Question
Given polygon is a __________.
![](data:image/png;base64,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)
- Heptagon
- Regular heptagon
- Septagon
- Equilateral septagon
Hint:
polygon having five sides is called Pentagon.
polygon having six sides is called Hexagon.
polygon having seven sides is called Heptagon.
polygon having eight sides is called Octagon
The correct answer is: Regular heptagon
Regular heptagon, so option 2 is correct
polygon having seven sides is called Heptagon.
Related Questions to study
Find the measure of x.
![](data:image/png;base64,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)
Find the measure of x.
![](data:image/png;base64,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)
If ABCDE is a regular pentagon, what is the length of side CD of the pentagon?
![](data:image/png;base64,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)
If ABCDE is a regular pentagon, what is the length of side CD of the pentagon?
![](data:image/png;base64,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)
Find the measure of each angle of a regular hexagon.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAO4AAADcCAYAAAB3XJ2EAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAB9tSURBVHhe7Z0JuJdj+sf/lwxjCTOYy2XGmBlUpIk20mnfN6WaNuqk3dKCEZLJkiUKRYimVE5JWY8ibVqVUhFpE4qStCst9P2/n+f3nqYxpzjn/Lb3fe/Pdb2XpufXNXWe7/f3Ps/93M99/58MwwgcZlzDCCBmXMMIIGZcwwggZlzDCCBmXMMIIGZcwwggZlzDCCBm3Chw8KC0d6+0e7e0Z4/044/+gBFUzLhRYPNmadAg6brrpJ49pYUL/QEjqJhxo8CaNVJGhjfb3nQXKiSNGuUPGEHFjBsFVq/+j3GPOcaMGwLMuFHgs8+kGjVixi1cWBozxh8wgooZNwqYcUOHGTcKrF3738YdO9YfMIKKGTcKbNsm1asXM+4pp0jZ2f6AEVQiYdy9e/dq/fr1WrVqlVasWBG9Z8oUrbjiCq3wjLvipJO0YuDA3D8X4Ie5ZY6Z6ygQCeMuWLBAmZmZqly5sjIyMqL3lCmjjNNOU4Zn3IxChZRRtGjunwvww9wyx8x1FAi9cTdt2qRBgwapWLFiuuiii1S3bt3oPZ6o655+uup6xq177LGqW7Jk7p8L8MPcMsfMNXMedkJt3AMHDmjChAm69tpr1bFjR7300kvasGFD9J7587WhYkVt8Iy74eSTteGpp3L/XICfcePGuTlmrplz5j7MhNq43333nbp06aLSpUvrueee065du/yRiLF1q7zXkjfb3nSHNDjF3DLHzDVzvmXLFn8knITWuD/88IPmzJmjOnXquP3PvHnz/JEIwjlutWox4554opSV5Q+EC+aYuWbO586d6zQQVkJrXCKN/fr1U7NmzXT//ffr66+/9kciyOHGPemk0BqXOWauc+YcDYSV0Bp3/PjxKl++vNvzLFmyRPv27fNHIggJGPXrx4z7hz/I2+z7A+GCOWaumfMrrrjCaSCshNK4W7093T333OOijHfffXdkzvaOCFHW/v2lmjWlzp2l997zB8IHc82cM/doAC2EkdAZl31Ndna2OnTooDZt2mjixIn+SITZv591pPTxx7Flc8iDdMz5Nddc4zSAFsK41w2dcTka6NSpk6pUqaIRI0Zo48aN/ogRFZjzf//7304DaAFNhI1QGXe/92aZOXOmKlasqOrVq2vx4sX+iBE1Fi1a5DSAFtAE2ggToTIuUcRHHnlEDRs2VN++fbWZki1GJPn222+dBtACmli5cqU/Eg5CZdzRo0e7b9kbbrhBCxcuDN23rPHrYe7RAFpAE1khOwILhXEPHjyobdu2qVevXipSpIgefvjhaB//GA40gBbQxO233+40glbCQCiM+/3332vy5Mlq166dmjRporffftsfMaIOWkATaAONoJUwEArjrl27Vl27dlWDBg1cNDHSWVLGf4EW0ET9+vWdRtBKGAi8cVn6vPPOOypbtqzq1aunjz76SD/99JM/akQdtIAmuPqHRtBKGJbLgTfuZ599pgEDBqhatWq68847tWPHDn/EMGKgid69ezuNoBU0E3QCb9xRo0apUaNG6tmzp7sR8qO11zB+BprgphgaQStoJugE2rjkoXbr1s3lpT755JOhvsZlFAy0gUbQCpoJeg5zYI1LdHDatGlq2bKlu385ffp0f8QwcgeNoBU0w6+DHGEOrHHJkmLpw93LZ555Rl999ZU/Yhi5g0bQCpq56aabAn1fN7DGfeONN1SqVCk3CZ988knoawwZBQeNoBU0g3bQUFAJpHGpn9u/f3+VK1dOffr0sfu2xq8GraAZtIOG0FIQCZxxiRC+8MILat26tbp37257WyPPoBkCVGgILQXxJCJwxqVyI2U4S5YsqeHDh9u5rZFn0MywYcOchtASmgoagTLu7t273d1KUhu58fFeiEuwGImFM380hJbQFNoKEoEy7scff+yyo1q0aKHHHnsslJUNjORADjMaQktoCm0FiUAZl2r1ZcqUcTc9iA7afVsjv6AdNISW0BTaChKBMC5J4fSDoWrfxRdf7P5rpjUKCho6XFNoLCgXEAJhXNLV6PvDt2Pnzp3dDQ/DiAdoCU2hLTQWlLTZQBiXvSw/WIpcjxw5MpBRQCM9QUtoCm2hsaDETdLeuHwDzpgxw5XarFGjhj744AN/xDDiA5pCW2gMrQXhrZv2xiWAcN9997nyIw8++KCr3mcY8QRNoS00htbQXLqT9salcmOFChVctT4qGVhQyog3aAptoTG0huaOCNVVli+P9WNKIYk3LlG6PXvInvB/49dBdI/9B9X5ihYt6mrj2kUCI1GgLTSG1tDcd5s3/2+EmTu8kydLd9whDRgQa+eSomV14o1LSuLMmdJbb0lr1vD15g8cHRoVc3uDzmtXX321pk6d6o8YRmJAY2gNzb3++uvadfh9XQKiw4fH2pWefbZUvrz09NPcePE/kFwSa1yStxcskDp2jLV57NlTevPN2DfXL0A1PqJ8tWrVcksXztgMI5GgMbRW09Nc206dtII73qzyCIgOHChdfrnnGM8yPOXKSc89J33zjf+nk0tijcvblW55/COPOUY69lipYUNp7Fg6M8V+KLnAsoV6uFy9ojpf0NLRjODysbd/rduokS6rVElTvLfuj9OmSdddJ517bsywv/2tVLZsrG3pqlWxPW8KSKxx+Udhuq5dpd/9LvYPP/FEKSNDuuceaeHCXP/hn376qYvyYVoyWuwGkJEstu/erXs9U7bxVoivXXONttapE2sGjnbp5t+kiTRypPTFF79625cIEmtcYPM+a5Z0221SqVKxty4/hHPOiS2h6Y7OD+EwKGDNEvnmm292XdescqORLA54el04apSyPcMuPfNM7UarPOefH3sBTZrkuXu7/+nUkXjjAt9MhM+HDZP3GpUKF5YKFZKOO04qU0Z6+GFp5Ur9tHevNnr73+u6d1fRCy/UU0895UL1hpEUvLftwdmz9YOnv++9pfEPnmH3ec9+T4vq21dasoSGRP6HU0tyjJsDASaiw716ScWLx77JePjB/POf2pKVpZfHjFHT9u3VuEULzeRNbRjJgCPL7GypZUvpvPOcLnd5z9I//lGLvD3uTgJUaXQBIbnGzWH1amnQIKl27f/sfU8/Xd9WrqzR3u/dnZmprBEjtGHLFv8PGEaCYEX3+eexLVujRodeJgfPOktfVKqkB8qXVy/PuJ+mWc+h1BiXby5MScS5bVvp1FNd1HnP8cfrU+9ZWqOGvn7xRe0LeNFqI80hdvLhh9K990oVKkgnnBAzrmdadeumdZ6Zr/ZWfqUvu0yvs7dNI1Jj3BxYnsybF/vBZWTogGfe/d4P7sAZZ0jNm0veW1fr1vkfNow4wl71o4+ku+6S/vKXmGE56qleXbrvPref3bF9u3r3768K3krwgQcfTKueQ6k1rs9PGzdqfs+eyi5cWBv41iNwxQ+S899HHuGmQZ5TJg3jqHDaMXeu1KZN7IjyzDNjLwtvpSe/uD472jnei+WWW25xFxA47UiXTpBpYdxvvSVx9y5dVNt7006vUiUWaca4HB3xbcixERlYhhEvMOC2bdLQobG97Y03xtJyfxZXoYgc1USpktGhQ4e0uZ2WcuOSkzxlxgzVa91aVevV00zvW80dcJNhlRO48va97s1rwSoj3hCYoqIKUeMj9BKimii9l+n0N2XKFKfZVJNy43Kd6qabb1aLVq30NN3k+UYj0scPk1QzQvMcHXHWa53mjRSw0dvKDfXezDQLo+cQmk01KTcudX4uueQSZbZtq5WrV+tQ9jJ7Wu49snyhx8uyZbbPNVICufMrV65UZmam0yqaTTUpNS7d0+69917XgKlfv37uB2QY6QjaRKNoFc2mujtkyoxLXR+KdHH/sUePHnr33Xf9EcNIT9AoWkWzaDeVtalSZlwqyV9zzTUqW7assrKytD0NErcN42igUbSKZtEuGk4VKTEuIXaic9WqVXO3gJaQvG0YAQCtolm0i4ZT1XMoJcb98MMPXb+W5s2bu/4tVrnRCApoFc2iXTSMllNBSoz7/PPPu34t119/vbs0b0EpIyigVTSLdtEwWk4FSTUuVfO++eYbV0WvePHiGjBggF2SNwIHmkW7aBgto+lk9xxKqnF37tzpuqJxHtapUydXNd4wggjaRcNoGU2j7WSSVONyu4JQetWqVfXiiy9aDyAjsKBdNIyW0XSybw4lzbh79+7VW2+9pfLly7u8z+VkRRlGgEHDaBlNo200niySZlzyO6nY2LhxYz300EN2bmsEHjSMltE02k5mDnPSjEuSdqVKlVzlxmXLlllQygg8aBgto2m0jcaTRcKNS7SNCvHdunVTsWLF9OSTT6bNZWTDKChoGU2jbTSerK72CTcuy4lXX33VbeB5ZtJHyDBCBJrO0TdaT8Y2MOHG5bC6bdu2atiwocaOHWtZUkboQNNoG42jdTSfaBJqXPYAdD3jDmPTpk21evXqpB9UG0aiQdNoG42jdTSf6BhOQo1LuJw7jDVr1tQDDzyQ0mtQhpFI0DYaR+toPtHHnQkzLt9CtBChcddtt92mDz74wN62RmhB22gcraN5tJ9IvSfMuNTpoUHwRRddpBEjRlgPICP0oHG0jubRPh5IFAkxLlG1iRMnujU/h9Pz58/3Rwwj3KB1NI/28UCiIswJMe7SpUvVpUsXd2eREh/WTd6ICmgdzaN9PIAXEkFCjEvydYkSJdSmTRuXfG1ZUkZUQOtoHu3jAbyQCOJuXP7Sd999t0u8pqu8mdaIGmge7eMBvJCIm0NxNS4hcfI1mzVrpl69erkK8IYRRdA+HsALeCLeR6FxNe769evVunVrXXrppS6T5PsjtHQwjLCD9vEAXsATeCOexM24VACYNGmSateurQYNGiRsU24YQQEP4AU8gTfiWSUjbsbl8Jm+Kq1atXJLg82bN/sjhhFN8ABewBN4A4/Ei7gZl1aEJUuWVNeuXS2SbBgeORFmPIE38Ei8KLBxuY/I+p1qd/zlqH5nqY2GEQMv4Am8gUfwSjzuoxfYuPQKpbYsdxG7d++u2bNn+yOGYQCewBt4BK/Eo79ugY27du1alyWSkZGhCRMmJOUSsWEECTyBN/AIXsEzBaVAxiXkTbSMvxDRsxUrVvgjhmEcDt7AI3gFzxT0qLRAxl20aNGhHkCDBw+2t61hHAG8gUfwCp7BOwWhQMblzmG5cuVclbtVq1ZZETjDOAJ4A4/gFTyDdwpCvozLX4LeoFS14+7hkCFD/BHDMI4GXsEzeAcP5fdlly/j8tonnYvmvh07dtScOXP8EcMwjgZewTN4Bw/ld3uZL+NSxa5FixaqU6eOi5Zt2bLFHzEM42jgFTyDd/BQfitC5tm4+/bt02uvvabSpUu7W/5r1qzxRwzD+DXgGbyDh/ASnsoreTYuidPcMaSG7KOPPpqyVvqGEVTwDN7BQ3gpPxdy8mTcPXv2aODAga614B133OH6plh6o2HkDTyDd/AQXsJTeCsv5Mm427Ztc9Gw888/393wt/62hpE/8A4ewkt4Cm/lhTwZl/6fhLPZWN96663uENnObg0jb+AZvIOH8BKeymtv3TzvcYmCUbGd/8P7778/LgnThhEl8AzewUN4KT+R5Twb98CBA65eLBGxRo0auRxM2+caxq8Dr+AZvIOH8BKeyit5Ni7Q4Khdu3aujX5WVpbVTTaMXwlewTN4Bw/hpfyQL+NSO4fzJ1oKUghr+vTp/ohhGEcDr+AZvIOH8luHKl/G5XVPT1Dq6BQtWlSPP/64BakM4xfAI3gFz+AdPJTfbWa+jJvDsGHD3P3CHj16uHMpqzNlGLmDN/AIXsEzeKcgFMi4/EXuu+8+XXXVVXrooYe0detWf8QwjMPBG3gEr+AZvFMQCmRcqrNPmTLFfYNQO7agfxnDCCt4A4/gFTxT0M4GBTIurFu3zjU4qlSpkouWWTaVYfw3eAJv4BG8gmcKSoGNS+2ccePGKTMzU506ddLUqVP9EcMwAE/gDTyCV+LRmqfAxiUqxtlUnz59VLx4cZcJYkEqw4iBF/AE3sAjeCUeCUsFNm4OL7zwgsqUKeO+WZYvX56vbBDDCBN4AC/gCbyBR+JF3Iz70Ucfuep13Op/7LHHLJvKiDx4AC/gCbyBR+JF3IzL5eBp06a5yFnNmjULXH7SMIIOHsALeAJvxLPoRNyMCxs3bnT5l6VKldKoUaO0Y8cOf8QwogXaxwN4AU/gjXgSV+NSO2f06NGH+gjNmDHDHzGMaIH2c/oF4Yn81JU6GnE1Lnz11VfuriFXlqins3//fn/EMKIBmkf7eAAv4Il4E3fjwssvv3yohT6XhC3CbEQFtI7m0T4ewAuJICHG/eSTT9ztB/qkPP3009qwYYM/YhjhBq2jebSPB/BCIkiIcSnNQbZIkyZNXHkO65lrRAW0jubRPh5IVGmnhBgXyM/s3Lmz65Py7LPP5rn8pGEEDTSO1tE82k9k3n7CjAvDhw9X48aNXYeyuXPnxiXVyzDSEbSNxtE6mkf7iSShxv3ss8/Uv39/Va5cWf/617+s64ERWtA2GkfraB7tJ5KEGpdvIbpvcwjNtxB5m1bixggbaBpto3G0juYTvbpMqHGBZr5du3Z15ShHjBhhEWYjdKBptI3G0TqaTzQJNy5RtcmTJ7t+oJTt4Pa/YYQJNI220ThaT0aTgIQbF+gJmlMRktsSlk1lhAW0jKZzKjcmq1d0UowLzz//vLspQf7mwoULLZvKCDxoGC2jabSNxpNF0oxL2wWibfXr11ffvn2tIqQReNAwWkbTaBuNJ4ukGZclBZkkV1xxhWrVqhXXS8WGkQrQMFpG02g7mVvApBkXvvzyS3Xs2FHVq1fXyJEj9c033/gjhhEs0C4aRstoGm0nk6Qal+p22dnZat++/aEInGEEkZyTErSMpuNRuTEvJNW4HEoTdaPaXbFixVxHboswG0EDzaJdNIyW0XSy03mTatwcxowZowoVKqhLly5aunSpmdcIDGgVzaJdNIyWU0FKjEt6WL9+/dS0aVNXISDe9XgMI1GgVTSLdtEwWk4FKTEufVNmzpypatWqqWrVqnr//ff9EcNIb9AqmkW7aLigPYDyS0qMC0Tl2NhfdtllLs/Teg4Z6Q4aRatoFu2m8lQkZcbdu3evxo8f70pXsl94++23/ZFcoEJekjf/hvFz0ChaRbNoFw2nipQZF+jITV+Vv//97+4uY64lLNeulaZNk9av93/DMJIP2kSjaBXNot1UklLjwquvvqqyZcu6M7Fln3yiQ9al1M38+VLv3lLz5tKQIdLnn5Mg6n/AMJIDkWT626JRtIpmU03KjUspyzv79FHzli01cPBgfcmbleOhqVOl1q2lwoWlk0+WmjaVJk2i1ID/Jw0jOVAX+fAeQGg21aTcuJT8mDVnjhp4xq1YpYqmP/OMNHq01LhxzLT/5/0VTz9d6tlTWrw4ZmrDSCKzZs1yUWQuyvPrdCjBlHLjwlbvB3GzZ8x6Z52l6ZUrS5dfHjPsb34jFS8eM633A1MKgwFGCKBv8/btNPbxf+OXoQfQ0KFDVaJECVfdIl1utaWFcQ/u2qU53ob/1T/9SV8df7x03HFSoUJSRob06KNUWI/teQ2jINAKhP3pK6+wR/vFFwFpjHTZ69atm1q1aqWsrKykpzYeidQbd906ciC196qr9L23NP6RN+3vfx8LSNEIOMm3LoyQgkmzs6X69eWte6UbbpDeeOOob1/qJN9+++3eAvByDRgwQOvT6GQjdcYlOrxsmfTww1KlStKJJ2q/Z9ovvTfux97//nL4cP2QpDIgRgRgX0rs5IILYtuwY4+VrrzSvTT09df/EzuhugWRZGpJ0U2eyo3pRGqMy3JjyRLp5pulc8+NLY1POEHbvR9qtmfaB1q21LAnn9QXdl/XiBfsbz/4QGrfPraiw7wnnRSLp/TtSy5j7DM+67y3Kz2AyEmmyHkyKjfmheQbl/KsLFluvFE666z/fPs1bKidnlmnjRypVu3aqU7jxpoyfbr/hwwjDnBnlj5Wd94plSsX0x7Pn/8stWkTe/uydfOYNGuWanvLavrb0us22fdtf4nkGZelMUuS556TatWSTj01FjU+4wypXj1pwgQd9JYrW3btUo9bblHRCy/UoMGDU5bEbYQUVnvETYYNi+13efsSCMXAZctKAwdq/+LFGvL44ypWsqRuuu02bd+50//D6UPyjLtpU+wbrXr12NKYH1Tp0rHMKPKUDwuzv5CVpSu9NzDV8+bMmeP2G4YRV0hZnDlTuuOO2JFjztu3SBFt8va1Q72ntbdMHpUGWVK5kTzjbt4sjR0rVaggnXmmVKWKNGgQ5R/p4eB/KAZ9Vx599FHVqFFDt3nfeNu2bfNHDCPOsHd94onY25fVn2feHd7z/tlna1KzZlrFti4NXxzJMy4bf8LpRJEJxXtvVbefyOVcjF4s0739LWF46tUuWbIkbc7PjJCBrkjKeOstHfT2uQdOOUV7PeP+wHPOOTrgrfrcm5nPpBHJMy7wQ+K2D8dAv3D/lqp5119/verWretti59z+aKGkTB279bX3rJ4ToMGWua9efewbObxzOvSb599NpbAkSYk17h5gHxQerJ06NDBnaVNnDjRHzGMxPCWt8rr3KSJhnpbtO88Ax8877yYeXnKlJEeekj68MO0uOiStsaF7d7y5K677tIFF1zg7kCm8uKyEW727t+vBwcMULESJXRv377a/d570v33SxdfHDMuR5YcX3ovEi1dmusWL5mktXFh3Lhx7mYGCd7U+8n1sr1hFAA0hbbQWJVatTTqjTfkwqU0p+b40lvxueNLDMxNNX4vDxcVEkHaG3f16tUuT5QrVbx9rSKkEW/QFNpCY2htlae5Q9Ay8513JIJUnPN6y2iNHEkLSv8DqSHtjUv1gblz57rKerTpX7BggT9iGPEBTaEtNDZ3zhzt//mqjptpBFWpyMKTU+whhaS9cWHTpk2uSFfFihVdhNneuka8QEtoCm2hMbQWBAJhXIJS9Gfp1KmT2rRp435tGPEALaEptMWvgxIADYRxgewpKshfeOGFrl+L5TAbBQUNoSU0hbaClKEXGOPCK6+84nqRtm3bVosXL7bjISPfoB00hJbQFNoKEoEy7sqVK9034z/+8Q/333X+FSzDyCtk5h2uJbQVJAJlXJY27733nho0aOCCCVTcM4z88O677zoNoSU0FbStV6CMC+xDyGG+9NJL9cwzz7jepIaRF9DMU0895TSEloJ4+yxwxv3xxx81YcKEQz2H0q0WkJH+oJnOnTs7DaElNBU0AmdcoEsa93VLlSqlW2+9NS0KVBvBAK2gGd62aCiVHfcKQiCNC3ROK1eunJo0aeLu61oOs/FLoBG0gmZolXnUDpFpTmCNu2bNGtfHpXnz5u6b84svvvBHDCN30AhaQTOc36KhoBJY41Ksmhzmli1buhzTyZMn+yOGkTtoBK2gmXnz5jkNBZXAGhfo60LNWzJfHn/8ce3iJodh5ALaQCNoBc3sTMPKjXkh0MYF7uvS/vCGG25wfV6sIqTxc9DE1KlTnUbQCpoJOoE3LtlTTzzxhDtMv+WWW6wipPE/oImbbrrJaQSthCHjLvDGBSrNUxGyTp06WrRokb11jUOgBTRRu3ZtpxG0EgZCYVzyTtm3XHnllRoyZIhFmI1DoAU0gTbQCFoJA6EwLtHBmTNn6tprr3XlXN+gfaJheKAFNNG+fXunkSBHkg8nFMYFooa9e/dWkSJF3G0Py6Yy0ABaQBOc24bp1CE0xoWXXnpJ9evXd9X6Zs+ebdlUEYb7tmgALaCJ8ePH+yPhIFTGXbt2rQYPHuyWRuSjBqV+kBF/qCWFBtACmkAbYSJUxuWWB3crqdiXUxHSeg5FD+b8cB3w6yDeADoaoTIu8JalPWf16tXdfV2rkhE9mHO6yaMBtBDGlVfojMvehiwZ7uo2a9YscLWEEgLVHWibwRkmHdlDvoVgzps2beo0gBbCWJssdMYF8lDpNUQ0kUhz5CPMrDratZOKFpVKlZLefNMfCB/Mdc7pAhoIek7ykQilceG1115zN0EyMzM1f/78aJdzpXkz3eZyOs+NGOEPhAvmmLlmzpl7NBBWQmtcutoPHDjQXZrm3m6k97o0r6pWLWbak06KNRUPIcwxc82cc+8WDYSV0Bo3pwNbvXr1XN1csmYiy+efx5pVYdzChaWxY/2BcMEcM9fM+cKFC0N9jh9a4wK3QogqUuKGfNXI3hzi3+2J2Rn3lFNCucdlbplj5po5p7dymAm1cbkZQid7ootXX321nn32WS1fvjxyz5p33tH35cs74/7kLZW/euSRXD8X5Gfo0KFujplr5jxs57Y/J9TGha1bt7ozvaJFi+pvf/ubW0pF7WlWurQWnnaaM+7uQoXUt0iRXD8X5Oevf/2rm2PmmjkPO6E3LixdulQ9evRwjYvZ/0TtaV+lipaccYYz7p5jj1X/Sy7J9XNBfphb5pi5jgKRMC7LJvZA3377raujG7Vn84IF2lepkjPuwZNP1nbvrZTb54L8MLfMcdiXyDlEwriRh6Vj3brOuC44ZfeVA48ZNwpwM+bw46AxY/wBI6iYcaMAiQjVq8eM6y2VzbjBx4wbBajYX7VqzLgnnBDazKkoYcaNAvbGDR1m3ChAnnZmZixP+ZJLpOxsf8AIKmbcKLBjRyzN8cEHpeHDY0tnI9CYcQ0jgJhxDSOAmHENI4CYcQ0jgJhxDSOAmHENI4CYcQ0jgJhxDSOAmHENI4CYcQ0jgJhxDSOAmHENI3BI/w+tCN31O6IWaAAAAABJRU5ErkJggg==)
Find the measure of each angle of a regular hexagon.
![](data:image/png;base64,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)
What is the value of x?
![](data:image/png;base64,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)
What is the value of x?
![](data:image/png;base64,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)
is a ____________.
![](data:image/png;base64,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)
is a ____________.
![](data:image/png;base64,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)
The measure of
_________.
![](data:image/png;base64,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)
The measure of
_________.
![](data:image/png;base64,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)
Find the value of x.
![](data:image/png;base64,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)
Find the value of x.
![](data:image/png;base64,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)
What is the sum of interior angles of a triangle?
the sum of interior angles of a triangle =
the sum of exterior angles of a triangle =
What is the sum of interior angles of a triangle?
the sum of interior angles of a triangle =
the sum of exterior angles of a triangle =
____________.
![](data:image/png;base64,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)
The alternate angle theorem states that when two parallel lines ( AB and CD) are cut by a transversal (here DB ), then the resulting alternate interior angles or alternate exterior angles are equal
____________.
![](data:image/png;base64,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)
The alternate angle theorem states that when two parallel lines ( AB and CD) are cut by a transversal (here DB ), then the resulting alternate interior angles or alternate exterior angles are equal
The value of k is _____.
![](data:image/png;base64,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)
we can also conclude that PR = QS by simply observing the symmetry of the figure. However, mathematical reasoning should also be acknowledged. In a parallelogram, opposite angles and sides are equal
The value of k is _____.
![](data:image/png;base64,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)
we can also conclude that PR = QS by simply observing the symmetry of the figure. However, mathematical reasoning should also be acknowledged. In a parallelogram, opposite angles and sides are equal
Find the value of x.
![](data:image/png;base64,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)
In a parallelogram, opposite angles and sides are equal . in this case, angles B= D and A = C.
Find the value of x.
![](data:image/png;base64,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)
In a parallelogram, opposite angles and sides are equal . in this case, angles B= D and A = C.
____________.
![](data:image/png;base64,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)
The <USR = 110 degree.
<TUS=180 – 110 = 70 degree
<RSQ = <TUS = 70 degree ( corresponding angles)
____________.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAARAAAAGbCAYAAAAMfc8OAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAD80SURBVHhe7Z0JvJXj2sZxvuM4xzwdHHymokFpngcNVDQSOSWZSkJJkwYNFJqLlEpKSqqjKEMi0aA0qCjJXCGJE44P3/ed7zzf+t+9u1O7Pay1ep/2Wuu9/r/f+8N+995l77Wu93nu57qv+zAnhBBJIgERQiSNBEQIkTQSECFE0khAhBBJIwERQiSNBEQIkTQSECFE0khAhBBJIwERQiSNBEQIkTQSECFE0khAhBBJIwERQiSNBEQIkTQSECFE0khAhBBJIwERQiSNBEQIkTShCcg///lP91//9V/uxx9/dLt373a7du3a7/r+++/dP/7xj+CzRSrz66+/ur///e8H/A6/++47+x3+61//Cj5TRJ3QBOSTTz5xjz32mLv99ttdy5YtXdOmTV3jxo33Xtdcc43r3r2727p1a/AVIhVBICZPnuzatGmz3++Pi99p//793fvvvx98tog6oQnI0qVLXYMGDdwRRxzhjj76aHfJJZe4SpUq7b1OP/1098c//tH169fPvffee/aUE6nD//3f/9nvZeTIka5WrVquePHi+/3+uC6++GJXoUIFd9ddd7nnn3/effnll8FXi6gSmoAsWbLEBOSoo45yderUcS+99JLbsGHD3gvhOPnkk91pp53m2rVr5zZv3hx8pUgF+H3ceuut7swzz3QVK1Z0jzzyyH6/P64XX3zR3Xjjje6ss85ypUuXdmPGjLEtq4guoQnIsmXLbIl70kknuZtuuumAF9YXX3zhOnbsaKuTQoUKuWeeecb98MMPwV1RkHz66aeud+/eJgxFihRxo0aNct98801wd38QER4QRx55pKtXr56tPH/55ZfgrogaXgSkVatWOdY6Vq5caUtgViK8YKmbiIKFreSUKVNMOAoXLuyGDx+ep7DzYJg9e7YrVaqUCc7AgQPd559/HtwVUcOLgFBEzelFxcdq165ttZD27durGFfAcHLG1oXfBb+35s2bu3Xr1gV3c2f79u3uhhtucCeeeKJr0qSJe+ONN4I7ImocUgGhSFe1alX3pz/9yXXo0MFt2rQpuCMKAlYf8+bNc9WqVXMnnHCCnZJx3J4ffN3QoUPdOeecY9vRSZMmBXdE1PAiIDydsu+h8RGwPD777LPtokinKn7B8tNPP9mbv2jRoiYg999/v/v555+Du7mDgDz99NOuRIkS7rjjjnNDhgwJ7oio4U1Avv322+DOHp577jl7Wh122GHu8ssvdxs3bnS//fZbcFcUBNQzJkyY4C688ELbjowePdq2NfmBgMyYMcPqIMccc4x76KGHgjsiaoQmIMuXL3fNmjWzJxlHfD179rQnU9ZF5Z4TGI56n3rqKbkZU4CsFQgFVIT/8ccfD+7kDacu06dPNwE5/vjjtQKJMKEJyNtvv+2uvvpqW9LyVPrP//xPd8EFF+y9eJHefPPNdhKjlUdqgIA88cQT7qKLLkpYQKZOnWrGsmOPPdYNHjw4uCOihpcVSPny5W0/jbU965o2bVpcFX5x6MjawnB8i4CMHz8+uJM31En4nfKQwDgoAYkuXmog9FHQeCVSG4Tg2WefdWXKlLHf27Bhw9x///d/B3dzhxXIoEGDrG5yyimnmJiIaOJFQFq3bu127NgR3BGpyv/8z//YlhL/B2LA0Xo8zY4c9d555532NdWrV3cvvPBCcEdEDS8CkpsPRKQWFLIRA/qUKHBXqVLFLVq0KLibOytWrHA1atSwvqb77rtPjuIIIwERbv78+baNQRCIY3j33XdzPM6lY/edd95xnTt3tm5dIhoonv/v//5v8BkiaoQmIDRVkRnBsd51110nAUkjsKZzFIuhjP4W2vXXrFkT3N0D253169fb1uXcc8819yo9NOrGjTahCcjixYstRwKjWMOGDbWsTSNYbfD74hiXVSRO4fr167s77rhj70W/zBVXXOFKlixpQkPeS9euXRXLEHFCExCWvTy5Kleu7Lp16yabeprCcXzdunXNt5PTRYH84YcfNjcxQsLvWt6e6BKagLCU/eCDD6zA9uGHH5rdWaQfHOMiCAsWLLDsj6yLgKhXXnnFtjHbtm0zKzurlPPOO89E5a233orrCFhkFqEJiIgWPDBmzZrl2rZta9sZ6l8zZ87U8X3EkICIpOH0hS5rkuawtffq1ctWoSI6SEDEQUPOCyllHOnGkyciMgcJiBAiaQpMQDAlMYiK/E0GUfHkon9GV/gXP1t+zipyirApMAHZuXOnpX9ff/317q9//atFAZCvqSv866qrrrIoBRynymERYVJgAkLTVosWLSwflVkkGJSYR6Ir/KtYsWLujDPOMM/G119/HVfqmBDxUGACwuxVRgJcdtll1n/BkWD2QUa6wrnmzJljA6Fwk+Ll0DweERYFJiDsxzEr4V7loklL+IH8DmIk2cYQ9PTZZ58Fd4Q4OAq0iMoLecCAAZYpoVAaf2AzxyFM0BOpcRy3ChEGBSYgQIcnUYf0z/Tp08cyOkX4UDhlzMZtt93mypUrZ54NIcKgQAUE6KEgV+Kee+6xSXU6avQDrlFqTgQB5TX7VohEKHABofGOuSI8HQn4zT5PRoQHU+joXcF6/uqrr9o2UoiDocAFhGBfiql4Fa699lqNu/QIU/gJDqIVn1BktpBCHAwFLiBAehlGMsZBUOwTfqCY+vzzz7sKFSq4W2+9VTUncdCkhIBgab/77rttf84ITD0Z/cFsHhLjWrVqZZ2z2saIgyElBARn5NixY812TUv42rVrgzsibHAAU7Bmu0imKc5UIZIlJQSEp+Dq1atdjx49LOUq3hGLInFwodITc9NNN5k7lQhDIZIlJQQE2J8zJQ2fAmG96tfwA2KNiCDW1JxoIRAiWVJGQODNN9+0+SQsrz/++GPNG/HIgw8+aCHJY8aM0c9ZJE1KCQgFPoZScaSLW5KGO+GHyZMn23Euk+U++ugjrfhEUqSUgBDIO2nSJHfLLbe4/v372ypE+IHmxZ49e1qD3dSpU82PI0SipJSAYGPHmUp7f6NGjdSh6xFWd3Pnzt07QEot/iIZUkpAgNbz7t2726Bnpr6rN8Yf9B4xbY5pdKz2tI0RiZJyAgITJ050zZs3dyNHjrT9uWL4/IAHhL4Yak4Y+NSHJBIlJQWEObsc5fLiZiKa3JJ+YNtCAyOekH79+ll6mRCJkJICwnKa1QdPxmHDhtm2RoQP3hvChTp37myRCnTrCpEIKSkg9MbwYq5WrZo9HTWo2w9ZpjJS4QheJidEiERISQEBhjhzEkOBb9myZZr+7hGOzkuXLm3uVOogKqaKeElZAWHVgRcEYxl5qV988UVwR4TNkiVLXLt27exi5fePf/wjuCNE3qSsgLCNYQQBWxgGTxF9KPxAh+4jjzxigcu9e/fWhH0RNykrIBzdbt++3XJCypYt65555pngjggbXKhvvPGG5YRwfI6ZT4h4SFkBAfbiI0aMsOlqNH2pDuIHxJpVB+399MewpREiHlJaQICmOo5zH3jgAffJJ5+owOeJX3/91YZOES05ffp0t2vXruCOELmT8gJChy6p7fTHkKClAp8faBl4+eWXzRPSpUsXM/MJkR8pLyAUUymgsj9nia15Jn5gG/P999/blhH/DUY+IfIj5QUESG2vW7euXYwmEP6gWF20aFHzhKgHSeRHWgjIV199ZbkVhC5zWqBiqj8WLlzo6tSpYwPPmV2smpPIi7QQEOzW48ePNxFhPKOavvyBA7hDhw4WK0lq2c6dO4M7QhxIWggIc2I2b95sJifyKxQE7A+s7H/729+shYBp/lu2bAnuCHEgaSEgQOPXo48+6i655BLr0FUQsB+yPCGIR+XKla2ArTgFkRtpIyDA2AdcqRzpsiLRBDs/UPegBkJqO6Ita7vIjbQSEBySN9xwg7v++uttmS1PiB+yVnu4UvGFMK9YJzIiJ9JKQOjIpZiKH4S5Jnoy+oNA6759+1ozI0e7EhCRE2klINitGYF53XXXWYIWw6GFH5jcj3DUrl3b4g6FyIm0EhDAicpxLi/s1157TantHsHOXqtWLde+fXsFDYkcSTsBwdo+fPhwywhhCDcuVeEHCtUEWxM0tGDBAk0KFAeQdgLCUxC3JMW9O++801Yhwg+s9saNG+fatm1rDY1qIxDZSTsBoZiHxXro0KE2VY24QxX4/MAp16JFi0xAiJYkm1aIfUk7AQHqHgxCql69urv33ns1ltETrPY46SIVrnz58m7atGnBHSH2kJYCAitXrrSTGLYx7733noqpnmB1h/OXUaODBw+2bY1WfCKLtBUQ9uMPP/ywFfiYriZPiD8IGmIbgzuVoGs5gEUWaSsgBAG//vrrrkWLFrYSIblM+IGTLgKGqDkxaoOfvRCQtgIC5IRwnFuqVCkr9gk/sD3kGJdtDG0EGsItskhrAWEpTXJW1apVrdFOHbr+wBNCoBNjH6g5qQ4iIK0FBCZOnGgDkZjv+v777+uF7QlqTN26dbM2ghkzZihoSBhpLyD0xvTp08fGEVBMlYD44ccff3QvvviipZVxLV++PLgjokzaCwgNdnPnzrXwG04J+G8RPrT402DHSo9BX08//XRwR0SZtBcQwBNSrlw5G/3AXl21EH+MGjXKXXTRRZYXIkRGCMimTZtcq1atTEAopjLfRPiBFn+Chphi9+WXX6pDN+JkhIBwrDhp0iR3yy23WAiOckL8Qc2pV69eZuDD2k5tRESXjBAQjnM/+ugj69BlFfLmm28Gd0TY0NI/f/58+zkjIvKERJuMEBDA7ERyFgU+tjGyW/sDsWbsw5VXXmk1J21jokvGCAhMnTrVJvkPGTLEXuR6Yfvhu+++s9Ve48aN3ezZszWvOMJklICQV9G9e3c7zp03b546dD1BKhw1J8Kt77vvPrdmzZrgjogaGSUgdOhyvMgqhNR2Ffj8wPaQUQ84U2lmJJtFRJOMEhCejLSbV6pUyeztJJeJ8MHtu3v3bsumJWiIvBARTTJKQIAj3AYNGliaOJP85Uz1x8yZM62RkVQ4TmM0AjN6ZJyA0ORFZgXT5ceMGaMgYI+wjWHkQ6dOnSybRZMCo0fGCQjbGAqomMqYqiZPiD+2bt1qodYUU0lt//rrr4M7IipknIBwdMsRLgW+atWqqenLI6w4mN5PYjvBTsQpiGiRcQICHN/yZKSYSqFPdRA/UEzdtWuXu/32213dunU1oyeCZKSAAHZrjnPxKbAiUYeuH1jxEW6NM3XKlCkmKCI6ZKyAbNiwwQ0aNMiKfLywNTvGDwjISy+9ZLNjunTpYsVUER0yVkBIDmcEZqNGjVybNm3ctm3bgjsiTNjG0NbPpEAGfbEaEdEhYwUEMJIxiqBmzZpq8fcIIkJOarFixWzQlxoZo0NGCwhNXwxEQkRYjag3xh9Llixxl112mbX4472RqSwaZLSAsI3BTEaSOAlajCMQfmCFRxMjyXCkliknJBpktIBw8sLEOmbHkF3BC1v4gdOXOXPmmICw6pMnJBpktIAA+/Hx48fb9LqBAwcqI8QTbFkQEU698N+8+uqrwR2RyWS8gADt5sWLF3c33HCDJWipyOcPHMCktrN1pGNXZDaREBAKfAyewlhGB6k8If4YN26cpbYT7PTuu++qmJrhREJAaPrihU3TF9sYeUL8sWrVKsumpZmR1Hat9jKbSAjIb7/9ZsVUtjCsQngyCj8wvY4tI0e65ISohSCziYSAAMOmbrvtNuvQZcarnoz+ICeE5jriFBjKrcJ15hIZAcFExljGa665xgp8ijv0B0YyQoZuvvlmi5jUpMDMJTICgt160aJFdkqA4enll18O7oiw4Th34sSJ5kol3JpuaJGZREZA4IsvvnAjRoxw9erVsyBgLa39QCocQUN4QkhtJ5tWZCaREhC2MUytK1u2rIXgaGntB45u6UOixb9o0aJm5GMFKDKPSAkI4AnBp3D99dfbaYwa7PzBag8HMMe6FFPlCck8IicgH3/8sevdu7cJCE/Gr776KrgjwmbBggXmB+nQoYOFDilaMvOInIDgU3j++efNmdq8eXP3zjvvBHdE2CDWgwcPtjiFPn36yNqegUROQNiLf/7557YCKVGihHlChB8Qa0ZsVKlSxY7P5QDOPCInIMDpS9++fV3FihXdU089JbekJxBrViG4f5nkv3bt2uCOyBQiKSCAcDRp0sSEhOwKHen6gZMuLO3MjsHirpOvzCKyArJ69WoTD5bWNNrpNMYPDJ+i5tSxY0cz8b399tvBHZEJRFZAMDtxMlCjRg0zPGmuqx84uv3mm2/cgAEDrBYyadKk4I7IBCIrIEBGKtPlGYq0ffv24KPCB/QfFS5c2Gboiswh0gJCgY8MT4p8DET65ZdfgjsibMhLpcUfDw6nMao5ZQaRFhCSw3kyMniKKXbEHQo/rF+/3sSDwOWpU6e6v//978Edkc5EWkAIGtq4caO1npPariBgf2Aiw5mKeQ8RYZqdSH8iLSCAB4SYQxrsJk+eLE+IR+iGZrt46aWXmidEvTHpT+QFBPCE0GDH8ClN8vcHYdbESuIARqw1yT/9kYDEoEMXnwLHuXgW1PTlB4rU9MaQx9KzZ0+ri4j0RgISg3hDiqmYyh544AHLshDhw8nLsmXLTDyIO0SsRXojAYnBk5G4Q6b4N2zYUKcxHvnxxx/dhAkTzMDHakRBQ+mNBCQAT0ijRo3MWEYQMCc0wg8vvPCC/ZxJLMOlqmJq+iIBCWDbQhGVnBDS2z/55JPgjgibNWvWWL3pjjvuMAMfbf8iPZGABFA4pTeG2TFMsFu4cGFwR4QNHhAaGEkrI7VdOSHpiwQkgAIf2xiSsxg+xVgC4QcaGZcvX+5at25txjJWJCI9kYDsAy39Tz75pKtUqZKdxvz888/BHREmFE5xprLaq1ChgtVERHoiAcnGa6+9Zm5Jpst/+OGHGoHpETpzabB7/PHHZSpLUyQg2di0aZPtyyny4ZaUJ8QPrELojeEkpkuXLlZz0pFu+iEByQbbFiapsTcneJm6iPADIzU48aI3hhMwtRCkHxKQHOCF3axZM1e5cmUFAXuEFQc5IRdffLE5U1VzSj8kIDlAvCEehVq1atnYBz0Z/cFcHhoZabLbsmWLTGVphgQkB3ChsrRmFAFjGTds2BDcEWHDFpFGxr/+9a9u2rRp5kwV6YMEJAdYcaxYscLdc8897oorrnBTpkwJ7oiwYcwD2xhS4W699VZtGdMMCUgu4ExFOMqUKWPmMp0Q+IEtCyddiDWeEHXophcSkDzgmLFkyZLu2muvtQ5dzY7xR//+/V2hQoXcsGHDlJeaRkhA8mDVqlWWEUKX7vTp0zVVzSM4gDGVde7c2YZ+KbU9PZCA5AFNX7gkaa5jMNKnn34a3BFhQ+2DVQgNdmwdlQqXHkhA8oDTGObmkiKOvX3dunXBHRE2WZP8ScenHkLDnUh9JCD5wAubY8bq1atbTUS9Mf549913zRPSokULDZ9KEyQg+cDpC3mpBA099thjlp8q/LB161brQaKNYP78+epDSgMkIHFAhy7FPS41ffmDIvXYsWPNE8Ksng8++CC4I1IVCUgc0NY/ZMgQq4M88sgjykv1BIVTRmzceeed7rrrrrMto0htJCBxQJPX7NmzrbmOEBzZrf2AqQwPSK9evVyxYsWsnUC9MamNBCROaPqqX7+++UL4d5nK/ME2BgNft27d7ChdIpK6SEDihLmuTJdv1aqVGz9+vNu+fXtwR4QNM3po77/99tvdyy+/rCPdFEYCEie0+ONTIAiYoKG33347uCPCBsPeiBEj7OQLA5/iDlMXCUicsIxmFcJTsXz58u65554L7oiwwXvz6quvugYNGlibvxzAqYsEJAFo8ycvtWLFijaeUaYyP3BMjiekZcuW5kxduXJlcEekGhKQBHnmmWdc06ZNrW+D412llfmBLSMxChStZ82apUbGFEUCkiAMQSIA+KabbnKTJk1Sgc8TDDxnXkynTp1cjx49bKq/SD0kIAmCJwRnar169SxBS3ZrP1Bz2rlzp82OoQ+Jo12RekhAkuCjjz6yUQTEHeo41y/khBQpUsSyaUXqIQFJAgp8HOdibWdpLVOZP2iqQ6xp8efnrg7d1EICkgTYrenMpQ4yePBgm2Yn/EAqXLt27aw3ZurUqdoyphgSkCTg+BbRwGrNNkZBwP7YsWOHmzFjhsVK4k6VJyS1kIAkCUvp4cOHW2o7BT4trf1AMZVwIVYg1apVMwew4hRSBwnIQYA/gSBgemQorMpY5gfiE9jGFC1a1DJqOZ0RqYEE5CDAIYlPgRc37f6Yn0T4UKRmtVe3bl3bNpLaLlIDCchBwKkAT0T6NXCm6snoB7Yxy5cvt5Ueqe2ItUgNJCAHAW7JpUuXWoGPHE/mvAo//PDDD+6pp55ytWvXtn4kkRpIQA4SjGRkhFALIY5PdRB/0KFbo0YN2zbu3r1bhesUQAJykNB6jt2abQy9MZwYCD+89957FqfA9frrr9uqRBQsEpCDhBXHSy+9ZE9FrjfffDO4I8KGeENGbNCDRMg1+SyiYJGAHCR4Eqh9sC8nAGfixInyKXjixx9/tG0MDuAbbrjBXKqiYJGAhAA+BXJCMDr17dvXtjUifKh5sAphC0Ook05jCh4JSEi89dZb1lzH8Cls7iqm+gERGTRokKtSpYobOXKk+/bbb7XiK0AkICFBOtkDDzxgc2NoQZcnxB/0HtEXc/fdd1sxVacxBYcEJCRwoTKCAD8IJzIbN24M7oiw+eSTT6wLmjk91J40KbDgkICECKcCjCIoV66cIvg8wghMViHUQXCm6ji34JCAhAjOVJbVFFMZ+6DAZX+sX7/eEttZ7W3evFl1kAJCAhIi9GwQNIS1nURxXuTCDxj2KFiT2j5t2jTLDRGHHglIiCAgK1assI5Rno6MwBR+wMo+d+5c84RgLNOkwIJBApINlsIIAZV9tiBZV7yVfrYxJGgxva5Lly46IfAEP1eiJe+9995QPCHZf9+8BkT+SEBi4NngGJZpc7wgO3bsaMexbdu23XshBpjF4lkq01RXtmxZK6gSwccLUvjh4YcftqChJ554IvhIYpCx+re//c1Cm/f9fQ8cONC8PRRsRe5IQGJkDTFi1XDEEUe40047zV100UWuePHie69ChQpZOvjo0aMtBySvo0NqHy1atHBNmjSxYipPSuGHyZMnWyc0x7qIe7wrB0KK6KTmodGwYcMDft+cpN11110WGqXhYbkjAYnBC4QlMC+i4447zlYfM2fOdAsXLtx7MZekcOHC7vzzz7cCKRGGucELmfoHZiem2OX1ueLgoObUvXt31759e/fss8/GnQqHl4TVy8UXX2xiMXTo0P1+33xPRpjiduX3py1NzkhAYrACmTNnjitZsqS78MILLbgme+2Co0Ks6ocddpgrVaqUOSBzg9XJBx984O644w5bhajA5w9m5rLKIx2fnzfF1Xh48cUXXYUKFdyf/vQn85J89dVXwZ09vP/++9YYid+EEx8dE+eMBCRGloBccskltlUZN27cAcOc2YYMGzbM/fnPf3ann3667Zvzgu/JTNfKlSvbaYHqIP7A9cupF2LNyiKe1QIrxBNOOMGdc845FkuZ05ZUBdX8kYDE2FdALrjgAvNy0KS1L7SSIyxnnnmmO+WUU2yLkx88wZo1a+ZGjRplxVQ9xfzwzTffuDvvvNMEBLHetWtXcCd3GMXxhz/8wZ166qmWMaLpgskhAYmRfQszZcqUA1YMPOVatmzpjj32WFezZs24goP4nK5du5o7lYHcwh+sCDt06GA1p3gMfHw+v+v/+I//sNOyxYsXS0SSQAISI0tAqG2ce+65FlFIfN7XX39tBdHPPvvMnljsmSm4saIglyI/KL6NGDHCXqC0oNMrw/fj++oK7+LnShEcQxmnX9Q38gOR4ZSF7eiJJ55olvgFCxbY1pU8F21b4kMCEgMBmTdvnhmSKKpxjEf6Nwlj7K0bN25sR32cvrzyyiv2go0n7+Pnn3+2Ah91ECbM8z34fnxfXeFd9erVc5UqVbJ6Bg8AjmbzA5HgiJZVJVuZ3//+9/Z7Ymg6q5gNGzYEnynyQgISY18BOeqoo+yoltUGoTWlS5e2F9jxxx9vR3qJegLWrFljL/CTTjrJnXfeebaC4fvqCu+qWrWqpbWzJeH3xJFsvJBny2CwWrVquZNPPtlO2dimsh1iC6pcl7yRgMRAQCi+IRZnn322u++++2yQEUexvIhYgRx++OH2QsVwlgiYlVi5sPrAW0CmJ99XV7gXTmK2ljiAGfIVb4s/v3uOcPl6alUIEHURBB9jIYXweIqyUUUCEiOrBrKvD2TfPTD/XaJEib1PpkRGN2BsYhvDUw4BkanMH2w7+P1wIoNQJzpqlEI5x7u9evUyezyrEbZGPFwUUZkzEpAYWQKSdYxLwXTfpw7eAlYlLHHZ5rDsjXcrw2kOT0hGPmCFz88/IpKH41z6lZjkT0d0dnNYvFAfGTBggLmSERFO0mRnzxkJSIzsAoIPZN+9LyKwaNEiV6xYMRMRXlz0w8QLJiVOY3iaPfroozou9ATuYRzDnHrhTOXfk4ViOcf1CAgjJJS0nzMSkBj5CQiwCqGOwQuKKfHvvPNOcCc+WHnQW0GFn2Nhtfn7ASs7b3jqF9Srkn3jsx3ihIbfN4KEkVAciAQkRjwCwnK4Z8+e7uijj3Z/+ctfrHEru9ksL959911bubBHZ5md6P5cxAdbDdLxEXl+3ozYyA4rQOpYFE5z+j0g7tStqlev7o455hj7nXEkLw5EAhJj3yIqR7hYm7MLCE8yzEpU+anUkxuCHyReezovVAxO+EDIm8AAJcIHUScdnzc9aWXz588P7vwbHgYY+1gR5nSf1QdfS98T+bYERKmImjMSkBg8tVhRYETi+G748OEHBAfxVGLrwfKYZS1iM2vWrIRGCvDEq1OnjuVXsCUS4YOgI854dqhh8LvMDg8HxkFwsoaIEB6UdVEsZzQHPiC6r2lr4Che5IwEJAapUzy1eHNT6CSkJqezf16cFEFxO7LdwSOQSHWeFzZOR9yT9F7oqeYPxB0RIEmO+sW+K0WO6Lds2WIhRIgM29asixUoDxJWiThVlUiWNxKQGKwuWNaS8YF/gM7Z3FYWrELwBXBxPJtIHQRzE08+jGk87XLan4twIIOF/hYyQlavXn2A0CMibEFxIPMgyLqIRmTVwdeo0J0/EpBDCKK0dOlSGw5NLUSeEH8g9FjaWUlQFFfNyQ8SkEMIy2hEBMs1WyBe4Or69AOrPbwcbdq0sS5duqtF+EhACgCOcbFKE6WHtV21kPDJ2pay2qOzWnksfpCAFADUWqj+U+3HbyCXoz84ruXUa+rUqfJyeEACUgCwP+c0h+U1yeDan/uD0xjqIJjL1q5dG7dvR8SHBKQA4GiQnJBWrVq5a6+9VqcxHuG4loQ58lIfeeQRnayEjASkgMDMxNwYOnTZn6sO4gds69ScKFpTD5GvI1wkIAUEL2ROYZguTwQfngThB47OsaSzZYwny1bEjwSkgGApjWkNp6RS2/1CC8GNN95oYs2gKI0aDQ8JSAFBMY9iKnbq+vXr2/5cBT4/EDRE0hinXqSVxTP2QcSHBKQAwVRGXGKZMmVsFRJvjqdIDOogtCcwP5cWfcY3iHCQgBQwbF0wOtE+zjxWFVP9Qactmbes9iTW4SABKWCI3WOGLjEBdAGz3BZ+wHvDWA22MXhCdKR78EhAChiChghpxg9CGDDJZcIPb7zxhnXncnzObGMd6R48EpAUgJ6N66+/3kZrLly4MPioCJus1HaKqf369VPSeghIQFIAMkWISCTMiGQ0La39QOczIUGXX365BTt9++23wR2RLBKQFAEzGUFDpLYTVKQ2fz98/vnntoVhu7hs2TKlrR8kEpAUgScjqe9Ml3/yySclIJ5g+j7FVDJCRo8e7T7++OPgjkgGCUiKQKs5yfBYrplipwKfH6h7EDTEScxtt93mlixZEtwRySABSSFWrVplQcCNGjUy+3UieasiPviZMhOG1R5izWpPJI8EJIWg9sHenLGMHDOy3BZ+YBuDA5hJ/vTGqI0gOSQgKQSnAvRsUOTjha2cEH8w5Ivmuo4dO1qCeyLzfcS/kYCkEPRssHW55557LAAH45PwAz9n0uAoWg8ZMkSrvSSRgKQYiAgmJ2ohjFSUJ8QPFK1xAOMJYX6M8liSQwKSgjDYCE8IgUOMwJSI+IGfbbNmzUxE1q1bF3xUJIIEJAUhQatbt252nMvwZ1YlInwwkbFdzCpa7969O7gj4kUCkoLwZKTlnAY79ulqPffDL7/8YuMe6IRGSJYvXx7cEfEiAUlB2J9jdsKncPXVV1sYjggftoZY25lTXKtWLWsnEIkhAUlRyAkh6pDp8Uzy1zbGH6xCihcvboFDqjclhgQkRcET0rdvX2s9Zzg0T0rhhxdeeME6ofGEbN++PfioiAcJSIrC/nzevHmWJs4AKqW2+4MWAvpimFU8d+5cdegmgAQkRWEpzeDtzp07m+V64sSJwR0RNjt27DDPTcuWLS3cmrR8ER8SkBQGezXbl7Jly9ppjDp0/UCDHWKNoaxu3bqKlUwACUiKg1uSSf59+vSx41116PqBNn9WHzVq1LBYBW1j4kMCkuJs2LDBDRgwwHXo0MFNmzZNnhBPME6DRka6oTnW5ecu8kcCkuL89NNPNgITyzWzY9Sz4Qfa+Tku79q1695iqsgfCUgawBEudmuMZRs3bgw+KsKGwds4gPk509CoFv/8kYCkAQTetGvXzpq+OM5VHcQP5NCy8ihRooSdyLDaU9BQ3khA0gA8IezP27Rp4x566CEbgSn8sGbNGjPvkRPCjB62kCJ3JCBpACsOti4sq8lLpZgq/MA2ZsSIETboa9CgQepDygcJSJrAKcGkSZPME8IpgfADo0ZZeeD+JfJwxYoVwR2RExKQNAJPCAW+22+/3YxParALH+ogjMC86667XJUqVaxPRuSOBCSNYH9OzwZPR6zXyvH0x/Dhw13t2rWthYBVicgZCUgaQacoxVQEpHfv3urZ8AinMUyvw8SHcKvNP2ckIGkEpzG8mOnZoJi6evXq4I4IG8QZTwh1EIqq8oTkjAQkzWDb0r59e6uFMNtEnhB/4ACuWLGiRR6qNyZnJCBpBoIxcuRIizocO3asrO0eWb9+vUUdsgrZunVr8FGxLxKQNANn5Ouvv26doxRUCR0SfkCcOfHCVEZNREXrA5GApCH0xjAzhqcjZidtY/xACwGmPbYwTPNXzelAJCBpCAU9Vh5Vq1a1J+R3330X3BFhgjBz8tWlSxdXvXp19/zzzwd3RBYSkDSF/TlLa44amaomU5k/6D8qXLiwrfoopqrB7t9IQNIUinoPPvigdelicaeHQ/jhiSeesBYCftYco2vL+G8kIGkKEXyLFi2y1HZWIurZ8MeSJUssEY5uaBzA/OzFHiQgaQw9G23btnUlS5bU/twjO3fudLNmzbK4w169etnMHrEHCUgaQ+NX//79Xfny5d3kyZNlt/YEP1eS2q+88kqLlvzwww+DO0ICkuYwlrFhw4bu3nvvtWKqRMQPX331la32mjRpYg5VBQ3tQQKS5uBN6Nmzp2vcuLEbPXq0TmM8wekLjYyceg0bNsx98MEHwZ1oIwFJc5jkP3/+fPMpcEqg1nM/IMxLly41T0jr1q2tD0lIQDKCTZs2mYDUqVPHrV27Vp2jHsD7QTGVCYHUnOhHogYVdSQgGQDWdp6KNWvWtACcr7/+Orgjwmb69OkmID169HC7du2KvKlMApIB0OSFcOBT4JgRl6rww1tvvWXem06dOrlly5ZF3hMiAckACFwmI5ViKnN0FyxYENwRYbNt2zY3YcIES22///777XQmykhAMgTs1Vn7czwh2p/7gZ/z22+/7Ro0aODq168f+UmBEpAMAps1UYf0yGiSvz927Njhrr32WkttX758efDRaCIBySDoh6G4x0gCrO3q2fAD2bRsF+vVq2d5IT/88ENwJ3pIQDIIgoAfe+wxC11mFaKcED9Qc+I0hqChe+65x5rtoooEJIPAVEbcIXtzltjq2fAD9SXEevDgwa5u3bpuzJgxwZ3oIQHJMHhhEwLMUCRGNMra7o/nnnvOJvl37NgxsttFCUiGQY4nx4uktj/66KMaPuUR8lgqV65sgk3QUBQdwBKQDIMVBysPslLxKjBPV/iBI1wMZdScnnzyyUjmhEhAMgys1cQbkhNSrlw5m64m/MBqj6Y62vwRkijWnCQgGQj+D8xk5Hj269fPjh1F+FBMJbUdAaGRMYqxkhKQDOW1116zjBDmmZCmpQ5dP7Bl7NOnj83oIfYwap4QCUiGQos/xVT25wyHphVd+AEH8M0332xDvhDrKCEByVAIFqJngxOC5s2buy1btgR3RNiwdendu7ellbEKiVIfkgQkg2E53apVK1eqVCk7mcFBKcKHjtzHH3/cTGV9+/aNVCqcBCSD+fXXX81qTYcupzFRbz33BUHWBC0zapSjcxoZo4IEJIPhNCarZ6Nr164WgCP88P7777uWLVtaCwF5LFFJbZeAZDB4QngaUkSlDsIITOEHhnzh/CVakqPzzZs3B3cyGwlIhsMqZObMma5SpUp23Cj8wDE5RWviDmlm5Bg9CkhAIsCbb77pLr/8cnfbbbe5jz/+WA12nti9e7dtFSlas3WMAhKQCMAQJF7YPB15YSsnxB9sY0jHHzVqlAlKpqe2S0AiAPtzrO2ktjMCkwBm4Qd6YzCVIdgkuGf6ak8CEgE4zsUhyREjlmtCh4QfmNHzxBNPWJwCTmBGYmYyEpCIwAuZFv8iRYrYDBmZyvzAloXpgAg1LuBMbyGQgEQI9ucEAfNkpPU86lPVfEGIEycxV155ZcZvFyUgEYI9eefOna2Y+uyzz2p2jCcYLcoQ7uuuu85iDzO5aC0BiRBbt251o0ePtuwKzE7URkT40AvDWA22jIzYyGQHsAQkQmB2oqmOY8ZbbrlFLf6eYGXHz5bGOoZPZbInRAISMah9kBFCfwxBwCqm+oMOXRoZhw4dakXsTNwySkAiBh25zNBt166d9cYQySf88PLLL7sWLVpYRzQ290xMhZOARAzml/BiJuqQIh82d+EHOnSpNd100012dJ6JnhAJSAShyIdTsnjx4pHp2SgIGPNAQlnTpk1d+/bt3RdffBHcyRwkIBFlyJAhrkyZMjZLV1P8/UDQ0HvvvWeNjBRTM/E0RgISUebOnWsBOL169bJiqjp0/bBr1y4b+1C9enWb5M8smUxCAhJRcEjSMUodhFOCKOV4HkqoOVGsJmiIPJZVq1YFdzIDCUhE4URg8eLF7rLLLrMXN09KET5sY1auXGknMU2aNHHPPPNMcCczkIBEGMKFGjRoYJP833nnHTlTPUExdeTIka5ChQp2hI6oZAoSkAhDz8Ydd9xh4wjGjh3rtm3bFtwRYULT4rx589yll17qunfvbvksmdLIKAGJMCSHT5061bYwHTt2NH+I8AO1DwZP8XNeunSp+/nnn4M76Y0EJMJwfEsxlZMYjhozbX+eSnz55ZeWCkda2YABAzLGEyIBiTjsxzmNKV26tJ3GHMp+DfpwKOYmWxPg78r34Erk783n/vLLL+YMZXofJ1DxHGOz7eDzWLkl8nXA/yPzirG2U7hevXp1cCe9kYAIN2fOHAu/Yb7rp59+ekiMZYTujB8/3o0ZM8ZCnxOFNzA2fLZg9JxQz4kH/t8oGDMImzczqWH0BdH4hvU8r34VfjZPPvmkpdvzdfwTJy81jXhAeMhiKVeunFu0aFHw0fRGAiLcunXrTDwoqDJDxtdUNfb9ODMRrJ49e7oSJUqYQzPeNxMrBwq9fD6rJYxwCF9Wwlp+kJKO2NAHVLlyZbPy48YtWrSoq1GjhoUtMVUuuyeG1QNbEFy7HMXSYVu2bFm7qB/Nnj3bjsHzE15WSrT4c+pFb8z3338f3ElfJCDCnqC4JGnz79Gjh71ZwoSlP1sGnvx8f57Ap59+uvvd735nIhJP8ZY3MSuAKVOmWGDx2Wef7Y4//nh3ySWXuMGDB8dVU5g/f74JTrFixcwdSoI6fyds/dWqVXOnnnqqrSxw5u4L2R4IK2MrES1qRWxBqGnwfTp06BBX8hj/DzNmzLDvwdchVumOBETYPp6VAUt6Gr82bNgQ3Dl4eOoyXpM3KwO+KSDy5qlYsaL7wx/+4EqWLGlv4rzgezC8+qGHHrI3+4MPPuiaNWvmTjjhBHf++efb6M68BoezciG2oFOnTiYS1CD4flmQpM64CwTpL3/5i22r8G5kwQkKwkeGCq7SrBMUbOn8N2n3rKjyyz9FSBFB/h9Y8eAJSXckIMKgpkD83hVXXOFeeeUVe9OGATUFRkrwRqPOwHaJN9GwYcPcmWeeaQKyfPny4LNzhu9B7aFbt27upZdeMsMbX8NWgu/BdiavVRNveFYfbJfOOOMMExws5lnw/0qjG1uLo48+2oR037/TCy+8YC35rHT2FQmEaf369XY0y+kK/2/xwP8DWydS4dhWJVIATjUkIMLgTcqTl6cs/2TVEAa8OXiT8JRnm8Gfg1hNmDDBnXfeeSYg+XWp8j34eoqcWdsEah7UMVgx5CcgbNFYvSA2F154oQlCdvg7IQKHH364u+iii2xLlwWNhxQ/+XMQvyxYUbByY2XD/XgFhC0bzXUk5FPPSec+JAmIMLJOJ1iqUwshx8IX1BRwvrL9iEdAcoI3LtugeFYgW7ZssWLnMcccY6uMnFY8iMF9991n26o//vGPtk3KYsWKFZafgsA8/fTTey3/iE6WEQ+HKX9OPPB5FGzZLrKtC7vmdCiRgIi94ItgeU9h84EHHgg+Gj6sCDjRiHcFkhPUaeIVEFYGBEkfeeSR1n3Mlio7FDhJrP/zn//sDjvsMBOELDgiRjiaN29uKw1s6WxlOH2hgMoxMMXRfesmecGKjG0Mqe2cCMW7cklFJCBiP1h5cLLBE5eTEx8cagHhxISaA9uTVq1aWd0iOwgIIyn5OyEgzHVhVQKszthCDR8+3DVs2NBVrVrVtiCVKlWy1RrbHUQm3roRfxafz9YHYUNM0hUJiNgP+jRYWlPgY+nuQ0QKQkBw2iIMrEByeuLzpqZQW7hwYfs8CrZZApIFdRfqQxzDUr/gn4hOMlsQ6joDBw40McIT4st74xsJiNgPluZsXzgm5Z8+OnQLagWSn4BwUlSoUKFcBYQ3PW90/v4cG1PLoQCa/fPiBe8IdZX+/fvb3zEdT2MkIGI/eEOw8sBQ1ahRIytWhk06CAhbuGSFIV74f2AV0qZNG/uz0zFWUgIiDgCPxK233mpvbkY0hh00dKgFBCMYdR2EAdMXX5sdBASXa5EiRdwRRxyR4wokbLCy43AljwUvSTrmpUpAxAHwZsJZyZuOPpP8HJaJUpArEExiua1AqEXgAcFMxpGubwFhy7J27VqbVXzVVVfF1c+TakhAxAHwxmF6PycWNNi99tprob6ZDrWAsA3jKY+AcHKS05+HgCCWJ554ovXpEHFwKKDGRFcvwoYDON2GT0lARI7gRMXkRC0E01eYUHwcN26cGclY5VBzSRRcqYjBWWedZXmjebXzcwSL5wIfCM5VipfZydq2ZYlMTm5VH+AJ4RgYEWHVk9P2KpWRgIgcwdNA/YMuVTwRPKHDAsPVvgKSTJTivgKCPyMvAcH+zp+Hjf2UU06xnpbs9YbNmzebx4OGOnqCCP85FPBz5c/GUIa3JCdxS2UkICJXsLaTf0H3LPvzsIqpHIXSkcpWgaIlnbqJgpuUZrrjjjvOCpB5bWHov8E8hpOUVUh28xZZHnTGnnvuuSZovIkPZX8KP1dyQhA4Gg7TCQmIyBVSw/AoYNXGyr1jx47gTmLg5OSJz1aC9DG2BxQN2S4gADzx33jjDRszQds9dYB9ay78O6KDSLC1Qgyoe7D64Hvwpiebg+/N35nTjeyu0KxmQcKD6MjFks7fgy0Db1pa/LnHaqsg8koxpLECoemPFZPvAm5YSEBErvBCJrKv7a23Wm/IxiSX9XwfCoQcjeIt4UTk2GOPtTc/F9sKtkqYqvBFLFmyZD8B4LSCOglbD1ZDvNnPOeecvV/PRboYYUHYw9l6UWfJ/ibMquswC4enPcFCFGJxqfIxViEISn7JYj5YuHChiRq1GoKGfLURhI0EROQKS2uOPNvHViCX16/vXli82CXjlWT1QX4pHa5Y5DFzccKDYJCzwX8TI4DAsEpg67TvmxgBYcvCSoHgHz6XdDAMWHw//pueFL4XgUWEBeX2FOcEiEhFJsWxCmKLRvGUFczWrVuDzzr0sOrhGJm/Dyn5FFfTAQmIyBPCeO7t3duVjW0Tnho2zMX2GLSnuth+hmoobijaeNkjBF9xIAgAWwi2IYgJF63w/DfbFd4sWR+j9pCTI5MVCX8XPj/re/DvfA++bt+P8WflZQvne/F1bHUQGv78sM1yicLfl9UPPTas0sLKY/GNBETky2PTprkWsf354vLlXezV7WJLBhfbSzjXubNz/fs7N2GCiy0x9oiKSBpOkliBsK2iyJsVnZjKSEBEvrwVezIOuuMON+Xkk917xx/v/lm3rnPXXONc8+YuthdxsT2Ai+0JnBs4kGqgi+0hOBflUR98BxEPrIZIxydWksjHfdPPUhUJiMiXb2NL/alPPukali3r7m3c2P342mv4w4k5d276dOcIB27TxrnYKsWVK+dcs2Z7xAR/B9mjBVCUTEfYRuH6pT7Tvn179/rrrwd3UhcJiMiXf/3zn275ypWucv36rtlNN7kvd+7ccwOvxDff4BV3Di/H+PHODRjg3O2371mhtGzp3P33O/fKK1gu93yNyBWKvtRxOKImtZ2j3VRHAiLiglOC61u3dlfFti2L33rL/ZJb0ZSPs/IYNMi5pk2dY7sTEx03eTLnqFQLg08UuUHOKoHRHGlT7M2rIFzQSEBEXHy3a5ftyzlyHfTgg+4Dahy5wYkGc1qWLt2zvbnySudiqxf30EN7aiMiT96KCTTH05jaaPzbdwRFqiEBEXHB/pxjxrvvvtuKfMxZiQuiAJ56ak+hlROce+91jlR0rURyhdR2rP6Y5ujhobiaqkhARELg1sT1mXDPBi30MfFx1ao5d9tte7Y5Bey9SFXozaEfJ2vwd9h5LGEiAREJgXDQe8L+HNNW3GDNZpwC9ZCLL3aufXsGrgQ3xb7gwqWvB0NZhQoVUnqSvwREJAQGJ+ogbGUY0ITrMyE4Ar755j1Hvr1776mJhBgVkCkgzsycQUBIi09Va7sERCQEHbM0pNF7Qucox44JQe1j7do92xlqIhRWMUylSffpoQI7Px3Q9PnQ/5NMZsqhQAIiEoJiKisPCqmsRPKaip8rrDjYvmA+43Qm9kaJbfyDmwLwhGzcuNH16dMn9iOqn7I5IRIQkTDkcjBUiRd20sOnWHHgDeGI95ZbXGyjH9wQWdALg5msVKlSNrO4IGIG8kMCIhKG7leGTnFKwDFj0j0bse2QGc7q1NnzT53KHAB29ksvvdQiD/OKbSwoJCAiYdjGkKlBvwYBPhifkoIn6htvONe4sXOtWzu3ciWP3eCmABLl8YNQUOXnnGoduhIQkTAEAWN2Yn9eu3ZtN378+BzDe+KCGgqrD3pn+GcadKAeSoiRJBWOpDLiJVOtQ1cCIpKCUJ5HH33UogE7d+6c/DEj4UE4U3Gq0sWb7GomQ6HuQc2JsQ+1atWy4eephAREJA12dl7U9G0wYS1hT0gWP/3kXM+ezhFYNG2abO45QPD0xRdfnFSCvU8kICJpmM1CAA5eBY4ZmfeSNLHVjKtZ07mhQ/dEBMgXsh/0xlx++eW2XSSKMektY8hIQETSIBjszwknpmcDk1nSMAnuxhud6959Txev0sz2g6Ah3L+cxrAKCXPQ18EgARFJg1sSsxOGMkYtrOQUJVnWr3fuwQf31EImTdqTZCb2wpgKLO0Urfv166cViMgMyKro2rWrCQjzWJI2O+FxmDJlT2AzpzHURcR+MBqDpDJqTrT4p0LQkAREHBQspdmXt27d2o0ePTr5cQTEI86Zs+ckpkcP3GrBDZEFM3QZPsVMHTp0MfQVNBIQcVAgIAx9wqOAiBzUcGj6Y5o02ZPwLg6Ao/MpsVUaR7qkwx1UzSkkJCDioOGFTY4nOSG8uJnwtm3btsSu2Nd8OXOm+65iRbcrtgrZvn59zp8X4WvTpk1u0qRJNpWPbuikHcAhIgERobB48WLzKZxwwgmubt26iV+XXeauKl3aPfj737t+xx7rrozt9XP8vAhfeG5orDvppJPcueee62bGBLegkYCIUCC1nbm0dOjS/JXM1Tj2JnngyitdnyuucPVib5acPifKFwKCkDAIHO+NViAiY+D0BYMT2xf6NZK5Pv/8c7dz+3b3TWy5/lkO93Xt+RmxnaEzNxXS2iUgQoikkYAIIZJGAiKESBoJiBAiaSQgQoikkYAIIZJGAiL2Qt4mw5zJnujbt+/eiwBlrNPMgxk6dKh1g+57n4+9+uqriU2qE6FDbwwjN8hmmTFjhvuGXJU84NidaIAJEyaYEZCRmokiARF7ocNz4sSJrnLlyq5QoUJ7r7PPPtudeOKJ7qijjrJ/nn/++fvdr1Klis3MJb9TFBz4RHr16uVOPfVUV7FiRbdq1argTs4wPrN58+bu9NNPt5wRhqcnigRE7IW0dfotZs2aZb0tWReT0YoWLeoOO+wwV6JECTd27Nj97s+ePdutWbMmJYxNUYYh3EQf8nu64IILbDWZFyS+16lTxx1++OHmbCWWMlEkICJfeDLRvHXkkUe6NkyTEykJUQrdu3d3xx13nCtdunS+AU88LJo0aWKrSkZ0rCfUKUEkICJfeCEyRAoBIYtCK43URAIiUhJGCVx99dUmIKxEEh6oLQ4JEhCRkkhA0gMJiEhJJCDpgQREpCQSkPRAAiJSEglIeiABESmJBCQ9kICIlEQCkh6Q0s6MnmOPPTYhASHHlsmC69atC+7EjwRE5IsEJD3Ayo5r+Pjjj3dlypRxq1evDu7kDHNmmjZtaiuQDh06yMou/CABSQ+2b99uPUn0trACyU9APvzwQ9e4cWPrnUF4kpkzIwER+SIBSQ92797tpk2b5ooUKeIKFy7s5s2bl+f4SwaC1axZ05122mlu1KhRSf1eJSAiXyQg6QHJ+NQ9GK3BqqJTp042/DwnaPUfN26cK1asmG13aOtPZmC3BETkiwQkfSDjo0+fPu6UU05xZ5xxhmW3MNl/X1iVsFKpVKmSxTH07NnTffbZZ8HdxJCAiHwhbKZevXrWJs6emRepSF2WLFni2rZta+JQvnx516NHDxuJyVxdLgKgmjVrZpkhnTt3tloJ40mTQQIi8oWUK1Ye+Ato52evLVKX3377zbJBRo8ebXkfZ511luWDZAVAMRazdu3abvLkyTakKlnxAAmIyBemoL3yyiu2Z164cKG9QEXqw+9tzpw5buDAga5///57r/vvv98iD5OJMMyOBEQIkTQSECFE0khAhBBJIwERQiSNBEQIkTQSECFE0khAhBBJIwERQiSNBEQIkTQSECFE0khAhBBJIwERQiSNBEQIkTQSECFE0khAhBBJ4tz/A/Ep+NDgf8t/AAAAAElFTkSuQmCC)
The <USR = 110 degree.
<TUS=180 – 110 = 70 degree
<RSQ = <TUS = 70 degree ( corresponding angles)
What is the measure of angle Y of the given parallelogram?
![](data:image/png;base64,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)
Given polygon is a parallelogram. We know that sum of adjacent angles in a parallelogram = 180. We can also find <ZWX using the same property, which is opposite to angle Y and will have the same value, i.e. 101 degrees.
What is the measure of angle Y of the given parallelogram?
![](data:image/png;base64,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)
Given polygon is a parallelogram. We know that sum of adjacent angles in a parallelogram = 180. We can also find <ZWX using the same property, which is opposite to angle Y and will have the same value, i.e. 101 degrees.
What is the perimeter of the given parallelogram
![](data:image/png;base64,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)
We can also directly find out the perimeter by using the property , insteadof finding the alues of AD and AB.
perimeter = 2 x ( BC + CD)
this is possible due to the fact that opposte sides are equal in a paarallelogram.
What is the perimeter of the given parallelogram
![](data:image/png;base64,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)
We can also directly find out the perimeter by using the property , insteadof finding the alues of AD and AB.
perimeter = 2 x ( BC + CD)
this is possible due to the fact that opposte sides are equal in a paarallelogram.
Find the measure of AD.
![](data:image/png;base64,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)
Given polygon is a parallelogram.
In a parallelogram, opposite angles and sides are equal . therefore, AB= CD and AD = BC
Find the measure of AD.
![](data:image/png;base64,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)
Given polygon is a parallelogram.
In a parallelogram, opposite angles and sides are equal . therefore, AB= CD and AD = BC