Ein Glücksrad hat 15 gleich große Felder mit[br]verschiedenen Musterungen. [br]Die Wahrscheinlichkeit, dass das Glücksrad bei[br]einmaligem Drehen auf einer bestimmten Musterung stehen bleibt, liegt bei 40 %.[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANoAAAELCAYAAAC/CJjlAAAgAElEQVR4Xu1dB5gN1xf/bdPXrk5CECKEIKIGUUIQUROstnqIECWIvit6J3oQq4suIUpEiS7qP0VNLCGi977lf8995pk3O2/fzHvzyuze+3355O2bN3PnnPu7p5/rF88GxBAUEBRwKwX8BNDcSl9xc0EBTgEBNLEQBAU8QAEBNA8QWTxCUEAATawBQQEPUEAAzQNEFo8QFBBAE2tAUMADFBBA8wCRxSMEBQTQxBoQFPAABQTQPEBk8QhBAQE0sQYEBTxAAQE0DxBZPEJQQABNrAFBAQ9QQADNA0QWjxAUEEDzgTVw8uRJ/Pfff9ixYwf++Csa1y+et5nVgSPH8Ojubf43v4BAxMfGWL8vXrw4kDYEoUF+1r9VqlQJefLk4f+VLVsWqVKl8oG3TN5TEEDzIP8JTPv378exY8dw/PhxDi76nD7P6/DPkBW3Xy8PZH0F2xsUsplVlX9f5WCiEdi7CsZ2Dkf37t35Z7rXWxsuYXv5tNbfEGDPnz+P6Ohofv8UwSEoUbgQCJS5c+fm4KP/xPAcBQTQ3EzrTZs2YfPmzVxaEbBoga9NVRDI+yYQmhV4vRTi61lAJA2/dXdsPsu/L1WqFJo3b24FGpdy7HrlPWzuF3Ua2/P8y0FJAJTAXrNmTZD0o38LFmRzEsNtFBBAM5i0tJgJXOu27sD+nzcjtEx1RIR9gMqVK3OJIgFD/li3A00FiI8fP+bz3LlzJ75duxEZ8YTPsUaNGhx4oaGhBlMmed9OAM0A/pOkWrZsGWbNmsXtod/zV0XMG+8AJarxu+sBkiMgOiXRHEk89v25Yre41CXpSwAksLVq1Yr/K4brFBBAc4GGBK6Fq9biyO6dCAsLQ8eOHbkKlpjq5whIjr53F9CUmwG92/z580GOmvqNmqBb507cuSKGcxQQQNNJt//973+YMWMG1q5dy1WtevXqoWnqWnZtKkfA0ft9AHOGxL7bGKjzqc6ZO3n51QsI3LMKqX6KQv68edCxRRg6derk5M2S788E0DTynjx4Q4YMQdSSZWjdLAwjR45E9uzZXba59AJN6XWUfp+oM0SD6qjl96Ra0sYSEhKCr776Cq1bt9ZIPXGZAJqDNUAA6z0oEoeYehgREYHbt29j8eLF+PXXX62/dKeqqASiN4E2adIk9J6+AGe2rOabDgGPaCIA53gjEUCzQyNJgtFiiq7bB/GTX6hqWbNmxZYtWwzxIppJomXNkx/Xmn0FlKnNHTxyGgnAJQ42ATQFfUhidendF3u2bra7W/t92AlBNy7iWd/F/NdGehUdAc9TzhA5WUhibwjaw509F6f+bv1Kem854Mh+FZ7KhKATQJPRhNzaPXr0wF9VO+LpNEvmhdrwW3IB/h2LIm7KQSBDtmQBtDIja6Bx48bo2bOnjVdVvskQ4D799FOkzpwN306ZJGJxssUjgMaIQXGwfv368X/nzZuHHAdSJ55pwXb4uvPb4senGRHTYVzSB9rkvcg8rB7++ecfa96k3C5VSvSoqCj0GBiJMUMj0aGNcJhwLSW5dyqmRTF69Gh8+eWXVqPeYUoTA9rxvOfxVsWqiJvzB+IbZbMRfO50jnhDdQwoXw+diufEtGnT7L6nEmykgucJ64JCMdexZlGU1UPr2G2QNK9ItkAj6dWmTRu+AKKqD0F8s1fsq4p23OOUt0jq1Bf52tn81p02m8fjaA/uwI+pyfFMTY5vXSABjRKTbHwnj1iFTIsGYOTAvslauiVLoJEnkWyJiRMncsNdiwRTizP9+OOPCRwE7naOeNq9//nnn2PGr38jxo7jR+m8UaMT2bQhC/qjWMB9rFsclSxtt2QHNIoFrVu3DmvWrLEy3Fmg0SJ77bXXcLbREO7yloY7JZqngSaFMt46n9fu+2kCG9MKgg5uQM6NX2Pb6mXJLp0r2QCNstUlVZEkmXy4AjQCbi8WxI0duz3JAY3eTR6cd6gmysp7VCUbfX/xNLJMbY/lMybzFLbkMpIF0Mgea9CgAbp168aTf10BlrR7yxeSJwPYnnSGkLQeO3Ys6tevb8WDIWBjdl/ouBaICG9oU1eXlEGX5IFGRY5kj5HbXl4PpiW3zx7jlUAlO+bChQs80VipRhlts3kKaGR/1mn1CWKvXdTvANEi2dhd0zO7rWH6hzxJO6m3W0jSQCPXPZV6LF261Ma9bLREI1d23rx5ceLECf6cpODef7NkGfxZrB7i6n6mGlM0RLIxsKXZuQTvn9vCeZSUwZZkgUYgo+phtd3SaKDRlv/RRx9xkFGsyexAo1Kg9957D9ens3SrFJbGPnZtrufyzpXvUxz/GR8cXZikwZYkgSaBjNRFNZtKqQsZATxPBbA9EUdLMTYc7YrlxHTFpuEKmByBNamDLckBTQkyTwGNFqGkbsXO7Z/Aqyn/gyvuf3e795VqsFbXvfR+roAxKYMtSQFNDWSeBNru3btR6cMGiL19zbRAa9++PR4+fIglS5bYfQdXwJRcJVuSAZo9kHkSaPQsqtn6ZtI4uy5xV72Q7pZoKTNmwdPBaxDfvYLbvI3JEWxJAmjTZ32DAX2/xOXLl7nnygiby1n3/5w5c9Bx2ATETd5nXaiuqIrKRelO9/6wYcMwZNmPiBm+0e0OEIdgm/Ipcvx3AicP7UsS3kjTA426NJWv3wSfN23IU6u2bduGDDv9HJa5OAskLRIyIDQL4iLXWJqkqnjsXPFKuhNoUoC6gV8Vu5uEJ2y2lB+0RdlH59C0SRMcOHCAx0DNPkwNNDLcq1SpgmOdFyC+w5sgaUKZDKd7reSf7Q23S7yPeyLo3HE8G7zaNEBb9ngTBg4ciDNnzvA5GxUncyS5lN/XrVsXW24H4vaWJVySUSEutTGXWqCbFXCmBlqtWrV4WlWtJ+WsEowyGj76tAf2rfvOmgmiZI7bgebGCmx3STR5BbVEL0+D7Z133kGZMmUwqXKkjUYi8dnMLRJMC7TOvfpi0a3UuFdXpeXAif3IOaszFs6byxNX3Q4slXo1dwWw3RJHi/4DfoPr4uGViwnsIY+AjeU+BvV7H3ivBZ7V65pQaLHvswytg4Mb15k269+UQKMuumSPUdqOPZuJDnOg7IYxY8bgo4D3PG6z0fOLFi2KK1euIPXmJzaLxxXniDu8jgGl3odfroKIbTXUrRkgamok0em1d2sgauRgNGvWTFUzJLCfeP0yr77YuHGjKevZTAc0OkSCkoS3b99u079CzblBNlzp0qURXfUTPJ3Zy+M2mzsqsI0GGm85wPI070w8wBsN6bWpXFEzKdWLqioutByNZ5EfO+QPJW1T7irVEpptmApoVFNWrlw5Lsnkxww5Ug1TFCiBng3fx6hRo+zumO7wQlIAm1TIq9+c9lmJRgHqBw8ecJp6RE18ToldmX5DeHg4Vq9eDSoq1Up/2mSLFStmurbkpgIadaqidtR9+/a1WbiOgEbf15jRBOnTp8fy5cs9arMZHcA22hmSWC2d2zJAdq+G/4IIxA3bwA9e1DWePkZon3dxdPtmU9lrpgGamsooV1u07Ih0OMPvv/+OPd1WJehcJWe2FuBqeR7dk0IOVKlMz1VTs9RUtcTibEYCjQLUdEzTrl27Emxc0h+MBtvw4cMRMWshrv9vv11byyH9h29A5a3juPlglmEKoJHKSPEyKnmRijedBQYx+quoFbjy6w7nGa3z0AgjK7CNBJrU4jt+REInhDvUSNroTp06hR2dl7m80bVe252fVmqWvv+mAFqvgRFIF+iHyMhIQ2wsKbBNu7namV8Od1SdQCOV98iRI1x6SF5S+Yvo8UIaBbTvvvsOzXv2R+z0Ix5xgNSZ25I7rxYsWMC9sFo1AjWGE39uVYrn9jpJNelUH1+Wbj4PNCnF6ubQLdYiREMIengL8i8fjBXLluoyxu0xPtGFY2AA26g4Wkj/6hjcLsymJ6XRaqK0qQT1qw6/AqXwtM0IQ1hnvcmRrSi7Zzb2bd1k7H3dcDefBxrtWvsbsPhOH8sxtU4tdDsSiLyCdHzs322/RvyAF+3ilM8wQsIZ1ULcCPe+VEEttfh2h5pINKTQQfny5XG6TFM8+3ag4fyjG1Js7Z13K/l8c1afBpoUN1nbOsplVcOexKGAaf5yVfDd1HFo2LChoUCWbiapOhmy5QAWRbvUQtwIoFWtWhUVKlTghwnK5yj9vxGSjehKKVODBg1C87SWY56M3ijpftThrHCpsrh05qRPZ/n7NNDeeustnrmtJ87ilMRjqt1rkdV4//127Wzbe0vqjxELxYgKbFeBRlImU648fGEqbRvDJNu1f/DqyHqYMmUKPvjgA7eHU9I17IJh7+b36cRjnwWaPAvACNVNC1AI2DVq1MDocv3csgOTykaesttR0Tb7gSedIZTmtOJGIGI6T3FPutWozfAf1xpxA1dYy4TcYPLY3vLWFWQc9L5PSzWfBJoyA8RTQCPukbqz42EaPP7FUuLilIRMxCvpagtxV72OFGq41p+9m51aOUmCO6NGkieTtILzA37weJmSr5fT+CTQKMBLOr7UutuTQKMFFt6hEy5H/4UffvhBVe93ZT60GJv16I+4GRa3Og1PSTR5mMEwNfH5/Ck+SVk31OLPG4W3ZKuR44x6a/pif0ifAxpJs0KFCmHfvn1WG8KVhe2sjTVgwACeKU4V26GhoTaCzdX5uFKB7YpEU7b4NgpsoXN6ovj9v60Hh7hKH2d/78tSzeeANm7iJETuOosHrYa7XbV3+ICfFqDIL3Pwe9dFhqpCrgSwnY6jsfzCfGtH4OzzCmrp3V0FW1CF+vD398fTrjOMjXM6ZI7KBT5sq/kc0Ki1NkX75Rkbzu5w8sWkxRmixltS9Vr0Hoxfvze2Yjs4OJi3DdDbQtxZr+Prgyvj1DvhiJ/RI8FrOgs2qoimTPqZNUe5xXnkDP8oruaLqVk+BTQ6IHDIkCEJkkW9CTSuejJP2quzO/MjjKjGTDmcmZ+zFdhOAY2dQe3PKqjpGGBq8e1qnIzSnyj3tHnz5ujVq5fb3fd66GtvDTkjII38jU8Bzd5upIfQRnsJJRsvuvht3hZh/PjxCQLbzsyP4lk5cuTArVu3dFVgOwO0lMUr4cu6lTD07S/sOmA0extZjCznmEaI/LKXNebozPvL+WT078nGp+JQec2ikaBx5l4+AzRaeESgc+fOqfatcFb1c9YZorYQpIrtC7U+x+PJXezSW+vCcSaArdcZIlVQn1Q56UavZJOyaPDJGMS8Vd2Z9eaR3wSun4E2qf7DN1MmeeR5Wh7iM0CbOXMmjh8/zkthjFDN3Llj5i5cHE3r1HS5YpsC2MXfeRdx92/bvLKR9WgUoE6dJg3msro4VxwglBfahPVZ3LBhg/szdXRWRyRYL1GnkWdIDZ9y9fsM0CgGQnEzo2wgdwKN7k2Bbali25WNQW8Ftl6JRi2+D2z7KUEdnx4HCPV8pEA02T/kpNIqse3t9J74ff2o1jxhXH5aqRbJ465rfAJoVApDTVoo2OguG8sdqicVMv71V8LAtp6FRF5NeeNSpa1En+Vz1wM0CiOM33KQN3LVqyZK80izZgJePbIWu37ZaY0n6nk/b/FzY8p9mDx5Mo+F+sLwCaDVqNsAW689Q1zHCdZOTL5AHC1zSLVkKGIOb8W1Q85XbOsJYOuJo2Xq9jZuNGMZ+mUsJUB6wUYZMssO/olnXy4C0trPvtdCJ49fw+KGGNeWV3QXKFDA449PoOXEs+HtWWTI9hJyZcvMHSHkKaIMehL5Una5z++gXaag6K45vNekUxXbOlqIa/U6yiWlHjVRAmOjRo3g5+dnWEW0OzQKuc1J96fUPWpHR+soS5YseOmll7im5AvtxL0u0aKjo/Fm+cq4dyma000i1tmzZznQPvvsM/RIyxqgerOXvgbjnOwYarWg5lbWslEENH8FsRN3865QieU+agXam2++iS+++MLaU0MP2CpPqs83PMkxpWX+ngCSmkDgJ+CwHjCprvxt3aTJfqYNz5f6QHodaHSuWdelW3FvM1NPFIN2ZYpbHfrjFPK9lJWDjoiojI/4ykIgzxwFcWnecqeOlvlprcDWAjRlBbV855f+X1WNZHV52YfVQaewjxAxeLCVG1rm70mgke25fv16nllDNuvuIg1xOaJpgvo66fRSilV6e3gdaBSkjkpfGvGTP7VLC2I0SQwCHUm6tGnT8hJ2cl0T6HxpIVCsqUi5d/HdnBm86FGrM4AWxSuvvIILFy7w7Hf50OsMKVW+Ao7kq4rYBS8qqB2BjZ6f7+2yuF+7C56+19Lb69L2+az3PpaMQOjJXXh08S+8y2r6mjVtys0LSvhOjP9S8bBa9zRPvqTXgZYhQwbcnnYc8c3sN9JUEpJOjBk3bhyo1yOB7t/SH+PwoFbeOz1GoVrSoi1RogSoAkBPxbaWFuKOvI5SBXXclIPcsaTFAUKbA7U2mDVrlkcqorVsjJTmNZhJ1S1btuDUufOoV6sGB5YELjlIErsfqfMxzAsxbEikJ3GV4FleBRoBhSTTscgdTielEuhqD5yALBf/x433xo0b88Ut38G0MNYdqo9Usa1sRW5vPpLKd306a7bKchLV1DxHQJNyKKe//6LjVKJgYyfvvDSlLQ9ESzTzFr0I8EOHDsXarTtw59J51K5dG2FhYWgaUMXpPpAU++sxMBJHd+9IvkCTCjyV52EpKaKV8WQjkXq5Z88ePHv2jPe9b9GiBarcectpINNctD5fjZNkU2ZjTp35zBaVq2/2gO2oAtsR0OTNWh06QHrPQ97Vw7Ht561eq5agzeXrr7/mBaOXLl3iEos2S3mg2RX6U30jNUW6dcVy7LK3hlclWrlqNbG/fAeghP1Wck4Thp35hdUTEfDnPsQ9uo+A8nURU7aee57lYJJBX3dCRb/r2LDeccW2owB2onG0hUNQ/d4f2PK8Uau0SahJxshhwzFy3jI8HbTK87FLJW/eroaY8qwD2fN4n9M8t/PD0CF1sGbCVzwp3FvDq0Cj7PWjR48ix4HU7pU4rEyk6YGp2Lt3L65evZpg13Rlx9Qq8fofHMPLf0jVdVSxTXShMIHkuZRLpsS8jqEv58ayubO4Z1Zpw8jBRnElyiulZzhyJmh9P0eqN50eQ9rG/v37QVJG0jY8cVBkUKMvWOVClgSHo3gSdF4Dmtz16omFLi0EyQ6QqypLX6qGR8Oa2VUtjJofqcrUPk8Z2FbeP7EKbHtAI6+s1OI7MZsseEIrVEofixUrWOzpuSpl1PspF66kyn+/fTcyp/TnKiGFP5T5rO56vlVV7/Utwi79ZD240pMAs87BW5khtLNRjwfqDeJ2QtsJOEugm7/lFwSyOitqNUfGN9kHcn3eyPmRaqgMbKvdnyQNOYukJF6JYfaAVmRgBfxetTNQ1XJghRrYspashIYl38DMmbYVEka+n9wjHBQUxME1NV8TxHevYHd9G/l8tYf4TdqN4vO7cu3JW8NrEk1eFuN2QmvI7JC7kwmA7777Lpo+j9UY3dXJXmBb7iyxF8BWdYYw1TjzsHqgFt/yY3wlsJH2UIxl31x5qzaeNOpj/FpjeYUpfvwGqS+fQjoWbmkri3EapXo6Uk0T/X7FFaQKz4NHjx4Z/+4a7+g1oMk7FvkC0OSMooU5evRoa/ZB7BvlMfvzltz2UTu5xJn5E5jJPpk2bVqCwDbdj4Cf6aVcvP2APMaoBrR0Rd9B/7AP0b9/f852uU0nnbpCLQekmJ4z81XafFICwenTp3E/bSYM69qBawJqVc1GPM8loDF6Zu9UkEs0b5084zWg1apVC926deOL1xcYkSgjWdJvkVM/gfIyjUx6lgLb/fsPQPv2L1qRS/RQq8BWAk1ZQS2XimDqcNaImpg3+xsbMDtLbykP9a+/zyFb1iw8JY7Alfd4Bvc6szRoJI6AWHNmmHW9aRRChl7mNaBJHkepC5QjQvnK9/KkZwIdGfeuJj3neKMYWtWtZa3YloBAMaa3KlbFgysXrTajEmj1Gn6EH59mxLP1s20WBqmnHzdugk0/vghEy0GolZ6UtLtoxSpc+vtsgqRdZ+6nakMZACRH79N9RyRy587ttUx+rwCNduHsr+TBk4XnDd01PH6zH2Yg4JcViLt0Fn4hmRH3AYsJUixI77nMbOLZRjVCjddfsgls0/soA9jKOJp/q/yIi1zDW3xLi40cLuHskMGnkWudmgtYPC7w0CbE/Ps3AgqUQGzFRpb3Yildph2bvkV47CnM/2amV17BK0AjFYzalVHdkE8YywbsqHKbhWqhyJGiN+k5PDycd8WSu96VLcTlXkcpDLCl83Lr4pl4bh4PIdDpoprr+VjWftf9ljOhKSOe+iJKjiBPxdkcSSRXv98eclS1laGnUOcVoMld+0kFaPKFQOCgBF1r0nP5Zjjct6mmpGcKJh88eNAmsB2YJSdiu88CilSAHGi5cuXCwoULuVOF1M1U8/qh+NVj2KgIiqvZZKRVGJG0axb+JUugKZtcOmucm8FGoLhSnX6jkenyCc1Jz1JgW5JKfrIKbAloZOPKe42QNLzJpOFKWSBaSR95sJ60CiOSds0CtBOvX060L427JZtXJJqy8jUpA02+EOVJz1KlAaUiqSU9k1SkMhsqcCSnS8aMGXkKWcuWLbkDZszUmZgwLJIH2EtUrIw/U72MJ12mJ1wvlFe4YRYynd6Dh1f/Rb169XjbOKOSds0CtHPFbtmYK+4GlvL+XgEaVVVTChTZEmZhlKs2gvL3EugOHTqES7fuoW3Yx7zSQJ74KgW2KWWLykfI5iK1smLFipg8dwGPsRUfUZPv1KQGWiXY89zOXbt24f79+3hQrBqWd29ut/VactjoLpd5BCpbunz5sqcxZlnj3kjBEkCz5bWfAhgUY5RKRUjdK/1OeUyZOAEdO3YEFco+ePAA16u1Q+bdyzB8kCUGJwGX7N9Hjx7j448tJUKeSNo1C1BJi/BWLyqvAI1y/WhI/5qFUfa2QiPnr1aftTRrJeT9fjTu3r2LGzduIGXKlBxwFDA+fPgwfty5G6FBXkzaNcBra7TGIOeVxJ9kCbQhp54AYX29IsZN81CW2YHlYxH4x27EXLmA0OB0uH33HuAfwCqwU8IvKCX8KzREbDXW4+P5UbmmeTcvTDRd52L4bY+l27Knh5BopD/7wI5M7mca1LWZjoklyUVqII1DR48BsTE8OyQ2Npb/jSrIaZBkuxuQBnlDU+Pll1/mf6tWrRrSpUuHkiVL8l4gvvB+npBYjjQOtbP3PAU4ATQ3A43c6HkX/4GNbwdYgbOXlQbdvHkTVxigLl68yHmdKUdOpGaCKnPmzDgWkw5IF4qJTd7j3/U464+ApSOQ5tlDDrC4uDg8S5EaBV7OjhEjRuCjEymxpvAzHrejMXzlFhRP/Yx31KJCVwQEImeO7Pw7CgukYYdeUHPR0qVLW+6ft43P5yoaAVTalChJQll46wmweQVo3j4MXklYZ3d8igfSqPLdUURku2OVQtT6+Thb9DExMQgJCcH9oHQITRmAIvnz8ut3Zi4BhGbFhoZFrV2n6O/SYpKy7/dlO8EcHe1x6u5T9GnZiHcNJi9iihQpEMcM+xHME0kZ+7deLozrO9ba7Y3vx8pEtmexnGtAYOxx4Arapb3Gq6xpkOeTBi1E6ir2JCAl3siTk/+NpOOg6EDsal2BS0e14Sz9pHt56vfJzkbzda8jSSH6j0ruSX0je7L6zSO4xaQQqXWSFMqZ07IY/0uZETGp06N+/sw8fanH7495AaZU3iIBRwkku5/ZsUNBs3oiU/Rh7tbv8KQYMg+tg25dumDlypU4/udJzJ05nR/icODAAaQLH4j4jXPwWZtw3uhGuXC1fpbU1ipb/kVEitP83X7++Wfsu/IAme5c4tIxMDAQqTJlY84XP6t03BmfBRMblOfXq7Xf9hSQVHcB9kd6/qMaFgeSt2rSvCLRvAk0SQrJbaEZm/egeEiAVQoFpw9BirTBSJcigBvOO28wu+j1UphY4RV+YELtZ5ZFpRk4jNFarqfFQP0qI0aPs4KGwB5cpCxiarZDvYs/8yar05auxg/zv+Etu/Ply4fJVYaAtXlCvbV9OPD+azEC8WPbWNedVqDZkzDy39N8Uo//GdvLp+XSkVK5hu/7G8VvWiSmUjqSXXk2VXZUyhSQwHb0pERLlgFrd6RgESHlUoiYSG0SyBY6HP0v4q//y/lKUugRw82z4Ex4K0co3+XWZirDv7s1rpO1WY0WYBgKtAMb8PKCPsifPz/vGS/ZEZ9++inm/HYZMb3nI+snBbBq1SpUHTgZ4flDOCipF+P5TiwPslBZDnySwOUbNke+LCFYuTAKRYsWdVrCaQEeXaMGZEp5IulPQGzw3QFEvJ6SS0cC6pEz0Yi7c51LRwrCX34cjxJ5X0pgO0rS0QiJKICmwiilCuA3fAPfQeVSaB9bUNQ4m3ZVsoVICoWkD0ZAQADOB+fit+j7YQVky5YNPW4yb9zb7xsugYwAGs2/ZOO2yPj0LlYvirKxgzZt2gQ6g+38ZGZLsbbYKdsW4AvVr/0oFD22GscPHeTAqli/CWIm7LJRVQM2zUXWdeN4x+QNzabbVGkbKeHsAU3uvLD3PEk1r7LnASamPcNBSWr5/F+OcA1Dko5+6TLg5dC03Ouq5lmteONFiZCa+kjPJ3tX6lGjdo27/+YV1ZEAU6ZWfdztvwK4egF4ymya0xaDPOj0QcTdu4U4pgpJUiggs8Vtnf+lLMieIQQ7nwQDhctjYpFU/LQUqVe9EQtfWjhul2gMOK22ROB71iH4Vr2eQB3F2QPs/QP7VMXhrT+i2LncAJN4mZYMxo3Jh3E09zlUrf4+bs05Y6HZYtZj/+wxPD3yM/8s2YTUxoBsvIlzovBV7x48CdkVYLgi4bQAz+79p/2K7YUfcCDSxkQ2c/mLu/mmc4Flzly7do1Lx5AsFs/q7XRZEZsyDZCRfX7tbcttWZyx+MaxXo2HflYAACAASURBVOtY7BWgUVoR2TqpU6dGcHAwLj/1RywrliQ9no7YHXWNHXr3Uj7Ef8UKDmULx1RAYvO2N9+Adqxd94pxaFr3AyxatEg1zlWSnZLSgiUPk/pEwPFn7v3Ak/vxdMj3VsOe8vakerG3h1Wzud5mo5j9GwInd8TL9//F9OnTuY3p0sJXxB19QUKSfSvFHass2o+InI+5dCTP6tE7sYg9c5RrC5T/6Y3hFaDxXThVaty7fYurA7q9chqdC74GTDrutUOHDghlBy+uX7Wcl9arSRhqHzB+1WbcOmpZFESfwCENEfNqMaBlBAcJVV7TdZSJT99T0iy1OaAe+lwCqgBdev5/abPj7OaVdp/vC8AxeiMYeWIG7ty5g5EjR3oDZ95JKqY3fbVIcW6TkDGf5IHGVJ/AGd2sEkV5nJN8YdOu3KBxGP4b9YtteKBxDmAaOyEmSy4OtK5du/Idm7oNS79fvXo178Z7ZuyvqkCTFq8kUetXr8KdK0kRWEqghi3rxEuEqKzIG8NrEq12ozC0/Kg+f/GkCjTJRpo0bxGG9OxqtZGUjJYWOtkc5HW81GWu1YvIJRpT/QJ6VEDMfUuYgNNr2xLk3jIN0Sd+twEKeSkX/3kZ93rOT9z5w2zEzntG87YJ1+r2RPycF3mnSRF4xSMr87Isb52T5jWg9e7bD5lCQ/gOnBSBlpjXzx7QaNNJnz49ZtceayuRWEvrHGvH4N+zJ18A7eJpBPargWd3b9oAjcBa6I03EN1itCYbV83rmRSBFto6j9fSr/jm6I16NHrwsmXLeA/6pUuXJimgUYywWvN2eDWz/TiWGtDm3ljFMz3IeFduPIEfdkSdoKtcTbRKNPofpk5Gnz6BPMdCbZwb5NWtyPqInGH/Ss4SNZvNxoaVxfF2tpiK+PZFrNM0PfBYpk32fpW8VvTpVaApe+87XAgqxr1POTueZ2ZQfRgFkslJIQ2HAVemGmboVwV/s2OD1YARmIf1yx/Yk+c9yoEWOKAWIsI+wKA3uyZICv7222/tAteeBmHNTBn/NT5rGcbTuaTnGe2c8Oj9Ilah5sE52LhxozfMMwsNvSXRlKfJmBVopKpRrmEcyzWMr8QM7Q6j9TGTxRBJBaQUq/ipXW2ARIuRpzyFZADmnQLSsrCHbMOh9gWjv9/JXf5qI2hIfXSr8Q7GlbX029e8MSlzLbM0Mnc4gAX4uwdfwcSJE/XxxsCrvQY0egf5+Wi6FoKPuPeXPtrIvX/K7HklfxKTaPIUKzUgkA31duXqiJt/1npb6TpK1erduzfOjjukWuZCm5kyRUsuER0BT149cHj9Sp7OZUYJl/bD9hj/YUmeZeOt4VWgUZNOcrk2TV1L347rbaCxY4ACJn2C/KnisHz5ch63cqZeiuw56mp1cSo7s9qOxKGSol7TFyJ27LYEQOMdn1mu4JPvWBYNk35qg+c+flAfcUwiOgKW3e+ZM8Z/dh/UqliWB9iVp+v4ug0XkrcgDmxcq3oAh6eA51WgSVn8UfUnmQJoFBSm7sBL1q3HtDEjbWwmvUCjhFtHAWa6J3U7Xno9CPjMYi/JAUn/T7mcV3ssQHzfGnbXTIrGXyBd9DHcPGiboqULeEzF7bl/DK+Ju16pJeJXTrA+z5eBRonmpVg7vmv/RHsKU6rP8SrQpNbg0ZMslcG6GO/J61nhZND3U5Hxp9m81IN2dflw6OxQaZVQgbWMq8kOPqT8w8TCG/lZBsjw5xkg0jOl6+lz0FcN8SxvMZuFr+Q0XZ9oipYODYF49lrDdkj17ynMmTzempniUeeGjhQw2sw3/LwDK1glgzeHV4FGL059HKL7M2Oe5Tr6ItAog752i7YoUeg1rFy0wJq25ArQxo4dh9ELV+D6/w7w29gDGgW8STUkh4jyedbP7KCNNLtX4sFJS1K22pBStMheo3o1Cge4vLH9vhv5o7rzuN+RT1lw3EfDAW3YoYhUjEvJ594cXgcalS5MusdOKWHZ6z4FNBYQrrCsJz9Fk+q9ElPN9Eg0uylWKhKaGvZ83Kwlrv/LumHJhlyigS34TNM6JbhGbSPQmqKlJ4GAkpS79B2IOtWqYN3qVdaNw1cknDf7hNjwwFvufWkS5DlrPX4u7vRa5BNAIwdDlha9gV9WIaJPT6tqp9cGU1voJJneYFkb51jWhpb6OEqEjVi4Dk/+2GcfaBQeaJbT2hXLnkST5q85RUsF+HY3QnYaTeCSoQjeuwo9e/ZMENfzlg1HHluSaN48u1rih9clmvysNG9LtPF/zcWw4cNxp2AFxPVZYLimkWJCWzQrkAlRHypSrOzYSO9Pb8wLN0eVte1/qQR9ACspimvOas1Yj0eHgwHT//MyiOswVlOKVmKqrZJfVFVN1Qn7Tl/A9/NmWE8Z9RbQlE2gHNLGjRd4HWj0boVKlsXJxsMQ36eaVfVw2YbQsyOzCu6A6Z+jZK4soMMlpPIV625kQN/HxFKs7KlqlJ9HZxRIZS/SfJRAC6oRjkaZYrBkyRLVpaJc6E6laOmhJ8vECPimFyq8nhvz589PkCLmKeDJj292I4Y03dongDZz5kx8sf4QHqyf41GgUR8J6mf/85E/sHiqxYPmSPVy6nuWYpWNnSV9YN9eDmJNNhCrPA/pXZFXFdvYZLIFb90Ius2wZvJrnZ8zKVq6NA4mOYeemo2pU6fi+huVEbNtmXVqngCatw+1UPLBJ4BGiynnawVxncU6PFIIymyKoJVjEbJrGY+FkWpmhA2mtsjlXazUUqzsqmYsyTf/igh+AqdDoLEAeoqvGuDJzWu6Norq1avzJqojSutM0dIRDqB4Ya4WX8D/yBaMHjzAWjHubmeJtws9fRJoNKlGLVuj9nuVuRtW046vR5WRLQyqGmjxWXdULlMSK5cssibxugto1OB03KYDeBaxWpezx39BJOLO/QYwNUw5NzXgBQUF8d4Zal147XlFXU3R0iXh2LuUXNwD9+7dw6lPv0V8t3fcKuHydC/Ojwr2Rp99Va3C215HaVLyFnRuAdqpX1F4QXfeMYvSpqS8PUmiuANoWlKs7Ek0+aHwWoBGWSZ0QKHeBqaGpGjpkHC00TXr2AXvlCiG9WtWqW50LquWzOauvNVyJrevDJ9QHSViFCpUiNdcFTrFyvadlFjKhctVlwbtEXjmEKaMGmZNm5IzQE8cTKsNpDXFyq7qqGhdoJyv/DMBUd7aIIHa4sCZY0iKlh5+sUybgJXjELxlDs/1nPLeUEOrA0KqNsKsTz7yWtsCn5ZoNDnJHTupcqTrQHtujI8fPx63yzdB/PqZdjc3dwDtvWrVUbZMaQxn4QLdEprZXP6RDawZ+1okmpTJTzadXqAZmaJld+NQASI5LCij/odf9mPJjMlWZ5QrEo02uMKlyuLSmZPc3veV4VMSjYhE7eaix7DjilKk0mXT2EjA/kvgz9zL6XPlw+3ei611XJ4ieuC6KfDb/z2e/sma6bChG2gKL6JDZwipbsxL6de9AuKZo8epQX0ke1bA2aO/GpOipUfCjdmKANYOr1j2UN7XQ1kNoQd4tFn/+Vc0vpliSVT3leFTQCOi0HnMawuxfo5lausGGjUWpYDp+Wu3bLr+ukNiKVU5SepQNkKN2h/i6ti9Th9yoYyLaQIaAbp5bhzb+4uN/SkBXYsN6o4ULT0bzbRLi3kLvWs5i+LalmX2T8dJJKmYzqn2ZhMee8D2OaDRQq3cpBXujGHt1p7XWDmUCOSun9cPocd/4scYKR0CngKa3hQre+8X+HI+LJ4wwkaVkjPQnipJmfxfvF86Qe9CPe9PKUvLLjzC489ZfqdW+utwhjgCHnlCs7YdhLiflyKyd3fVFDh7Eo7UZwqQS71VfEWa8Xf2Fa+jnChVP6yP7UUbI35EM4eq14QJE9Archga1fkA3y22LV+R7qlnoakxR+vv7Xax0rEQeeuCdMGIj7Gc6ClfmNJnuzbbqoko89dP2L9nj81raJ0//UhvFy1HwHH6e6YKV1jQ2ZLUHf4iXUxNQkvv56vSzGeBJkm126csB+WpSrQjW5Hz2+780IMD7Vm/DlmZhhIsehaas0BbFfszb513+vRp/TaZDIi8i1ajFoid84d1KlqcIXSxFE6gxSkfet/f7SlaOjYeKlP6oGU7FM6d09rdWU2irYnf7rPSzGeBRhP7pGt3vJEvjzWTgP5GC44WwZsft0XaW5ewZLYlcVXvQjIciM6kWD1/H+VGkljrAkcSTmptoFa/psVGk9OFyl/mzp0L6urlUHXXARxnJZz/99MQunY8KrM2eqvDWcBb1rqBTjTN06csP6aL6vd8cfik6kiEkjyQJ06cQOrNT/ixRT0PT+aJs5999plN119vAy2AtYOL+5DV06l0sdK7sOrXr491MWyxyLppaZVo9KxcuXJh1qxZ1sx5NVVL60bjiRQtPfShQtgBAwZg5uLlGB9pSeeiEdRhFLqk826XK0fg9lmg0cSpKJSScHudigOWj0HNciV5GwFlmpE3geZsipUkoZULTeoBQgcLSkMP0KjHCB0GP2eOJUHbFaB5NEXLjoRXBSKLMwayaos88fdACekNw9vh1OH9PivN+Dv4ojNEWiA8q4Pt0HilIGKYFwx5CjvaODz7PatuTjelI+7PsthTrnrpNLUukD1HDiTriz9vbfBwtKURj8uDvWPApI7cZnT1/Yz+PdllFM6pUuMDLF803+VXdecNfBpo9OIREREYf/I+7n833i4dvCHRaLenamky1u0dk6R3YdHCad+9F65Hv+jhKN/RNUk4lrybZURDfrC7qxJN+r3HU7Q02nyUWVKlShVum6klU7sTOHrv7fNAI8O+aPnKWD53pt2TQLwBNJdSrOwspEGHx/POw0+O7bTho9aANf8RSz1LFZ6H95mXFp8R9DGqi5Z849C7ESmv9/ZRTHrA5vNAo5chdz/1uqBsbLX8NSMWkh6vHHnkBn49GzdPHuW0NsorV37ch9jzSiXELx7mPNDYLwsPKM8dBfJe/XreT7mA6P2oSLZ8+fLYu3ev51O0VDamoD2r8dE/W/ghKWYYpgAaEZIal4aEWI55UlsIri4krb+XYkzXJxx0OsXKHjBTN80B8rJK7eA0qYrsIuXc1U6f0fp+aotW2si8naJllWgsEyjToPfx+54dPu0AkdPSNEAjFZISjmkHK1iwYIId34iFZG9nlBaaUSlWqkBj7e0yDKqBmzct553Jhx6vI5ewKuepGUUfb6do0fuF1myBsU2qoUOb1mYQZhatx5e9jkoqyo96stktDGieo2Uh0iJ79uwZFjeaxh/vqo1h8/tdq/D6+jE8IO8y0Ogo3+eHFHImG0gfb6dokfNpyLhJ2Ld1k2lAZjqg0YSl2Jo8cdjIhWRPdTIqxUpa+EqgBrBDJKTDBl0GGknE54cUSs2AtGwkjiS69L23UrQo/EFeRkoa9pUWBVrRbiqJRi9FO2rF2vVxqCo7S6xIBa3v6dp1LMHVv9/7+JsFRTV3sdIp8fy7lePZJagerqlHiFKiyz8TqKi3PzlW0Jg1g3XDoKODX927CKePHzHMGeRIQ6gf1RqtWrUCZc+YbZgOaERgCmRT3RrZa7SzuVuiBRYogdh3WTXB8wPVjfIyWhcWy9VDizzWwwZ122QqNh0dUrh7925s27bNbfTxZIpWupWj8UW+FIiMjDQbxvh8TQk0mrjc5U+5kEaqRnJOGp1ipao6OtG6wJFEk7c2cNdG5KkUrRQDlqDcseXYuWGtKUFmaqDR5KUD55eFzXQL0PiBFExy/jfzJGewI9XG6e/Z0a8Bv6ywHjZohESTZ/K7C2hEE3lZj9Pvn0gmCNmDNT4K47mMvtQDRC/iTSvRpBel+Nq0q6lwd26E3Xd3ZqFJuzUlMVe88aZbgZaiciOE5w+xJgIb4gxhM/ZvlR8716/h83eXxCfCuCtFy8zOD+ViND3Q6IXKvFcTQ1jZe82aNVXB5gzQ3JFiZW/HD8iSEz/M/8bmUAj5izgr4YJGNUenUq8maOeWYBEY4P53R4pWzZlh6Natm12+6pUq3rw+SQCNpA+peBMnTlTNh9QLNOpL/+Xoibh2inUKJkNWY5KrM6oTzT1D1uyIZzmK0jBKooFl8hc9thr/G/STWyWaO1K0Ms78DONZUNrbBwgaBc4kATQiRmJg0wM0d6ZYqQGRArBh7Tri9qXzxgONdWdONaYFHs99cVC82sLRQ5/Efm9UilamWi0w9OP30LldG6PWudfvk2SAJoGt3Af1+RFQyGuxq3QNJlUCPi+L2A5jNB0U6IwEU0rIUaNGYcCCdYgb+SLTwVlVUXpX6ff8gI3gYMSsvK6LDK5cTGfAxaYJRmynyU45jyj7plSFd5MUyDjPzZSCpWUBqEk2rTs2VQhcv34dK1tYqpONAJIj1bMGOzB+SzAraG35wpljFNDo2a+xw+bP1u+P+LH2pYNW+tijv/z3rqRotV7b3SfOm9ayzvRek+SApqZGallI7k6xsgdcOmP5duQGm+pxI4FGpTJzz9xB/M4VdteGFvro8Vo6k6KV1GwyJbGTJNDkYBs5ciTKXSmUuDMg6jReGvQeNm7YwLv8utP5IZdwVONVvHhx3Jn/wj6TA1JilivOkaioKHSIHINn0X96DGj0oLFjx7GcxNW8fs0RPZOiTZZsgCYH24HCdfFwag+7C83tKVZ2vJaGtC6QqbiqwGStDTIMb4ib1160NkiwCAxw76tJPEcpWhQnI29xoxbhSc4mS1ZAo5clm6FNl+4IDfLj7n9ldoFHUqzsAK3L1oGYeiga8ft+sOGLKxJMLjGlm0oFpcqzueXA1KMaagWq1Ffl8pcruWpsY/OyDaD4/K6cJ9SrMamPJKs6KhlHbcnoIHhKRJaabFKKVdOmTRE9nPXoSBviEeeHHAgU5D1c7CNrsrIRqqIa0OTBZLUFbbSNJn+GWopWij7zkOfnWdiyapnpyl2c3RCSDdCIQAQs8izOmDGDV2mTfeSJFCt7Nkrgx5kRM/8va0sEdwGtz94ROH78OO/Y5Wmg0fPkKVpUT3jiwmWsXRxl6txFvYBLVkAj4lCJTXWWpErM7tiwFqZNnuTQWHdkzDv1vawtnNGqYgKvJTsvLnD+IMRMP6J3fRh2PdXbvREcgHbt2qke/2vYg3z0RskOaJLdVr1OPQTGPOXSzcijfOWqW6JxuG1LUGTbdPz222+uty5w1GOEnQ0Q0KMCYu7b9iJxt40m3T9FjxnI++Mk9O7dW/VoYx/FhqHTSpZAkyhI9gOpMieL1cPjBj08aqMFTu+KRpli+FkCbpdoDIj2DimUNgZ3OEOio6O5qp46czZ8y07g9PUmp4YiS3GzZA00Sbr1GTwECzduw74V87nt5pQqyG6mJ5MkoHMJ62GDngCavUMK3QU0Si2jQwHJq2ivqsKdC9vX7p3sgSYxRHKU0KIYVYKdUuLKGdqOsv2pdUHTnMAqSw6ikZkgctVVeje6Py38H374AXsUhxQaDTTKCqF8RXLZUzt3MxdrGglWATQZNSnmRueTjZ41D7frdkf8ZNYshw3DJdzwDdaDIzwFNHuHFBoFNMpyGTJkCPfs0hnSZcu+OA3HyAVr1nsJoKlwjmyL3oMicWj3Tr4rt8nQwEbyuAw8N7QukL+Gmipq75BCV4FGtHqz40BkPr2H0yqp1I8ZDWgBtEQoSouIdumVW7bj/sdfGibhgkq8h5hXi1kz9j2hOtJrUib/sGHDrIfQS6/uTMBaog1JSgEwx7AUQHNMIxgt4QJCs/BeHhUqWPpSesIZQs8JnNAOMSnTAp99reGt7VzCelxS67dUf+7G2KGRQoJppKQAmkZC0WXSLr58/UbEVW2Oo0M66PZSUsD85VfzI/bhfeuTPQU0bPoWr+9dgJPHLafgaJZozHmzNNZyGDs5O4QE07Fonl8qgKafZjy7ZM68KCxeMJ/HhvaXDgcqNER8o2w2EkrN3U/9Fj9hhw1elR026DGgsWyUFF81wJOb1zQBjUA1efJkLFy5BnWqVeFdgoWr3okFQ1pLUquwdo4Mzv+KvGzjp83ERpZH2PLjBnwxUv0bDTWgUQfhHbt245ft2zwv0agBEOuIfOvKi0MKJdVVmittIpQTSQfOkwOFulCFhYUl62Cz86tDpjUIoBlBRktzIGroSurV0T9OIFWxihjVvDaPJ8lTvCqynvi7FT3xPeUMoTctUqSIzSGFFNJIPXIDut/dzZuhEtBIanXs2FG46I1ZGhYtRwDNQGo+vxWBjhbt5s2b+b8X7z7iB3LMbvMh2rZti0dfHwSy5LI+2JNA69q1K8+vJDDR/EgiFy9fCU0+rMk3BapoEMN4CgigGU/TBHckJwoBbgNrlbBz507cunsP6d4ohZgsr+B+xlzY3rEGr5GTDlg0xGYjNfH0IYB5CSMyXOHPJWlFdlfe199AkwZ1QY2BkkPRpQdY7PARAmgOSWT8BaSukSQhANJ/chBQRsXJJ0HWh97PVwoDCgfbTGLIqSc2n8MQzUEkjYO/n8DTe3dQpGQZ5M+bB4Xz5eGAkoPZ+LcSd0yMAgJoPrY+CIAERGnIP1PwXG3Iq8bpe5KMUhW5j71esp2OAJqJWO/n56c6W2Znm+gtkudUBdBMxHcBNBMxSzFVATQT8U4AzUTMEkAzMbOE6mha5gmJZiLWCYlmImYJiWZiZgmJZlrmCYlmItYJiWYiZgmJZmJmCYlmWuYJiWYi1gmJZiJmCYlmYmYJiWZa5gmJZiLWCYlmImYJiWZiZgmJZlrmCYlmItYJiWYiZgmJZmJmCYlmWuYJiWYi1gmJZiJmCYlmYmYJiWZa5gmJZiLWCYlmImYJiWZiZgmJZlrmCYlmItYJiWYiZgmJZmJmCYlmWuYJiWYi1gmJZiJmCYlmYmYJiWZa5gmJZiLWCYlmImYJiWZiZgmJZlrmCYlmItYJiWYiZgmJZmJmCYlmWuYJiWYi1gmJZiJmCYlmYmYJiWZa5gmJZiLWCYlmImYJiWZiZgmJZlrmCYlmItYJiWYiZgmJZmJmCYlmWuYJiWYi1gmJZiJmCYlmYmYJiWZa5gmJZiLWCYlmImYJiWZiZgmJZlrmCYlmItYJiWYiZgmJZmJmCYlmWuYJiWYi1gmJZiJmCYlmYmYJiWZa5gmJZiLWCYlmImYJiWZiZgmJZlrmCYlmItYJiWYiZgmJZmJmCYlmWuYJiWYi1gmJZiJmCYlmYmYJiWZa5gmJZiLWCYlmImYJiWZiZgmJZlrmCYlmItYJiWYiZgmJZl5m0cz/OXIEq3t0Q8zTp/xFKnfvgbebhJn7pZLB7IVEMxGT716+jAWtWuLJvXs2s244cRLyli1nojdJflMVQDMJz5/cv4eF4S1xh4FNOVIGB6PZ7DnImDuPSd4m+U1TAM0EPCc1cXWP7kxtPMxn6+8HvBoain/u3sOT2Fj+t5AcOdBywUKkTBdsgjdKflMUQDMBz7eOGY3ja1ZbZ/pqSAgypk6FhzExOHnjBuLiLV/lKvE2SI0MTJHCBG+VvKYogObj/D783TLsmDTROsvs6dIiZ7p01s+3nzzB2Vu3rZ+LNWiIan2+9PG3Sn7TE0DzYZ6f27+Pq4zSCE2VEvmZyqgc/91/gIv371v/LDyRvsdUATTf4wmf0c3z0VjSob3Vw5g2RRBez5CR22dq4+87d3Dz0WPrV8IT6VuMFUDzLX7w2Sg9jCkDAlAwY0YEBfjbnS3Zaadu3cSDp8/4NWSnNZ0zF1lfK+CDb5j8piSA5mM8V/MwFsyUCWkCAx3O9FlsHE7evGnjiWw6ey7Sst+L4V0KCKB5l/4Jnq70MObPEIrQlCk1z1LpicxRpAgaT5shPJGaKeieCwXQ3ENXp+6q9DCSd5G8jHqH0hNZsHp11P5qmN7biOsNpIAAmoHEdOVWSg8jxckoXubsUHoiK37aGaXDWzl7O/E7FykggOYiAY34+dUzp7G0fTtrorAjD6PWZ56/exfXHj6yXl5v9Bjkf7eS1p+L6wykgACagcR05lYPWGbH0g7trDmMWjyMWp9Dnsgzt27h3vNMf+GJ1Eo5468TQDOepprvSB7G5Z99isu//85/QzEyrR5GrQ+JjY/Dn9eFJ1Irvdx1nQCauyir4b4bBg/EyZ9+sl6p18Oo4RH8kscsJ/LEzVuIjYvjn4UnUivljLtOAM04Wuq608EF87FrxnTrb5z1MGp96B2WE3lGlhMpPJFaKWfMdQJoxtBR113O/rIT677sY/1NljSpkTt9el33cObiKw8f8tIaaZRr1x7vtO/gzK3Eb3RSQABNJ8FcvVzpYQxmqVKvZchgN4fR1ecpf6/0RFJ8jaSbGO6lgACae+lrc3c1D+MbmTMiwM9+DqPR01PzRFLmCNltYriPAgJo7qOtzZ2VHsYAf38UypgBqTTkMBo9RaUnknIhm7GcyPSsSlsM91BAAM09dE1wV6WH8TWWwxiiI4fR6GkqPZFZCxQAJSCL6myjKW25nwCae+hqc9e9c2Zj39w51r/lSh+MbGnSeODJiT+CPJF/3b5tbYWQv1Il1Bs1xuvzSooTEEBzM1cpTkbSTBqe8jBqfS1K0SIHiTQoH5LyIsUwlgICaMbS0+ZulPFBmR9Ss1NPexi1vto/rE/klQcPrZcLT6RWymm/TgBNO610XUnNTpewHEbyNNKgHEZPexj1TJiC2aRK0iA7TXgi9VDP8bUCaI5ppPsKkmCUKHz19Gn+W296GLVOnjyRJ27c4ulaNIQnUivltF0ngKaNTrquWte3D87u3Ml/Q4nC+VjnKm96GLVO/ilrxvrHjZvWnEjhidRKOcfXCaA5ppGuKyh/kfIYpUGpVeQAMcu4x5r7nGFNfqSmrNTTnzpqieEaBQTQXKOfza+VHsZsadMgF+uLb7ah9ES+HRaGyt16mO01fGq+AmgGsUPpYSRVkYLSZh1KTyR1P6YuyGI4RwEBNOfoZvMrpYeR0qoKZcrg0RxGpfdDrgAAAYhJREFUA14jwS2UnsiGEyez/v4l3PGoJH9PATQXWazmYSycKSNSMHe+2YfSE0nHQ4XPXyhyIp1grACaE0ST/4R641MHKxrkYXyNte0OZu27k8ogT+QJ1pSVmrPSoDPYms2ZI46H0slgATSdBJNfvmPyRBxetsz6J7N5GLW+OrUZp3bjwhOplWIJrxNAc5J2dF4ZdRWWhlk9jFpfnw7QoIM0pCE8kVopZ7lOAE0fvfjVygPbze5h1EoCOhqKGrNKQ3gitVJOAE07pZ5fqTywPal4GLUS4iwrq7n9+EVOpPBEaqOckGja6MSvouOUlrRvz88uo0HHKBVixyklBQ+jVjKQnXby5g08fGbJiRSeSG2UE0DTRid+ldLDSAcDUvvu5DaUnkhxUL3jFSCA5phG/Aqlh1E6sF3jz5PcZUpPpDioPnEWC6BpgMAfG9Zj07ChGq5M3peIg+rt818ATQM25oU1sdplGi5PtpdQwWi3nbuS7fsn9uICaBqWhVJt1PCTZHmJKKmxz/b/A1gri0ZJP6jrAAAAAElFTkSuQmCC[/img][br]
[size=150]Bestimmen Sie rechnerisch die Anzahl der Felder mit dieser Musterung.[/size]
In einem Behälter liegen zwölf Farbstifte. [br]Bei vier Stiften ist die Mine eingetrocknet. [br][br]Franz zieht nacheinander zwei Farbstifte und legt diese nicht mehr zurück. [br][br]Tragen Sie im Baumdiagramm die fehlenden Übergangswahrscheinlichkeiten ein.
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[size=200]Zehn Schülerinnen und Schüler einer Projektgruppe benutzen je nach Entfernung ihres Wohnortes zur Schule verschiedene Verkehrsmittel auf ihrem Schulweg (siehe Tabelle).[/size][br][br][br][size=150][size=200][br] 2 [br] [/size][/size][table] [tr] [td][br][/td] [td][br] [size=150][size=200] [b]< 1 km[/b][/size][/size][br] [/td] [td][br] [size=200] [b]1 km – 3 km[/b][/size][b][/b][br] [/td] [td][br] [size=200] [b]> 3 km[/b][/size][br] [/td] [/tr] [tr] [td][br] [size=200] [b]U-Bahn / Bus[/b][/size][b] [/b][br][br] [/td] [td][br] – [br] [/td] [td][br] [size=200] 3 [/size] [br] [/td] [/tr] [tr] [td][br][size=150][size=200] [b]Fahrrad[/b][/size][/size][br][br] [/td] [td][br] 1[br] [/td] [td][br][size=200] 1[br] [/size][/td] [td][br] –[br] [/td] [/tr] [tr] [td][size=200][br] [b]zu Fuß[/b][br][/size][br] [/td] [td][br] 2[br] [/td] [td][br] 1[br] [/td] [td][br] –[br] [/td] [/tr][/table][br][size=200]Bestimmen Sie die relative Häufigkeit des Ereignisses[br] E: „Eine Schülerin oder ein Schüler kommt ohne Fahrrad zur Schule und der Schulweg ist höchstens 3 km lang.“[/size]
[br][br][math]h\left(E\right)=\frac{2+2+1}{10}=50\%[/math]