgYsWkv1ShVmIradcC09z1nnobnC2Id+gokCGqw5bLZYComcA5YgWcM5+rpCuax/os8Z91fdp990rBxKiniIrjrQH+jIbxAAVLAIM4d1P+3atVNLRIxtJrBn4qMnOJ9gAS0i7LRv315Jkfo1d/6GFIg/wF9++UVJ62gLcNAHVPSLtT9MSB0YbHfu3GkWCqhkkad06dJmr8vJN0MAqlN4m+45dJjKsbNNQtayJGHJHv0GAgP2Jdmui4DOsN/rCdd1b29oa26zkxRnj5JQBt6JiAjb1JMod+2RU9R//gr2SozPz4hPCfkDQgwOfUlJeSlFCfYefR5qnRQxpAe/DFcSZ0KWEl8yEebPkJZKZmfvU/4PqtQ5bG8MZtXpM558JedIK+4iXcEEBM/SL7/8UmlZCnAfYr01zAyYRGKyaWw+itIxVk74JEhuJYdcfhMEHE6Kb1K52NyLKDmQgvr3769CxEGKgdRYkhe5ggwxi4Na8Ny5c8rRB+GVYFvDoAL3d3PG8djUwxXugX0VIff0BJU1VDoIqwc3cKhOMYkwTVh3hHzACg42R44cMc2ijuE5jDB92B5MkmMQQD/c4f6I4L6oXLEitWK8N7L0GKnfzDAeVHggMbzzN1krgvw6meo1BSHi/U+VNp26huvRJZBSrSJ5qWHpARTAG+5G8HEEu+KH8eJvkNormyAsoNYTODpegD+9CAmll0zuWEcXxt/PgkMpKRNtR1alPn4eTGlSBinC9QEpWi/WZXJgUg4pEWYgSPOI+4y+xAc2R5g14GMhyfUQ8DhSBMQIIABVKiTA39hegl034DiCGRpm15CSsDwEZAl1KoKOY+aGra48JQXxOjRjQkS7ID3ANog/UsxeQYwYPDFBwO4leoI3Krx/QZpZs2ZV0YvgeQrbLxLuwZKaTezZCFW0JMchkDRpEvqRB9YmPLkZOXok5cmWnSZPmUId2bEGwZmTY0ISGkL3+V1Pw+8wiA0EeJuJMHny5OqTmFWP27Zt58lfVYOmADVGvtlsh/+Cna+sEaLeQqhPa4yZSdfZWSeEpbgQVp2G8vsAqXZh5xZULldWCjdD0vr9+jfoN03SxJQjeTLqMW8F9a9dVdkqbzx6TCNWbaKDF/+jA0N7UKPxc1lde5eypkqunG70+93he8yYMTR48GC1BAZYYxKCvylMIuHTIMk1EfBIUtShxqAATy98MMuFDQykCPUGXlA9DRgwQEmSkCY9OYEos2XLpjx04ZEKkoSKuUyZMkrdDPshArNDYkYwduAESQOecphAYPYLTJfw0gAQK5yjjNV2noxdXLQNNsOHDx/RWvZk3MD232e8w3nPvv3oOw6Q37JlS2VVymy8lqsAAARxSURBVMITucRsA17DE7+ePboRgh0OGTqckrJkBYc2SPtN2rSlz9t/Qjv2HeCJX0ae1GjKxvh5p85KBdqetSv4u7AlwSP261qVlDo2PjvYxOd3BAvwsbNC2qSJbCJE/TkBXNbCbq2p/6I1VPb7SapMhBFrVLIQTWhVj0OKxacPC+el4Ws2U80i+dyOFNFOOBYifrMk90HAo0nRuBswEzb2eNWvQTWIHTwuXLign/LYbwyyI0aMUB63UC/DcxTbdsFuCFUo7I3wFsZCfWOvVES7gSQ5mGe9mPHCdvvtt996LE6u0jC8s1B9+rLKDX0VwVJatQ8+oN6dOynnp0xMenDomDpjJjVn2/h5lvixz93syZPol9+XqvcdzjTYZeY427RKFytKrdt9qrQiCxcupEd3b9OmHX8rr2JI/7YkrhK9nSOLyvqmNj6oX9OytLjoizb0hLU4IVxX2A7R7mesVg3l487vv0uty5fk6xxPU5Ig4AQEvIYUzWEJ9SqcRMayCzskKG9IWPh9mL0YoS7WU9euXQmf6BLsH2IDiQ4h+1+D9JaOJyzhPJlZtXIFVaryvtqoW2M7nhKr+JFQocImvpGl++W8PjEs7CWt3byVSpUqqcwFqBUmO/MXLKBNLG1u4aU4Z2/fUhqCOrztECY/thKi3sI3JUO9HP0bhAgixBKP5+ywY5oSsy0cBCpJEHAGAl5NilAnQlKEC7s3Jd1935va7I5tBflAuzGdg1l0atuG+jz9nHx5G59+3w9TDlB6fFOYBbAkqShrPJBwHvZzPaEcSIwVeRH/B6wJwK7ooVi7CFugjRKiXpajvlFHc7SHc/YmYUe1Qcr1DAS8mhQxO/U2QvSM19Z7WgFyq169Op28eInu37/PuxoEqQ8kRNMEMowugVyMyTK6vHJNEPBWBLyaFL2106Xd7oMAJm6QBOH0BLsikjlCdJ8WSU0FAddGwNe1qye1EwQEAUFAEBAEnIeAkKLzsJYnCQKCgCAgCLg4AkKKLt5BUj1BQBAQBAQB5yEgpOg8rOVJgoAgIAgIAi6OgJCii3eQVE8QEAQEAUHAeQgIKToPa3mSICAICAKCgIsjIKTo4h0k1XMdBLAjhPkl5q5TR6mJICAIvBkCsk4xhvhJAOwYAuZB2bNkzkKpea1g0iSJOOyYBzVMmhItAuhqXi5Kfhz4XJLnI+DDUS7kz9vGfkZ8VOxFiJ0iJHkfAthHAn8sIERsfSTJOxBQpMjD5OWLF9QOMfXr1/eOhntpK4UUY9DxCKQt+wfGADAPy4roMgjELbNID+tYG5uDXWbee+89tQ+pjbdINjdEQEjRDTtNqiwICAKCgCDgGATE0cYxuEqpgoAgIAgIAm6IgJCiG3aaVFkQEAQEAUHAMQgIKToGVylVEBAEBAFBwA0REFJ0w06TKgsCgoAgIAg4BgEhRcfgKqUKAoKAICAIuCECQopu2GlSZUFAEBAEBAHHICCk6BhcpVRBQBAQBAQBN0RASNENO02qLAgIAoKAIOAYBP4H9WB5303jd5sAAAAASUVORK5CYII=[/img]
Leite anhand des folgenden Beispiels die Formel zur Berechnung des Prozentsatzes her.[br]Verwende dazu die angegebenen Variablen.[br][br][i]Wie viel Prozent sind 7 von 50?[br][/i][br][img]data:image/png;base64,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[/img]
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Information: Herleitung der Formel (Prozentanteil)