Betrachte die Abbildung. 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[/img][br]Gib an, welche Winkel gleich groß wie [math]\alpha[/math] sind.

Betrachte die Abbildung. [br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAATsAAAEOCAYAAAD2a7DZAAAAAXNSR0IArs4c6QAAAIRlWElmTU0AKgAAAAgABQESAAMAAAABAAEAAAEaAAUAAAABAAAASgEbAAUAAAABAAAAUgEoAAMAAAABAAIAAIdpAAQAAAABAAAAWgAAAAAAAABIAAAAAQAAAEgAAAABAAOgAQADAAAAAQABAACgAgAEAAAAAQAAATugAwAEAAAAAQAAAQ4AAAAAp5h2tgAAAAlwSFlzAAALEwAACxMBAJqcGAAAQABJREFUeAHtXQV8VMfXPXEPEBKChZDg0mLFvaW4UyhuhSIFWpwaVqdIi5RSXIsXl2ItFKdQpFgggUA8xN32mzt86T9AZDfZzcq782PZ3fdGz7zcnZl777lmKpHAiRFgBBgBE0fA3MTHx8NjBBgBRkAiwMKOHwRGgBFQBAIs7BQxzTxIRoARYGHHzwAjwAgoAgEWdoqYZh4kI8AIsLDjZ4ARYAQUgQALO0VMMw+SEWAEWNjxM8AIMAKKQICFnSKmmQfJCDACLOz4GWAEGAFFIMDCThHTzINkBBgBFnb8DDACjIAiEGBhp4hp5kEyAowACzt+BhgBRkARCLCwU8Q08yAZAUaAhR0/A4wAI6AIBFjYKWKaeZCMACNgNMLu1KlT6NatG+idEyPACDACmiJgNMLO1dUVjx49QocOHTBw4EA8fPhQ07FyfkaAEVAwAkYj7GrUqIEzZ87g66+/xpEjR/D6669j9uzZiI2NVfD08dAJgYiICKxatQpxcXEMCCOQIwJGI+zMzc3h7OyMjz76CFevXsXQoUMxd+5cKfS2bNmS4wD5hukjcPToUYwePRoBAQGmP1geYb4RMBphlzlCEnrlypXD0qVLcfHiRVSqVAkDBgxAq1atcPbs2cxs/K4gBG7evImiRYuiZMmSCho1D1VTBIxO2GUO0MzMDPXr15db2u3btyMkJARvvfUWRowYAR8fn8xs/K4ABG7cuAFvb284OTkpYLQ8xPwiYLTCLnPAtNLr3bs3Ll++jJkzZ2L37t1o0qQJvvnmGykAOSxuJlKm+04/bnSmy4kRyA0Boxd2mYNzdHTEJ598gitXrqBLly5S8LVp0wZbt25FVFQUWOhlImVa72FhYfKsjhRWtNrnxAjkhIDJCLvMAdJ2Zs2aNThx4gTc3NwwePBgaapCmtz4+PjMbPxuIgiQCVJycjKqVatmIiPiYegKAZMTdplAtWjRAr///rs0SfD395cGydOmTcM///wj/zgy8/G7cSNw7949uaKjHzle2Rn3XOq69yYr7Ag4S0tLDBkyRHpdTJgwAXv37kX37t2xYMEC0B9Jenq6rvHl+nWMwLVr10AG5+7u7jpuias3dgTMxFmWytgHoW7/b926JQUdCT1aCYwZMwZvv/22NGVRtw7OZ1gI0PzRNvb48eOwtrY2rM5xbwwKAZNe2b2MdM2aNbF27Vps27YNJUqUwJQpUzB27Fi54nv27NnL2fm7gSNAv9MPHjyQ53W8hTXwyTKA7ilK2GXiTasBMlFZvHgxYmJi8P7772Py5Mlyu5uUlJSZjd8NHIHAwEDQjxT9iJEJEidGIDcEFPuE2NraYtCgQXKVRys8UlzQ+d706dOl+UpuoPE9w0CA7OtoC1u5cmVWThjGlBh0LxQr7DJnpVSpUpg6dSo2bdqE/v37Y//+/dJUhfxuaYvEyXAR+Pfff6USqnz58ryyM9xpMpieKUpBoQ7qp0+fxrp166QbmqenpyQcIA8NFxcXdYpznkJEgM5biQGHvGeKFy9eiC1zU8aIAAu7bGaNqIJOnjyJ9evXS1op8sGlc73OnTvDwsLihRLkk+vg4ADy4OBUuAi0bt1aamDp/JXmgBMjkBsCit/GZgcOCa6uXbti2bJlmD9/vuTMGzlypPTGIKaVzESfyUWNtlOcCheBlJQUSeZKnhMv/wAVbk+4NWNBgIVdLjNFlEHkbkbEkKS4IAPWHj16YMaMGZJZZfPmzSDtLZ37zZo1S2pzMzIycqmRb2kLgadPnyI6OlqanbCw0xaqpl0PCzs15pe0feSBQcKNlBhELtC2bVscO3YMw4YNk0KQFBvkscEmEGoAqoUspDyiH5oKFSrwyk4LeCqhCkslDFIbY7SyskKdOnXkSqJly5YgP9u7d+9KtmRi3hg1ahQaNmyojaa4DjUQuH37Nsh8yMPDg39g1MCLswC8stPwKaA/MGJPoa0rxcMgK34SerTKo3dOhYMAnZOWLl1aMhQXTovcirEjwMJOwxn09fWV29mmTZtKOnhix+3YsaO0ySPS0EmTJiE0NFTDWjm7pgjcv39f+jfb2NhoWpTzKxQBFnYaTjwJNwr6Q/TvFAeDzugWLVoklRPjxo3DL7/8gtq1a0tNbmpqqoa1c3Z1ECDTIFJQVK1alZ3/1QGM80gEWNhp+CAQnRDFuiAjY9pGkWErKTDo87fffotz586BVn0ffvihPMM7fPiwhi1w9rwQePLkiTQHomBLdJbKiRFQBwEWduqglCVPJrsGrfBIoFHQ7qyJ6MF37NiBgwcPSn9N2uKSuQodqHPSDgKkiSWfWC8vL6kB106tXIupI8DCrgAzTIIvU/i9XE27du1w4cIFLF++XK72atWqJW31+DzvZaQ0/06KIHt7e7mazgl/zWvlEqaOAAs7Hc4wbbEoeDOt6saPHy+9Meg8j871EhMTOQhQPrEnlmky+Kag6ZwYAXURYGGnLlIFyEdO6gsXLsT169flOR6d87Vq1Uo6saelpbHQ0xBb2sbSFpbMgDgxAuoiwMJOXaS0kI9IJn/77Tf5IiHXs2dPSSd19epVkK8np7wRiIiIQFBQEKpUqQI7O7u8C3AORuD/EWBhp4dHgeLanj9/Ht999508zyPXMwrwTdszNlfJfUIyNbHkJsYxJ3LHiu++iAALuxfxKLRv9IdK/rakxCCyATrH69atG1asWAH6g2ZCgeyngrawtAouV64cm51kDxFfzQEBFnY5AFNYl8k+j4ySKcYtma189tlncmu7c+dOkM8tpxcRICp24q4jBQUnRkATBFjYaYKWDvO+8cYbMh4G0UmROQUpMT744AMpBMljgNNzBMhNjAQd2TlyYgQ0QYCZijVBq5DyRkVFyZCPa9asQWRkpFRk9O3bV2pylcDdliHIFTIomrF4UdAwcyH8M1Mb4b1STHivELEqhcPkxAioiwALO3WR0kM+2rKtXLkS27dvBzm8Dxw4EL169UL16tX10BvtNxmdkIawmBSERKcgIi4Vz8QrMj4ViSkZSEtXCZMcwMrSDHbW5nBxsoNVSgQ+fr87Br7bAx9/8ilT4Wt/Sky6RhZ2RjC9pMSg7e2hQ4dAQYBIodG9e3dJM2UE3X+hi35hibgbEI+b/nG4GxiP4KgUxCamI00s5czMVHIVZ21pDksL4Z0iStIKLzVNCD8LO0T4XcWdTROxcuk3GCpIU4kslRMjoC4C/LSoi5Qe8zVq1EgyqZw4cQK0tSUK+H379kmWZDJjMXR7M1q1nfeJxpk7kfjncRzCxWrOVqzWShWzQU0PR1QoaYeSRWzg4mgJRxsL2IkXCTwSdrTCS0hJR6qZHTauPwtfwehUolQZFnR6fB6NtWkWdkYyc+Qt0KlTJzRo0ECSDKxdu1YqMEhrSy5pb775psGNJCAiGYeuhePAtTD4hiSiuJMV6pZ3Rr3mJVGltAPKudrC1clarObU6/oJy3C4uRSBuzuf1amHGOfKigBvY7OiYUSfHz58iD179siVHikxaFtLGlzy0tB3iklMw7ZzIdhyNghBYptap7wT2tcqjnrezqjgbi/P4PLTx0FDhuHmrdvY9usmVKlcKT9VcBkFI8DCzognnwyPb968KQMAbdq0STKBDBgwQMbDcHd318vITtyKwKJD/rjzNB7NqhZFn8buqOfljJJFrQvUn6TkVMEI3QHORYrhp2VLULoU29kVCFAFFuZtrBFPOrEkE3VUxYoVpfcFKTHIQHnv3r1yizto0KBC8zKIjE/DooOPsemvIFQqaY/vB1aSwq6Ec8GEXOb0BAWH4Fl4OGrVqcta2ExQ+F0jBNioWCO4DDMzeRSQEoN8bSncIxndEkU8cepRICBdp3+fxmHwspvYcCYIw1qVwfIR1dCzQQloS9BR/8mFLjwiCuU8yskVrK7HxPWbHgIs7ExoTolKipiRyTbv559/BjGEdO3aFUOGDAF5HugiHb/5DP2X3EJYbKoQclUxrasnvEton43k0SM/YYKSJkxvygmzFH5sdTGXpl4nPzUmOMPkb0tnd7SdnTNnDk6ePInmzZtj9uzZIO8MbaWdF0Iw4pfbqOhuhzWjaqBDLVfYCJMRXSQ/P1/YCXbikqyJ1QW8iqhTN0+mIqAz7EGSWxkZIFNoR9rKEnfe/Pnz0bhxY2zcuBHEp5ffRO5c284H46MN9/BWDRf8NLwaqpd1yG91apXz9fWDa3FXESe2mFr5ORMj8DICLOxeRsTEvpOXAYUcXLx4MSjSWdmyZaUHBp3nUSQ0TRMFBT94NRyTNvgIcxJXLBxcBe5qalofClu7v/1i/msyUhgbn7sfLb0n/ruYzYfYuAQEBwWifLmyKFa0SDY5+BIjkDcCLOzyxsgkclA8DNrK0taWlBiPHz9Gs2bNpJmKv7+/2mO84BODj9bfR4vqRbFoSBUUsVdPoX/FNwYdvr2Grt9fx9ZzwXgQnIDmc65gzq6HSEjOyLX94JAQQXcVLleqThx3Iles+GbOCLCwyxkbk7xDUbn69++PixcvSrezbdu2oU6dOliwYAHi4+NzHbNfaCImrLsHD+H5sHhIVTjZWuSaP+vN4o5WWDu6OnZ89Dp+PPwEI8VZX98m7jg8ow6c7XKvJyAgEOHPIlFGrEodHOyzVsufGQG1EWBhpzZUppWRNLfkY3v58mW0b98eM2bMkOd55HNLTMC0Xc2aiKFk9k5fRAhWkiXDqsDNWbPg1F5CQ9u0SlE0qVwETkK4RSWk47Pu3i/QN2VtL+vnp0/8xVZXaGLLeUh/2az3+DMjoC4CLOzURcpE81WqVElua4kp2dHRURon9+7dG1mDAKUKZ/ztQvO670oovulXEa8J5/2CpLLFbdGgogiDqKZP7GOxzbaxsWX+uoKAzmXBwo4fAolA69atpcJi9erVuHbtGpo2bYqpU6fisbBv8wmJx1d7HmNgi9Lo06jgbmi+IQmglaK66ZGfH4oXc4GLWI1yYgTyiwALu/wiZ6Llhg8fLv1tp0yZgg0bNqBJk6YYNuELOCAWc3pXLPCo44UyIkSQA4QKwk51UmR0DIKCg4TnRFkUd2Fhpw5mnCd7BFjYZY+Loq8WKVIEX375pYx89labt+FzYgUSj07BoT3bhKLg2SvneZqAlSi46YifLik1dw1sZp0hwaEIFn6xZDJTVPSLEyOQXwRY2OUXOQWUo0DUGzasx6Yt2+Hl4S558/r0G4j9B48IT4zofCFApJ0VBVEAvdRJAYEBQsBGCGFXRpCUCuZOToxAPhFgYZdP4JRUrGOHtjh46DC+n78AwUL4DBg4AB9OnILTf51HQmKSRlAQE/EvI6vjm77qbYkDAwJk4HAPoYnlxAgUBAEWdgVBT0Flba2tMGbUSOF6dhwfiuDep04dR78B/fHFV9/i+s1/RVDvF01VcoOmgvClLeOi3irNX7CdkEG0O0cSyw1SvqcGAizs1ACJs/wPgTKlSuDLubPx25696CwYVtatXS2ing3Gj0uWwe+x//8yauFTanoGyLvDpVhRuLGw0wKiyq6ChZ2y5z/fo69X+3UsX75M0EmtEuSh3vj6668xaPBQrF2/UXo75LviLAWjIqOET2wQypYpAzdX1yx3+CMjoDkCLOw0x4xL/D8C9PB07thOxsH4bt53EBz/mDJlKt4b+T727D+E5BT1bemyAzU0NBQBgYEgyqpixZjtJDuM+Jr6CLCwUx8rzpkDAsWKOGH4kEHYtGkDpk2bCh+f+/hABP8ZN34Czp6/lEOpvC+HCAKAZ0IT61GuHGzEmSEnRqAgCLCwKwh6XPYFBMh3dfrUydj66xZBIzUIh48cwdAhg/HpzNl44Of/Ql51vgQHB0tNLNXLiREoKAIs7AqKIJd/BYHXa9bArJmf49ctm9GyVSv89NNP6Nm9m1Bi/ITo2NyZVbJWRj6xlkITW0psYzkxAgVFgIVdQRHk8tkiYGtjjeZNG2Ped99iw/r1YivqKZlVOopA39t37cm2TNaLSckpCAh4KtiJXVCqZKmst/gzI5AvBFjY5Qs2LqQuAmQ20qVTB6xauUIEAVqOxMREvDdsCHr06oPzF6/kWE10dDQChXKilIiUVoLNTnLEiW+ojwALO/Wx4pwFQKBUSXcM7N8Pe3btxKzZc3Hp8hV069IJ4yZMxOMnAa/UTIqJpwFBcBfCrpgQmJwYgYIiwMKuoAhyebURsBAhEMsJZcO4saNx4vjv6D9oCNauXYsWzZpg/qIfEZ/wP9ez8PAwREZEonz58rAwV5P4Tu2ecEYlIsDCTomzrucx29raoGrlisITYxZOnDiBuvUbY+qkiZIpeefuvbJ3MWIbm5iUCA8P1sTqebpMpnkWdiYzlcY3EEcHBzSsXxfr16zE7r37hebVGr17dUe3nr2xa+8BENWUp1jZcWIEtIEACzttoMh15BsBMzMzODs7oXuXjjj++xEsWvwT/r5yBetW/QxbKwsR1Mc233VzQUYgKwLCw+elyCpZ7/JnRkAPCNy+fQ/jxo2TzCrlhcnK9KnTMWjoYDg46jYQtx6Gyk0WIgK8sitEsLkp9RCwESs6GwsLNG3UBHVq1caY8WPxZqvW+P3QEaQI+ztOjEB+EGBhlx/UuIxOEQh/Fo7H/o/RuUtn7N63B7t37JIxbdsJe72hQoP7741bSEstGMmATgfAlRskAizsDHJalN2p8LBwKdyI7YRSj3d64sLFC/hOEIWeOv0HmojIZ3OEv23g00CkpbHQU/bTov7oWdipjxXnLAwEBOGxvyABNTc3lzZ2mU06CiXGtE+m4+K5C+jzTm8sWvIDWrRoLjS56xAWGiaYktUL4JNZH78rDwEWdsqbc4MecUJCAp4IKvaiLsVE+MRyr/S1nLcnVq5dhaMHDgth6IX3R49C7x69cOTgYWmE/EoBvsAI/D8CLOz4UTAoBOJiY/HI75FkJi4pXMVySk1bNcfxk8cFycAGRMVEo2evXpjwwXhcOHcesTGxORXj6wpGgIWdgiffEIceHRMjt7GlS5WGrYNdnl0cMGgAzvx1BrNnzcb5SxfQuXMXfDH3C/wrggClJCfnWZ4zKAcBFnbKmWujGCmxnYQJv9gKFbzV7q9TEWfM+HQGfj9yFAP698cWQR7avZvgz/thMXwf+qpdD2c0bQRY2Jn2/Brd6MKFsiEuLg5e3hU07rt3pQr4celibN3yK+rWq4d58+ahf99+WLtqDYICgzSujwuYFgIs7ExrPo16NBnp6VI5YW5pDi8vr3yPpVnL5nJ1t3zZT3B0dMS0qVMx6n0RBGj3b4iJjsl3vVzQuBFgYWfc82dSvU9MTMKjR49RpGhReIogOwVJFpYWeKdvb2zbvh1z5s5FcHAIxowei0kfTcSZP04jQ8Sk5aQsBNg3VlnzbdCjDQ0JxYRx4xEcGoJjx47BSosRxXzu3sevv27F1q2/IikpCe/2fReDBg1G9ZrVDRoT7pz2EGBhpz0suaYCIkDKhIH9+qNi5crYIMIyaj0Jg+Xz586JkI+bsH/ffkkhNWTIEBHcexDcS+Vs5qL1fnCFekGAt7F6gZ0bzQ6BWGFjR7FiK1WqmN3tgl8ThMeNmzbBvO+/x88rfka1atXE53noJWz0Nq7bgOQkNlUpOMiGWwMLO8OdG8X1LCQoBDGxcahYsZJOx05UUR07d8JPIgDQwkWLRFtmmDR5Evq++y5O/H5Mp21z5fpDgIWd/rDnlrMgQCwm/iJOrJWNFSpW0NzsJEtVan90dXPFgIEDpOb2888/x53bd9BffB89cjTu37mndj2c0TgQYGFnHPNk8r1MFt4Ofo984SQc/j0KqInVBCxiSi7nWQ6jx47Bb3t+w/Bhw7FTREBr9WZrfDnnC0RHRmlSHec1YARY2Bnw5Cipa4mJCfC55wNXF1cRPrFEoQ/d2toa1WpUx+czZ+LQwYNo1aIlvvzyKxkEaMPa9YXeH25Q+wiwsNM+plxjPhBIEMGz/fz84O3tBTNB76SvZO9gjwaNG+KXVSuFxnYv3N3cMWLUSLRu2RqnT/2pr25xu1pAQH9PlRY6z1WYDgJxgqkkKDgIlYXZiSEkRydHvNXubew/fACrfl6JJ+I8sb1gSh4ibPPY39YQZkjzPrCw0xwzLqFtBETMp4CAQMQWgiZWk64TgSi5mw0YPBDnLpzH1IlTsGvnLtR9oy6+mD1X9JeppDTBU995Wdjpewa4faQKavUnj/xhY2eDihra2MWFROPW7gu4uuFP+J68hYTIOK0jSq5nJdxL4PM5M3H12lW0rN0UM+fMQt26dbFduKNxMg4EWNgZxzyZdC9TU1Lw4OED0NaxfPnyao81Iy0Df363BwGXHiL6yTNcXnUCD36/rnZ5TTNaWlrCo3hpDHRvi4VDZoNYk98Vtnlt27bFpUuXNK2O8xcyApaF3F6+mksXbBiDBw9GjRo1MHbsWBFU2VnGKMhXZVzI4BBIFuER79y5gxKubnAr4aZ2/9JEubINKqJMXW9Y2liiSBkXEYtC+ITpKGWkpuPs0kNITEjCB8unYbzzp9i8aTPmCqKBVq1agVzPpgqGFW9vbx31gKstCAJGsbKjsxMnJyfMmTMHDRo0EM7cW0F2WRxkpSBTbzhlk5OT4OvriwoVNTMmtnawhYWIMXt20QGcX3JEDsjCWke/3+Jc8cGJm3hw/CYajW4L62J2sLSwlALuypUrmDx5MjZv3oymIvLZggULEBoaCo4/bzjPmOyJmBCjSWfPnlW1bt1aJbYT8v3UqVOqxMREo+k/dzR7BO7duatyc3FVzZ0zN/sMOVxNiIhTXd3whyo1KUXmSI5PUiWEx+aQu2CXI/xCVGvbfak6Pmt7jhWJ1amqb9++KvHjrKpTp45qx44dqqioKJX4Uc6xDN8oPASMYmWX+fvQpEkTnDx5EuvXrxfauwC8/fbbGDNmDG7cuCFXepn5+N14EFCJbWfA0wDEJ8SjetVqGnXctog9wu4GyrO6WzsuiNWdiDDmH6ZRHepkTopJxKmvd8NGtNf0o445FqlataqgkfoVR44cgYODA/r164ehQ4dC/EjLOLg5FuQbhYKAUQm7TET6izgDf//9N2bNmoXDhw+jTZs2+Pbbb6VRKgdNzkTJON7T0tPw8MEDoYm1ReUqVTTqtJm5GRqILWV6ShpCbj9BmXreKF3HS6M68spMdZ/78SAifUPR+rOesC3qkFcR+SN84sQJLF++HPfu3UOXLl3w6aef4tatW/yjnCd6OsxQeItI3bTk4+OjGjlypMrFxUUlFBiqlStXqoKCgnTTGNeqdQQS4hNUkz+apBIxYlVRkVFar78gFaanpqku/XJctaL556o7B67kq6rg4GDVjBkzVKVKlVJVrFhRNX/+fBU9s7y1zRecBSpkMuSd4vwOCxculFsGsn8ira0430OxYsV0+FPBVRcUgRgROnHAu/0RFhGOCxcvFLQ6rZUns5abO8/j0opjqDe0NeoOaVmguq9duwYh6HBQ+N0Sj964cePk81m6dOkC1cuF1UfAZIQdDTk1NRVbtmzBTz/9JLe07du3x7Bhw9CoUSPY2eUdg1R92DinthB4Fh6O5k2ao37DBli/0TAc7jPS0nFr50VcWnkcNXs1RKOx7bQ1XBw4cAA//PCDPIahH+P33ntPanCLirgbnHSLgMVskXTbROHVbmFhgdq1a6ObiBlqa2uLQ4cOYffu3QgLC4OrqyvEVqLwOsMtqYVA0NNALJi/AL3e6YWmzZqqVUaXmdKSUnF961lcXf8HqnV9Aw1HtYWZhfaOtsn395133pHP4p9//imVbU+ePIE4hpHX6BnmpBsETErYZUJEmrBmzZrhzTfflMFVdu7ciaNHj8p4pCTweGubiZR+38lO8sa161gnVnTjxn6AylU1U1Bou/ekdf177Sn8u+sCqndrgPoj20AXdntWVlbS1axdu3Zyx0E/yuR2RpT0JUqUQMmSHA9D23NL9ZmksMsEys3NTbryCJsnCKWF3OKePn1aGnuSWxJvbTOR0s87ecacPHYcJ/44iY8//hjFxepbXynmaQTOLzsC/7/u4vW+zVBnUEvhlWGl0+4UKVIEzZs3l5x5KcJljn6U6UwvPj4eHh4eMiCQTjugsMpN6swut7mjKPNk/7RmzRpcvXpVemKMGDECnTt3Ztez3IDT4T3ygpk2cSp27d0Fn/sPYOegn3PVp5ce4Mrqk0iKjkedwa1QuX1twalnpsORv1q1UDNKG9K1a9eClG1Ccytt9CgYELlHcio4AooRdplQBQYGYv/+/VLo0VkJKTHeF9HiSYnBqXAREN4v6NqxizQoPnfxfOE2LlpLiUsSW9aLuL3vMpxLF5OrOfK11WeKjo7G8ePHQULv8uXLIEP6UaNGyedUn/0yhbYVJ+wyJ03YOsltAz1UZIjcu3dv+VCxE3cmQrp/F3Z1qFurDlq91Rpr1q7RfYNZWgi85od/Nv+F8PuBqPhWTdTo2RBFPPS3jc7SNfnx6dOn0mB+3bp1ePjwITp16oQJEyagVq1aL2fl72oioFhhR/iQqcrt27exceNGGTiZNGL0Kzp8+HBJPKAmhpwtnwg8uO+D12q+hq+//hoTp0zKZy2aFYsNisTN7efx8NQtOJYsgtfeaQzPplVhZWetWUWFlPvu3bvSooCEHm37Bw0ahA8++IAtC/KBv6KFXSZexDj7zz//YMWKFdi7d680+pw2bZo0EcjMw+/aRUCeUR09jvZdOuLA3v1o17G9dht4qTZBGoC7+6/g3uFrUKWrUKVDbVR4+3UULVtchI0t3PO5l7qW51dSXly/fh0bNmyAIBcAKd7Gjx8vbUhJs8tJPQRY2GXBKVwYuJ47dw6LRODk8+fPSx/HmSLaVP369bPk4o/aQIDMTlYsW47J06fi35u34FXBWxvVvlJHTEAE7h+5Bp9jN5AanwyvljVQpWMdFK9YUidmJa90QIsXSMlG53hLliwB+d7Wq1dParGJEINT3giwsHsJI/ojJHsnsnQnXjL6PHDgQEyfPh1ly5Z9Ibeg75HnfbT9Jc49TuojQOekE8aOx579e/DI7xGsbW3UL5xHTuHTisCrfvA5+g9I00rRyjxbVEPldrWlkDPULWsew/rvNj13pMSYN2+eJBfo0aOHJBqoXr36f3n4w6sIsLB7FRN5hc7zyDZv1apVWLZsGezt7TFp0iR5pkef6T4dGJNnBjmhsOV7DkDmcJmE3ZsiPCHEDvL0X2dyyKX+5WShWQ278xT+5+7B/4IPKDZFkTLF4f1mDXi1qgHnUsWe280Z9o5V7QHTjzLtRIhS6vvvvwf5GJO/LTEls9F89jCysMsel/+u0qHw/fv35a8oMdG+9tpr8jOZCPz4448ikPKXIHOWf//9Vz5s7Nj9H3S5foiNjkUVQenUrWtXLP/l51zzvnyTaJfiw2MR5R+O0H+fIOSWP8IfhiA1NhEObs4oU78CvJpXR4kaHrC0tZJsxi/XYSrfyTCbTKjI35YopcgDg358SclmZuBnkYU9Byzs1EQ8KSkJf/31l3yQiIab0ocffoiPPvoIffr0ked79KvKXhnqAepz7z6qCbLOgdW7oE/TrjBztoSdi5Pgi7MTmlEbeZ5Gf6zpwik/LTFFGPwmgJQMCc9ihaCLQbJw7SJFg62zHYp5u6N0bU/BZecNlwruQsBZC39WM0X9sZPCh4zlieOR3M8ofAFxPLZq1Uq9CVFALhZ2Gk4yHRJTgBXaOpQpU0ZuGcqVKyfpe4i6h5N6CNAB+9tt3sbqz5agWlFvhD8JQXJsAlITUpCWnAoKbkOhc+gslPxT6ZzNRgg2B1cnYQDsgmJebiji6QbnksVg7Wgrt8O8knmOPRnNk/sdmVURWzLFbiGPDKUnS6UDoOn4SWFBwWHI64KYVYhOKjIyUrr4kAKDAgNxyhsBsh+zEUqJTh/1QYni/4solk5CTmzNiK5dJrG6MxesIxRYx9BNRPIedeHkIGZkCu/4888/yx/m3377DVOmTMHEiRMVfZ7HKkQNnz/S0pLigmi2SbiRIzedPdGWlujhiSae3KA45Y4AxQ2h8yURaOeFjCTUaBtqZW/z/CVWdJJ5hM+fXsApry82NjbymaTVHXHmffXVV5JphWz16Byatr1KSyzsNJhx0oARddTixYvloTDR8ghKeGnzRMbIZPzZsWNHaexJRqB0zscpewQoHgNxu/HWM3t8tHXV3d1d2uXROTPFXSbFBVFLEdkAacSVJPRY2GnwVNH5ERly0kvSiQ8YgLfeekvWQELu4sWLUhCSIoOEIp3tkaaMhCCn/yGQkJCAByLIDmm2ORUOAkRzRrsS+oGmYxfa6hLrD62wyYxKEUlIdk4aIiBWeLmWoIA/QksrgwAJYgGVMAlQUeAVYSaQazml3BSmPDK2qvD3VMqQDWqcgi9PJQySVcJMSiWOElTCS0gGARJCz6D6qe3O0DKWk44QEOEeVT179lQJ5mSVoOpRCXJGlaCI11FrxlOtMI1Qie2r6tKlS8bTaRPs6aNHj1Qi7rJKkIiqatasqRIKDZXYiZjgSJ8PibexOly/U5SzXbt2gYyR6bxvyJAhGD16NP744w+5DdZh0wZdNRlg0wG6l5eXQffT1Dvn6ekprQnILo9MU8glcujQodizZw8iIiJMbvhsZ1dIU0rnVMSSTKYq5OZDgb6JrofOraytDZNeSFfQDB48WBItEKcgJ8NAgDwxiFGFXCPJLCgzMl/Dhg1BMV1MIbGwK+RZ9Pf3l/ZP27Ztkwaz9EtKHhiVKlUq5J7orzlS8JBbHRm/cjIsBGhFRz/KRGpLBvQUCY0Mk2nOjF1zbtIBdwzrMXreGwqyQhrcxo0by60Cacco8hlpxMgjw9SNkukPiGizKPZHpibbEOdJqX0id0eigifaKDKdomMYsh2leSO7yOLFBf+fkSZe2elx4ugcjx4kYla5cOGCpNwmO6gOHTqYrNC7c+cOiIqI2Dr69u2rR/S5aXUQIH7HlStXyh9kOmOdP3++jNdijKs8VlCoM+M6ykN2exRbgLYMRE1OnheTJ0/G2LFjpaGyjprVa7WZ53RVq1bVaz+4cfUQoFUesanQWTPFXCZWb2NNvLIzoJl7/Pix3DZQTAyikOrevbu0eBdmAQbUy4J15YsvvsB3330HCihTtGjRglXGpQsVATJGJi5H0qQbY2JhZ4CzRlbtW7duBSkxKMYAaS/Jv5Fcf4w9URQ38tck8xNOjEBhIsDCrjDR1qAtOhwmf0bSjJGbD9lE0faWKOKNOcgK+WfSixQznBiBwkSAz+wKE20N2iL6KPKvXbhwoVRgEP070cJ3Fcy+FH/AGBNtzWmr/vrrrxtj97nPRo4ACzsDn0A61yIBJ/xIZdQzooAnLSZpbcn405gSCTpSwpjSGaQx4a/0vrKwM5IngM7raAtLhrhEBU9b25YtW0qbNYo2ZQzp3r170m1OSQbUxjAvSukjCzsjmmlLS0sQBTyxzpJ/bbdu3WScAbJuJ/MVQ0+keCGjag8PD0PvKvfPBBFgYWeEk0rneWSYSxGlKJYDOXHTtrZp06aSlNFQh0SEptRXU/cSMVT8ld4vFnZG/ASQzRMJuN27d0szFfJrJAfuAYJUNNN415CGR94TpIk1Rut7Q8KR+5I/BFjY5Q83gylFXhjESkEO2+fPn5fsyOSCRqH0Zov4oWQIagiJmF5IucLsxIYwG8rsAws7E5l3EnqkuZ02bZqMH0rCj0Lo1a9fH1u2bNE7Nbyfn58M9MLhJk3kgTPCYbCwM8JJy63LtEUsX748fvnlF5ATN32mbS3FyDh79qzUhuZWXlf3aAtLieOX6gphrjcvBFjY5YWQkd4noUc0UkeOHJEru4CAABnqUdBwQ8SAKHShR8oJMowuWbKkkSLK3TZ2BNhdzNhnUM3+UzQ08sZYunSpZEamOLe04iMSTdoC6zqR4oQYM8hkxpjd3XSNE9evOwR0/5Trru9cswYIODs7S4UFbW3ffPNNfPbZZ5JAk8gGRBAgnccPpdUkndexJlaDSeOsWkWAhZ1W4TT8yigw9aZNmyRpKBn4UhAgstE7efKkzjS3IowkQkNDpU9sYawiDX8WuIf6QICFnT5QN4A227RpIw2SiZiRfFZ79eqFjz/+GCL8Iyg4kDYT2fxRoHBe2WkTVa5LUwRY2GmKmAnlJ/cz4skjFpUJEyZI6m0iDBUBlEHaU6KN10YiwgILCwupGeZtrDYQ5TrygwALu/ygZmJlKJDK3LlzsW/fPrRr105ScFNEqRUrVshVX0GHSz6x1Iabm1tBq+LyjEC+EWBtbL6hM92CtNKj7e3p06dRu3ZtjBgxQpqt5DeyVGYUMWJqoehVnBgBfSDAKzt9oG7gbdJ5HkX/Wrx4MSh4Mpmp0ItIB5KTkzXqPZX39fWVPrGsnNAIOs6sZQRY2GkZUFOpztraWgZHJlezTz75RBoiDxs2TNJLXb16Ve1hkjEz+ecSYSed23FiBPSFAG9j9YW8kbV769YtGQRox44d0lauf//+MhAQuaPllsikhVzVDh48iNatWxeKAXNu/eF7ykWAV3bKnXuNRk4rM1JiUMDkFi1ayPc+ffpIJQZ5Z+SUKIoYhd4rW7YsC7qcQOLrhYIAC7tCgdk0GqEzNxJ0CxYskBpbYhyeNWsWSOiRJje7RMKOXNLyq9zIrk6+xgjkBwHexuYHNS4jEQgJCcGxY8ckwwrZ0pH/KykyiCY+M9HWlZiVyS2NXNY4MQL6QoBXdvpC3gTapSBARCawfv166X1x6dIldOrUCVOnTgUJQkpPnz5F1apVQQbMnBgBfSLAT6A+0TeBtskjwsvLCx988IG0xaOQjxT8hxQSPXv2RHBQEN4QBKKk3eXECOgTAV7Z6RN9E2qbhBlRrn/55Zfy/I4UGkQnFRcfj6jwUF7ZmdBcG+tQ+MzOWGfOgPutUqmkX+20KZOw9KefkZqaip7dOmO2UGbUrP2/8zwDHgJ3zQQR4JWdCU6qvodEW1syII6LjUG1St6Y8+l0XLxwAfUaNMak8R8gPDRY313k9hWIAAs7BU56YQ359u07kulk7IeTcfnK35gwdhSWCp/bGtWr4ecli5CWopnrWWH1m9sxTQRY2JnmvOp9VNER4QgKDUMlQRZKpicly3jg+x+W4OqVK2gqYmOMmTAJ9d+oi8P79+i9r9wBZSDAwk4Z81zoo/R//EhsY2NRqVLlFzSxNWvXxe79h3B4nxByKjN07t4TPbt2ws1/1Pe3LfTBcIMmgQALO5OYRsMbxMMHD5CUEA9P4TtraWX1Sgfbd+mGS2KVt3jBPPwl4mI0bNIU0yd9iMAnj1/JyxcYAW0gwMJOGyhyHa8gcO/efdjbO6BMWY8cg+xY2djig4+m4OaNmxgxbDB+WLxUhn9c+dMSREU803kQoFc6zRdMGgEWdiY9vfob3D0RTaxkyRJwUsNFzL10WSxetgLnz52VZKFjJ0xEl04dcOTAPsTHxepvENyySSHAws6kptNABqN6TtjpWc5TI2biug0aYe+BQ9jx6yYkp6ahT99+GDViOC6eP4ukxEQDGRx3w1gRYGFnrDNnwP0OE36xwWHPULlKFdjb2Wvc0+69++KPU39gzszPce7CJXTv1g2zP/8Et25cR6qIUsaJEcgPAizs8oMal8kVAf9HjxAbE40KFSrAxtYm17w53bR3csak6R/j5Inj6NO7N1avWYfe7/TC8qWL4fvARxRT5VSUrzMC2SLAwi5bWPhiQRB4+PAhUpIS4SG2sVZWBSMAKF+hEn5ctlz42+5Fzddex6w5c4QyYyh+3bwRwYEBBekml1UYAizsFDbhhTHcB8LsxNHREaVKldZac42btRCceFux8pdfYC4E6ITx48VrHI4cOojY6GittcMVmS4CLOxMd271NrIHYptZooSbWppYTTppbmmNd97thx07tkuGZD+/R3hv6BBMnTwJZ8+chkpEMuPECOSEALOe5IQMX88XAukpSWjbti1cXFwE48lyuJcsla96Xi6kSktBRnwkzB2Lw8ziOQ3jg3t3sXHDOmze/Ks4wVNhgAgC9K7Q4NZ4vdbLxfk7IwAWdvwQvICAKj0NCdcOIzn4ASwdisGxfjchYIq9kCe3L0HCA6Jdh07o0KEdPp85C45C0ZA1pUUEIO6ScBUzE5sKM/HP2h7m1rawr9UW5nZOSLx1Cgn//glzG3tx7W3YVqiP9LgIJD28gozYZzB3KAq7Kk1gbl/kv2ovnvtLEobuF+d6pcuUxcCBA0VcjHdRShg0c2IEMhFgpuJMJPhdIhB9fCXiLuyCjVdtJN44jrTIILj0/FhtdPz9HyMqKgLlPctna2OXnhCNxLtnhJQTMWRFAJ/kxzfER2vY1WiNJJ+LCP/1M1iXew2q1GQk3D6NEsMWCWEXCVVyohB8byBBlE0Jfgjb8mL1Zv48Dm3DJs1Qq05d9BDMyOvWrsPXX32F/QcO4L3hw9C9Zy/Y2Tuq3X/OaLoI8Jmd6c6t5iPLSEfMnxvh3Lw/XPt/DbtqLZBw57RG9fiKc7Q0Qdbp6V0BFpav+sRalfBC8XfnonifWaKdgXJr6ty0L8xtHRB3ZT/SokPh0n2a7ENKwB25ystIjhcrOSdYlaoEM0tbIQgTX3ElsxX2fLSiXLJ0CRYvWQILIUjHfzgRA4aOxInjxzQaA2c2TQRY2JnmvOZrVOmJcaKcCraVGyFy/0LEnN0CG88czr8EG7E8RxNndBmpSUIAJck2H/rcg6O9PdyKvbh9zeyQubUdrEsJJhTxij2/A1ZuXijaaQJUop7UIB9YFHGHZXEP+W5u54y0sMewKVMN6bHhiD6xUnQvA1YlvP87t8usN/PdtURJvNt/IFYIre2cT6bi7pGt6NdvIEaPHoXbt29nZuN3BSLA21gFTnqOQxYCjLaWYtkkz8xI6CSKrWRaRCAsXV40I0kNeYgIIRDTooLFassa5uL8zcbaCrePXYRzehTSd32KZNupsH6trbz/cpuJd84g9tx2lHhvsRBcVkKTmgpawVFd9N2MKhR9SU+MEYKvBOxrvinP7izEOaKFU/GXq3vle3nviujvDVTr6I7TngOwcfd+HD36O4YNGyaDA3Ec21cgM/kLLOxMforVHyAJmAyxwhI0JXBuPRQODXogbMNkxJzZBJdu016oiIRfsY7jxaouWWQ3F8dnFkiIjkTYptvwrlsZZftOgk0lsSoUgiu7FHN+m1BIOMOhTscst0ljQV/pv8wXfRQ0706u8kV31UlJ988j6vBi1HtnDJp0/Rid3umH1atXYfHixdi7dy8mTpwoVnz9JH28OvVxHuNHgLexxj+H2h2BMPEg0w4SRFauHrD1rovkJ7deaUOVIYLqCKWBKilersjMUxIQFhqK8Oh4lC1iCzskI0Os1mhb/HKiLW/SnXOw9qwJS7Fqo2RmbgkLe7H1FdpgscwTu9UMed3c1lGu9OQXNf/LiI9CyPrJsHCvCKfOk2ArIp/Vr/8G5s2bhy1btoDi3b7//vvo2LEjTp8+rWatnM3YEWBhZ+wzqM3+ixWaSpyJxf1zFBlCa5oa7o/YC7th4/HaK62kRwWJM7RViNg3H5EHfkTcoR9w/7cliAjyR/FYXyQf/0loVy8LuSWE10spLSYUKWF+4rzO8787ZsLUxNqjhtgyB4h2HyM9JlwoL6JhLQSWpil003SkCtOZEsN+FIoPp/+KOwu6qbfffhsbNmzAypUrERwcLG0C33vvPfj6+v6Xjz+YJgK8jTXNec33qMytbBB7ZjNiz24TCohkWJeuiqJtRr5Sn6XQqroN+FYIR/JaENtMB3tErl4D1a47qNF/BkqL0IkqWIgzuFe3scK4U6ziikrlRGbFZFfn1LgPEu+dR8B33WU5+9fehEP9LplZ1Hqnc8SYP9bDfdQvclX6ciGKfObq6iq3sC1btsTGjRvxww8/yK3tpEmTMGHCBOnq9nI5/m4CCIgYn5wYAYlAeny0ym/Sa6qE23+qkoN8VCkhvqqMlES10fn6izmqKhW8VGfP/pV7mYx0lTAxUaUnxb+UL0OVFhOuSrh7VpX44LJK2OS9dD/3r9GnN6vu9bNRhW75JPeMWe5mZGSo7t69qxo5cqTKzs5OVa1aNdW2bduy5OCPpoIAb2NN4AdLq0MQZ2Xk1WDtXkGYeHjBzMpW7ep9fR/CpbgLXIrl4XEhtssWzm5S4/ti5aSIKA67yo3FqqyePDd88X7O3+Iu70XwivdRpMUguAo7PnUTrfSqCN69X4SpyrFjxwS7sjBdefddtGvXDpcuXVK3Gs5nBAiwsDOCSSq0Loo/fNJ8knaV3jVJcUITGxQUAg8Pz7yFXV4V/38/8sqWeT/24m4ELh4Epze6ClOWpULZ8dyzIvO+uu9NmzbF8ePHsWnTJvj4+KBhw4bCPm80njx5om4VnM+AEWBhZ8CTU9hdM7cTtEzjN8K6bDWNmw4R7MShQhvrUa4cnJ3/57eqcUUaFog+uRbBS4fAuWEPlBy7RqxE80cWmtmsubDtGzBgAK5fvy6ZVehMr1atWliwYAFiRWhIsaXLzMrvRoYACzsjmzDddtdM+sSaCS8HTVNgwFNEPgtH2TJlYCs8KHSdyGsjfOtMhK4ehyJvjYD7mFVi+63+ljuv/jk5OWH27Nm4desW2rdvjxkzZsiV3u7du5Eq3OFY6OWFoOHdZ2FneHNilD16+jQQ6YJPzsOznG77L1ZWKYH3ESy2rZHCaLh4vy9RYugijW3x1O2kl5eXtM07fPgwihYtir59+6J79+44J2LdJicnq1sN5zMABFjYGcAkmEIX/J/4w9rGGm5u7jobjiolUfjTbkfAvO6SLYW23C6dJ+qsvawVt2nTRgq45cuX486dO3jrrbdApir0OYWDAGWFymA/s7Az2Kkxoo4JtpRHIshOsWIucBM2bNpOJOQSfS4gZOVYhKweD1vP11H208NwfEMzGzxt9GvEiBG4cuUKJk+ejK1bt0oj5YULF+LxY2EIzUzJ2oBYZ3UweafOoFVOxVER4cLBfrigdLIArXzcBPOINlJGUhxSgu4j7uJv0siZvCyKdZyAIq2GPics0EYjBaiDWFTIBY18bWm7++GHHwrS0g6Ckv65C1wBquaiOkCAhZ0OQFValffv3saQwYPRsFFjfP/9fFjZFEAjKuz8pDtZwF3EXzsiXocllZRTo14o0nY0rIqXNTh4jxw5Ir0waMWXaa7SvHlzecZncJ1VcIfYXUzBk6+toQcFBSEyMuJ56MR8CDpVWqrwhQ1Fapi/OIu7jsR//0CSYDA2F8bNDnU7wbnFAOGfW0Nb3dV6PaStbd26tbTPo5UtbXU7d+6MwfQDIGz1bG21pyXWeucVVCELOwVNtq6GGhQUjFShmSxT4v89J8gWLTujZEEyIIk+kxMk1Xp6TJjkykt5ehvJ/jeRGuInee2sSnqjWPtxQtB1kF4cuuq3Nuu1EUKeCAWISYVIBsgw+Y8//pDeGH369EHt2rW12RzXlQ8EWNjlAzQu8iICASFhMIsLh8PfWxBneRdJlg7CFcxBGviSN4ZKKDCeCzlBB5UQg3QRJYwEHb0T2zGt4KxcPeHUvJ9wFWsk4kvUAZ3PGWMqVaoUZs6cKc1TVq1aJYXe0aNHZRCgHj16oHz58sY4LJPoM5/ZmcQ06m8Q6YLCafL0T3B2z0YsG9wUFRwzkBAv6N0lL53gpBOrPPI5IKFHDChmgp/OQkQGI/Zh4ssj9hTrksIP1628Rn64+hux+i0LkgG5ulu9ejVOnDgBQTKAoUOHolu3bnyepz6MWsvJwk5rUCqzomcRERg9ahTSxLnb6uVL4WJvjRTBQ0cEnbRqg/iDJ3p1Sd0uVmtmYsVHxKBE6aSUFB0djUOHDmHNmjXSDa1JkyYQLCtyy0tEBJwKBwEWdoWDs8m2cu/ePQwfPhx16tbFEhHVi/90c55qIhTYs2ePjHFLSp1OnTpJxuQGDRrkXIjvaA0BNirWGpTKrIgIACIjI1HOw4MFXR6PgIfAaPz48di8ebNkUzl58qQkEf3kk0+kUXIexfl2ARFgYVdAAJVenIQd+YiWLWt49m+GOjd0dkfEAtu3b5erO9LedunSBcuWLUNCQoKhdtvo+8XCzuinUL8DCAgIgJWVFcoIthNO6iNApipvvPEGvvjiCyn0iEB02rRpIB/cffv2qV8R51QbARZ2akPFGV9GgBzg6RyK2EBKl34xruzLefl79ggUKVJEGiQvXboU69atE1prM2mb17t3b1y7di37Qnw1XwiwsMsXbFyIECAt49OnT6UvKIUn5JR/BAi/Xr16QcS/EC533+Pq1auSZIBWe0SKyqngCLCwKziGiq0hQpidBAYGylUdhSnkVDAEiCWZzj5HCVMeiodBHhkUG6Nx48ZYsWIFU0kVDF6wsCsggEou/uzZM5DAY68A7T4FdAbq7e2NuXPnSmPkevXqYcyYMWjRooUUgtptTTm1sbBTzlxrfaS0vUpMTEQ5EXeCk/YRICUGCbr169dLpQXRwbdt21aaq5B9IyfNEGBhpxlenDsLAqScoK2Xp6dnlqv8UdsIiHi2kkWF7PIWL16MP//8U2pyyQeXbBw5qYcACzv1cOJcLyFA9mAk7IqJGLFsdvISODr6SppbMkqmeLbkYzt//nyQ9wVFQGP7vLxBZ2GXN0acIxsEKKygv7+/iDnhBtbEZgOQDi+REoNc806fPi3P9og3j6il6HtSUpIOWzbuqlnYGff86a33UVFR0uyE7Otom8Wp8BEgo2Sij9q5c6c0T2nVqpVUZFAQII589up8sLB7FRO+ogYCJOzCw8PlykKN7JxFhwiQfR5Rwn/zzTc4ePAgmjVrhu+++w7BwYJUVSg1OD1HgIUdPwn5QoAEHZ0TsdlJvuDTeiF7EZh8+vTpUugRMzJFPCOqeDrPo7nioN6CaUzrqHOFJo8A/eFkamJZ2BnWdJMZEMXBoCBAFSpUwIQJE6T7Ga34lK65ZWFnWM+qUfSGVnSPRJxY8ollGzvDnLJGjRrhwIEDkjuPlEn9+/eXmtyzZ88iLk4wSSswsbBT4KQXdMj0x+Ln5yc1sSVLaidGbEH7xOWzR4AIBYgSftasWbh8+bJc5RHTyo0bNwS7dFr2hUz0Kgs7E51YXQ6LVgq0jSUySktLjtmkS6y1UbeTkxMmT56Mw4cPyxXejh07pBfGDz/8AF9fX200YRR1sLAzimkyrE4S20lYWBgqVqxoWB3j3uSKAPnbzps3T0Y8q1+/vgzsPWjQIFAUNCUwq7Cwy/Xx4JvZIUCCjraydADOyfgQoIA/xI5MrmfklUFuZxTYe9euXSbticHCzvieVb32mM55aAtL21daKXAyTgSIWaVnz57YsGGDFHb0AzZx4kSpxDhz5oxxDiqPXrOwywMgvv0iAuSORMoJ4q9jTeyL2BjjN1dXVxn8Z9OmTfL94sWLMlrcxx9/jPv37xvjkHLsM4dSzBEavpEdAnS2M27cOHlmd+rUqeyy8DUjRYCCehMV/K+//ipd0BwdHaXgGzZsmCR8MNJh/ddtXtn9BwV/UAeB+Ph4GfbPy8tLneycx4gQILou4s8j0tC1a9eiVq1a0gWtc+fOki6ehKExJxZ2xjx7eug7mZ2Qz2XlypX10Do3WRgIkOsZuZqRAoNo4W1tbeUWl5QYFGTJWBMbSRnrzOmp3yToaHVXqVIlPfWAmy0sBIoXL44ePXqAvDGIWYXOa2n1Z6yJhZ2xzpwe+k0MGsRhZ21tzWYnesBfX02WKlUK77//vmRQMWYjchZ2+nqCjLBd4kh78OAByCKfqdiNcAIL0GWKh0EvY07GuyY1ZtSNtO8k7Hx8fED+sETHzokRMCYEWNgZ02zpua90ZkNsJ+w5oeeJ4ObzhQALu3zBpsxC5BMbEBCAqlWrKhMAHrVRI8DCzqinr/A6T4SdT58+lfKfO1YAAAEzSURBVL6T1apVK7yGuSVGQEsIsLDTEpCmXg35xJKbGAXXYbYTU59t0xwfCzvTnFetj4qMSe/evcs+sVpHlissLATY9KSwkDbydiwsLORZHb07ODgY+Wi4+0pEgIkAlDjrPGZGQIEI8DZWgZPOQ2YElIgACzslzjqPmRFQIAIs7BQ46TxkRkCJCLCwU+Ks85gZAQUiwMJOgZPOQ2YElIgACzslzjqPmRFQIAIs7BQ46TxkRkCJCLCwU+Ks85gZAQUiwMJOgZPOQ2YElIgACzslzjqPmRFQIAIs7BQ46TxkRkCJCLCwU+Ks85gZAQUiwMJOgZPOQ2YElIgACzslzjqPmRFQIAIs7BQ46TxkRkCJCLCwU+Ks85gZAQUiwMJOgZPOQ2YElIgACzslzjqPmRFQIAL/BzkQnXD9A6ilAAAAAElFTkSuQmCC[/img][br]Der Winkel [math]\beta[/math] misst 70°. [br]Ermittle die Größen der Winkel [math]\gamma[/math] und [math]\varepsilon[/math].

Betrachte die Abbildung. [br]Begründe, warum der Winkel [math]\alpha[/math] die gleiche Größe wie der Winkel [math]\beta[/math] haben muss. [br][img]data:image/png;base64,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[/img][br]

Besondere Parallelwinkel werden auch "F-Winkel" genannt. [br]Erkläre, warum die beiden Winkel [math]\alpha[/math] und [math]\beta[/math] Parallelwinkel sind. [br][img]data:image/png;base64,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[/img]

Besondere Parallelwinkel werden auch "Z-Winkel" genannt. [br]Erkläre, warum die Winkel [math]\alpha[/math] und [math]\beta[/math] Parallelwinkel sind. [br][img]data:image/png;base64,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[/img]

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[/img][br]Momo behauptet, dass [math]\alpha[/math] und [math]\beta[/math] gleich groß sind. [br]Beschreibe, warum Momos Behauptung nicht stimmt.