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(Quadratische Funktionen und Klippenspringen: Quellcode eingegeben)
 
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[[Variationen/Quadratische Funktionen2/Einstieg|1. Fußball-WM 2006 - Wasserverbrauch]] [[Variationen/Quadratische Funktionen2/Quadratische Funktionen|2. Quadratische Funktionen und Klippenspringen]] [[Variationen/Quadratische Funktionen2/Übungen zu a|3. Übungen]] [[Variationen/Quadratische Funktionen2/Quadratische Funktionen und der Parameter c|4. Quadratische Funktionen und Volleyball]] [[Variationen/Quadratische Funktionen2/Quadratische Funktionen und der Parameter b|5. Quadratische Funktionen und Fußball]]
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<div style="margin:0; margin-right:4px; margin-left:0px; border:2px solid #f4f0e4; padding: 0em 0em 0em 1em; background-color:#f4f0e4;">[[../Einstieg|1. Fußball-WM 2006 - Wasserverbrauch]] | [[../Quadratische Funktionen|2. Quadratische Funktionen und Klippenspringen]] | [[../Übungen zu a|3. Übungen]] | [[../Quadratische Funktionen und der Parameter c|4. Quadratische Funktionen und Volleyball]] | [[../Quadratische Funktionen und der Parameter b|5. Quadratische Funktionen und Fußball]] | [[../Quadratische Funktionen und die Scheitelform|6. Quadratische Funktionen und Basketball]] | [[../Endspurt|7. Endspurt]]
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==Quadratische Funktionen und Klippenspringen==
 
==Quadratische Funktionen und Klippenspringen==
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Hier erfährst du alle wichtigen Merkmale der quadratischen Funktion:  
 
Hier erfährst du alle wichtigen Merkmale der quadratischen Funktion:  
 
   
 
   
{{Merksatz|MERK= Die Graphen von Funktionen mit der Funktionsgleichung <math>f(x)=x^2</math> heißen '''Parabeln'''.
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{| border="0" cellpadding="5" cellspacing="2" style="border: 1px solid {{{Rand|#ca1321}}}; background-color: {{{Hintergrund|#ffffff}}}; border-left: 5px solid {{{RandLinks|#ca1321}}}; margin-bottom: 0.4em; margin-left: auto; margin-right: auto; width: {{{Breite|100%}}}"
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<div style="font: 10pt Verdana; font-weight:bold; padding:5px; border-bottom:1px solid #AAAAAA;">Merke:</div>
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Die Graphen von Funktionen mit der Funktionsgleichung '''f(x)=x²''' heißen '''Parabeln'''.
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Sie lassen sich auch in der Form '''y=x²''' darstellen.
  
 
Sie sind '''symmetrisch zur y-Achse.''' Der Punkt <math>S(0\!\,|\!\,0)</math> heißt '''Scheitel der Parabel''' und ist der tiefste Punkt.
 
Sie sind '''symmetrisch zur y-Achse.''' Der Punkt <math>S(0\!\,|\!\,0)</math> heißt '''Scheitel der Parabel''' und ist der tiefste Punkt.
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Schön, nun wissen wir, dass wir es mit Parabeln zu tun haben. Diese sind jedoch nicht immer in der starren Form f(x)=x² dargestellt. In der folgenden Aufgabe kannst du diese Parabel durch Schieben des Punktes auf dem Schieberegler [[Bild:Schieberegler.bmp]] verändern.
 
Schön, nun wissen wir, dass wir es mit Parabeln zu tun haben. Diese sind jedoch nicht immer in der starren Form f(x)=x² dargestellt. In der folgenden Aufgabe kannst du diese Parabel durch Schieben des Punktes auf dem Schieberegler [[Bild:Schieberegler.bmp]] verändern.
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Sxo1WeHu0oZbZ+8UJtuSiPPsE2O5VfZpQJPulNmZGRyIW+lQIX8evtu9zd9e88fPJleNQi8t65iFdm/zJ3C4qjyI/AfC6m3sKCut3LcUVlCqQCXvnje0/fzR8UQ9ky1wZw/52PP6rA4Xy31Oh/xGWzbwoG5Xt09OyrBLJXx5Q096ryDxccB8RFvZsdvAOqQyQfpj9LcTbUDzFNSdGq35iJ0xr7MO9NmeXhlR7aEgRQjwOYit5jw/rjwG0D0Fq34bElonD5N6aZupb5Hl71gt3jfdM/o64+pPI1+Ubf9ZqPzMfmlryfsnRou9Hp91zy+tqrtnU1UPb6PH1y897l/l5fg+pZxTJsk9tGhdF5lZW18DUW+0F1vXX85/gmc0KqKQ/qeyfSslBYby7y3Z9nAN89q8TKa97sRoprG3T4qlxsy6U2Wq8sf8gejs21PFqtUtW9b2MQPPBZTiEIqVhnY2Ng4gZaSHp47gK7cHPCjJAHO99KClveXCuqZEhnsVr/fNoKY0PlO5mW9ytIU3aW4AQJTj5nKXT+YueDnQnFi2ielfKMxPjqMjgFHiQaGhduu8S5pghMq3OKntYlP/oTNFCnYCwtTnvLXx3xX5tVujoMaF6waSzWm63HiBYCCgiAKb8nevkFpAQcrYiOtQe5vYJ4V+lH79TmKF547v4zkNRnoaocN20yXG3K0P2oakcvHc72/ZpL4WHxAKTNCOg6OFBI1x1Vb6X+e6iBqS3pTxMzk3p6ltYIQmd0P/i03Jt2Eq+N5zZ1lu64YXOY22esgsieB9JDjzreAsctPlL4RvsPCnWPsxcqDcblmD9sSDcqZ3blD8VoYtyCjZJoS8fIRq67bPVe3rg7oN0a+JiEUz5mFMmUX5WzsiqMK8fFahTtExat9h/8/cQ46bGr68Vqd17R6tvw3GC2mO2wrZDBNOGg/NYYCdGv+oNJ6daLF8uPRRzsj9KverdG3VBHub1ytfw3OrYUO9+SpLqSPFrUzkihubaQuSHj2WxAz/B1hCrjau/6gYYRfy9TQKhVm4BY3MhU4YC5eL1phSbAqQjIPNxe7sTV5faknyxG3w2mEjD1fWbh2mkBpKRAoAoIEEgOIvgtNd1CoVobgISWoYupC00/tPVLA1fP3yMuKWEqfoBL6e1L5joTFuDEpS1QDNnmgE35cJvqSmTdhZeF4Bt5M2USlUwbGJXc/p16YJCfcKiOOqIMfbNRqJ0saw3cdBM5YVC1xpF0COZqmOh16uVLfTNZkxucLlsRSWidzpZPeWNL9tO3DHjEmJ3dMvlhjyFcHDSmfnyi8bbbdejcx5pR2O5ff35xLVTupZ57xuwP/2FF6gYGQ/oDy82R3t9RuLeUYqTwGt22Nu/37NvlzY5cFe+Kk6cHKVyGyBKwZiiwb2YcoEwL/SEcNiQ+Kxym4cuiQPt7y0faXblgNi+9KXM8nFT9PDMs+VywWI5o9lZRkj3TlzrKwesI7ZfB76M8NgGXoWU2UdRnfabNbV8h/vGJYyjm+mnag/0bIWpr15zDzE/d3Sf6t/c5kRNgm2f9KJJxTl86YNAEce1OVcSdxym0eX/D42BMVOl7JF4UIc4WCF/jPV1sPGHgXOvGVEPn43nN/Jj1KndkQ0K8a60KVNoWTpffpglHr+tRlgy/x0NRIBPsEWUM8KDs1dj/zrXfdjqEoUXA7BJds/Vax/s9ILrMjxbwMsKpZTR6TeDg7vXOBeC7c0eDjq4N+5sDdiIISgWxPXz9CN9O2/sEdaHJCg1AGcrhxiec2j3P0Tk9NrfG8Am5PVEb8l57bqk33t9yjKMP5lcbEf3T0F6k9AfJPqD5lDUpEfhP6ojVk/o6aNIKi1ctRg6PFaMWT8Vek3AxY5K6I/c5sU/OCINum/LqNeh7ZmkAQCB98yjlRcW9GHk1tpmHxOEwYYtRMAxfyKXbwkVuquK+flLU+EE8kiTs57flrYvkrx9lxsB0AEcKlVeoMFN3YWGETxTG+LroHa1odrFYo5bd/J6VrWFw59y3HqTu9khG9ipusNumwLt9ZXrqRifKNwrcVY5wiRVSJRZUHxK6+9NTKOvjuk5JQz34fMQOhzyfrhCqarGaDmuKX3R/FvNPLq0fWOweFvFZRK0TiBV+T1vFyY5I4NBDiSGAVIPq83O0Ut2bLMJpSkP3rRT6qx66+eMGvlMtg59Py0YY2ARsJBzZVSs58j2AY1DN5rY2xo+Kv74YRZeAzv6UX9SspIPb6Nv1P/lIl4R6+f0c9FVHLv1LoWQH7wPZC2gWNbR9BMohXeMbL2vS/JspG4u2na1gaILbtEj4vQyN9BzFE1gUJXmE4lqKMgLycj3WbDWFIjEsdRuwNUnFtJJcABqQhOHQJP7AQy9FftZeOGFL8zXdEIPhJgZwWAhF/SneZ+9ONiNajC9pMM2SNEFePiDzioIWZBttUGndqgqQc6pTcgQKBV8jiIxkYQDNZZLJAFEJj/YCyR8GIdDtr2I24mvxqQ+W0G8Xeaheh4+3ooWK2Gk9JvhAmpJuzIqHAZSMoprLTZf5MJAQZlhPQPbdcoPYfZ5i4kuosJoXaLP8KouP5KfWqmP8Prycx0xCkXKpWMEMrbu0rexmb+yeDd+8bNGSp2vwZ28ZTM2dB40QQlSj3nY+EGL58pYXTN00C+Mex9miAn9RAa+3DXWZWum4c1GdAX01Nr8mLnMJS9BYaegOwVMgrdlLL7szMxiq2cKDN1p/GWt0iiG6/GnYvTidbEXqYfOBfifNjQJeOLzdacuXSTWqwGtsQU/pvjNbxjRu9+d7brXaqRi0+qF9eXDdvPfQ806gt6tODx5bvs/iWcetQ0c8RcqNw+tO7032rzQT57N+F7DSL1rR23i7GWW0XV5WZ1R++dj9LUfWjIL/C4K6l/T3ZvufETyTvv19MXoEaF9lz5VlNY3lX9oHyXRAJkiQ2iMntNmKJyueBGI38P3OtVHZc+YO+C955H5DzhJZy04v9hOvUP09q81xZGVVnbVgaNogl7uu7m98s1X3/QPDJ4pDcBNxI0zcFwXNUFQjwtmsC3uL6waSXTZRA6bPur694uKjnTsuhlPm5eyb7aEdqikNx89Cdkhx65HreicTxicL2Y2t66hwPDjUD8/ZvQuuN0ncIZALelxu/AgxAbadv9Y7iTlZqBP04D+YbhO4pUMqGYMI3OxOB8PZ2JHRHPwXm17sLBzvRD3jLjQymIXgZcI5YKnikGMG1uVBemBLbWMh4DUYLKOsYyLr6gxlEfAJpSjgdg6E96wZOILLl/OPIHUSpMBUCiVCOUZTIBdIwc8b1tIbfVJ7k+EO32gvJGdOaFs4vTMovK2nNAtr/LBFA3TudT02IVIsCddxQlWQU+vy6DfLJ1qoXFmmQV4UQYiNDo6cmTCS+qakbgzzO6RCC73DIIw8j8Md8FDfhTQ5rUw8zE0hRy0sRHt9JDyU8ZdC7JUEM4cIqblilCJ2PyxsoaZKErMhKjVJQMrTgfScj+d0Y2ckpFFWU+wkU+c/CgyrnxboN13XIe5Ds46CJlO6/kACFyw6evDeL3GOjd9ojxOzXC9kq21K+cfe3ItbzIaZGc4IFjzQelq+LGMKSD7pCsccdaJwk0oAB33MpmMUk0qEM30lD9rCV21w8xbzLN9C0jl03fl/35FdKN4qsT2HCKvH3eF0U1DFQJK5QQIGC4E4GDgbey4KKVCO+1tpPEpXjeDFFUbNRuAnfyl40Aie5LtyyBhgVdg14pt5LI22PktAV4ygsz6Uj3WA2+iMkfp7XIztDSIx/o5pmQEeUPJS9bcFQ45qxrjikb3H3Y+Lp1Pfm20JkwTyiNAKs75R79isbrPPz1Lqol+j+XLXd4njLuHVX7pd8/IyLq+lpZE2EuiX7n+3gYJPZyOHQvPLy6ObxD4dJNdyL8YCrAHPl+zl3yU9Fjl3RX5ehl2dVdLXYFKEYuyk2d/kXn8f0RfAS2opuAlOURy7bPcM5hENUlbg6S7fMQWKsbvFUB5DF9NJ+j1KI3Yp3htxxnb/qgXDemjpx0tyFGbvvm2f3KFALY5w5/fmu0J0t41xzvodn3Y9Ah8KfCCeDMpY9HOJ9ivDd/g5kubWhWMWQouJG5JmSZTt4rb1SX0LGRyLM4oNOI7uvBxCnIaTZWqL6rXbaply5yy7rP963DMPdPW5kLby2u1ub9Z4ujow1yplSkaQgnoKl0opuFRNFcqZNdgw/L0wM8s8oRqbapLRFtBjHGGl0rxz6GhqhiaOClT4/Av119JHscUfZpBKu3IhzkF6GHiN8NKeRVDupqqBLcCRpSKreWZ/HvuLGAFjUPF4pLjGhxN/OTFygkZEsxTmBT4NGj0WVwpsRvaVVx2ULNJ2WBccPYi/LoUBVJPCfAVzsVVwvSCBdx2DJh1TcwOiF1pBhmbUjS7hXfs76ZwQ7gERsDArcjRJvHJNCzIDYbgAdFI8OZsztBDbWzClbfswIsfWH7Hex+YSFHekBoR17zmGoQixhxVUpw2sFkzomX6sTQCvWGeYGzEW91IgQCghaf7uuYjJ1Fvef3phVcPtsstEj0BQxW5NUG0Ut58J6iv69gWdMw6Mp7+FKcceFJCIWBSnJviqckQaQZdVFvFbfadFgDyt5Ken47VOTy1FJIXatnT2dP4EW93IoKmN7oXtbOkP9FoPpwIntcmLzYwly9oedNYjzH30y22FCGp6TabW2jlbfvoA8iz47bn2Vub3v6UjL8ONfX3VSZXdhaipZF6XvM/9YNptKuGLGBpv/4YPUToCrwMjv7buvZb5L8jA0QvjfGqBxqJRKLoE1xNbw3wcesiKOZEXgL27ptrp8ayBlTujyD+VFNQt0c5mvT0AlhOt+kZCc078FKpw+Wg5/O3+ASNRo4tfonc83/KDbi9iUVEsknlbIXoQhFxNmysakC8p4s1KhP1i/NSLWK8psKbs7OGSNFOEWIZ1p2BGXtHjb+ve9Wvd6bQ8KdBCWwN30yaoE4mK6eZzpfv8rm7HR/K/Qhfq2ijbGLUuZ0Lg02+QafcWAOB4wT16eWHEyOs8Efd9YEEupm2K2VJhK+UN8VXtTUeOxCthQKoqsceEJpz9RWaJU2vQKhees2y3euN1Gowi9B6FXsRP9pD+nYpDLeIj142/E6lxh3fa63KD5+Zm6sU6dPy+sNS5UdcCxnCTIdgXfPcI4S+mnu2BW2bNZknFx/1B2lT7F4Gpz5GdmWa3fNAxXtSKlTwOTGSTK9D+zzjctvftA5TPzUE+3/nPVwm2VKGrEMBMvu2gL+eqsareCHwwtLUX9kPyCr1LePygdHbIcPejvUK4vX8RyYp+Z83VyzNbjw0crHrDIrAHjuUvJYS/0CALzdncoEHmFGBYgKprmhJzifLeFp0qLi9wk+8qXVndxdPZXuy+p9eGqpGpeHNaPtFELaSrdPvBfNuWK5CdU6dbMUTVtGgc9BsdEb9t48x6ptazB8nwFf7bz4JciYS9iMVllEFC4vUaIyysBV8gadCuR2/Oz8n/7hff3GBoHyJ+4x++v2NN8LZYkG7/tXfbTQFIzh5dTKtp7fRXGAjjA0Miez/w6NwAdZDTuzIb4dAF/nMRP6ha5/RahXCLoOOBDdqooRG9IDP57oOVk4k1KtpUIFETKO416oxbQk6/nu7U3Rr63cnQCbEFdt4n0QJFm7J+pEOzepEI0YqRnzRx6o8JJnT40IWoisUJKG09elZ49g4ktlzOXP4fta3XJhkPpO4+6ScQZmDUHtIeUdbz2SZd6EOfjEVy86enHxeRRqF7oBmEtkl+iECzaoTTdBfdGIX/+NUN6h0jSjVCguvqGIlhU0JqWvhJMAqB4vQuW0MBp/dQooPK91lELD9Ot2UQPTL0wjvJgKOTHt2nLc/k0MXrZgU/5jxVs3vjKkN7xBsyLm34qJM63zWquUPH+pdgl1aH9e24uXE0uel9DB4PzL6OqUqJBMpkgE7I5na1UKt7prowQP8dK3AB++W5pkk/aVsCGKNnFFnPdqoykDPwy/3OsSLGg54Ayg0kHr69NLzfnu6+LTWu1vxZFuTTmLLGxSie5bJPfeoAs4pNhYGxljSETn30rfhVS+oP5WCFCjjCcwxHEbEr4IZedHW46WyOzmGsDwxGWjwSOKkysBnTqkGjcu+EQ2zduPz0eX1UCiwk70Q92mWI+9uIKlY3zf00MJlj1OfbyGAQh7VXWCtOtvfez47+xIOda+vc47MYz7/CzWG//aB6vKbLAd8/YG1J+Xz+bfPinqPKMnKrt0QRwZss+b533H4MKLz/CbzLu1MHGqVM4dS4S+abCny8Lpu0+CN9cM1AGJW89xBS/dtpsfDfthRva4fvwKgCWyi55Ps4rf2iMYo9KedhH8DBONs7DvCx2aLYAv4NWj0p4NKNjFITDIdVeHVJOALNV8tvDN7pWLLLyFqwtaGlvEZ+UQSjVD8TeCdOY9tRqZXNSzowsccwf5KBC5YpDYhRy6T3x4et8gH3HpLiai0tlPR9K91DXNPN1B+fQrRRFjA43lyHvSoivUa4Zew3UX8dYmO4wln18WxseQBU1gPktruNi65Bz9FtdTO9CohA/NayT9ByGS+0JsddTPYrlYestzSReSdFAEJspJH/m6glHVMhcNlHP6x0XqmVEemOi5FzyFlaYcP4L6XkKNZgWgS9uFu4EJjTqVhzP2n2HeS8NZeu3mT2m+Dbx6w+h6qwnasmokAmb+E61ouUyYQILbXf5z6YVJ7/iGdTyY8xIvpvsy7gaxbjjEkq8RMejISSvEWh1hRKAv+KApF4fSC3XV8ysRGL+jsVzqQGYeYVE0dtQcjar5NH0CgUxxYQ9Q8dXX34joT067lm2NUSJAMYrJGYdHBjiyvo+6ctZ2YrEDlftDwWMfg9lGWSMFHurDzlkGJqoyuD1HyVkUV+EcQdppKgvkBNQ0b0QQadHTv5kUQGd4taXFi3ou2PELCZJMHni3UkvuYNiOHs1VZnaZOZjK2XQMuepEC5tuDPSFbCORIAPSv/T+yFGAGeul4ROfFD8cyxazu6OuOZpujjQfprx6DDcCmTwWVFY3D8nMiF7jSvcXkj4p++A5cSrWx86Kvjznr2Yyvfze7DJuCOAZHP7kf2uTYuysLyvZ7R5ueYTVqG8Njq/edD848enZXfbIOW2J69M0kOShmtbqeuSvG32Xu2MVtrOkdeI4fp7XqemWyZe67wXFvdqYns8LpX0tIPn6/5Unxvrz3qbfBf9Gt4eF86JizsfIdKeBiKMsfMQro8wfNlkufXsIOMg5m59lMyTT+YNH/xq51ScxdJGL+5QLn769gyv1cZW26icymTyhMHdx7BO33rIo8GM1Uz8bYMlu9CyfrGAsR9/1tBxzqSN292iVLBImqjPl1e+vVW+bnlCs+rrbAbwr0AXm6p8yGEzh87q2qQX+wPX3J/vsfWRVcdgrOafD70aDtyZ3TJNZ60UTWOJ3OZOf2RGf7GJ3gCDoy5ic5RLLlxTB8ONIcMtpgrBYSrOFAa3LQTe8k7e0hryZkzukYrGR9X00QWcivQykbf/95fq/tT17V6l+iFtjn6COF77snwkJI4zRV8f5iGT1kQ1kk9yn9EfWUWmhHrbnP1umMnYgq/ljifPg4vKGohp3qiGOYQk5FRAOiU3YEVMoByWJrR0v+zZXcLKv9NOmzCMZKGYtXQSENiNPkJPuZTpCeOwhABopTGncXPjW7Z4TrNWOIlaCmbM05/Xp8Ey6DBYSKkQo3eoMSk/NhVtVBGaNi0EKXVLg6M/0rYF9lbxYvDqyltGjaVuLBo9nLDAYeZy7TQJGzBPYZf0SjoEYRSCc8HeZuwlNX+niTHULmDmixv3jtApjNLIIWljGxLSSF6bXltNRhkI0jkZsBI3LhLMovRoJViVJggNA9TaCoFlTH4eDdpKUUmkjzVFvFqDY5Vh4YzrGfZEs+8vVeteO0aSEKfOfnik1qB2atgqBUyDuZQDIS0whvPR28BO0JDhF19TWpp9/CeKxEAKzMq7JyYhJqBXP1Jrf/wWlCARKgpU1EC9KkoHxff2OOgdFgu37l645FC79fkE1F7X93gsgnhm8uy84mc/E1Kxev6ZvUKGdr4o29Tnnguie5guTmfi21A2pYy2UWHgMHqbRKFoXajwoL1QLdzMscsoepixZybcD4Zvcbu2WwD79+io67cKEucHDfnqER+hyaglemahpQvaYwC+iLGKeYhM3vA/dxXmBwjR8AwyJxZ8foVUQ6pIuTeUpI395WNW03E7i4h7p954oihh5VD30ermPLLevgfhX+bMyID/MtIgaDvYo+LdpwaBD3gTgxZx+2f2QZDEpAJC5pzMOoQ/g1a7F3adsRr/jhfOU6r/+DXPA6VbUUYajG8VVdbqlab6aFV4mCC7O1fuGc6vkHqklxs+hgIVxdO6jl/tBLJmO+qf7QOgCPYboFpGNxlhLyTIFhfiM1PEXaCosis+WvpQkRf30banrY9a9doKqZx5Z/u2ZI+dDaO9K/OgNq8NrIpJWS3vkd2jJstUBm9WDZofTF5Qr6l3sYp/mRVpjirt6cakTiRAHbSKoBLvWt6azfVQ97IRQY7+gj/Pfcput4nvNd0ASRbg1pAgCJTnqAj1HjbqhMWTGHJM95IkDF98oK+dbfymtmvBn6mxdtESFlmaRqXrQuaEQqdKyEvaX9dPaGq2c8RzLh++8izxoIVGz3FV3XI/WEj9G22tTsdPR+k1Q72gHNNaYh0TSLvCNOzb7U7p+eRLTJwAz/l4WyrU7OSi5GOYuE3beq7nwwAHb+RWpL4OXia0p/yE0xzT6qXFc276nB4wgVLnbEfI/daUSgjt/Y4y5gk4M5Uq3j3L8FKkPu3hUDEiTfdidUOeIq7gC2BCXeoswXzqRVS3mYOqJ3vR3b8MGuP9cV5XNG8XtXoxmTDqzyHX0DKPUKcq4KkkuyDtZILk/PzYYalE552k55tu3dIp6IEhuR13XBftFpn/MLK9S4xsUrDP3xEzywbfNiPEDJKqhu92sSfCkwgLewA7GdtvUi1eCq0pFOxQXQ4JmltSdwz6mlowWlX3TysVvA0MpVaSKHCueG+b6D3UbWutUyJTgdKrz8rW4Z1QUCR7oviZudoYpZn4pvb6uWn6ajKppgM+8gjFIE//23yVeecSUZrK3CvkY6hA4d4f08saTYfzuxwOeSwyGwQLwT+6lTgFFs7uAfPcABNaC0S0JwqRhvzPzNSy55rZMsabHnDc20Mu+HcBAlm0wh7IvZkULeK4PeApQ14wMZczquzqjalOKfksc0+oEVeL5SFo5XiQFUoUmEJjnGgbOS/iMefHG+nm/W1SydDAR1lHFLAS08wlHMMoTVbg7R6Y0aIA4kU8K9uGSVjuN/DsniOW4Ftsf9n8JARXzlNYgaXEfsWxZ0RSG0ja3R12fv2x592Kk1mstkymqJbCkQHPUXGZ97sRKsXwjEKXDOdgRor2prdvBRgP38glY7R/pA4iokJGmx9AVc7zVHqklj5vIEqFgSF4f/DKKKC40U8quYWippSjNHkLectYcO8DKBbz41eeKrsNDnQ+Hr8api4mUVCCoDU0tWDs86jPlqxMea8FKd306fX2GSLfSs/DBiuPjHX4EnbZ2qVfS3o0skZCBrS3roOrxFNbeVN+YivpmnlW/wt1rOFJj50J2va9ASarX6P5HxpHMmfPI9sKcQ3b+bndkv8KXVzT36bexxbJGV6/4ORM1cZTl69s9DiIcFgr9rBVzBzcdCsqwlqD/sQcccqd+bDjHnH69VNTmzXmVS2FBXBeHSlTxntSAeabf1B0NHw0C4Y8RxWpGYIPF0BjjqOS3bvUBgvIPp4zDCo+IJqrt6diljCa1LYAb98zDe43FdoOuAHoX873rqXItQrsRbQkj4wQ30/z9mmGLufhip4Q50NI3pGGf3AlyWCr7GhUoEh2o1BJMg9LEjuGlpohKUlJMY08HNgKKxfe2/YQz4pEUo1wVdT1nlSsmZ5XSuly99qta0Yy8xjb1Rxxts/wKkrm9UdKzyJ0AoxoOyOfetm7Ba/Qi8+CpWzJVYVFVX5B9Iiartxk6DIpNSKeX7oruMZoCFTMNF2b7f+yM4tFE84dU9o4UZZcCLbe9lK0N6gIqvh3qaAp1nG4beOIZtzsnjJncOR6IXMpcQtDKWTEfkSiiDgDjKfzJnlg8h9lnTinffRMRoM2a13rNu4IdZs43ifkInUy53OvK3ulhlArZyZfDvoHRwm7Y3n7vajgLsBStDO1+Y7yr389FLrfjBLpsElIXjUOTmQF3rK3Xn/8TzI0iVDORuEnZUnt6h7d1nUPXFgi5CahHhSo2E42rOP1PS9YyjXPkVbwn6yiastZrfp2yZZy/5pmHI18974DkbJPLkEATxNprNWgP+Fi4oPId/oCIY9SScmXCIwMG6hNN3Ecgd39magEgvGVRcXVI2P8+Gdkz+qDBHSkHdw7bhP+ahxff7BZvFafKOnhbQTwcrStlajb0aj9Nb0DhM5irtz1cR2gxNMTpkoNH6c+KOfuqmK3u3k8TSp5T6EjiWr8srwNYhNUBdTbEz31bXlV/RrH26VK/Iz2RYuXV0SJXu+cQx15r3ydW+XDWMZl5STQShLp4VVIhfLkBw2RFMmCzD6A0p5wA/xrsEDt3yK197CXN8D5cZTlUeycb6+8PqdfH9Aw6i1WWp7KtILOmCnO/8Txg/9lFkewbcEel11EJhdxenP32HSGd8RLBWFhJ3lQ8qIP6FLOBNR/K63ty1Ov//lfr+nY3/Fyfi9fcVMpcI8kOqIJsknqFjqN8hlDLhdRoo9KiYqduquFso/nIMolWk7xMnMEPKaF00yXE5K5fjHd9u+hLRPS4wrqGMkekOITSLkOHRRzlIEEDOyHm+pTmAcJQE+G4N+4yPvTfwekX77XAhllQcOmFdMLVtW09hc5BsDMc500o7gqEokYh/SXHf/k1rgc5+rY8Kv1Xog94sv+Q0KmYqTyWLWcBDO2vQ+2iNF7ICSB9qCOiRxezwtXywdsj9ph16VYGs+SKGwqfq5gVZ81U3u2wPPzl+LR13U4ba6eOt+z4zI6unbYfkQcPzbz5aEEU9MwuLy0qrODy/LdJib6pEtvNjAFnIqXIOOI4dZ+51TEgMP0FqpJBFKu1IjdAl9LfS1G79IGQf+7/qzlBGUdF1V002227QYvl2XpHJz0FZINCL7RFRLsMWpdgBP7CNPX0ZaVkkbku12kMiaVGPrzig8vJ6+r7kCUHGzxOZDzPFF52EEbjONrHkYHyn4cJyC9yL5Mi0tU6THV0RD/hVtuXNcH/g44cwR7Tp1hxpSOady9IqYHRRcQ3Om02wRTbUUfuBrlAcHEnt4AHslOaiCuBbX3K1bKHR43xrlCCkqkuKaHveA+iHX24+8F1rbrHx4+61NeMItkLwbtaeODYUYhx5dJtsZUyZeYPQPjYcNOliTUJs26YTtPCuLysRnuBZ9x9JEk3VzY3papsNCXO2UNmkdt5XcUp1J3upVfGjJ3hC1vg3puAOuGRIl0dpgrgjWoXSiig6Pa2gzd73BxiafhUHVvIqYnVdnDCxmK9CoHvard9Pk3sdM3YtGfb/Fzyv0RcuZghe5iNLMF6WvKypaAfIIgOnm/xIqnV+M3BNl+3VylqyajdUDC1Wnz493eefKWCbGIBE83ktPXOCaZgskMH2RFdkXD+EMwSHABHweEF+Y58oMSvADoDmFswupO6TI+4OBys3WGGM18Lzq/GH1UQp0c5ej5E5MSkQlo2Yn57IhihlR6/posQpjPDP/dmHmK4WIO8yRCOCTBN4CKNCx9Ma7fylAD9DBCAf+IzlU4RXxsPOLkt/ODtp5+TWnbpnauZEXx9mu/BGEvcae9E5r2QnKseVhuH3g3RZ2e2IU5BvFbB5yIW8FpWWVzSPQmfjvHXdf/zqn0MmLSROX0rKLoiXp2s8DlMysRcjiZ0a8Pp/YyEdd+04Ya8nVy6H+eQU87S53PyT4kbG4pJ+H+AYnAAKp5YeEG4NHRc6bAq3T7DqqsI/xZX0bMqCWvXzOuH335m3qNi1e5jJSifEpiUqJlvhVFTbNcsGHgRtZuzswDEBVHiBt5ZeZ4gUALjKY3wA/GP3xGsQ49nt+G1xOBjP7OXUQvDE4SYf0kbzdXHHYOTjXuphD0eVO8TkmbntyWqjb0SVgKG6cKIC/JCiFZLhdVbduslxgDvolbQjsKrmUcmeprgt73XZFbW+c3gI6pBPfubPQ88383wENAKOtnL6RxQPLySAudUus0Q6MqmbwCTxwW+Gk5PyeGKKHUfTn6zGthKRI599YaOeSD2dBOASB51HP7jztrd6iHvep997RTggZh+erC1EtYfMi11Dbdj1R9qq3zA5RXRKnblAXbcaHXrtst6vWj4j6wAt32o3e2Ep0+kB9SL1AraKWmEoXTtqKykGL9joOSb65RZKfFvejZA0bBs3gIT6v06/sNisGb4vill1jculR75p+e8pI2Z4AuuUb4frxHQATHqwrGNB/IqnHkgj17flXBZL7E1HKBl9D3F/yUViHwk+WCoeIHxGxtK36I4ePKxeSfXjQj4y1fU9NQim291SaSqR7BT4N4OZ5cfxb6QsaK5T3oFmL07OvgiRRPCb7251zxopcEvL3B6JPBR7hc4dIfAhJV6PLsxkuKkqNcMVnJ6OnaggEzLauEW5wZ6NKI7lgUYMXpQ2P03cv6vYx+pmBgJe6EpMOEoZEL7QjBXDMzxmf1F3Pfa0KZXduaRTn17GYUeCwkOrLwCqzQA2E/oIU6bbDS7UCNLmkcrvBtXn7zzNdMaCbPAFLxz79PrxoVPUiiS7Tgmv5yvj+Pg3Ie7q358J8UqWnupURa5QQIwCKWWyeLvFU44ZQROHGObHcgezAh22FOa/sO9MqtLuovmhUBSxqghhs38rNNvx/eQ3ZRQqBcmJ/KVy45tzLj6YuL2Ee5en67xWqKEL1Cj+c4cfSO93NQmv/EbsyfjTHr/ttDAmbkthEVIN3/hPULSvMgimYN7jtMWRwg//5y8+6okgVw77WM+Plo3Rc12I7drKzrAbER+PKHiHGRSBim6d95p2hGCH7ZjInIFCcQg+lSQuyZesYw1/WvVdK+2D47pyW7FFcl0mYUA8rRmxHnJ6yqa6j++KlNqGPqSGq7H/iiuuWYu8jMe04G2FtZ5jkqJA/9kCzvcN/3B9QObh7oJJUUGb7ZegPYFbnMKP+wv0gr4qgWE9LNpNo1kA0vNCJ+Q+Fp1IW9/kOtlOGU1V9XA6EsOzspn+ETT5qy/xJ96Wac6U33R3Abqdw7AqBSaHUkTwQoDFdVe1W4SmI0HVbFSr4i52TSf2D0OMZN3qTRPUs0xW8Jvf2tD/jOYm8ARMmmnKmP7xC88yLcfGnqjxfnTh+j04h38CAXp+ktfG/vVl7A2LjZ0xasIUTK0oIJf6dgVUuMBjAyFMiDoFQg+Rmjt54TMKld8PbfkHUt7+AuqClOcNDk/rsZzIjpGRQxKJlK2L20kFp1mFreSn2Q4BHIM5ZnF7J+PCgrEiIote/z1HWmmr7HXvn9U4xuuz3NcqoW5rfvZmlU8HoAJKRYhbtmciFF8axCooMq6XNjyHjoMlCD6RVgXBXVItEm9h2K0JlUcvERIYEQIg23DO3uRP4MYRi0UInScjj2ElL7bAR0RnyOPmMXNnPqi1QszeDQ4LwBlA8q1BTQzD83ssBnEy5oqAkDPtzZsexQweRDt1i7k0lES1TZ/qAJV3pF8C1QS4TfRs+izjCPvcIjyIX+2BETQ11qQd1ZfosZ6dUj1ZZG4lQaVShdckeqXpb2e7d+MRN5L06OyWLzUPr+Z/nPxPmr0tolZMXYztHHZQlQgiv7nEsOTfcvEA+bb8vZiJlcGozpv7ATaMrKIvXeKfLar108NO1Ce9sCckT8r/htDnqVYaTebvG8Fnx8yGPxquvPbuYl/1LkEdf0hdeEUWZbMUqdBuVonwhbI6K9FH/xxtafZU/SvWfKf7UkrGVLyuH0kYgh8uuivCRr9V5MNptkdMEQlkGyQRYqhrpe0+fMRvC9Pp0rISv/4upD3A/aGho7Z2Geke58FdkNlgCfjxBHaWDqHV7AIs+UMzXMEkgVBtZxNlkceCoZmaTsSF6eKZd8tSZiDbN7XuSQA9JIdrMGH2j+DdBxuXFfT8LoIw79nqZaw/lXEYZH+Vcy9Nrsq4kMiTH0FFRbMBrJd8h27cz57nc/xXVuCbDT4Yn+GUuqLIS1dapteIla9jNZ50hlciibbzxNo5bTKh6Rv/VNcMr2z8WVMjWV1D/L9LEZsfn9Nkd/7keBLUY9VDurFn8mUzw3Zx8+uPfaEWupHMB4bIT8TSKQw/Suk10OD/kND1yB4WiMfAe5Dqd9vqojtwdaSwDfruQyxlwpwjr2jAW4Afg/PWXv6nFMhyrSLOpQQzhHF2SFtM5HiDwVz0ooNd8uozhDjDDj7ELPutq2IsMzmoZ5lJOkCH8YSYGTtjIH2wBv+Wgd6LkJe3SeQUikUv0oXzIve7hDgQ5ouHVDv295fKznCxmTG/1Us+LRmdEtb4jtDfC0WkC+aXhdY03BT2CmgktGp7oA/VsdnD6L3NHro5rw3RXX0RV2zozKXyat5mYW1iJjhvL8SLTdL9HlKPKBV3DOgDA7Kery3py0mG1kNd0LPm2+X+EO2AkrTWU794ezkUbJyX8MInLLQSikKOlTXxPEzDPgoSHn8vmD+L50Hrr07K0xZ6FvrKuSrCH4pLxny/Z9y+/pCn4wunqf4ReUE9/E9mFVCBV6J72IG4DCfK7tfUt+EF1dXg22WXxIZZdF5J+DC5hWE0tToNnz4M5J6NAoroo1eXoD4AX7G1Tf2ZMi7SPUBjXTekj66eaola3NrP7LytHS1O9VLrAmcUSZgjQYeMq7FBvtqX4vBPC6VEGxvikoNh2ZCNV66JwP71xz7zzFv/6SMgMo3tN/dgP4LXOUcM9x+lQI1woAWhqQZePgWAXPYQEOXo/Ia7DUnqw3XNgDUga7vk9BbCUiEa7K2kya8xYq/2no6W7vdcbX3oQjefRVebJyltuBlphCo+/cwkq4RiTskIeu1e2UHpSHhuvtSAjdAGOyg5S8LividquY5G/lxYJayyEHuAWO/UJikRpEaOOFuwoHHp7axa0VEYxk3jiNO2Ryc3ROrtJqVbnS11zR5KaLsmiyJ+NYVG/z5YlpO7oDY9c8rNweFXZ+/exip/2yh0m0NxuglnPW5jkelP5up6QlPCyiXegI1wttK99F9V7+ZrgP285SDc+1dtdkZnXMU85+nZ5oPmcGofhVYiZ2bsSLHEfwP7p1z3Zny4izwUL4wzg+Vz5CNGO/I5LbfB0QYioZaImUFAO8m7fOjcS7Pg2QaHiH0G5G6OWZB+BW7/PgQg8lOHopzXQvbaJdYVlq6WcUjxC8cIed09ZcRrJuZhdOX3wTY1x0D3c6ydO1GGQveF96depEVL6wD5Jney6mrOOGPL8wIt3VRp6bvNtVDgixZ/HmPQGSMXozISfFnK6lVPK2otq/ooDhEtXVH6xiYRvtBV4B60oZZ5Y12nt5NHaQLX1K+QoO6yDjvyFjqqC+Nq8wKgSBMtN2PNzq58up80RvxHKUYpIJL8Z2MTv51SsOnhQ16sLTQrwctbwxtkdd2bpYl4+XCcaQOpuqJYNXcsBHjsJ5T57051PvdsW1QqvpuWrDWqhzoVKrPArp/6zHHWShzM+2LPjYGmsFvS0CNV8DuqR6hJva1V20orkQgR9UaRRv+3NsJ7WZfCxVevQwYkE+6wVLB6HqPvQgtf0689Fgmqh45kyYKoyjNy/ISi6WKr/LJ+KlWIwLt1Zf22I65LC0ZnDxRRRySCwi05i3uZshHNGOgF49uqgMdAL9kpk+G5XyfNfwH5uGTMEa3OQBEKUh55NzrZGTsyigGmvL/iKy7wqjzSVC7eQlT9d75SYGEGthQ3D7ypLX0rKZCs+b1RA8PMQRchZ0pAuD/XDIhE5BtfIa2GuuJoShKdyyTOnv0Kl2CvVuYscRadHj+FPI/G25sJ2yszGo+AOFzkh8J7ZgNdFom0z+odHR1WJB28gYTzmfxuINoHjnfFSTnzHFbFdRUwd4rFU+WGtRiphpHeYYIvw3YPzxQW8P9afwwmhDUUvaWZvZgSFlOccm11m6vl2EFMBo3NfG6W2ceAOIwtFHmY1Uo+DpcckIMbft9NeEFfCQNd3YJhWn/hQVa7NdDGvgRhML8LDXaVgkhLHdNtxf6LXvanEHW7gR5m+0URrap0Qv+AbIx30rGBmPZ0qJptRsUPNRZgE0WclmKgdxhzKNW9pr6k3OvJSaSrbNyvGDyAe2jFZq5dcMPir/FUoxcAuSBraveyR9YiH6ymhUwOsESDZYBnPg3aIsNWSggfgmPsNV7Xewj5/UoG3qUt0B3WN8X5XkUqAmRL4ySgfeoIWaoPKB77VnFLotH9+Zaq8JM139TqGbQAv5no2xOPf9EtW6PqyJ0BsDDX2/vRgQpiW14LLB/MB4o2DTrUpKR4bUW84hNVv5JcmyqGW371iM6WUXYL9PDTEsEUUsM+bwpCnTuoXbrTOtsae0xHdHiOvukg1yMv/WPjc+gRZLqOyNnDJqr3KBnOdoKlP1VkNM3g74aK6qoqZyiFeuMwr9O3z3dPrpmrzgZIoaERSvKGTtV5MXdZvT3/1TITzSUek1Iak+lbCWE5eg0g5cqQt7uJwl2MktFf3cfANpoELQ0vTbHDBpk9e2E8S6eyBXb0xTv4WNbA3JRetTtvlD8IoVIGdOhactB13W92UMqH8gF5Z/R2QKUvp2Y/pIQq6lWeTSh3OScL5p4gbtZvbtUPZnUWSXj+/jZnl/I42+lFjnf2f7FIf5bcYSr0WNYWViw/5MHsqvDCKzgvrG8EUcjIo/iHeKT80nPEUzLrCmtDWBX/52w3lTr6d7+VC3aS6b8EvGOLezPdAvU5pwojKPNTDOhUYE8oZzl0xdaM8FXLy61njtxhS358z6HruGFjgosXwZyXn7+NE0K4fdMbelUBwvdCnFVfnjpjLleHlKrIBHpeHD7+8gB6UZ6osHJ5y0Eflw8/Y2TWO8lnas5vr/Cm0FkvpMCQxrIpEZkII5UtuH681Xa3t95zEMj+7GQf0FTtJ5oy7ByPV+f0NV/MBlAikBHcM3I/76H9aGJC4ifCLHyOecj+oqXaw2jymI9UGSPwyc0jSdmMwH+5uH86hZ7eZirmBu+XhZT/X+dMCYffKo0yYPGIxj/GjbyWzI3cmLGc/jTRGivuXHT5dvP6EUZBdfMByD/dINFhAv7tiwE5JHR4wD+lSfMwByGJ6biD/PkUnKjETHPQjzACPwalJk2EOh/GME/wDjvWgBpWNSWP7lx32nB/L/AApAI588RO+enynP6A07erEKshU9+386bKjNgyIko7HaQfzANAxytEuEVnQnqi5HP1oxtfhWx6Dn+ZppMCgGSJ4yfYmpUEecxOxP+zg/oaAuIzqVJKjKjoQoP+fxqHfDMN6QtGR3CBsfjUzSxgfMqs49gp/LgVEsYd8pCQOxO8fqpI/SgB2Q3yERMR6qymmqOTgMMHqjH+oxQUZeAGZT6yN/WmojBgVWNSB3UH9RQA8iViCrMwHUMBmo5HdXA2SqT6EZ/DNPZZZTjMbcZAwR+tAWSPKyK4HqGyKLgMa5iAIdWBxyHjcZ/wC+aljIbJTymHoboqR+BGaj2qSSJYAfQyc/limlP4hLz0IS4xj8CKQzGCEg9KdyPl3Z9qbkdqUggcDNeaeiKAB/Dg0ox/k00cD5TS4PQ/zp2C4ucH39xTuemPxFN5AHGR3p4YnjGKLBcTcDxn86CDnOAaHK5w3X3pAQM4wfpTWori5254P509D3ww/WmZGM8gnrSBsHgk0xMkPBPOBQBgcmkDbj9/8ABh1prjBwV6ehqkSPDgDGeCfSnJt/hdsj+6c01WAHLOB+dPVAxyOnr0q0S2Lkqc7+/pipTgZPO76YzUZ2kEZyO2eCKesciLwkpDdCpBH4itEjNsFJMg+dB7SDI/Mc1MFZMAqSDzlctUPAXc7bT0OOP8aVCAgGXx2OBVIhkoKF/llQHuCf/rYp4WXAzGHXPVYwc/iDULSKwHzsGz/GhbOPfBpi73PmBY8DuGKn+YNVcksliFAyFB6+bEWFJs7gW0nT+Bhj9KRHlHyh7gY5xwwH5inGSQvuMu4Ed48E00IlR5PuKxjb/YYn+dLmXO0NuIP8SAEfjgfzqqs8kmUTJx7HP4daeWIUb7h4sH+NDg/+O0wH/apA5VLmNWU85HX9TTvtcm3GIpCeoEoyTSLMxiAEsMynjBfbt+mVp5UpklXUEfM67SB9cGgQxTmP5HnRuOMMVH4gU5TKMIs+9f4uhP601WjZhsmR29AQCfzpXiEjZIkx/DhSp/pQA9SJVwsgRR1ALA5+hqOSSQPlHZk6HdGGX9GyKXYzsC00gAA+WQkgY+tLLsAy4jZfTIzTF5iEq4Cb1z1wWP8AJqVkVFwWT3AwvP51EFBQlYp19dkoOB9D/Sljl2DG0qPWSP8AquaAJUULFlGmMR6YkDKP50xl2ZLfaSSMZQhf5YpubWTAK2jk8nE+0j8wKcEhYDMDRoOjLMGB/CgBqySopxc3IB9X3D8qUTM/XypeOuSh/SkLQ7yU+Vs4ysrKadJMoB3yNkc8yZH60AO84Ku1ohH7vcAj+VQsyMDlI+mcodxH5c/pRI0ZVSk6L6jzF/rTHdDhmdC398Nn9QKAJEaPH7qUK46qA3H502Vtpy7SkZ5Ih3Y/HBpVkAjCLOx7gCXd+h5pjsjt8+8Af3SQfxzmgaDMMoHlzqGz1KMn+FTCM4yoPHGRLwfzNQb5G4SaUL7YP58UqxOq5CMSfWILn6HFAXJjIdoB3En3B/lTDIrNxknHPyf4U4wkgMbO5UdmVCefwFMCtITmLzMf89EwR+YpXDY//9lQSwcIbv7oethFAACLRgAAUEsDBBQACAAIAD20UzwAAAAAAAAAAAAAAAAxAAAANWNmZjJjNmRlNmU4ZDk5MzVjYWQwNWNiNWExYWViZWRcc3ByaW5nZXItbmV1LmpwZ/t/4/8DBgEvN083BkYmBgZGIGT4f5vBmYGDjY2djZWDnZ2dk5ODi0eEl4ebm0dSSJhfRFZKXk5WSkZGQUVPXUFJR1lGRsNcU8fA0MTERF7d0tbCyEbP2MQIZAgjJycnDzePBC+vhJGijKIRyeD/AQZBDgY3BiNmRiUGJkFGZkHG/0cY5IHuZGUEAwYoYGRiZmFlY+fg5OIGKtgqwMDEyMzMxMLMysrCApStBcozsAiyCikaOrIJByayKxWKGDVOXMih7LTxoGjQxQ8qxklFTZxcYuISklKqauoamlompmbmFpZWzi6ubu4enl7BIaFh4RGRUckpqWnpGZlZxSWlZeUVlVXNLa1t7R2dXZMmT5k6bfqMmbMWLV6ydNnyFStXbdq8Zeu27Tt27jp0+MjRY8dPnDx16fKVq9eu37h56+Gjx0+ePnv+4uWrj58+f/n67fuPn79A/mJkYGaEAaz+EgT6i4mFhZmFHeQvRqZykAJBFlZFQzYhx0D2xEJhJaNGDhGniQs3HuRUNg76IJpUdJFLTMXkoepHkNfAPiPOY01k+QzuMYS/bjHwMDMCI49ZkMGe4TuLqIJIl+YXhtlT5qSklC3OLb4nO+3S76jr7xMTPq29sK1I2oKj+/h21dVRtsm+s4Mn+/b9Yt/XW2676wT3iu8ijEXTRRvLbarKu9eEvpN1Wyx8RCmT79LLNunwjQfz5jVt/+jAubWWVWRLALNI8MvVfgv4Ja987fwn+ON2yP7dW2e9d7p2+3z/yWPJs3dYHnhXzxM+7+U8u4tv6nTuVWxdm+87Z+lNJdbyd6nM8wr79v7Vvv9P+eW0WesbTDvWi5Ydz/m0WPC7pJujfMf6ft2JarvaLKWzjFdtrmKqNGH8Ut72/v0/tR/vTh/ZnzLtvNMl0dYNk6WXTm3jf/pP7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framePossible = "false" showResetIcon = "false" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" />
 
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framePossible = "false" showResetIcon = "false" showAnimationButton = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" />
 
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[[Bild:Laufzettel.png|50px]] Notiere eine mögliche Sprungbahn auf deinem Laufzettel!
  
 
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[[Bild:Laufzettel.png|50px]] Bewerte die Aufgaben jetzt auf deinem Laufzettel!
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Mit deinen neugewonnenen Erkenntnissen kannst du die nächsten Aufgaben lösen.  
 
Mit deinen neugewonnenen Erkenntnissen kannst du die nächsten Aufgaben lösen.  
  
 
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<div algin="left">[[Variationen/Quadratische Funktionen2/Übungen zu a|<math>\Rightarrow</math> Nächste Seite]]</div>
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<div align="left">[[Variationen/Quadratische Funktionen2|<math>\Leftarrow</math> Zurück zur Übersicht]]</div>
 
<div align="left">[[Variationen/Quadratische Funktionen2|<math>\Leftarrow</math> Zurück zur Übersicht]]</div>

Aktuelle Version vom 9. März 2010, 00:58 Uhr

1. Fußball-WM 2006 - Wasserverbrauch | 2. Quadratische Funktionen und Klippenspringen | 3. Übungen | 4. Quadratische Funktionen und Volleyball | 5. Quadratische Funktionen und Fußball | 6. Quadratische Funktionen und Basketball | 7. Endspurt


Quadratische Funktionen und Klippenspringen

Auf der rechten Seite ist eine andere quadratische Funktion abgebildet. Ihr Funktionsterm hat die Form . Wie wir schon festgestellt haben, unterscheiden sich die Graphen quadratischer Funktionen stark von den Graphen linearer Funktionen.


Hier erfährst du alle wichtigen Merkmale der quadratischen Funktion:

Maehnrot.jpg
Merke:

Die Graphen von Funktionen mit der Funktionsgleichung f(x)=x² heißen Parabeln.

Sie lassen sich auch in der Form y=x² darstellen.

Sie sind symmetrisch zur y-Achse. Der Punkt S(0\!\,|\!\,0) heißt Scheitel der Parabel und ist der tiefste Punkt.


Schön, nun wissen wir, dass wir es mit Parabeln zu tun haben. Diese sind jedoch nicht immer in der starren Form f(x)=x² dargestellt. In der folgenden Aufgabe kannst du diese Parabel durch Schieben des Punktes auf dem Schieberegler Schieberegler.bmp verändern. Aber sieh dir das selbst mal an.




Aufgabe 5


Laufzettel.png Notiere eine mögliche Sprungbahn auf deinem Laufzettel!

Bei der Suche nach einer passenden Sprungbahn ist dir sicherlich aufgefallen, dass sich der Name der Funktion geändert hat. Vor dem x² ist plötzlich eine Zahl erschienen. Unsere Funktion erhält also eine neue Gleichung: f(x)=ax^2. Mit der Manipulation des Schiebereglers hast du den Parameter a verändert. Die Auswirkungen von unterschiedlichen Werten für a kannst du in der nebenstehenden Abbildung noch einmal testen.


Aufgabe 6

Hast du mit a etwas experimentiert?
Dann wird es dir jetzt nicht mehr schwer fallen, diese Sätze zu vervollständigen.

Ist a = 1, so nennt man den Graphen Normalparabel. Ist a > 1, dann ist die Parabel enger (gestreckt) als die Normalparabel. Für 0 < a < 1 ist die Parabel weiter (gestaucht) als die Normalparabel. Ist a negativ, so ist die Parabel nach unten geöffnet .

Hast du die Aufgabe gelöst? Präge dir die jeweilige Auswirkung von a gut ein!




Laufzettel.png Bewerte die Aufgaben jetzt auf deinem Laufzettel!

Mit deinen neugewonnenen Erkenntnissen kannst du die nächsten Aufgaben lösen.


\Rightarrow Nächste Seite



\Leftarrow Zurück zur Übersicht