Vermehrten Grundwert berechnen

Der vermehrte Grundwert G[sup]+[/sup] entspricht in der obigen Aufgabe ...

... der Salzmenge vor der Vermehrung. ... der Differenz der Salzmenge vor und nach der Vermehrung. ... der Salzmenge nach der Vermehrung.

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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[/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.

[br]Ursprünglicher Preis: 40 € (100 %)[br]Vermehrung (5 %)[br]Vermehrter Preis (105 %)[br][br][b]1. Rechenvariante[/b][br]Der Preis des Fußballs nach der Vermehrung kann mit einem Prozentanteil (105 % von 40 €) berechnet werden.[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAhMAAADTCAYAAAA71JG5AAAAAXNSR0IArs4c6QAAAIRlWElmTU0AKgAAAAgABQESAAMAAAABAAEAAAEaAAUAAAABAAAASgEbAAUAAAABAAAAUgEoAAMAAAABAAIAAIdpAAQAAAABAAAAWgAAAAAAAABIAAAAAQAAAEgAAAABAAOgAQADAAAAAQABAACgAgAEAAAAAQAAAhOgAwAEAAAAAQAAANMAAAAAP5S+/QAAAAlwSFlzAAALEwAACxMBAJqcGAAAQABJREFUeAHtnQWcJMX5vwMHd8jhbsfh7m7hcA3uEDiCB0vgh0OABAhuQf5oDg8enGCHBnf3O9zd9f88xxQpmtndmdmZ3Z2d9/18nuuq6urq6m9VV71d3Tv3m9+EhQKhQDMqMAWVPgMmacbKR51DgVCgdykwcu+6nLiaUKBlFJiAK10Sxm6ZK44LDQVCgR6rQDgTPbZpomKhQLsK/MDer+HHdnPFzlAgFAgFukCBcCa6QOQ4RSgQCoQCoUAo0JsVCGeiN7duXFsoEAqEAqFAKNAFCoQz0QUixylCgVAgFGiAAjNT5vXwHJwIM0JYKNAtCoQz0S2yx0lDgVAgFOiUAv04en/4Bv4BM8BmEBYKhAKhQCjQxQoM4Hyzd/E563U66/0kTF+vAqOcihUYjZwjVZy7MRlnodiHYIHGFB+lhgLVKRArE9XpFbm7VgH750QwZoNOewjl/r5BZUexXatAH07n0/mkDT7tPJR/OSzX4PN0VLy/L/IVfNBRxtgfCnSFAuFMdIXKjT+H707HavxpuvwMXtPfYaUGnNnBeDG4oQFlR5G/VOC3RP2BreNhml/uqlvMZf+dYJm6lVi+oDdIvhBeKL+7y1LH40xfwGdddsY4USjQjgLhTLQjThPsmpo6utQtj8GS0JvM31LoD1M24KJ8iv0O1C2sMQq4WrAjXAPjwtzwaGnLpq72JaXtA5cVSrUOg+Fe2BQ6a29TwFnwUmcL6uTxOtpe87edLCcODwXqokA4E3WRsdsKuZgzPw9OtufCMaCD0RU2Cifp2+ATOVB+DE5ETgq1mHqsBjolufmE/A64VBzWGAXmpdiDYGNYG1yhOB+GQL3tRwr8BJxgc/Pbkr3Byd/VkU2gszY6BewAi3VQ0BjsdwXMVZN6mN9peB84brvVGf4BRgXvkQ1gXyj2dZLCQoHGKhDORGP1bWTpy1C4E+JgeBOOhM9hfWh0u47POVxS/hs4YCZzgJsIqnEyfEXjgF/OdCY+BJd0dV5qMeu6GwwsHKwD9jo4IIc1RoE/UeyNcGVW/F6EJ4Nls7RKg07ME7eR2b43EJxUk3kfOOEPgw3hL3AEdNYsdylYOSvINO9H+5tmn70A7oH9oR4OhY6xTsxmsDBMAV7XAeDqj46b98vXEBYKdKkCjZ50uvRiWuRkE3Kd68CK4NLtR6D5BO+TlwPNONAoG5uCj4aNwUl6DtAcLLeBC+F0mAfKmU9RyXxadXVFfGot2vckeH1OEPlxxXztxR9m5+rg3+LnNhWR4RDORK5KfcOzUdxrhSLtp3eBk3FuPk3PC07C5Wx+EoeAE7T9TOchN53ag2HVLNHxbSZ4vpTmqsjj0K8Ur3Xjtwo6CToPY5YKsUydhnVL8WPYDoRdwf63EnTWfLUxCywNajst6NCMA2fCIDgRvoWwUKBLFfBmC2suBXzy+RMsAi9B3oZXE3dQXRCqNQfdc+E08AmoLVueHfOBT0RPwQDQ5oRt4ApwMLsIJofcBhJxQB8FXI04Do6AG8Gl6HL2AYk6MCOV21lhmmV8k+VVI+s2DHRYwhqjgBOtTlvRHiBhxkLinsSvhVvBFa/JILe9iLwBZ8HusDXkplP4AzjZJrPPONF+WEoYznYTyPtCaVdVG8/zIrhSYt/U7EeeR+fa+2c92AIug+tgNbDfdca83z2P990d8DacBIfBGVB03EgKCwW6RoF8IuqaM8ZZOqvApxTwOfh64MtCYe8RfwYGZekOpkuCk7fbcgOaA7eOhIO/zsHdMCWUs7lJdNB6DhzARwPN+jjYnw0Ooq6gLAi5TUFkabDfbQsOiP+Cc8Djp4KiOUA7YM8Jy8I00FlzpUOnzMnFiSGsMQrYzrZ5vqr0I/E3wX7ZD5I5Cd8C+8EKYP/S0TSP7T8d6KDaVw6BjcEn9WRfE3gY7Ef9S4m27cuwCswG1ucdsA6dNcvxPNZN+xbuBu+fzcAJ/wHQbgOvL70CMa0W8xxfwWqwKUwP54NabQNhoUC3KeDNFdZcCuhMvA4TQLn2G0Z6PuE6+V8Ij8CVMAy2gtyc0B0Yd4QV4CHwmHJ2NolHlXY4KI9UCuuI6OTIYuBA/xjk1peIg+HE4LK1ZfmU+AJ43OxQtHdJmBVuhUtBZ8lyt4e2lsTZ1a6pXT94s91csbOzCtimOg0TFQpKfSZPHk7E/mQf1QnVWZgXJgXNY5xMzfM0jA55++s46Ew4madVDZ/iT4U3wP7/HjwPN8MuUKwXSRWbZVkn+7mW6qWjui7cY2LJnmBrfxtYite68V7ZFRaBKeAE0GmZA4ZA0cYn4V4YWNwR8VCg3gqUm4zqfY4or74KOEA7gGi2n4NYbg6qfbIEn5wc0P8JTuL/B078qe3HIOzg/VYJNiNWDRZmO4+RgvkUpLPhZD45OEharpYG0osJHwEvmZjZKISt37RgvXUiNAfJ4TCjkYL5xPkFLAcTggPnReBksAHk10q0ItOZcKL5qKLckalWBd7nQPueE18y212n0f5m2yZzktcRSO15JeFlwH5hn/8EUv9w+xUU2+9F0mzXmSCZDuMq4FP8hnA46HRsCZfB1FCLfchB1t97YKRSAa+yfQe8vmGQbBgBr2PZlFCn7bGUo0O0IuRapuIXJ+C9puMTFgo0VIE0oTT0JFF4XRVwMH4WnJSdyI3n5kDqhJ/MwXlUeAUccM4GByGP1yxD06noPyL002sMz7FEKV7c2G+c1H3y2RnOg+3AwWtvOBL2gqJZVwfeKcGJ4FPQvgXrPIORMvYdaa9DyncQ4ZnhLHDyqNactD4GJ4Swxilgn3P1YKrSKZz4Vod1wIk8txeIODHnjkfabxvfAx47H+gQXwU6GMmWJjAQHoQVwD6am5P5f+A08Pi5wH61IRTzktSh2Xd0lqYF+7Rmn757ROiXPyZlv9cB3hzMXy/TedkJ9ofdIV+pIfqzTp8ZCQsFGqlALTdRI+sTZVemgAOjA4mTvxPr1KA5SM8Nrgwk+5rANzBuSihsHajFAT+fzF8j7uBeznzS2ROc4M+E4+FEGAamHw3lzEFtVPDDNScCny41B3WXrgfCWJCb34Xo6KTVj7RPx8IVi2rN83udLn0nZ6baMiJ/ZQo8RbbRYAE4Ga6DQ+BYuBJye5GIry6myxOzsP3Mcs6DG+AfkMz74BywD1uuKxE6HUUbm4R9YS2YHnQIZoNaxkHvqZdgdugDye4jYN+2f+Z2PhEdjathuXxHJ8PXc/ymsDGoyxGgg3Ep6LgcCGGhQMMVGKXhZ4gTNEKBVyjUyd5J1kHxTngcFgSfUgwn+4CAg1tbzoSDopO6g/QwSOZg2F7/GIn9DqK3wkNg3kGwODhp6CAkM69PZ++Cx+gYeE6dGO0HeA4mBJ9ePwXNwd+nLfNOAKkcgjVbX45UMzUqDvg1FxoHllXg0VLqpGwvByfSJ+B1sM1zs5/6pD8jDM13lMJPs/0HHAAbweeQ7CQCOgZO2PavB8FJdRDkZh/UeRgMY8JHsD2kfkiwKvP69oNRIfWlJwlbl2KZxv8Au4B9uZ7m/fYY6KT4ysNxwPvJ+HAICwVCgVCgTQXOYo8fVzkoHggnwPwwMuQ2FREHuCvyxEL4ReLrFtLuIK5j0pbpEDgpzJ1lWJnwmzBrlpaCaxBwAndwc7n5ePCpNdkMBB6ApUoJPqU6KRwOt8OWMBJ01sanAJfM1+tsQd18vE/EtquOUU+1AVRMp0EnoqMJ1H58MRwDxT5M0s+mQ+HEbX+3DU8Hnc1ZIJkO41gpUthatvvtvzrjnTHL2AwsL7cliLivnNmH69GP2yrb69Ohak/DcsdGWijQKQWiw3VKvm49+BHOPjn4GsNJfwdwMi4+8Tm5vwMTQVtmWcsUduqEvFRIy6NfEvkeXD1wcNwP5oFLwKdQJzsdAvfNCWeW8IlpeXgKnASSvULAyXFNGAcsx0nDZemPYADUwyakEHmmTGGe408wXpl9kVS9Aq40PArTgk5ce2ZfeAjM27+djDuybz3QYT0M5gAnb1cukn1D4NMUKWx/IO5+74kvCvuqjVrGWWB5uemIu6+cuToijTDL9fq8L92GhQKhQCjQoQJO/k6yk3aY86fvGZ5vJ9/K7BsO85fyzMrWAWnmUrytzc3s8Anxt+AqheVoJ8EwcKD9K+g4mE9zsnYin9dIwRYh/gg8DA9AurY9CHucjklnzRUOJ61+ZQqairRTYOoy+3paks5aT1+ZGJU6OuHrFNq2HdlqZLgbBnSUMfaHAqFAKBAK1EeBySjGJ79KBmkn0M8hf61A9GczXQfA1xAnwxNwEXRkS5DBJ0KdhX0KmZcmfhAMgW0gLQX71L8YjALlzOP+DJNkO13hkM6aTsKLsF9nC+oBxzeDM6FMC4GO5hpGOrAp2L8xxMpQB0LF7lAgFAgF6qmArwx2raDAWchzLbQ3IY/N/vXhKNgOOlqWJssIc/ViASj3pG+G5EQY7m6bkwqcCL5GaXZrFmdCp1HdJ252waP+oUAoEAr0VgUO48J2qeDifD3QniORijCfS9Mjp4RetvW6epJz0xl5m8WZ6Mw1xrGhQCgQCoQCoUAo0EAFwplooLhRdCgQClSnQG99Aq1OhcgdCoQCoUAoEAqEAjUrEM5EzdLFgaFAKBAKhAKhQCigAuFMRD8IBUKBUCAUCAVCgU4pEM5Ep+SLg0OBUCAUCAVCgVAgnInoA6FAKBAKhAKhQCjQKQXCmeiUfHFwKBAKhAKhQCgQCoQzEX0gFAgFQoFQIBQIBTqlQDgTnZIvDg4FQoFQIBQIBUKBcCaiD4QCza1APf7zs+ZWIGofCoQC3a5AOBPd3gRRgVCgJgW+4yj/m+nPajo6DgoFQoFQoI4KtPU/N9bxFF1e1FiccR3ojdfW5WLGCXukAjoRU8IE8Ad4B8JCgVZR4Ecu9F7wfzkO6yEK9MYJ1/+6ejD4HzrZ6cJCgd6mgP16DBgX1oavICwUaBUFdKYlnIlWafG4zlAgFGiYArNQ8hMwsGFniIJDgVAgFKhQgfhmokKhIlso0MMU8N7148u4h3tYw0R1QoFWVCAGolZs9bjm3qBA+iuOuId7Q2vGNYQCTa5ADERN3oBR/VAgFAgFQoFQoLsVCGeiu1sgzh8KhAKhQCgQCjS5AuFMNHkDRvVDgVAgFAgFQoHuViCcie5ugTh/KBAKhAKhQCjQ5AqEM9HkDRjVDwVCgVAgFAgFuluBcCa6uwXi/KFAKBAKhAKhQJMrEM5EkzdgVD8UCAVCgVAgFOhuBcKZ6O4WiPOHAqFAKBAKhAJNrkA4E03egFH9UCAUCAVCgVCguxUIZ6K7WyDOHwqEAqFAKBAKNLkC4Uw0eQNG9UOBUCAUCAVCge5WIJyJ7m6BOH8oEAqEAqFAKNDkCoQz0eQNGNUPBUKBUCAUCAW6W4FwJrq7BeL8oUAoEAqEAqFAkysQzkSTN2BUPxQIBUKBUCAU6G4Fwpno7haI84cCoUAoEAqEAk2uQDgTTd6AUf1QIBQIBUKBUKC7FQhnortbIM4fCoQCoUAoEAo0uQLhTDR5A0b1Q4FQIBQIBUKB7lYgnInuboE4fygQCoQCoUAo0OQKhDPR5A0Y1Q8FQoFQIBQIBbpbgXAmursF4vyhQCgQCoQCoUCTKxDORJM3YFQ/FAgF2lVgJPb2aTdH2zsdHz0+LBQIBTpQIJyJDgRq8d0OpJPBWC2uQ1x+8yowDVXfAsYuXEJ7jkJf8i4A28KGMAmEhQKhQCgQCtSowBwcdy/sBKN2UIYD7uwwWgf5Jmb/7+FvsCl0VC5ZwsoooNZPwvRl9kXS/xRYneArMNP/kkY4FjoKM2ZpKajTcRA8DlfDXXAjlMtLclgoEAqEAqFAewr45HYpfFHajtNO5t3Y9wy8CA6+K4BWXCLemLSH4T44E16AUyGsegXCmahMs0XI9hioVzJX2+6GNVJCaWsfPxm+guVgTJgKzocroD+E/VIBVy3nB3V2q3OrbmGhQCgQCoxQYE3+HQ47w00wERRtfxKGwluwDjiQHABfwkaQmw7HZ3AxONj0g5nhc1gXwqpTIJyJyvSak2yurs2VZZ+Q8H9A5zaZju/68CM8CxNAshkIPAerpYTY/qxAGifeIeVd+AjeA8eMorNGUlgoEAq0kgKjcLGvw+7wW3AwnhRy8ynueXgTfHrLbTCR70FnIdl8BIpp7jsKHjAQVpUC4UxUJtdsZLP/+tSczL7rqtv2KaG0dcXidvC1nitzuR1PxGOKq215nlYMq5N6ukIxPgyApeAUcFXTVcg5IKyXK1C8YXr55cblVajAX8n3LRwODp5+DV/sKy4D60T8Dl6FZOYfAv+GwyDZNwRE5yO3y4jodPTPEyMcCtRJAfuxqw2jZ+V9R9gn6PGyNIM6u77iGA4/QG7XE1kQRssTIzxCp4/R4VP4AF4BVyu3gSnhSXAVKFYpEKE3W3GC6M3XGtdWmQI+yf0Zti5l1wFwpUKHIjfTffLIHQn3O3BrR8ECkJaLHbgd2D0uNwdu+6EfcIaFAvVWwD6qg+DTczL7oRPg2CmhtNVREF/HFe1REnRIBhZ3RLxNBXQuNodD4RhYHcJ6qQK93ZlwAtsdNgInxLCOFfDGvxhuKGX9mq39pOhMvESag25bfcjXJD7d+X66PUvOx0jtZYp9oUCNCrgC8TboJKc+5sqE7/gHwo4wLmiOEfZnnY2iOTGaHk5vUZmO474iStgOYb1QgbYmgt5wqWNxERfBZpCejnvDdTXyGvwQclUYkp3EpzoHYT+YzM2BNw3OeXoKj0nA/vV5KcEnwb7gk19uUxPR6XDADwsF6q2ADu9Q8IEiOQ32t+dgTXAFLjnKOhk6t8W+TtKIfmufT/3ZtLDKFXBl4hY4u/JDImczKdCbn9ZPpyF8Dz8I3gMHibC2FXAJ1/ea54IfTSXTmVC7MVJCaZucDB2EcrY8ie/Da6Wdvg5x0B4IH0KyVQg4sPvONSwUaIQC51PoWnAnnAmuMGwBb8GGYD/VdHg/gWlARzkfM+YpxZ9nG1abAttz2HDYE1wBDQsFerwC21FDlzcdFMIqV8DVnKJNTsKjsFhhh47aMFitkG50YnCA/qORzB4mfFwW93zm8+kwrDoFZif7kzB9dYe1bG6/jzgMHofH4Ga4DfyIOLf9idwAxdVMHRIJ65wC/vntl1DUt3OlxtGhQAMUmJYyfc+/QQPKbsUiXRp+EFYqc/FHkPYEzAA6Fw7YC8FDcAUUbRkS3oZDwCdFB/RbwafAsOoUCGeiOr2KuWclwRW4WQo7BhB/AFzBWAQWgL+Dq2dqHtZ5BXw4OajzxUQJoUBjFbiG4stNZI09a+8tfVQu7V7YpswlurJwAehQqPl18DScAO4rZyuSeDH4/vQf4MpHWPUKhDNRvWb5Ea7oOKktnieWwjoY54L9/h5wTFkKwuqjwCYU8ywUX53Wp/QoJRSogwI++bpsPl0dyooi/qeA7zd9t1zOXI1YEraCzcGVib7QnjmI+CpklPYyxb52FQhnol15OtzpittF0JaTYB+dGeaAWJJHhDraRJT1EixdxzIrLcqHonkrzdxBvvHYrzM6fgf5YncTKnApdfapeOQmrHtPrvJoVM4VivbMVxUS1jUKhDPROZ3tq2NCOLSd07GWox1ProI9ajm4E8fMyLEfwJHtlDE6+yoZx9Ym3zvwOXwKO0JYL1Fgbq7DpbP5esn1xGWEAu0pEM5Ee+rEvp6sgA7cweB3KdXachwwQbUHlfKfzPYH8DVrbtbH++la+Ax0EvweTGeznOlI+Nds24OO0fpgueVeBZMc1p4CPqVOAj1pBWAH6nM9uPQUFgr0dgXCmejtLdx7r895wz/N9VuU/lVcpt+yfAxXVHFMyroQgcfharg7JZa2p7H9Gv4FvrJdD56E26FYvylI80+Gd4LcNifiqkdbDkieN8KZAusS9uOk2bK07gyOxcl9/7kXVLJE1Z11jXOHAvVQIJyJeqgYZXSXAv609lDw26lKbRwyrgo6ItWYD7+ughwLO8DTkGxSAm/CkJRQ2jqn+Bc8HpPbXET8P1z85iY3VyjeB52RlrRaVhZmQKk9YEEoCtddE7nLXn50eT/oNYaFAqFAKBAK9FwFvqBqTvIdfaydX4GrEq4snJEnVhD2g8tFYQh8A5432VsEXoHhKaG0/ZTtnrAZ9CuluTHsKw4ditxM8xgdnpa0ap0JG34XeApcopoWcnMi98eNXCU4AqaCcqYXZzlD4SyYAzpj05cOfqYzhcSxoUAoEAqEAl2igJOxD5/VzkHVVk7HYWf4LzwCfttQPKcrCuVeT9xHunNePo+5YvEt6JTk5oebokPRkqaok4E/Pb0/dORVzUOeNUFH4WXw2GT+ecw+cCPoVOgJ3gW+q0pmg/kq4g5wucnGGq8UX51tLeY1LAx6lq/XUkAcEwqEAqFAKNClCjhJ61B81+CzLkX5S8NxpfOUcya+ZJ9OQtGsm3NZ/hc/fYhbhnXPbWoiY8BLeWKrhTfgghXMp/r2VggU9H74B2iHwnUjQj/9M4jNx+AyVLJjCOg4TFJKcLnJc/0b8sbTc3S1I60wEKzYbFzP+ZeKj4iMoUDzKxDfTDR/G7bqFbgisRH44OnDZCPtTgrfPzvBJoRfy+IGTwXnpKLphHwC+Vy1CHFf0eg45Ob883ie0IphG3M7WBKcmNuyvdnxKqTVC+M6Csn8MEZvTeck2RQEHgP3aavBy5CcC9M06zAU/mCkSnNp6Xmw7LBQoFUUCGeiVVq6912n84zzxwXQ3pzT3pX7cFuJzUImV0GSrUPA7yRy24ZI0cHQ4bkJLsozEp4AvoK1svTZCH8Em2VpLRf0FcGHcDLcBsWlG5JG2BL8eyBsC64+aHpnTuTJfDelyE+nBLa+dtCZWAhsHD28d+BtyO1LIi4P+drEOlVjU5J5bHiimoMibygQCoQCoUC3KKAjMCf4ENjWnNNexVZm55EweXuZSvucj77J8ulITAKuOiTTYXAO+hesAmvDJTA17A65vU/kAHDVXWfoXLgCPPZsaFmrdOJeCYWOAz+6TKbjoAOR7AcCL8K7KaG0VXy9OZ0J8+iJ2ply03PU0fgUzFONzUrmz+G1ag6KvKFAKBAKhALdosBonHVueKDGs+/BcYNhwhqOv49jToNVs2N9oP4d/AiHw1/AeUvHYhgU7WgSNoUn4TnYAXYFj29ZK07qbQnhqkRxkvfjlPx4Vxt0FPJlK52VAXA/KPQrMC7oXOSrE+MTnwHOgGpND9cVkNz7rLaMyB8KhAKhQCjQNQrMx2lGh7trPJ3fyN0OfmdXrTlPOPn7cJvbM0Q2g/SAbL5v8wxZ2H23wZ2ltFpWV7LiekcwrUw4uZ8K/w/GLHNpX5NWFFbnIh3vIY+D7422hH5gowyCueBm0Jl4FmyI5SCZeX8Pn4FOR7U2Mwe8XO1BkT8UCAVCgVCgWxTwI0hXJd6t8exHcNx+4ANtLeYc5JxWNNNd5ZbifFfMa1wnQsJQIK0szEt4K9DTSp4ZwXZNEfNVCBtgbzgLfPVgwywC/4SHQdPZcIlpX3CF4gVYBtaHwfABVGsDOeCmag+K/KFAKBAKhAJdroAPq3686CpAWC9SIDkTT3NNB8E1kD6w7Ogy/QDTd1+5ufSzBqwJrkScCUMhvSLRkzwJ/N7Cd1T9wdcdG8MdUItNzEFv1HJgHBMKhAKhQCjQpQroRPix41VdetY4WY9WwBUFVx98TVGLjc1Bk0Gtx6dz6ozo6YaFAq2kwOxc7JMwfStddFxr0yvwMlfgCnZYL1MgrUzUclm+89oEdChqsU84SDpj1t/XMn5vERYKhAKhQCjQcxVYm6r5fd4JPbeKUbNaFeiMM+HrkItqPXGdjvMDUL/KjY9g6iRoFBMKhAKhQIMU2JVyfc3d2YfIBlUviu2MAvlfY3SmnO461i9udSSK3250V33ivKFAKBAKhAK/VmBFkqaGE3+9K1J6gwLN7kz8SCN8Cn6EGRYKhAKhQCjQ8xTwRwm3gIshPpbvee1Tlxo1uzOhCK/AjHVRIwoJBUKBUCAUqLcCi1KgHwyfDfFKut7q9pDyeoMz8RBazt1D9IxqhAKhQCjQqgqMx4X75/65+Qp6WxgKj+U7Ity7FOgNzsQNNIm/slnsxL2rpeJqQoFQIBTouQr4V3WOxRsWqrgA8cXAHyv0d4bCeqkCvcGZuIu28UPMFQptpEfs/wsyHUwK/q5Fpb/uSdawGhTwr4N2gcE1HBuHhALNpIB/ReZ44jbsN7+ZCBF8qMv1cDw4FvxWIv0KMsGwUKBnKmDnPRSuBx2IZFsT8ANN8U+R/F2Mv8DUENYYBXakWD+IjY+sGqNvXqrvoONHq3JFqgtPRfZKP9x2jJkT/I2EZP53ADvDtCmhxbczc/2OtX5omewQAi+CD3JhoUBTKOAN7fu4P2e1XYjw2XAbvAnJsbiRsL+8GVZfBeahOL9fOQreg3jthAgNtHAmahd3ZQ59EBwLXIbvyHQ67oals4zTEH4UBmVprRychYt3jP19SYT12H4Bi5fisQkFmkaBtanpq+DTcTKXIXUcZgM9Zpfa3od8UCAa1kkFXM78F5wKav0hVPrUR9awGhQIZ6J60eyTOgGunO0HLsE/BfmKA9Ff2YKkPA4zZHss5x5YLEtr5eD0XPw3sBT4QfwHkK9SEA0LBZpHAR2Kd+BOWAN8j5dsZAIHg//JmPvC6qfAahT1OswEDrKfgsvIYY1TIJyJ6rR1Gd7VS1ckriwdOhLbe+G4UrytzfKlfFNmGaYtpS2apbVy0NfHPqhtB8+AY60PGWGhQNMqMAU1Px0+Ah2Hd+EV+Bj8T8H8H1J3g7D6KDAexejA7V4qLjkTDi5hjVMgnInqtF2d7I4B34KOQLKVCDhOtPde32Nvh0kh2XQEdETCmfhJkXHYOOZ+D0fDGKCzlsxwHxg5JcS2dynQGz1Hn5C3hG3BJ2UnNQcKlzb9EPNseBnCOq+A/ecS8EPAwztfXJQQCjRMgVEpWc6Al7KzXEfY/yjwd3Belp4HPc4/a/whS/yRcCJLbtmgY+sxsD34qnMP8BXSW6ADoSPmd2x3wcUQ1ssU6I3ORGoib34nOdEWBx2J/8LlENY5Bcbk8JNgICwCyexTDrI+oYSFAj1FAR0BJ7z9ylTICW45OK/MPpOcDHNHwjTj4UyoxE+mFgeCr5CWhXlhEIwG7vsS0gMdwbDepkBvdibythqdyN/hMjgMYqJDhE6aH7Y6oK4JvuZI5uBhusvJYaFAT1HAyczXGe+VqdDDpPm6oy3zwcQl+ty+IGJfXwLuhxhTEAFTS9HGhf6gM6Ej57dUYb1UgVZxJr6m/TYAJ72Y5OrTmYdRzE5QHCB8V+rA6uAdFgr0FAV0IlxN8xufDwqVepv4OIW0PPohkUnAvq3NDofA3HAsOFmG/VoBv6GQsBZQwOW7VjCflF+HcCTq19o+rRUdCUsfF9TZJ7ewUKCnKDCMivjwNBCKppPhnzW2Za48PAduX4YHwGOeAZfuHV/CQoGWVqBVViZaupG7+OIn5nwuaepshIUCPUWBd6nIcFgRHipUan7iOgbJXHHTWfDVqOYHmhuCr0LGhzvhRbgaXOkYCVpxdcLXPIPgKXgT4mENEVrVWmVlolXbtzuue1JO6pJyWCjQ0xQ4nwptXahUf+Irw0VZun/2uXQWN+hru8vgdNDx8BsKHWadZ52JVrR+XPTv4WbYH2aAsBZVIJyJFm34Bl62g6vfTISFAj1NgZOpkGPe0aAz4OrDKeAqw78h2VsEnCjbs6/Y+QL4IXKrjqP+bscfYBeYG3S29oT0bQnBsFAgFAgFalPAZeTBtR0aR1WhgB8B+mfP01dxTGT96bcOdB5cXdAZ8BcxZ4HctiXyaJ7QRnhy0qeCVl2ZyGXxW6m14CG4BQZAWCgQCoQCNSvgU5pPfWGNVSCcidr1nYhDN4Z1YIIyxaxNmt9XhFWvwKQc4isjP3iftfrD44hQIBQIBUKBrlQgnInGqb0QRbuE396fizbu7L2j5JNKGs7WOy4nriIUCAVCgd6pQDgTjWtX/0rhediycadoiZJP4CpfhXjl0RLN3fsv0j/lGrX3X2ZcYYspEM5EYxt8YYpfoLGnaInSL+Yq/RPajj5obQkx4iKbV4F9qPpQmK55LyFqHgqUVSCcibKyRGIPU2Ba6uPvUPiNSlgo0JQK+HO3r4H/G2CsTDRlE0al21EgnIl2xIldPUYBP8j2z0WvgvgGpcc0S++qiH9O1RG1XrF/++yPzLhUGRYK9EYFwpnoja3aO6/J10WPwFy98/LiqlRglG6Qwb9HXgqmKZ3fPyMU69IXRgc/2PEHZTaAj6Aam4nM/hDNYLgHwkKBUCAUCAW6TwF/18P/LM2/7HgMWvGnx7ns3m1d7Uz4umF7+CM8DN+X+KG09edpvwL/Ux1/TOYzqNb8kyR/ie28ag+M/KFAKBAKhAJ1V+ADStShcGXC36BwnO8tNiMX4oOxc5ir4f7nh/I5uPKuA/VfcF+vts44ExOijL/+plNQqflF74JwHBxe6UFV5PPXF+eA+ao4JrKGAqFAKBAKNFaBlyjecdk5pxmcCec3f9xMJ6it/1HWFXTnMv9i0Dxem+hYfAuuuI8FS0A4E4jQlvkfuywNel65bU1kS7gdzKOHlkxPzVcZ1b66SMd3tN2CDBfCqx1ljP2hQCgQCoQCXabAG5xpZfCDzO426+DcdCW4Al4057DdwVfu74N/FXgVFG1GEnQ4doQ3wZV3f6NEB2IccL7TGfEH0MLaUGAe0oeD776mLOXxd+ovAIXz611/o93G6g/JxiRwOewENugf4Aiwk3XW/FbCP0FatLMFxfGhQBMoEB9gNkEjRRV/VmA1Qo9CPh/8vLOLA2dyPueug8qcdw3SdHw2gmlgD/A1ze+gaF7TreB/9hZWgwIu45wOOgo6DouBtix8Ar5q0CaGJ2EXIyXTc/sb3AwPgCsIt4GNdTLobNRq63HgnTBprQXEcaFAEykQzkQTNVZU9TfLoMEzMHY3a7Ev53eeOhH8fsM5KZkrCj7sumqR2/8RuQ+myBMJ63gMhXAmEKGWJaflOM53QHuDzoQrEtri4LLQ00awd+AQ2BCmAs33SDeAqwgPlbZLsrW8QbAt9IFqzWPmhyegUa9Qqq1T5A8FQoFQIBT4SQHnGlcDutM25+S7wSpwMTh36UAkG4PAdOA3D/1SItvzYCT4bZZm8DvwunzAngs2KDEH21rmVg5rXqv2gsfnUn1/pEfnxP0ZpJUAnQSXh5LjQHDEEpDnUGgbQ7sXloY/wheguYLxV/g9JOeEYMU2DjlnhYfhq4qPioyhQCgQCoQCXaHAeJzEjxC/74qTlTnH6qT9DbaDO+Ab6AvjQm7OJWvCRFniW4TvBlfhcyfD6/EbiQPgXNgCtoLzYUtoKavWmXDC13s7uqSSryeSM3EP4VdgxtI+N2/Ai6CnlpwJG/E50KvL7ZZSZOY8scKwHWASeLbC/JEtFAgFQoFQoOsUmIZTOR90hzPhX5EcXuICtpor2M5JOjnJnJM+hJfg05TI1hUV56wB0BeSvUtgctDJ2AFchfd1u+c6EBaFlrFqnYlHUUbPTsG19yC9L/qB8GOwIiSzEXw/ZYMlZyLtK27N9zm4+lGtTckBfWB4tQdG/lAgFAgFQoGGKuBrgHngQSg+RDb0xBTu5L85PAynQHrV4qqCr93zlQlXtZ+Cr6FYT50Pv/dwnkn2DIENYCm4DZwP34dz4FrYD1rGcmfCJ/tlwaf8tuw0dviaItlbBNLKhGmXwPJgWZrl60i4gpEacSTCeYMQHWFT86+OxPCfohX/a3muZtiIb1Z8VGQMBUKBUCAU6AoFpuEkM8FtUJykqzn/6mR+DJxn8g8n2yvD8x0Le4JOQjJfsfvw6vyUTAfjUfDBOM1XaZ/bYto3pN0F5eYdv7NYBEaDlrDkTOi9HQA3wu5QqTnxu8yTbCgBG/tEmAAUcxa4B2wgzW8bDobkcJhmg24Pw0BvrxrTmZgWXoevqjkw8oYCoUAoEAo0XIGFOYMT99OdPJPl+Mp8bTBciTnvvADDCpl1HFxtmDRLN6/fAeoAuJqS28REfCiu1Bl6g7yWk698EO29lgTzPdZ9MB3cCpXaU2ScATzObyO0LeAcuAYsX2/0AUhmI7p6MSrcBDojv4MpYRuwgasxnQmXn/J3XNUcH3lDgVAgFAgFGqPAWBS7KVwH5Z7gqznr1WReA54BX1t0xlyl8LWEzoTzVHISnMecw3QePgHNuWoh8I8OvoJKbGUyvQWeo+XMVYrRq7zqichvw/odRW42kI0uvroomh+sXAl3g53sANAhqcWs99FwSi0HxzGhQJMqMDv1fhKmb9L6R7VbQ4FNuMznwNfYnTWf9OeD/NVEZ8r8CwefCWNkhVj2VXAtLAGTgfOb1+BKezLnnXkhT3Ofjscf4W1YH8KqUGAK8rb3nUVbRelkTAUTgp5hrWaj7g0X1VpAHBcKNKEC4Uw0YaO1WJV9uvcvHpxce6INplKujjsH5TaAyBBwJeUdcLViM3AVPJnzzlbg9T0AOiUXwPNg/g2gM/Mah4d1tQI28IZwO7ikFhYKtIIC4Uy0Qis39zXeRfX/04MvYRB105nwVXs5m4REv9Eot7qe8s9AYHf4F/wTBkPROSEprFkUmIeKPgpzNkuFe3g9XW2aoA51HJMypgGXC1eAVcHvY2RW6ANhtSkQzkRtunmU48UlMJmRCszJxFezy4HfZ4V1rMDxZPEjxFpWrTsuvT45XF1wjHIb1kkFessyzKvo8D74/uqxTmrS6of3RwD/Ksd3hE7+5UyPvS+oe1vmoHsyLAjfwLfwYwmPvRQOgy8gLBToSgV8EvXdu+/gOzId4YPAPj86PAs6w19DWHkFdiN5HVgZPi6fpUek/kAtPu8RNYlK9CgF/kRt/gvllqQcNOYGB5CZIJ4uEKEN25b0T+E90GvPrR8RB9fb4H7YE9ry6tX7S1gG/FBXzXVULNPtqBBWuwKzc2h8gFmbfk5y94BPzb4mdUwoZ35I/jQcBVOCKxkfwe+hVa2tVwJJD8ePl0CNw0KBplTAj33uhWPL1H5e0hwU3gW/svUjmfNhJQj7nwK+dtAhU0OdCd8HJtMBuBlcsTgaVodhcCCUsxlJfAOmLrcz0jqtQDgTtUu4KofeBzq4OsiuNgyCos1JgitqvqpLdiGB81Kkxbazcb1PQLkHNqX4A7wG6xsJCwWaWYH5qbyvO04sXISTpE8WDg6DYDO4FnxyLuYlqWVtea7cpwqdiA/B98TJJiHga4qHIL0ec9XBwXZaKJqrQb5yWhumh1PgVHASDOu8AuFM1K5hcibGLRXxb7bnlylOR8NViPy9/yHEbymTtxWSDuUifb0zVpmLdUXCV5bhSJQRJ5KaU4G5qPZweBG2gZnBwWB0cIJzgNDWAh0P35stCq1uOlz/hJNKQriKs0op7MblTZ2JLY1k9iDhI7N4CupwnAY+9blCcQP45fQnsAKEdU6BcCZq129FDr0fJigVsQPbZ0rhjjY6E0M7ytRL99/Jdb1W5tr+Stp3sGaZfZEUCjS1AjoM+8LjYOd/Hh6Ge8FB5CkwfSsYBoOh1W1BBHBATY7Vq4Tzp4wBxB0wpoTcdifi0mfRRibBp5XPYLNs5x6En4N86TjbHcEKFQhnokKhymRzxc3xYKrSPp1bneeRSvH2Nuey84L2MvTSfRNyXY6jd2fXNwVh9XgFFi+lV6JhKWtsepMCo/Smi8muxaW4g8CnCCctBw1vhr7g07VPxzoWC4Dp/4VWNif+bcBVBgdZ7UvoPyL00z/mUbui+RHgRODKxvfZTld8roan4bYs3e8xBoHn2wfyY4iGhQINV+BtztAPHBd0mnVuXblcFXSYfY3hGFLO5ifxtHI7enna+FyfGr1cus6l2DrG+rH2MqCjoZUbI37aE/+GAr1UgY24Ll9zbNdLr6+ay3K1YDj49/fJHiOwY4qwnRa+hSmyNIMrwdtQjWO6Bvn99kJHL6w2BWJlojbdPGpMOAN8iNCptf87Cb4E/wc+dJQz/7pDZ2Oucjt7eZr9zfv8UNgUhsEhoJMRFgq0rALjcOV+kb0J+ETd6rYPAqxeEMGv3R1kk/kUpzMxMCWUttuz9cmuGpuMzPeA5xypmgMj788KhDPxsxQ1BabkqKPA1ThxtXJ9aM8p3pL9r0Mr2hhc9CPwIbwBPkSEhQI/K9DejfNzpl4Y8IdUNu6F11XrJR1c5sDPSeufpb9H2KVfVxOGQbL0MVuKV7L1CcflUv+6xlch8aoDEcK6VIHXONuupTPq0L4JH4ArD23ZOuy4qq2dvTz9C65vFzgI5gPHDFd3dSx8pelqz7jwb7gMwlpMAd+Dh4UC5RTQ4Ro72/El4bvAp7NkMxJYAU5JCYWtg7RPNEWn1cHHgXsCiJUJRAjrVgV8xfEpTNJOLcZi39xwYSHPqMTHg6lhNjDeW+0WLmxR8Fuzf4GruvOW4j5keF/rdIS1oALFQb4FJYhLbkOB4aTPUti3N3GfPE6Ah2BncFC5HcrZ6CTuAE9D8YnOgfsxcCAPCwW6W4H3qcD07VTCyVLH2BU6X/lNCDrTTqazg69NXoLt4C3ozeZ9K2GhwM8KhDPxsxQRKChwEfHzYV24uLTPd8u+HhoMpl8Ox0Bb5msRV79cEn0VHgFXIwaDT3keG684ECGs2xW4jhr4TVBb9ho7HoAzwFchfcHVDL8X0lH2z6oNvw1hoUAoEAqEAiUFXMKcFaYoo8hopI0Plbwm60++0+B1eBSGweOgM+I5wmpTwKfhJ6G9p+naSm7No3yl5+uK9swPh38LS8McYLwfhIUCoUAoEAp0gQI6DYvDpjAIxoX4VgIROmHhTHRCvDg0FAgFQoFQIBQIBX56Tx8rE9ETQoFQoEcoUMkydY+oaFQiFAgFQoFQIBQIBXqmAuFM9Mx2iVqFAqFAKBAKhAJNo0A4E03TVFHRUCAUCAVCgVCgZyoQzkTPbJeoVSgQCoQCoUAo0DQKhDPRNE0VFQ0FQoFQIBQIBXqmAuFM9Mx2iVqFAh0p4J/Wev/Gn9h2pFTsDwVCgYYrEM5EwyWOE4QCDVFAJ8JfsI2fI2+IvFFoKBAKVKNA/AJhNWpF3lCg5yigM+FPN/sTz/5seVgoEAqEAqFAKBAKhAJVKZBec1R1UGQOBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVAgFAgFQoFQIBQIBUKBUCAUCAVCgVCgZyrQp2dWK2oVCoQCoUAoEAqEAt2kwOScdxrQR/i0m+oQpw0FQoFQIBQIBUKBJlVgbup9A9wPd8I60KHFykSHEkWGUCAUCAVCgVCgSxXoy9l+6NIz/nSysdgcBW/C3+Aj+Dt8CQ9AWCgQCoQCoUAoUBcFxqCUQVDJw+jK5NsaZoETYGMI61iBS8myUsfZfpVjTFI2gMVhpF/t7ThhTrI8DAuVstrGa8MlMEkpLTahQCgQCoQCoUCnFfBduk+u81dQ0k3k8YnWyW0vOB7aMyfAkdvL0AL7+nONz8EKhWudkPjohbQ8qsM2DD6B72AxqNZW54BbYdJqD4z8oUAoEAqEAs2lQD+qO0EbVXZ5fEqYDCp5MvVJ1kmqrQncc0lurkxcD3vkiXUKL0w5rmBMVKfy6lGM2vhUPhX4GqDRpr5PQXFlQkfMFYK22urf7LsctAvhlBGh6v7Zlux+LzFudYe1XalUjh7S9FBJp0zHNHLrkstsEMstjVQ5yg4FQoFGKDB2nQqdnXLOAye33Cx/b3CJ/Ero6JXCAPIcCf+CzaFoE5NwGBwKm4Fx7Wu4Dn4L9Z5cnSiXhZ7iTFgfl/nV1In8TFgVGjknfkH574FzXW4nE9HBUPdyNgOJ15R2PM52pnKZ2kmbl32W73FTtJOv6l2jcMQO8CqsWfXRjTngbxTr8s9/YUdoZINSfFgZBRw8loLRy+yLpFAgFPi1AuOT5KR8F+z8692/SPGp1FcCrixo5cY4H6aGwhGQnlJ90NoFHoW1YDv4Cpwgypn5j4MrYVf4Eiw3N19j/AhOojfD0pDqswDhR2AeqNZcQneySnXPj3fF5W5YF9K58v31DLsqswJM3k6hOlBPw4GwHBwEw0AHy7ZqlB1Mwc5zRft/JNxbTCzF72BrP9PsZ/ePCLX9j/VfCjaHM+BJeBNOBef/upmd+Ra4EZ6BenugFFmVLUTuz2Fl0ON+Df4PerLZWW3Uq+AK2A/mhs7YYhzsjdavM4V04tj5OPYemLpQhgODS6xhoUC9FRiHAr2Xmsmmo7JOjKODg7OTv2OBT50+QZYzB/C94R1wUP8dtGWOz07kOgXaaOB9uaWRkt3E9s8pUti6qnEnOEE6sX8PpuVm3d8An8bHh3zyHI/4f2A70DzP0WB6OVOLPeBhsExxkj4IPE9uJxEZAo4pOhTLg8c5wRovmmNS32JiO/El2Ge9VwK1fgkGQDnToXK/DpBmnZyLXoFzoerXARxTidlHvgXPn5uvsH4AHc6iDSLht6VEtb6rFG5roxN1HtwH/4BF4K9wFkwPK8Je8Hdoq13Z1bEtShY9z4HwPGwO3WkXcPLXsgqsSdgb0xuhJ5qd+yh4HY6B4+EhsINcDZNAteZNY0f6BLaGcjcWySPMwaZchyvtrnljmd7YdupkoxBInS6l1WvrDX841GuJuF71aoVyfICYvZsv1MnS+8dJ1n7WLHYZFT0dZoIXIU0KbxHeAHLrX4o4Yel0rA3bw3cwFxRNx+pQcJJNNhqBu+EUSBOrE9+oUM5s13vA7RbwJpQztb+u3A7S9oVzYVv4Eh6AIZAcHIIjzHM8CG+BTocPVHPCYHgWHod8stKJGg72v3HgVjgHHEv3hNwcRz8AdS7a+iT0LyYS3wyegYPA67sUrEM5m4XEYZDPM+q6P1ifcu1Dcl3sLEp5rExJF5DmHFI054M0JxxH2Otqz9Zh58dg278Aau4Du/3uK1DXh+BIyHX0+ieCiswK7QLXl3Ir+G2lcHdtXubEzxVO/iBxL7Ro3kBevNvuMpfHXoWNChUYSNxBIG+cQpY2o9eyx5tqE7A9PEdbtjE77CB92spQY7pevR0sv7kc3K6E3aDetioF2s7Fp6Z6nyeV57VMmCIVbp3kjoItKszfLNl8ynGAccDuLrP/ngDe52mS7K66VHNe+4La7QeXZAe+R3j1UtwJUOfBNJ8OdZic4JcC7Xzwni/apCTooCyT7RiJ8ELgGOkkdyE4aZpXDYs2Bwl3wezwKBwK5WxlEr2OGcvsXJA0J7svYVeYHKzXcpBsfAL3wo/wx5SYba3b7XBrluY96DWok8c70c8D1uVrmAySTUfASW9gSiht1cMJ8ehCulEdBB2bK2AfsF+9A/tCblsQ2QYcf7Yu7bDc/nA/WBfr1ChTh2FwOowOnlvTgfkIZgAn9vFgNMjNfnNAnlAmPA5pS4JOhXOKc9XB4Pg+H1h2OZuXRB0Q6/SztZXZSjuQWKh2OdhxxjLSDTY257RTWa+8znaGZSA3PSZv4HNgL/BmStaPQKOWpdI50jZNSnbU3IYRuQE+yxMrCI9BnqXgVLgPJoD8piL6C/MGHBWm+kVq5yPfl4rI28HJ1PZ5rfPF/6qEYaRYvh2/K2xzTnJmlSeyX05bospDe3T2p6md/dRJqrvMlTgHbe8jdS5nE5M4P8wE9pXcPMa+473QB6YDn4w9ppF2KYU7bjkJ3V060aKlNO9fx6K/wSfgYO5Y5oA+G+gEOLB/DBNCOXOidBJP5mTtpK2TsBO8CzvDLbAteP25fUpE9gDHyCOhnD1FomPPoDI7vY6XwYnsDnCC/g+sB2ly8xw7gvXwqbfYho4n68ISsAho5rsetoHvQHPiuhYegYMgmZOqNsFPm5//VQ/Hyg2geM4XSRsGy4O6fANbwu7gfZzMMmwj9TkC/g7rw1Fgf7NPTg/F8kmqi6nDCuC5vHb70lJgnXVADyyhtqtDMp2dAZDm75Re3Nq/boNL4Fw4H04B22Ry+AHKmeXnzk25PD+nOREOg9+VUhTNTrFSKd7VGwcDzz8MrEuyNQl40ySzA18Nd8KucCucAN4M2qpgR9Cc/PaERjkXk1H2F6VzsKnKbCzrl9vCRBw83DcW3A1rQVvmdT0NK7eVoUy6HWQZUNc5yuw3aV7whp7OSMk81wOQ+ktKr8d2Ygq5H7ypKrFpyLQojNdBZvM5SBRtXxKGFhOzuIOWbZtbHyJHwml5Yg8IpwG9o6qsRobdYBDk91c/4v+EdM8Q/IVN+ItY/SK23SyQdD6M8Nlg/yya/fVWcGK7A5yQR4Zk9s2/wbLwV7gHbF/7eKPNycwBeUOwTvdC6iNOQi/B7yHZRAQugdfhGrgKVoGiOR56DdsVdxTitp/nfhK2KLPvFNJ+BPO0ZY41jqnWxfMWzWMtY57SDnV+BmYqxdPmIgKOyX1SQmH7MvGtsjTHu29hTrBtB4Gm02G6+iVzfDi8FBkpJbK1TtbNvp2beTyX+44AddK8xrNGhP73j+e7EN4G8yfeIPwUnAxjQCNtMgrfB2wH+/hd8AR8DefD5jAJJJuFwAtQbIO0v72t2jgG6ohYTjnbi0T7VLIZCNgPytoCpL4LDuTJbiVwfIp0sPXGWQ4m6CBfpbvHJuOH8BaMmR00H2EnWPdr28CzoFelrQoKr5em7Q53jgj95Im5r38pXu+NA+1HcGwNBe/EMWcUjtua+LBSmg1+LWwFXvtgWBfyycPwlbAHJJuOwPawVErIthMR9oZ/Gu4HB7pzYDLIbWYij0LubIxH/CFYGeptfSnwJtgCvO5kfQjYz5I5IDigPA/PgTdbufqoy/+DYfAinAj5Ne5H/DooZ38l0ZvUc+g8pH5nvazfDZD3T6LdYutw1lvBdhoC00Jbtgw73oHLQD3+DmNAMgeJ2yF3vLxu++dr8Ceop21CYdbbNhQHyxvh31C8V51QrPMu4DUeCLeB916yqQhcDxeB5S0P9t3xodE2Kyf4AvaHi+EeSHXznrGu1t2+nGwjAs/AQBgXytlIJO4Mjl9t5fG4xeAc2A6cKNO5CY64d+z7To7LmtCObcO+r2DeMnm8n+w/fy7t8z78DxxXiqfN3gRuSZHC1uv5HFYqpD9F3Dra/itm+64hrJ7JViPwLeRjkvtmA6/vdfD8uU1E5CG4BFK/8vrs05tDbu533/qwA7h/rtLWsWli6AqzracBJ/klwPtkBSjayiS4r9b51+sdAi/DTjAJJPN8ttVWKYHtIfBDFh8RnJx/FfnvMHREyv/+sdNbwUrMDuXxXlQ9zA77JuhQjJcV6GDyDaTJwAFnP7Bzajb+zZAae1vCDoxrwNMwHTTKDqVgO/K9YD2WAgfuteEPMD7sCQ7WRTuMhDsKiUcQz2/G04h7U70Cw8Cb4AzwSUIbBQ6Cs4xgf4YvwYHqWbA+yfoQ2APuhBlgHPBmuQEug1QmwRGO2YNslzRSMjv5PeAk1ghz4NgXUrvajreBE4hm/azr46DGtrf99X1YAHIbQsR8C4F5vWbbJJn95/oUybae8wNYEZyQnoCNINVpUcIPwPTQKOvbQcG24z5gPdXLfn4lPAJTQzk7nUT7kTYjzAejGCmZA/JD4PVpI8Mx8F/YAj6B+aEeZrlixBQAAAxGSURBVJ96GbaGaWAJOB9+hDvAfpab45TtZ91OBMcHr1sdkk1E4FL4Ak5OiV20VUe1tf5XwVSQ23FEzoG+WaJjp8d4XcXrTdnMPyd4z1lGW+a1Oz48DENhCshtciKHgtpsA6kvExzxgfVubM8Gz5Um5FxbkkfYhfzrfvuGthh8CmsZwTzGtnwVjoe8fxEd4dy/ViZ9Y9LUzntteUg2MwHbeoOUwPZo8JybwfgwDlwEjlWLgw9HT8FfwYnQPrM+qM90oFl/z/kRnAWjQ27q47Wk61yYsPeWY2ZX22ic8FQ4Fop6en03gONireZ1Ws7z8BkMh7fgc/gL5LYCkV/NY2ZycPgOLMBJ5zmwQL1P01aBrjYb8UWwblNkJ5+e8DcwKSjunbAujAoTwNVwOHi8thxYziWwPxQbgaS62QBKug+8Gez4Yid9F5x0ZgQdjQOgaHaQGwuJQwpphxK37CNAmxWeBm9azWu2ga+E7cC2Wxm85gtA5yLZ2ASug+1TQmmbbraZs3Qn6qGQ38h6smq9EzTCTqHQf4AdfB/wuv8OaRC+irCDhoNnbk6UF2UJCxK2v6hVW7YXO/4Dlt2vtGUzwpHONTuRNNvAvqZND7an51DH1+AFsC2nhlrstxy0TOlA6/UOWOampbR8My4R+/UPsHS2w7a5Fo6EVNds9wgH9PI8oRD2+CvAa7dPqZ39OPWzfxL+L3TW1PsYOBXso8m8j70XXoe8fWck/ih8C5/C7bAKFM1r9h6xzxxS3NnguJOOfcQxdLoy51qLNPuJ91RutuVQeB92BTWfCuxbB8NbcBiowStwG6T2IPgLW5TYi/B/UK79zbwZOD7Zv7yPXgbvk5fAdrc9LgT792hQtIVIcM7YIduxTSnN8ecpOA2cfC3T8zgGnQHWzeuZA4pmf3sC3oYls53qugV8Dh+A96K2Mxj/Eqy/1zEbaBOCY4fXYB0OAu1W+IeBzNTsBBgzSysXnIzEh2D5cju7IG1tzuH1TFU4lzp4z08Atpf7lwPHzCHQF6qxecj8e1gXnGsrtt+S8wewYwyGrcGG2wTeBAusxOwI3iRjVJK5gjwPkOczmDHLawczbXToAzfDxuDAawe+A6YExbMuk8N7YOddAxpp3rhHgwPvXGAdJDcb/Lg8oRS+mO25hfQhxL1hJyqlH8/Wa0ymBlfDVuDNps0PT8MXsDlo44H5tjRSsvHZ3gNrpgS26vk3+BHsiMlszzPhr2Abaw423pzW2XC9zZvgDPDarM85kPerR4n/GYpmX3affUCzXzwH6uNA0Q/SNRAcYdvy7xugHg/Df+FS+BzSgOdxttGeoE6a/evfcCR8CNvAlnAJrAC12HkcdDqsCNZpPXCgeAuK1+sEdA3YBvaF3LxnH4Nx8sRSeFO2Du5FHfKs+xK5DLzWC+EKSDYFgW8h7yNpXzXbscjsObYvHDQT8WfBc8ya7bP9hoJ6eGx75r3u8ce1l6kB+9R0dbDP5s53OpWD/UuwQ0oobLcjbv99E16D1+EOGAyjgTYAToHBUIuldu/PwfaT3WAwzA65qeGL4FhRzjYnca3SjlTm4sRPgz1gwtK+Udk6MQ2BC2AXKNcvSR5hS/Dv9TDtT9Ff/LswMe+xqbNUx9i5YS5I9ch2/yo4HSnz/iq18gTvBe+PSs5VeamV5RxItkegeO/NR9p94Pwg9pvh4P2yD4wCXWI2zrA2zuTAeEIb+4rJTmTXwULFHTXGPfcXkDf8icTvzso7gLCD/7KwOTj4LwlORGeCDf4f8OZeDRppfSj8z+C5lm/jRLuS7mBSNCc8b7LcziPyAaSOYDscCqkTO7l6bVtBciYGEtaZsDOND5rtYlreLg5qD8DvIFk/Amr7IQyBSSDZHwncCGkQcGBzsHTQd6Cot+1MgU/C53AOjA25nUzEyb1oDirebDOUdizI9glQp7PgVDgA0n6CIwZUJx61XQfsR7vDx6B2auu1qqGDWTI1OBY89tqU2MntcRw/BP4JB0OyNQk8DwukBLY6EDoeR0HqEwRH2Jz8az9z4imak/KbsFdxRxb3flJHz+f15X2H6Ignu/sNdMJs08vBvpWb99Bd8BRsmu8gPAS85rasf2nHpGwfgqvaytjAdO+bO2E/SPdufjrbVUfRSbAtm5ods8LEhQzFdi7GC9k7FbV+i0B79fQEjaiDY1FPtf2p2HXQiOvu6Jodi7YAx6Xi+ackzfF8FfD+Hwu63O7hjIe3cdaNSH8UHIA6ssPIcB6M0VHGCvfvQT4n5tPAyW9V+BJWgmROmA5I1vEycDI07ICzFGibgOVsBsUGIKmuthqleS4bPE3w+QnGI/I+eG3JFiXwA0ybEkpbtXw9S5uZsB0mmROfE4wdK9nYBNThPvD8E4EDm3ro7CSzozkBHpIS2O4GL8CScAuoYyp7JsJPwo6wDHjsSbA5eIzlO9GWu2aSqzYdlG/gGihX5sqkvwTJuSE4wtbjX6993J+iI/6dnX+tp87a3nATDIVkixH4GpZICaXt7WydMM+Fx2F7KNZFp8f2bm9iZnfFpr6PwV2wXHaUA/oQOBPSQGtf3h2egNROBEfYDPz7LOQ6/LTnp38dcD4An4TLmf3GccH7SaezaE7W9mPvyVrNazoG1DeZfehVWBPsm7dBbnMTsb+dDd431sNr3QDOB9OTHUjgdSg3oac8jdjaLtPCQDBctIlJuAgmLO6IeFMosCy1tF851oZlCkxD+HOYI0vLg1MSeQ4UsCNzACoO7h0d097+2djpQP0eOHB9CE4IxQF9LNIc1LYFB0mvyae2ZF6DA+I2UO7mTvnqsXWw+wI2hbbOtSL71Pyf8Cd4Bw6Hop1FwpuFxFGJrwAOwOqyE+ROAtERy8Dqdju8BtdCcVKxbmpm+VeDnvanYNmag/RGMLmRkm3Idhi8ASeDumoLwcVg+uJQD1uDQj6Ct6Bc39O51JlYHXK7g8iReUIWToO3E5ZtNFppn9fxCaxWiqfN7ATsc9/AuimR7XSwNwwA+5tabwL1MB0ay3sOZi0UuCjxV2CuLF3H+mPQMXgI7BcHw+ngPfMHmB6KZvuvDbb/jbAxeP3/gJtgChgC1mUrKGf22ZthlHI7K0xbgHwvwi1gH7LNDwNtKvDavOdzm43IpeB9826J59meAotBsskJfAX2pZ5mY1Oh4jjW0+rY6vVpa/weB2HehmVaXaDi9e9EwuPFxCzupOykdiy0JW6Wve5BJ7CpYV5wgGuvDu3tswOMAY029VoaJungRAuy3wHUCdGJSSehaKeS4OCa73Oy0Ym4CpxcypmTpIP0obAltDdo+UR7Gjj5OEh3ZOORwYGwnE1MYt9yO2pI+y3HeO3/AieEITAAkjmBHQT3g5OGbX8CvArWo5zpZKj5xVDs88NJ2xaKNhMJd4PO3zNg+d/Bg2C/nA90OHySrodNSiFvwQPgZFq0i0jwCTyZdXgU9oft4Qy4A34E+9br8C1cDuNC0aYj4Uwwn/3qVlgbNPul5YxvpIzNQJr1nKfMvmqSZiGz48sQWBFyW4XIl6AmOrDeX5rtrXM4GwwE+51pRXN8G1RMjHgoUIECfyLPzTBtmbzXk3ZSmfSWTnJSOrgDBVZm/5MwRwf5Ynd9FTiG4py4nMBz65NHemnYCcbJbTKYHW4HJ21v7kPASXQc+Dc4ETrJO3nOBW2ZOjpxPgE6p7n5pHt8nlAIL0ncweUPMHO2byDhF2DNLK0zQSdLnchrYIIyBbkK5PXmfcIJ80XYHNaCq+EmSE6V+pknP4ZohzYNOX7XTi4n7/7QmZWJdor/eZd9QN2XgZF/Tu04UM656PioyBEK/KSADyk67+/DNpA/jBp3zAkrKaBYz8JSHSjigOFgeyiM2kHe2F0/BfakqO9huvoV2TQleeNuDfa9ZAsT2B8uh0VLiU5kOrvrQZ63tLvizbTknKHi3P/LaD3PgMX/l9Tp0IyU4D3Z1iTtakmfwlmcbG+BO8AVG5/aw0KBUKDzCmxMEc6Trkb4UKG58uyD3qxGwn5avtwCIcatQAwHOIVsa4CroIjIUqUCS5P/R/BpNKznKuAKSU+4L3xq7wn16LktFTULBWpTYACHHQ3PlLau8j0HvloMCwV6vAL9qOEpYEcOCwVCgVAgFOg+BXTUXTH8D+hUfA17QVgo0BQK9KWW8e63KZoqKhkKhAItoIBj8jrg91dtfZzcAjL85jf/HxkQalMdsCUuAAAAAElFTkSuQmCC[/img][br][br][br][b]2. Rechenvariante[/b][br]Der Preis des Fußballs nach der Vermehrung kann als Summe des Prozentanteils (5 % von 40 €) und dem ursprünglichen Preis (40 €) berechnet werden.[br][br][img]data:image/png;base64,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[/img][br]

Auf welche Arten kann der um p % vermehrte Grundwert G[sup]+[/sup] berechnet werden?

den Prozentsatz p % zum ursprünglichen Grundwert hinzuaddieren den Prozentanteil p % berechnen und diesen zum ursprünglichen Grundwert G hinzuaddieren den Prozentanteil p % berechnen und diesen vom ursprünglichen Grundwert G subtrahieren den Prozentsatz p % vom ursprünglichen Grundwert subtrahieren den Prozentanteil (100 + p) % berechnen den Prozentanteil (100 - p) % berechnen

Information: Vermehrten Grundwert berechnen