Welcher Winkel ist zu [math]\gamma[/math] = 76°  supplementär?

[math]\gamma[/math] = 145° und [math]\gamma_1[/math] sind zueinander supplementär.[br]Ermittle die Größe des Winkels [math]\gamma_1[/math]. [br][br]

Betrachte die Geraden und die Winkel. [br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQgAAADgCAYAAAD/lvikAAAAAXNSR0IArs4c6QAAAIRlWElmTU0AKgAAAAgABQESAAMAAAABAAEAAAEaAAUAAAABAAAASgEbAAUAAAABAAAAUgEoAAMAAAABAAIAAIdpAAQAAAABAAAAWgAAAAAAAACQAAAAAQAAAJAAAAABAAOgAQADAAAAAQABAACgAgAEAAAAAQAAAQigAwAEAAAAAQAAAOAAAAAAcEqgOAAAAAlwSFlzAAAWJQAAFiUBSVIk8AAALpZJREFUeAHtXQd4FNUWPrupkIQWSqQ36dhQQRCkgw1BRdoTsCFNxK4gogIqApYnIKAgYns8EZWHSJUiSFVAkBJAqQkQekgv++5/dUMIW2Z2Z3ZmZ8/9PsjuzJ1b/rt79t5T/mNziEJcGAETI/Dee+/R5MmTac+ePRQeHm7ikVpraDZR7NaaEs/Gagjk5OTQxIkT6cknn2ThYMDisoAwAHTuUjkCv//+OyUlJVHHjh2VP8Q1NUOABYRmUHJDeiCwatUqqlChAlWuXFmP5rlNLwiwgPACEN82FoElS5ZQu3btKCYmxtiBhGjvrPEJ0YUPhmmnpqbSli1baPXq1cEwXEuOkXcQllxWa0xq9uzZVL58eWrcuLE1JhSEs2ABEYSLFgpDzsvLIwiINm3ahMJ0TTtHFhCmXZrQHtjZs2dp//791KFDh9AGwuDZs4AweAG4e9cI7Nq1i3Jzc6lly5auK/DVgCBgY0/KgODMnahAAM69Xbt2pbi4OPr8889VPMlVtUQAnpRsxdASUW5LEwRSUlJo0aJFtGzZMk3a40Z8R4CPGL5jx0/qhADMmtHR0dSoUSOdeuBmlSLAAkIpUlwvYAisXLmSatasSaVLlw5Yn9yRawRYQLjGha8aiMDy5ctlcFZYWJiBo+CugQArKflzYCoEfvvtN+n7cPLkSYqKijLV2EJtMBzuHWorbvL5wnoxadIkadpk4WCOxeIjhjnWgUchEEhPTyfoH9h70jwfBxYQ5lmLkB9JcnIynTp1ir0nTfRJYAFhosUI9aHMnz+fqlWrRg0bNgx1KEwzfxYQplmK0B5IdnY2TZ06la0XJvsYsIAw2YKE6nC2b99OR44coS5duoQqBKacNwsIUy5L6A1qxYoVVKlSJSpXrlzoTd7EM2YBYeLFCaWhwTmqffv2VKxYsVCatunnyo5Spl8i6w8wIyODEhIS6JdffmEFpYmWmx2lTLQYoTyU6dOnS9Zqtl6Y71PARwzzrUlIjQikMKCWw/GCi/kQYAFhvjUJqRGdPn1aUsuB2p6L+RBgAWG+NQmpEe3cuVNSy7Vo0SKk5h0sk2UlZbCslAXH6aSWi42NpS+++MKCMwzuKUFJyQIiuNcwqEcP5uoyZcrQhg0bqGnTpkE9FysOnq0YVlzVIJrTjz/+SKVKlaI6deoE0ahDa6isgwit9TbVbH/66SeqW7culShRwlTj4sFcQoAFxCUs+FWAEYCAGDx4MDG1XICBV9EdCwgVYHFV7RDYtGkTnTlzhh544AHtGuWWNEeAlZSaQ8oNekMA1ouePXsSXKwXLFjgrTrfNwgBVlIaBHyod3vx4kVC9CY7R5n/k8BHDPOvkeVGeOzYMTp//jwLiCBYWRYQQbBIVhvi999/T1WrVqUGDRpYbWqWmw8LCMstqbknlJeXR5MnT6YXX3yR7Hb++Jl7tYh4hcy+QhYb3+bNm+nEiRN0xx13WGxm1pwOCwhrrqtpZ7V06VKqUqUKxcfHm3aMPLBLCLCAuIQFvwoAAqCWg/UC2bu5mB8B9oMw/xpZZoQwb4KYdt26ddSoUSPLzMuqE2E/CKuurEnnNWPGDEktx8LBpAvkYlh8xHABCl/SHgFQy0FAdO7cWfvGuUXdEGABoRu03HBhBGC5OHz4MDtHFQYlCF6zgAiCRbLCEP/44w/Kz8+nZs2aWWE6ITMHVlKGzFIbO9G7775bskd9+umnxg6Ee1eMAJSU4Yprc0VGwEcETp48SUuWLKG1a9f62AI/ZhQCfMQwCvkQ6hfUciVLlqT69euH0KytMVUWENZYR1PPAqHd4J2MiYkx9Th5cFciwALiSkz4isYI/PzzzzRgwAAOztIYVz2bQ55UFBYQeqLMbdPWrVspJSWFevfuzWiYHAEwfZ06dYqGDRtWkAqRBYTJFy2Yh4cP3NixY6ljx44UERERzFOx/NjhyDZx4kRq0qQJLV68mObNmyfnzALC8ktv3AQvXLhAq1atog4dOhg3CO7ZIwI5OTm0aNEi6tatG02ZMoX69+9POF44w/HZzOkRPr7pDwIHDx6kc+fOsfekPyDq9KzzOPHQQw9JE/Rdd91Fv/32m/RVKdwl7yAKo8GvNUUA29R69epR7dq1NW2XG/MPAWRUf+aZZ2TSIhwtoET+5ptvrhAO6IV3EP5hzU+7QQBb108++YTeeOMNtl64wSjQl1NTU+m7776j119/XeqEoHPo06cPRUVFuR0KCwi30PANfxBYv369tF7AxZqL8Qjs3LlTWpJ27NhBo0aNotGjRyvKaMZHDOPXzpIjgCa8Zs2a7Bxl8Oru27dPZi9r2bIlXX/99bR371569dVXFQkHDJ13EAYvoFW7X7lypTRvRkZGWnWKpp4X/BlmzZpF7733nkwx8NVXX1GnTp1IxF+pGjdHc6qCiysrQSArK4tKlSpF2M6yglIJYtrWQezLfffdR7BUTJs2jfr16+dTB0w55xNs/JA3BCZMmCADs1g4eENK2/tIiAyfk759+0orRWJios/CwTky1kE4keC/miCQnZ1NM2fOpDvvvFOT9rgR7whAzzB8+HBq06aNZAtHaP2YMWNkegHvT3uuwToIz/jwXZUIHD16lJB7s23btiqf5Oq+IABT8uDBg6ls2bK0Zs0a6SrtSzvunmEB4Q4Zvu4TAtu2bZN+DzfccINPz/ND3hGAbgH5Td988036888/6Z133qEePXq4dHTy3prnGiwgPOPDd1UiMH36dHkGBkEMF20RAKcnuD3ffvttGT8B92h4QFauXFnbjgq1xgKiEBj80j8EENaN1Hq7d+/2ryF++goEkPT42WefpX//+99SAQxHNJDw6F1YSak3wiHU/rfffksVK1akatWqhdCs9Z0qlL7YlSGmBcrHOXPmEBIgB0I4YGa8g9B3fUOqdeTdbNCggUff/pACxI/JQjBs2bKFXnzxRYKVAjETL7/8svQv8aNZ1Y/yDkI1ZPyAOwTAI/DYY49xcJY7gBReP3v2LPXq1YtatWpF5cqVo19//ZXgWwLns0AXFhCBRtyi/SFkOC0tje655x6LzlD/aZ05c0bGSYD9G/oceETOnTtXHtvUukhrNVp2tdYKyRBuB2Y3MBDhFw4+/1zUIZCenk7Lli2jESNGEF6DqwE7MU9h2Op68K02u1r7hhs/VQQB/PJhB4FgIC7qEEC8SuvWral79+6E0Pjt27fTkCFDDBcOzlnwEcOJBP/1GYG//vpL/vLdeuutPrcRag8eOnSIBg0aJIVD1apVacOGDdLxqUSJEqojLvXEjq0YeqIbIm2DpQiBWbVq1QqRGfs+zfPnz8tj2CuvvELly5eXcStdu3b1vUGdn2QBoTPAVm8e+oePP/6Y3n33XVP98pkRdziRDR06lHAkQzoAmC7j4uLMONSCMfERowAKfuELAggQAr29kybdlzas/AwEKNiiwc/wwAMPSD3Nxo0baeDAgaYXDlgX3kFY+dMZgLktWLCArr76aqaWc4E1sprDNRqsTqB7A8sW/gZTYQERTKtlwrFiB4HMWeHh/FFyLg+8IGfMmEHjx4+X7NFff/21VEYWK1bMWSVo/rIfRNAslfkGCoUbYi8Q4o1dBBeSaesQho2AtSeeeEJyNcTHxwclNPCDYLEflEtnjkFj6wzrRagLB4RhHz58mJ5//nn64YcfqHPnzjIsG27SwV5YSRnsK2jQ+J1RhlC+hXLJyMigl156iW6++WYCmxYC1v7zn//IGAor4MI7CCusYoDmgDRtEAyIudi2PZFOnDhBta++UbzPF55/NqGHUEepHqBh69INBAPIWpClym63Sw5I5Lm0Gs0/CwhdPj7B3ShMc9g2QxjAhAltfFJSEiHKEMLBLnIrLFm2U0zSRsdOXkMff3aeYmPslFAhnGrXjKCKCeFUrJiNwuw24RsR3FgUHT2IWw4cOCDZouEm/fDDD0sPyJiYmKJVLfGelZSWWEb/J4EPPjJx4ywNgQAFZGZmprROFC9eXHr9QdkGV2B8GeD3UKlSZZo2/UtKS8ez+XQ0OZeSjudSRoaDYorbqVLFcGrcIJLKlw0Xv7L+j9HoFoDNyJEjJR8k6N7AzwAiF+wgrFigpGQBYcWVVTAn7BAK7w5wXIBAgAAoU6YMQRhAyQZuyejo6MtaRN0qVarQ77//Lr8ghW/m5TnozNk8Ongklw4dzqETKXlUNj6MGtePolpidxEVGXxbCmTD/vTTT2nSpEmS/xGCAbT+VhUMzvVkAeFEIkT+4uiAYwMChbA9xpEB/gsVKlSQqeBBfqrkDD1lyhRJnLp//35p5/cEX1p6Pq3fnEG79mRLPUWntjFUrUpEUBw9IETh3PTII4/IXRUEBAKsQqWwgAiRlc7JySFEXIK6DEIBQgCBVRAI2CGAd0B8GBSj0a1bN0J6PZj0lDwn5BKlXsynHbuyaMcfWVShfDh1bFtcHkMUdxrgimBxgtly69atUs+AxDSVKlVSNN8AD1W37lhA6Aat8Q1jtwA9AvImQDBAx4APOATDVVddpTi7s6uZwDkKLsT333+/q9seryULHcWa9RnieJNPHYSQqC52E2YqMFW+//77MvFt06ZNJcMTTJihWFhAWHTVoUsAvwByM8bGxhKS2ECZpkVBu61bt5b8D76ewbGjWLwijRL3Z9MdHWLo6lrGZwCHQIWeAVYJhGHjdagT4LCA0OIbY6I2UlNTJcHpkSNHpKLxmmuukfoFJXoFpdNo37693IF89tlnSh9xWQ9C4tdtmUI/kUmd20FIGLOTwM4KdG+jRo2Splw4PfXs2VOmsnM58BC6CAHBfhAWWHAoHvfu3SutCtgxgNkJuSl8/YV3B8mpU6cktRzyQfpboPJocl208LcQu4nlacJvIoYqVwyskICiFlmq5s2bJ0Ox4QHJpDeXrywLiMvxCLp3MMGB/RhKQ9Ck6xkXAV0GhNEtt9yiCU4QEjfdEC19J5auTKeH+wQmXR/mAEYnRFs2btyYYI2BfobLlQhY08Pjynla7gpMcCAeWbRoEVWvXl0mb9VTOABAZM5q2LDhZZmzxEmB5n6bKvUJvoAMIXFnxxjpH7FoaRrh6KFXgZ5h6tSpUiiAfRs7BuTyYOHgHnHeQbjHxrR34OC0du1aaaXArzkiKvUuOKt//vnnkvyk6NHl9Jk8+nFZGpUrG0alS4WpHkpEhI2a3RhNPyxNl05W8WXUt+GpU8SQrFu3TuoZoLjt37+/3EHAQ5SLZwR4B+EZH9PdhXAASSwUkvfee29AhANAWL16tRRIRRPjiA0AlS5ppzyhS1i1NsNnvGrViJQxHP604apz+IAAJ1heoKzds2cPvfXWW8TCwRVaV15jAXElJqa9glgACIeaNWvKD30gE6vgeIGMTxERVyoSS5QIo+rVIujs+TxauCRN+Fz4BmHrW4vRsaQcOn4y17cGCj0FQTp69Gh5fECMCcKwQRprRPq6QsMKupcsIIJkyeDwtGLFCvklbd68ucsvqp5TwZEGJs6ixwv0WaaUXQRo5dMd7WPo+Ilccdy4KOI6xJZCZSkt2omLC6N9B3JUPnmpOqJNwZMJ56YvvvhCZquCGbNdu3Yux37pSX7lCgEWEK5QMdk1ePetWrWKrrvuOrrxxhsD/kHHNn3nzp0yHZwraKB3OHM2X4Z797g3lg6JQK3lq9NdVfV4LSzMRvXrRIjnfRMQcCdv06aNzA/apUsXmaUKLtKB3Gl5nGAQ3mQBYfJFgxnzp59+kpp3MCIL35WAj3jcuHF07bXXuvURiBFcEIjizM11UFxsGPW6P46SkvNo284s1WO9tlEUnRdu2BdF7IbScvDgQSm8IEDh/4H4CZgwrcrRoBQXLeqxgNACRZ3agCJy8eLFhNRsTZo00akXz83CZwCmQU9xF04mqex/fvjLlA4TRwU77RYRnGrNlsWK2amkeHbfn9meBybuQrcwbdo0atmypXQtnzNnjjRdQlAYIUi9DjgIK7CZ08SLBhs9wrFbtGgR8GOFExY4EcGDElYAdyXsH6tknthBgGUKJSfHISM4MzMdkl1KXlT4X/lyYbR3fw5df83lPBSFH4deoW/fvjI69Z133qHHH3/crwC0wm3z60sI8A7iEhameoVwY6RoA3OTK8tBoAaLrFAQUnCQclcEs5ws4pRRUHp0i5NEMWvWq9dFlBY7EPBc4thStCD7NXJZ9urVS7pHg15+8ODBLByKAqXRexYQGgGpZTM4WkApiK2y0bkbZ82aJc/3nsbhVIs48h109lyecPt2SHKYpsKNek9ittRNqMEnLtYuXLqFTuMfcyk8IJOTkyXdG3ZT4LQAFwXCsmvUqKGmaa6rEgE+YqgETO/q+DLAYgG6t7p16+rdncf2U1JS5FjUBGch8OrahlHUQFDMRUfbpA4CfhFiE6K4FBeEtxAOeA4enIgcffbZZ2XoOvwxbrvtNkXMV4o75IpuEVCxbG7b4BsaIgA6OJz5wdrkyudAw668NvXll19S9erVJf+k18r/VMgRPk4XhAUiS+wANm/LogTBHgVKfDUFCsac7CwZZTl92nsyS9Vzzz0nqd/A1cAlcAiwgAgc1op6+uOPPwqo4BQ9oGOlJUuWEDglvAkqp6UCX+ybro+WPhA7dgsrhFAhdBe6CDUFO6jdf2yiObPG097dSwns0chtCRYrLoFHgAVE4DF32yNyT2D3gDTx/pjp4Dtx7Ngx+eV225mCG1u2bKHp06d7rekUEFBW1qsTSSVL2OmiIKutdFW4Kt5JhKyPGDFC9lm7bB6tXDyfmjRvb6iS1uvkLV6BBYRJFhjh2/hCwtHHnyzQ+AVev369X20Akp9//lnS4MOK4rUUOkGITQRVFIJBTUG0JSJF4dyE12NfG0UPFZ9GcQ0qk91F7IeatrmufwiwFcM//DR7GjyS+OX3N3QbplEkvsHRwNcCIQMKNjhHKXFTdsqHTKF3UFPgwg2zJZSOTz31lIyXQKbw4cOfEruGSHLkpKlpjuvqgAALCB1A9aVJKCfh75CQkKDq8fT0dOGWfFFYC/5Ol4eALlg//MksDQGD4Cwkh1FS4GoNReSuvd69H53t4SiFXJagxwPLNshvwJRd4B5tF1GjDv+jOp398V/fEFC3F/StD37KCwL4csPvAfRncEryVpA4dteuXTLXBXYeeB5fLOS5gLDw5NTkrW3ch/MRzIsIDFNSiglzZr9eJShcBFt5K9jhzJw5U3JBggELEZd333335ToXcU6xQUDksYDwhqfe971/GvUeAbcvYwrgHFW9enVFaMBPAunvEJ+BFHhhwtcZHo9IhQe+AyTD8af873//k9yW0IcoLcVFDIWngpgOuI4PGDBAEs+AqwHu0S69RHFSsak7rnjqm+/5joDnVfW9XX5SBQJwSALbkVKWo+PHj0vSGOw4IBDg5disWTNpjoRJEjsKfwp+1cG6pFWBXgE5JqDwBCMV3g8ZMsS1cJCdOsiRL7ykwq4kp9FqTNyOMgRYQCjDSddaOI+Drl7J8QIDwXGiqF8Ajhx4HhGOaK9ogXUAxwZvBaHl0GvA/8DfgvwczzzzjFQ+Yn5r1qyhCRMmSJ2DZzOuEHB5Qp9h5w2uv2vg7/MsIPxFUIPnYb1ASLfnL82ljvBlL1DmicswkYJxChYQMDRDwYg6hQu+nLAYeCtgem7UqJGHX3dvLZCk4EcMB3QhaA+vcWxRqtNwOAQXRG4m2SJivHfGNXRFgAWErvAqaxw5NIvuCLw9Wdi7Eed7tAEBgbBsvIeQcBYIC1gmlBw9oCcAtZxSYeXsA3/RPrwvkdNy5MiRNHbsWJlFvCjRbeFnXL6GeRMOFRGxLm/zxcAhwAIicFi77Aneg/AHiI+Pd3nf1UX4JuAo4SxQTkIxCdMm7kFIQE+BiEfcg+kTQsKbjwWIXpEcBzwLagoEA7JU9enTh7p37y5zgUJADRs2TKYAVNMW6jqyU8XxIoxsrINQC53m9VlAaA6pugahL4DnpEttvpumELAEsyiOFiBpxZcTCXqdv/rwpQAnI9qEbgL14PTkzbqBNHRQfHoTJIWHhf6xU4BjFsyjSO6LI4U/KewcGaeFgBAJffGPi6EIsBbIUPhJchsotV44h4pM3WB6ApU7/CCgjyiaHQptdujQQSomcRwpfCRxtlP4L44lU6ZMkQllCl939xr1IQgmTZokBdA333xDHTt2lMpWd88ovg4BESaEA/5xMRQB3kEYCj/JBDhK3JkLDxNHCZgM8aWHdQAWB1cZvLGjgGXDm3BA20gog2ML+B09FRwn4Idx++23Sz0DdiaIIUFyGoxFi+LIOEW28OLiiMECQgs8/WmDdxD+oKfBszApqjleOLusUKEC4Z9WBb4JKEiO466AyQnu0d9//73cLSCRT2Frirvn1F53pB0nihRh4nzEUAud5vV5B6E5pOoahJJSqf+DupbV1QZr1NChQ11+4XGMefnll6XZEiHp8JVYuHChy7rqenVdO//CEbKXrC4Vla5r8NVAIcA7iEAh7aYfWBeUHAHcPK7JZZhAYd6ETqFwQcwHsoe/9NJLUpfxwgsvSCEC1249S/65/RTRoI+eXXDbChFgAaEQKL2q4UxvtICYPXu2jAMpTAALodG5c2eZhGbQoEGSINaXo5Ba3Bz5ueRISyb7VTerfZTr64AAHzF0AFVNk1AkwgxpZIFzEzJnoSDN36OPPipjPRBtiSxVsG4EQjig//zkLSKSUyhWS9XCWy4GI8ACwuAFgP7BSAGB+Aw4U8EqMmPGDJn0FpGhYHgCaW1gs1QJqvs/F5CtbCODV4W7dyLARwwnEgb9hYlTSRCVXsMDUQuctZ5//nlCVClS2SEM25AiIjjzj62nsFr+B4oZMn4Ldso7CIMXFQICrtZGFJg2YbbEGHr37k0HRRJc8DWoKZlLH6fsjW+KOIy/I0UduRmUs2M2Zf30lJpmZF1H5llyZKRQWMVmqp/lB/RBgHcQ+uCquFX4ERSOq1D8oI8VoRRFnMYHH3wg/4GBCscJxFEoKflnD1Be0jqKaPh3vIYtOp5yd8yi/OO/kb1cI8o79gtR9gUKq99bSXOX1ck7tVMEaYWJdnzn07ysQX7jNwK8g/AbQv8aKFGihHSX9q8V5U8jS1V1wVwFOvuBAwfK+A2QxioteYdF4NfvMy9VF5GXtvhGZC9/HUF4RNTrRcV6rqbIG564VEfJKxHinfvbZAqv14NscJLiYgoEWEAYvAxghHLySuo1FChBly5dSs2bN5cp7BBclZiYKMPCEZwF0lilJbxRP1HVQdmb3paPwOsxTJgkI28ZSdF3zqHwxv19iqHIP7uP8k/toPA69ysdCtcLAAIsIAIAsqcuypQpI3UQ8KjUuuA4sXfvXmm2RKwE+CsRbYk0dggvR8aqV199VVVmbFtYFEVcP4Ryd39F+alHyJF+ksLK/W0i9Wf8uX8uIltsRbKXqOpPM/ysxgiwgNAYULXNwQ8CSkLEOWhZnFmqYKaE2RL/vvrqK+nfgH7g+4A4kK5du6ruNrzeAxRWqQVl/dBXKBVPk610bdVtFH0g78BCCm/wL5HlN7roLX5vIAIsIAwE39k1oiDhuahFwXECtPIQDPBj+PDDDyW7VJ06dS7z2ISwgHOUk0NCXd82irjpGeHxKIKqhNXC5uevPqweJKwgEfL4om4kXFtfBFhA6IuvotZB5JKcnKyIEs5dg4jpgE9D27Zt6cUXX5Th2EgE3L9//yvCsOF3gaNGu3bt3DXn9TqCqcLq3Cv0DREiNNv3X32wR+X+Pk3oHu4TwVnMYu0V+ABXYAERYMBddQdFJUyd0Bn4UkAV16tXL5nCDuxUOE5MnDjxCsHgbBtBWFBS/utfYkvvc7FRWLX2YgeRRXlHVvvcSq44WjiyLgjrRU+f2+AH9UOABYR+2CpuGaZOMDSpdZhCsp0333yTcHw4diyJ5s37WkRf/iiVkZ4CwPAMGKZr1qypeIwuK4KaXnDL5u75r8vb3i7mn/uTcje+RZEt3yBb8XLeqvN9AxBgRykDQC/aJXYQOCJAsQiFpbeCHQBIYZF8Bq+ffvpJ6n5vGcrOWkoH9m2mqtWfEAxTrr9wEEJTp06lMWPGeOtG4X0bOS4cElFWwpNSEM2qKTlbJxPFVabwGp3VPMZ1A4gA7yACCLa7riAgELSF/BjeCo4GCKwCzRwsEL/++hv1e7AOpaWuobLlu1Beznk6nuT+Fx2BWaDIR9Jcv4sweaI4hOcklIxqSk7it5R3aDlFtX2fLRdqgAtwXRYQAQbcVXewJCDxLjJ8uyu4N3z4cHk0wJEEO4jx48cLqvvSlHL8G7qq8kMUX66D2D08Sannt4gIUdd+FVBkgtAWodz+lgKPx9x0ISCUh6znix1Hzi+vUfh1g8iugYnU33nw8+4R4COGe2wCegf6AJDB4qhRmIIOsRJgjIZlAnEbiJsonA07O/ucEAaZFF28qnj2AkVGJ1C9RlOESdP1UQWZrh555BFN6OJsMX9zYjpys4WCNR/qCK8FAVlZSweSPb4eRTZ+xGt9rmAsAiwgjMW/oHcwVcP8CGtG2bJl5XU4M2HXAB7I119/XUZeYvdQuNhEcBOsH0cOThbHi3MUFh5HV9efULhKwWv4Wqxfv146TBVc9OOFXXg+Eo4Z+YhG9W6BQY3sNSOIctIp6q4vxbORfvTOjwYCAT5iBAJlBX2Atj46OppOnDghE+H07NlThmBDVwBWpyeffJKKCgc0GxFRiiIi4ykr45DYQZwXu4ls8Uvu+rccnJM4WhTNoaFgeK6r2Oxki6vyz/HCi4DIy6LsVc9R/pndFNlpBtmiS7tuk6+aCgHeQZhkOXCsQNDUu+++S3PmzJEJdBcvXkw33XSTxxFmZR6nnOxTVC6hm6hnp3IVughjQrErnoGHJVLxKU2ge0UDbi6E1ehEeYnfCI9M9xYMh0jEC86IvINLKLrzJ2QvU9dNa3zZbAiwgDDBisD0iDDs1157XaThO08fzRhJ3R94TioTvQ0v7eIeoW+IpgoJ94vjhfvENdBtwLMSugwtS+T1g8kB7ofwK4US+nGI40f2qmcpP2mTOFZ8RfayDbTsntvSGQEWEDoD7Kl5/KpDMTlu3Lh/2KMHU++e5cjm2CqODsIJiYp7elzey8o8LOrGC+EQU1AXx4yzp1dLq4bz4s8//ywVoHDF1rQIHYRTWVm03fwLh4VwEDEbWakU1fljIRwaFq3C702OAOsgDFggKBWheOzXr5+klod1AmHZ48aNpXoNBggNQqRQOn4gfn0hJDyXHKF3iCpW8bJKZ06toJPJX192bfTo0dK1Gq7YuhcxPzBLZc2/R2bqjr7zM0EowyxRuuOuQwcsIHQA1VOTyIY9cuRIatKkicyHiSxV4GWAFQMlTOgPatZ9ndLTEinp6BxPTcl7kZEVKP3iPuGqnSIVlGkXE4VwmEclSl3SXYDKHtaLe+65x2t7/lZw5Fyk7LWjKGv5UEE714Oiu8xjN2p/QTXweT5iBAh86Bnmz58vXZzBw4BUdo899pjLpLtRUQlUtcZTdOSv94XCsTglVHxAKAFdL1WZsu3owrlNlLjrWZFPIoIcwmkprtSNlFBJ6AX+KbCCwBkL7FG6FeFJmXtoJeX8+p4IzsiU8RXhNdmFWje8A9SwTWx3vdinAjQSi3YDPcNff/1FPXr0kOZLhF9PnjxZUSKa8+c20sH946n8VfcKIdHLo6UgI/2g8KMQ/gVRFaTZszCcgwcPpjVr1sj+feN/KNxakdfCQSr/YjJlr35eENduoXBBWR9529uq4zKKtMpvTYCA+KzYWEDouBDOfBPfffed5GkYNWqU/BX3FGl5+XAcdDH1Dzp4YDzFxDYQu4onxRHEu+Ly8jZImk+R70LTI4YQDHmn91DOtqnkSFpPtvLXU2STYX8rIj2YPIuOjd+bFwEWEDqtDejj5s6dK/kewQOJpDTdu3f3ubf09AN09OBUsUNIo8rVBlFsXGOxm1CmPoI3JrgiIKyUCyb3QwV3Q96JLZQrfB/yj6whe4UbCES24VXbun+I7wQlAiwgNF42nNYQLQmCWCgG3377bRo2bJg8//vbVb7wJzhy8H1hvlxD8WXbUyUhKOwKGJicwmHZsmV+DMFB+ekplLdnLuVs/0joGNLJXrkFRbYYK0hmhSclF0siwAJCw2Xdvn074QixfPlyGQz19NNPU/Xq1TURDs5hInvVxdSdlHz0M0Euc4pKl2lFZSvc7ZH7oV69ejJb1gsvvOBsRtFfZMjKT9khvB+XUl7yZqLUo4J7soqkpbdXaUn22EpCz+BacaqoA65kegRYQGiwRPBn+Oijj2QG7EaNGkmnp2bNmmkqGIoOE6Hcp1OW0ZlTSylX8D+ULH2L+NeCihWvISJBL3lTgueyatWqtHv3bqpdu3bRZgrewxXakSUo74QQyD+bKDJsbxIKx1+FRSSD7CVrkj2hCYXVvIPC4Oik8GhT0Di/CFoEWED4uXRghkZuSxwt4MvQpUsXP1tU//iFC9sp6fDHlJnxlzhyFJPCopzYVRSPqSWS5DxP8KAEB0Th4sgSQV3px6UQyDu0ghyndwnhcERUEXqN6DIyN2ZYwwcpXCTEYSLZwsiF1msWED6sN4TBypUrpbMTzJeIsnz00UcLHJ18aNLvRxwO0NUlC1apPQTTaEb6fuE4lUsdbl9Aox7vQoNuK075GWdErHWqZH9yCKJZ5J9AXk3k00TwlL1UbRGZWZlsxcqK1HeXdiF+D44bCFoEICD4EKlw+eDPcODAAcni9N///pc6depEn3zyCeGMb3TBMkZHV5H/wCqVm5tKK5Z/I5Lx/Idua92GHJGJQgDUEjETInNVXFWylawmhEMZskVdzi1h9Dy4f/MhwAJCwZpAOIDebcSIEZJBGm7LDRuaN/AoXJDGJO5LFQIjiure2lvEagQg/kIBjlwl+BBgAeFhzRAi/cUXX9CECRMIMRTgaYCzkSviFg/NGHILfhiPP/64CB9n4WDIAlikU/akdLGQ2DFs2rRJ8DO8JjNQ9e3bl1555RWZ8NZFddNdArUcrBf79u2TOTJMN0AeUFAgwDoIF8sEklhYJkAU27p1axlHAVr6YCrTp0+XRyF4cXJhBPxBQJm/rj89BMmzyGyFjFPQLeCXd8GCBQTKt2ATDiC+XbhwIcEXgwsj4C8CIa+DQGaq1atXi+xUT0s9w8CBA+m55567jHreX5AD+XxmZqYkn3n11VcD2S33ZVEEQnoHAQbp22+/XeaZaNWqlUx6+9JLLwWtcMBndN26dQQh0VZrajmLfgF4Wp4RCEkBcezYMZlvAu7HJUuWlDsIhEPHx8d7RisI7iJ/Bhy3lOT4DILp8BANRiCkjhjISYnzOfwZwAP58ccfy8jLiIgIg5dBm+6PHDlCv/zyC40dO1abBrmVkEcgZAQEGJWgX4A35FtvvSUjHCEkrFQ2b94sKezq169vpWnxXAxEwPICYufOnTLCEsQp4Gn4/vvvNUlca+Caue36xx9/pGuvvbYgdZ/binyDEVCIgCUFBAKqTp8+TdArvPPOO4TEuDBbapLyXiGwRlRbtGgRffjhh4KWzn2WKyPGxX0GLwKWExAQDl9++aUIdX5WflHgNIRs2Mh7aeUC4QBfjjvuuMPK0+S5BRgBywgIuEeD+wAKum3btkl9w5AhQyghISHAkAa+OwhFRJYijydyfHJhBLRCIOjNnPhyQHsPanf4NMC8h2jLMWPGhIRwwAchKytLxo6w74NWXwtux4lAUP/cIAHNxIkTJd0bUtqvWLFCZqyKjIx0zi8k/p45c4YOHz5M3bohwzcXRkA7BIJSQCAMG8FUMFdCGYksVQiwio0NTSak999/n5o2bUq1atXS7pPBLTECAoGgOmIgEGnXrl0y4S28BW+++WZJyPrEE0+ErHBASj8oYgcMGMAfaEZAcwSCRkAg8Qu+BDBV4ggBj8EpU6ZIj0jNUQmiBsFbgaNWixYtgmjUPNRgQcD0R4wLFy5IJickoUEGbPg2IEuVILMIFox1HefatWupdOnSTAyjK8qh27hpBQT0DHAdRrJbRF0ifR3CsK0SN6HVRw6eoWC8Kl5cfc5OrcbA7VgXAdNRzsFsuXfvXikQED+BD//w4cOpRo0avGso8jlEYhwoJhMTE6ly5cpF7vJbRsA/BExHOYcwbCjcJk+eLM2V+HUETwMfJ1wvNLAC7T4LB9f48FX/ETDFEQMuwhAGcHZCBuqZM2eyTd/L2uII9t1331Hz5s291OTbjIDvCBhuxUCy29tuu026RoP2bceOHdS1a1ffZxQiT8JygdB10PBzYQT0QsCQHYRTz4B8E/gV7NixI3366aeSiVmviVqtXehnsNuyeoSq1dYt2OYTcAEBZydkqUKeiWrVqhF4Gm688cZgw83w8YKBG96jViO9MRxYHsBlCATsiIEz82effUaNGzeWOgZEHyLqkoXDZeuh6M3BgwdlcBb8QbgwAnoioPsOAjuGLVu2yOjKDRs2UO/evSUnZCiEYeu1cIhWRdRq3bp19eqC22UEJAK6Cggo0oYOHSq5Ctq0aSPjKMqXL8/Q+4nA0qVLqUGDBpZg4fYTCn5cZwR0ERBIX4cIQ9jp4R6NDFWwVFid1UnntSpoHnobYMv+IQWQ8AudENBUQMCfYdmyZTR69GhCAlnsHvCP3YC1W70ffviBcGxjajntMOWW3COgmat1UlKStMlD39CvXz/66KOPOG7CPe4+37nrrrskrRzMw1wYAT0RgKu131YMhGGDjwF061A8QoE2a9YsFg46rFxaWhpt3bqV2rVrp0Pr3CQjcCUCPh8xkKVq/vz5NHLkSKksA718nz59pPPOld3wFS0QOH78OOEfuDe5MAKBQMAnAQF36Pvuu48OHTokad/AHh1qPJCBWJyifUydOpWp5YqCwu91RUDVEQNZqnr06CGp3mC23L59Oz311FMsHHRdor8bR8bu2bNny4A2tl4EAHDuQiKgaAeBbS0+nO+++65MW4cAK0QR8gc1cJ8iUMtBB8HRm4HDnHsi8iogkKUKhC1wekJAFaIHOTlL4D86SApUsmRJqlixYuA75x5DFgG3AmLVqlX02muvSe/HQYMGEfQM7AVp3Odk4cKF9PDDD0sXa+NGwT2HGgKXCQikrzt69Ci98cYbNHfuXLmdhaDgdPLGfizAyQl9z9dff83HOmOXIuR6LxAQyK8AfoZx48bJbNhIBou8E5wp2vjPBCj4GjZsyNRyxi9FyI0gHO7R3377LYFfAL4NkyZNkhGXJUqUCDkwzDhhCG54TbZv396Mw+MxWRwBOzgFHnvsMbrlllskx8DAgQOJhYN5Vh1CG9Ryd955p3kGxSMJGQTCYV/H+bZq1ap8nDDhsjup5di8acLFCYEh2UTqeAd7QZp3pSEYsLvD0Y8LIxBIBBCspVk0ZyAHHip9gVqudu3atHHjRpknJFTmzfM0BwKQD6pcrc0x7NAZBZyjYmNjZVax0Jk1z9RMCLCAMNNqFBnLihUrJMlvqVKlitzht4xAYBAo8IMITHfcixoEQC0Hbg3kv+DCCBiBAH/yjEBdQZ9IRQgntQ4dOiiozVUYAX0QYAGhD65+tYrMYyClhfWCA+P8gpIf9hMBFhB+AqjH46mpqTKXCFPL6YEut6kGARYQatAKUF0QAKekpFCnTp0C1CN3wwi4RoAFhGtcDL06bdo0mZQXuUu5MAJGIsBWDCPRd9E3gudmzpwp/7H1wgVAfCmgCPAOIqBwe+8MzlFIjAMFJRdGwGgEWEAYvQJF+gdBD/KLMHtXEWD4rSEIsIAwBHb3ncI56sEHH2RqOfcQ8Z0AIsDBWgEE21tXx44do7p169LevXupUqVK3qrzfUZAVwQ4WEtXeNU3/sEHH8jYCxYO6rHjJ/RBgI8Y+uCqulVYL0BK26pVK9XP8gOMgF4IsIDQC1mV7Z4+fVoyinPeTZXAcXVdEfg/27ikIv38l+sAAAAASUVORK5CYII=[/img][br]Welche Winkel sind zu [math]\alpha[/math] supplementär?

Es gibt nur eine Möglichkeit, dass zueinander supplementäre Winkel gleich groß sind.[br]Gib die Größe dieser supplementären Winkel an.[br]

☆ Welche der Aussagen sind richtig?