Vermehrten Grundwert berechnen

Der vermehrte Grundwert G[sup]+[/sup] entspricht in der obigen Aufgabe ...
Max löst die obige Aufgabe mit der Salzmenge anders als Lena.[br]Max erhält mit seiner Rechenvariante auch das richtige Ergebnis. 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YBkUFJcO7Mtlh2xwYsdc7WH1cFCi0/WhANcw7bNDWJnYV+DF8uprAtZeBz6VxKnZToGjoIiiDXYNCAxCHkK/gXFOmbHBnDXM70ZisDU9ELXMuP+S8DksAVYtzaF4jgGgpb7F7AKlLUkC2+DdciAqdCszNwE98KAIrEynY3p5vBHuB9eghGV6X+YGoTuDp7zczgQyjK481wXgPkeDUdDcb3W30XB8xqEK8/nsbx+64n12Xq5MFwH74D5MPD2eK/Co+A51oDmyHt1hibuaBkU19yUXTdjY/NhHamW+ZwHpgDz3gcWAstB6YF14ASoVUdIjuJAHIgDcaBeHZiOjJ8JQ2HFRpiwJtsYbO4NBmp2bIVmZuZ9MLCoJTvn08BAxM5KmWaHvhOMAEdi9oSt4Gl4GeaD8XWedm6bgIHFv2EqUHaer8DOLpRkIPEYDIF+pfSWzBqkHAcGGBs1cCBHkL2mWiNdDezSKsnXcBTzWgRSTTmo5eTI459gssqOMzE1oLscnFcGIJbVlS5UtA9Ty+QHsHFl/lCmhbye/cD69GvYENaFGUA5bxA5Cnw4+AQs30XB86lF4FP4EraGsnqwYD06AXqXVzC/E7wDBqS15PbzwmKwZGU6P1NHS3vBKXApzAK15P4LgKOn84D3SiHzbR2Zq5LgcT+CXcG6XJZ1dRDsAD8CvVwBvDbP0ZwyZbd21RSczXwUZdaUk/dl43vAhwrbiigOxIE4EAfiwDgO7MjS62CHPyHNygaOCN0A1cGYoyYGLSdDLdnhXwu3w7RVGyzB8jDYF+z0lIGpAU458DG9lvqTOByeh4GgloEn4TcuVOlGlr3WtarSm7tokGEwdRZU++IxDcweg5sq80zaTS0JYg2+ToJ3wbztBw/Be2AgVg5MfED5DE4Hg179+At4jJ5wLoyG1aBQP2YuA7c1EL0FFgJlQLcKnAruuzP0BdMLeX6vy7Lcq0gsTSdn3qCzWgaAPlBYZ5sj6+/MzdmRfTyn9dL7Tm8MzkaB+ZwMasntyvmutU13TJueTF0PV0Jz/e6OviRPcSAOxIE4UHHAkR0DyN81wpEebPM0fA4GG+Ugxs75a/gn1JJB8jtwZI2VBqyvwfqldQYf54OB0S9L6bVmDXyPAYOrzSsbzMT0CjBonr2StibTI+FvYOBzENQKOklukgyGDwODsloyL6fAIJgU2lMtCWK9zv5gUPo2vAsG4456VvtmoH4eWI7Wp+PBIKSQx7HuPAEGtcr6Y3BisLoBLADlQM7108B0VeksfivL+Uiw/jVFlkNHBIZLcV6D1p9CURf+w/y14P1VbzJAL96eVOfdunAp3AYN3VvV+2Q5DsSBOBAH6siBPuT1ZrgP+sKEdCUbGADuA0Un7D6Oeh0Orjsa5gZHmQbAEWCAeSsUASWz32oz5t4EA2ADoQfgI9gdLgADWc+7INTSsiTeD577pNIGezFv8PUDmAPcxrzuDCPg79AaIzzmfUow6KqlIhjriKCppUGs127QaTkOhFmgHGiy+K3czvpkGVcHJgYrPjAZ7OtVtVzfXHmujvC2Ode7KDuNBOum9UbdAt5/U7hQZ7JeeV/antSSD9cPgb5FcSAOxIE4EAfGccCO8wQwyCxGMcfZoGphY5Z9/WtAWt3pGsT8AQwmP4bRYADq/MXQD2rJkcpTYVgFR14MhOcCA6Z94R34BG6EvcHAdDe4Dr4Ag9LjYRAUsoP0OkfBKxXWZarOgfOhNYJYj9dZdQ0XNgQm7QQXODHX0AMaCvY7wSW2+SUY5A8FH/iKQP8K5p+EWsE9yd1aM5K7y8HAfqUaOf0NaY/BkjXWJSkOxIE4EAfiwNhffhsgHttILxwdvRgMSKplR7wMGHgaVP4c7IAaGr1j1Vg5KuVrYwNhj+H2RbBjADYAjoZn4EswUPbzhRfgKDDgdbvqEbnlSTMovgfWguKYBuBSLDPbLdWZgthuaXATM+U9Y1Dm/dO7su9fmD4LRVBbSa6bycLk9DlwxNUgv5D3s94MBu//KA7EgTgQB+LAdxywg/gXOIraGNm5SEMyMDSYFEffWitQ9HgGAfPAUjA/TAOeoyF5bgNkaa3raOhcnTE9QWznK5XzuKRXoAjMbmb+YajHkViyPVbr8e8YuB2KQLY/8/eDfvlwG8WBOBAH4kAc+I4DBneOChUjQ9/ZIAld1oEEsZ2v6Pw2+HW4BLaED+F08EGrXuWD6OZgIDscjoIrwOXtIYoDcSAOxIE4EAfqzIEEsZ2zwPfgst4GP4v5DzjqGH3zP/L5A88v4H04DDIKiwlRHIgDcSAOxIF6cyBBbOct8YFc2hqQIG3cMireDPmDzygOxIE4EAcm4MD4vu+cwK5ZHQfiQBxolgP/ZS+JxnXA0enR4yZlKQ7EgTgQBxpywO+xojgQB+JAHIgDcSAOxIE40KUcSBDbpYorFxsH4kAciANxIA7EgTigAwliUw/iQByIA3EgDsSBOBAHupwDCWK7XJHlghvpgN8Xiv8xRBQH4kAciANxIA50Mwe6+g+7/DWv/9uV+TBgieKADvi/sPk/n/mfRMwE/k9nURzorg7YDn4O/mmuKA7EgThQNw7Y+HVl+f+PHwgGKgliu3JJtu61G7SuA/4Jp+sho7GYEHVbB3xYewmOgzywddtiTsbiQByodqCrj8T6f677NydnhgSx1aVbv8sGrQawU4D1I3UDE6Ju64CDEf6vZwazCWK7bTEnY3EgDlQ70NVHYs1PD/DVcRQHCgc+ZuZa6A+rwFcQxYHu7ICf0KSed+cSTt7iQBz4jgNdfSTWDH1W4TuZS0JdO+B/32mn7neCGYmt66qQzMeBOBAH4kB3dCB/naA7lmrypAPWbd80+Io1igNxIA7EgTgQB7qZAwliu1mBJjtxIA7EgTgQB+JAHKgHBxLE1kMpJ49xIA7EgTgQB+JAHOhmDiSI7WYFmuzEgTgQB+JAHIgDcaAeHEgQWw+lnDzGgTgQB+JAHIgDcaCbOZAgtpsVaLITB+JAHIgDcSAOxIF6cCBBbD2UcvIYB+JAd3NgQTJ0M5wCG4L//XYUB+JAHKgrBxLE1lVxJ7NxoNUdmJoj7gGnwtKtfvQcsCEHRrPibdgGLoeHYH/wf6mL4kAciANxoAMc8O96zgKzdcC5c8ru5cA1ZGcIdIf/0KOzlsyyXNhg+BDGwEuwLURt74Bt5YzgiOxWYH33P/i4E+aHKA7EgTgQB9rZgVU533A4v53P2xVPZweWkfSGSy5BbMPeTMOqI2BXcL6pMoAygH0NngODqKXgRhgKK0PUfg74H3rMAFuAZWIZLA5RHIgDcSAOtJMDs3Oef8ArsHY7nbM9TjMHJzkbfgV2/rU0OYkGAkfCIKiW6/XHzurn8BS8B3fDihB914EEsd/1pEjZgRlfRd8HA4vE0nQe5m8FHypr1dkepFsP34FBUGglZp6FS6A5wXFxnEyb54BvHZaEYfA0zAxRHIgDcSAOtIMDW3KOd2HvdjhXe53C0ZE/wP/gn2BAW62eJFwGn8On8DX8GiaDQgczY3D/b/gSDDCOAzuq/8IiEI3rQILYcf0olhzBvw6sk47YLQHV+j0JPiT5qrqW/A72NDBYmrZqg4NYfhU2rUrPYvs4MDGnWQE+gr+08il9oNkWrENRHIgDcSAOVBzwO1iDjsegdyWtq08crfolGHSOBkdNB0BZe7LwBHwAu4OjrWeBgewW4MirGgwGHa/DD8ARFzEAMWD4K0TjOpAgdlw/iiUfEl+Gx+FFqPXq/ynSDXStw7XUk0QfznyA8i1BWQZQz8IJ5cTMt6sDlokPvh9CrfJt7sVszo4+aPvWqCzPZ7mvA31BORJv+/YgXAsHwgIQxYE4EAe6nQM2tAZ6v+5GOVubvPhjl4vhGDBoGAiFfO3nL4oNTk+GXqAc7XgAnoRilOsF5h117Q9lOSJ2FLwC5WOXt6nX+QSx3y15Aw3r0tnwcxgG60FZ1rl3wJF+H5RqySD2j2AQWx3ozkXaLXAp5JMCTOggzcl5R4LtT2vJgNT2apPKAW2r1oDnwHR5F/zeejo4A74ER/w/hk/gVJgJojgQB+JAix2YuMVHaPkBDMQM+Bw1uLrlh+sUR+jHVdhYGzAcAL7aMyAo+z0fy3b478P1YOOv7AjOBF/lOtKq9OhOeAnK8rh2LAYVi5VXZD4OVDnQh2WDC+vXOWBdcgStOtA0+DD9VXDbWjLdETnrdHWg+x5pb0Jv8FhRxzjgg8jfYRAUD8PMNlt7sOfilb3HVKYrMf0nfAGO0g6CK+AX8DOYDbyG+cFRWB989oFDoDWuicNEcSAO1LMD1R1QR3hhZ7chDIGnO+ICWvmcdtwHg58GbA1vwJSgHLko5HZyD4wsEivTu5g6auForfMGDG5bS3ZWdiIz11qZtDhQqRtHMTXo+Ck8ATOB9bE6iDW48DMWH64MVt2mOpj9mrQPwPZjCvBhqpB1USaD4nOYYl2m7eeA39jbduwIi8K9UEszkLgIDINXam1AmqO6h8JXYNm/BT6Q28450ro9WKfUcPABfVcYA7eC9eFl2Bds16yDt8FNEMWBOBAHmu2ADdH45Ho7KjuyttI8HNhGrzs0aI5gbQK7wOlwB9iZVwcBJI19DWsA8Di8bUJJBgh2GEXgOpL5vlBLBsgGC+VAotZ2SatPB3y4OQ5+CIfB5aCKOuYofznYtL56vxtsWLdWhrmhLOvmaLC+T19ewbx1eipw/88g6hgHvuS0Q8GyXGg8l7Aa6y6E1cezzW9ZZ19wJfhA/S54XMvXoNaR90LWq2ehH/SGMVCWx7C9Wx6sK1EciANxoNkOjC+ItYNaEw6AOavOYKdXdHbFKo/VA8Z3zGLbYmonuQLY8A0uErvwdCDX/hv4Jxg4jE96ZXB6O5j/sgwMfHgwUFBPwvxgcFCWZeADgB3Jc+UVmY8DOOD9tSfsDIeDn6kU8vMdA5LqINYAVfrA9XA3/Bus24UMkF4Fjz9XkViZ9mbqWwgDG4OdqOMcMFi0DAwoG9J9rNgKbmxggx1I3wQOghFgnfkYbHPuAPsC60shg1sxTawjZb3Ggtc1IySILTuT+TgQB5rswPgCzhU52rVwBGxZOrINz5rgaOOClXSPsyrY0K0DNlA2ZBOSHegqMByeh64sPbADfwZ8bVaWDb5+lP0uAtRaDbleGqA+AcoA32Mv5UJJBrsbwcvweCk9s3FABwwi7oft4DQoy5F7R9L8fMC6VugdZj6Ao2EZ+Dn4yvmnUMjjDgPrtduUNS8Lc4OjcRmJLTvT/vP6bxA703hO7cPGI2BgWS3bcevBvfAXmBU+AYNY27OijS/XH+uTDzyPwYtgH+EDeSHrktt4XX7yEMWBOBAHmu1AOagqH2QuFg4Dn7Jt5IqRWButneFSOBuuBAOrreBi2B+uh7/CylBuvFj8jqYjZRF44Dtrul6CHfqdYABaDsj/x7IUDT6zY2XHYSCxHvQem/LNP9Mw2RuegiKIvZN5g97doJBl4wPAmnAFOEISxYGyAwYJ/4TLwfpZloGqdcZ7sByEvMryUPAB81g4q7I8D9OyRrLwJKwPRd2enHnro99A/huijnXAMjfgnGoCl+GDtG1Qj6rtHMU3cLUvUD3BOuNDjG2a9cQ2fkWwL3HU1XZ/cbgIboLlYV0otAEzs4Btm9cWxYE4EAea7YANT58KxUHsiLaA5eBQcESlCLJWZ/6XcDNsBDaSv4AfwltgY7ULGPT+HYrGjdnvyI6vLzia+CB0V9ngfwI28I5AFPoPM3+DbUAPF4XF4HyYH34NBhrKUZI/wLawNcwB68BpoHd/hCgONMWBD9nYgMT7z0CkLO9v9T54L3v/+xBV1jss+DC7BPwcDHptE6yf/4QHIOp4B3zYNeBsSK63XbF9sf0p60sWToXHK4nWhxnAfsBjWsZDwG0MePeDk+A+sB27FawnR8OW4DZ7w2C4B6I4EAfiQIsdcMTERqXQvMy8DFfCLGBjcxGok+ElWNYF9EsYBr4a8qnbDk8ZZJluI2bwVksGy3uAneNCtTboRmmbkJfX4YiqPBkc2HmMAdfrxVtgUOADRlm9WNBPR2/tPNzOqcFv9F0HriHJDrY6QPvulvWb8g+yfhcsUGWBD7E+QIl17D3YDKrla+orwEDlNngebEu6+/1MFruEbIdfBEfTG5IPMeeC7feCDW1USV+Z6ZNwWWm7xZi/A96AV8F1/aDQGsxYh2y3rE/XwkCI4kAciAMtdsAO/nHoXTmSywaoPm2fCT0qfMFU2eC9AAaoyiDBddNB8YqJ2bGNmZ3bz6AnfALVmowEA+b3waC5O+t+MvdXmA300KBVGbTuCVfCiqBugUfHzo37jw8KW4Pb23HcDBfASJgI/gdRHGiKA8+x8T6wLgyH4j59mnnvXx+UFgbr7nVQLdd7j+8Na4MPxL8F94863gHbmhnBgYeGZFtk+RVl39B2pt8La8GXLlT0BNM1wQehr8E6pYo2yQDXEXrbN8/hoIhvAKI4EAfiQKs5YLCqDGIHwTGg5gcD1dNhErgEDJ4cgVGrwlNgAHUf9IVCv2TGRqtPkVA1nY7lv8FDVenddVFvp+2umeuE+cpI7IQLZT028QHLB6OpJrx5tuhCDthebwkfwepd6LpzqXEgDsSBRjtgYKX8FavyCfvOCkzG/h1IA9wPwdfb4tP256AGgo2lIzAGq3PBcFBLg6+YHGmtJc89M7hNPUhvG/KiHvKfPHY+B27lkl6CEdCYkbjOl4NcUUMOTM6KQeBo+WMQxYE4EAe6nQNFEOurIBs9Xw2VZdDqNga5fjYwCpYCXw2NhB1hOJwBvwVfS7m9r803hd+B30HVksd2ZNLPE6I4EAfa3wE/AXq+/U+bM7aDA704RzHS/l47nC+niANxIA60uwMGnAaTe4AB5U5QLdf7/aryV8d++2bA6ojslHAwmD53Zf6PTGeAe+FsKH8/xeK38pspA+dPv03JTByIA3EgDrTUAdvslcG3Y/u09GDZPw7EgTjQWR0wiC2+Zy0C1fK1OlLjKOwUlcTBTPcDR1nd90a4BZQ/MnoFVoJ34Dp4GcYnA2E/R4jiQByIA3GgdRxwcGF3eBaK9rl1jpyjxIE4EAe6kAP+snVnWKsNrtljPwxXtcGxc8g4kB92pQ7UqwPrkHE//9qrXg1IvuNAHIgDbe2A32xdDw+09Yly/Lp0IEFsXRZ73WfavzJxFzwD09S9GzEgDsSBbu2A3051lPxM4XEo/qpBR11HzhsH4kAc6C4ObEdGVoUTwL8qE8WBOBAH4kAbOOAPu1YD/46hPw6L4kBrOpCR2NZ0M8fqTA74H9LMCdWDEPOQ9jrcBP5mIYoDcSAOxIE2dMC/YnA5vArLteF5cuj6cyBBbP2VeT3keHYyeS8cD+X/oMKA1h/TvgsLQRQH4kAciAPt4MDinOM/8CT4Z2GiONAaDiSIbQ0Xc4zO5oBtpH97+0woB7FHsOxfmvkJRHEgDsSBONBODvhZwSrg/yrzNhwLjjZUy/9IwREI/w7t96HWnwQjuVvJ/4TiStisW+WqfTKTILZ9fM5Z2teBDTndx+C3r0UbuAPz/r3ts0ppzEZxIA7EgTjQXg74Cuxc8H+X8e/L/gEGQQ9QS8MV4I8VHIm4A1YAg+DuqFnJ1BBwdOUf3TGDbZynBLFtY7D3m/8xStQxDhQjrutWTr8BUz8huAGmq6RlEgfiQByIAx3ggJ2jo7LnwCj4HF6Cv4J/83AtcFTSP+DtXzcw2O2O33/5H0DcDP5I42nwc4uoaQ4kiG2aX43ZuicbXQXXNWbjbNMmDtj2+WDrfyqzBrwF90Gtt1ckR3EgDsSBONCeDjjS47de/eGHcB74Nw8/AV+Z+b+BObUhl8NgCuhOOp3MmDdHWf4Ew2BiiBrvQILYxnvllr3hcPATllpvN6x/jv758LgHRO3vwHyc8nmwbbgMHIF9EPpCFAfiQByIA53MAUckDVB7gSOujsIeCCfBz+FNuBC60x/1NkD4Eo4CAweD2Fcq80yiRjqQILaRRlU2+x3Tr2AfKD7hqawaO5mUf32V7ec+BrxR+zuwFad8Awxi5XaYG6I4EAfiQF06YMfUmWWnKo682nk+CwZ2Bnk/ghnAH3s5OtQdtDaZOBauht/C11BrVIzkKA60mgPrcSQfEL23fCCsVedM6wOjYQxE7e/AgpzSN1J/h8fBv1CQssCEKA7Egfp0oLMHseVSKUYfDOy2BF+5+2OGv8EX0NU1Pxnw04nhsB/4qlAZPJj3KA60hQMzctCjwF+8e28Vv3hndhxZD6cHf1jpdlH7OzATpyxGy4e3/+lzxjgQB+JA53LAkZeuqAFc9E2wJ/iNbHfQLGRiCPwEXi1lyAcNR54TyJZMyWyrOXAyRxoIh8DrYH0zYK0l1xlEqdngN/Ak+IlP1PYO3MMp/PHr3TAYHJG9AHzoXQV6QRQH4kAciANxoNM4cCVX4mcUUdMcyDexE/brADbxL4DsDT1hBPg/QU0J1XKE1s9c/EsZy8Fz4Gc+Q8EfGy0FUds7sBGnuATugydgJBQPuW8zvy5EcSAOxIG6cMCRlahzOzAVl9ddvvnt3E7X19WtRXYNXg2I/gyOsPpDyuLtjNPJwbpXvAXwzzltCrfCcFgVHP27FOaERyFqWwf8hEoKWU7+ea0lYQVwND2KA3EgDtSFA0WHVReZ7aKZ9K8z+GOOKA60pgOOpr4Ap8C74CcEBrI+2DqytyZcDv7QS/kd7FNgoHsP+Pr6YfBbbr9J91fzUfs7YLmMhH/AIeBIeRQH4kAcqAsH7LCizu2AnVTKqXOXUVe8ut9y0X7T6icBysDVINaRf+uco3qOuvoN5gdgmiOwjsb6CcLc0B/2gCGQUVhMiOJAHIgDcaD9HMhIbPt53dwz+SOv2cBvEqM40FoO+NcIHOEvPhX4jPnR4EirvAYGrsVIrNu9CL+E1eAxuAL8awVHg6OxURyIA3EgDsSBdnOgK43wGcTNB44KGdg5alQP8jXh1GBgkUChHkq84/L4a079ZqWePc7UwHVF8IdbzhvUXgIPgOmOyN4NBrx+juA2URyIA3EgDsSBOFBywGB7OxgGx4GvOKM4MD4HrmGlr7m70oPa+PLT3ut8aPKbV/8KwTztffKcLw7EgTgQB+LAhBzoCh28nzzsDEeBPyy5DnyFGcWBONB2DvimY384BvrAUIg6zoFZOPXiMCM44v0OOAI+sjLPJIoDcSAOxIHO5sA2XJCfD1wNNuRRHGiMAxmJbYxLE96mx4Q3yRbt4ID/S6F/ecAf1o0C/5TW03AObAAzQBQH4kAcqCsH/I6tM8vv7i4ARxx+Ai9DFAca44BBrK/BlwZ/eR/Fga7sQF8ufjHwu3hHYmeHZcA20h9+Wt+Ph1cgigNxIA7EgQ52wNdmNszPw/IdfC05fddzICOxXa/McsVNd2BedjkS/MHr32B6iOJAHIgDcaCDHdiN8/tL6V908HXk9F3TgQSxXbPcctXNc2AndvM75lObt3v2igNxIA50PQda44ddU5DtWcE/A1V8nlD8bUn/TI9/f7Kp6s8O/jUCf11+VVN3zvZxIA7EgTpz4CLyOxAOgrvgeojiQByIA3GghgODSNscpoPd4U7wj58btIqfADwIc0BztAs7+eMFv4ON4kBzHMhIbHNcyz5d2QF/3PUQPAnFQEJXzk+uPQ7EgTgwXgeaMxLrj2UOg4nhbfCvB/QEn/6LUVd/SOOvZ/1Oq6mamR3WAf93oH81dedsHwfiQByoUwf8s1uHwz9hJzgLojgQB+JAHKg4YOB6KPjr2EdgLbgTzoeZoPicgNlmayX2fAFOaPYRsmMc+OZHgfnPDlIT6s0BP++6DRyNnaTeMp/8xoE4UF8ONHUkdhXs2b5ikf8F5RvwEswH04J/w9BXWgazo6E5WoidpoT7m7Nz9okDcSAO1LEDn5P3i+BCWA7+De0p/zrCxtAPHPTw7dxH8CF8Al/CcPBv3rocxYE4EAea7UBTglh/vLU32CDdCP4JrC/gFVgB1OpwFPgjr93A72MNdhsrA+GFwe9hHUmI4kAciANxoPEO2N7eBwaPa0BbBrEOVtjmrwjHwlTwI/Bt3XvgtdjHTFaZGtQ6UnwHHAAvQhQH4kAcaLYD5SDWBskRUANTKcvttgVHYv31ax/YEPyswD+DZSO1B2wCjsYuCDZmz0BTnrZ7s/388DIYHEdxIA7EgTjQNAf8rYIB4rJN263JW9tfnAgOcJwBBqmLgKOuvrH7GCavYPDaA9xnFLwOURyIA3Gg1RzwKfpKOK3GEVcizcDyUrBROh0eBH/ktTIMAwPaW2EAXAePwXTQFC3Fxk/BKU3ZKdvGgRoOXENavomtYUySur0DBoy21c+1cU535/i2+6+Bb+bsGw6EkbAARHEgDsSBNnXAJ+dCvvp5H/oWCaVpT+bfBT8j8JsrR0zd9ku4Fxyd3Q/2AEcARoCNmiO4TVEvNvZcBsxRHIgDcSAONN0B2/KhYBtsm9oWWoSDngBfVQ7u2zj7hodhSlgbojgQB+JAmzpQDjL9hsrvlHyartbdJGwAvqZydHVq+AA+BfU3sDGz8VQ2cG5rkNsU2eD6i1o/SagHbUUm9f02+KiU4dmZ/wH0A0dV9NURDx867CyugMEQxYE4EAeqHbC9GAW2FTOAAxCtqTk5mG2Qxz0PdgPPpV6Cp2En8K3a3LA0TASXwP0QxYE4EAdaxYFyEGuQ1FBj57dNovz1qZ8ejIEiSPU4g8An8K1hNfgpFPsw2yhNw1ZehwFyd9feZPBIeL7Cs0xVX/ChYCEYDQa5Bq92AnZOlpGfbURxoDUd6M/BtoBn4Bb4AqKu64APxbYbtsmtKR+wbwCnjrbOD7b/PUCNhLPgArgdPgcHJRz4WAp+Bn5qFsWBOBAHWuyAjU9TZaPkpwSOtBY/2pqL+VNgMbDxPAAug+Z2hAay3Vk7krlDoBf4QFAe/d6FZUdgHfkeAj4oGMAW0lMD2ygOtJYDe3Kgw2EWeB2WBYORQr4dOQfugT+D9XUr2BB2gOJhltmokzjgyKjtaGuWzRQc7yroC98Hg9GBYPvkOvUVXAdPgKOwb8GLsD78FlaGBLGYEMWBONByB5oTxL7DaX2atrEqRlqfZ34zsBO083sDmhPAGhw7euArsO6q9cjYSXAb2NH0g3LQ7siGjb4NvV5HcaAtHTCAPQEurZxkG6bVo3eOsm0C3vMGsdZbH1iXg6nhPYg6jwO2obbFlteYVrysuTiW7ZOfD/hA43k+BB9yfItWyIGO/4L9grJ9exRehvnAB/ei72A2igNxIA40zwEboebIUdjqxnEYaQ+AQWxzAlh2+96r8Aks7cJ4ZCNoo1kewRzP5p1mlfk6BQxSDwY/F/gSyiOrBgh2AnZAdg6LwjIQxYHWdsD7f1t4E46EIuipDkr9jMU6WZZ1U7lP1LkcsGwWActVGpIjqPvDGWCAOiHZbi0MV1U2NDh9CxwM8c9sFfK408HMUDygW9e8Ltu35vY77BrFgTgQB/7fgc7WmPj0fgNsB5v8/2WOM7c9S4/DcPBJ/16wEV4Jio6V2U4nRyBOBke1DgSD/dnBgMHAvdAoZuwQ9gU/J5CHwE80ojjQmg4YnP4NHCGbChxZfRKKH2wyO1YGIlK0FwYpBiOmJYjFhE4my9L20EGFCcnPv/wNQmPK0fJ+HZwqpw48fAg+oBdygOFXcDXMBPOCbd+CcDe4fRQH4kAc6JYOGOzdCQZzO4FBn51mocWYOR7+AXa+dsQ2pvIHqH4VSlKHy4b8T+A1HlW5Gl/D3gGXgCMWhdZjxs8x3HYw7Ajm9W3oCVHjHLiGzXwAcJQomrADC7CJbwZ8ePKeK8uAdRhcVEm0Hp4NPnROXknLpHM44IPGFuDbsI3a4ZJsx26Gl8D5QtswY7D6CrwLtmk/BetSFAfiQBzo1g70J3c3gIGc001hTvAJfwooGkJftdu5PgIGtm7fGUcs5+a6TgeD7HlBzQEPwW+hOjhdljRHLQptyIx5W75IyHSCDiSInaBF42zwS5YMOvwFebV8w/E0/LWywvp6biXNoClqewf02Qf0Cb1tsmxsD5+A9igbz2Gd+Q1MC4Vsq/eAW8EH934QxYE4EAfqxgGf6veCF8AAztfuNsyD4TbwkwKf8N8Hn/qVQaENeFfQIlzks3AYTGg0a2m20YONIWqcAwliG+dTsZX3lZ/m9C4SSlMDlbvgvkpaL6bnw2uwSiUtk7Z1YDkOfwusDw0Fsr518DX+5+CDfxQH4kAc6NYOtMeTenMN/Igdz4LFwYb7TPD1pcGcjfVwcP0KcDVsAfPBw9AVNAMX6cjKGLDTUS7Xev1djHB8Mnar/BMHWteBBTicI/83gvddtbznDHCXhK1hLVgIZoP9IWp7B37IKdaBFcG3UdWyLbedPAYuhusgigNxIA7EgU7uwHRc3/HgN2C+upoJuoI24yJfge1KF7s383ZWjobZURm8zgF2SG+BQUPUOAcyEts4n9xqX/BNhw+EDakPK3zT8TH4MOX99ij0hajtHbiSU/gwcQT4lqosA9jVwQfiu2EqiOJAHIgD3d6BWqN+XS3TjsZuCL8DX83byXYF9axc5Aeli/WVocHtX8AfShjArgmzwMHwOkRxoLUdcGT1GRg2ngO/zLo1YBmw7vqpjz8AGw5R2zpgUDpj5RSjmX5ZOp1l4AjsBTAUtoWu0gZyqVEciANxoPkOdIcg9iayfwnc0nwbOmRPR1onAke0Cu3GjMHr5rAefAZPwn5wM0RxoLUd6M0BB4Kj/X5fXsjgqBfMCgZFL8CHMBgMqraHuSBqewcsB984qRFgu6AMbHeCo+Bh+BGMhCgOxIE4UBcOdIcg9vIuXFLFa9kiCwYJjiafAQYKvh4sBxYsRnGgVR1wVNV2YDZYF3yoMm1OWBqWBwNcP3UpNDkzvsL2ISxqewem5xQ+9No++DDhX2dZHPaH74OfGvig+w5EcSAOxIG6caA7BLFdtbAe48J/D468VsvvX6M40B4OvM5JfIvhyP8gUAaoPmBZD/3R5F+hLL/NNNidBtz2a4jazgEfGsTvlgfCRrAz+FnBAXA2WCZRHIgDcaCuHEgQ2zHF7QjWIxU65gpy1jjwjQO+mv4VXAP+KNJg6AMYCcUnBMyOI4OnV6AfJIgdx5o2WRjFUX3Y8C8T+O2rf9nEtJ+D5ZYAFhOiOBAH6s+BSeovy8lxnTiwNfm0sz8XMlI4/kJ31NUfBT1Z4XmmBkmfQy3p5xvwNDxTa4OktaoDfkYgPly8W5ln8r0FYBnwm1nLxM+PUtcxIYoDcaA+HMg3bfVRzvWYS0eo5oGlwZHDKA50BwcMWAeA38SuCouCI+iOjO8AL0IUB+JAHKgLB/I5QV0UczIZB+JAN3HAkdjiU6QLmZ8fHI1dAhoaOWdVFAfiQByIA3EgDnQVBxyJHQJ5UOsqJZbrjANxIA7EgTjQBAf8UUYUB+JAHIgDcSAOxIE4EAe6lAMJYrtUceVi40AciANxIA7EgTgQB3QgQWzqQRyIA3EgDsSBOBAH4kCXcyBBbJcrslxwHIgDcSAOxIE4EAfiQILY1IE4EAfiQByIA3EgDsSBLudAgtguV2S54DgQB+JAHIgDcSAOxIEEsakDcSAOxIE4EAfiQByIA13OgQSxXa7IcsFxIA7EgTgQB+JAHIgDCWJTB+JAHIgDcSAOxIE4EAe6nAMJYrtckeWC40AciANxIA7EgTgQBxLEpg50Vwf872Yn666ZS77iQByIA3EgDtS7A/l/5eu9BnTf/A8ja1/D/7pvFpOzOBAH4kAciANxIA7Ege7mwORkqEd3y1TyEwfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIFWdmAujrcCTNRKx520FY/VSpeUw8SBOBAH4kAc6DwOtFaH23lylCuJAx3jwHmcdllYGr6ocQkDSJsbDE7fgqHwPjSkzVgxLVwH7zW0UdLjQByIA3EgDsSBOBAHmufAFOw2P8zWvN27xV6LkYuP4BmYuCpHPVjeEQbDC/AiPApnwxpgoFpLZ5JosOuxy+rHwp4wVTkx83EgDsSBOBAH6s2B6g633vKf/NZ2YEaSl4fFa68eJ3Velo6DTUupszO/DExTSuvOs4eQOYPKJ+DrUkYddV0PToUv4RwwOL0HVoQ/w84wJVTrZRImAY9R1toseIwZyomZjwNxIA7EgThQbw5Ud5D1lv/kd1wHrA8/hK3A4PRjuAAcNWxI07PCgNVRxkKrM7Mr7AuPF4nddLoN+dqskjdHWcsysN0NRoG+jgZlcHo8HAgGo7U+PxhI+uvwLpQ1Jwtu/3k5MfNxIA7EgTgQB+rNgYzEtl+J9+FUm8C60Lv9TtukMx3K1meBI6jXwGtwGPgKuyF9xYr34cPSBr5CXxK6+ycGC5BHR6GHgaoOYg1WZwU/CygCWGa/txJsBFeBfn8JZU3Ogp8RPAV6W5bH81jvlRMzHwfiQByIA3EgDsQBHfA7xe+DP8RpqRzd3BweAIPC4XADDILOpC25GIOpM6F/5cJWYWqQavDdkNZixfPwy9IGGzD/JmwNE5XSu9NsLzJzOzwLB8D/YFUoawoWfDD4BHYCZRB6GxigLgq1ZHA8Ahyp9Rhl/ZOFR6C7+lrOa+bjQByIA3EgDjToQD4nqG2NAd2vwVG2i+AzKDQZM7uCo27/KhLHM12TdafBSDCg6Qk7g6/o94C7oKM1Axfgd5sPwRFQvML2lbXB2fhG7H1l7vryiOEHlf0MwAy2PEZLVX0cRys999TgQ4ejxwbT7TVCeSLnckTVTwkMTA32fUgp61MW/gyLwxnQB7zn5gcD1P9ALQ0k0e9kzU+57rmtD1bPQWt46vGiOBAH4kAciANxoJs44CvwW8Eg4SSo/vW4o5K+znXdhNSXDe6Bx2ABKGTw8yTcDK0x2lsct7lTg6sHYPXSASZh3mDbUcRFSunVs9uTMBQM/Astx4wB3S7gcVpLy3Mgg8I7wOsdAs/AS+Ar+02hPR7MDuY8jlofBMqAdgz0cqGGHNn2oeVtcLtrwaBcFdNvlr75dx8m+rdMOZF5g/Z34eiq9CzGgTgQB+JAHKg7B9qjw+9qpm7BBS9euegpmFYHYeuT9jWcX9mmoYkjhd8HR9X2hWeh0H3MGNQcBavCJdBcGXQbWPtq+4VmHuR19tsBhpX2d3R1Y3gZni6lV88a5Bvwf1haoT+FXNda8poMHg3w3gEDQnHk12D7LnB9W2pHDn4EnAvnVU7Uj+koKHtQWTV28hL/Gujq1XYwCCz708F8TARln9xOOZJb1qwsGMi6T38YCY6WR3EgDsSBOBAH6s4Bg4Lo/x2Ym9mt4DEwQOgB1R4ZlP4XJhQwGnBsCwZcg6FaN5DwCqwGvs5vrryew2DJ5h6A/QyEzE85AJyD5TXg7/A1NCRf538B5c8J3NbAzDSnrSXL5GF4HvTV650JFgMfLk6B2aG1VeRhPQ58MvwLHIk3mFRzgtczPp8MUvvAPXAO/ALOhb7gurL+w4KfrVwBV8Jf4Fq4HCaFw8HjrApRHIgDcSAOxIG6dMAOMfp/Bwxg54EDYQ+o5Y/B6RMwCXwFDWleViwPN4Ovuqs1ggSD4QVgRigCImabJAMsA0lHI1tLHvMHMCVcMoGDfsT66WEpGAl6sjToz35wDFwAZ8HH0BIZWG8Li8LnYBDr9LMK+tna0guDTMvyDHgRDoWXodDMzBhcj0/zsHJBOALOhqGgN36SoE9lb25i2U8KNoN+YD30gcDvqdVl8BQY7EZxIA7EgTgQB+rSgVpBWl0aQaYNJg2Q7qiwO1NH1sqjZI6O+QOixgScBnd+A2lw6UhlLY0i0YDMV8RNUW827lVhJaYGsY7KPQYes6Uyj3vBnfAkjE9+GvE8+Gr86MqG1isD4E/hUTDAM9hsqYZwgJ+A12fZ6KvHFYNnp35e0Jqy/P0m2MDT4+8L5c8rpmB5WngDGpL1pj8YdOuFx7wI+sKWYNB/NxTyPFeBD0CTg4G0n0t4bgPeE+EtcLsoDsSBOBAH4kBdOpAg9v+LfQdm54DDwEDIIMwRPoOlQgYjBhUGqOXg1iDmQyhv+ybLL4DBVUPyeK4v79fQtqY7urkLGDC6n8uWoWwB98IN0FLtxgEcAfRcE5KjgTuCr/RnBkcUtwGDc9MfAoMtA7iWykDOkdD21MKc7BzwoWFnMAgty09ODGQdKS3XifI2ls9MYFBv8Kn04yWwnk0P1dKzd6oSrS/WSetaAtgqc7IYB+JAHIgD9eWAnWv0ve+thQk/Bke/bgODCoNVA7JyEOqI2MRQBCtudyZsAgZX+0B5RM3ty/uz+K08Tl9wBO89aIwMdh+A48H9DHJWhB1gb7gRWioD+UPhb3BHIw6mF8NhBJinL2A1mAVeAz3syrJu+Br/FzC4RkbMv1jWDX4JBrAAACpYSURBVMlyM+j0ocN6pQz4N4RR8Dw0Rvqriuk3S/k3DsSBOBAH4kAdOpAg9psf5Rh8vg4XgMHG1OCoV3UQ6zpHwnz9b2DyF1gXzoLV4SJYDhxtM3h15K2hTwUcqZwfrga3b4wMlhz5fBqc9xpnBAPH4dAaMoD1mg9u4sHMr6hZYTSY/64u68SfwZHWWnJU1E9G5gADWculWtaboeBDj/XDY50G64OfBzwLjZH7zQAG1WMas0O2iQNxIA7EgTjQXR2o9yDWINBXxKuCI22Pg+oBemPAarBayGDxXTAYWQU2gJ/BH2F5uBs2BgMfA7g3YXbwPO5b1tYsTAeDoSmjlQZJvopWHndaKEb6TGuJ+rHzj+FMeL7qQAZovcF8TGjk2G0ddewOMkAdn/T+KXDE1vKwzlTLMhsCj8GfwfL+BA6Bc6CxupcNfVPg5yxRHIgDcSAOxIG6dqDeg1hf5zoKezFcWqoJvq41EDNYrB5Zc9RsATD4dTTM0Vj1EhjczeMCcoTuBVgM5gLXF9qUmd3gMniwSGzG1BE+g2Cv8ZVm7F+9yzok+H3nw+C3oFPDHLAMrA7m+3xw9HB8eoKVBvd9oDWua3zn6gzrTuQiVoWvxnMx+rALWG8MYh2BN/htiu5m47WbskO2jQNxIA7EgTgQB7qfAwZkBpAGBn2hLF/zvwgHg0FdWY6gOsoq11dWTMJ0eXAUzuC00GbM+Ar4cOgFM8FPYRTcDvNBZ5KjyI4QOrpoYCzOG5DfB4dBY665P9v5cNAPojgQB+JAHIgDcSAOxIFWdMBg7DhYp8Yx/QTA0cTfgK/8y3KE9l/gqNvfwG9ifwzPwFCYGQrNxowjtQaDBoK+mnbe4HcAdEYtykX9ALaCjWBJmAGiOBAH4kAciANxIA7EgS7gwDFc4x4wTY1r7U2anx84yuo3oo5ePgIrQrWmJMFg8Cg4Ggx6/eY2igNxIA7EgTgQB+JAHGimA44qRs13oB+7OmprMOtIrKOzURyIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTgQB+JAHIgDcSAOxIE4EAfiQByIA3EgDsSBOBAH4kAciANxIA7EgTjQOAcmadxm2SoOxIE4EAfiQBxopgPTst+iMAr+V3WMiVmWiarSXTTtR7AhPAOfgHJ7++/qY7muOZqSnbzGL+Dr5hygnfcx75OCU71oLR84VBQH4kAciANxIA7EgThQOHABMwZaaxQJTA3AZoMtYX/4CSwA5WB2apYvgsdhYSi0LjN/goFFQgunu7D/IzCohcdpj917cZKD4F54CH4Hy0HZNxYbpcnZSpqzb6NOkI0adMCHkLmgT4NbZEW3d6Bebrx6yWe3r7DJYBxoBwdsLzpTm7Ee1/M5GMQeCcoO/AfwOpjuCKsjoG/B7lBoKmYMgA3WFiwSme4Lbu8IbWtoVw7yDuzYGgdrw2MY1N8MevYsGHjr7YdwADRVh7PDr2Capu7Yjbc3qNcPp20pg9eb4DrwfmiWHIaPup4DNtAzw/LQ1o21FbnZFYx9W6qZOMAiYGMetb0Dtglzg68Xo7ZxQI878p5yBHCytslahx9Vbx2d7A9t3TY2JrPeR8fBaPgU+oGaFy4BA8ctYBk4HmaEvWExGJ9eY+VHYLBhnlsqP3Pw+nq39EBtvL+Bvw8Fh4Cj1kvDkjAYDoPtoSnanI0l7d03rjky6gPS5fAzmAHaStZb2yHrcM/mnqQ1Kn9zz539mu+ABb81+ETaWq+Tal1NDxK3hTVrrWynNPN5AyzbTuer99P0xYA7YSNI+4AJrSwfPu2EHUHriEDWc64AG4APqJ1d1sFZoLGd3Jxs+0dwhK2x+7Bpm+lAjuy3sAZdQ8HrU2uD/v8EroHXYWEwML0LHF1UjrZ+BZabDx+FDH7dZjoopxfrmzp9jx0+g9nGs6PncSS0ut7YT7RXXV6Oc/nd7u+h0FPMGHC9BTsXiY2cGri/D/pcz/I+82HgXDgRlofj4OfQVvqAA78KCWLbyuFOfFwbNQvfp0efRNtKjn6eAnu11QkmcFwbzSnAfDrtCpqDi5ynK1xoA9e4EOm+5mmvTqmBy+jQZEfwrHutLQPYP8CNYJDVlqMcHL6mDHrs8O2g+kJn17Rc4J/hWHB0ckLtwKxsYyBmB2lQ1pGybd4PboGLYDR4fepLsJ4VAaHpq8MFsDs8C8pA9WOwo7c9LmQQ+wn0hta4V9/lODITFA+vTg1aZwED7M3hV7AxFNfdj/ldYAvwW9W21kucYDJYsepEH7J8F3hPNeU6igcEy6Ihuc7j2rY35dgNHa8zpnvP2NevAQau1l1Ht122P2gLWX/fAu/xZreFrVH52yJz7XlMG0ULSUNHQld4IvPGew5s4BaHS2B8sjESG86m6H9s7BO65+soeQ3jKxMbmNnBhu1V8Cm9o2SD/xdwNOX7HXURLTyvjYmeei/ofWNkwGf9Kry3IzRYegMMJjpC3te2b3ZuTZH7LALWqZugsR6w6XjlcX8EP4Bj4RJ4EwoZoEwPY8Cgpa1UlJP+WE7P1zjRjKQVwdYI5m0DOkr6/y5sB5vC9nAPNKSirTOALepjQ9u2ZboP3ieD1/GryonssH1zZls1GN6G02FvmAtMvxfKsu2zXfN+MtAoZD3x2OXO3/uwuW21ZWx99Hheo9c/ABaEZWEJMNiwn/wr3AhzwJVggOv2v4fLwHzVqlckt1hXcYRfwGnwIgwF9SncCiOhKW2O+ekFDQWx3gurwgYwH/wbToCOvCc4favLsjafN8NZYF2yDNeG6eFlaG3pvfeE/s/c2gevp+OtQ2afgetg3g7OuEHQKtCnEddhof8HvHHHJxu/LcCnq+XAhrKxstF6Cv7Z2B1aeTtvpP3hHdikgWOvQPr1cD9YlpNCLdlJLADT1FrZyDT3tXNv6BwGKHa6B0FZPVjw3NavycsrmLfxNJiYsZLek+lCYLm1lawD/SpUX88epJsHO66GGnZWfSvr7EZgI6+WgcvgTlgZmiOvybpX1lQsGHg1RguykfXmRPC6Grsfm459BW0HaWfYmu2B1/8IPA61pN+2QT+qtbIV02bhWJeAnUete2p+0s+DYTACjoWiLLwfi3lmx3Z0fZlav9taa3GCM2H50ok873xgJ1toMWaegLPBwKqjdBgnNrCy3dU35TV9BN7vahsYDu/CELDO2Z5Va10SXoVToTiW9cm6dDWsAR7LcxXHZrZJ0sMLYTjcAaPhfTB4eRQuAOvmolDcT+cw/3kl/Qym/wP3uRjaUpty8LfhAbC8WyL9M1izXa9WLxL+CJ/BC2AZfQy7QXNlnZwNinIsjjMnM5bzpEVCO05tw48Ay+/PlfNOw/R8eATsu6rVlwTjCfPSkIr7zzzNALbr1dqRBNsip1EzHOjNPt6cFt6XcDA0puNmszbROhzVhuwmWGgCZ5iO9ZfCi+DNVkuOShhQ2SB9Dc/CJlB9A5FUUz1JtaH4d821bZ9oWRwAH8IPa5xuZtLuBD0zf/8Ay7SQDbpBzAC4Dp6EY6BohJltkvTOBnq+BvbypvdavWEL2UDsBZ77ftgWytLjI8Gga1LYGR6D1aAtZJ3YCm6HO2BFKGtPFrwfloHyvWAdc99q9SfhYbDOLg12eB/A6dAPGpLHtqyqj2n6xnA0OC+Lw/Ggj9b78WkQK/XvDXgb3oXqvJDUoLw3fgR2xjtBU2ReLHuPUa0ZSfA+vKh6RWV5Mab3wVlgPWgtzcGBDDzmAY/rPXEV2DH/BMoywL0Z3oSzwbK0LswPahCcCAZQRbncyPyG0BLp2xLg9WwKPnBOSHq8OQyG8vnnZtm6bR5tHzpCq3DSd+B6mLZ0AUcybzvVr5S2FPOXgMHgx3AZ2Gb1gkIGmBfBCNgV9GdheATeg9fA+voWLAmWTVM1GTucBNYLj2e5e/0rQQ+olt6OgasrKyZnal/kfrdU0tpysiMHfxU852ZQtOnWC4OurWEQFD5a981jIT3UJ+u5bUVfqJbHNT9/AstMbFMMbJsrA9VLYdaqA9j+fwC9wfthAHivtoc8z7VgXs+tnHB5pk/CFWAfpaYG69064H1v23o5eM9Vy3wcClvCXnAe7AO2R2Xpx+twcDkx8413wIJ6AR6Hx+AeKBpsZttdu3BGK4aVaTAMhIbkTXsgeFMt08BGNqZD4WrYAbzh/wsGG9WakgT9WAOsgMpKa6f2LHjDt6VsYFaHn4M+GFzNBubxC9gVqrUTCQYGu8H9cB/MAoW2Y8bG3RtTTy3fB8Cbtjnanp08zn5go12tW0nQ40I2nJvDp/AQDAHLYxEoZAPgddlY2AE9DI/CgtBcTcOO+lkt07eCZ0BPzYsNi9dZ6KfMmG5dKMrcsjgTtoFqzUuCnt4JF4IdgnkuVByjWC6mfZj5HcwP5W3shK6Cj0GP+4L+eE2W9V7QkPTMe3kYbAHm5Suw3Mp5ZHG8WoK1r0LRoI9348rKXkw9n/v8AqaDsvqy8AmcWk4szevBPFCr3C3LKcDOrSy96gfeu9XyeJbbNfAUDAbvpQ3gX6Cfh0BZLhuY7A49wX1HQX9QLn8O04PXchp4nH9AS7QeOz8Ntn0fwt9gERifFmDlf8B7auHShlMxfyk8CNVeNqUOlA7ZpFnL/TYYCUtV7bkny/q1WFW6+9j/vAP68DZ4bywEhZZl5m54szJ1e9uVz+AC2Aks7x7QXB3Mji/BoXA1DIejoCh/Zr/Vhsx9Dd+vpPRhattn/u6opLX1ZCNO8AR8AF6z9+AccBN4ba/AKTAXrA/2E7b91l092xQOh4/AtrdaG5MwAparrJiNqe3C+ZXl5kxOYCc9ss56jxY6nhnbZO/nXeEuOB28XmXd9Rq3Avtv28bWkvm6F7yuP4H3nh5a1zxfIcv6IXgPhsNV4D6/Btunsg5iwXUfg+2ebZD39kVQ3nZZlp+HsyFqhgNW4i/hDNgbbDx2hI6SDYMNmZ2MBX8T9IFa8ka0UrndTlBLx5JontatrLyGqRXr59CjklZM9mXmBRgOa4Oyc/Rmfx1sIMqakYVpywktmDcvO4DnMf/ePC/BxXAdfAX7QbV+S4LXvAvYuPwRytd0AMvm92nw2F7zfFBuPFhstKZhy7vBG7J/jb28wR8tpevZnfAc2Bjp60ewDxSam5nb4Tw4DN6CbUHZUG0OA0CPVA9YAWzsquU2q8DvYScoqycLlvvLoMf6pScGEGVZDvq9GuiTeRgC+vgGDISy+rJwC7huKJiPatlp/whsLAvphcfcDiYpEivz1zL1OicDO9bPQG/ugTvA9Gp5jHPAvG1VWbk9U/f1nq61T2Wz70xmJ+UGeACm/87a2gle34fwIpivTUD/CvVlxnvVTrWpsowOhLJ/1kXr0c3gvVH2kMWxv4K3Lnr/Xwq3w2swDEaC13gWTArK+nEruP0xcA2Yn8PBOqf+C3eNnfumbj7GvMcxfapKelMn07KDPuvbzuD57CT/DTNCtfTUsjTvn4L1p1rHkfAKrFFasS7z5mt5qPaqtFmLZw/lCHri9VXXua0r68rXRdLYUTnbCOv9/PAHsB14EFaGQgsxczJY5n+BJ8B8zgGtoZ04iG3CZjALnAO2V5b5BlCuzz9i2XzaPi0L14PbWsesd+2lBTnRVfAJ6Nue8AGcD2fDm3AdPAJe24qgfgMbg/mwHq0PE0NZU7GwDeiFsu17F051oZk6jf28vv5V+x/N8hdwCHwMT4Pn2h/UWqCvn4EPb/YRxb3LbIs0K3vfCZbn8zAERsHPYXJQ3jMXgNuI12V9+BcMhdmhkPv8F9xuDOwLencSmDd9LzSAmbvBMpq6SMy08Q7szaYa/SvQZCuOlX866AjZSI2GA8Cb8Uu4CmaDWlqERCvJaTVWuo8V7FawkbOC3Anm94dQvgEMpLxh7oNDYQFQVsYDwU5lUVBW5rXhajgSZoaWyBthPngVHoVNYFs4C7w5vN6v4Dgoa2kWHgIb3WHwCgyCiaGQ1+6+I+GpIrGF0x3Y/3M4BCYrHct8vAR6XmheZrxpz6wkrM3UBszyLTQnM7fAX8GOwI6p8Lo/8+bLetoD1EHwAritjU9Z/VjQQz17HorjMDs2GL2AqevE8rasp4WyNmbhC7Ac1Nbg9ubhQzgFypqBBcvKbcybvlTLumw93bC0Qi/sPLaBclDh/LUwDMzfM3A76LWN4ItQ1E9mv9XqzOnV76FnJfU8pl7XdlCu75XVDU6mZM1h8BoMAjUx6OcWsBJ4bxTy/rGOWYY/AP3bB9ynkB2hnp9TJDRh+hu2HQ1LV/YxL8eCdcvzOh0AhVy/PZj3XSqJ0zP9CTwFpos+Fx30kswPgY/Ae8p69CuYDtQU8CZc5gLqC573fXgLapUJyROU9exD2KO05V7Mm9/FSml6uTBY//vC3+FxmBqqtRMJb8OPKyuWYOp9ZZ7vh7mgrfQ3DqxPC9U4wZqkfQ1bVa2bg+WX4aJKuveA1z4C7oT+UNZUlQXvtfdg+fLKFsxvwL7WeT1W3ge7wlDw+vYE64FaHLy+Z+AFsLz2hivBOlm0V8y2uXpxhhPBeuT1/xeKuvPrSrpl7zWuD0qPlfeydXh3mBwakvVvENhm7QzN1VnsOAaq6+ARpHmN1p2HYBl4EO6EmeFGsAwOhgdAz7321lBvDnIZeH49tF3QJ/NcaCAz94LbWO7eU8q68iV4vROBmhNsG56DfaDQAsx4/OOLBKae+2IwT/NAk1W+yCbv3MV36Mn196nkQcOt+I/AitAUM6dkezs3py2VnYc3iY31+WAjtQWcDBZ2tbwZXoFaDeYA0s3H4/AqzAHTgfJmtuIVWpYZ11m5joNnQbnN0zAVLAbKiug2m4M3vp12S2Qd3AZmgQPh7+ANtRfsD94IbjMzTAKFlmLG/M0K3hh2uPeBnUShzyoz0zN1m9bQFRzkNvgF6EUhG9KZwPJQXvNsMDnYcXrtdkzvwmAo5DV+AubPYMiy+gCUdXSaCl8xXR2OBuvJRuA1FPI83wfr4sXgfutBIc9rQ2Gndw/YuPwObMDLGsWC5/La1cbgvsfAY+A5yhrDgo2bmhSsv9UqPOnHiskqK3sxdXuPbcNYlsdwO+tcf7gJvoCRYD2t7gBIGjti5T1o/dE/y2ZlUDau0lhZHkPAer9EZactmf4JLqhMt2M6BSg7kxnh95XpxEyfgHK+PmZZrwpfmR1H7uM1Lw36Upb7WiZFHnZl3vru9ewP5ns1KOT+a4P15OpKoud2eyk0JzOivH75K/wUtgfbA+uL8vxfQg8XkNfpeW8AA8kB0BzZdlnW/y7tfC7zP4aXS2nmaRM4DLznZ4cR8BFU6yUSrAPzVFbszNT6dgksCSuAx2sLncVBfwYjaxz8rUqabV1ZX7Ng/ba+Kb2+EE6AxWFzKMv6oIaD+bAMJ4GW6m0OYHnrrcf1PjgPtoVnwOs5EKz33h/7w0NwD+ix7YllNi1MD+2ldzmRdfVa8P6y7It2yPv1LlC2HcV16bEaBvppPRxfnbCM3MZ7wPMtBcuD7W5TZF333MX5i32L6/Uaz4CH4X7oC+vDEnAxnAjHQS8wvTVkOT9ZOZDlvDfcDOa50BzMFN49wbwxhPJes52z75sIlPXDtsHyOB0K2cZ5zGI708fAULAO94Mmy4PWq6wsc4GVsmgIrTTewItCYzWQDS+BXRu7w3i28+awclhhrQi/gV/D9nAqFJWI2bGy8j0H5sP8lGVaT3ihkjgf02L/eZjvUUl3YgVVw8f++///WOH+C/qzYiX5h0z7wJFgA7A6eK3NlddhIPw43F51kEdZfr2SNiPTch5vYtm8PQv7gWXwBZQ1qrJg5/B5eUUL5j3HiWCQeAB4syobT8/zvAsVuc7OZRE4DDaGy+ERKGSDOwbc3zzamFknVTHvTW/az8Cy+CncAnYcRZla1juCnp0EHtMOuyyPZ505Dy6C6gCWpLGdkNvZYHve5eE/8BbcCjY0i0EhG7DH4QGwHtRq1G0Y3wCPqW9qbvD4b4LHKOttFszPymC53QvKdI8/iwtV8tzKOuv6Y8F6rooy+mapcf8OZ7NXwbxa948Gr/co8DqOgKVBeT/o2aSwF9ghDIFyvqw3r0B/qCXz+2PYB4oyLbazjnhs68DCcBgMhmPgH+D6FaCQdW5eeA1sUwrNwIztgOnWnzlgASikt5ajx/S+KsvrfxkGVhJXZ2pd/DNMBEtBc6SXltn3YRHwmiwvr6F87fZVA+BDeAeU11tLw0gcAX1hflgO7oVjYRSsCUV9YbZVZRt2NbxX46ijSfsK5qxap7f6YN7LuoOFl2AJqJXX50i3DCzDWutJbpK8F21v7TvKdfBBlm1zroeDYF+wrbsS9oDd4TpQw8Fr8Z5oT33GyV4undA6pWxTZwbvRe+LWcG6VOg1ZmRx8B6rlmkrgfnfFsz3wXB5ZVr2iaQJynN7LVLWe5UF7+V7wO2eAK9/E/DefwzUo2CbuzzMDS3VxxzggcpBLLta94ZprlP2Bfqt9MNrtZ0u5Dr9t14XcpsBMBlYbwu5nf3DlGAZNFkeuF41HRm3ArwPRQW6j3k7rlXABr8xsvGx0o1pzMYT2MYCHQn9oDfY4J0Mx8BOcAZYqQt9yowVwrzY8JQ1GwtW/FGVxKWZup1aAqx8hYoKWFTSIt2p+fOmWQE8xtZwF5wKj4Mdz0BorqZhR/Prsaplo75AJdGGv9wwjmD5RbCRcVpLdsTFjaSXraW7OdB5sBUYmCpvUO8nz1nIxkHtAtuD+xwLZVmGL8EsMDuUr9N6+SVMD9PCKnA7eI4LYGZYB5QBomVhR/MKDIf/a99MwLac0jh+WZPKGpL2RZaKbCmqz1oha4kwImMZWSdruZCUfRrCaJjJUAyFTIpsyVgvW6XSYrRpE2ksCZn5/fKe7zo93vf73m9L6flf1+96znOe85znnPvc932e9/3eT3tVgSD7do2DH4R6j5UyJ4s4fgytwfioBW+BehY2gB6eRPqE8ojMuXNIyv6c4wEQnt2Usi8p+mec0C3PAud7JJgwp4NybM7BMSX1BhUmz1tBGxTAUNC+2s+1KYl8rpuGY+4D+llvuAP6gvHTAZRx67P9UOMa3AzOLZZtJoJxKUnZnz7kmoW1CG2MQcfvvB2La+hRe+hj06AVhDm6Rm46KyCWcaZNR8G1YO5rC943H/S3naEKZNN4Kr3u2hWA89Hun8DBUBq5VmOgFwyDR2E4jITBcC7o59rPo3Y19j+EXUGbJWUOd0z1oBPok+Z27WR9a0jamKoK1+c8YSk0SDzJdTL/uT4No2sbUa4Mrmc2TaHSuWp725VV9qWNWkDSrnOouxieh7OhOqjl8P2q0s9xbG7StvpIRUl7FMCZ0QM8Pw3MDzVgTzDX9AT3UvOC9tLG8d7H6ao4d7zZ9nzz0G1wM7SCeTAD9Nt/wldQEunHjj+5ptpXaU/j0nYzYRM4FIzNWaDmg3HXPAOHMusjejC/N4CWWXpzTI5NaeOw5u0ofwvGpGNWS2AxGGdBm1LoDsbAOIj1ASf6zclwBBizJ0DwMYq/kD7WFvbb8BeX1p8KndNNwaTyRWbakzi+Cxpnx0xdcQed2s3rseIa5nl9Nu2qQh1wfdyEb4HrwSAdDHVB6Ug6fzWoDbG25WQF6DRuSjrbOxDmtzXloPcyBZ0oKR33adgDbgLtZvD6DYB97QRtoLT6kRvF8cYyge8LBvtTYGJyXWK9xMl2cAnE6xUShIGpfZTPKE9pC/u/EXx2U/gfTAP1ExjY2t8xzgI3gMZwOlwFIcgNYO2pTBD2oxaB9+8CTcCk/BroF85d3z0JVGf4DoaDz54OJmXXJ8h1tv4yuBI6Qge4EP6VKXNY9ZKzG8dzweRjklFuAk/CqdAKgvTDF0F71ALvSeplKhrCXpkLe3O0P5NjLOfuC4raHbSh81SLYQm4QSWlPa4D23wGl0I/8F7HpD+VRN7nvBvB4eD8nIN6FRyj61cDJoM+1x4Gw9MQ1pDiKrmub8CWsMeqmp8/DAygrP9oQ310RabMoVCzKWmnc+BYeABCzFIs9KsmniCfpd2c92ag3Ay7QGUYBW/BK9AJCsD5TIejYWfIJn1EO14D2uUZcFwem2XgUCItoPXl0BvGgeM255gP2sENcDeYr/R75XX9fDu4GepBLP1/MtSE0zIXgk+N59wYbAiu2ZqU8TkTWkCYi8//BrStc3Y+BXAc9AfnOA70j6T0Ff2+JeyavFiK8x+45wXYHLqD44llXPWCP8IX8YVMWZ+fAfrEAZm6ijhou26gH7qGx8M9oH0vgIUwEMaAdhwGN4L5yXEZF87RmFBjoRrob0HGwSHg2vwVBoF+9RicBfrsI/AtlERf0dhnV0rc5NhcY58hytgQx7YMPoWgf1Nw/Q+ETUNlGY6Luffv4NgKICnHNydTuQPH+mBsdYUnYD4ELacwArTf1WDOGgAd4SGYDbGMicFgHvT6P+D3kPQ/qgrl3vAguO7rrY5k5ivhNWgSWaELZYOgP+wNlWFNyuAwGbiIG0cPrkrZ5KGj68AtQekYBtIZnmS0Ece7wMTdCHqAjnU62K9JRgfcBJTtDU6TgM5k4O8GG4AyQRpMjutJCEGzC+XXwURaB0oj+3oYvobOUQfNKE8Gk2pzeA4mgfVB2uROMMDfBze2UfAM7ATqbnDcT3lSzupAfyaSofAaGOSVIMi5aef3YCl8DJ/CV+DcTgBVH7Sh4zSIDeageynoj73gB+gKYV20m3M/DOaC81au57ngc7pArPacjAd94PMMtpsEJkTleBaB9Y5JX1A+twXMhzfBdkHOuw0cBLZLqhYVE8B1uh/stydsAknVoMINcyUMgaCtKLjexsCfYS+Ipb3rQu1MpeOYBk9DtUxdSQ6daKzNfd6FiRuHcf4hNAHnrk2d00WQK2c05pp2Hwmu6zIYDTuA9/wFXEdtGEt/eAfs33v2hFgtOfHalZnKjTn+LlN3C8emcAV4r/6lnVQ7mAljwXhxvkvAZ50H+oNr2hpcJ/kItMd3sDOoVrACbvekDHLc20IN0F+0l+N3bt3gJjCOtLn2uha+hgnQD5yPPqLM79PBe8dBQ1At4BtwrM5nTesyHuiYHHusLTnpD87nc/gCZoH7gddyybU1VkZC9VyNSlBfhba3waOg/Usq738BZkDws5L2UVx785t5QDsOhgVg/moLxvwhMBxeh6the1A9YQm8Debkk0Gfqwr6tfF8DLgOi2AgBBmT38MpsA1sDaXRmdxkXjsicbM5RD92L7d/tR04D+f5OMTSJ0bAB9A8vlCGsnnI5y2GAkjqKCqmgrE/DYx5bdwUtHus+pyMAv35S1gK90Iuu+k32qQP9IICsC6XXFNzsmu4XkqD9wCd40XYF3SEE2AIaHg3cK81gHxUNZ9GebQ5jjbLYQDo2LFM3KeBATYTzoD2sAxc0Fi3cLIQDPK5YGLxRXML0BE/hJoQVJvCPfAZuNHqpLuDMhkdC/a5F8TyuW4KvcGEUFK5Fj7nXdDuY2AITAGT+YmgOoPzeR52hSA3vfNgNLwP78HDYAJQ+4NrebknFaAr6FM/kgez9O9G2QxOBROq4/AFw3HFAd2Tc+d/PWwOQS0pmAA+Bp/REbSZagPWzQcTrL4Q5LUFcGOoyBzdAPTpY+APcD7oc7tB7G/dOHdN7gXnEOT9jl8fPCNU5nl07JPgJ3gcdoRs0t/uBud2QaKB43wMvoXbwPEUpZe4OAFiWxfVPr62Nydubvqh9gpqQsHNw5iqm6lsnanTLm/CQzAY+sJmoMwRo8D568s3QEPYENQJYMLXj7aEWLdzoj1GQNjkwnXjbirMhfCs6pQdg/dYb0z77MYQS79bDv3A8blJTwRj2jE6nxlQB9QVYJ+DPMloK47PwDzIN19mbi08ON7jwXUydg+Ca2AK/Jg53y9Tvp+jqgYnwlhwfl+Am+rhsAO8Ao5V28X21A6fgeu4AaxJObc7QbsnpR3bw6VwDrQC16Q4XUcD59kBgi9RLLW0nX5SuRQ96IvnwUqIY6YUXeW8xTVzjY2jr+FvYF4I8noNMLZi++lb7lPvwHNwIAR7dab8OSwFc8tQCH3aphNoY/3xfTAOSqOa3DQfJsKuEPzP47kwEjYFpS2PgpegKyRl+x/gouSFMpybx+4Dj0m5D+wDzv0euAzcu3OpLheOBn25I+j7xcm5b1Rco8z1sHZ5Nv9tNTM4+4BO+R2Y5BeAAeHR5O01F2tzKE71aDAVTD5llU6xHB6EzbJ0pmO3g/FgEH8CBl8PiNWBk+ngPF4BE2LQSRT6wzahInP0fD+wr4shvq5jbQlJ7UTF0zAcTByllQnjDpgI/4GXoRs4X2UAnQ/PQgHE0vEdh4m3EewAwcG9zxe66lAR0peuhtGwZzEPcD0r5WijbfeH2lmu30yd6yghsdrMefcEk9ylEOZMcdUGfxDHZp7kkGsq2WTf2jKb3ZzHvqDNSyKf1RQOhaLuNaHXB5Nz0qe8Zp0bUGwLTrPKhOzLTd2sV4uubM7ld0G7vwq+PD0Dc2AZdIfgnxRX/eyjN8cX4SOYDc9DyCEejZUVcDlo41hePwTagX4bqx4nl0AL0I5JdafCscU5oybnp0M/6A7ZbF6N+lPB52pbn2scdQZzgH51IoQ5+KJ1JMQbkuMpgEegAZRG5h3tZc6aCUvBD5/joCsYN87NsXSCIH2+FhwMfWAQtAblWkwDN9BYbTlxTe+H5BrE7SqqvDUdb1FE565BtjXOdYtr0g1cX9fw11Z9BrAQRlfgQMy77eEwyJajcj1auzcEbaWdgywXgHuM/uIeEqseJ6PAfHAX+AG3tDqFG+eA44/Xy1hM5n99vi6E+KNYKNv2hQ6FNWUvaAdj2+fmkrbXh/ONnQ1zdZTWl94C23Cryc5ENgZugKvgZHDj8tPPXLBNthc3qleTC/on8JuUskonGgZnQRxkyX4bUHENmPDHgokjlkl/HzgCbBs7ktecV1zHaaHcmG2Tr+rRcGcoarz59GWCcR72ZZJJBomBbOBWgbVJjqcm5LJnWcdqcnODvgySycVzbZUtyVG9WpL0fF1Scq6lGftF3LQSWkG8YeTTly8HA8E8MRs+hokwFHyRyuaHroPr0QiaQD0IfmH9QvgGroBcCu2T1908cs3B5+qDyeu+DFUFYzqXjNtk7NqPOUByjYdLhfJ+P1wk+ylsUEzBtT4PRoAvlxdAG6gFziHIcq5nhM015C7zcn2wPqneVJwDRdklec/afB7baE2PsxkPPDZ6qGvZH/4L7aL6daGY3HPCmI2BHcEXSvNCMs6oylv6Z2Oolvcd2Rs6BvfM8siT2Z+Q1q61FnAzGQ7z4GgwkZno4kTwAOdfgp/ai5POpEOWlzNVpy83yOICJbzUuXnks9HQLNU6agH9IdtmvI5Op8KGnYybjjxpBZwEcXznOwBfolpDQ3AD89wPwSXty1jeBRzLTzASUq1uATf3bcGXhPAiunqL8jvTT3J98Cu/p6wfPfVlmougTjRd/+Li/jk0qkuLqQVSC5STBdyQ3oC3wU9X2bQnlXNgPNTO1iCtSy2QWmCtsoAvlo+CG2f4c7ffEvmNUC/I9Q0el9aI3OTd2P1mdzL4YTVVaoF13QIHMwF9+vJoIn5D6BdBs6FRVJ8WUwuUqwU2LNfe1p3OljDU+2AQLMgx7A+oHwj+Kc6ATJVaILXA2m2BlQxvCnSBS8A/DX4G1vvzmeL+skGTCpUvsLMyT/CbQL/VTZVaYF23wKtMYBKcDeGd4ivKT8D24F8yUqUWSC1QjhZwM/MnBFKU/ObGF9iS/umwqD7Ta6kFUgtUnAWM2SHgN0P+7vR4WA4XwK/9Tax/Ive3go5tHhwAqVIL/BYscAaT0K/9i4c/e/InNz3ge/B36alSC6QWSC2QWiC1QGqBPCzgt66PwHfgxurv9ZrA2qDGDGIqvAPpzwnWhhVJx1AeFvD3xa9A+IC2IFOewDH9OQFGSJVaILVAaoHUAqkF8rWAf2UZAG6i/jkz/JmT4q8q/wrkP4GG3+z+qoNJH55aoBwt4P+X3A9+ePRnPLeC/0SdKrVAhVng/xICUUiTd15/AAAAAElFTkSuQmCC[/img][br][br]Beschreibe, wie Max bei seiner Rechenvariante vorgegangen ist.
Ein Fußball kostet 40 €. Der Preis des Fußballs wird um 5 % vermehrt.[br]Berechne den Preis des Fußballs nach der Vermehrung.
Auf welche Arten kann der um p % vermehrte Grundwert G[sup]+[/sup] berechnet werden?
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Information: Vermehrten Grundwert berechnen