Klausurvorbereitung WS 12 13: Lisa reloaded oder der Heidelberger Viereckskreis: Unterschied zwischen den Versionen
Aus Geometrie-Wiki
Oz44oz (Diskussion | Beiträge) (→Satz des Thales) |
Oz44oz (Diskussion | Beiträge) (→Sätze am Kreis) |
||
| Zeile 35: | Zeile 35: | ||
<ggb_applet width="1008" height="411" version="4.2" ggbBase64="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" showResetIcon = "false" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "true" /> | <ggb_applet width="1008" height="411" version="4.2" ggbBase64="UEsDBBQACAAIABO+IkIAAAAAAAAAAAAAAAAWAAAAZ2VvZ2VicmFfamF2YXNjcmlwdC5qc0srzUsuyczPU0hPT/LP88zLLNHQVKiu5QIAUEsHCEXM3l0aAAAAGAAAAFBLAwQUAAgACAATviJCAAAAAAAAAAAAAAAADAAAAGdlb2dlYnJhLnhtbO1dW3Pb1rV+Tn8FRqPpSyJ43y+pnI4sJ7Zsy3ZsJ+lkMuMBSYiCRZEMCcmypy9n2k7bH9Dn83J+wInjJL135uTd/UtnbWyAIgiA5OZNFBu3Cm+4rm+tb132Xhu7v7w4bXnnYa8fddo3t7CPtrywXe80onbz5tZZfLSjtn750c92m2GnGdZ6gXfU6Z0G8c0t5pOty/3gk4+p2Tlq3NyShCLOg9qO1hTvMKb1TlAP6js1ihjXR6HkodzyvIt+9GG78zA4DfvdoB4+rR+Hp8GDTj2Ik2Mex3H3wxs3Xr586Wdn9zu95o1ms+Zf9BtbHlx5u39zK33zIRwut9NLmmxOEMI3fnX4wB5+J2r346BdD7c8c1dn0Uc/e2/3ZdRudF56L6NGfAwyQIRtecdh1DyG++QCbuqG2aoLN9sN63F0HvZh36GPyU3Hp92tZLOgbX5/z77zWoP72fIa0XnUCHs3txAICyvKNZV8y+v0orAdp1vh9Gw3suPsnkfhS3tA8y45F1xf3Om0aoE5lvfrX3sEEeR9YF6wfSHwIoT9CdnvELUvxL4w+8LtNszuzuymzG7D7DaMAtJRP6q1wptbR0GrD8KL2kc9AG7wuR+/aoXJ9aRfXN43/gDuqR+9ho0pAmFaaRs5ow/Mn4A/hlIpD90kHjpr3Dsbe1L7+9A5szPCCdT0pyRz3SgdnJTy4jkJLz+nmk+4g3PyIdHCqZL/J39FwYoxp7SSXPAZ6TjBjp6xGsvpTyjYqm+RIS1XfJMSreKEuzcyAtpNOcfrH5ttU5uMw9O+YSGqPa4NmWCPA+MICdzBPazhRRIPOMbD3GMcPmLlCfMqPSrhB+ZRT3lmO0y9hHK4gv8wmRxMeBwOZr6VwHQehhMxj1MPJ0zFPOAnL2E7YD5CYQvOPQ47mdNjYg5BhccEfKLKY3CNhugkhg0p7Aif4fTEo9ijZmcsPSI8YY6HmSFQocylwyGJJ5AnsDkgcCXwpOVI2F551NwNGFW3048G0j0OW91MSIkco3b3LM7Jrn7ayN7GnfzGjU795NZA1Cm4YdCPBx9gM3ASl07IOo2cj3pvtxXUwha48qdGDzzvPGgZmkrOcNRpx16mA8p+1+wF3eOo3n8axjHs1fdeBOfBgyAOLz6BrfvZuZNTJ75zNzyrt6JGFLQ/ByUxhzAH9C5dqWHfzJVSlZ663un0Gk9f9UF1vIsvw14HdNmnmBFJBFFSaI2BS1/ZX3YUwb4WHCtOkeBUAZf060Er4VnkgxclhDGkhCYEMHhV/psA60zOHZ4Pbi64CAe35DV70QAM8/6gf6vTagx+7naidrwfdOOzXhIZwfX1zF3ttZutMJFu4j0gxqif1DoXT1M/YI/17FUXPiF7AbXmfqfV6Xlgk4SDn2imrzX7mmxjrmywFUq2QckWKMMpagx+x5okWySvNfuabAXA20tL7xRnd4lRdpqonzAJHDynaInamIjlrB3FD7IPcVQ/SW8V2x0enp3WQONSueWPiRd1zN0bI0q2exL22mHLalIbsDzrnPWtbg/0873ds374OIiP99qNJ2ETjPJxYIgxhkPbTS8vuRHWo1PY0X6fCi8wwH4Gl2q/bYTNXpjdYisJRq1ok1/RsF4Xvk4O9Umvc3rQPn8GWjNyqbs3svvZ7dd7Udcop1cDpj4JL/WvEfUD4PnG8H5w8324i7qhHBBkbIS45QVn8XGnl4SbYLhwP969H/+n3Q57wJSgkMZmW+EpBJxenKhlotkDeA6TGNbg4HVqL4BJBp7D/n4pNfi5VEUTZQ5a3ePAxLmpCFrBK7iAYaEkx3t0dNQPY+8CrDyxeHCjbOjnw04jzHFW0AagktsF7ugmcTQoTTcMrb7ZG4I3XThfYqZD+pCA0zfnwj5PzrWjTMLy2mY9NsQ3sjC2mzur/baINrCBuZTku+3D7VRXrXALYm6fnYa9qD4QZC8RNOx7lh51cBE54eeNZ+h2qsSPhoSPxwr/Urrpdv2WyU680wgc2A6I6DQAYRkwa/1O6yyGBA1MoH2ZoFnFuKR6I80LE+SbN69MMGHeHEUXQ3oMqhm9BqPNW+AlU8Xgfk4g8ekndBqnxJm8uRs1GmF7cLVT6QIq04VhkOqd09Og3fDaSdC0H/XqrXDr0lsHyJiEF2ADmJX7WZz9cGIPlh6igDiY5xDeJ3MbFprBrEwcbDSdqXFmVSp+Nl784NPD9jncRwcI1btAae3gFbKX573OvrkA2e1YlcDpV6/xkLoDiL3owtvLtt/LttojcP3cJ6CBezQ96h4zVGHsd49D6pQdI/y6ba+/b12JiYGiI5B+iaGeTDBUI4wBKkERtbkscjxul8CgeXV8mO8ye8Qp3V1exgxmNyrq8KLbiupR7CDU2noJdRaR4lSkaBkijU7LRZrnqseJ385T1UmBo26N56i88791Rc4fk0SYpBy2Ct8/i+cnPqQPhGjFsZaSUpHFAUwihZXmTCmB8cKCglsFrslj+MCYRR7CW9bbBAUkG+ORzFlY42otrJp6CpJesdEctE0CAAIpGE4i9UbRfp5j+9OekyHBXhMQKLcl46+b9qVmX+bHYNlKX836eaHszcQuM0tkKLegNgqiY/llWGkFllIizBQiRAiGl0wTexNoYjqq33fR0P2VUv2SyBxRoiSVTGoqMcXSwiR9zKlCnDCsCKAoFobT/gScnoZN8305o+8VAAvHA9ZPj5ZBEq4bqUMgLgVjXEtEwSaExDoR9Q5mvmZgNkoiTjXWQi6H5xNptoyKDHgdwCqWgk7CsGtqcI/az3pBu2+GMPM1oGpIk/peOaD78ELKcH337Xhgk3rQADXYeqQSADkPIgJJhYBukFZsYl2g3Fo5TpA3LwV7pWPBv+ROi/TCs8egV780QZ4F5q1W5+WT8KgVXiRiL+AYnsLVmwLzk0HptbBN3mK/agaAwTxmu1+A98jNbI8mMO2qrBasFSgSYUOViGukibZWDMrANOUCIwb/M4O/NM1pMKggGLdkwhi4VPzamnE5xHtVEDfdIG6uCzNXYYx9hjlGlGutMQOmltYnEl8hJLQChwlelNENBfiwAPCxG8DHawMwyseggDBPCxEqF+Rz64ql8dBISMIUZmDAS0q4rgzgW1UAR24AR2sP8E4FwjvCpxzDhlRRBnsRdo0gHpeh3H5OrmosiqYJnyzFbIEpDGCqseKEMwzIcsYvUxgIm5UQ1BitJItLYW5PTDVbr5qddjmPGkiSmPdWwd4+j+CI9ZO0WBIkVRPYsJa8oTe3Gs/xpPTUnjgDd3DAWZXZ3ZjBCw4HzLOMpE0oiIzSTjC5TuR+rfNED0QqRQklCCNDKKlrIZIhRaiG74VSWFh1pD7GGHRTCkoEaCsk2teVeUZxqa0VLuWwQEynEQVPgCFAl1IjkqCifQjUCaOKGT+h9XVKvceD0lgrUP6TiiDlsZf1BqX5U90t+qqvS4oM+1KIvTCFxIkDcEBqLDU2zDAiGAgQ8mGuRDqaQSBhFpBRwZZcDwbZZxlOX2uEizWuF24Iv1gThMupdKfKxe04+bjrCHEa2RUDupYbwK01AfhywLGUlZ1I+TriOTDZYkp86obo6bqkxJAkIYUwpYITM0eYqjQsFcgUNRgQtUSMM5pGpYJTzLUghDLIl8mmud3DKqfbdsO3vS74msoGA3Jl4FeBa7VKR6iRzwvje6/N6Ah8TZTxxZKDSujNxLfIyF03fLvrgq9jyfI617Mc8C2GVF+74fv1uuNbWbHcnKJ02ejw4UitrEjU776dVAwbHSFOM9+hMWLka64ROD2hNYWwNQtkZkiOiRrSiORTqhPYoWJqEaflA8XjAKYOA8Vi2oHifM3TyG9C2bMMyKH8NgGyGFG9e/OcOgFpti8CKTnllCICLg1DkLN6IC+RKnQOLRepmSxrv6oG/e7tc+IEx9t0iCEHh4ksFCeCSw0pISOzwpE1d40y7YaAsZ+FKdW24QbGmynAWDUWlwzHSFrto2vJcCC8GRjuMIdhyUSmN46O6k2Zo2IaEQyRgBCQlGmqxawo2sgFo9lRJHZ8raIbZsUgzjTpbK/S3n5wQuqHNcTpmjDfYQ6J289JEYtvnLD4poT3hGZMYySQVhJJOh8U6WA4YpsGxei4dIlZfOvohr4tdUNcUIIoM7VExPTMsfascAxF2iJNrphYBw4rCbWLjmjcLI+Pr2ge+vS9YBMncSST7rBQZvoGpVQNJqJTn2itCBeaS4k1kUtvsfhktq6TtRKnTCv4ZI7mbMcO348tjXxSYI/+eOrId/j2r7YgM1P5ZCVNvDuK+VwQpc1cJykwlSMdvWUGZPp7iwZUWvQZ7vZ1a6LpFxC/Mx7xvLndmc3cMLHZSPI6+yw1lragLp/fAElBGKMSrhgLExmmMx8gNWMESSk1YdLcxcLtdTrU7rqgdnfWWSRzwLYUYJQPFqMxQ4QJjrhQy3Q705S271gevVvAJx6Pz2hpO14Akw6HV5PaXQrR7vCEAcakifmwVExiacsAWJvBRwryBZtI8iU7NEV8SpkUzKxjhOnY+SBorQvbTzpxEI+6yRTeHUhYkmj74yJ7/jzodvq/cOLQdJdZwsCFWuQQ4QnIhYHOlGIcaUapDbm5D5AzijiG74lkSzCrcrGnEkqF/8ME4c8MwRoCgX1NgcqwopqY8SJiKU74nEqwSqHAKpUwxLdSKPKAvMkmO0+AZE5gquBZdsQxtrNcCg7y5xrckDSF2tRQhGQaSc4UBhtCi2ktd4VnFCRSBdKBCyQHawWA8k1Pl+QSA1OB0FU28IolokJjsBklEE5+WA0EB5nA344RuLslHKyh9ksffD0nGlHCNfyRwaJiGDGFFDNtdVgsIyouF/2oxtMJAMwMw3RgrCKMzs0iojyZMKKUgqCX6WzAxscYKfAUGIDSSugV45FH5dtqZ3Ewn7Mo232dzAUMwwziJVN7JOU8nTKgfYiquVmoE5w8ZJnkSuAZBamSu+65QHLvSusDKSGx8hHLkmBrNM0vzfLpMlxJRTo5jEoRivqkwclCm8HMDSQLnzOlfKrAZQgzoRWy9zR15z5WXElKlZQCcWRntBLlA4EJsBkCwFC1aRMe0+prIX3Jr5XiCna4PmADxykquRCQtHDAVQ/mxwmiMBVUYU0pw+mKQknnEATWlFIiOPyT48bgriPilXF60ciPXHE/Wh/cFcAIhEkJA89m1ipKR+584FLOCeLAAKa9JEXdF8o8FEILcJHE1JU2DPXUzg8KGDddMW6uD8amQ4hoZiaiQ8Bvltywxq1NciAEoIshA+bWaRLhS4akGQgBnTAF281C+GC8LR+74ny8RjgziFMR0DHmBPiaUJlle4Jr8OKQeUDSYaao2b4x2JwTqQWFNBx22rRJ7Jktj/XZkSve0frgDS4b0kbw1phxM/kQpy0LmgupIYlRjEFQlo2tCB8RQQQiUgkhl7Ws5VqhXYH5C1fMX6wP5sJnWEpgcIi7gJ8xzxbjYIpQigQTJn3VKvXXwicSeAAB4poQpMYth3aNUb9XwPjEFeOT9cF4Z2RAT+lBGYKbxm7ItbH5jx7wOJKMMlAIE61d42bCsulzI/46KXkUw7N3349He2QC3fczTamfplm4ahY3gqhqyqJIGoNXzOIel2fhK5/seJDDqWJoKY/cn52Q+/NE5MqmBM+J3LQLUWLrgaW+hsiNyXeLWBZR/IsTin+ZNLN7sMzfjN36yWoqIzAKMSWM1JZ9Bz1/1xbGMgCL0P3VCbq/ToSurANmTuT0lMilszKvIW6Vlf7M5Y03v384YfiPSZ2asmx9smkwrO7vm4jitUSqDKMiOv90QuefE9sv1TLQGc+O1xKdEoyKmcK7fzmh86/iStgQeSvBtKAEYgha1njhusxMfmLgoAY3if6kvr6R472pnNW//8sFLNi6CBamkgqztJIyI+4LB0tOi5UtzpH1c1bjRovvb0DzBs9WxaML6t4YJ7AHGyAwvWiBjVZ2TqN6WcvLfUsJDwos0J1U3EmaXrpBb2ilmasu76xv6wtnybvc4+uSBifb3oLWojRUXv6r1JCWa/mvNevTkJawVI21NpYZG1nWc9tWANth1OiWdMdU4vZwPGp5bn04l0UvoPe72BC4JIosnRx2vzC5+2FBnvfd5+hlu1yt3xp214RyzhDRAjFOsyeCgFVwZQI5DVmRlGplE7jvD2cVQ5O2K4U/MwRrBoTwmZLEPIoDEYqp4tncOySE4kIQ8xwyJFYNRMXc1QlwzAnKmkGjfKIUkuZhcAIrqnAGDZMIIY01mIpSahlddmW5XM5EHlo87hdzud845XK/mb/wOA6PeZZs2ZHptKmKp4MuLJszF7n41LvEkDLQqtLw3zpB99uJgzYTq/3l0M2/ZtIOS2ls2dX+FUBXDWAVjL9zgvF3E8vGE0dNqyaTz7+8Xzr2tsPZuuM42ZlVzPQvurRHLg7s0Rq5K621VJSjJGBIH30KIZ2WyCyvICRDGLwZXZG/elRtM1WW8ycny/nTTMv1uC4yM9NiPTybQbR+ZhNedHtwJlO8SoXwLLyIIf6HH25u/fzrs078i+2vElFve+979ovkIHkwYthrK3+I8bJ2zBudLSHqPwiehb/KJ9Hv7R514JL7YS86yq7HPEfy0KCpRv7Zn8ysvq0ss89K2XHQi5MVKTybPQmdTNfWFLIkogfzu80zIpTUEDRSTWSuYWba2ubjDahtilUWgz/dAIGpZReDy+p8jy1Bf1rg4VPXOt9pWZ3vSp8Cka0hJcaW+dSalfnKuZmUc/P0zDzpcXrTDMfNYyErZGblMyyE6ZbDzGSwMmNm0wYsMcRGkBgJxSqZuRQBmkPAG3KPDijQ2VConkG3vigInwIC4AoVE0QwPEBBUgTYSCU0hxCNuqHA5o9R2HwYJK/XBgXpE4wZZJIymebC2MAWTIcSVUojgrB2RIHnULjpbVOB/u9/t6fHgF+pq1iK/FGp/M0TXZkkXGksNUZmqS6ZlRA1VkwpzjQ2GGFHPsJoFASs3ECAI2wcClUeARGhEZPM9O8olS3n7SePCtLmyV5cSZFfLG3a2PPJItYrW2TwaR5YOke8jv3FLFoyTmZPr3bKwGLyG746eX2xAfmNXKWCfbkRAluhhu0tYprGlYtsiMSWX3TY3xCR8dWJ7PZGiEyuUss+3hCRLVjLJo89PLWlrSd27GHvOS7UuN69ec7GF7kKTzhho+MNwM0SmVZ/AqElU1rM2iW3sLlTs0xmy89sTseMFzqe+oVF46lFY78Mje+csPhuaUgs99lNLkjQsUM7s7X9fmmB+GIrfYBJCRB/cwLib0sDYtnPNFsuFGMf1bARpK4WHdFP1t5Pkllo2Koxsd6xoL9/d9Lfvy+Z0otgXXftfbYBurtDsoiErCC7+mzDJLb8sPfzjZLYKjL4OxvhU6xyrUrL7m6GzPAqLfNgU2S2Qj27txkyQ6vUs/ubIbMhPlu+D3iwGTLDq4zNDjdFZivUs4ebITO0Sj17tBkyG/DZKmLax5shM7zKPODTTZHZCvXsyWbIDC1az6ZYFi0ryH1mC3KfpzIa6uj4vT3qlB0dv/+pHDdTXf9uBsSdrFH3UUlt9N9/cALjDz/V9mddXTWD424Gx+MyOP7oBMcffxrzmgmMexkYBxkYn5aNG3wzqedhZOTgm9RrbPZw8DIAeZgBcpgBclAGyFtHQN7+BMiMgBxmgDzIALlbOkTvCMh3SwRksynrQQbI/QyQO2WAfO8IyPdLBGTTXfr9DJJnFpDPinD84AjHD0snrOsZ7la0POQ6Ht536HS40kaH4Y6GNKecv6Vhh/jEtPQjhinThAlJs1IWMc+Dx4whzZWAn9z6SsSsQhYbKGTsS4TM0/ikWTRBIFUuY8f2KTmriOVGiphgQpkEf6EkBlnLgYwxp4oQKST88crenMnEvW9p+1Y6E7RI22+cSPtNkbIpxhyBMhCmEZUTV5F2Wy7J9PM4ATX/DNCxhD1cewq6Sc0q+X773ZvtKYk83878Muo1vG3vNvzVwpdhM/7Aq7XCqBZ721/VwjjY9o7CfuxA9wtodl5uY9uo+aDMXtCEfkKwNK0pMI/AyjyolQtrLcInGqxICKrBI+jqVSfK8cg3N2+/e7vtJaD0w+Oe1+9G8WuAohUexV+dh73YS1DxvupFzeP0m/e94Z8bYWvk923P6xwdhe1a0PNOANs2SBJk4PnJPwdoHTqo6512I7IlVdj8Ubr17avEfaShcWrYmU8V00yD02FIccUy1CWVlJlHKoObQpJP179Y63RaYdC+7MoYJbQhIa7IiIaWzUl7lC/XZi/KerJGq7xC3972WhEQixec/fjfYe84aNW8c9hj+8ShX1atO6vMql3EF8kik5JpDT6YCzlQL66Z5Aqb5+ARKqr1q5xW8gG7ZXiLQ9RuzwoDvtpofqk4KPNYQaZB0pKZhwZnz6Aj5ikIXBKhsHkgoSMMrIrd47PT7tEHC6T2Zu/H742BXXK7A64OCzOUU/vZdQSd+Zwg8zxwyaRQPH3WpMEcsjtCODh5pXH16gCTw989G/7ezla72y8ptLqVWYsBMOglhRvAFIJ4rcSMq05elwh48oT5URd7tlYulmePMyl/nsm0vMIr6T04O3Ik9eu2IsjU9k19RBiSElFBtMDZKtvSVwjsxay+TSSGsN2R08XIQjgLY3AIzuvH7nG5Q/WnnLzPryO4zAdsgZ6ZeSw05GMDcKUATueKMoCXUDxbXH6+VqSB7aopBJU/WKdwb+BN2n24smRRNPO5GXaaYa0XfPT/UEsHCKQ8dWedGQAAd+IAAFBLAQIUABQACAAIABO+IkJFzN5dGgAAABgAAAAWAAAAAAAAAAAAAAAAAAAAAABnZW9nZWJyYV9qYXZhc2NyaXB0LmpzUEsBAhQAFAAIAAgAE74iQqQ8dWedGQAAd+IAAAwAAAAAAAAAAAAAAAAAXgAAAGdlb2dlYnJhLnhtbFBLBQYAAAAAAgACAH4AAAA1GgAAAAA=" showResetIcon = "false" enableRightClick = "false" errorDialogsActive = "true" enableLabelDrags = "false" showMenuBar = "false" showToolBar = "false" showToolBarHelp = "false" showAlgebraInput = "false" useBrowserForJS = "true" allowRescaling = "true" /> | ||
| + | |||
| + | |||
| + | <u>Der Satz im Sehnenviereck</u> | ||
| + | Wenn ........ | ||
| + | dann ........ | ||
==== Satz des Thales ==== | ==== Satz des Thales ==== | ||
Version vom 3. Januar 2013, 00:58 Uhr
Inhaltsverzeichnis |
Was geschah mit Mayer2
Mayer2 wurde erst von seiner Frau verlassen, dann verließ er Deutschland. Bald wird er in der Doku-Soap "Deutschland deine Auswanderer" im Unterschichten-Fernsehen auf KOTZ als "Unser Mann in Kanada" zu sehen sein.
Lisa reloaded
Lisa, noch schöner und noch bezaubernder als im Sommersemester, bereitet sich auf Ihre Examensstunde (natürlich Geometrie) vor. Uwe ist Referendar im Fach Technik, sieht Lisas erste Unterrichtsentwürfe und baut ihr flugs den
Heidelberger Viereckskreis:
Klausurvorbereitung
- Welches Thema wird Lisa wohl unterrichten?
- Was hat das wohl mit unserer Klausur zu tun?
- Wie wird es Uwe bzgl. Lisa ergehen?
Fragen über Fragen, die Sie sich in der besinnlichen Zeit schon mal stellen sollten.
Themenvorschläge für Lisa
Sätze am Kreis
1.) Es könnten Quadrate, Rechtecke, Dreiecke und gleichschenklige Trapeze gespannt werden. --Sissy66 08:40, 28. Dez. 2012 (CET) 2.) Man könnte ja für die Klausur zum Beispiel fragen: Beweisen Sie, dass jedes Quadrat ein Sehnenviereck ist. --Sissy66 08:44, 28. Dez. 2012 (CET)
Ein Drachenviereck ist nur dann ein Sehnenviereck, wenn die gleichen Winkel einen Rechten ergeben. --Sissy66 08:46, 28. Dez. 2012 (CET)
Sehnenviereck
Wie lautet der Satz im Sehnenviereck?
ein wenig Didaktik aus dem letzten Semester
--Oz44oz 23:22, 2. Jan. 2013 (CET)
Der Satz im Sehnenviereck
Wenn ........
dann ........
Satz des Thales
...........
