Terme Figuren

Welcher Term passt zum Umfang Figur?
[img]https://mathe.aufgabenfuchs.de/gleichung/bilder/TermX.png[/img]
Welcher Term passt zum Umfang der Figur?
[img]data:image/png;base64,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[/img]
Welcher Term passt?
[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASQAAACsCAMAAADlsyHfAAAAilBMVEX///8AAADZ2dnt7e309PTe3t7k5OTNzc38/PzS0tLV1dXw8PD4+Pjc3Ny3t7fn5+dXV1dKSkqxsbGrq6vBwcF/f38ODg4hISHJyckVFRVqamqRkZE2NjZ6enqIiIhPT08oKCg+Pj6jo6NgYGCWlpZwcHAdHR1ERESNjY2Dg4MxMTESEhKcnJxcXFyuxS5mAAAIQElEQVR4nO2diXKyShCFaTY3ZB3ZRGVxX97/9e6Axps/uBJgGjNfVaosE3Eynu7TAz0oCBwOh8PhcDgcDofD4XA4HA6Hw+FwMNC/8/gTUJZHo65jyUYv3UXmuK7jYcEHivLrw/SHZJpFEK+muqpDptYwMkRkoPZgJUhGHiHSy//cNZ5kyU93G/Csme2Pvp60g9NY+KCg0wxBh6OQgk7/KYjfeeWAbE8R7FdTokg/f2lDdleeGhlWGChbCMwEYQSZQGdLf+UFuXgmG4ityTfxlLioqYxO4zuWq42VGb65JoIQwoj+PBm7TMWT5eLZ3hBPCdu9pSYN3OEWthUHyw730Bd6oGu5pG4jSySdJEFs7Rz/DRHogVmaJiPcCQqY1UbKBmOZCoKXK+iQ+XAjV0hDfZvtIaKZZ/xcPCX04HRDTXkW7BAygOrDgj5aghV8/412Ec9m7vR+k0FuqEkB6JbxkbxOyp1fBUjPT0kDfU7Fk1DxiBXEU+LnNKngijUctk0kW9eKBxEYVDyzxIutXDx1ftb64ds0ScH+vidiRhqSGUCwCZdEbMSdv6nJAl0cdGHlcpVJ/yweL6JTpDaaKL6mqYhvsJp8q/qgtrULY5eKxxdpvPWar4L1tUlzUZqFFPR1kkGcVeKtF1tnIGutvvOtugkJ1ygyRHseemfxMPJg3cvVhHPpexZPkItn1K54SlA1YcvaxtieZx5swqOPpja5qAkDKklXSZCLR5QYi6cEczX1DdGZZ2uaeY4Em67/R/cWjE4qUfGEieuaGMVTQndbVpMsOttTAEmYEqwWe4N21SSBOXdEA714StA1XVtqMqDX0jvVD1VTK04ngd/G2zTFebHSMF3W0RniWQ3nplxHKIv8dyDrRoOu+zo6Q9XU2DQZ3c5H37lMU/1Rkeuo87F2pRk1fUqsXSH1l5cfN0dCMU21qumzYu2KDuagtoN9lo76mkKc48yM4n2ymdd11I+YI1kVB850FiaeG5mrneMPlDovaHV5jvp9kTjpiqpmHVurZaqLo1ovhX6hdm+OqGp6uWqi9WFvhnOqGvVf1dQ9Tx3SkSYSu8g1QWzNmlNNGRXqy/+NIKvjXDVZFATRRTVt+zBa75dz1awWkXcoVEPG0ojVOJHpaGQovjOdnPaHQ7QItzYZ1NYWXh0JRz4aDYm+pKoJwFtMpilRJNZXPb+hwpBZrPVHhuqn04kZg0tVM6WqedTktc2LQmnntDW8K6x05E+palzwTKoaXzFeyjW7vAfTea3t+VdI1BY09doZpt7q/WwBGahq3u1PU2GXt2w1MqB/0GEqZPC1MGbma/qqyqusNVV+bQuxB5jgXDvDWemIjqJSkOsgOtDGXhwFwLvYBrs6W3Mr6VeG6WJT91huYtKAK2BYH+l3two8ZgZg1zuS24gAbuGzxZqWkfmfKl5uGMKz3Sr1kBz0fAMR0zpbrupQA6iU8N9lSfW6o6UG07VINW8T7KyOPZkvcKT1at+x8zlit6at5m2CDSapeSSPMJiuaSt6W8swXvdXjLZ2URiuaXMqRlursD5/VNnbWkRhtha5ULWSbBG2vpaDP9oUYN08r6HfCso6HwkdiDb2OsIfbYWOGIsdu7dh0BH2aEOQjwTs0YZCR0IftbexO5/9D6jXbTh0JAgLxNHGek37xQixt2HREWZvY76mvYLX23IdYYg1zN6GJtYQRxuiOULrbWM0sYbX2zDpCGu0jTHNkVDjJo8aweP9OTi9TQRU982wMUabiirWcHobMh0JEkJvw1NnX0DobWI7XSpvgM/bUNVHBfiut+U6QjYmdN6GT0f4vE1spdn5PSSX9Qh+ECT4hFREGzmdWmkxfgmyWdvI7pqfe5sDcYzpRvXKDCaYaoCiT9IDuQ8gqEQRNILjzjHOPiFoHK6ItjERBDpJGnjCFtpspH1EL3SnddxKvQa+vE3PdxnZsIUT2/F8R166GYZCd3T5ugACcb77xwJA8uFdIFbsMN/NeqkkhxAVfnKEdjYbvYE6gRnjwmlRyFkpdrXkvfYA7e+kfYbm7DfNb129j3yuJDdwWoU0GZ1gmCCLtzNDlkn8HG1icTd/oHl7Sh/j/M6aEU3ijIoTq/A2ozeg9IRBj1Ymos88Ud6BJvGUQek0Cp7/DSbUHcxar8TtSdvv+Fs0O05arnbxnZN8gWEI0xbvkiJjO0vyIvLRbe/jRXdO8nXIYp2280VNVhej7QtjB6sWkrjcMW8rYUeJ3nRN0D1vKzFcwbzZqFt0Odq+0GgSb/BKBtbOrVe5Bpq/CBqrxDvsbT+RaBJv5hJL0/frbxXN3kcNnE6RD/Ufs12OxamLK+MQ5nVX4t33tvDfSaJZ9hiY9Z5O6by39T2v/KRvBsf6Lmxi7Nx6DwWiybx87kvdQlhXEu9+tOkA3u3rFnoU1VOJbzrvbcOlKCzudMSJqzqSeFfPkvxge/cOoFrqLX6bxLsfbYIFfWH1qN8rT+K/Wth9QCU5h/AIycM/kebuL5J4972NMgE4PVJKkbv1TWRXTOL2rtrrcKG9VBGNV7CrdGHzA6LtDeRKSVz7hGh7i977lfgHeNvbSLQSfyt+ul9JVqGvJ/vX22c/wtsqMZ7B7sVmJ+cjvK0achosXrpO/re8rUQvg+XTSvxD1m2/wFg+PZ3yF72tBEk8+1Ej1t/0thL5toO7SfzvettP+k68ubPt4C97W4ledriZxJv7RuNOMpre2HYgB2j2tWCBWHvn30lxuLeV+bntgHvbTTQntq6VOPe2uwwy95LEubc9QFq6Yd7sxL3tMfneMWnNve0JygR4tD1H40LicDgcDofD6Rb/AUEbbtEtpU+vAAAAAElFTkSuQmCC[/img]
Welcher Term passt?
[img]data:image/png;base64,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[/img]
Welcher Term passt?
[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANsAAAEZCAYAAAAe1FBLAAAABHNCSVQICAgIfAhkiAAAAAlwSFlzAAAN1wAADdcBQiibeAAAABl0RVh0U29mdHdhcmUAd3d3Lmlua3NjYXBlLm9yZ5vuPBoAABweSURBVHic7d15vB3z/cfx112SuGRVCSGxRFKS2IIQOxFFLLEkQq2tWmOLCKFUal+KaO0NWlpFhbRoYqkGpbVU0Vq7qKV2P9pfLUVyf3+8z/zumblz7lnunPP9zszn+Xh4cOecc8/H3DNnZj7f7/fzAX+MBJYAp8U81hN4G7i3oREZ390DvAf0innsNKAdWLuhEaXIQ8BrQEtk+15ox+3Z8IiMz3ZDn4spke3NwD+ARxodUJrsg3bejpHt9wFvAT0aHpHxWQs6qKJXPBPR5+iARgeUJsHl4h1F24YBi4GznURkfHcauv0YUbRtPvAhsLSTiFLkHOALYKXCz+ehg201ZxEZn60AfA6cW/h5cOHnOc4iSpGVgS+BU9Fl45vAAqcRGd/9HF0R9aAjMTLaaUQpcifwKrA32nG7uQ3HeG48+pzsBbyCEm2mQjuhnfc28E+g1W04xnNNwAvo89IO7Oc2nHRpBv6OdtwZjmMx6XAs+ry8DyzlOJbUmYvu3VZxHYhJhVHoYLvYdSBp04ZmBvzSdSAmNc5EWeuvug4kLQagnXUV+pba3G04xnPNaBx2B+DfwG1uw0mXM9BBthg4y3Esxn8D0OelHXgJWNFtONUZDUx1+P4rAusDyzmMIU5f4ATXQXjqZKCfo/duATZAV0PR+bSu7UuZSdBT0AChCRsCvOE6CE+9jvaPCbuVyATp5i6e3AbMAJapZ0Qp1IS+tfI6Q2E0+v9vch2IZ5ZBx0tbqSeUOtj2Ap4HxmEHW7GNgUfRmE5eB9pb0f//o2h/GFkGHS/Po+Onk+i306XAocD/AHehgWUDQ4HD0AyFM9EY4BKnEbnVBEwGLkCXkHPRUhejz8ouwPJovxwVPBAcbIOB2ejyoA24Avi4oSH6qRXYEH2D9wJ2Bn7lNCK/bI8mif8XeBr4HZpxn3fLAEeiY2ghSq69BnAiGkA+Dy22ewm42k2MXpmEJkPfjC4PPkAfKN+yXq40A0+i6VHj0H56Fe23vLsGHUcHoOPqPeDEZuAj9M09C/gUTejcGaVU82wJOtPvjTKRn6J99U2XQXnkW8BnaL+8gfbTvuT78hpgXXQZ+TzaN7PQ8fVR9IlB6v9w4DcNDNB3Qep/PVSewdW4ki/6oNUYG2Cp/6j70P19p9R/9JKoGV0u3QgcB7yLznRGs1rmoSpgY9FOzauz0UF2NZph/wi6b8u7PdFZ7TB0v/8cOobK2gb4G7ZcIWoQugbP64TX1dH//2DXgXimJ/AysF2tv2A+cFJi4WTHSYSLEuXJfJRUM2Gz6OZnYhj2LRYn+Bb7mutAGmw8utqJK4qaZ4PQ5eKIck8s5wI0OGfC9kDX5HmZSdICPAPs7joQD10LnJ/ELwoyTxsm8csy5l6Uuc2DI4AHXAfhocQz1IcAv8Umn0ati3Z0f9eB1FlfVFIw72OvcRahMcfEBLMFJif5SzPiauAi10HU2cVo9bwJm0KdZhVtjSYm21BAWHBznNWhgCDVv4LrQDzTC/grMKFebzAPrcw1YTPJbnGiO7FV6nFOoc41T2woIF5PNPF0e9eBJGw8+va2VH/Y8ug46Haqv5zzgOvq/SYpNIlsDQW0AM8Cu7oOxEPX09HIo66CoYCxjXizlLkHrWPKgmnAr10H4aExKDPbt1FveDBaFm9DAWGjgHeAr7gOpJsGoFXp67gOxEMP0eBlVs3AE5SotZBzVwKXuA6im+ag1fombCrwFF0XyqqLTdFSb+vuGLYsOrultfrWmmgow7fana61oXZUW7oK4OeoaaEJOx4VTEqju4HproPw0GloQagzQ1ENiqEug/BQDzQUsIPrQKo0AUv1x1kJpfpXdRwH5wA/ch2Eh4I6FD1cB1KhVuBPqP6MCfsxWp3uXG9Un2Mj14F4aCFFdQM9dzRwv+sgPLQ+DU71l/MNbCggzkjSMRQQpPq7bASRQ03Aw8BBjuMIaQYeB/ZxHYiHLkeVpn32feAy10F46Os0INW/EK3KjXuTU1EFrtUj2zdBQwHWGyBsWXTWWKuC585Apd9HxTy2ceGxw0q89kKUsh8U89ikwmvjCqgGZ19L9Ye1oZLqW0S2B6s8LizxuoeB31fzRgeiBnPRSkEtqOrtohKvuxn4TjVvlBPHUVnpu8GofHfcoPh1qCjqwBKvXQf9zWbGPLYQZdPisowLUKMME3Y68LMSj90GfEjnMeax6G8wo5o3akMp/WivtkmFX1bqcnEo+qOuXM2b5UAr8GdgxwqeG/eH7Af8B9Xz7MqjKHVffO+8MvAl8TUyJqK6oGnJmDZKuVT/tug4ODCy/YeofmapL8SSLgK+ILyc5i50EHa1gPRMyn8o8mgnKvtgB3/I/Yq2TaOyHuP7F543vmjbWagkeHQ5SPAFMLHM78yjn6CW06U0AS+iUiGB3qiv909recPVURXgWYWfh6JvyFLXqoGl0aXmZrW8acZVcskW/CEfKtr2FDpQy2V7e6H7r5sLP7eiFRpxl7CVXtrmzcao2nPvMs+bjr7Ygnvxwws/b1XrG9+LSiE0A99F35CVLP8/ALUPsqGAsEqTEcehP9xo1CGmncrvqy5AlzKDULm9diI156kuaZMnTehstX8Fz+2PWkIFmeY/oC/Jmj/zu6M/1vbobFVpKbMm4DHU1cSEVZJmD/6QF6OahJ+gA6QSw9AVyUx0Jn0brSQvlobhCBf2QwdNpan+69D99VboOOnWnNJWdEp9rfDLplbx2k0Kr7WhgLBKB5CvRUMs/0HThaqxAF0+LqbziuK0DLQ3Whs6oZS7Ly4WZB9fQ+2hur1Pv1P4haVSx125CXU0NWGVTI0ag/Z7O1rOVI1dC69bAgyPPJamKWSN9F1qS248gfZ1IknBDQu/rJbyykPQQbpKEoFkSKWTft8pPK9abWi87p7I9rRNjm6U7nxOZ6PjIzr4XZNzURYyOmOkUrV+Y2TdBOAvlL5a2AL9EWupaTK18Nriuvw90A182pb9NEKtV2BN6Muwli/E/9eM7i22RmMHt3Tjd9VyLZwXcQs1+6JLv8fQma2alfD9UQbzJXRgFd/op3lBaz3VklvohQauZ6IvtUqylyUNoeN+4W/Ait35ZVSf5cmLuBIET6P9/jG67KvGu4XXfog+RIG0l2qol1qz5sGYWjtavd2tz3UvdJmzAZ3TxrWoZvwib6LFdcahq4BamnVsiQ6yPpHtWShCVA+1jgcPQTN96l6ktVaVjsznTb3LxmWlvF7SMj/Tqdycs7yqZ0HULBWOTVLm5/B6UzjFM/Uq9T0JpfqzUhI9KUGhqsyvTulqnVCebUuyla2y2uwjCblZd1lqBaxRe6aqFh524QSy28aqO3JXUaAhtR1SKKnGg1lv0FirXNbK8bJqkSeSaKmbh9bDtchtFTjv6vF5oj8aCqi1Wfy66KxW6ZKcvMh9fVNvKs165ggqXzsYdS+a4WDCcl+524YC4rWgUoK7l3tixB5kq/tpUqwnRYHz7iCeGo/mpVY6FNATeBn4Wt0iSi/rtlTgvO+Vx34BnFjhc08C5tcxlrSyPoIRzjo6ei4YChhc5nmW6o9nHXJLaHiv4pS4EBX/7MpcVFXLhFnv9xLGYEMBcfqg4j2lhgLWA95CVZNNh2C/jXUdiK+up3M1KAOHovWAcd/Qi4BDGhpNOpyHSs2ZEpZH9yjRilB51ww8CewZ2T4ZrexuaXhEfluNyu51c+8U1FzChG2DqlMHfRZ6ooJB0U5DBuYBJ7sOIg16oaUmEyLbtyW/q7xXQCu6b6ej98LJ6EM1gO5PXE6r3uhzUWxrwl9KpowpdFweDUUztRfTuUVPXhyM5kueji6P1in8e3Zh+8HOInPrQPS5eBx9ToLL7ckug0qjRagYy2I0k6JeNTrSYk1U+u4DNPXoXVRKIe/7ZQT6Yl6MVrtbqr9K01EnliXYMpxiI1BWcgnqrWal6TpMQfvlc2xqVkXGobPYl2hN1rXUVvY8a/qjVPb76NKxN2oh9R7aT9YPW4P6c1Ehn8/R5fU2TiPy3Auo8UNQMzGYhuRtfb4GmYYOqmhz+kGF7dMaHpFfhhFO9fdHn6MXnEWUUrOAO1wHYbw2H03ENt0ULB2x8SQTZxt062Gp/oTsgRICtijSFKt1ka0p4z7gMNdBGK8cDvzGdRBZtC6a3V5LwwmTPX3RKpFaCyOZMq4Bvuc6COOFi1Am1tSJrUg2kFwxW1PGTFSbw+TXL1F5dVNnwVCANYzIp2qrjplu2g2rj5hHQWutSa4DyZt7UOVgkx9HUr+mkaYL1r42X+rdDtmUcRXq+mKy7xLgStdB5NlANBSwhutATF0NR6n+5V0HknczgLtcB2Hq6m7geNdBmI7e0Tu4DsTURdK9xk037QI8D/RwHYhJVCvwJ2Bn14GYsIXAUa6DMIk6Gkv1e8mGArIlSPWv7ToQE+9y4FLXQZhEfB+4zHUQprRl0dltLdeBmG4ZiYZ0rGpYAx0N3ER8Jmo0ag8cbWt7HFrVbdJrASrVV+wS1Ksuzi7os2ANWbphZ6Ad2CfmsSuAL4AVI9tbUb2SHesbmqmTicCLdM4sn44+C6NiXvMYqu9vnWu7oRn1247WmVga+BA1Jo+zE6oZaEMB6RJ8UU6MeWwwKr4aXam/DjoIZ3V6hanaKWhnjizadnBhW7TTTbEFwDF1jMsk71i6vgW4DVWFLi5bdzk6CK0XWwIGAp8R/kZ7DC0g7OqywW6y06WS5Na2hG8rgiucW+sbWr78jI5vtOCyoZIKuD8o/GP8dxlK93elCd3PBbcVlVzhmCptScc32uWow00lM8BtYDQdRlL5hITpdNxW/J7yVzimBn9G/do+Am6p4nXHAPfXJSKTlIVomKcSA4BP0Er9duDEegWVZ9PQzm1HRV8qZZNZ/VbLJPLr0Ofgv3Tu7GMS0A/t3JepvrPkBNTs3ZZp+KUHugerdnnUZuhguznxiAygMtPt1F4v8G50vW/8cTy1Lfw9FH0WrNlhHTShHlz/ovZa/2tiQwE+CVL91bYqXhpd3TyVeESGW9AlYDvdPzPNQdO8jHtXovmOlVoOeAA1V/kSO6vVxbdRn+Sdqf5eLcrKofmhlrWH/VBf8dnAhnWIydTBNGz1r2v3oIKrJuOCEta7ug4kpyZhpeNzZTxWscmFoBKaNUXJmTuxtkONNhO1ezI5Yw31GssaWebcxahfgKm/q1FrXpNT1gS9MdZF42O1TkgwGXEEGiw19XMvcLjrIIx7LcAzwO6uA8moPbBUvylifZrrI+h/Hi03aHJuPrYQMWknAXe4DsL4JxgKsCpNyRiE9qel+k2sC4Efug4iI+YCF7gOwvirD/BPbFZ5d62HUv39XAdi/HYo8Fu6v5wnzxYBh7gOwvivGXgS2NN1ICk1GXgaDakYU9bWqFHDUmWeZ8J6oVX1VjTVVOV24GTXQaTMKcA810GY9BmGDQVUY3m0v0a4DsSk03moIKgp73rgXNdBmHRqpmMoYGzM43nNVsbV1R+DVk9Yqt/U5GLgR2g19yN0HFxjUGp7qpOo3JuD2jQVd4N9EHWUMaYmy6Cyae+js9sRwKWoBNux5De13YoWgi5Gk7dnAn8kv/vDJGg19KFqR+uybAGkDAIeQvvlGWy/lGV9rbq2C2o72xc1ZOyDah5u4jIoT7yLvnweRqXE30NnPGOqdh6qL3kCHWXvmtG9yZvYYtMg1T+88PMJwKeoh54xVVkOLX58Fp3hivVFDR7y7MfA2ZFtPbElNaZGR2GlyuOsj87ufV0HYrLB+nHHa0L3aQc5jsNkyKXA5a6D8NA+qDeaJddMIqxxYrw24B/Alo7jMBnyK+A410F46DtYH2uToKDZfU/XgXhmJZTqX9VxHCYjWoE/Azu5DsRDN6IOsMYk4hjgftdBeGhj4HWgt+tATDYEqf61XAfimSZUAOkA14GY7PhB4R8Tth/wByzVbxIyEi2dsVR/WJDq39xxHCZDFqD7NRM2G7jJdRAmO3YGXgB6uA7EM0NQqn8V14GYbOgBvAjs6DoQD92EzmzGJGI6cLfrIDw0DqX6l3EdiMmGZVFSZLTrQDzTBDwG7Os6EJMdV6BKUSbsAOD35LdUn0nYKHRW+4rrQDyzNPAqluo3CVoITHMdhIfORHMgjUnErsDzWKo/agiqkbmy60CMH3YFtirx2HBgCjCwi9f3BF4Cdkg4riy4Ga1XCyyF9ueYEs9fv/C4LUXKqJ8C/yG+0Mx8VBa7q6pXM4A76xBX2m0CvEbnVP9TaMA/mixpAl5GlZBNRm2OKvAeHtk+GPgc1Q0pZSAqdbBGfUJLrWbgccK1+wOHo/29RWT7toXt1so3455CbWSLnYb++F0tj7kKNcswYQcBjxKf6u8N/Au4IbL9FuB/UYVok2FHoAMraOPUjGamP9zFa0ajVP+ydY0sfXoDbwAbdfGcy1Gl42DfLQd8BlxZ39CMD4Jv22sKP09EB9/+XbzmXnSQmrCzUWXjrowClqDOPQAnov29fh3jMh65Al3G9KV8YmR34DlUX8R0GIpS/UMreO5DKFHSjLK5j9cxLuOZUejbdTZKjFxS4nk9Udbsa40JK1VuBU6t8Ln7oP19euHf1vgwZ36LGvK1o5XWcU5EZz4TtilK9VfaHKQXuuddjC7hbTVAzuyLDrQHSzw+CKX6ratKWDPwBNW3KT4X7W8ryV6jNBdx+Vfh39eUeDy4+X+5MeGkxjeAL9BlZDXK7W+TYb9Gva57xTy2LvAW1no2qg9K9Y8t98SIXmg1wKKkAzL+6gechFrutlN65v59wKGNCipFzgWuq+L5w4GT0RfbYmCbegRl/DQENZN/Evg28bMe9kQlxC3VH7YaKuCzYhWvGY/29yN0PY5pcqgnaoqxnetAPDQPOMV1ECY7ZgG3uw7CQ5uhe6689wE3CVkeXSaNcB2IZ5rRZfdk14GY7LgWON91EB46BN1zWQEfk4gxwJsoW2k69EHDIxu6DsRkx4PAt1wH4aELgLmugzDZsRdant/iOhDPDEP3sINdB2KyYSng75QuApRnd6AJAMYk4tvAba6D8NA26EtoKdeBmGwIUv3DXQfimRbgGWAP14GY7PgRcI7rIDx0GPAb10GY7AhS/XH1I/OsL9ovG7gOxGTHQ2hdlgn7HrbezCRob1Q7Ms0LX+thdXQPu4LrQEw2tAGvAFu6DsRDvwBmug7CZMdpqBqvCQvWncWtWjemaiuhy6RVHcfhmxbgWWA314GY7LgBOMt1EB46EnjAdRAmOzbAUv1x+qPCRuu4DsRkQxNqmnGg60A8dDHW4MIk6OvAH7BUf9RwLNVvumEecELRz22oHVS0GV/ezEYFZ4srht2FOqkaU5NzUKOMt1B3y9moRmTeTQU+Aj4BjkH75q9Yqt9009KoQtYSVBh0nNtwvHImKh2+GCtLZxJ0F/AB+mDdjmpCGpiO+tEtQe2OV3Ibjkm7ccDrqDXRPujD9Qmwk8ugPDAAeBtYG618+CvwJbrcNqZqTaj32n6R7ReiEtp5dimdWzbtT/Xtn4wB9OF5Ekv1R62J+s0t5zoQkw1tqEz25q4D8dCvgONcB2Gy4wzgJ66D8NAE1DDEkkQmEUOA94FVXAfimVbUAivvySGToJ8Bp7sOwkPHAPe7DsJkxyZ0pPpNhyDVv5brQEw2NAGPoQnHJuwHhX+MScSBwO+wlkZRI7FUv0lQb+ANYGPXgXhoAbpfMyYRZ6FyByZsJ+AFoIfrQEw2DEWp/pVdB+KZHsCLwI6uAzHZcQsqTWfCpgP3uQ7CZMemwGto7ZrpsCzwDjDadSAmG5qBx1EZcRN2BTDHdRAmO74JPIql+qNGobPaV1wHYrIhSPVv5DoQDy0EjnIdhMmOc1ATQxO2K/A8luo3CVkN1Tlc0XUgnukJvATs4DoQkx23oYbzJmwGcKfrIEx2bIZWYFuqP2wgmv+4hutAjFu9UeOGOE1o+UclB08z8AQwJaG4suQqVK+/WH+07+P0RPvdVmxnzOlAO0pJR+1SeCxaASvOt4BHsFR/1GiU6l82sv1+VBE6LllyAaoXOby+oZlGG4xKgUe/eUH3GB9S/szWB/gnMDbZ0DLhXuCImO17oi+y3SPbe6KDc2Gd4zKOzEOThZcq2jYEFQaNOwijzgeurUNcabcb8BzhRhmBVjQWuSCyfSrxB6HJiAnoD7xv0bbZlL68LDYMpfoH1yWy9OoJvAxs38VzZqOy66sWbfs1pS8vTQY0oeUeiwo/N6MWTovinx5yOzCrHkGl3EzgF2WeE1zCn1n4eXV0r3ZmyVeYTJhOx5ls58J/l6sXsg3wd8KXnwYGoVT/Vyt47u10nMnOp/OZzmRQf+Bj4CLgl3S+h4tqRuXD96x/aKlzDfC9Cp+7Hfpi2wslRu6uV1DGL9eh7OOXlP+wHIoaY1iqP2xddKYqNXYZ1YTu7d5HB92kOsVlPDMW/cHbUdWnUoJU/waNCCpl7gMOq/I1x6N9/ibxmUuTQa3Av4EHyjzvQuCH9Q8ndfZAJcSrPWA2QAfb7KQDMv6ajP7ok7t4zupYqj9OkOrfrobXXoqykkMSjch4aSiwFepw+SLQ0sVz5wMnNiKolJkF3FHF81uAEWgQ+1N0v2xy4C/ojFZuytV44G9Ar0YElSJBqn9EFa9ZkY774yfoPHfSZNRQVNexq3uNFuAZbBpRnGvRGFk1WtDsG1tkazo5gvKJkzxaD6X6+7kOxGRDX5SWtlR/Z4vQ8iJjEnERWgBpwqYAT9N1QsmYigWp/hVcB+KZXiixNMF1ICY77gROcB2Eh05BxY2MScR4NPZmqf6w5dHZvppUvzEltQDPosKiJux64FzXQZjsmIZWDZuwMSgz29d1ICYbBgBvA+u4DsRDD6GmIcYkYg5qa2TCpgJ/RAtnjem2NdA8v4GuA/HMUsAraMK2MYm4G9UjMWGnAre6DsJkxwQs1R9nJeADNMBvTLe1An9ClbVM2I+Bs10HYbLjaFR/3oStj6X6TYKCVP/argPxTBPwMHCQ4zhMhnwfuMx1EB76OvAUluo3CRmJUv3LuQ7EM22oBPsWjuMwKTcE2KTw3wuAYx3G4pM2OhJEpwM3O4zFZMQUNGY0EXgB65gSGAK8jlL972E1900NmoFNCdfub0IdLmcAX7gIyhNr03m2zPnAlegy0piq3YA6zkxGZ7Y/olLZeXcsumedAayGmlu8Tul+18Z0KWh+sTVwCaoENRQ4HHjVUUw+WQnN5P8qOst9E305GVO14k4zzagl1EQ0tvYXVPraqM7KaOBB4DhUJ9OYbpmCmvDNRq2KZmMNDaEjQXIAqgV5AyqBYEzF4gZlv0QH2Ti0rMbKX3e4AY0/vo/6rRlTsyD1b8KCM5sxNYue2d5BM/xdGIAqKw8o8fgauJuj+RnqpmpMJgxGCZk5MY/1Qc0Yf9rQiIzJsHmod/fSke1HohZKVnrAmIRMQAfV/pHtT6FmjE2dXmGMqUkTOqgeLtq2EToArf6JMQmbjg6u0YWf56IEhVX1MiZh/YGP0fSxIDFyo9OIjMmw61GiZAY6y23uNhxjsiu4T/sUeM5xLMZk3hPogDvGdSDGZN2NwCeUnlFijEnAQHSgzXUdiDFZNRrYB3gA+C+aD2mMqYMz0H3aK8DejmMxJlH/BwTKW3j/PivhAAAAAElFTkSuQmCC[/img]
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