Grundkompetenz: FA 2.1, AN 3.3, AN 4.2, AN 4.3

Bei einem Fallschirmsprung wurde der zeitliche Verlauf der Geschwindigkeit eines Fallschirmspringers aufgezeichnet. Im nachstehenden Diagramm wird diese Geschwindigkeit für die ersten [math]80[/math] Sekunden nach dem Absprung veranschaulicht.[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAmkAAAFQCAYAAADk7OkqAAAgAElEQVR4Ae29j28UV7rnvf+JJQsUIXFZy0KIBSFHESjIuYCSCPtOMgpJQBAizOxEwETgTYIzusHzzphsXicz6+S+MJNxkjXkmtx3vO8bcxWywcM4I/xeTMAKTiAzwJhcs5BAL+C4TX9fPdV9+qlTbtvd7l91qr4l2fWc6lPV53zOU6e+fX7VfwA3EiABEiABEiABEiCB0BH4D6FLERNEAiRAAiRAAiRAAiQAijQ6AQmQAAmQAAmQAAmEkABFWggLhUkiARIgARIgARIgAYo0+gAJkAAJkAAJkAAJhJAARVoIC4VJIgESIAESIAESIAGKNPoACZAACZAACZAACYSQAEVaCAuFSSIBEiABEiABEiABijT6AAmQAAmQAAmQAAmEkABFWggLhUkiARIgARIgARIgAYo0+gAJkAAJkAAJkAAJhJBAaETa6OhoCPFUL0n/55u/rt6Xh+ybycIuEPIgD5uAhugbykIs8iAPm4CGXPGNUIi0Y729qK2pwalTp5QgLRIggZwEXKlccia+DAfJQ6GShbIQizzIwyagIVd8o+oiTYSZCDTzR6GmTkSLBHIRcKVyyZX2chwjD6VKFspCLPIgD5uAhlzxjaqKNCPQnt++3RNpZn/mzBklSYsESMAi4ErlYiW6jAHyULhkoSzEIg/ysAloyBXfqJpI8wu0u3fveiJN9iLUHmxowNWrV5WmZaWQvDaI3+5rQr1pgattwI/3f4Ch8QkrZlkCySEcrFuLg0OJoi+fHOpAfV0HhpLzvJQvLYVcq5C4wZRZ5967hIGP/ohv7qWC0bywFTdnjDId/OEMOte2ov/GVJm+oLqXdaVyqRQl8lDSZKEsxCIP8rAJaMgV36iKSBMBJkJMBJkIM9mku1O2GzdueJ/lFmopJMf6sGf5o2jt+TeMJ9PiIJX4Cn37H8UDjb/C4M0yP5h9wshLcBH/7l85gd/8+gSu3J/nRXxpKeRaxYgn63uu9WJLzQ4cu5ZbZVpx55nFwk+7j9sD/4i1BwZxp/CTnTjDlcqlUjDJQ0mThbIQizzIwyagIVd8oyoiTVrRRIQZgSbYjEgT24i4ad2eqb/i2LYGNB8awaSyTlvJiziydSXWd52b/lkwbjFhnzAq5jIlOXeeaSlGpFnpnkOkWXErFUj9DX0tT6NzuPiWzkoludDvcaVyKTRf841PHkqOLJSFWORBHjYBDbniG1URaYpJLb9I06O2dX/0EDYsegknbuVqeprCzRMvY2lTN77J9L6lEl/g/d0bMt2iS9HU9hFGE+mWtlTiHI62mi7TWtQ/9jKOjnyP9KkTuDb4O+x7bKknHmtrluLx1qMYkXM9YfQQ9na9g1bzee0a7Oz+AonUZRzbugY7+/6WuU4KPwy/iTU1j/lEQxLjfbuweGsvLp823Z0JDHWsRd3e3+D9bJoW4cGW93A+k15gAmMn38K2hkXpNNU9gfb+oziQ6Xq1hZcdd2HDdnT+/hd4MtPqZccFkLyKT9oew7Ktv0t/X+p7nH/vRTxSV4vamlrUb/w5Prpwy8tT+tx2/OHYC1houptrarGqcxjBNkz9nnzy5y9rif8YNh/6SMvPY3wGY+few84Mg4UNL6D7vCmz9Pn3L3Xjiad7cFkKMvU9Ro6+jMe9fNSgtq4JrUfPIZHxD/830iYBEiABEiCBsBFwSKRNYbzvBTywow/j+VBMXsKxlkZsenMw3S3qCZGNWN32GW6mvsPnB9ZhdfufcNt7YE9grG8vVjR349L9FO6dfwdNS7fj7dPfwuvIS15Bf+s6rO44jbueSKvBwo1vYNAbAzeFxIV3sWXRs+i+dBuXe57Dkn0ncMtL4z2MHnoStTWLsOHQl0hLy+s4sW8tnu65hMnsmLS0iKmtfQIHB9PfKSLyt5sb8A/dX+E+Urg7/BbWL9+Doxdve2IplTiP91saUFuTHh+ngiiT/mzcFJLjf8TBjUtQm0ukeVyasb7tXzHmdR/fw+XeXVjx1G9w2svfBMY+eQ2PPPQaBm5OQb8HwBwtaRp3rvwFCzQYP9PNvbQWtQ/9Ep/fFjkoovwVLFvThZGsOkzgbOfTGZGcwp3BX2BFNr7pKt+M7ksVGLsYzBLDJEACJEACJFAgAYdE2h2c7dyA+o6htHCaNaOZFqyHXsfQXW02Sd3ox57FLTg2dhX9uxrwyME/a6tKYhhHXv8QZxPjGNjfOK3b9P7lPrz0Qg9GJ2TiwHJfa5m02PwFR55qQEvfGLzWvuW/wOd3UkDqEo5s2oS3un+JtZsyrTt3BnFg+VM4PHrPJ3jSouSBlj6MZ5M7iSs927DQE6Ui7NagufvrTAtdOvPed00TaRJ3tU8UStz7uHXiJSwOiLTTN8/it1sb0dT+SUagAZBB96sfw8GhtMz0vin1Lfp3r8W23su+NBcu0mbOX7Awc/G4gmObl9v5CopEYfvwP2LgtsjhKdzsfxEPNL6BoWxr5Hc429OFI8PfBb+QYRIgARIgARIIHQHHRVpauJk11tJ7Gch+B990P4Ml+wfsweOemGpE28AN3Bv9Z+xZuwT1azdjX8chHPt0BNelJWlqGJ0rG2eevZlzHJgIiFXY0nsFuP8lDq9vTndv3uzH7pW/wOfXT+HAyr3ovzmV7v5cfwij96Xn1O7utAVoEtd6d6B2cy+uzZQmX1qy15qYIf0+QePFXbQRW55ejfq65Xi6+0J2HF/qUjeaF7+KARGZ2S0tGIXnrWyaCxdpM+Yv+z3GSIs0O76PsYnmyxMg3ch78LC0dprP711A7+51WFjXiC37OnC4939i5Dpb0Qwe7kmABEiABMJNwCGRlm4ZWWxapHJwTV3pwSavteg7b4yXLd7MgrlLvRav9OkTuH7hT/j4vV+jbfPq9OzQ60PFiTTcxUjXE9hwaASJgVex1Ov6lNatJrQNjGH00CY83HXOG7+VFVbJXKKkzCKtdh329HyB8XPvoGnRNnRfTEsbL03ZsWaGWXovrXpjYRVp0mr59HM4fCE4pzOF5PUL+OPHH+C/7d+MBxc8hvbB61aLZA5XCvUhVwa8VgoieShpslAWYpEHedgENOSKbzgk0oDUzU/QunwTus7nmrl3D5d7duABT6TdCYwNyxRM6hZGP/0Yn395El3bO3Bi3Ld0ROprdDc9hN3953J3d8qkhZWdOOt1dwbXSfO38mS6WpveQPcvn8h0i0orz240/PIw/qnpR9lJBHmLNBTS3fmt15WrY+Ak77m7O9PrsyVw4dBmLNn0Hi5OppC63IOnFwcnZ0whMfoZ/u/BK7gbUpE2OfI2Ht3Wi7FsA+D3GOrai/YT13yCbMJrYX1gVz9u6r3qnOVK5VIpsOShpMlCWYhFHuRhE9CQK77hlEjzurROtmN94x4c+vSijidL/juGe15G8zPP4slF6XW7UmN/wE+WPpkdiO/NjjQD4G9cwrFtq3VSAWRQ+cdofegpTwAGJw6kEhdwdFdjeukPXxejFrdfpAGQsVEr6lC/RCYTpLvXvG7EJXWoX5EZryaTKrOCZ46WtJkmDuxci/ol6a5ZvZaZZPBTvO/NyJS8/StebVyce+KAZGLyAro3rUJT11ncS11B386H0XTwj5l16Mz5j+LVgXFfmk135zYcuTJtQRQPjaZprvwpybSVK36AsUTMdndex+cHnsCe/m99gmwSY707sSQ7AUKAywSQDdjQ9QV+CH6lQ2FXKpdKISUPJU0WykIs8iAPm4CGXPENx0SaAJ7A+PCHaN/aaL1xYNOBf8HozT/jYJ1ZXHUKiZGjukyGtZSEvLXgFLp2rMkuI7Fw1TM48NGXGeEXWIKjdjW2dX6WHlyfj0iDzB5di9rM2DPPLbyxaouxwrfIamEixl5Wo1aW4DgxgJ7NMsg/YYunwHId3lIVH7+NzYGJA/qmgxQmL76Hpxc9iTeHv4O9PIksXfEjvJpho2mWBrq/4NhzK71lOvJZgsMeY+brztX7JmMVJtJ6v+jDnlUqfrOXS45hsGsnHqzNdNvWNsDzk+xEgmxMpwxXKpdKQSUPJU0WykIs8iAPm4CGXPENB0WaQqaVi8AEro9+gdHAAHlvJui0CQG5zuexsBNwpXKpFEfyUNJkoSzEIg/ysAloyBXfoEjTMouINYFL3ZuxYteHuGhajDLrvD144E/INZovIhmPTTZcqVwqVSDkoaTJQlmIRR7kYRPQkCu+kadIC3S1ZVfYz2Q4sLK7t8L9yat5rGemwPJ544DGpjUrgeRVnOzcrt18/jcmzHoiP3SBgCuVS6VYkoeSJgtlIRZ5kIdNQEOu+EYeIi2FyQuH0bz0efzWewWPGUjeiNYT/y5D7jHe34oV1gr8H6Bl6UyzMBWS36JI89OgTQIkQAIkQAIkEHcCeYg0Wf7h4cBLzZMY623BYlnK4P5X6G5eE5hZd8dbK2zZ/pO4nSdhirQ8QTEaCZAACZAACZBALAjMLdLuDKBt8TPZpSSmURnvQ8uCF9A3nn2BohdlargTq2RdMfvwtNPNAYo0Q4J7EiABEiABEiABEgDmFGnp1wS14ZOvT+G3r2xCQ209Gje34XBmnbKpkS48XNcBXc4hg1XWsFrwovcqpHxAU6TlQ4lxSIAESIAESIAE4kJgTpHmrYu14CE88mwbegb/ikRK1inrQWvjGvyk7womswuyBpBlFxr1reofiOIPUqT5aXDAq5+GKwM8/Wkup00eNl3yUB5koSzEIg/ysAloyBXfyE+k1awMjDlL4c7gL7BiTRe++CL/ljQRYrP9CbRcf4o1beWKY44xbpohOZCDuSdkH9z8nwVt1+IG8xfMjz/sWt4KTa+fhT/fQbvQ6/rjB6/lD/vjie3/LGhXIm7wO4PhSqQhDByYBi3poA/4wxorbfk/C9qljBu8lj88p0jTV+8EWsRMS9mZYxyT5idaIlscgluaAFnYnkAe5GET0BB9Q1mIRR7kYRPQkCu+MbdImziNgys2Zl8Kns5i5iXiKw5i6O4oZ3dquZfMcsWBSpbhWS5EFjYc8iAPm4CG6BvKQizyIA+bgIZc8Y25RRruYPTQM1jR8gEueCvYp5Ac/zPe3roBz/V8hclc66Rd/BC7l3OdNHWHwi1XHKjwnBV+BlnYzMiDPGwCGqJvKAuxyIM8bAIacsU38hBpAIIr2Nc1ofXouczLyAHwjQNa8iWyXHGgEmV31suQhY2HPMjDJqAh+oayEIs8yMMmoCFXfCM/kab5KpvF2Z02WlccyE51eUJkYXMlD/KwCWiIvqEsxCIP8rAJaMgV36BI0zKjRQIkQAIkQAIkQAKhIUCRFpqiYEJIgARIgARIgARIQAlQpCkLWiRAAiRAAiRAAiQQGgIUaaEpCiaEBEiABEiABEiABJQARZqyCJXlyqDGSkAjC5syeZCHTUBD9A1lIRZ5kIdNQEOu+AZFmpZZqCxXHKgS0MjCpkwe5GET0BB9Q1mIRR7kYRPQkCu+QZGmZRYqyxUHqgQ0srApkwd52AQ0RN9QFmKRB3nYBDTkim9QpGmZhcpyxYEqAY0sbMrkQR42AQ3RN5SFWORBHjYBDbniGxRpWmahslxxoEpAIwubMnmQh01AQ/QNZSEWeZCHTUBDrvgGRZqWWagsVxyoEtDIwqZMHuRhE9AQfUNZiEUe5GET0JArvkGRpmUWKssVB6oENLKwKZMHedgENETfUBZikQd52AQ05IpvUKRpmdEiARIgARIgARIggdAQoEgLTVEwISRAAiRAAiRAAiSgBCjSlAUtEiABEiABEiABEggNAYq00BQFE0ICJEACJEACJEACSoAiTVmEynJlUGMloJGFTZk8yMMmoCH6hrIQizzIwyagIVd8gyJNyyxUlisOVAloZGFTJg/ysAloiL6hLMQiD/KwCWjIFd+gSNMyC5XligNVAhpZ2JTJgzxsAhqibygLsciDPGwCGnLFNyjStMxCZbniQJWARhY2ZfIgD5uAhugbykIs8iAPm4CGXPENijQts1BZrjhQJaCRhU2ZPMjDJqAh+oayEIs8yMMmoCFXfIMiTcssVFa1HOju3bs4fvw49u7di9qaGjzY0ODZckw+q8ZWLRYmrzdu3MDo6CiO9fZm/yR89epVE6Wi+2rzqGhm8/gy8lBIZKEsxCIP8rAJaMgV36BI0zILlVVpBxIh8uu33vKEmYizmf4kTqXFSaVZiCNIHn//7rtobmqakYVfxEpcEXEiZsst4GbjIemW75c/KdM4bLPxiEP+/XkkCz8NijSbBnn4ebhyr1Ck+UstwrY8tP0tQcbOJUSkFe3MmTPeQ14e9KdOncq2rBnxJuJFriGfybWr1cpWqiIz+RQRKq2HJp9GiLW3t1v8hNFcAk7OlThyTeFUrk2EWa50mzxI2kU8VlpclyK/4ldGdJp9Ka5b7DXEX/wtzoa1+I7wLmd5F5t2nk8CJOAOAYo0d8qq4JSK0Jrt4W0eLLKXh4vElQfhTJs8mPK53vPbt3uizrQuSTrCKOQMn1xiS3hI+ucSNkZEyENZRKvwEQEnDPx8DWOJUypBK9eRNPq/x7CXNATFpsQz4rpUaZjJV+Z7XHgLo5nSb/IqeZM4kn8px0rkR9KWS5hJmoR7kLdhLfcNNxIgARKYDwGKtPlQC/E58rCSB0lQeMhDRB5+uf5mE2YzZVXOkWsZURJ8QJmHaXAv8UxLQyUerP70y/eJmJLvD6ZLwuVocTItLv7yEAZzCWJ/uoO25EPY+5nL9XKJATkmeRYx448vthzLdU7w+8odnslnTRmJGPP/mePBvTCWPM3HnyWPkg45V+4f49fyvf6y839nLj/OVd5yjhGUUhZhYF7qMhWhLOxNPqOYx1Iz4/VIIB8CFGn5UAp5HPmFbypJ/4NYHi7yMJeHTyU3edAZESffLw8zqbz9DzhjG2E014NVPpc8yvWCD07JsxyTh2uuli85FhQp8v1GuM713aViJ98T5GDSLqJA8jbbn7CSNBt2spfrFfJAFJEQFB1yXfleSV/wLx/fke+X60oe/NeW68rx2a4hZeb3WbHlOnOJGflO4/NBpsJFrmPyJfEkX8F0yDFzjSBXP2NzPfmefPJk/EXyIPGD1/JfT/xyrrya64VhLwyFm6RZfEby5y8/f14lDjcSIIHiCFCkFcevbGfPNqhRHlDmV6u/UjS2PCjDWkGaLqOZHl4mD8Xs5aEhD1T5Cz58JSxsgg/sshVkjgsb0egXNIXmV/IhD8v5bsKgkDLwMxURZfwvyDdXPuRceaD7mUva/ecW47Nyr8i1RXAFhWKu9Mx2TNJkhJOkMZfoL5S5SZsRNTOVuxyX9AcFsxGS4s9BQSTnyHFJswjel19ps4S2HJPryZ+5J3LdF34mwsAf19jB7/afI+mQ75C0+v2qGB8tlHOu+LPVo7niR/0YeWgJu8KCIk3LLFTWTA4klWCwsjSVqlTUpXioVAqEPLxELEi6/Q9sf+VvbPOgkAeBnOPPp7mOPOCCbOR8OSafVfuBkYur5EPS5X+YmodqcC9lL3E7Xn8j16Xmdcy0gkkZGMb+/UyCwpSL4SsPZikXuZ5spkzkWv64EvZfU8pG8l7MluteMS1twlDSJt8b9A2TT4kjXCXNldzkO4VZscLSz7cStnATfxFuUnb+e9HwkzwZ36g0V5MG2efyDf/ncbPJQ0vcFRYUaVpmobJyOZA8pE0lLBWlhOOw5WIxW77l4Wf+cj1AZjvXhc8K5VGqPBlBKcJCHs7COB++4qdBEW5aXkrxAK8Wj1JxNdeZSTCL4BFBJByDvCQsx40YfeSRv7fEthFT5nxzXxgxbb47uDfx/Pu5zgleQ+ooqa8k/dXaouIbpeJHHkrSFRYUaVpmobKCDiSVsWkJqGalVw1IQRbVSEOYvtNVHvKQNw/9UvJ0lUcpGZhrhYmFlLf5USnlXo0tTDyqkf/gd5KHEnGFBUWallmorKADmV+lso/bFmQRt/wH80seNhHyUB5hYyEteSLUqlVvhY2HllR1LPJQ7q6woEjTMguV5Xcg+RVqfpEW2uUQqkzNMzF+FvO8RKROIw+7OMlDeYSNhb8HoBqtaWHjoSVVHYs8lLsrLPITaXcG0LY4+KqgpWjpG0vnOPU9Ro6+jMfraj0xsbBhOzpPXkVSecxpiQjhpgT8DmRa0eLWzWlo+FmYY3Hek4dd+uShPMLIQsbDVas1LYw8tLQqb5GHMneFRV4iLXWpG81N3fgmpRlUK4nx/las2PgGBscnAEwhceEDtCzdhK7zCY02h0WRlhuQaUWT8WhxbEXLTYVHSYAEXCHgb01jHeZKqTGdYSGQh0hL4c7Aq1i2fwB3cqX6/lfobl6DPf3fQjXcHYx0PYFl+0/idq5zchyjSMsBBfDGcggb+TXKjQRIgARcJCC9AFKPyRg1biRAAvkTyEOkTeCb7q3YcOhL3M913fE+tCx4AX3jU9anU8OdWLWyE2ftw1Ycf4AizU8jbftb0eTXKDcSIAEScJGALNUidbwsvcKNBEggfwJ5iLSbGNi/Dk++9mscbFmP+tpVaNr1Bvou3PJazqZGuvBwXQeGggPQrvViy4IX0X8zP5VGkTa90MxYNLaiTWfDIyRAAm4RMGvlyTp73EiABPIjMLdIS32N7qalaNz9O/zxcgKp5DhG+juxJTPmLDnUgfqZRFrNDhy7FlRvuRNGkWZz2bV7j/fLU8aixb0VzZUBnnYJli9EHjZb8lAeYWYhCyBLPV/JCVBh5qGlVjmLPJS1KyzyEGkJXPnia1xP6ogz4Adc7nkOi3f143oBLWlyg872J9By/SnWtJUrjjkWhbjt/8ev8B//7u88ViLWopQ3k5fgPgrlFsyTCTNv6fu6XByEs38z3HPt/fHEzhXHHHMxrqTdbCYfufYmjtnnimOOmThmb47n2ps4Zu+PI/Wa1P9St8nx4OaPG7TnGzd4nWB4vteV84LX8od53fLe81HjG8yPPzy3SPPH9tnZFrQxjknzYSnalFYz0y1QrQUgi85EiS8glR83JUAeykIs8lAeYWdh3ttaqTXTws5DS64yFnkoZ1dYzCnS7o8ewoZFL+HELf+0gSTG+3Zh8dZejE1xdqcW+/wtmZouY8/Mq5/+0/L/FPtuTkPTlZvJpLfce/KwCZOH8gg7CzPLU7o+K7GFnUclGPi/gzyUhiss5hRpSF1B385G/PjgAK55XZ5TSFzqQ9u6H6F98DpSyLFO2sUPsXs510lTd5jZkkG0puXMdAVLuOP1N2Y+KWafuHIzVapYyMMmTR7KI+wspL6Teq69vV0TXUYr7DzKmPWclyYPxeIKi7lFGoBU4hyOtjahPjOmbNobBfjGAS35PC2Zkm6a/v3izMx8csWB8sxuUdHIwsZHHuRhE9BQ2H3DLMUhPQaV2MLOoxIM/N9BHkrDFRZ5iTTNVvksESpx2aSiMt2aItREmAVncLriQJUoM7KwKZMHedgENOSCb5i6rxJvH3CBh5Ze+S3yUMausKBI0zKriOUXaNKtGRRnFUkEv4QESIAEqkTArP945syZKqWAX0sC7hCgSKtgWfkFmgygpUCrIHx+FQmQQCgImBeuc5HuUBQHExFyAhRpFSog/9Ia0oLGjQRIgATiSEBa0GR4C5cYimPpM8+FEqBIK5TYPOObJn52cc4TIE8jARKIBAEZiyYirVKTByIBjZmILQGKtAoUvXkdilRK0uWZz+bKoMZ88lJsHLKwCZIHedgENOSKb5jJA+Ue8uEKDy3B8lrkoXxdYUGRpmVWFktW1jZLbJjlNfL5IlccKJ+8FBuHLGyC5EEeNgENueIbsk6a1IvlfvOAKzy0BMtrkYfydYUFRZqWWckt+ZVo1kL7/bvvFnR9VxyooEzNMzJZ2ODIgzxsAhpyxTcqNXnAFR5aguW1yEP5usKCIk3LrOSWCDP5tShCrdBmfVccqOTQclyQLGwo5EEeNgENueIblZo84AoPLcHyWuShfF1hQZGmZVZSy9/NOZ8mfVccqKTQZrgYWdhgyIM8bAIacsU3ZGyu+QGrqS+95QqP0uc89xXJQ7m4woIiTcuspJbM4pRKqNBuTpMIVxzIpLece7Kw6ZIHedgENOSSb0j9KH/l3FziUU4O5trkYUgArrCgSNMyK5llxlvMp5vTJMIVBzLpLeeeLGy65EEeNgENueQb5ofsfHoaNMezWy7xmD0npfmUPJSjKywo0rTMSmLJ2DMzvZyvPSkJUl6EBEggggTM2pGFzHqPIAZmiQRmJUCRNiuewj80kwW4mnbh7HgGCZBAfAiYHge+Hio+Zc6cFk6AIq1wZjOeYQbDyjiLcjbhz5gAfkACJEACjhCQFjSpK2XNNG4kQAK5CVCk5eYyr6Om+V5ens6NBEiABEhgZgJmBjx7HWZmxE9IgCKtRD5gKhz5ZSjvpit2c2VQY7H5zOd8srApkQd52AQ05JJvyPhdqS/lr1ybSzzKxcB/XfJQGq6woEjTMivKKnUrmisOVBS0PE8mCxsUeZCHTUBDrvmGmWRVih+2SkEt13hoystjkYdydYUFRZqW2bytUreiSUJccaB5QyvgRLKwYZEHedgENOSab5gft+Uaw+saDy3J8ljkoVxdYUGRpmU2b8tUNPNduDbXF7viQLnSXupjZGETJQ/ysAloyDXfMDM8jx8/rpkooeUajxJmPeelyEOxuMKCIk3LbF6WaUWTZvtC38852xe64kCz5aFUn5GFTZI8yMMmoCHXfEPEmYxJK+UPXKXBHgk/C7Fd849g+ksZdoUFRVqRpW5a0Uq91o8rDlQkvrxOJwsbE3mQh01AQ675hvmRK/VoOTbXeJSDgf+a5KE0XGFBkaZlVrDlXxet1ANfXXGggqHN4wSysKGRB3nYBDTkmm9IvSktadITUY7NNR7lYOC/JnkoDVdYUKRpmRVsyXpoUsFwXbSC0fEEEiABEvAISB0qf9xIgASmE6BIm84kryP+d3SWuhUtrwQwEgmQAAlEgEAlXrQeAUzMQohAfQkAACAASURBVEwJUKTNs+DNgFe2os0TIE8jARIgAQBmXG+5luEgZBJwmQBF2jxLr7mpyWuiZ8UyT4A8jQRIgAQAb2andHeWevIV4ZJAFAhQpM2jFM2LgUWolWtzZVBjufLvvy5Z+GlwGr1Ngzz8PFy8V8xaaeUQaS7y8JdnqW3yUKKusKBI0zLL2zJjKMq1AKMkxBUHyhtaERHJwoZHHuRhE9CQi75RzmU4XOShpVl6izyUqSssKNK0zPKy/FPGS7l4bfDLXXGgYLrLESYLmyp5kIdNQEMu+gZFmpZfuS0X/aNcTFxhQZFWoAfIytgyfqJcK2Sb5LjiQCa95dyThU2XPMjDJqAhV32jXMtwuMpDS7S0FnkoT1dYUKRpmc1pVXLZDVccaE5oJYhAFjZE8iAPm4CGXPUNijQtw3JarvpHOZi4woIirYDSNxMGZExauTdXHKjcHOT6ZGFTJg/ysAloyFXfKNcyHK7y0BItrUUeytMVFhRpWmZzWqYiEbFW7s0VByo3B7k+WdiUyYM8bAIactU32tvby7Kkkas8tERLa5GH8nSFReEibXIEh5tWYkvvFc1t6nuMHH0Zj9fVejfawobt6Dx5FUmNMaclzd1h3syEAUlnOScMhJkB00YCJEAC5SBQzmU4ypFeXpMEKkWgQJF2D5d7duCBmjqfSEtivL8VKza+gcHxCQBTSFz4AC1LN6HrfCLvfIRdpJkJA3zDQN5FyogkQAIkkBcBM5Sk3BOy8koMI5FAiAgUJNJS4x/jZ2t2YN9PG1Wk3f8K3c1rsKf/W6SyGbuDka4nsGz/SdzOHpvdCLtIe7ChoSzN8bNT4ackQAIkEH0C5VyGI/r0mMMoE8hfpKXGMdDWjG09ZzDY8ZiKtPE+tCx4AX3jUxanqeFOrFrZibP2YSuOPxBmkXbmzBlPoJXzDQN+FrRJgARIIE4EzHAS1rFxKnXmNR8CeYq0FO4Ov4UNzYcxOpnAkE+kTY104eG6DgwFB6Bd68WWBS+i/2Z+Ki3MIk26OCV9lWyKd2VQYz5OVmwcsrAJkgd52AQ05LJvSB1b6ueAyzy0VEtnkYeydIVFfiJNJgs0b0Ln8C0AtkhLDnWgfiaRVrMDx64F1ZtC8lulvjn91y7WNl2dV69eLfZSeZ/vigPlnaEiIpKFDY88yMMmoCGXfcPUs9KqVqrNZR6lYuC/DnkoDVdY5CHSJjHW9yLWt32Gm96gM1ukFdKSZn4pzbQXaLn+FGvayhXHHCt13F279+Ts6jTfl2tf6jSY7+B10/5BDuRg7gmz9/uEOZZr748ndq445piLcSXtZjP5yLU3ccw+VxxzzMQxe3M8197EMftcccwxE8fsH3nk77269uVX2qaVi4lj9uYaufYmjuxzfe4/5o87V3zGZb1TLt8J+pY/PKdIS938BK2rf4a+scnMebZIQ8THpJn1eyrZ1SmgxRm4pQmQhe0J5EEeNgENuewbpq6VMcCl2lzmUSoG/uuQh9JwhcWcIs2bAJAZKzCtBUwmBkxGd3anrIdm8lzJrk5xI1ccSF2+fBZZ2GzJgzxsAhpy2TfKsVaayzy0VEtnkYeydIXFnCJNs2SsQEsacqyTdvFD7F7u/jppZu2eSrwGytA1e1ccyKS3nHuysOmSB3nYBDTksm9QpGk5lsty2T9KzcQVFiUQaQAi+sYBM6vz+PHjpfaPOa/nigPNmZESRCALGyJ5kIdNQEMu+0Y51kpzmYeWauks8lCWrrCYh0jTTJbSkm7FsG3lmG0UtjwyPSRAAiQQBgLlEGlhyBfTQALFEKBIm4GeWcC2Gl2dMySJh0mABEggsgTMgrby45gbCZBAmgBF2gyeUM2uzhmSxMMkQAIkEGkCZqJWpDPJzJFAAQQo0maAxa7OGcDwMAmQAAmUiYCpd2VmPTcSIAGAIi2HF5ixEdXs6nRlUGMOfCU/RBY2UvIgD5uAhlz3jb1793rLHkkdXIrNdR6lYOC/BnkoDVdYUKRpmWUtWbhWmt0rvYBtNgFcJ82PgmvGWTS4hl4AB/3DB8SVB48vyZZJkWbhKHnAdf8oJRBXWFCk5Sj15qYmT6RVegFbf1JccSB/mstlk4VNljzIwyagIdd9w/xALtWyR67z0JItjUUeytEVFhRpWmaeJcJMWtGqPcPIFQcK4CtLkCxsrORBHjYBDbnuG6Ve0NZ1HlqypbHIQzm6woIiTcvMs+QXnIg0md1Zzc0VB6oEI7KwKZMHedgENOS6b5jxwKWqf13noSVbGos8lKMrLCjStMw8SyYLiEiTV0JVc3PFgSrBiCxsyuRBHjYBDbnuG0akydi0Umyu8ygFA/81yENpuMKCIk3LDGYxRRFp1Z4C7ooD+fCVzSQLGy15kIdNQEOu+4apg0s13MR1HlqypbHIQzm6woIiTcvMaz0TgVbNpTd8yaFJAiRAArEjIHWw/HEjARLgOmmWD/AtAxYOBkiABEig4gQo0iqOnF8YYgJsSfMVjlntWprcuZEACZAACVSeQKnXSqt8DviNJFA6AhRpGZZm6Q1ZI40bCZAACZBAdQhQpFWHO781nAQo0jLlEpalN4ybuDKo0aS3nHuysOmSB3nYBDQUBd9ob2/3xqSdOXNGMzZPKwo85pn1nKeRh2JxhQVFWqbMzK+3ai+9YVzIFQcy6S3nnixsuuRBHjYBDUXBN0q5oG0UeGjpFm+RhzJ0hQVFGuAtt2EGq1Z76Q3jQq44kElvOfdkYdMlD/KwCWgoCr5BkablWWorCv5RKiausKBIAyDN6iLSSrWAYimcyBUHKkVe57oGWdiEyIM8bAIaioJvSG+G1MeleOtAFHho6RZvkYcydIUFRRqAUr/UV91g/pYrDjT/HOZ/JlnYrMiDPGwCGoqCb5TyrQNR4KGlW7xFHsrQFRYUaYC3eK38cpMZnmHZXHGgSvAiC5syeZCHTUBDUfANijQtz1JbUfCPUjFxhUXsRVqpX0MSNwcqVX5nu44rN9NseSjlZ+Rh0yQP5REFFqWsk6PAQ0u3eIs8lKErLGIv0sz4B5n2zY0ESIAESKD6BMxEruqnhCkggeoSiL1I46ugquuA/HYSIAESCBKgSAsSYTiuBGIv0syroMI0Hi2uzsh8kwAJkIAQeH77dm+GJ+tl+kPcCcRapJlXQYlQ40YCJEACJBAOAmZxcZlEwI0E4kwg1iLNvAoqjOPRXBnUWImbhyxsyuRBHjYBDUXFN0ol0qLCQ0u4OIs8lJ8rLGIt0sw74kSshW1zxYEqwY0sbMrkQR42AQ1FxTdK9daBqPDQEi7OIg/l5wqLWIu05qYmb9yDTPkO2+aKA1WCG1nYlMmDPGwCGoqKb1CkaZmW0oqKf5SCiSssYivSzHg0EWph3FxxoEqwIwubMnmQh01AQ1HxDfOqPhFrxWxR4VEMA/+55KE0XGERW5FmxqOV4v1wWuyls1xxoNLleOYrkYXNhjzIwyagoaj4RqneOhAVHlrCxVnkofxcYRFbkRbm8WjiRq44kLp8+SyysNmSB3nYBDQUFd8wPR0ygaCYLSo8imHgP5c8lIYrLGIr0sK+PporDqQuXz6LLGy25EEeNgENRck3ZEFbWS+tmC1KPIrhYM4lD0PCnYaQWIo08yuN66Opw9IiARIggTAR4FsHwlQaTEu1COQn0pJXcbJzOx6srfFmQy5c9QwOfPQlEqlMslPfY+Toy3i8rjb9ecN2dJ68imQBuZIbslKbeV9nsU3plUovv4cESIAE4kbA9HbELd/MLwn4CeQh0hI43/U0Vu/7CJcSUwBSSI59jNaGx3Bw6BaAJMb7W7Fi4xsYHJ8AMIXEhQ/QsnQTus4n/N81q11JkWbe11nszKFZM8QPSYAESIAE5k3ALGgrPR/cSCCuBOYWaROncXDFUzg8es/H6BY+P/AwVnUOY+r+V+huXoM9/d/CNKwBdzDS9QSW7T+J276zZjMrKdLMe+H4ypHZSoSfkQAJkED1CBiRxnq6emXAb64+gblFWmIYR17/EGcT932pvYmB/Y9iZ9/fkBrvQ8uCF9A3Lq1suk0Nd2LVyk6ctQ9rhIBVKZF29+5dr0u2Ut8XyGbeQQ7wVFRkoSzEIg/ysAloKEq+YXo8ihFpUeKhpTx/izyUnSss5hZpmqeMNYXEud9hz8/+GaP3Upga6cLDdR0YCg5Au9aLLQteRP/N/FRapURTqdbfmYalxAdccaASZzvn5cjCxkIe5GET0FCUfKMUbx2IEg8t5flb5KHsXGFRgEibwnjfC1hYI5MHFuHBre/g9M0pJIc6UD+TSKvZgWPXgupNIfmtSom0Utz4/nSXy3bFgcqVf/91ycJPgy1pNg3y8POI0r1Siro6Sjz85TxfmzyUnCssChBpJnMTuH6+F22NS7wxZ98V0JImQmy2P4GW6898s9nnimOOmThmb46b/SOP/L2XhpdfaTNRsnsTJ9c+Gylj5IpjjjFuuhzJgRzMPSH74Ob/LGgXEjd47eC1/OFCrutiXD8Lf76Dtgt527V7j1dXP/Hkj4PJzfmcMHn0RzbHZtr744o9Uzw5HtwYN02EHIrnEPQtf3hOkTY1+hEOvDOIcZ0V4M3wvDPwKpbImLNrbo1JMyJRxqaFectVKYQ5veVMG1nYdMmDPGwCGoqSb5RiaEqUeGgpz98iD2XnCos5RVrqUjeaF72EE7f8EwdS8ERaUze+mXJndqe56cP6UnV1H3bhkIWfgG27UrnYqS5fiDyUbZRYmPq6mPUso8RDS3n+FnkoO1dYzCnSkLqCvp2N2PTmIMaT0pyWQnJ8EG8+1Yif9F2R0PR10i5+iN3Lw7dOWthfqq7uQ5FGFn4Ctu1K5WKnunwh8lC2UWJhZuIX86M6Sjy0lOdvkYeyc4XF3CJNZFniHI62NqE+M6bM1TcOmCndIta4kQAJkAAJhJuAGZ4S7lQydSRQPgJ5ibTyfb1eWW7Gcm/yi0y+hytYl5s0r08CJEACxROgSCueIa/gNoHYiDTTdM6XqrvtsEw9CZBAfAiYt8Pwh3V8ypw5tQnERqSVYhCqjY4hEiABEiCBchLgq6HKSZfXdoFAbERaKRZGrGSBujKosRJMyMKmTB7kYRPQUNR8o1iRFjUeWtLzs8hDubnCIjYizdzsZ86c0VIKseWKA1UCIVnYlMmDPGwCGoqabxT74zpqPLSk52eRh3JzhUVsRJqMRZNBqDdu3NBSCrHligNVAiFZ2JTJgzxsAhqKmm9QpGnZlsKKmn8Uw8QVFrEQaTLoVASaS5MGXHGgYm6SfM8lC5sUeZCHTUBDUfONU6dOeXX37999VzNZgBU1HgVkPWdU8lAsrrCIhUgzN3oxK1dr0VbGcsWBKkGDLGzK5EEeNgENRc03ip3wFTUeWtLzs8hDubnCIhYirdgmcy3WylmuOFAliJCFTZk8yMMmoKGo+YbpBZnvD+yo8dCSnp9FHsrNFRaxEGmuTRoQN3LFgdTly2eRhc2WPMjDJqChKPqGDFWZ76uhoshDS7twizyUmSssYiHSzKQBLoioDkqLBEiABFwgwLcOuFBKTGO5CERepMlsTtcmDZSrsHldEiABEnCNgHnrgLw1hhsJxI1A5EWarIsmIm2+Yxri5hDMLwmQAAmEiYAZriKTCLiRQNwIRF6kuThpIG5OyPySAAmQwEwEKNJmIsPjcSAQeZHm6g3uyqDGStwkZGFTJg/ysAloKIq+UcwP7Sjy0NIu3CIPZeYKi8iLNDNpwLXxDK44kLp8+SyysNmSB3nYBDQURd+gSNPyLdaKon/Ml4krLCIt0sykgflO355v4ZfiPFccqBR5nesaZGETIg/ysAloKIq+cfz48Xm/dSCKPLS0C7fIQ5m5wiLSIs3lSQOuOJC6fPkssrDZkgd52AQ0FEXfKOatA1HkoaVduEUeyswVFpEWacU0k2tRVsdyxYEqQYcsbMrkQR42AQ1F0Tco0rR8i7Wi6B/zZeIKi0iLNDNpQFrUXNtccaBKcCULmzJ5kIdNQENR9A0ZTzzftS6jyENLu3CLPJSZKywiLdLMpAEZm+ba5ooDVYIrWdiUyYM8bAIaiqpvzPetA1HloSVemEUeyssVFpEVacX8+tJipEUCJEACJFBtAuYHt2uz9KvNjd/vPoHIirRixjG4X6zMAQmQAAlEh4AZusK3DkSnTJmT/AhEVqS5PGkgv6JjLBIgARKIBwGKtHiUM3M5nUBkRVp7e7s32NTFSQPTi4lHSIAESCC+BH7/7rtefS5rpnEjgTgRiKxIkwVsZbCpi5MGxAFdGdRYiZuFLGzK5EEeNgENRdU35tszElUeWuKFWeShvFxhEUmRZiYNiEhzdXPFgSrBlyxsyuRBHjYBDUXVN06dOuX96JYWtUK2qPIohIE/LnkoDVdYRFKkRWHSgCsOpC5fPossbLbkQR42AQ1F1TfmW6dHlYeWeGEWeSgvV1hEUqSZpvFfv/WWlohjlisOVAmsZGFTJg/ysAloKKq+Yd7DLBMICtmiyqMQBv645KE0XGERSZEm4ky6Ol0eZOqKA6nLl88iC5steZCHTUBDUfYNqdNlvbRCtijzKISDiUsehoQ7474jKdKe377dE2kur6nDm8m9m0lTXF6LvmHzJQ/lEWUWZkFbze3cVpR5zJ376THIQ5m4wiKSIk1+ccmfy6tTu+JA6vLls8jCZkse5GET0FCUfcOslVbIjP0o89BSz98iD2XlCovIibSrV696Ak2W4OBGAiRAAiQQDQJGpLncQxKNkmAuKkkgciLNTNWWxWy5kQAJkAAJRIOAWdCWC5RHozyZi/wI5CfSkldxsnM7HqxNdyPW1jWh9eg5JFKZL0l9j5GjL+PxulqvFWthw3Z0nryKZH5p8GJJ92QpNnMjywxPbiRAAiRAAtEgYGbts26PRnkyF/kRyEOk3cHooWewbOvvcD4xBWAKiUsfYV/Dw2g98e9IIYnx/las2PgGBscn0p9f+AAtSzeh63wiv1QAnrjLO/IsEU2TOH9tzQKJH5EACZCAYwRktr78mKdIc6zgmNyiCMwt0qaG0blyIzqH/YJrAt90P4PF+07g1v2v0N28Bnv6v4VpWAPuYKTrCSzbfxK380xeqVrS5DryV8jg0jyTWNForgxqrAQUsrApkwd52AQ0FGXfmM+CtlHmoaWev0UeysoVFnOLtPE+tCx4AX3j0opmtklc6dmGB3b142bOz4Gp4U6sWtmJs/7TzOk59qUQaWbBw0LX0smRnKofcsWBKgGKLGzK5EEeNgENRdk3KNK0nOdrRdk/CmXiCou5RVqunCcv4sjWNXiu969IjnTh4boODAUHoF3rxZYFL6L/Zn4qrRQibT43ca7sheGYKw5UCVZkYVMmD/KwCWgoyr5h3slcyI/wKPPQUs/fIg9l5QqLwkVa8io+aXsMy7a+h9F7KSSHOlA/k0ir2YFj14LqTSH5rVKINDOwtNCX8PrTERbbFQeqBC+ysCmTB3nYBDQUdd+Q50Qhz4qo89CSz88iD+XkCosCRFoKybH/iYNPPYTG3T0Y8SYRAFMFtKSZG2ymvUDL9adY01auOHLsiSd/7N3A/tdBzRRXjgc3xp2dL5mpf9J30izCwCHol3G+j/0sosjBvHWg4/U3cj4r/PkX35yNQTDuXPHD4OtMQ3jqnVKWRfBa/nCeIm0CYyd+iab6R9Ha+6UuvSFXCtGYtCi8DsoUTq4KxHwWtz1Z2CVOHuRhE9BQ1H3DzN7Pd0HbqPPQks/PIg/l5AqLPERaEuMn27F+3cs4duGWbwZnJrMhmt1pWuhcfh2UcSFXHMikt5x7srDpkgd52AQ0FHXfoEjTsp6PFXX/KISJKyzmFmm3T6JtaTM6h2daTCPHOmkXP8Tu5ZVdJ42vgyrEPRmXBEiABNwjYBYr9w9pcS8XTDEJ5E9gTpHmTQzIDNY0LVVmv3BHH8blu0LwxgFZvFbSxddB5V/4jEkCJEACLhEwk8O4oK1Lpca0FkNgTpFWzMULOVcEVjEbb95i6PFcEiABEgg/AfPWgSjM4A8/baYwDAQiI9KkBU2EHl8HFQa3YhpIgARIoPQEorQWZunp8IpRJBAZkWZmdrr+OijjZK4MajTpLeeeLGy65EEeNgENRd03ChVpUeehJZ+fRR7KyRUWkRFpZpycFoHblisOVAnKZGFTJg/ysAloKA6+IXV9vm8diAMPLf25LfJQRq6wiIRIK/TXlRZTeC1XHKgSBMnCpkwe5GET0FAcfMMsaKu5ntmKA4+Zcz/9E/JQJq6wiIRIM4NJf/3WW1oCjluuOFAlMJOFTZk8yMMmoKE4+IZZKy2foS1x4KGlP7dFHsrIFRaREGlm7ZwoTct2xYHU5ctnkYXNljzIwyagoTj4hhFp+bx1IA48tPTntshDGbnCIhIirZCbVoso3JYrDlQJimRhUyYP8rAJaCgOvmF+lOezoG0ceGjpz22RhzJyhUUkRJoZoyBvHYjK5ooDVYI3WdiUyYM8bAIaioNvFLImZhx4aOnPbZGHMnKFhfMiTd7TGbWZnepGtEiABEiABPwETp065dX5URqD7M8fbRLwE3BepJmZnbJOGjcSIAESIIFoEzB1vgxz4UYCUSfgvEgzMzv5zs6ouyrzRwIkQAKADGuR3hP+MKc3xIGA8yLNDCKN0szOODge80gCJEAC8yXAIS7zJcfzXCPgvEiL4sxOcSJXBjVWwuHJwqZMHuRhE9BQXHwjX5EWFx7qAbNb5KF8XGHhvEgzN2s+Cxtq8YTfcsWBKkGSLGzK5EEeNgENxcU38v1xHhce6gGzW+ShfFxh4bRIE2EmIi3f97hp8YTfcsWBKkGSLGzK5EEeNgENxcU3KNK0zAux4uIf+TBxhYXTIi3Ks3xccaB8boZi45CFTZA8yMMmoKG4+IYZizzXgrZx4aEeMLtFHsrHFRZOizSzqKHcsFHbXHGgSnAnC5syeZCHTUBDcfENU/fPNWEsLjzUA2a3yEP5uMLCaZEmixlKd+dcN6oWizuWKw5UCaJkYVMmD/KwCWgoLr6R74K2ceGhHjC7RR7KxxUWTou0fMclaLG4Y7niQJUgShY2ZfIgD5uAhuLiG/kOdYkLD/WA2S3yUD6usHBapJl3dkZtZqe6ES0SIAESIIEgAbOgbXNTU/AjhkkgUgScFWl8Z2ek/JCZIQESIIGCCJjllwo6iZFJwDECzoq0fJu7HSsPJpcESIAESCAPAtKKJkKNPSl5wGIUZwk4K9LMOztl8gA3EiABEiCBeBGI8pjkeJUkczsbAWdFWr5TsGfLfJg/c2VQYyUYkoVNmTzIwyagoTj5Rj7PgDjxUC+Y2SIPZeMKC2dFWtR/RbniQOry5bPIwmZLHuRhE9BQnHzDiLTZ1smMEw/1gpkt8lA2rrBwVqSZ8QgygSCKmysOVAn2ZGFTJg/ysAloKE6+kc+45DjxUC+Y2SIPZeMKC2dFWtRn9rjiQOry5bPIwmZLHuRhE9BQnHwjn2U44sRDvWBmizyUjSssnBRp+fyC0qJw03LFgSpBlyxsyuRBHjYBDcXNN+b6sR43HuoJuS3yUC6usHBSpMVhZqcrDqQuXz6LLGy25EEeNgENxc03zLAXaVXLtcWNRy4G/mPkoTRcYeGkSDMDRmUf1c0VB6oEf7KwKZMHedgENBQ335hrAlnceKgn5LbIQ7m4wsJJkWZuzDNnzihxWiRAAiRAArEiIDM7pcszyj/YY1WgzOw0Ak6KtOe3b/duTBmbxo0ESIAESCCeBEyvChc1j2f5xyHXToq0uQaLxqHgmEcSIAESiDuBOEwii3sZxz3/BYq0SVzp2Yb6jiEk/eRS32Pk6Mt4vK7Wa+Fa2LAdnSev2nH88XPYIrzy2eQ9bRL3wYaGfKIzDgmQAAmQQEQJmOdBvs+PiGJgtiJMoDCRlvoW/btXBkRaEuP9rVix8Q0Mjk8AmELiwgdoWboJXecTeaPL9yaLyy8nVwY15l3ARUQkCxseeZCHTUBDcfQNM8Mz14vW48hDvWG6RR7KxBUWeYu0VOKv+Py/v4RHamtskXb/K3Q3r8Ge/m+Ryub/Dka6nsCy/SdxO3tsdiNfkXbq1CmvJS3qYxBccaDZS7U0n5KFzZE8yMMmoKE4+kZ7e7v3TJBnQ3CLI48gA3+YPJSGKyzyEmlToz346ebN2LL5aTy+apEt0sb70LLgBfSNT2nupT1tuBOrVnbirH3YiuMP5CvSzEDRqM/mccWB/GVYLpssbLLkQR42AQ3F0TfMMyHXD/c48lBvmG6RhzJxhUVeIk2zlcBQx1pLpE2NdOHhug4MWYPUAFzrxZYFL6L/Zn4qLV+RFpflN1xxIPWN8llkYbMlD/KwCWgojr4x2+uh4shDvWG6RR7KxBUWRYu05FAH6mcSaTU7cOxaUL0pJL+Vr0gzy2/MtMK0/5ou2644UCUYk4VNmTzIwyagobj6hhmXFnwuxJWHeoRtkYfycIVF0SKtkJY0EWKz/Qm0XH+KFdnzc8XLBX2meIyrrP18xSazNBFycIND8F6Oc7n5WcSJwxNP/th7Nuz8yX+2qrPZGPhZmZNmi2/imD3jpkmQQ/EcjE/l2hct0lDBMWmzNWvnypzLx3JVIC7np5i0k4VNjzzIwyagobj6hplQJi1q/i2uPPwM/DZ5KA1XWBQv0io4u1NeAyUtcTIujRsJkAAJkAAJCIG7d+9me1mCXZ4kRAIuEyhepCHHOmkXP8Tu5aVfJ83M4on6zE6XHYppJwESIIFqEJDZnfIjXt7nyY0EokKgBCINQIXeOGBuwuPHj0eFP/NBAiRAAiRQAgJmoXO+jaYEMHmJ0BAoUKSVL93yC2iuzSy/wRerz0WKn5MACZBA/AiYWZ65FraNHw3mOAoEnBJp8gtJxFyu139EoTD8eXBlUKM/zeWyycImSx7kYRPQUNx9Q3pZ5BkhSzXJFnce6hlpizyUiCssnBJpcvPl0+KmxeCu5YoDVYIwMsRnDAAAGlRJREFUWdiUyYM8bAIairtvyAQC82NeelzizkM9I22RhxJxhYUzIs2MNzC/kBR1NC1XHKgS9MnCpkwe5GET0BB9AzATzGR4DHmob4hFHsrDFRbOiDSzDo68TDcOmysOVImyIAubMnmQh01AQ/SN9HIcpjVt1+49CocWRZrPB1y5V5wRaebXUVyW33DFgXw+XzaTLGy05EEeNgEN0TfSLMyP+v/4d38XizHM6gGzW/QP5eMKC2dEmrSgyXi0uMzaccWB1OXLZ5GFzZY8yMMmoCH6hrIwqwHIXsaqmU0mnsnwmXz/ojRRjf5hvMCdrl9nRFpcXqxuXIg3kyHhzs2kKS6vRd+w+ZKH8iALZSHiSlrS5Me9dH+KWDNLdJhJaPPZyzXkWsG/+VyL58z+Pu9y85G1V8O+OSPSTGGFHSjTRwIkQAIkEA4C8oooEVPm+WH2QYE1W7gUws58L/fVFWVB/i5MRHRCpJkXq7sANBxVE1NBAiRAAiRgCMgzRLo3S/FeT+k69XeVluKaJp3ck0CQgBMizQwCjcvMzmAhMUwCJEACJEACJBA/Ak6ItLjN7IyfGzLHJEACJEACJEACQQJOiDQzpuDMmTPB9Ec2zAHAWrRkoSzEIg/ysAloiL6hLMQiD/KwCWjIFd9wQqSZgZtx6vt3xYHU5ctnkYXNljzIwyagIfqGshCLPMjDJqAhV3wj9CJNBmmaGRmKN/qWKw5UiZIgC5syeZCHTUBD9A1lIRZ5kIdNQEOu+EboRZrMohGRFreZna44kLp8+SyysNmSB3nYBDRE31AWYpEHedgENOSKb4RepB0/ftwTaS4sOqfFX7zligMVn9O5r0AWNiPyIA+bgIboG8qCFglEgUDoRZqIM2lJE7EWp42VrZY2WSgLsciDPGwCGqJvKAtaJBAFAqEXaeZ1UNLtGaeNla2WNlkoC7HIgzxsAhqibygLWiQQBQKhF2nSiibvXeNGAiRAAiQQbQJTw51YVTPTq4PqsKX3yuwAkkM4WLcWB4cSAP43vhn4fzFw6X/Pfk5ZPk1gqGMt6juGkCzm+lZ+irlQIeemMDnyNtbX1OHpnktI+U5NDnWgvq4DQ0VlynfB0JklKrcS5ivUIs1MGpB10riRAAmQAAnEkcAExvr2YsW6N3D69tTsAO5fxolfH8KJKxMAruDY5lVzC7vZrzjPT0v0sK+KSLuFoY6NWLN2NRavP4TR+4og+iJtAldOHMJvTlyGL9sKoApWqEUa3zRQBY/gV5IACZBAaAikMHmpB88t3YSu89I6VshGkVYIrWzcO4M4sPwpHP5zH/Ytegydw8o9+iItSyE0RqhFWlzHo4XGO5gQEiABEqgmgXvncfiptXiu5ytMZtMxhcT5D7CnsT69hmbdj/DqR18iIf1ypuXpD++hpdbXbbqyE2eDjXBe3Iewt+sdtD62NH2t2jXY2f1F+loAUolzONrahPpMF+zChhfQff77TBdgCslrg/jtPvN5LeofexlHR+TzdEta3d7f4P3s+YvwYMt7OJ8IJsRkbAJjJ9/CtoZFmXw9gfb+oziQ7b6V9HyB93dvyKRnKZraPsKodz35vsew+dBH+rmXlzMYO/cedmauaafffK9/P4Ub/XuxpLkbl+5fx4l9D2F1x2nczURJi7Q29Pb/Ek11tV46FzZsR+fJq9luXZtZkImk8Tj+x4EnMnlYhAe3voWTY9LyKcXXgfrN7+H0yTewqb4WtZsP4di0buMkrvXuQO3mXlzLh3PyKk52bseDnj/I972O3//qqcz5/ryL7WsBzcM/7LOnkBg5qr5UsxSPtx7FyIzlbZ89Uyi0Is2/iK3Ycds4AFhLnCyUhVjkQR42AQ1FyjdSN3H6YDNW7O7DWNKMjEohebkXO5c/izdPf4skUkiO/StebXwUrw6MI2VEmjcmbY6WNC9uDRZufAOD4yISppC48C62LHoW3ZckfAMD+9ej6c2hjGibwu3BX2L16jdx9ocUcO8sujauwba3/4xxL30TGOt/BQ8+9DqG7t72xqTV1j6Bg4OSzrTg++3mBvxD91c5utJSuDv8FtYv34OjF297IjCVOI/3WxpQW5MZY5e8hGMtjdj05mD6+5JX8UnbRqxu+ww3U2lxod8nXPqwZ2ktah/6JT73uomncPPEK1i2pgsjM+nE1N/Q17I6MxbtPm6deAmLl/8Cn99J8/dEVE0tlrV8gAue+JhC4uKH2L38R+gcvgXgO3x+YB1Wt/8Jt71TMl3VnuiTNDairu5RtH40mmaauo2LR/dgxbq3MHw3lRZpK1ZhdfMv8PEl4eATTVk3ny7SNN9Bzgmc79qEFbs+xEUvvRMYH3wDTSLYPJGXvWjG8H3fnP4RONdrgdyA9sEbaRGf/Cv6djfOUN6Bc2cJhlakyXs647iIrSmrSFW2JlPz3JOFDY48yMMmoKHo+MYUbg68hgcb2nBi3D9KPYGznU1W646IK6/1Z2svxgoWacuxs+9vOjg+9RcceaoBLX1jwP2/oP+//lNmfFuacepKDzbV7MCxaz/g9sDPsWzd2xiZNAIS3jl9L72CI6PXPZH2QEsfxrMfT+JKzzYs3NGHcS2yjCWtVmvQ3P21pkUuN3oIGzIi7YfhN7HGE4DZCyJ1ox97Frfg2Nh3Ob5PROpybDj0pYrCa73Y4qXfz1QTk7rcg6cXPIcjl39IH7x9Em1LG7DvxHUvnBZpz2RErDlvAt90P4PF+07gFr5F/64GPHLwz9nWSCSGceT1D3E2IWPd1mLhph5c1iwAqa/R3bTG+4709X+ErpE7mYv7RJP5OkwXaTNyvnUC+xY9icOj97JnA8J6VZ4ibRb/8F3RM2/2Y/eCjTg4dDNThveRGP4Qr/cMQzuMgyfNHQ6tSDPro/3+3XfnzkUEY0Snsi2+cMjCZkge5GET0FA0fCPTCrS8GQdPmwdeJo/eA30t2gZuaqallUrE0+JXMXDrtG92Zz4taWYmqLlc4JzkOEY+7cXhzl+ibdc2/HitdLGKSLuFs50bZpm9OZe4MN+X2U8No3NlY2ZWqu+zrOi84QmhJfsHYOSLF8sTlY1oG/irJ4Ds2aSBvMgJs4q0exg99GRAREnL2FoYEeSJqByzO73jXpdyCvdG/xl71i5B/drN2NdxCMc+HcF1r6UxFxNJlBxvxKrOYUxMmz2a65zpIs3Ot35+RWYLT0uvfn7Nhzpt+r4vy94vsXIwzV4jgdHefWisrUfj5n04eKgXn46MZ7uBs9EKNEIr0uL4UnV/2UWjsvXnaP42WdjsyIM8bAIaioRveN16D/u6GTV/6TFnvrFm/uU6al9A39jnpRNpk1/hyLbVaGx5He9/PICh0etIZkVOpUXaNU+ESe/S9L+laOm7ULxI++EMOlcvyHH9GtQu2IljY5Pp7shpoiczlswa9zeB6xf+hI/f+zXaNq/GA42/wuDN73OkUco2KiIt46fJ6xgd+H/w/n/bjy0N9Xik/Y+46W859LlzPmYoRdrVq1c9RxGhFtctEpVtiQqPLGyQ5EEeNgENue8bCVw4tBUrtvXgkr8b0WQxdQlHNq3Ndr9lDydG8em/fI4rd0vXkjY10oWHl7Tj8wl9wqa7H2fr7vwSh9dvROfwtzkEyWwtOHN1d97A5Z7nsMTrUjS5libEWxj99GN8fiXdvWq3KOVo9cmKzGB3Zwp3Bn+BFYtewolbgcUnJs+ha91yb5zapLR01czS3XlnCF3bO+wuaq/18yHs7v86LTSbuvGNIp3e3WmJwDs5WizTrXv+iQN2vn2cvS7IYro752hpzRZFCneG3sHz7Sd83dtA6lI3mhe8iP6bMw0CzF5gRiOUIs0svRG393X6S8n9ytafm+JssrD5kQd52AQ05LZvTOH26TewfukuHLvsH0Ok+QMmMda3B8uyg/1lSqBvAL3VRSUiZSU29fzFGueVvZoV1xxVYeONz1r0LN4+l57N6Q3k39WI+loRacnpEwfMIPimwxid9HWbmUtbY6myBzPGDBMHdq5F/ZJ0N2hq7A/4ydInsxMRgAmMffIaHnnoNQzkbKXSvGS/bUaRJpMkHsaKA4N2d6p34g+eQFy4/hBG/iwibZaJA6m/4ti21Tq5wZvY8TFaH3oKXefTwrW2pgE73zs/88QBS6TdT4/9801+SJw7hC1Ll2Chb3bnjCINtzDc+SOsyE50yDDLe+JAviINSI314rnFz2QmtAi49ESS1evfxnmZaDLPLZQizSy9IZMH4rq5XdmWttTIwuZJHuRhE9CQ274xhr4dmaUwcnbr1XrjlqZS32Pk6Mt4PLMERG2NbykKS3hN4HLvT7FUrmV1xWV4WXENQ7+wkTFGr2S/Z2HDTnT98RMcal6SuV5wCQ7/chKFijT5/hxLcJwYQM/mxzJj1YJLPNSifuPP8dGFWzPMgvTnJZO/GURaarwPOxfYa6IZIrI3nx/s3If6Z9/BJx/9fIYlOITJKXTtWIOFmTJcuOoZHPCWSMkwee0o+ttnWYLDEmlpEX7CH3/HOzjZ24b6vERa+nxrCY6Ww/j40LY8Jw7kL9Kk/K4NvoMWs4RKzSI0PNWeKR8/zcLs0Ik009XJV0EVVpCMTQIkQAIkQALhJZBLuJY5tTI+7P/7KjNxwXxXeoLEtEkY5uOQ7UMn0syszjh3dYbMR5gcEiABEiABEiiSQBVE2v2v0N3ciN1HL2SWBJGZwx+jtWEDDgzaM4SLzFzZTg+dSJMWNJm9Ii1q3EiABEiABEiABKJAoAoizRsT9xk6t67Odr/W1jWh9eg5Xcct5GhDJdLMArZxntUZcn9h8kiABEiABEiABCpEoAQiLTCYsXY1tnV+5nuNR345kdYz09UZ1wVs/aTcHgDsz0nxNlnYDMmDPGwCGqJvKAuxyIM8bAIacsU3ihZpqfGP8bPlOi04lRjB+zseRlPXWcw0iVoxqSUijV2dysMVB9IUl88iC5steZCHTUBD9A1lIRZ5kIdNQEPV8I3jx4+j0HeRFynSJnCp+1ks2d2PG9llQFKYHHkb65f+HAO3A4viKZ9plllFmV2daTTVcKBphRKSA2RhFwR5kIdNQEP0DWUhFnmQh01AQ5X2jdHRUW+8vSwxVohQK1Kkybo2a9Ivo9W8A957yB5F57D1ljF/jGm2EWmiNLmxcvH7QKVvJv93h9EmD7tUyEN5kIWyEIs8yMMmoKFq+MapU6cKFmrFibSpc+has276S2Ehi+itwe7+b5XILJaoSiPSClGYs1zS+Y+q4UBhhUYWdsmQB3nYBDRE31AWYpEHedgENFQt3/ALtXxWsShOpOVcsVkg5FjpWNlMs0yi9+7dO+2zuB6olgOFkTdZ2KVCHspDftyRh/IgC2UhFnmQh01AQ9X0Den6lDH48jeXUCtOpBXYkmZay7ivybYckgVZ0AfoA/QB+gB9IJ4+MNc4/OJEGkozJs10d6rGrZ4lN0oYtjCkIwxpkLJgOmyPJA/lQRbKgveKzYI8yGM6AT1SzbpDWs8q05KG0s7uVHzVs6pZcP5chyEdYUiDMGE6/J5BHn4a9A0/DfqGTYM8yCNIQMPVqjvM8K58ujoltUW2pAHT10m7gKO7Gue1Tpriq55VrYIL5jgM6QhDGoQL02F7B3koD7JQFrxXbBbkQR7TCeiRatQdRqAVsgxH0SINKN0bBxRf9axqFFyu3IYhHWFIg7BhOmwPIQ/lQRbKgveKzYI8yGM6AT1S6bqjSuukaYaLtSoNrNj0lvt88lDCZKEsxCIP5UEWyoK+YbMgD/KYTkCPVKPuONbbW9BCtpLaErSkaaaLsaoBrJj0lvtc8lDCZKEsxCIP5UEWyoK+YbMgD/KYTkCPuFJ3UKRpmYXKcsWBKgGNLGzK5GHzYEgJ0DeUhVjkQR42AQ254huhEWmKjhYJkAAJkAAJkAAJkABFGn2ABEiABEiABEiABEJIgCIthIXCJJEACZAACZAACZBAdUVa6nuMHH0Zj9fVemMHFjZsR+fJq0jGrVxSf8GRpx6d9qL6VOIcjrY2ob5GXpexCA9ufQsnxyYiSmcCYyffwraGRZ4v1NYsxeOtRzGSmMrktzRLvbgDL8CjtgGbDvwLRmPLw1dykyM43LQSW3qv6MFY1SUp3Bl4FUu8esH3Kp3aF9A3nr5f4lV3pJAc+wydW1djoakrW97D+TjeK+N9aKn1+YTPRxbu6MO43DGxulemkLjwLzjwVEPWNxqeasdHF24hlak9wn6vVFGkJTHe34oVG9/A4LgID4H5AVqWbkLX+YRWvjGwUjf6sWfRWlukpcbQv6cRTQf/iPFkCkjdwuh7/xnLNr6D8/eMe0UFTgqTFw6jeenz+O35772bJ5UYxUf7GrGs9RPclOyPf4yfLX8SBwe/9UR8KjGC93c8XPCiyW4QS+He+XfQ9NB/wUeXbqcrk+QV9Leuw+qO07gr9WysePhL7R4u9+zAAzV1PpEWt7pkAt90b0Nz99fZB42fEGJVdwDwRPsabDt8FgmpGpNX8UnbY1gRy7rD8gQvkLr9Zxxs3oUjl6TmiNm9cvc0Dj60GjvfO5/2jdRtXDy6B8seeh1Dd+XBEv7nbPVE2v2v0N28Bnv6v/VVNHcw0vUElu0/idvTfS2CR6aQuDyIntYNWFhji7T7l7rxD4v3ov+GaUmSyugcutY1om3gRsRY3MHZzsewpvMMfvDlLHWpG82LXsKJW3dxqftZLNndjxtZfZrC5MjbWL/05xi4fd93VhTM2xjqeBQbDn0JzVkKE4PtqFvZibNTpXsdm2u0PHG6Zgf2/bRRRVrs6pKbGNj/I7QN3MxZfPGqO+7j1omXsKTpMEYns5UDUmO92LboRfTfvBOzuiPgEqlxDLQ9hZ29l9I9VDG7V6aGO7FqSTs+n1DfwMQgDizZgM7hO3DhXqmeSJNm2QXaPG9cy4PqPYjMkaju72G0pxVbNm/GlmcfQ0OtX6RNYbzvBTxgmqezCETMPIpVncPwSbfsp+4aY+jbsQYtfWNWFlJXerBpgVS0V3J+jqlhdK581LvZrBOdD3yHsz1dODL8nS8n6S6u+pY+jKdy84oujwwG74HTjG09ZzDY8ZiKtLjVJamv0d30DA6P3vP5hzHjVneIYF07c6siYnqveO4whZsDr2HN1qO4LL0xssXsXkmN92Fn3asYuOMTaXcG0Fa3C33jE048Z6sm0qZGuvBwXQeGggPQrvVii/dgjpYMSd8hM/xPDuFgnV+k3cVIVxPqO4YC4/OSuNa7Aw/s6kfu39AzXN/Jw+lurSXbejGWPIeuNevs7mAvT1dwbPMa7O7/1skcFpLoVGIY/7S7Db2jCWAqjjxSuDv8FjY0S4tJAkM+kRa7ukQeMkuexIH/61fY2ViPhauasfvg/8iMV4xZ3eEJ1rVo++QLfH74Ffx41WLUr92KtkOf4hsZkxbLeyVTs3jdwM04OHQrW9XE7l5BAqO9r6H1d5mu8NT3OP+7f8QvPpGx727cK1UTacmhDtTPJNJqduDYtaB6y/pZ9IxpIk0eQmtnFGm1m3txLXoUfDmawNgnr+GRpTvQfSEBTONjoopIW6UtKuZwlPa+gcALG55H1+n/hVQcecgDp3kTOoflgWOLtLjVJd4wgNp12PP7P+JyYgrJ6+fR37ktM15VuspjVHd498ISrG18Fv/lvw+meYz/G460PoplO/+AscngD2BTOUS97riP2wM/x4pNPbjsa0SK270ikyTOd7+AB63JFEvR1P4JxpJuPGerJtLip+hN5ZBjP+2h64bCz5GT4g8lr+LkwWewbO1eHBlJTyKI9a9hj2gKyetf4Nj+R7FQxuB9dzZmLYuTGOt7EevbPvMmkQRFWtzqklTiCr4YvW63sqcu4cgmaVW+FK9WeK/urMFia7wqgDuDOLC8GV1f/Dlm90qmCk79DX0ta7Gz72++Md9AvO6VFO4OvY7VtRvQmhHwSI5jpL8TW+rr8XTPOZx3oMeqaiItbn3js6qXaSItbuNKhI5Mo/8E7RtX4ZHWXt9SE/JZzMaVTI3i2GuH8fl4oDVZurkWy4DX0ViN0Uvd/AStq3+GvrHJzG1kt6SxLhEsplXgc4zFajzrTC1i5vipWN0rmRsEuHUC+xY9g+5LgSWbYjUmTcZwb8CS/QO4kwUjxj2MHnoSC3d8hHMO3CvVE2kxm2Vi+UgwME2kwYlZJ8FsFBNOjX+Kn69rQmvvl+mp0tbFYjab0Rtnswb7Tly3KMATaVLx3orVjDVvMpFvvSd55172TyYZTcZppnj6AbN43wnoSCP5jSMtJ2uwrfcypmI1M1y6dzdMmxmOH86gc/UGHBwaj9W9YioM755Z04WR4NDuWD13ZamaZ3KIND1+24F7pXoiLdd6LRc/xO7l8VsnLeeYq2nrt6TXd1kRyXXSbmBgfyMe6fw35JqvJhXP9HXBLuDorsaIrpMm3Xt7sOKp3+C0t4agLG/0LU6/+SxWyDibnOvGRZmHefSYfaAlLWZ1SWrsD/jJ8qdx8E9j6S7P1G1c6nsV69f9CoM3p3Ks/RTluiOzxuLyn+J9s0Cp3CtvP4/V23pwaTIVs7pD7pHZJpjlWCctws9d71556Hm8fTq9vqa3HuulPrSteyo9vtWB52wVRZo8efnGAe+xk6MlTY6HfSVk88gsep8ZV5JtHfG3lGRXUY/ZGwcC90Yt3zjgc7OgSItbXRK4F3K8jSQ2dYfnFYG3c8T+bSUzjWnO3EKBuiXab/oJ3is1COY37PdKdUWar9qlSQIkQAIkQAIkQAIkoAQo0pQFLRIgARIgARIgARIIDQGKtNAUBRNCAiRAAiRAAiRAAkqAIk1Z0CIBEiABEiABEiCB0BCgSAtNUTAhJEACJEACJEACJKAEKNKUBS0SIAESIAESIAESCA0BirTQFAUTQgIkQAIkQAIkQAJKgCJNWdAiARIgARIgARIggdAQoEgLTVEwISRAAiRAAiRAAiSgBCjSlAUtEiABEiABEiABEggNAYq00BQFE0ICJEACJEACJEACSuD/BxiVexTj4aWYAAAAAElFTkSuQmCC[/img]

In den ersten Sekunden nach dem Absprung gilt für den Fallschirmspringer annähernd das Fallgesetz:[br][math]s(t)=\frac{g}{2}\cdot t^2[/math][br][math]t[/math] ... Zeit nach dem Absprung in [math]s[/math][br][math]s(t)[/math] ... Fallstrecke zur Zeit [math]t[/math] in [math]m[/math][br][math]g[/math] ... Erdbeschleunigung, [math]g=9,81m\slash s^2[/math][br][br][br][br][b][size=150]1) Berechnen Sie mithilfe des Fallgesetzes die Geschwindigkeit des Fallschirmspringers [math]1,5[/math] Sekunden nach dem Absprung.[/size][/b]

[math]55[/math] Sekunden nach dem Absprung zieht der Fallschirmspringer die Reißleine, der Fallschirm öffnet sich.[br][br][br][br][b][size=150]1) Schätzen Sie den Flächeninhalt zwischen der Geschwindigkeitskurve und der Zeitachse im Intervall [math][0s;55s][/math] ab.[/size][/b]

[b][size=150]2) Interpretieren Sie die Bedeutung dieses Flächeninhalts im gegebenen Sachzusammenhang unter Angabe der entsprechenden Einheit. [/size][/b]

Der Höhenmesser des Fallschirmspringers zeigt [math]60[/math] Sekunden nach dem Absprung eine Meereshöhe von [math]1300[/math] Metern an. Ab dieser Meereshöhe sinkt der Fallschirmspringer jeweils [math]100[/math] Meter in [math]14[/math] Sekunden.[br]Dabei soll die Meereshöhe des Fallschirmspringers (in Metern) in Abhängigkeit von der Zeit [math]t[/math] (in Sekunden) durch eine Funktion [math]h[/math] beschrieben werden.[br][br][br][br][b][size=150]1) Erstellen Sie eine Gleichung der Funktion [math]h[/math]. Wählen Sie [math]t=0[/math] für den Zeitpunkt [math]60[/math] Sekunden nach dem Absprung.[/size][/b]