Mengen sind im Grunde alles, was man irgendwie als Gruppe zusammenfassen kann. Die Menge der Schüler:innen einer Klasse, die Menge aller Autos auf unseren Straßen, die Menge aller schönen Geschenke, die man in seinem Leben erhalten hat ...[br]In der Mathematik gibt es Zahlenmengen:[br][list][*][b]Die Menge der natürlichen Zahlen[/b] (abgekürzt mit dem Symbol [math]\mathbb{N}[/math]) ist die Menge der Zahlen, mit denen man ganze Dinge zählen kann: [math]\mathbb{N}=\left\lbrace1, 2, 3, 4 ... \right\rbrace[/math]. Manchmal möchte man die Null dabei haben, dann schreibt man: [math]\mathbb{N}_0=\left\lbrace0, 1, 2, 3, 4 ...\right\rbrace[/math][/*][*][b]Die Menge der ganzen Zahlen[/b] ([math]\mathbb{Z}[/math]): [math]\mathbb{Z}_0=\left\lbrace ...,-3,-2,-1, 0, 1, 2, 3 ...\right\rbrace[/math] In dieser Menge sind die Natürlichen Zahlen enthalten und alle negativen ganzen Zahlen.[/*][*][b]Die Menge der rationalen Zahlen[/b] ([math]\mathbb{Q}[/math]): Das ist die Menge aller Zahlen, die man als Bruch darstellen kann. Die Mathematiker schreiben das so: [math]\mathbb{Q}=\left\lbrace a,b \in \mathbb{Z}\vert \frac ab \text{ mit } b\neq 0\right\rbrace[/math][/*][*][b]Die Menge der irrationalen Zahlen[/b] ([math]\mathbb{I}[/math]): Das ist die Menge aller Zahlen, die sich nicht als Bruch darstellen lassen. Beispiele dafür sind die Kreiszahl [math]\pi[/math] oder [math]\sqrt{2}[/math][/*][*][b]Die Menge der reellen Zahlen[/b] ([math]\mathbb{R}[/math]): Das sind alle rationelen und alle irrationalen Zahlen zusammen.[br][/*][/list]

Eine Menge besteht in der Regel aus vielen Teilen. Diese Teile nennt man [color=#980000][b]Element[/b][/color] der Menge.[br][list][*]Wenn [math]m[/math] ein [b]Element[/b] der Menge [math]M[/math] ist, dann schreibt man [math]m\in M[/math] (sprich: "m ist Element der Menge M").[/*][*] Wenn [math]q[/math] [b]kein Element[/b] der Menge [math]M[/math] ist, dann schreibt man [math]q\notin M[/math] (sprich: "q ist [b]kein[/b] Element der Menge M")[/*][*]Wenn die Menge [math]T[/math] in der Menge [math]M[/math] enthalten ist, dann schreibt man [math]T\subset M[/math] (sprich: T ist [b]Teilmenge[/b] von M)[/*][*]Wenn T in der Menge M enthalten oder gleich M ist, dann schreibt man: [math]T\subseteq M[/math][/*][*]Wenn die Menge [math]N[/math] nicht in der Menge [math]M[/math] enthalten ist, dann schreibt man [math]N\not\subset M[/math] (sprich: N ist [b] nicht Teilmenge[/b] von M)[/*][*]Wenn T nicht in der Menge M enthalten oder gleich M ist, dann schreibt man: [math]T\not\subseteq M[/math][/*][br][/list]

Man kann Mengen sehr schön in Kreisen veranschaulichen, sogenannten Finn-Diagrammen:[br][img]data:image/png;base64,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[/img][br][br]Wenn man alle Elemente zusammen nimmt, die sowohl Teil der Menge [math]A[/math] als auch Teil der Menge [math]B[/math] sind, dann erhält man die [color=#980000][b]Vereinigungsmenge[/b][/color] [math]A\cup B[/math]: ("A vereinigt mit B")[br][br][img]data:image/png;base64,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[/img][br][br]Wenn man nur die Elemente betrachtet, die sowohl Element der Menge [math]A[/math] als auch Element der Menge [math]B[/math] sind, dann erhält man die [color=#980000][b]Schnittmenge[/b][/color]: [math]A\cap B[/math] ("A geschnitten mit B")[br][img]data:image/png;base64,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[/img][br][br]Alle Elemente, die zu Menge [math]A[/math] gehören, aber nicht zur Menge [math]B[/math] sind Element der [color=#980000][b]Differenzmenge[/b][/color] "A ohne B": [math]A\setminus B[/math][br][img]data:image/png;base64,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[/img][br][br]Alle Elemente, die nicht zur Menge [math]A[/math] gehören, sind Element der [color=#980000][b]Komplementärmenge[/b][/color] [math]\overline{A}[/math] (im Bild unten 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2z4wmEoTgbs4X0VrrhO11xB9EF+gB2ZYjVebTc7sB8VfBq6CD1Tb0Z/zLGDlSOJ2tKVDccJ2GRDcKlkw8GaPzez4aiAjYfgkgX7StZLMypg05E0w+1sOLrAhtj6qOtPZw0Vyj/HABMCYWHhKlTCQkJC31oa7LKKagmb3TEJLQk2J7H13Exz5SS2XlVZ+h4kuJSXl4lB7AJsg98WflN4LCoqWlHytUYOemwqYLelpBmyaa40gk0ptp7b2XB4pF7QcqPxXRWkXvzUc4fEZq2IuPbUmgzY7sfSAnOLSgaSAXtZQEI4XNTgJtgQQogOlZJbA9jczIZrGlvPz4fUv3jxovvLly+VwT2loKCgN/pY9cOHD/IfP32SKSh82626shwJK/syfKNlvT3R+wUJCQnXPz4lvd5LUtJRUlKyVFpa+m2XLl3yu3Xr9gLcQ5SUlF7Vt+8k6hqccbYlk2boTHNtDUkzdIENkXodBPk/w3ONcIfGZztF3iiwDHEz0yULNuTAkgFbWJBRCfGx7MGOThyh2iUZ4pSJPggO9nxjNc8Z4/rtI2rblsD+VFwqY7Mh6ELpuxcdu3X4VqB5ZHVuTk5Ol8rKynZE74VZYmJi4PiCPUZ7bei9scdfv35Famtr0b+rBAoLC6XgRrQfOXmFMs8ng5ziBg4c3b9//0fDhg27DVFPzKsqdCXNUAG7pbPh6Eqaibn5bKbn6Ru7qYINAT0wYoPnG+G+mJZndWTtP+R7bBdjY6JUuZq6ekGItOE22LhrxUKzwTvYgX3/2fuRS/3jL7pbj10wRk0piqgtxdh6rqS5Qo+cnJysn5GRYXrj5s0RT3Jy5Bsafhxz1xCkP95OUVERQXtW7Ib2rNitc+fOCNrzYjcpKSnsHoeaSAB5SUkJdisuLkbQEQDy+vVrBB0VIOioAEFHBeCDhrx/91Y8/t1bnfj4+EaLLHFx8arhw4ffHjly5JVOXXpXR2RXO+51mWD+J2XDcQI2maQZqmmuvuGZ28kkzTQXWw8nYPAAxJbCtKx2vAxZPVGPHdhb0YMfvKtaEmz44m0nqG9vQbA5zoarqKgQBW8rFJhZCQkJ+nl5edLMr4GedsiQIWD4hwwYMAC7ob0m0rFjR6K3REkdOnTAbnCCYCU4wQDoDx8+RB49eoRkZ2cjN27cgOeEk5KStOEG7QQFhepc8854GBoaRoPZYVOTTBCVEFzawKYQW081zZUM2Leevh0DF0fJprmSzYZjFYILTIMBJRbEct7XUZMoPhcH+9nrkv4kwYaheAU7sHFnSO2BXeNgWEP0QXCw4Ww6fVy//URtWxPY3rbaU6IuRpiHhYXZx8bGalZVVQng7SQkJMCMEdHS0kJGjBiBgY3+MERv4f8i9JhAevTogd3Mzc0bn3/37h1y8+ZN5Pr16wh6kkLu3LnDQA+isXAD100VFZVXU6dOPTVt2rQwCIyiOxuupdJcOcqGo5Tmyp3YemwcRxZsdj5TONjQZqfduDnkfKa6xnIZbCZnSKVfnCGZlXD7+dTtJzL8D6FD5t5dJX/pdZhFJc3V/VjqnpTLSXodyx9+7qY0oxCdA2FAAzSamprI+PHjESMjI0RDQwMCDoj+bauSvLw8MnHiROwGgmE92osj6CgEiYmJgeG80s6dO93gJt9ZsVRYSYP/ZOAW85bOhmOXNEMFbEohuDSlubKLrYfEkc+fP3fCssKWLFkSgGpJU09tOFC3HE3dl/+mtB89YJNzhqQT7AMuJkZ4cjsrkc2Ge/nylbLDSvcLmSmRA4o/vsNOnAC0trY2gvZo4JUOvuxE/6pNCeb606dPx24wlE9LS0PQEQoSERGBvHlTJIG8KUJGa1y8go5OUmxsbIImTZp0oanDLl1gk82Go5Lm2hqy4cjE1kPKp6SkZAmWzw0+zn5+fsuY4ca9nAs/lKmQdYaEH4cOsJt6OTenlgT71q1bw3ejCg8P10a/T+y5nj17ItbW1mB6j138+tMFJzEdHR3shh5L4FUPhQTAH54PHbbrwk1BQeGDo6Ojj52dXRA6JSmlIxuOk6SZtpLmSiW2Hu6bvbzaGryc//OZIu/l7OmgN5OdzxRVsInSXKOioiZ5enp6oAdyH/gb5svQi6G9FDJ27FiEj69Zv/4/XgA6fH647dmzBzl+/DgUA4DKNLKrV6/esW3btg1DdEwfdeijK3Ryq+UY9rH1l0/X1NYLtTzY5JJmaElzpRCCC50yPP4F7rbm5UzVQA4udJEBmyhpJj09feyaNWsOolD3hL/FxcURKysrxNXVFUr1EO32r1OnTp0QdNqH3WDYjs7HkejoaOFrMWeGtU86X7ey4s6OzZs3b0Tn879c9+EkaYbbaa5UkmbwbLjA5eMnsAvBpZTmSjG2/nPFNyyGodEgEe4pejmTB7sVOUP+Dti3b98ejvY8wUlJSVgdJ7jAtHLlSqynhuARnogFqwJwy8rKwiA/c+YMA6aEJ0+enOPk5OQFV9zR7xELiqIzG45smivdSTN0ZcMFLjeduG5avnyjtfEP14p/e2wSzpCkTdopGMjRDTazMyQr4bH1zGCXlpZKbNq06UBgYOAUdE7NByAvWrQICrhhvTZP1KSmpoagQCNr165F0F4bOXfunAgUdAwODrb18PBYOXPW7NOu+y+fhgjHlk5zbUmwqZSQapoNB8UYGfhG6l7OJEzaWwHYZOxocDVNmoESS+gBtwyqMBYXFwvBnNrFxQVZtWoVtkbN0+8JAnTOnj0LlU4RZ2dnWEOXs7S0DF27zcdLa/KiR6FbFxj9SdlwHNWGI7HuzyobDqsVNsfVO05Evi8fGctXAFteUrRw64Ix1tw0kKPi5ewYkBjxO5avzakp2JCoMX/+/LiUlBSs/C5cHAoICMAOSJ64q1GjRmGBMceOHYMStEhR7n3pcK/Fo/sIvl69fv36rU1LS4OaZsNxs+gj1YIUVNJc/x/ZcLC8DSW2sSqfp31W6Jd+KZdsC5avENbKbbAhGw49q9rgYIeEhCxH54CeZWVlDJhX+/v7I9OmTSPaBU+/KVhZgGVDMzMzZPXq1VDznAEX2pKSkvShfraKikojEHQWfWxLJaRYZcPB8nZYWNi0xqvlbQFsbjpD4mJOcxXkq62YPHny9fPnz2vCNgB63759WLAGT/8fQQJMUFAQgv4OWJwA1MQePHhwFvo72EP9ayq14aiATaUgRWsCmygEl20aEVWw6XCGpAI2WZ8pEA42pLm+L8yXmTJlyoO8vDxJWL6BITg6tCF6OU80CsJzHzx4gCxevBg5deqU6Ny5c4+lpmdol8rpqg/t0yWdm0UfaQObYjZc6oNCY24mzRDCTcXLmZKBHE0m7VTAPhSTtfJ86tMFAHZSzIUJtra2gRUVFQLq6upw9RZLmuCpZQUXLeGq+rhx45ClS5ciB/bvs1XunfbGNyXOk+h1nNSGI+NbTxfYVEJwyYDNYDDqnF1W+DDAhgcCzZs2oA3sf32mWsrLGcQM9qnQg0vQ+fVq9DtA0GEfNiQUEREhejlP/2ctXLgQS4OF+PwXuQ86a2ho3IqJiTFRU1PLatqWLrBbQwkpsj12bT0iWCytPaTZnpsjy1eanCHJgE3NQO4H2MGuxvobV7sE7N+//x/IzPL19cWiqHhqnYJ02MzMTGTSpEkwD++M9uZXLl68aK6trZ2Kt2mrYFMtIUUENoTgwkVBVSWp+7/ATRXstuYMeT41d36Qk6HhooWWYXDhTFhYGDlx4gTyzz//EL2Up1YgaWlpJDExEbsWgv52nQwNDRPPnDljYW5ufomTElJk7K2pgA2VZg5E3VvD/RJS5LPhFvvFR6oodHzcW/DtVQZeERBVv+98AgIANlkv59YCNhmfKQzstFyrA85Ghkvs5p8CsOHK7KVLl5DRo0cTvZSnViQ4GUNa6bJly5DAwEBBMIYIDj1pd/xu7fqWBptKbTgyJaSoFH1kTppxs9BYLiIiXMnAKwJWfqvt4ByUGEYFbCrOkCjYq9iBTZczJA52sIuxgfNSu2Mo2KPginh8fDwybFizxVZ4asWCaRSsZkAYsIeHR3urOTNCnLf4B3ETbLprw7Gzt/6dNNfq6m+C8HzjsNwxICGie2fpPDrAbknLVxzskBWmeiudFh8+derUWAAbHETgIg1PbVc7duxAKisrIciIL9DdxXLSmEHH0VFYenNtW7o2HNWCFGSLPhJlwzXCrSzXMW+zlc5Comif1mD5Cs6QfuGZ26hYvkIsb1CA96rQ0FBDMAeMi4vjgf2HCC6EolNLWOUQBqeXGzduaDJHs4Go2Fu3JrA5TZrh4+P7DmYYWFaYmaVr2karMYSB95w4Q3IbbPCZgsV+Ms6QzF7OVxJjjDdu3OgIJgJgHABmhDz9GYKwVXTujbx9+xaun0ibmZlFZWRkjIKDG7ZzUkKK22CTrTTDrTRXQUHB6pKSEkksn/vSYU8dbhnI0eXlTMXylRns1wV5nefNmxcMHl/e3t6N5n48/TmCOTictMGrLisrq+/MmTNPwTp4zqsSdTrAplIbjmxBCqpFH8lkw2HDcm6B3ZosXwFsYcb38hkzZiRUVVXxg6GCkxNhxCJPbVhwcS0yMhKmW9/j4+ONVq7b4nOrsqcFt4s+clQbjgLYVGvDEbHLqKurY3h5ebmg8oKwNeaNVJwhAWyope02c6QzN8GmYiDX1Mt5wYIFMU+ePJGCNE0w7ePpzxZYXIWGhvKZmpoi3jvdHQOOnFvRUiWkiCrNMIuToo/ssuFgeVtOXv49BveqVas8li1b5scMN23OkBS8nH8H7PDw8LmHDx82hlDSM2fO8EJK/xIZGxsjy5cvR3x8fBDfrStt5081CoQqts21bS1g40UfGQL8tazaUsmGe1Ncrvzl8+eOzYafthbLV9LOkE1M2svKysTRkxVWbsjT05NnsPCXCZbIkpKSvj948KDX9u3b14CFU9M2FMHmuIQUq7bMYHs56M1gBzbKWIJ6T7kMMtlwdl6xsfD4F7ipOENyAjYVy1dSBnLNmLRv2LAh6PXr16JQ0cPenm1VW57+MAkKCiLBwcF8I0eORHbt2rVy1qxZJ1VVVRtHfnSVkNp+It3/8ctPQ8HRiB3YMMfm5+erpwA2pLk6E71XPLZ+ll6/wERvxAurFQZ1neCeijMkXV7OlJwhmzFpz87OVgsICJgOFS/BKxuWv3j6+zR8+HBkwYIFAHl7R0dHfyiMB89TBZtsCSmqYAsI8NVBUhQh2JU1neACNRWwIWlmxjjVvaJnzxZiVT5v3749jBNnSLgMz85AjoqXMzcsX9Fe+yA4lKI/KDJ48GCiXfD0h8vDwwMqnjSAVRNUV60X7y5BFmymSjO6JMEe0pJgN02agZh7bFje1pwhWYF9584djUuXLmmIiopitsM8/d0CeyxnZ2f+9evXI0udVuyV0XUSJ1P0kWxtOAB724n0PZA+ioJtzA5sp72JYQA0WbCH9JJPg2VlovdKlA2HJY7M3nzmqqXpcP+WApuKzxSAfSXrpVlzXs7oj3gATBcgL1tOTo5oNzz9JYLsMT9//4bH2Xf7HFopZE8H2AdcTMaLCrUrZ9UWB7udgECNp73uLHZgw5Ly0N4KqZyCDStg69atc8dSPpP9bbpH76wirKCJgw0L5+x8pugCm8jy9cmTJ33j4uIGQ+w42OPyxBMIgltWuLryu7m5IWHHD01aMHsqy4KSeKWZtgD2m+KvyjDatjIa6D1Tr38g8zaAG8ooszVIBLUGy1d2Xs779u3bAL02JPLz3Ep5YpatrS1UNmmAyLXc3NzeqHKbtiGqDccsDOzjaQFPCkvUqIC920F3JlHJLRxsuOC8YrqmK9HnIQKbWWzhpg1sCgZy7MCurKwUOXbs2GR4bGdnx+4j8fSXCVJ8p0+fzn/48GFYQbHdvXv3T/BwAjbMsdmBDaYjEHHWEmCDCOFuLZav7LycL168OLm0tFQQ1jXBvZQnnprKwcEBAbiPHz8+B9a+YekXnm9aaYbV6zkBGyyRYCjODmxwKdLoq3CVNNjjB3nN1O23l1U7+Gyao3VuNS6FwT1zA7rBJmNHQ9akPezcOQe4nzlzJtHuePqLBQFNKioqtfn5+XJQ6ACMFVsL2MP7Klxxna5JeKHoB9iRKVbj1XYTgQ16UvRZnTHURrkxiIV5IyfOkHSATcakvfxrhVhcbJwm5PWCMyZPPLHSP//80w4dkoO54j/PKjqOoAL208KSQWTAXhaQEA7Ve9iBXVZRLWGzOyaB22BD/vpS/4QLW+fr2PwyLKfL8pWKMyQVL2crN9/IqqpKfjgz8wrf80QkcLgFuE+cPjdvmOCIYjJgux9LC8wtKhm439nYhAzYwoKMyl12urO5BTZU3l2wC4bi5MCG/PVNllp2SuL1jxh4RUBUs/PefBkIPlN0gE3WGZIK2OAM+eb5w+7wt6GhIdFueeIJc+DpICbW8OFtoZSHlYY+t8CuqasXhKo45MGOThyh2iUZDE2I3i8VsO8/ez9yqX/8RXfrsQtG9JFNgkw4Bl4RcLW7j/fyvSnn6bJ8JesMSdXLmfH1NZbOBxfTeOKJSODYMmyYBt+VlGQk9+E9lYF9etxvrh0z2EEuxsYigu2+ston3WDPN1bznDGu3z6itsxgj1FTivr27ZsQPP+f++mehAtbFujachNssj5TIE7A9rIfZyG7bmopzLd5vmg8kZGOthYG9/Xr10dOmTIlvOl2AHvrsbS9eUUlA0iCDUPxCm6C/fL9l17gV7jQbPAOMmAv8Yu/tM1m7HwAm3lbI9wb5mo5tITlK4isSfsPA7nLp6tr64Qhub3geb5yZWUlQ1lZGatGwVPzgiUgKL5w/jxhxPBfIShLBHr06NEvSf442M9el/QnCza02Wk3bg4R2CXl32SsPaOStAd2jQPTUKL3B2DDcpftBPXtJMAehYJ9EQXbCgU7uul2zCBxwtRZcWPVu0U1twNcdIHtHZbpcf1RkQEnXs75+fkqsE1FRYXoX/zVKisrQ9auXcu72Piv8GMFCnEwP88MNsyxWxJssA2fPq4fYTg4EdjgfgpsYNbGl8JOGBPtiArYVJwhf9fLGf2BeHCz0a5duzCwwfqXJwQrzQzTuIKCgm5wvQk6t4bv3/nBILHwQ5kKO7C/1dQJwzAYLvaSAntX1GXtQV1j/19gg8C3HP2cz9mGn1KxfKXiDMkNk/aioiLs7AvDcp5+FTr0xLLjIGrv3r17CNg7/+3mFeClJyMj8+3Dhw9C79+/l5NXUHgHHVfRx7IeZMGWEBP65GE7bi45sJVinKcNX0X0nnCw7c2HuFuMVWWZ2AICsB33JER4OujNHNmvSxJRWwb6g/NDIjuqZDwkDxcnlq9k7GiomLQTeTmXl5d3gntxcXGit/bXau/evVhFju3btyO1tbVISUkJ79oEgh0vdSjcSFl5uXhATO7215/Ku7ck2HDxzHGyxvpJWr2PELUFZpah04GddrpziMCuqalpr6mte5sBDwwMDBKrqqqEhYSEGsuD0g42F7ycKyoqOsI9mDPw9LNOnjyJFatHp12IgoIC9tybN294cKPq0KED1ontOnHNs15EXhw9xk3ZgC0Cw2Bug13w7ktvqKXnOHnY+omje4cStSULNig285nFvcz0gc0Oy+myfCULNlkvZ8gGg3uebfHPQkc0yP3795FZs2Zhf+Nww7x70KBBLfnWWoVQuDG/7zfvi7tG+FtpsQN7MdpjS4oJffSw1UXn2Hz1rNq2BrDB3tv7zM1d8PgXuOm0fOW2lzO6W+xHqq9n+X3/lYKhOHh34+rcuTN2z7uo9kNlFVXCcL9qtpYz18Auq5IFWA2GdQ9fNHHoZqL/zwnYsI6u2a/LZaK2ALbHyQzfgOXjzQcFILd+grs1gE3a8rWyptODl5814DE6PCd6q3+Vnjx5gqSmpv70ncByGIgH9w99/foVu6oo2Un8E6s2ONjykqKFWxeMsSYqaw1gw7zZUKP7OW6D7RiQGOFppzuLHdhxmc8t4CL1AVcTo+5y4k/c3Nx2MmCeDT5qdFm+UjFpp+oMKSPV6fUTBJHmwf2fDh48iERHR2NzbVw1NTXI/v37eXD/q4baari2hI7OOzTbawPYi3zjIjtLib3cskDHhltgv3j3uY+NZ0wiCvY6FOyjRG3v5r3TgrBWqmD36iL5EJ7z8PBYhfXcVMCmYiBHp5czOEOqNqiWpcYgap8+sTwB/1WKiIhATExMfgIb1L59e8x6igf3D6HHS3u4x8v8MosTsI00eoQ5TByyheh/AtjWu6KTlk3RWEsGbBiKAwsjVDsnE7VtDmxcGNxg9sZty1cqXs5ULF+ZDeSOHs2dB88/f06YaPZX6OXLl0hYWBhy6lTzhV/k5eV5cKN6//49DMvbd+rU6XNTuP8UsCE4Bz3RT8bcT59HrK9X9pj2lGhHVJwhmcAm5eXMqTOkiooKZtGUn0/o1PRHC5a3oDYWQA09dGhoKGJpadm4HebfsCyWm5uL9ehwoQ3KGQ8YMKAF33XLCe8I8GMHFw42XD/aPF9nITuwobrHeA2Vs2TBXj51+BrzUb2OEbXFh+K/22NDGreFhcVZzLe88FWBItyz2hElAzmKJu1UwG5qIIf/QHDggvMphBX+bYJlri1btmA3EADOLDCxAJAhkAUX2D//rUKPFVhh4YPwTPw5TsA2Hq5yxt58yFai/0UFbIjWBHsmMmDHZuZP33XquvdBV1PDnl0kHrFqxzb8lBOw6fBybs4ZEh1qvlNUVPxYVFQkA1eJVVVV2X2cP05wQkOHlyy3CwkJYTeefuj69esQESk1bNgwbDUIwHbwjYtSlBZ7wQ7s4rIquQW7oi63BbBBhHDjBnJ0gU3G8pWdM6Smpmb6uXPnJqE/2l8JN0/UlJGRgd2PGjUqgzaw337uC8et07ThqyeM7HWcqC0Otpe93ozhqp1TiNqSBRsSR0Q6iFdhWWFBQUF2cM/cgBNnSDJgU/FyJuMMOXLkyFSAOz09HavqyBNPrPTlyxfk8ePHEuD023+gWg6A3VVG/PkmK21bdmBDYoeJpsop+wlD3In+B11gx9zMn+F5+roXmR47JO6Rm55j8Assn9vW1vYA88aWtnylYiA3cKgmVnc5JiaGl/XEE6FiY2Pr4UryyJGjbjkHXQ1rSbBvP32r47Q3KYwK2JBopdJZ4jFR20Mx992ibz6bCQU1fxmWh8RmrQi/9sSG22DTZfm6O/ploHyXrqXvXhdKwJBLS0uL6CU8/cWKiIiAgAi5Gom+cijYV8mCbarZ8yTkWRPtu7WAfT4t1wrAlukk8pYBRcO8vLxcUHkdTXzkFHHtqXVLgz0C/cDsfKaYvZzvNFj0gM8AQRw8uHlqTt++fUPi4uI6oRNSZKSOwW0awE4CQwazkT1PELXFwfZ20Juu0bfzFaK2VMAOvHBnE8zJAWxxYYESSUnJEgzuVatWeXTqO44/8kaBZYibmS5Zy1d2YP+/LF+7i0zVBLhhPRcKrjddDuKJp/Dw8Jry8nLBzt36fPJ2mTq79YP9bKbn6Ru7qYB9xM1snHRHkXfgflpaWirROCy/mJZndWTtP1wzaf9/Wr5qamreUFdXz753794g9EfklRXi6Rdt3+WN3W9a47KGCOxPXyrlIfIMQLU1U9/Oqh3o+ZvPqnDcchvs82lP50PFHTAMpQo287ZGuINcjMeT7rG56OVM1UCOleWrra3tPgcHh32oeHDz9JOysrKQx9l3sZDTWbNmnWTVDsCGABWYM5MFGzoj6OGJ2mY8KjJYuT/5pM9i/WlkwPYPv+VOBuyAC7c3Q5pnc2CDsFphY8bqXpOT7EC4jk2HlzM3LV/nzJlz3M3NzTM1NbUDrHnzihTwhGv9JvdK9E7E0tIyVFRUtNkUQtrBXmIwVaOPwlWitv+Bbabfo3OnHKK2ONgwx24KNixrnz171gKr8nkl5fIYVjuh1cuZi86QkL63dOlSv23btq3dsGEDkpiYSLRLnv4SgUlk9KUIITjOly9f7ttcGxxs81G9jy00HbyDaH+5hSWDICsR8hu4CXZE6tMFeyJubf1dsEGwvD1t2rQwwgg1Kl7OYCC31D/hIhgekgebvDMkGctXo8nzrnl6+61JSkriu3LlCjJ27Fii5jz9Bdq4ceObhoaGznZ2dkHdunUraLr9fWmFopVHZMpknb4h7MB+WlistnB3TPyqWSOdTEb0bD797l9BkY2VQcknuA32nvO3tyTfK5h4dLW5jkQHIZa5zlCZB0sc+fz5cyeYj0DYGr4RwN5yNHVf/pvSfvR4OXMXbLB8XRt686iljUPowT2eVugQHeKIeUEtf7HS09NrIyIiFKAo3urVq38Bl26wwf8PciKI2gLYey/e2Ri62nyMkqz4M6K2AHbKvZfmISvN9IjArq6pFRw70fIOlvIJa2LM7qecmLS3Bi9nMJAbqPTPjbgLp/UzMzMVwX1k0aJFRC/l6Q8VWDk7ODiUop2X7IoVKzwVFBR+SmbHwZ6i0/eQjelgD6J90Q02wEoW7EMrTfXZ9dirD1wOvRF3qv8vw3IAu6VN2v/zmeLMy9nX13cZFHlDz9bIpEmTGg0Cefp75O3tXfrgwQPZnj17Pmvaa78r+doVOg5qYI9abjJC5TRRWwB71cGUo4HLx09QU5G9QdSWEtgRt7em3H85gQzYa4OvHPlc8U0K/v4JbhxskibtTF7OLesM2dTydfLkyRFmZmZRqMyg54YCeH9jrvffqpycnIYtW7Zgftd79+5dxOzHD2Bb7YxKmarTN5gd2E9eFQ+294mN2TBPa5H+0O4RRG2hQu3qgymhexyNJrEDO/zaE+t9l+5uoAPs4vIqWZ9FBtMOr0JKG+FmBpuMSTsVy1e6nCGJvJwDAwMXp6WlaV+8eLEj+hhZsmQJ0e54+kMEYaYzZsz4VFlZKTt//vzDUHAD34aDPW1M34PWJoN3Eu0HB3vdHK3F+kO7EZZH5QRsuNLdVVac0EIIwL6S9dKMLNgl5VUyAY5GE/mRhh9Xy6EiYG7es97ux2/sfV38tTuYJMIaNasd/Qe28IcfQ/GWA5vIy1lJSelVcHCw9dSpU8+5urpiMeeDBw8m2i1Pf4DQ+fWH7OxsbDju5+e3DH8eH4rP1h+wZ67BAD+ifdAJ9v5Ld9eTAds/4pY7VP2BYBa4UM2qHTPY8B4g6xJBBBBsnRuukIekvFr/8XOlApgZQoIHqx1x4uVMxkCOCti4gRwZy1fRruoCnQfqVr55kCxiYWGBXT0HF1Ce/kydOHHiCzpKk4EO68yZM9PFxMSw8Gi8x+Y22GkPCsevQcEKWGY0cVAP2ZtEbc9de2ITdOnuOhiKcxPsNcEpoaXl36T/A/s/YcPyT1+q5NE3aM4ObLqcIal4OZMFGzeQizt/TMfKYsKBu3fvDpkyZQqSkJDASyz5A4VOwWqsra1FYGkXkoiGDBlyF57HwZ6jP8B/jsEAf6J9ANh23rGx6BzbQW9ItwuE/6+VgP35a7VUU7DhO3jx4kV3Bjglltw4XC6wzIDllW6qYFN1hiRr+cqpM+SlS5fMR4wYkXn16tXOtra2yJEjR4hezlMbU35+/vd//vmnGpXY0qVL9yxevDgQnn9b/FUJjsUWBfvqk4VBkXfXkgEbkkWuZb8yoQI2lNxq2mPD8jaYhzIwj+Pwc5Pr648JNLVaAnECNhUDuf+Hl3OXLl1eR0ZGmuno6KSGhoaKgqGgj48P0W54aiMqKipCjIyMij99+iRtbGwc6+3t7QzPUwEbvP/sfeJi2grY6Bz/6JeKasnmwGYWYfgpFctXupwhqYBNZCCnrq5+D52HWaBn+PO+vr7thYWFf7L75antCTzbdXV1P6E9tzQ6MrsJ82wGg1GHgw3za5hnE+2DCtip2YXGaw9dOUwF7MNuZrqKMuKEVTN8z2VuT3tYNJ6bYINYwt1aLF+dAhPDuGX5amJiEgMHwNRp08J37NjBjx4IjX7fPLUtAdh6enof8/LyZIYOHXonLi5uPFxA4wTsjZZa9rrq3S4StcXBDlxmZD6wh2wmUVtOwA52NTEgA3ZZZbUEO7CrquuwgvUMONNhFQHRe3wjVbBJG8hx4OXMTctX7P2279578IRl77Ii/eS2bt0q8Pr1ayQoKAi+CKKX8dSK9OzZs3p0CF6C3suoqallxcfHG0FuBIANF8/mGQ7w/dPAXnUg5Vh5VXUnvyWGk4nArvhWK7ZkT9Kl1XtjQjC4oSIgvpE2sFuB5StuIBcbsmVY+hWtEZC4HxISIlxSUoKV3IGhOk+tW5AMYm5uXo3+ZjLgPQ4XS6WkpIrxHtvSaKDPLL3+AUT7oAvssCs5tgei7q0hA7bPucwdsEYOQ3HIpGTVjgrY0GMvRqfRPRUlH22y1LH7qbvCwf4TvZybOkNOmjTpQmJiogF6oFy6cOGC5Lhx48BnCy6+Ee2GpxbU8ePHv9ja2gpVVVV1mDhx4sVTp07NhIwvvMcmAzbUsHPwiYveZKltN05d+RJRW6pgH4y+v5r7YCcfL6+q6QhDcfD7Z9UWwIb1+W7yHZ8C2Hx8yHdGQ0MDf3Jysu7I0To3l+xJuEgF7LZq+Yo/P3r06PS0tDQtmIvfvHmz25AhQ76jc3I+Xh546xLUF3dxcfkQEBAgC3+DndaePXuWgikBXWDDlWsIx967fPyEAd1lbhG1xcGGyjyKMmIviNoC2JBgwg7suvqGdi77Lp+urq0TZgf216oacVuvmPjeXaWyN87Ttq+trWlnamoazUC/uPYQfzvHPfxa987SeXRYvqJgr2ptYONSVVXNuXXrlsbMWbNOJSUm6qPfBbJt2zYEQlZ5ueAtL1jqmj59+vuMjAw5iDwDqBcuXHgQtv2wt45KtjIa6D1Tr38g0X7oAvvslRy74Oj7q8iA7R2W6XH9UZEBHLfswU46U1PbIEgVbOixocNOSkrSbxyWK8t1zNtspbMQNrLaEe4M2da8nFkZyOGSlJIq0Zi2+nWJQOcX9xOOKbu5ufGjczmsHK6KigrRv+CJRoWFhZXZ29vzo/NrOUVFxSL072ngdAvb2hLYYHwCsRcw5aQCtt9Sg8lEYMNw3c4rJo4ZbObtjXCvmT3KkR3YVA3kuA32BbQH9gvP3MZNsGFeA8YUkDSTdiF4YHLStLE2NjbB6enp8jBM9/X15Zs/fz7Rv+KJy/r48SMMvd+Fh4fLw98wvw4ODraRlpbGMqOogP2o4NPQRb5xUZvREenYwcqRRG0h7BOOhbYEdp+uUlkb5mk7NMculjgiISFRKsDPzzK7iy6wbz19O8Z5b9JZOryc427lW5AEG9Jcu+HZcDBXycnJUV2yZEnAiRMnZkNxwaNHjyLofA/p378/0b/l6TcFNdaPHTv2ZcWKFXwfPnyQFxcXL/P09FzBXMuOudIMFKQg2h8nYO9zGm/Wv5vMbaK2RxMeLL/15M3Ko6765ZXlH6Ofl39k2bYYZWd0T1HhKcPVXhW/f50G610yMjJ1YmJio9GHjb7/ADawAPe/Cza+AoalfKLDHklWO6LiDNmavJxZOUPiwsF+86lcuWmaK6yZHj9+fA6EMy5btszvypUrUurqQxBnZydk/fr1iKioKNFb4IkD3b595/uSJYuLb968KQ1/w3Ug6K0hdRdv01rAPp74cNnJdRNd46POn0DntmQ/Ym/8gbW1NaQgN46amcEGeyZ2YNvujonvqyR1n2WPjceuEL0bKgZydFm+csvLmVk42JDmut/Z2JhVNtzs2bNPjNPVv6r7j9XN3MwEhZ07d/Kh0DeggPNDj96uXTuit8MTCRUUFCAr3NZURJw7I9zQ0CANeQAQH25hYXGWuV3TElJE+6QCdtKdF5M3H03bt99pvClZsA//GBH2QI8POEbIf9hmBLX0YChOBWxVZel76+dqLSKaRsOJkCXcVMFGe+wEt5kjndmC3QosX9cdunIY0lz3OBpOZJfmuu7YrdCpC1fFT/DfHOS4dKl/ZmbmcHt7e2T37t0NmzZt4ofqJryr6tT19u1bZOWaDbWnT4QK1NXWioKvOIySNmzYsAU86JnbUgXbwSc2est8nYV0gQ25FuhTPch+1sWLF4OnG4KOkn96HgcbnRo3wFVxhgD/L4lbuHCwB/eUu75yxkhnIrALP3zpMWHhxgzM/bRfv36PUfWDITpspNsZki6w2Vm+NoJdViVHBuymSTM3btzQDA8Pn4L23FufPHnSd86cObBsVu/i4iIAj5v+eDz9qvz8fMTLy/tjcEiIdG31t3awVj1v3ryj6IlyU/fu3X+5MNVcbThWuv/s/cil/vEX3a3HLhijphRF1Dbx9ospW46l7SUJthMKtiMT2KR16tQp8HGDdXqkR4//zgcANjoUP8zPz1fv5aA3gyzYaAfqRPT/YN3feuelxKxLfnKYb/nz5897wD1sbE2Wr9z0cv4J7KWGk6iCDc/DxUewbYLMsqNHj87bsmXLhpycnG42NjbI2rVrGxwdHfnt7Ox4bi/NCD0xfvfy8vp4/vx56fr6ehkwrAQjy61bt66HzqW51xDVhmsqzsA2NunfTfoOUdvfAbu8vBzZsePHoBdGKsxww3KbgABfFSRFsQMbZSxBvadcBhmw4frYLL1+gYneiNdPw3LOLF/Jgd0aLF/BGZIM2Oxi66G3AfM9k4lTE0ys1934mB0vUPj8qQIKOIIerA0o/HzW1tZ8urq6f7XramlpKYSMVhw6dKgqKysLLpTJ8jPafR8+zuTB4QCPGaygBrGrDccs8K0HJ95tNmPncxvs08mPHY6tMdeWkxAtIvywzQiduiHOzs4ILKUC3MxCwa7fbUMa7HSY8hL9L+akmSlaPQ/OR5jgfl/6VdHONymOjDMkJ17OrcHylRtg44JIPVvvuPiFCyyD7Cf4uUNEkI+PjxOkHqJDMT4YjqFn6jp0yMmYNm0agh7IRB/njxG4jyYkJDScPn36A9pLS6F/w9KCqLS0dLFkH636mfNszm2yNV1MtA+8xyZbaeZfsK1QsKOJ2ibcfj5167H0QDJgh8ZnO59JybGHHhsFm2WRTFbKy8tDxMTEkFGjRmF/N4V7y3wdG0KwK2s6wQVqsmAzJ83AVBs99p4zwH3lQMhRBzufhNjZBoNIG8jBZXg6LF/pAhssX4kyan43G05fXz8JboWFhV1DQkIWHD58eD463VFGp5II3PqqqtZNt7BgoL06oqamRvTx2pwqKiqg8OL3c+fOfYqMjBQrKysTQp+WhwqyRkZG8TNmW549n8PnNEa9eww3ij7iogr29hMZ/odcTQ16d5XMJmr7u2CD/Pz8sJ67ru5HJnVTuLkJdtPYerh2lp+fr8KAIWb4k3ausw3amOUrRS9ndqlyi/ziIrmRDde1a9fCjRs3boaLbifCLlq5ufv7fy28//1JTk6HzZs3I3BTUFCoMTQ0bIfe+NATAiIrK0v0kVudGhoakPv37yNRMbF1V5Ivl2RkZEiivQWMAmVgO5gnwLUJSKntICFbBZVmxqgrRXO7NhyUkPJ00JvZnG89s3CwD7iYGPVWlHxA1BbAhugzdmBD5BmrGVdYWBgYgyBCQkLY3x06dPgFblbCwR7SSz4NlpWJ2rJLmsGG5WQN5OgAuyUsX5kFYEOPjY4W8rmZNPPyfVnvwzcrNwcdOGBvrNH9NGTeoT3b1OjoaNM3b950hrh1uMER0rNXr5qRmprtYQgHdcUhEg496RLt/v+qL1++IDdv3oSLYhXXr9+oTE1Pl6ooL4P1Pzh+ZKGDgJhvuNAIUMOQEF73/6gNx02wj8Rlu4RdzbGFkFJ2YJ+4/HApys0v2yorKzELbVj6woWezEnBDWDDkvLQ3gqp7MAmE4LLQIcNjNd3o4XrxvVlMLuxMAsHGxbO24rlKxWwldFpwEYrbTs601zRXjoBbvD44cOHA9B5qSHcrl69NiYvN1cIvWFhriD0jF+vqqpajc7T2w8YMICBPsautCorKyPi4uJE/5pjQW/87t075MWLF+B0AnWty9H3WZ2Tk9OuoKCg47/NRP+9Id27dy8wMDBIgEgyPT29yxDCzLw/TmrDLZuise53K80wiy6wt51I38OPnpOb2+7u7o7VpoPeGxfEQbCDm5tgw5wbCh9icK9atcoDAgiag7s1eDlzYvnawmATZsOhwD6Em47pzNvLA+LVbcfILS97l98O1tHhBvOle/fuiaC3X17bqZNErbKyUnWXLl2+S0pKMtBbeykpKQH0HvNjFxERaVxvB2eZqqof1w/ReTBSX1+PLc+UlJRAyHFNcXFxXUHha5HXRa8FPn14y1dTU8M8XBD79wYnm2+D1dXvf20n17lHn0GFe9YvnKXUVfFV0/eGi7Oij79fQopZEKnocTLDl+tgH08LeFJYohbsagKf66cgmVz0BA0jLjD+YBY6VUOysrJY/n8cbFgiXjFd05XovZLpsWFZu7S0VIIw/LSteTmTdYakAjae5gqgskua4STN1WexYWPSDCSrwD0KoBgkrzx48GAgBBdduX5H/8nTZ/2+V5XUff5cKoTe2hEdLCQk+O/tJ8nLy79DRwcvIZgETj6wVAX3nRWV3jkGJJ2XFBNOJ1NC6v9Z9LE54WAHuZiMZwf24bhs13NXcxYedpswTraTyBtW7ZjBDvoRsqzRtI2/vz92EQ2fa+Pq27cvcvnyZcx0omlBDI7AHj/Ii12kHogl3H+ql3Mj2HLieRstte3Zgd0Saa7g4jl8+PBMuEFs/d2GWzOyz5mqQdLMx48fZV6+fKmMDqHlIeGH+XY/761mwesPvYb2kr0K3wE6/0M7cpFK2CeEdMLKiKioaEUnCYnPGU9LjKsa2nVcZWng2l256/Nu3boVMFfDxMVJCamWqA2H6/8BtqhQu/Kmbc6cOQM2y7+ADYI5N2S8vX//HuvFcQHYMH3T6KtwlRzY5JJmsp9/HA73DFiugCUcuMc3cuLlTJczJNfB9omNVpbvmEsH2PRlw/0XgisjI/MRbk3bQtLMy47PRS6cNetDJmlGrl15zX4nYw12RR+plpAiAzZTCSmu1oZrriAFK3ELbAjUiY6OxuLHIUPse5PL6GDBXFhYiD2+evUqMmHCBKRjx47goNIRBTtseF+FK67TNVcQvVeqsfUrgq6c2b3/+HoGBOyDUSC+sa1avtIBNpk0V46y4UiATSW2npNsODJFH+mqDUe10gy3wQ6JzVoRce2pNRmw3Y+lBeYWlQxk1WNDaSoYbq9Zswa5cOECFqyEpwTDKsOePXsQdFSEeHh4YBlwZ8+eRRYuXIgs9U+IQMG+zG2wmZNmfhqWtwbLV+Yem5uWrzjYuDMkq7a0ZcNRSHOlG2yySTOtAWxOS0ixEg52CHoskgV7v7OxSTNgg1PLcCcnJ6S2vqG999mbHjLtBb4JCwuvR5/HrklAD43HluOqqKoRW33wSsCA7jLJ6EiPFNicJs1giSOfP3/u9OZLXY9FvvFRdIBNj+Xrfz02VctXVm2pgE1nNhyVpBk60lzJlpCis+hjawE7yMXYWESw3ddmmgHst2rq6gWhQCU6vXkD1wTQ6S3LgpplFdUSMH0bodolCqZwRO/1d5JmYAVs3bp17ljKp6SkZInWkpD3Wxbo2pI1kKMCNjctX6l4OTfnDMmqbWtJcyWdNMNJNhwNYNNRQgp867lVQgrXoZislefR75cM2FuPpe3NKyoZQAA2pn/BDofrFgC2ADmwk8mA/TtJMwD3zp073RqH5Rvmajm0lOUrDjY5A7nLp2tq64W4CTad2XBk01wpxdb/CzaZEFwqaa6toTYcnWBDSGlz9ta4cLCfvS7pTxZsaLPTbtwcboPNjdj6Rri1B3WNJdpRa/Jy/l3LV2bhxdmn6vQNJg82+Ww4MmmubS0bjjTY/0bqtWRtOMy3PjV3PhWwYY5NBDb6fQkv9U+4CMcrO7CxgB7PqCTtgV3j/t9JM6Sq3/1plq+48B4bisaRz4bTWqQ/tHsEUVtOsuHIJM3QCTbZpBkMbPTE1qZKSJEAe8vR1H35b0r7kQEbheoSrOK0JNgQW7/LXnfWqP6KiU23Q6z/tGnTwhh4ehhusdRUVMA+k/LYHh0CuXEbbCqWr+ycIXHhYM/SHxDQUtlweAguHWD/v7PhmNWqwGZRaQZXw/fv/HB8F34oUyELtoSY0KcfkXpswMZCcLvGkgWbW0kzEKx09uxZC8y3HM/iaSpOLF/JgO1xKsMXoo6ogM1NZ0h8KE6lx24V2XAUwKYjG47bYLdUCSlcADZMNYs+lvWgB+yWS5qBVQSWw3JOwGbnM/UT2K6mBuKigqWs2nJi+UrGGRIHm9tprrxsOM5qw9FVQoos2K8/lXcnAbYIzG9/gK07hzC2vhUkzcTezJ++OeiiP6O2trYd+HNDdQ3ozmHjb1q+NqvWADZuR0MW7JZOmqEKdmvPhsNFDexnMz1P39jNzRJSzGCjnZcpO7Ahtl5STOhjWwAbApp2HL/me/Owiyyjvr5eAAqsgZsnwE0X2DtOZvjdf/ZuFFmwqXo5k3WGpNJjt5WkGRxsbmbDUQGbztpwvuGZ28mWkKJUGw567CaVZprqP7CFP7DNhqMZbCpJM7BCMygAufXTsJwOy1cc7EcFH4fBfLyDcPsyVm3/9XI+S9bLmarlK8yvYZ5N1JbubDgykXq0ZcNRiK0nm+ZKBWy6S0hxUhuOVVuq2XB0pLlSia1nzoZTkhbJg+ca4b58t2CSx5lbfnSBDYkKZMAWEOCro+DlTNoZsi2Bnfqg0JiXDUdfCSk6kmYoZsOtozNp5tu3b1jeKWatNN3S/sKOUzf8glzMuOblDGBvP5Hu//jlp6FcBZsDZ0jwciYLdlvJhgOwyyqrJVoK7LZaG46OpBmyYFOJrYd4dU5j6/Hinhjc7yRGjwhxNuGa5SsT2EPIgO20NzEMgKYDbFbOkMyiMxuObNIMJ2muZLLhyCbNUElzxSP1/sTacH9CNhxelhsblh9wNhlPE9jGZMBuJyBQ42mvO4sd2GQN5FoT2GRCcOlKc/2Ts+FaOmmGKthkQnC5nQ3HaGho4H/19K5szy66/MxuLMzCDeTIgA3OkADMAXRi31xyOy66wMZ9psiADScgB5+46E2W2nbskmboApuONFdOsuHoAptKbbi2kDTDSZor2dh6p8DEMG6AXVNT097U1DSaAQ/Anraqqkq4OQ8tqpavVMHe7aA7kyjah9tezriogE13NtyfmOb6J9WGw0UpzbUFk2agw4byVoSJI1TBhvVhMmDDB4EDlCzY3LJ8xdWawKaSNMMObE6SZqiBzT4brjWVkGrpbDhux9ZTyYYDsYQbN5Cj4uXMymcKFw42zBVhKM4ObGrOkOQsX+kCm66kGbqy4eCaBJmij22xNhyZpBmOsuHaCNgHIu+vgXsGfmUN7vGN3LR8xcUJ2GScIalYvoKB3CL0B92M/phgIEfUlko2HJWkGbrAppoN15JJM3TXhiMTgtvS2XCcJM2QzYaLv/PCYv3GrdsY+JoYvpEusJcFJITDEIkd2D9cK2IS2hrYlGLraUhzJZsNR0eaKx7Q86fWhqMANqWkGbqy4Y6smojlr/80LAcDOfSsakMH2MKCjEpyPlPkwKZq+UoV7JbKhuMkzZWubLi2VBvuz0yaoZ4NxxyC2wg3N72ccTE5Q5IGewR6JmPnM0UX2H9qNhxVsNtibbg/LWnmd8CGZLCIiIjJWFaYjHyX4tJP77FKjnIeyOtTp07NnDFjBnZVdNu2bWvBJhXfUbc+am+05m15Djmwtd8qBPiEJX46qLKzswcNHDjwAYA9QNMgP+9OShd43nsRYuHg4LBv7969i+Dv9PT00VpaWmnMr/U8nbEbB1tdXf3e/fv3B+Pb9uzZsxRqaQHYhrOdbz1OCJZO8EQCZ6GfTVVVNQdqauFtodACpLLif3sfOLUWB3v58uW+fn5+y/BtUHIWsuIA7FX+5w7cObpSCj38G4fi79+/l5OVlf0Aj2HJEJYY8G3OK1b7dZGeWQCPz58//8/kyZMb7ZegKsj79x/k8Gy41P2LFTtumtI4FD9z5sx0CwuLs/DY3d19HdTzxreNGTPmavvl4zGwYcokJSX10wF+8849TZ/oAj8AOytyjxz/rFGNB+rixYsDAwIClsDj1NRUbR0dncY15vhdiN9DN7fO4IyJP2dmZhYVGRk5AR4nX79vrDdKPQYe6/sh2FAcShcpKSlhRf8mTJgQGRUVZYa/VnGoWUX02UN6AHZsbKyxiYlJDL4NSiKVlZVhJUkhBHfeRJ29VV8+MpS8EOziWWhoqOW8efOwaK3du3e7rlixwhN/raRi74r8nCxlABtKIkEJJObPf/v27WGD1YfchxDcSyEeY55mJnY54IJgV8Wtra0PBQcH28DjW7duaUBJJubXVlRWmuJgjxgx4mZmZuZwfJuXl5eLpY3DCQBbsuLxE3tzC3d79OeBbSoqKvnPnj1rrOwJ5ZkqKipE8b/djOI+If8W/ly5cuUuT0/PxpGnubn5pXW79nvDiGyFee9lw1W7/DQULyws7KqoqIiFcsP6dExMjAm+7ZDw6jnbt2/HLpBB+Wf4vfBtHTt2/OJ+JMkPT5oZptbvBvxesA2+s/8ByCvSzD9dd4YAAAAASUVORK5CYII=[/img]