Benutzer:HecklF: Unterschied zwischen den Versionen
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HecklF (Diskussion | Beiträge) |
HecklF (Diskussion | Beiträge) |
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| (5 dazwischenliegende Versionen von einem Benutzer werden nicht angezeigt) | |||
| Zeile 1: | Zeile 1: | ||
| + | =Dem größten Winkel liegt die längste Seite gegenüber= | ||
| + | ==Teil 1: Konstruktion== | ||
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| + | ==Teil 2: Der Beweis== | ||
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| + | |||
| + | =Aufgabe 9_3_SoSe_2012= | ||
| + | <ggb_applet width="1000" height="500" version="4.0" ggbBase64="UEsDBBQACAAIABOg2kAAAAAAAAAAAAAAAAAWAAAAZ2VvZ2VicmFfamF2YXNjcmlwdC5qc0srzUsuyczPU0hPT/LP88zLLNHQVKiu5QIAUEsHCEXM3l0aAAAAGAAAAFBLAwQUAAgACAAToNpAAAAAAAAAAAAAAAAADAAAAGdlb2dlYnJhLnhtbNVa4XLjthH+fXkKDJvJpFNbAgiQFO/ky/iSXusZJ3dTX9NM56YdiIQonChSIUFbvrkXyFPkTx+j//ImfZIuAFIiJcsnWbYn9tgGASyxwO63ux8pDb9ZzFJ0KYpS5tmJQ3rYQSKL8lhmyYlTqfHxwPnm5RfDROSJGBUcjfNixtWJw7SkjE8cdzxmGPujY+5H+JjFjB+PhCDHAY2Yz/iAiiByEFqU8nmW/8BnopzzSFxEEzHj53nElVE8UWr+vN+/urrqNap6eZH0k2TUW5Sxg2CbWXni1BfPYbnOTVfUiLsYk/5P35/b5Y9lViqeRcJB+giVfPnFs+GVzOL8Cl3JWE3gwNT3HTQRMpnAoQJ34KC+lpqDReYiUvJSlHBvq2sOrWZzx4jxTM8/s1coXZ7HQbG8lLEoThzco17IGPUpwTT0KPEclBdSZKqWJbXOfrPa8FKKK7usvjIamYNUnqcjrldEnz4hF7sYHemG2MaFxvftFLZjmNrGtQ2zjWdlmL2dWVFmZZiVYdRBl7KUo1ScOGOelmBCmY0LcN+yX6rrVJj91AOr05MjOFMpP4IwxYATa3MYx/hI//nwx/REv3tI0tKqimpPpY1KQr09dLoHnZQ2SllINnW63pZz+rcotQff6aDtc4Iq82v+NjTS2465rtH2D1Pos0c54rDfxMqwDg9UTrRsDR8lZqUOGBoiL9S4J8iD4PADgLmHSAhN4CIIB0Q8xDzokgHydRsgGsAEQxQNkJYjFJno8AbwjwVmMR95sJgeDSAoEQFFDHkUERNUDEEoIROYEKQuBQnPQx7cpNUTVy9BfcR86NEBYrBHHZMBAUEKN0If1LuIEkT1zSRAro98vR5hOtb9gd46LOkiHyOf6AUhrCGkbTiD/ABRfRq/NpfM5pXqmCiaxc2lyudLX4A0JKRV2rMJqpMVnw1TPhIpVIoL7UmELnmqI8IoGueZQo0TXTuWFHw+kVF5IZSCu0r0gV/yc67E4jVIl41uIxvlWfm2yNW3eVrNshKhKE/xcs95SlrX7nLX0KGtCdae8FoTfus6uFFvDjOoKgXoz4uyEedxfKYlVqkBLPkmS69fFYJP57nsHmPYN0VnKKoolbHk2Y8AVq1F2wWtapAGeVODPJ82O8mL+OK6BAijxT9FkZ84odfD7R+IsWs742LanQKHlxHXwefh7gykrOstU8RqFpdLD/GFWB02KXRktzpn5as8XQ2Z83/L56oqDH0ATYU+1GmWpMJgxKRbqM3RdJQvLupsbdd6dz2HHrY7GCXG7ghyg+tBvUzqdmRbI6O3tpTCRgYbCdygTcbLeRK6RsK0I9saKYCv3Vp9VNIck+BGjSxNRsNOHTdNttLg15W+yqQ6bzpKRtP6qMTe8EM1G4klhLprkvtac9hfw9hwKopMpDWkwZlVXpU2Qltoj0UkZ9C1E7VJuHbX32EDdjQWSSGajaeGmlmDmVncBuvGsFnqdZHPzrLLd4CFtQ0M+80uh2VUyLnGHBpBGZiKFapiWXKoInH7Ph2DcPRIVwswj9Kmgeis1CQHZ79Ocx+8FUNmgWEdf6mYAd9CymDMwHRp67eGyGmjonz0AZLbsv7Z+ZXXQGksjUYT9bUwt5Nw741gNLDl6XzCNROszZLya1F0DGWUfZ/H6+YD71iNSsz1Atr/cyEsdOxx4GIOC5qI6yQy8EiJFvquAELeqAd6+9GyfMtytSV0GHZStx1d8yUAzBrxc+b8N9k0aBfdK4v+jo1GaI8OjNlIL7gfs0X5bMazGGWGA51D4nFWJZljDUXEiTWhNU+lmqnELlYvseEDncWW9k12RvQ2++O7W39lwWNS4464PX/QLTPanOCXwPPC1s9gPSUrYAtTeCYqTd1QdYUwF3+VcSwMU7Ql6+fM3lLaPCln81RGUm1AdzEvYD2Njtoa78RCwYZg4sT56ucqVy++RG/ReyRLBf+FzOD/WACUivcI7iigq0mPGMnEdN5W2VRL8moM/5Pel3YRo7jrJOA5qzixam93VJeW7J97DnCjLM/5O/GTHVsBxrC6UhRyvCTxpohjpzF8fT88dxfqrY4IpLHAemyDuABCgLPQDgBoO9A+7zd3zW8/XlygPezvHmr/EfrfL7+iB42ne3YEpDXciTlvb090bDqChy7Bs6XJuDEpbLYSG2TjcTLSm/G4FEqf1XVt/qGef2vGAsKqHWvGLqJJIZVCZL9jjw489pbwvnd4rYzj07A2Dt3ZOK+ACf723yyugKVtGujGCKVrEfrnUidVoL9KikKnzURkvFom2gtV8Emqs+rpv/6kk7AeTOD6COL6DwTDCmUe81Kv8umrVL3QckfJJ3SCQqxFZap6uycAemgCeDJxz4DNrJVgG/Z+N+y3RX2Xu7wpgGgnecbT7Swm2eAw0R4cJvociWy55oFZzA3s5bphN2CssIfJxrPk/ROXrgOMY9fsHm0Y/PR2g3eJ++mBz0E3OIO49tHdtL8PWo97lAZ+yDzfYwPPH4SBrREukHyXBq4bhsEgxCH2HoDy/41f3xwrpxuui293XQErNY6JHyCJEex2XrqY/j0EE5gZd8xcE0Fwi+9S7DHKPMKoUWfMH7rYZx5mzNdvyR7oAcFYPtWoOcuA55fCvFfYfFsyFWKuX1O9yd4VPCv1R2Hd/Lw7YRBPjjAs2VQY7s2m3N3IAlsjC1+TPx5BUf+HzKYindpXPlPjGr6Q+UzP7cn42aGxMn4qBV8T/aBd2oOm4ofdiu/fjeiPHwTA4jEY7x4AbjPeHUHsrYH4u6qIJoDUU/iroBS8N28XLkWR/vafarxGgQU0fxEFj/VF+WLJeddIs11n+YYiFpWSSW+fQPAODYTJUwkEYL6dOPBtHLDeoDO8I/O9ge+e1m/tNmp4uQffLQ9kXw/njlX13lK8t9Tu40cq3runrMmTS1lNzWUs2Lvm0t3Slb9ec12ouWfZRwn2/2jKLOSYsx7ZJ7n4hyYX+VSSi66y7SwS0ia7hN2fuxVZ+SCInTxokbUfmjDP3Rmx7SK7I2qDNdRCgZyLYo6SZXEsNwvkHggODkXw9KkgmPVYhw/WNNFfw/XW8ng7gD88CIDvzbht3NaZ9o7kkO2G28FN2fY9+pqa5jsxlpk9LgBYZNNCRBO1T+YdHIrbD0/xEw1C2lCtXyl46w86d0Pw9MmlYNe1KdjD+3/ssSOMwzUYvxJXQuqMe1qNExCDq7BH9fv8/EJ3XEzcfWAc7g7jrV8h0Oz0kSCqv855K0bd3voH3c0r5M4zyFaW0G9/38V8raz+jvTL/wNQSwcIL1U0zJoJAADALQAAUEsBAhQAFAAIAAgAE6DaQEXM3l0aAAAAGAAAABYAAAAAAAAAAAAAAAAAAAAAAGdlb2dlYnJhX2phdmFzY3JpcHQuanNQSwECFAAUAAgACAAToNpAL1U0zJoJAADALQAADAAAAAAAAAAAAAAAAABeAAAAZ2VvZ2VicmEueG1sUEsFBgAAAAACAAIAfgAAADIKAAAAAA==" showResetIcon = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "false" /> | ||
| + | |||
| + | =Das Innere eines Dreiecks= | ||
| + | Seien ABC drei nichtkollineare Punkte der Ebene <math>\epsilon</math>. Das Innere des Dreiecks ABC kann mittels folgender Applikation dargestellt werden: | ||
| + | <br /> | ||
| + | <ggb_applet width="750" height="407" version="4.0" ggbBase64="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" showResetIcon = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "false" /><br /> | ||
| + | --[[Benutzer:HecklF|Flo60]] 22:05, 15. Jun. 2012 (CEST) | ||
| + | |||
| + | =Was ist das denn?= | ||
| + | <ggb_applet width="300" height="300" version="4.0" ggbBase64="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" showResetIcon = "true" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "true" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "false" /> | ||
| + | <br />--[[Benutzer:HecklF|Flo60]] 21:29, 6. Mai 2012 (CEST) | ||
| + | |||
| + | =TSV wunderbar= | ||
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TP04vbXEizopnxcWVGGe6Oe5cyOMpm2giPPi84VsJc6RqZMOcd+gQjEvwlW1m+qfaVT35ATNH8Sm1rCZicIPnuxvMRT8tUNxaxi9U2SOjID7oNvVjhBLPWKXlVlU7r8xeb+4F1xrvqso62wdK+TDIO8umCCD6bOnabEWCeUPSK3iwiAzW8f1PYt0xIB2I3qSKv27qduSpfIMmuWY2p8dhYI1pKaqhadRxB6KUlup/ZuB0anBnZFFrSXu2ds+fFutVIH4RM+Zb3avzmRI3kuMbnXKzZTv6gL/gMoIPVx3Re5rkjMhmVglpMzewvXstzJBkugw0zxOgCNl11ZZhthmQ1XG2lRL3Pzs1hXap6Eiqj8racFCw95t9RftQrHZiWu86AjYQ9LRRVdJBFw34yJ/enpTN1wAtG77fXVO0J4La4gQ5G0l4eHLhFCZjyWwhc/aL0aBTV7Etzfyao5id6ptTJ/Zpv+Sz+NQ1luOIbgYzWsx7ZXMPTzjdYmCzvE20mVUrU7vH/BigiApt2zW3SfiZU7acF5/ungh3X1zwQc8xQj81rEv/TmbVRbWs5klXEEfhjW2zlYcjKuV+3Z7gqDWtb0VX3X8rGB7wUEamAllKi4SYkAt1nZ6a0VKJUEai+dBP3n37v36PQaIv4FFIxT1w77iFjW2Rr1s7Hdl1jqyQFFXrmvOqm0iaJHUW8DPrmh76GnDw5/C36KS+MKSqt8OAYfXYD+nPiYkmzp4KYGH96JySGw/C5FeSEzExFLY0ME3X3/S6a9c9XEqorP/njOmeyEqH4JdjoFtlN7WwVbt5s28/0BvjyHTh6DK11VJRsEIYApm1Wt+LJnWLacHEtWn2wg/5gI6Nplwbm8IcGXGwscyoc2pPugzjnw3spyYKhYuezsSDX1+4+lcVWTTS/knTmRAsk+8/UTrQIu50GdGGVxuj+m51aPo3juBVneeQTxQwT7UqAGbLhiA5cv+dNZeWNafVLghK11VMylTEqXkpKrUefKk4097mU5U/M2TEMoRxYHtoVaE919me/swbvlWW3AylIAFbGrk4d+9bPVD9ZuazJ7yTWAzJJd+qzraZ1qzUgnd0QadSnDJd3TKlnbNSch3efo8eXgpaR0WqtdUabwx6iMNlVKG+WJj2X6ndytr3BJC7oEbawB9JGh5HZ88p91LbXg/LmH+0Qgoi5CQtn5ViHO+eqZUVsnGZqggkbG5N6LS+dKV5kmVuyQnAXWaUXcqUSr+HXO3Rwj6AaOT3tUvc2b2ZkX4rzqbZsjhEXzg9+XJjK0U9RGuH/W+2KQ3zVNVYsnj4S7fX4M9VaSrwhBfork7fRgTqktqJvmkYrlQrTCLYjAPnb0em+4SlWEdvd4cepGEIRUsm7UikoBX3h3euq53IIkQXHb1qCbyfteakdC2pft+/AXef6AWSzhzt7zCbNxNV4/CAYzqwtR5w7VevCzqJHOLDGAZfDWTg1WbwYWF+HeF0mvtt6inXyghThyCp3wGQiBtnd3qfEkHsa+9CMCHq6VogR9IpA22H711o5gR88DNmWvBJiRGZHcwqbqOYpYNt8avU5JM6utUTkmLirmJeqQo2crwb8H9gjoFDRuX4eJlwdH5i8YhPWEFp1UfCqwNJ+0VtamNEoTcXlZLJL/cX8yAJlXUsLm87VLU7NPAZ6s23fhp2FGNpi26694VG7qoXRGZtyBcTyLvk7QvnVk+KoVHOzeuc2EcmSuT1s4O4XJD2yWnpqlpfVol6tH7BGBzkwlvJvlGKF6dlZHrlukqguZSPvZRN2zc+KwYg350JVXOqsaF7HYrIfHIP9OCjB7fgd7clsw8rP0JTIcrPksHbRVvIPDr3HHmIABGkBYIfj1fXfk9ySHh/LKdSG27imRuwbN1bluQ7MmeTH2H8PM3oRbDtdue4bwxdinPBgp78Ivpzu//6Pz/GY7jx34qiBdfDvCb5sZoG9B4KOiIl1ZmJP4cdW5hpmQb5Z/sp2wu7QGz+p1TuofyBmSxhrXVqeqt6/46G5SnoUZTNRusws8EX7UXJesnnWfrh+duI9GWj4R0Bgl3J9IcpuLGIXLdt7/rV9N2xk4vyuveKxyjIwcVuNwUbuZa4RqaDkU2eFyYRH79U37poNvtc/HJeQtUHQ49Mv6HFfDqL+oKRpeKwm+ykaXkzf6NHVhjbR4EFU2WZqfiHtwyZfeBceIDkycGHxRaIw1VbN0lBtiOvKY2d+1WRdKzi2wdE3y42uS/LBpLHLQ7BkCmTmna/MW2jgfK3yq0XA+kR4OVbBlIAIo5ssxpAU0IrJ2GUExCVa56yulfyWaWkZ2LoR71jgi0K6I/3p2da1MNu61oLAfr/R0jn8vp1BK90TPKldKl0E6UUkSai2I/SE0vkmNMa/w+Gph906jl5sDHDpUfy309z7tamHRej2zkkHcjx9PWq3JLv5WUhyQ5XbUfPeL0ksuYuoKvwgpCU6B43LzUHHbSQVbAc+f1lPCjWDKxWQ5BRx+mOkfAtju2Qtk1DN3gbTbuiPKGSnFL9dUTq7XgXC3lSeElzqJAHNmJ0rP8ILjuHE/zHZUJoJuZLrDLHq7ol/kp3f7Y9BbjqnZiemC/HfZnRyUtrGIadfivNHWwdWQXNd+lv10UCa6BINWWJOdDQaZNEQvvlXK+DYihdGUyc7eldExTxmyCyOxnt3tQNK2L4R4vVn1qtN28dRcyz6QpG6GhHqoqvrMleHkH4226O0VWVQ3pu0IJLNs26c1VUqGfzMMd4a+A3xDmU/ofvBdfQIIIcXFVvH6EnfZD36TW7l9tXKLvSvZKyA7HS43TJ6NQPgVuGdMnF/vCbyX3KODgXEFCMnVzUSjVUJvrEXS4/w0xrYDhD/dG6fuj/uVl+A0wwCGZnMQDjEesHbv7gLC09GaAa5+VyLQmjTqe+uxsxfheqs1EUjidLwU11Vx2DdFd9405DW9jTcZAxmvsFj0ts6Iq8KUPmO3ycVj57hHAiJuWHQZeYkzpTTzPdgxCisl39g+6nkNrYwciqoAc88wrFRdio7jzYgAB7gkUtZaBDV5IrlYAf6JpxCA3oFmDa7og8yTRszHdSZlnssL073kiP00XTqJgRgoTU/90ZcUcUw50RJq33isE70rPt4SvbAIezoxX0RPBLYfHD/ReFQ78vfZj5Ys+/oYveacjpbehRkpxNMto+8KSR9kaZOpbpyRXp5D3xf0pOiMPpfZveUiZTkY/3cn/1fTsfHUq3xSG4fFWZvDxd643E7LrfTCh/jyihTKLBX577lYaEfIsSwoRk3QfHKzY24lS2brVeeb4BgU6mgjd7Be7TM2l2IyuFcDL7Ijfbq9kw9J9LhY3AT5zO+R3XNiTaBiAVLDEoJNLzcIpb/MFoSRhow65LDYfijeKCeS7Jc2h0AD9GSLCGCEKgzShrfmANa1RBkiQC+L7xh/yrVMHYEh1Iuf1tM4K2xY2XDtDbxK8M9A195ZlsygS4GCICCskfrp9lwLIfwaJN6L4bcuESgyvJzSmQfqoWfgFcLzaiJQe4caBKUQ/zBjrofFjI9Ee+EFUtsR4tKeESeXt9aVbkc5LQ4Iico/jB8h62ecqa7a/B3h/gdygrjnO8cZfn7xmgjUGSE6oo72maIvZ1B4JTOWom/h3P9E2LhfQCwbR2im5pngt9mOb2gIUm8PeAXLt8lx0CU7x6w0tnz0eLM44fULFmOG08ZG/pD8iWx7Znv2fpUgQgTwTndw9Fc6xMPXRgTqYZd/XlSN4gYXjzMTVUp+j1jMdzTzNNyfPVhTcPo5GO6rNP4seq9CVd4qxWwswCrJdJWflvl9zF37oSqR7ipM0cPjTCJwQ+ghDFvUiCECNqiL7x8iSfkRy08bBpFTCLySXWgd+gJ9ZswXECuQ8ZQnialaeo8piHfiXW4UxTdchv1x9eDlaCERiGGRkwjX4xH/XLN0VcvgPub5xbPzBJP9OyM1E8H+EDkQ7yR+fjvX76fJea51KH91scs8SIW7oOMLGP2rrs748MH82pvRuvEmaCeCauddl+nQwe/5SKwxYXIpajLsxl4Ke3BLcMZGxddMPwdHOKiZ0TkGujSXZgojTv0HUEsHCLPvAiJFGgAA4BoAAFBLAwQUAAgACADRkFZAAAAAAAAAAAAAAAAAFgAAAGdlb2dlYnJhX2phdmFzY3JpcHQuanNLK81LLsnMz1NIT0/yz/PMyyzR0FSorgUAUEsHCNY3vbkZAAAAFwAAAFBLAwQUAAgACADRkFZAAAAAAAAAAAAAAAAADAAAAGdlb2dlYnJhLnhtbN1caW/bxhb93P6KgT7X8uxLYbdo0qZ14iytk/aheMADJdEya0lURcpL0B//zuWQlGzZTpTYriIjNkVyOMs5c8+9dzjK3vcX4xE7S2dFlk/2O6LLOyyd9PNBNhnud+bl8Y7vfP/d13vDNB+mvVnCjvPZOCn3O5pKZoP9zvHAOW+SsNPTIt3RvZ7c8ceJ2embYJT3tt9LXIexiyL7dpK/SsZpMU366VH/JB0nh3k/KauGT8py+u3u7vn5ebdpqpvPhrvDYa97UQw6DN2cFPud+sO3qO7KQ+eqKi45F7v/eXkYq9/JJkWZTPpph9EQ5tl3X3+1d55NBvk5O88G5QkGrLzssJM0G55gUE7rDtulUlMgMk37ZXaWFnh26bQadDmedqpiyYTufxU/sVE7ng4bZGfZIJ3td3hXGSO9FCE4wY2lNvJZlk7Kuqyo29xtats7y9LzWC19qlrEQ2Wej3oJ1cj++YdJLjn7hg4iHiQO1sZbPF7jKh5kPOh4MLGMjo/rWFTHMjqW0arDzrIi641SMJyMCkCYTY5noK89L8rLUVr1p76wGL34BmMqsvcorDjmScQc1zn/hn4tfjXd2L06SLHUajmbr9lo06RQ1n58m/KzRqqaRnUQq21Kc8s47R2NxoF/1EDNErZoqvpX/a60qO4a5vUW4/nnNWj1owxxb7exlb3aPFhxQmXr6VOm44IMRgVmAs17wQyMw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Aktuelle Version vom 8. Juli 2012, 21:43 Uhr
Inhaltsverzeichnis |
Dem größten Winkel liegt die längste Seite gegenüber
Teil 1: Konstruktion
Teil 2: Der Beweis
Aufgabe 9_3_SoSe_2012
Das Innere eines Dreiecks
Seien ABC drei nichtkollineare Punkte der Ebene 
. Das Innere des Dreiecks ABC kann mittels folgender Applikation dargestellt werden:
--Flo60 22:05, 15. Jun. 2012 (CEST)
Was ist das denn?
--Flo60 21:29, 6. Mai 2012 (CEST)
TSV wunderbar
