Prozentsatz berechnen

Berechne: 13 € sind ____ % von 25 €.
Konsti versucht, die folgende Aufgabe zu lösen:[br][br][i]Wie viel Prozent sind 27 von 300?[br][br][/i][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAYYAAAC6CAYAAACqT+qHAAAAAXNSR0IArs4c6QAAAIRlWElmTU0AKgAAAAgABQESAAMAAAABAAEAAAEaAAUAAAABAAAASgEbAAUAAAABAAAAUgEoAAMAAAABAAIAAIdpAAQAAAABAAAAWgAAAAAAAACQAAAAAQAAAJAAAAABAAOgAQADAAAAAQABAACgAgAEAAAAAQAAAYagAwAEAAAAAQAAALoAAAAA+UFELAAAAAlwSFlzAAAWJQAAFiUBSVIk8AAAOzJJREFUeAHtnQW8HNXZh0tDCO5OIIK7u7u7e4oWKVIKtBQt2lK0uAanSHF3p7g7hIRgxd3he55kDwzz7e7dvXf33pX3/f2ezMyZM0f+M/O+55zduxnlN2EqMB/8Eb73oISNUkj/qZPnS1z2c3K+/PxxylgqPZ1P23y+/HFX86Xr89tS9eTz1eq4VH2l0vP1mu9HmB8eL+yz+U2p++w5rVT5pdJHXlX7fyutr1S+fHr+OLU4n54/Tvny21L58un543w5HR13dH1H57+igmPh+Y4qaofzo7ZDJyvo44rkmRnOAZ1EWPsoYACYEJaFF+FjCGsvBX6gu9vB9BCBAREiMCACpnN4AU6AcrMGToe1oAJ96dOacBYMb8H+RZc6VsDBYVhBgd+GEqFAKPDzslBIEQqEAigQgSEeg1Cg9OcFoU37KJA+g2ifHpfpaQSGMuLEqVAgFAgF2lGBCAzteNejz3kFOvoGUj5/HLeeAvEMZO5pBIaMGLHbtgqEU2jbWx8dL6ZABIZiqkRauymQ3oNYZ263Ox/9LapAeiGKnozEUCAUCAVCgfZTIAJD+93z6HFpBWJJqbQ2caaNFIjA0EY3O7oaCoQCoUAlCkRgqESlyJNVoJpnZmouXA2quSZbV3ft+5MI3WVTUdE+cDnsDWNCWM8rEJ8vZe5Bo7+wmabGbgMosB5t+ANU+hIZGHaCRv/ple56D8ZAi7+DP9p4EawCa0Mr2AR0YroudsSgOU4Xy4jLa6BAd70QNWhqSxdxFL27B24BnUaj3pdPadv6MDFUYh+QaVLoU0nmHsyTAl3a1ropvSlQ5oZZYAe4DC6FbaAeZl+cjYwHY9WjglyZG3F8fC6tmkPbexIsUc1FNcwbny9lxGxUB5RpYsvvjk0PV4Z34EE4ExaHYuaorBLzvuqQB8IkUCuHdzNl6Wz80blK7D0yfQiLVJK5hfNsSN92gXXgLngftJdhBjBoVGre10XBX4QtZ4tx8nqwPu9buXe9q8+H1ztYeAI6a2owJbzR2QLiutopUO5hqV0tUVI5BQZxsj84gtwfDAx/g7zpjM8HHYPWH26ELaEXZG0mDq4EZyC3gw6pnI3LSX92ej3w/yUYHaaCYjaExAGZEy6P+EIXs09IfAo2KXaygdLSaDFt69E0f71V3YbDD4UKPmOr1pLMezErTAOjpcTCdlq23s/z4FoodY98rzcAA9CO4PKMA5C8TU+C/wfBrXAdbAH5Z4mkiszrvqso529+szr5ToZlM/lnY/9r+F8mLXZ7SIEIDD0kfKbazdn3hdCJ6phce3a7D2TN2YJruN8UEg9j2w92B2cFWfPlOhhWgNNgWyhl83HiLjgP/gk6nNfhMii2BPEY6fOCpsO5AnT+Or5RIGs6wAdhDTCANKrVMyDYZ/WZGAwM6f6xO0Jfnan3X336g6Nu74c63wD9QfPe+2y8Dd4zA8wlUGy28SPp3keDyJfg8aeQtYU4uAbmAvM9D0fAaqBNBNuA5Y8CBqFpoZRZR8pr/nL2JicnAwdBfQoZHTy8DC4/hoUCDaGATtiXbtRubs341OdyyxCYI1P3KuzrrBxFJXOt+D74PUwBr4IO9+rClk1RW5xUHU0xm5xEHcIB4IuqcxoAL8FQSAGA3Z9tHfZ0KNqq8CjsCNaRZjPs/mzW8TmYt1FtGhqmI9b51cN0sur0GRjItVFgN7jNA2w58Fl4BGYtsADbFFC3YF8dk3MeyP77YJAoZ1tz0mc7a9Z9PuRnpt7DHQoZZ2Z7P4wFA+ABsD77kjcHmEeCbXe7J9ifjiwFBd+74bBtRxfU8XxH71Edq268omPG0HP3ZGyq3gt0+GPClrAv+LL6Un0F/4Y7QafgjEKHrDNxlOcI7RZ4FpwZlLIJOeFSxbKwNqxX2BoI1gXNl/ldsE6dl22SfpA3X+CUvgT718M58CUYqPL2Dgk3wIagQ2pH+5BOO0rWyY5bEGBStpvCiYXjt9j6HHgfngfv60PgPdEmAIOLAwLtDXCmUcxRe16bHrYCn5us9eJgBri0kDgG22OhP9wJmr7hhwIORoaAdS0MeetNgs+X5nMwDyzjQQeWZk9zk8+gfGcH+eN0NylgpA7rGQV86b4HneW3MCukl9EXxpd2JXAU9jhog2FX+B0MA53Gy7A9WM5PkLUjOfClNt9xYDDRrPtw0HF4vS+zZv2rgvkvhgXgCsiWq0P6DhYDzx8AX8BZcCjcDLbN9uhIPoZD4AKYDZ6GdjP1ewFWB++VuvUF7+1NoA0Bdffep/vE7s/mPXvu56ORwV6H7iwibwZoZ3ELwtvwMGTN6wz83sPFwVmgx+vD85DMdg+EtWAz8Hmx7ddC1r7n4F6YBQ4Er6vG1OUp8FkMawAFIjD03E3QCfjC+sKfCQdC3nTsvSE503fYPxn2g1NB80X25Z0KhkPW7uXAl1kHZGCwLjEAWL+j0DXBl93lI2ciO8OB8AocA+PAp5Dsf+zooA6APjAUtOtgNTgXHH3ODC5z7ANPwoNwEJwAOkEdliPedrHHCh1Vr2vgTbgbDKqa90NdDKjFzOs2ypzQCeuALSdv/UmwDss2yLwOWXMg4n3VIVvupXAV+Hwl8zkxgBwP98PjYL7FYXRI985nyefnLtgADC6XQKXmDMoyrScsFGgoBXReF8Go3dwqXyJH38uXqFfH+ipMmDk/CfuOrFYtpPVmq6O+AFaCA2EmSHYoOzr40WAg/B5SeaadATqlL+EzOAhMHxt0BA+DDsl6ky3Gjk7JYJPVTEfizMFZgte5vOCyhTYpnAbWY31/g0axaWiIjrtvHRs0I2WrmcFALYrZeSTeCEmzbJ7JODDAe7/GBLXUGRezdP3znNy7SAad+RWwG7g/CuTNd8KgYptnK5ycmO0rYFDS5oCb4SNYFzwn40Gl5mDkOfCZ60m7msrX6MkGRN2Np4AvQU8EhhWpdygkR51XRqe7CPjyJvMl1mmnl990A4hLEg+BjmVBSDY/OzqjZ+EZuB1mgGSW44u+HEwPWSfRl+MzwdGnL3DW+nNgIMib1zuizJaTzTM+BzoUnUyjWHcEBnUeCk+As7ti9gcS7wNH88XM++p5Hf7j4H0vZer/IWwPzgx8LrLP0fIc65C3henBZ9DnyntuMHFAYnBPM1N2R9jR/Hs/3AI+U6fDtOCzarD5FHyuK7WNyXhlpZnrmC8CQx3Fbdaieyow6CQXrpFojrgsLxswLFoH4Qh1TvAFLubMSS5rvcuebf6T3REYVOmvcC9kZ1+mJxvAzsHgjKCUjcuJecA2d2Q6O52/bJnLrCN3hnkdPAa3wbVgMLgVloR+4DOVNZcfV4G1wJmp5SSblx3LWSAlVLA9jTwGxGLmc6cm1llvi8BQb4WbsPyeCgxNKFVLNrm7AoNBe2owWHeHWZ9LPDrXUmZbdP5LwDrgspHXddaq7ZuzH2dCxexyEl3K8v2sttxi5ZVLi8CQUScb7TPJsRsKtJUCP3ZTb3+gnje6qS6rsT6daznT8X4MLjfWwiyvGtPpuyRVzPYi8SB4Eaott1h5kVahAhEYKhQqsoUCoUBdFPBziVL2aqkTkV5fBbIfRtW3pig9FGhcBdJ7EKPSxr1H9W5ZvZeq6t3+mpafXoiaFhqFhQKhQCgQCjSvAhEYmvfeRctDgVCgdgrEbDGjZQSGjBixGwqEAqFAKPDrP3gJPUKBUCAUCAVCgV/9JWTIEQqEAqFAKBAKRGCIZyAUCAVCgVDg1wrE3zH8osc47PqbMd//khR7baLAFPSzDwyEcj9H0SZytF03fec781MxLStUBIZfbu1y7PobMemvYP1es2S/reC+H9i7TenF8nF6RL5UVrrOdNOy35m2vJTP81q+3pGpv/43lZEvz7rSuXL1/rq0yupM5bnN1lOuD+bTbJP5/GvcfPtSeZwacc7z2X55PulunmTmS+Wb5n4q22MtHefLS+e8xp+A8Ef9LoXswCCVncrw2HZo6dzIo/9fd75t5jMt347Ur1SeeYrls41em8+Xjjk1wizPfJrnipU34mSRf8ybLy+bzXOp//l+eG2ybL5y5Zm/ozrNky0vW2+2r+bTUnmpXo8le10+n3kdGIYVFIjA8MujcDO7fwQdV1h7KTAZ3T0DtoV32qvr0VsU+A7ODCV+USACwy9afMHuEIjA8Ism7bLnLOFbGAZvtkuno5+/UuCbXx21+UGaFra5DD933ylnWPspEPe9/e559LiMAhEYyogTp0KBUCAUaEcFIjC0412PPocCoUAoUEaBCAxlxIlToUAoEAq0owIRGNrxrkefQ4FQIBQoo0AEhjLixKlQIBRoGwXiCwiZWx2BISNG7IYCoUAoEAr88leMoUUo0M4KpL8UjlFj+z4F6S+l21eBTM9jxpARI3ZDgVAgFAgFYsYQz0AooAKtMkBahL5cB/GDcN7VsE4rED+J0Wnp4sJQoKEUGJvW7AoGh9HhK0g2ATsrwgowHrwEV8BjkP3RQA5/0xtGcwfzZ0L8HaGwNlMgAkOb3fDobssqMAk9Wwj2hY8yvezL/tEwOxwHw2Ex8Efj/gQ3gTY5eDwXGFj8vMXgMhSugRsgfk8IEdrBIjC01l12tDcuzALTgksKd8CL0JUP11xq8fqulMHlYXVSwPd4F/AHAAdDMkf+F8CnMHNKZHstOGs4BgwYPiu3wangTOI98F77q7OLwhkwGPaEeAYQodUtAkPr3GGd9zawPbwLH4K2FawNwz0oYzqR7yF9Qyeb1TJdqjDAPAtDoFg+kpvamtHp+f8I7As7wWBISz/jsX85jA+bQd6cBewMLjE5O3gfDoG8nUCCs4hzwGWq+yCsxRWIwNA6N1in5gePN4NB4UtwFDk1fA2lbA5O7AazwRdwO+gMsssROheXKXQwY8EzMBgceRpMwnpGgT5Ua1BYBc4D71n62Xi3k8DTUGxQ4DPyAcwILhd9BqXMMu6GbSECQymVWijdUWZYayhgYBgGr4JrwVuAI8DjwdFg3hxpHgkGAh3/6XALrA5PgaPD9Hysw/6xMCdsAG/DyeC681wQ1v0KeP8OglXBGaGzRO97mvV8zv7H8Homjd2fzUGhgcWAYF4/oHbmUMycHToTiYFkMXVaMC29+C3Ytbbtki/v4WBgWBcugbz1JsGR5lqwMZjPwHAYLAN+SHkKzA3OJCzzFdAegx1gAXgEzobFIaz7FOhPVafCkrA5eG/8HGFsyL7TOn0DSDGbicRJ4Q5wMDEGLAfFbCIS5wFnpGFtoED2IWqD7rZFFwfQSx23Izy/aeJx3mYl4U/wX3CWkEaZ7I4YPR7F9hrYDvwg25GnSw9Ze4OD/eEqOAtc025Wc0TcLDYjDb0efHdXg8dBexScvflZUbJz2THPYimhsDUoHA93gkHhNbgAzoSVIWvTcGC6dunITdv/6zt1EPwDNoQJIazBFOhVg/bsQxkXQatMlX1YHcnrLHzxHRVuBq45jwJqti/oDEqZTuZhWBicGUwBxWxiEh2Z5p1PsbyNmjY1DXMmNFWjNjDTrpnZ3wXGyqS5OxncCjrxMSDZoey8Ag4CboKHYAg44/B5SGag8Zl4EdTC2YHPzetwMfSHVrar6dwaFXbwAPKptdc8CS/BaeAsOn9fSArrTgXGpLJBcCzMCl2xVgsMSYs+7MwGW4EP8rXgaEdbHp6G8T0oYjpJnYlO0wCxMhSzeUk0MFhPs5qjYp1h32btAO024M8MPsvjQjIHAc4Q1oKNQefn+1JsQGUZPh+rwmbgAGM+6A2tbtUEBrVL+jlTXhIOAQdQZ0AzDDBoZmuaN8KRjyMkH+SuWKsGhqwmo3NwFjj91Qysd8M14Lm8+XA7ujQw/AF86PMzqilIuw+ugGa2VggMSX9H/mHVK1BNYChWuoHC5+hy+AgWg6a1/IveDB2xzTqq1WE9eBTCfq3AlIXDtzLJfmXVh3bPQtqXbLcGRzg3woXgDML0n2AF+Aosw2W22eEluBIMyH3BWccLsA00s9lfLW1HHjXnvz82Z7N7vNXOlrpiP3DxMNgE9ocTwXftZmg6a7bA4M1zensErARO/8P+vwLLkrQlHAnOCnTw2oyg40/2MjvrgFouAxuBswd1Hg77gA/8+7A7OArym0ouN3wIe8MDkC2Tw6azcKZNd8satsHf0LK/ggOqQ+FZeBPC6qjA9JT9CnR16SjfRB2go+JmC5T5fqRjl4kOA0fA38IQ+BR04KU+K+BU25pLAA4yYm24bR+BER8k+/lLraw3BZ0FDr6azprJEbp2qgO/Ca5rOqW7t8EGALU6HhYHl30+gTvhNQgLBUKB+irwHcXvD8/B72AwNM1SZTMFhu0Q1nVul5LCKlPgHbJdWlnWyIUCLqGFhQK1UsDl2D+BS7RXgcuvTWGOwpvB+tNIP8w5Dl6FsFAgFAgFmkGB02ik394b2AyNTW1shsDQh8b+EW6BC1PDYxsK1FCBHwtlNc1Uv4Z9j6Lqr4CfX81R/2pqV0MzBAYjrevkO4PfkAkLBWqtQCwh1VrRKC+rgF+p9w8Fm8aaITCsgppPgt+sCQsF6qFABIZ6qNpcZdbzGXgdKQZUIEdHbRiXMgbBBeDXxP3j1Emh5tZRYBibGqeDOWEW6KjhZKmp+deEG8DVELOFmkobhYUCoUA3KfA59YzTQV1Tc94/iCv1haCJOXc5rAtvwMXg8tTqUHMrFxjmpTYdsl8NtUF+qr4tdKctQWV+J//h7qw06mo7BdJnC9098Gk7oRu4w+kZqEcT/VsiPystZ7NxcnlIn3fl835BwsGwCfwZbgVnEEMhbw6o/Yr6ABgtf5Jjg49L9CXNDBZiY/LC+En6XTAY/O2Ps2FG6Kz5F7XWYZ1uvwcFK2dbcvIZMEKGhQL1UsDnMSwUqJcCDsA7esZuII+Usq84cXfhpL75JLgNDBDJrGcuOAX01Q50/NWCi8D874IrLy5BzQP3wdNwLzwL+nnrGeGkjT5XwHMmZOxa9kVbDqaHXT3owGxMXoTepB0FNsooZlD4AB4EG200zJuBZHE4JH+iTsd9KHcisG1h7aXAhHTXAcsEMOLFaK/ut31v/WM0fVS9bAwK/rJGhY9FOcfAUPBvu5Lpd5eHc2Aw7ADfwKywAtwDx8N/YSXYHvxl5alhd5gUXoGT4V5fhvHAQkuZnzMcCafC8Fwmr58WXoKlYUewIn9o7Z+g4Nr8sADsBc5OdMJetx9MCYdDysvuCOvHvzrqB0Ye1v1fxbKuFNTURPJTuxT9O5OP4n4u333N8rJ1pHuRyh+Rqcg/jZKvFXTyOZ4croP8c5iXviu65++1ZefL6y49a9mvfFnF+lUsT1fy1VonneRJpRrZxXQ/H3ivgzJc8tHhXwHZWUD+Mn2oAeBMmBMeBQezPsN+UcdrDwCDguaKix8DzATnwEKgXQyfgtcZbBwcrQsGhnVNtKJy5suiI3fZZwN4HZ6FL2BhuAhugaUL24fYbg4DwUDhizYDfAI63q8h2R3sXAp+hmGZWZuGA/MOzSbWcf9Byj4MfqhjHVF0Yyrgi3so/BWceoe1lwI6Vt99g009bEYKfb6Dgm3Dx7Ac6NxL2dWccFC9OGwIb8Df4GEw/VhIQYHdEaYffQL09eeNSBm5lHQn+9arbxav7QvbGhg6ssvI4KffNsQRj5XfC3vCIuBL1QvWhCdBuxHMY1S6DcYEA0t2ZMzhiB+Yeo7tbJAPDM4WXG76CrrDXH8zUEVg6A61G6uOqWnO53AfvNVYTYvWdJMCH9Wxnvko2xWXcqZvdGDSkTlD2Az0xf1gDTgBjgZ9VzmfbvAwQL0N+m/39XvJDBLm2cNCtgS3TjM8kTcrHa2QaEQ1SJwLJ4EdPhhcNspGqac4NkItBwaGn8CO5M10b8jY+RMcjwFfFEmvZ1K9Rgz1bHOU3XUFfA61Ys/oyDPxbyjQOQXG4TJXP17u3OUlrzKQDIF/gYNuHb2D+H+AA3Sdf970b/p6A9Dv4T+wPTwDySZnZ7iZloJbIb0c7P7KTM86/Vc4/gxmB6/3w4zseQ5HWHZ28BIp48G48P6IsyP/8XpnIC4n5c0g5fmwUKDeCsSAoN4Kt2/5R9D1p2FoDSU4mbJcYbkDHMyMBc4WzoS+oD+/Du6G98BzE8OmoF++FpwZ7AdXgLNk/bq2IOym4/2dR2VsNs69A8mhz8K+Tt4loFIv1MKcmxcOAO0ecDlpTrgNkq3Kjp0ycOTtYxL8QMQ2GiTCQoF6KZCe41KDo3rVG+U2jgLpGahli1xd2RFWhC9rWPDllLUtbAI6ep3/3qAf1Z8vCUvAINBXGzxcfXkIDgLNJaRdYEaYGSYDfe3Z4GC/Q3Oa8YdCrsXYDod9wcpOBJeSsrYCB+bxw7ys2Ltx/BoolmandPjbQDYfhyPMfH4gMnDkYV3/3YfSLwKFCWs/Baahy4/BVO3X9ehxQYFr2K5RQzVcften3FzDMrNF6av6FCjmt/TPpvcubN0v5mdJ/v9WrMB8LtetXI/aHMaA48GAYKT6NxwFi8KnMCmY52gwX3YEdibH44NiaV+BAcf0bD4OR9iL/DsUNoTDR6TEP6FAfRQo9vzVp6bqSh2d7A60XLp1hv4uhNVHgc48Azpfl8KHQH5VYyXSZoJloR5mffk6s/Xon6Vu5sO5PCwF/SAbddyfHlaBtWE56A8KVsxMHwDzQCWjs43I54zFOuppMWOop7qNX3ZfmtiIM4YVaZez5m/B9yusfgpcTdHVzhhm4Zo7YMpcsybi+EHYOpcehzVUwBnLeUXKM2BNUiS9M0kRGDqjWutck5aSDBCNZLbnIFi/kRrVom3pTGDYFy2eB1dKkrl04wziUnA5qSmt1Mi+kTqzB41xdnE2zFBo2FZs34L/gUtSg2FGCAsFWkmB4XTmANDJhDWeAovlmuRM4XR4B3YCZ3pNac0QGIahrFOyXuAL8ie4BVaHjcHPOJzSnQ8RHBAhrNMK/NTpK+PCdlNA3+l3/l1O97Na/dMR4CrGuuCgtWmtGQKDL+sQ2AL+AruCwcKI7PrrSbAnTAy7QFgoEAqEAvVWwA92nRHoQ8cFB6sLwo7gakZTm5Gumex6GuvsYHlYGvwKrDfFdT3X+fwpjrDqFFic7E6BXWOt67cYqmtWt+b+oVtra63KxqE7feAD6GjG5eeCfsC7CvQD/c9QOABehZ40R/7V2ilccDzcBH5OZXA4GCaEMUG/5ExiMJwGTWPNFhgU9jP4D1wFPpTeAIPE/nAXhFWugA/u0fA43ADfQDuaL2+j2cw0yDXsCQoNe4XtHfBR4bgRNsvQiL+Cf0R1D7iUUu4rtatz/lg4EE6FL2EvWBZ6OjDQhKrtXK6w784cPgeDyxfwYeH4O7YGSz9zaCprxsCQBHaU9zF4QzYHI/KnEFaZAj7EzrjmhafB43a3WmrgKHp52AIcwAyFK+F+8JktNzvz2kfA5/s90Bxhu3S6OLwB1Zgj9e3AWfUJkHVUc3K8JfgNGx11JTYTmY4CZ+9nwwNwIDjrXBFsdzF7nMS14KHMSQOJ/e1p04FXa99zwTHVXtQM+V0fa2Ybjcb/Axzxnd/MHenmtusA/QrkVjAYnDnU0ilSXNvbwShwEPh1xtvAme4e4HLntlDOGTpzWwQGwlwF3H8WnBlXY9bzd3DwZFkGgKw5mFoKJsomdrA/L+dXAWeZR4JLKGvCi+BMfhIoZs56skHBgelC8FyxzJEWCnRWgQW40FGUo56uOLZ9uP4iaOYZFM2v2FYl5wuwAWwIF8IY0K42NR1/DKaqkQALU47P5Y6Z8n7LvmvPLqc8DY60q9F8cvI/CL+HaixdNzsXyVOwDfi+jAuD4fLCPpuKzNmHI+zpcrkNLg/DHmB/y5nnz4PrYYJyGbvpnLOdNbqprqimGxQYvQZ1tENg8EWcEv4EH4EvtzOt9cCgOCa0q/Wl47UMDDrHe6HUyHkA55xJ+Nx5DzqyschwIjjzqNYMRteCgydtY/AHMQ1Or4H9ng10zpUOrnYm7ztQzJYh8W6YuNjJQpoB0RnVZzBHIa2nNxEYMndAZ9Hs9nWzd6Cb2u9o2JHh4qBzOA1+ANe6fQ4qdQpkbTmr9XvwBgr5waNr0MVsCIlbwzowRbEMmbSZ2L8A+oFLUNWag4DdwUAwA7iUMy8cArvBUvAtDIaxoRIr9/nIkxQwGoxXpqCFOGfdLkXNAy5xhTWQArV+IRqoa9GUnAKO8Fw62hxuzJwzOMRzkBGkBrtHUYYzgXK66qgNIC6HlrJJOXE8rA7PwNRQrbnk8zIsC/fAfeBs8TJwlPwlDAIHWJ9DJfYhmSaCXiUyZwNisTzOlvzcw/pc1roezoF2nrXS/caxURunKdGSOivgCPaNInUYGNp5tlBEki4nvUkJLnGW+4BZR2ywHgCl7BNOXArvgp9bOMPQmf4FbgfvaaXmtTfDxXAMOAPRObuEtAZsCgaRSuwFMuk7BoJBJ2umGxBtm9tDYTicAMns9yGFA589g+MZcBjsBc5gwnpQgXIjmh5sVlTdjQr4Ajuqi+BQO9FfpygDg063lPXmxISg0y9l33DidHCWtzQsWzg+nK2Bohq7n8wvwXWwPHwMZ4GfXRwPjuIrtWfJ6CDDYJP3IZOT5ozhKzDQuD87lDLz/BcsaxGYCsJ6WAGje1h7K/AZ3deJGRza3WoZHIch5vygEy1mOlA/EP5zsZNF0lzX1xmfCn4WsCvcDZWaXzBI93go+7vDOGC5PgPOHCs1BxObwCXwCNwGmv7EUf+TYODR6b8P80JH9ioZzD9GRxnjfP0VyEf7+tcYNTSaAjqb/0E8C7W9M6dR3B/BUbDfKko2GjuzgTOBq+GtwvHf2DqLyNoqHOwE/SB7Tsde7cjakbszkGQ6dz8r0IFXExTS9fey43LQsXAN2B9nJS6fHQeWr/ls9Yds0DWo7Qxjg2bAWhm8xvaE9bACMWPo4RvQANXrmPaETxqgLa3UhFvozNRwITwGz8HXMBAMFn4j50jQWY8HrrPng7PLTNsVeJTtezA+zAc3Qk+bs5d7wKWiccFAZ3D4AJINZ8fZkX1MTl89XA5bCe6AqWBjcPZkn8N6WIEIDD18AxqgekeLjurCaquAa+wnwmDQuS8HjpB18KvBK5DM4OC7mB1Ve868a8EsMAj6w1uwGzwAPW0+O08XKNWW1zhhwJsV7itkMpisAH7QvDUMgWXB4BkWCjSMAvvQEtdgI1A2zC3p1ob0pTZHsW57wmam0gfBkXUr2iV0ar8G75iznTU60cYpuMbA7T105jMaNL2FI2z6WxgdaAEFnAW8ClvBYS3Qn3wX/EyhJRxmrmOTcXwl+OUNZ3vO/JwJXgYGGj8zaUqLwNCUty0aXWMF0tq+34rpCfPznU17ouJuqvPtbqqnK9Xkl/EqKcvPQzaAoYXMM7HdGQwMT4DLgOkcu81j6YVonhaPbGl/NhfA30cexr+hQCgQCvSIAlnH/wItMDBMCX6OchWsC003AG/GwDAXQt8IX8O/ICwUCAVCga4qUMvZojOkveFw8I8I/YC9FzSNNVsk88PBU8Fvayh2WCgQCoQCjaiA30r7NwyH8+EheByawpptxmAU9utvrbwe2xQPTjQyFAgFKlLAr+gaIFxiahprpsCwOqouAYc2jbrR0FAgFAgFRv5w4YIIMXWziNEsgWEMBD0ZLoVnmkXcaGcoEAqEAijgH+4Ng981ixrN8hmDX/vye9B+vlAvG5uCB8L39aogym1YBfwjpT7Qr7Bt2IZGw+qigH9v4OCzXvYtBT8Mq8Hf6lVJLctthsAwJh12Gcnfc/e3Yuply1Hw7fBjoYJR2Er6tkLaOstyPx3n83FqhJnPslI+j7Vs+R6nfO4ny9ab0lI5ntPSNl9eyjcy1y+/v5PPl86nbb7OVE6qJx0X63+5PqTrLMd8/oxC1oqVZ97U3pQ35UvHbrNtztaTz+NxvrxsHr8xMglcDh39UZLt0FJ9I49+OU56ZduW8pTrVyrPPMXy2Ub7kM+XjlMdtq9YvtR/y9bSdenYNPdTusdZS+mp/6m8lCeVk8+XjtM25ctel86ltOw2ncvXazmpr9n8qQ/pOo8ltdd9LZvPvP7WUz3teQpPf+hnoGhoa4bA4GhuRti9zkreRvn+dkvecdW52ii+ARSYjDa4VLkDvNsA7YkmdK8CDgbquRphbz4AVyX8K+nuDAz+eKGzIQPjh1DRikgzBIaBdOb9QqfY1M0+o+QXIQJD3SRu2IK/pGXfwKvwZsO2MhpWTwW+qmfhlO3sRt+SZjK1qm5qCpoTdPoPQLb8eTk+ACYGA4O/WXUG+LyXtWYIDIvRg8egOxx2mmaWFS1OtpwCcd9b7pY2XIf8a+hPoUOnXEXLdySvjt8ZiDOBLeFuSObyo38M7F9gOyu+CF4Hf8eprBnFGt3mp4F+EymtETZ6e6N9oUAoEArkFZiNBH8/qVYDXMvzq/u7wXTwEswMWfOP6k4CZ8EOro+B9aFDa/TA4DeR+sHQDnsSGUKBUCAUaEwFXOefDy6uYfP8LOx3hTJdBvWzi3JfnHBW/Br4/2LMATNAyZlyoweGgTTe6VCs+yJCWCgQCjSlAo7up4Bzath6v6F5JfwEY8H0MBTytgoJLieZ/3qYG5y5HA5+KF3UuhIYxqRER/MTFS25NolGt8/BD5/DQoFQIBRoRgXWpdGu61f0jaBCBw0kl8GAwnG5jc7fHxV9MpepL8eHwKvwZ9gcXgRnDBtByc87Ovvh81IU6trWNPAhbA9Wrs0ONvJlD7po03L9R/BFF8uJy0OBUCAUKKdAyWWVchdVcE4ftgxsXUHebBZH+AfAW9nEEvtrkX435AfQ75BmUHodnFn4tzp/gN5QbtlpxFeoyFOVLUnuK2AYrAh+Ir4raKfAU+AHIXdByakK5yoxo+bHEB88V6JW5AkFQoFGU+BWGnQvPF5lw5xdPAvfdHDdOJyfE64pks8yhoBBQXOG4CDbZaey1pmlJNez9oZdwKjm+n9aTjqb/XlhAbAxp0NXgoMzmlp9ik9RbWdOJVeDLcGZXDFzpGQA9r6JD1q7WRp41GvU2G56NmN/k/OsVdv7UNCBoA87HNIzxm5NbVJKc1nfAXnWfI/z/t2/1XApaYtsxmL7NrpauzFzgS9Sf3igkPbfwtbNpmBeHdJD0Bnz84VpOnNhm1/jA7EmHAQu9TlKcH82UNNk/djZAxYGp5cGYe/ZgVB2qsn5sFCgqwr4POonJoC3YTAMhWpNJ/hZtRfVOf/SlL8+rAwOnutlo1CwqKXBZzpYBhaEncBZRzLPnwNngN9i+hrqYgMo9RVYqETpV5Duje+sDeJCg42dqKftQ+EXQWcCZT3b1dmy5+FCH8ZtCwVMxdYR0VyF47Q5gZ1HYclCQn+2T4AvajuZg4/HwBlWWPcosA7V+Ew+AueCI9kHwdlrNbYhmW+GPtVcVCTv1aStUSS9M0mukgyFLTpzcZXXGBSOB7VMOFDfBPIzBpIqs644Qhu0ArwBaabg3x2sBgrTC4zkfjDiByh3QLV2Pxf8GXxx/dwirDIFvC/XwOmF7N4rLW1HHo38bMhRhA+U5gjCdchx4SMI6x4FfIEnhonAGd1wSPeE3arMd86Zn/cxb76fk8DY4P11Kbiz9XBpp21KrvwTOHBx9KrPcFbr+/4dVGMrkfkb6M5+eL96F+pl8ytzxH5Vgf/86kx9Duz3LnAk+N6+BV1+d/OBwQ77KfowUOxy5ih+bTgZ0k1RrO3Ah9sHczzwge/sCNRg8AHMCREYEKFCG0I+70WyNApTy6zlP7/xpTQ4eN/CukeBBahmZ5gNfKf+B7vCk1CNGVT2hsXBwKLjHQrJnNXvA/3AZ8MvdTjouhu622yrg0eDgoHs9/AUnAeVmgPPdWEDuA7yzzJJdbNNKdngdjRkA5kzzhPhMdgf9IPdZW/UsiIDQdYcmV8CPlwd2QxkcPRhlE9m1DeCrwdbwMVwA/wHOmuXcaGzjqyjK1aWfRmtgHnzfSt2Taum/ZuOHZzp3CLs63CGZdKK7RrgnUGoY1h1Cuio1PkI2Bx8Nzp6Zhckz42gk9SRGyS8T3NBteb1y8JRYN3LQdb+wIEBYxD4fl8D/4SesA+p1AGIAcGANR3oSCs1n8/t4F/wCnwPPrfdZTtQ0byQfU+8hw6SHRB7/w28TWuj5lqu4/CByo8sc9lGHO7Fv7fDO8VOFtKcKShUV+xKLt4YDA6Xlilofc6tATo3Zzu+BPfBXYVjNm1pY9JrHYYPbUemdgbUrzrK2KLn7X+1NjEXLAo6dZ9RnzfXz3eD/8KBoLMvZlOT6Nr2oMxJ18qzo9DMqbK7d3D2QngapoI5wHuZHOam7GfNQZsObGZ4PnuixH6a/fs82cZeoF62dQh8DJXaW2Q8CI4Dnavvtc69IxuFDPPAgTA+bAb6K3XszL3jsk6ZWrwP6mub5gf78jrsAU1vo+Z64ENUSVBQmFVAh+0NVaAlwBv+EiRzBHVmOujkdhjXHQungDfBh6jYQ/AM6ePAZNAXFgUf/JvBkUm72vR0fFrYoogAS5JmQDWAJ5uJnZ3gDfgU1LuUY+NU25tO6QSYCHwHngBHj9PAIXAVrAzFHOcNpN8JyXxmvVdPpYQqtj7nyXwP50sHJbbeU++vS1gdBYbRyWNffOd9B7X0Dnr8LzjGxArNa50p7QcXwQbwJqjjD1DKVuDE8eAKhNu3YWlIDjq1iaS62ieUPi6MBluDg+TzQR0+gqa3fGCotENTktGH/wsYCFvBlrADvATaPOBNvtuDLphlXAgGoyPBF+5c8OZ8C+lheJZ9SeaoZjtwunwF3ATtaIvTaZ1VMcc0C+lTwbugTQg+7KbPDQbaV6BdtaPrHdpvyTE2HACPFHJ/xtZncRA8BDqO/cBnOWu+P6IZWC6Af0NHjposZc1n35F83nTivcD3XpxZDwDT8m0j6Wdz2edQOBZ0fF+B+S3PuuxvtaZuanYMPAw6+pnhL2AdxUydD4KLIL33/2N/dugN+oPusGupxHY+Az/CvuB9Uw/fGe+p6U1rnQ0Mw+nx5fCPQs9fZLsx3F84dvMYrAXpwTetK3YyF+ukdoRNwZdQhzcEPgQfCh8OX7B+sAhMD6/B6nATtKOtTacdiRUzNZVkBl2XGNaAT1NibMsqoIN6HU4qksvBi+/FiTAlvAHFTIeyDTjTHR/+Di+D98Iy8jYWCTrJd/MnCsc+929Ccp4p29bs6EQnAEe8s8Ck4Oj9KShn7xRO2lYHD9Yv70G+HpI6tPnJYf3rgP7jUfgX7AN7QjHT5+TtWRLWA9uiH+gOO5VK5gb92wOwOCwDzqzGgF3hVWha62xgcISwLYwDPhQeO4rI2xf5hC4e38r1D8IUsCbowGYEb4gPrG2xHd6U6+CvcDYUGz2R3PLmi6cTeLzCnvYmnxqqZTtZV0Z33yPUl1Ds+VdDBy+WPyGUCgxq7qDqNPgAPN4bFoKdIf8eLUnaVqBDLGYLkngOWE7WJufAkbrvkY7eZ8P2PQ+l7ABO6PS+Bd8zA4r4rOg/9oALoFqbnwtsg0FBewX2Bcu6ECp9Zu8k77EwNXRXYPAeGcgPhwFgUPoBHEzZhuHQ1NbZwGCnfRmkO80H3SAkLiuJTswA1QcMAJ7zJmlLwEywpwdtaD68L0F6UHUKOoN+MAdcCR9D1szjqOeTbGKL73clEOq0ffYceevo8uYyjZomJz1b4Tg/Qr+HdEn2D3buA4PDbSmxsH2B7XW5tHTo/e0P3ve8HZJL2I5jA1q5gdO1hWucJZjX5+V9cKbgjEWH3hlLeqh92n+M/WdhSzAwOPgbVthnU9Rsu1ouDk8WzVGfRN8P2ystZ10JDI0ihg+VkTpv45GwF5wJLXnz8h0ucjw9aTqueUHHNR8sAhPB1ZB3iOY1qK4Op0O7WNIhbavp99tk1iEdD5uBI+usrcKBzktHavkrwXTweyhnn3PyRlgA8oHhNdKkmK1LoiPaNBIvlielfc+ODr+cPcpJqbXdTYHOYAxO/4FvYFrwOU1t34r9l6Gj2cP55DkQTgJnZ2GhQEkFDuPMraAT7Mj2IcNF0AqBMttXR1GO7r6GD+EK0Ok79S3WVx3XlIXzbNrGpqGnDh76drLHA7juMzgCnB0km5edL2EHSEFna/YNyqVsbU6MXji5E1uXSaoxney/Mhfo+LeH+TNpafcsdq6HXimhm7crUp8BU43UzxmJQXAc0BycVLJM5Qx3fS/ognlP1ujC9S11aTHn0CodfIKOXAoftEqHOtEPlyZ0dr5oLgE4ci1nzr7eKpehRc+lpYy0rbabQ7hgKTgFdMwPw9SwGJwGOrhUtvoaSAwUKY3dETYV/xpcPgIDzBZwNFRjvtNzwqHgvXfpylmM70PebNt+YL3D8ie74fgm6pgRbG9vUEf5HrRnYBAYuH6AUmZA8V3viqXA3ZUy4toWU2Af+tOKM4YWu011646O8TFw2xUbyMVbw8GwGywBeYczE2mvw7SQN53jU/AsPADbQho9s1uRzUWu3cFnejtYGiaCUtan1IkGSJ+bNvg5xgzd0JZrqCNmDAWhW3nG0A3PUlTRIgo4Iq2FvUYhUs5e5aTLe4PA0XrWvuPAJR/fyy+yJ6rYd2ZQbHZQqgjX9hvVHqdhb8NC8FKdG5mfvdW5usYuPgJDY9+faF3rKaDzPxDWApeLfoSs6agb2Vln29od+35439kg2R3ta8k6IjC05G2NTnVSgfyyTyeL6fCy68hxK+SDQocXtmGGdvzMq8dvsyOWsFAgFOheBVy28JtiYaFAQyoQgaEhb0s0qpsVSCP3WGfuZuGjusZUIAJDY96XaFX3KtBdS0jd26uoLRTopAIRGDopXFzWUgpEYGip29mpzsQzkJEtAkNGjNgNBUKBUCAU+PWf74ceoUC7KuBnDPH5Qrve/ZH9jvufuf/xddWRYvjn9rODf3CUPogceSb+bQcFvOfvwPbgsxDWXgr4ExwDIIJD4b5HYBgpxC1sJofxILvW6IOSPeZwxMPTE2nWnbX0EOfbks3jfjX5OiorlZfP1wo6+Ze140K+b/Y5a13Rs5F1so/F2pfte8rjtp465etM9ebrLNbezqb5I3ovFKu4HdPyQrejBqnPESSTErENBdpPAQNKLCm2332PHocCoUAoEAqEAqFAKBAKhAKhQCgQCoQCoUAoEAqEAqFAKBAKhAKhQCgQCoQCoUAoEAqEAqFAKBAKhAKhQCgQCoQCoUAoEAqEAqFAKBAKhAKhQCgQCoQCoUAoEAqEAqFAKBAKhAKhQCgQCoQCoUAoEAqEAqFAKBAKhAKhQCgQCoQCoUAoEAqEAqFAKBAKhAKhQCgQCoQCoUAoEAqEAqFAKBAKhAKhQCgQCoQCoUAoEAqEAqFAKBAKhAKhQCgQCoQCoUAoEAqEAqFAKBAKNJcCv6W5UzVXk6O1oUAoUCsFRqWgUWpVWJTTMgqsTk9ugfFapkfRkYZWQEcU1vMKTEYT1obZ4GG4GL6BsFBABZwxTArjwyfQk9aLyseEz3qyEVF3fRXwgQvrWQUmofq7YCf4CPaGOaFdTQe4BZwJ98BpMDG0s31I58cBHXJP2xw04NKebkTUX18FIjDUV99KSj+XTE/CorAfvAyTQ7IJ2Nkd7oZH4WwYAK1oK9Ip+7kdOJu9HXREm0KpJbZKZr3OyCzzWrDMfcG0elmptlZT32hkHht8R4eD/XS03hmznL+Bs9EbYS0YAzpjA7lo+gou3Io8O0Oqx/78FZwNhzW4ApW8VA3ehaZv3kT0QIf1aaEnP7LNOhZfxOXgWPgYtoR9YFf4ElrJdCInwxnwRaFjE7Idq7CfNj63U8FSsCQ8BWr4CuRtOhIOBJ3jhaBmOq3ZYUPorHmPFgKd5IvwX9BM2wjuBNv0PeRtARKcGV0P3u+8zUqC99hZwn1wHHwFP0FnzMC6I2wBk8MJ4EzsaPgcqrGtyVzJzOVl8i0CBgTbPiWsCQdDWCgQCnSggC+Zji6ZyyfLpIPCNhsofLGdOfTL5WnFQ/v9AmyQ69xeHH8H78NhYB6PN4esjcfB0zA4m8i+weRbcDbWGevDRTprHbXLPG5PBM2A8284CHSKeZuGhNfANfpV8yc59nOEm+AKGAQGu1vhGbDsaq0XF1wAWYecgtksVRbmYOQHeKPK68y+MNwDvT0ICwVCgcoVcFSlI5uxzCWOIu+CzjiJUsVmA0+pPN2dbsDU2d4BzhqS2VZHo0NhKdAMrAYFR7/LQrJ52BkG+QDQnzRH8nNBZ2xvLnoA0vULsr99piADmWR1dd9AMQjuBcu4BPKzIR3oI5Cu9Vl4Fz6ChaBas5y/g3WqqdYL7oc5PajAfkueFeFr2BeegGptfy74J6R+VXt95A8F2laBf9DzK2H0MgqMwblrYIkyeao5pbPaERxF5s2XWKfQ3eao8o/wLMyWq3xSjh2h+3mMDi5rLo2cA0m/Jdl/FfLOaArSDAydcbTqMRz+An2gmG1E4m2QDUjzcXwunA6OvKeCh2B+yNoWHJydTWD/z2CfDTadsWm5yJnNEWAgWgrug75QiRlADAbbwQzwJPgcVmPWt241F0TeUCAUGPmiubzxuxJi9CN9UdCRXAebQLUvp7OMyyCNHNn9zSzwBug8srYYBy552KZ/g7MZTccy3oi9kSPgg9nXUcxcSKvFZnIKeR0cnepAs6Zj0kkWmzGpkc42XbM0+y9BPjDY1+8gH3RIqsgMQLbB4HIWDIC8ufTjjCXZUuz8CC+CMw0DzKGgw8zaHhzowLN2PgfWdWY2scr9scn/DtwEw0BtK7XbyXh4IfMkbB+ARQrHlWzmJpP9HlhJ5sgTCoQCvyiwBbsfwPi/JP28pxP5E9wB98O7MARuBh17peYI9hRwuWqKwkUeHwm9C8duDTyvw/6wEZwHt4LtWBHuAk3ncjecBRdAflmEpE5ZH65ydHo1PAIPw6EwDdhunfKSkDedn/n7F07ogIeCs4ysrcrBJ2D+zlpfLtwE7PtTcBrMCqOAdhEMcqdg47K1TmcbBiatPzwL+0DSf1P21TKZAfBH+DMYbHSynbXpuPBR8MPgE6HSsqYkb7q3vdg3QF0MldrZZDS/z09YKBAKVKiADuoy8OUvZTrLCcCX9FxwjdqRcXIo7FZklnEvHAxe+xxklygcEX4Ex0Mqe3L274OVQYf4GCxX2C5WSHuQbT+olelgdUZTwyJwLVwCamUwOhVGg6zNwYF9m6yQ6MxGZzqocOzGa46Dahyb15Uyy3O2dDLodBcEbXO4C7xvyXTGr8GAlMB2UXgF1gT7bCBw2cZnYXd4BHSsY8Kh8AJ0VucZufZJcEnnBHCAYJmWXY0tQ+afYIkKLvJ5cSCzRiav99DnLCwUCAXKKKBjcdRZyQs6KvmOBgNDZ216LjQgzATvwLKQzMBhYFg+JbDVYZ0H/yyk6aDfh8vBl3wc0AkuALW07AhTbV6COcFZg+3WcfbOcBX7BgzTkh3Ajo7XPpu+JAyD/lALs0z770xPjVLAmYj9W2A9SKZj1hnnHfsmpHlPvbdq7TUvw6uwHyRTD/NNlxKq3G5Pfu9ZMgOuOh4LBrgxwIChxh3ZUWT4EjbsIONOnLcvvTL5tmHfZ6gj60+Gi6CS96KjsuJ8KNB0CqxMi68ttHo8tivAhIXj/EbH4WjylPyJKo51ZoPhEHgLloasPcSB55I5cr8edCyaQckR4x4eYKPCkZACh2ldNR2V/ZwDpoXNQKfqvuao1TY9Amp3bwGDbNZG50DHZz4d9aOwNWSDDoedNp24ev0XroY1IZk6Z02dZoJ8unm8r/W2v1HBcTAZGLicjQ2Ch2FK6ANnwG5QiS1FJmcEpcwyvS9r5TJ4b32mOjLfAe+d5YSFAm2nwKb0+B44EO6Hx8GXtpTpjAaXOllh+nLkcyT9PjhyzJqBylHe8oXE1dk+D2MXjldha2BYtnDsZgXwGkfztbBeFHIhDAGXT9RkfTBd05Hq3AwcBraFYXIoZjo8A4b9nAFGg1qZmgyAacCgXquAQ1E1N/v/GDwDT4L3VPYEA6ia/hGugVrYOBSyFHRF72JBtBZtizJCgYZXQMdyIzhy2wV8oeptOrDzYBg4is3bX0h4D16Ct2FrSOZSiAFl+pTA1hfYEfkRmbSu7uqo5oFsPV0ts92vHwMB5oelYBbIO96lSXsXDLphoUAo0IYKTEqfXfpIo/CsBKY5Gnd2Mh+4DJI1r82bo/G58olx3FQKOAN6ArKfbTRVB6KxoUAoEAqEArVXwKXCGyA/m6h9TVFiKBAKhAKhQCgQCjS+Av8Hh2rzGbJa/xkAAAAASUVORK5CYII=[/img][br][br]Erkläre, warum Konstis Berechnung nicht stimmt.
☆ Ayla berechnet das Ergebnis ebenfalls mit der Tabelle, kommt aber auf andere Zwischenergebnisse. [br]Vervollständige die Tabelle und überprüfe, ob du mit Aylas Vorgehensweise auch das richtige Ergebnis erhältst. 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[/img]
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