Question
- 32 cm
- 36 cm
- 18 cm
- 16 cm
Hint:
Polygon is a two- dimensional closed figure which is consist of three or more-line segments. Each polygon has different properties. One of the polygons is quadrilateral. Quadrilateral is a four-sided polygon with four angles and the sum of all angles of a quadrilateral is. Here, we have to find the perimeter of the given quadrilateral using the properties of the quadrilateral.
The correct answer is: 32 cm
In the question there is a parallelogram LMNO as shown in the figure above.
Here, we have to find the perimeter of the parallelogram LMNO.
Since, the opposite sides of a parallelogram are equal.
So, LO=MN= 5 cm and LM=ON=11 cm.
Perimeter = Sum of lengths of all sides
= LO+MN+LM+ON
= 5+5+11+11
= 32 cm
Thus, the perimeter of the parallelogram LMNO is 32 cm.
Therefore, the correct option is a, i.e., 32 cm.
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
Related Questions to study
The measure of angle V is _________.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The measure of angle V is _________.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
If ABCD is a parallelogram, then the value of y is ________.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
If ABCD is a parallelogram, then the value of y is ________.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The measure of is _______.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The measure of is _______.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
What is the value of m?
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
What is the value of m?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAWYAAADTCAYAAACyVrlkAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAEZFSURBVHhe7Z13dJV1tr9/66577x937rpz586oMzrjqDM6dsaxoohdEBsiKoiISO9Ilw4KgiAI0gQE6UiR3luAkEYqKZAeQgpJSCdAKO7feTYJRkyo5yTnnOxnrXfBcBIHcs673/3d+7M/+/+JYRiG4VZYYDYMw3AzLDAbhmG4GRaYDcMw3AwLzIZhGG6GBWbDMAw3wwKzYRiGm2GB2TAMw82wwGwYhuFmWGA2DMNwMywwO5mzZ89Kdna2hISEiI+Pj2zevFk2btz4i2vHjh0SGRkpBQUFZd9lGIY3cPr0aTl69KiEh4df8v4/fPiwnDt3ruy7fo0FZidTWFgoy5cvl4YNG8p9990n99xzz6+uevXqyZAhQzQ4G4bhPWRlZcnChQvl7bffvuT9v3TpUiktLS37rl9jgdnJpKWlybBhw+S//uu/5MYbb5TmzZtLp06dfnH169dP37yUlJSy7zIMwxuIi4uTAQMGyB//+Ef5wx/+IO+++26l9/+ePXvkzJkzZd/1aywwO5mEhATp27fvhTclMTFRjywVr59++kkvwzC8i+joaPnkk0/k9ttvl8aNG0tMTMw13f8WmJ1MfHy89OnTR7Plli1byrFjx8peMQzD24mKipKePXvKHXfcIc2aNdMT9LVggdnJkDFzVLnpppv0jUlOTi57xTAMb4eMuVevXvK3v/1N68yHDh0qe+XqsMDsZCoG5hYtWkhGRkbZK4ZheDsVAzOlzGtNzCwwO5nyGjOB2UoZhlG7qBiYOTGnp6eXvXJ1WGB2MgTmQYMGyZ/+9Cd5+OGHZeTIkTJ16tRfXGgZjx8/XvYdhmF4CzT7evfurTXmhx56SIYOHfqr+3/lypWXrT1bYHYyBObhw4fLzTffLP/93/8tt956qz49K14dO3ZUvaNhGN7FwYMH9cR82223yW9+8xv5y1/+8qv7v2nTpuLv71/2HZVjgdnJEJgHDx6sGXOdOnWkf//+MmbMmF9cPDGLi4vLvsMwDG+hYsZ8//336+8vvv8XLFigk3+XwgKzk6lYY/7ggw8sMzaMWkTFGvN7770nqampZa9cHRaYnQyBuVyVQWBmbt4wjNrBxaqMy2XGVWGB2clUDMymYzaM2oXpmN2UipN/ZMw4zRmGUTuwwOymlAfmG264QTPmI0eOlL1iGIa3Q2Au98po0qSJBWZ3gUCMdhF3uVtuuUXatm2rzcCK18CBA2X27NkSGxtb9l2GYXgDBw4ckPbt28vvfvc7eemllzRQXwsWmJ0M5veLFy+WZ599Vo8zd955p9x1112/uB544AH5+OOPZe/evWXfZRiGN8CJedSoUfLcc89J586d1V3yWrDA7GTYYII/hq+vr2zYsEFWrFghy5Yt+8WFjhk/VlNsGIZ3wUQvJ2Hu/4iIiGue8LXAbBiG4WZYYDYMw3AzLDAbhmG4GRaYDcMw3AwLzIZhGG6GBeZqorDkjCRmlEhuUdUryw3DMMACs4thGW7JqZ/EL7pAZqw9LD/sTJNDh4vk1OlzZV9hGIancOr0WSk+cabsf7kOC8wu5szZnyT2yHH55sckaTo0UBoPCpAvF8dJeHyBlFpwNgyPIbfwtITG5svOkGy9p12JBWYXc+bsWYmMPSIjZ+yVum3XyN3vb5Q3B4fIsDkxMnn+Lhn95TfSv18f6dG9q3Tp0sUuu+yqoatr1y56H/bq2U369ekhgwcNkDHjp8g3c9fLzBVBMnnZQRkyJ066TAiVjoPnyBdffCGbN66TrKxsx8nYcTR2IhaYXUxxcaGsX7daBgyfJC36LpI3+u2UBgNC5Olue+SBtybJXx96W265/T65865/yH333SP33HOP3H333XbZZVc1X//4x91yx9/vkltvu1NuuPkO+d0t98stdd6WexoOl4eaz5W6HTZLwwGh8sanfnLbox/IjX/8k/Tu2VXXSVlg9jBiDx2SLp07yvvvvy/T5/4o01bGSLuvouTJrnvkrneXy6Pvz5IPes2UKbN+kA3r18m6dWtl7Vq77LKruq/lK1c77sOl0m/UXHmzwzfyUJMJck/jGXJ/syVS58O18kTHHfLBF5Ey5LsYebFJN/nr7X+XgQP6S2JiQtnd7jwsMLuQ3NxcWbJkidSvX19atWwu0ZERkphWIKt9M2XAzGh5uW+gPNc7WLpPT5aNISek2PU9BcMwLkHKMZHZW/Lkwy/j5OX+EfJi31BpNjJcPpkaI18tT5JF2w7L4nWB8lHbbvJyg0ayaOEiKSjIL/tu52GB2YVgVNS1a1d54403ZNrUqXLyRIn+OV1dv+hcGTrnoLzUx18a9A2QoXNjJfBgkZRacDaMGiMyqUQ+nRUrL/Tyl7cG75fOX0dq494nIleOHReJT0qVrydNkreavCU9evRQoyJnlzHAArOL4M2aPHmyPPPMM7op+2Jf1pJTZyU0rkC++iFeOowPk8krEyQpo0ROnzGlhmHUBITXI9kn5JuVSdL/2yhZuDVV/KPzJDmzRIpPntWviYwIkRbN35Umb70pq1evdtm2ewvMLqC0tFQDMX6smGVj/XnmTOWpcELacdkcmCVh8QVy9pzzn7yGUdtBlpqdf0oiEgpkd3iOHEgqlILjp+VcJZnuydNnVcoadDBf8opOl/3peY7lZMt3330nL7zwgm4pyszMLHvF+VhgdgFsMZkwYYI0b95chg8frl3bquDDcar0nFtnynhMnzx5UrMD/GVPn/7lB9Yw3BHuKQJy8KF8WbYrTQbOipHWY0JkzKJYCY3Pr3LI6/SZn+T02YuD9k+ybt066dChg24lWrVqlZw757p71gKzC8Ak+80335QPP/xQAgMD5cSJE2WvXD0EbT5cNRm4WcFO1o9u85tvvhF/f38LzobbQhmRksSmwKMycVm89JkWKR+ODpZneuyVRzvs0uC8zi/zqib4CgsLZdCgQfLiiy/KzJkzXb7kwgKzk8nJyZGpU6fK888/LyNHjpRTp06VvXJ1kEkXFJ+WgOg8WbLjiOwIyXYE6Jrx2QgJCdF1OW3atNF6+YIFC8THx0fi4uKu+d9nGM7mROlZtTvYEZotM9clS9txoTov8HgnH3mpt6+8OzxQOk4Ikwk/JMi+qFwpKasbXw4+46yB4wTM5uugoKCyV1yHBWYnwtGGhgD7/Nq1a6erpa6V02fPSWRioYxbEi/vjQiSjxxP+aU70jRYVzeUYji6bdy4UQICAvRIN2DAAA3W7DgzDHcgM/ekzFrvCMhfhkrjQf7yQi9fqd99r7wx0P9CM29f5DE5fPSEZsvnrrCnw6brYcOGyXvvvSdfffWVpKenl73iOiwwOxHesJ49e+oiVo4719McoBEYmVQoQ787KI+03yUPtN6hH7gl249IYoZr5/QvJi8vT9LS0rTGTBOTTHnw4MH68CFgZ2VllX2lYdQcGY7APH1Nkrw7LEhe6btPPvrCcdJbGOtIaI5I0ME8yTx28qpLgmTLS5cu1RNwx44dVR5XHadEC8xOghoUS1bRLL/zzjuyf//+sleunZyCU7Jyd7q0cQTkZ3vulWd77JFmjux56uokOeg4sp0srZm6Mx9MmptNmzaVMWPGSExMTNkrhuE6MAQ77sh0T5yqvARBFhwYkyez16fIpBUJssJx7xxKLdY+zbVy4MABVWAge50yZUqV6ipnY4HZSfAkxQiFYEW2TK35euGDmJV3SrYGZcug2THy6gA/ecYRnN90HM0+m39IP4RVfUhdCScDOtMPPvigqk7YCmwYrqK83xKTUiTbg7NV/19aSeZLaYLgzD2T4ciOkbtdjwQVJRLBuHHjxtK3b1+nJFtXigVmJ1BSUiKLFy/Wjm2/fv0kOTlZJWbOgibF/kP5OozSZEiA/KvtLnn+k73Sb3qkbAnKUtXGldbLrpX8/HzNjH/44Qct19x7772q0cZjgNFzw3A2ZMfRjmC82fEZn7MxRYbPPSjtx4fpiTHL8Zl3Jdy/1JbpF73++uuyefNmlw2TVIYF5uuEhh+SONQKlDCoR7kKyhcc0d7/LFie6b5Hg/PohbES6ziunf2V7vLaoVSRnZ0tKSkpkpiYKFFRUbJjxw6ZNWuWSgD/9a9/XZANVeeH1fBemPWg/kt5rqjkjBzJOiHbgrNUc/zh6BBp2G+fPNdzr+Mz7yufLzgkyUfP2xu4CnoqDJO8++67MnDgwGpp+FXEAvN1QraIvvett96SsWPHSkKC852myqG0kZJ5QhZtOyKdJ4ZLC0eA/nZtsnaj+WA7Axp9SIMmTpyok4sfffSR9OrVS0aPHq31ZP6t06dPl+3bt7t08smoXRCUKT9wMkR99Pn8Q9JuXKi8/qm/PNVltyYi7w0Pkj7TorR2fDTPtRnzpk2bpEWLFtK+fXvZtm1btev2LTBfB0zBoeelrkxgJqBVxxuY7vgAb9ufLWv2ZsqBxEKnDJ/w92YwBgkcAZlyxaeffqq1NYIxLnkc5xg1L+9K0wihvOHn56daZzJsfiaGcbWcOfOTJGeUyPQ1ydJ0WJDU7bxbHuvoI6/295MuX4fLxGUJ8qMjIKPrJ5s+Weqa3gonYLLjESNGqCsk8jiSlerGAvN1wBF/6NCh8tprr2kTrDozSIIxI6XOKmEwnchU32OPPSaPPPKITjnR7KCJSQ0d/w+Cd8UxVF6jxszPgK8neDMlaBhXC5/inPxS7aM06LtPM+Xz49Nx6m+RU1Cqn3dOjc46HVYGpTn6Rc2aNZOWLVtqtlwTWGC+DpDHvfzyy9ogIFuuLimNK+DvTq2cIPvqq69Ko0aNNFtITU0t+4pfQ+ZMo5MSB8c+k84Z18PJU+dkY8D5MepF24+IT0SOxB4pvuIJPWfA5x29cnWNXleFBeZrgFl8mmMc+9E3Tpo0yW2aYGQThSVnVFrke+CYxKUVy5mrUGxwjFu4cKG0atXqgkwIydCPP/6o5kwVIcumhIFMEAE+04BkGEgHKW8wMUi2bdRekKvlF592fA6Pi19UroQnFMixwlLNfC+GjylSt8NHS7QBWN1Qhtu6dauqMMiWORHXFBaYr4GioiLNlnmyYpZNtuwu8IGPSi6U8Uvj9Sg43nE0RGSPY9aVwr+PwEr2XLduXbn11lu1hr5r166yrzgvJ+J/U4+uU6eOBmYeVMuWLZNx48bp+CpjrKg6jNoH2uPisgSBLPjLJXHqO85app2hOY7kofJeDN/nCuP5KyE0NFRryyQl3377rd4HNYUF5msA5QVBGXkcvhE10RyoCmrPex2Zctevw+Xxjj4qMxq3NE72ReZelZsWtWTMWgiu7Cukhh4ZGamvEZTXrFmj0jkCMsMm8+fP16/HO4PfI6mjHFIdhi+G+4DHS4oj490Zmi3fbUyRYWXa40b9/aRup93yxqf+MmVVkqTlnCz7DveAzzSlCz6zn3/+uSYUNfWAAAvMVwnHHbLlhg0bSqdOnapd33g5zjhujKikQpnyY6KOb+Oz8WIvX/n022gdRuGoeKXwYaWhyWQfZQz+7UlJSTpkwkMJTxACd3BwcNl3nB9EmT17tm4drlevnv6seJDx3+DXgoKCsq80vAlOaqlZJ8QnLEdmrEmSLhPDpUFfX1VXoD9+Z1igdJoQLkPmxMgPO9PkaK7r/SauFD7nlN26deumQ1MYkdU0FpivEo74n3zyiWaRc+fO1bFNd4KHPM0SjpDTViXKO8PPS49e7u0r7caFydxNh6/5piAwk1UgI3r66aflyy+/1Ay5vOnJB5ygzUPrz3/+s9bqZsyYIfPmzdP6Mz+3iuUQw3ugJrx8V7p0+zpCmgwO1GSgXtfd8qLjc9fxq3CZtS5ZT3IJ6cd1UrWykeqaggYfiiTKb3xOa7K2XI4F5qsAoyLqpzT8qEVx3KkoH3MnGNGOO1KsmxvIXjhG1vl4h7w/cr/MXJusTZhTp6+u240KgyYgmcXXX3/9i2EaHOcI1EgHCchMSxGkUXrs3r1bB1Vuu+02/T7D+6DhTCbc+osQadh3nw6DDJoVLbM2pMguRxZNQ88ZentnQzLB55PFFpwCmXDlPq9pLDBfIeh4eQOpqzZo0EBrrJ4AmczW/VnSbVKEGiCVO9Qt2Joq+cevfhiGDy3lm3IVCicGMozPPvtMNdDU6AjI5SULtM8oN5AU4q/B1KDheZDhFjo+L+pjXEntlddjUgrV83j80jiZuzFFQmLzdbeeO8NQFAkFyRYDVe7i+2KB+Qphdp56Kk9W1AeuHL12NoXHz8ie8GMy9LsYaTo0UG1Elzsy6WsJzBeD0Qsj248//rhKjKgpV2yGUrvr2rWrPPXUU9K7d2/tfBueRX5xqYTG5esoNE29yqRsxGo2iKjcLatER6ar2qnnTixfvlxLGDSwGcOuyYZfRSwwXwFky9RGCcocycPCwtyutnw52BSMWfh8R0az3CdNTfiv18+ZDzEPKDINThJsOCkfSSej5oNOg5QmIMGZSUJ+lob7g80mMstdYdkyd1OKytwogw3//qDWiT0dPrtMrlJTZpjk+++/d4pVr7OwwHwFkBVy3GnSpInWSMu9IjwNMhiyZAT/eA04Izcg0FLKQBZXXpvj1/Xr12uD9Mknn1Q9NB4b1PMM94SeBA9qAnLckeO6yJS1ZmwBoWaMq1v9bnuk99RI9WfxdFAPUY5Es8zm6/Dw8LJX3AMLzJeBwDNnzhw1KsLaszrNsj0FAm5FZcbOnTv1eIjGGZc6GoOGe0N5IiAmV7d/4Hvc8asw3ZX3RKfder05MEC6TIxQX+TkTM+f5qSkxmkOKwE8Xtyh4VcRC8yXgGBDUGHkGH0jU23e7J52/OQZSXHcdAcPF+v2h2uBUgY6UOR0r7zyimzZskUbgVX5iFDy4ETibnrw2kZeUal8tyFF3dxwdWO7NIG53ZehMnLeIZm3JVUn9uLTiqX4hGeffJjoo3Tx3HPPad8Dfwx3qS2XY4H5EqBvRKtM9kdwLp9880YYEAiPL5Bpq5JkxNxDst4v0xGor/4G5AOOVwaTgoxrYzZOTZ6MpLIPf7kh+YIFC7RDbjXomoEVZbMdgblhXz/VINMgHrc0XrYGZenDGjWGuhmec627m6tB3oqFAg3rt99+W6dU3VHyaoH5EqDBpU6KvhH9rrsYFbkCpFDztxzWCa0GffbplNZyn/RrGp0lI8FlDn9npHJMDdIsrSwwHzt2TBYtWqR1vu7du6uNqBkfOZ8Sx2mIckVVK8j4c0yvpjoezHwOfMKP6WacyhQYngwnXpY+IHll9Npdy2wWmKuADI9smbFj9vh5+7YOAvOqvRnS4aswecGRMdXt5CMtPt+vx9v4I8Wq6nAFlDiQ1HGz0FxFvYEOGrWHuw7veAo8B3MLS7VZt9Y3Qzb6H1UbzaoW+NIUZosIQdwb4TRGkw8FEYNQbOFx14a0BeZKKG9gUX9iMAJtrrvVoJwNhvu5RaWyNThLen5zwBGc98rT3XarYTkmSNcyKXilcMNQY0ZeR9aMSTle0GTdFpyvHsoNOLslZRyXlbvTpc/0SD0J4e7GYFFazomyr/wlXv4R10ldRq/R2zMQdbGNrTthgbkSkNIwTIJh/NSpU7UOWlugAYgT3ch5B+WVvvukTpsdKpf6bP4h3SSBz4GrbmACNH7O3DSMfVMHpAZojcErgxowzTmGQBZuS9VFpsjdnuyyW+7/aIe83GefjF0Spx7dtREknNjX0vvw9/d3636GBeaL4M2iNsp2XIzi9+3bV/ZK7SIkLl/GLorT8e3HO/noRu4h30VL0KE8za5dCV1yGoJImchucKtDB015yTLoX8Npjuk8/+hcmboqURf1vjnQXxeYvvCJrzQZEihtvwxVC06m99LdzHKzOqAUWb7YYvz48W6vrrLAfBFIt8jYaPixhDQjI6PsldoF2RfNH2rM7zmCMzc52tbtIVnVYkbDjcS0JScXHpKDBw/WZixbU4xfgtUrS0rZLP3e8EB5tgdlqD3ykjq7hekmdRp7iWXObp4wKu1M+MwsXbr0wjAJRkXujgXmCjDRxyJG9vjRhELm5c7HneoA03OMabjpCdLRyYVaw6wuCMY0BrnYSH4lyhj2EGLPiiyK7+F9dKdlBs6GE0xIbIGM/P6QNHZkys1G7JcR3x+UmeuSBQMr5G6VGQ/VFvACb9OmjRpsEaBZC+fuWGAug+Mgo8XUNfF2oLZc1VBEbeNo7kkdOqFj7yp1RlUwsMKNhHIDpUZVGTPvFbVoHABZC8RphyMrF/+bDjynH09s4vIzRzGBGVVVD0Ve2xGSIxN+iJcFW1LlUGqRfs/VrBTzRpBj0qd44YUXNGP2lClUC8xloJ0lGCOj4bhDndn4merMkiuDwEtQrkrexKj8oEGDdNqwefPmMnbsWF0qi/581qxZqlml+eNpD1sGOwIP5qmvMZujeThWBs8bAnFyxnlnt9qcIVeEUxPZ8htvvKFLGzxlFsECswMaSkizcI7jxua4w5PWuDKOO4JHpiNgZDoy6+quX9LE4eZD1njHHXeoJ/TIkSPVVAk5VFZWlq6+YrKQmrUnBGaGOigh7T+UL0t3psng2THySr998sGoYNkWnK3KGePyEISRxzGLgAMiJQ131S1fjAVmBxyBmZ3HqAjtMscdb9ctOwsagfsP5sv8zamyaFuqRCQU6nh3dcB7hOyJjOjmm2/WBbC4AKKkQdlRPm1IOYQA7q5WrXzU+DmSHTPMQ1142pok6T4pQhoPCtAmHs5urUaHqC6ZBp5xaXivOfWii6d5zCyCJyl6LDA7wEeYaSBKGPze07yWaxJGtln8+vbQQHl/ZJCMXxqvpupnXFz6IODyQCU7vueee7SGOGXKFH3/OLJOmDBBA7QnmE5hwRqWUKD7GPE9ZhCEnyfbZp7svFuNhfpNj5IVPumqlGGno3FpeDAPGTJE1VWTJk1SHxZPolYHZm5uzLGpP+I0hdeyu6yW8RSOZBOYk3R44aG2O+UVRxAZteCQ+Ebmas3TVRBwN2zYoEY0NGuxZqX8REmK9VXt27fX5a9McLo7BOa1fpny7vAg/RkyEEKmTIAeMjtGvl2TrHI4Mmrj8pBYbd26VXdP0vBjDNvTegu1OjBTg1q3bp20bt1azYro3BtXB0fw4Nh8+WJhrA411O3sI40cwbnH5AOyKeCoKgpckTuTLfNAJTDzK6oNoGxBgCY4P/HEE6pJd3do1O0IzZYPvwjWVf+tRgfLhGUJsjnwqBxMKVK/i+pWw3gyuEDyvtPwo7SFqZanUasDc1JSkrRr106bAxi616bRa2dScuqsHDxcpHpntiQ/2n6X1OuyxxGcI9QYiVVEzh5KiY+P16yYi+Ze+UqrcpgWvPXWW7XGWNPwb2cpKeZBVbm7UVteuO2IzNmQojVmzIYwljKunpkzZ+o9zb1NY9gTqbWBGekV9UjeQEavGWTwtOOOu5FfdFpWOwJx54kR8lLvfVKv625p6cj+5m0+rCoDZ0q4Dh8+rDVE1lYxrVmRPXv2aM/gwQcf1FpzTYC8EFMopu12BGfL2n2ZunPxmCP7rQzqxtn5pWo+ZFwbKC5Q4vAwfuSRR1T+iu+NJ1JrAzPTYBx3cDKbPHmy262W8VQYdKC+PGBmtDzrOJZTex44K1qNkVhx7yzYisKDddq0abq7rXx0nqk/pjbvu+8+rS8ycFLdEGQZ8FixJ10n8D4cFSytx4TIxOUJEp3secdqT4FBJCZ3kb1iguXJa+BqZWDmyco0GM2BESNGXKhPGs7h9NmfJCAmTx3pOk4IU2OdQ4eLnSqj4z3kRiTw0vjD9GjcuHF6fEXLjPQR0/3qauZSpjiSdUI9KZi8+3zBIfl4bIg+nHB2w2tk0OxoCYv3zAzOE2ApAw9jzK9oDHtibbmcWheY0TIiNCerYm35ihUrPEZ07mlEJRfKat8M/bWq2ur1QuClacukH5aObOVu27atZtPVtQmFWnBILFruw9Lt6whdz4TU7eU+vupn3Wzkfuk3I0oWbz+iJR3D+dDIL9/jh62Cp5uP1brAzB4/Ovbs8WOYBH8MwzWQObPk05XTgEgey2VyGBYhk2LnYHVmS5Qtpq1Oko/HhOggCFulUaZ0nhAuX/0QLxv8j6r5E5ORSOMM54MskmSLbJlyhqfbw9aqwMxNjOUfBvgIz8m0PPm44+lQi/UG5QFZMM57zYYHqf546HcHNXtmfBq1SlWrnAznwCwC69/q16+v6ir6DJ5OrQrMyOFwHatTp44OH3izFaQ7gziDLDr4UJ5sCMjUhhiSO3cEdzYGO/CvqKpGjgIjJqVIJq9MlBlrkrWeTjDm650oRDEqAXXVli1bpGHDhlrGwA+FBMzTqVWBGacxMmWGEpYtW1b2p0Z1g64Xne6kFQnS6osQ6T0tUjYGHJWi4+4lFSsqOa3DM3M2puhq/zjH37kqeNAkZZRoA9CCcfVBv6h///7y0ksvqXzSnff4XQ21IjDzBKW23KNHD50GY/SaWXqjZiALjXZkmEjJnujoIw+13SXtx4fJyt0ZGtxqcsqN7Dg5s0RXaK3wSXP8HQ9pvfiNgf7yw64jmjlb3HUPWGzBRvWnn35adevMIniLz02tCMx0bPHipbaMrSdNItsdV3OQURYUn5Yf92RI+3Gh8mIvXx1GwSti0vIEiUwsdPqk4KVg8IWHAV7Hu0JztCTR9esIeXdYkLzSz8/xd9sjTQYHOLLmZDmSXbu3gbgTyFzJlpFHsuHGEwyrrpRaEZix8aQ5wIQfa/HZJ2fULMQ2loJuD87WJaFMCj7cbpe88am/fLU0ToIP5cuJalIw4CW9yvGQ+GJRrAbktwYF6Ej5445s/iXHQ6PThHCZs+GwhMUX6Gi1N9QwPR0Sq3nz5qlena3XTHt6E14fmMmWly9froYmPF15ytrotftAZoxz2pjFcfL2kAB5tIOPNOizTz6bd1D8oo6pQ52rM9TwhALp6Ai+D7ffJU908lGbTbZKD5wZLRN+SJCtQVmSk1+7dz+6E/iisGYMeRyBGSMyJkG9Ca8OzARgPHn79u2rDT9WDVlQdj9Olp6TyKRC+WZlgiM4B6oJ0psDA2Tisnj989NnXVvWIDCz8v+pLru1ZDH8+4OyKeiomi9l5Z2S4+Z/7FbQH8KkiqDMve1pXstXglcHZjTK1J7Yej1w4EAbJnFjkJyheli6I00bgU0dAfqblYly+GjJde8bRCudV3Te3a0y0nJOaKNv+pok3RASGl8gReZ97LZs27ZNt5Lgc4PSiiagt+G1gZnMGKMi5HFst8DoxpuaA95KYckZtb3EHD4wJu+a6rnohymB0MzbfzBP1vhmyLp9mbrpu7IYT+OPZmRhCVulrSnszlCaxBOFht/gwYM1e/bGmr/XBmaONyxiRHjepUsXSUxMLHvFcHeQrGXmUkK4+qyVwMqwx/JdaTL+hzht5rX4fL/+uiHgaI1v+zauHYZJyJZZvIvCypt9brw2MNMQwNSGzSSrV6/2yuNObQWlY8XMFj8OtMdslaYUMXpBrHw0Olhe7O0r/2q3U57qulubeZsCj5rUzYMhO8bfhtIkE7wsuvBWvDIwYwdJbRnhOb8yXGJ4PgRV6sRkxNiKUhvOLTwtobH5smBrqvSZFqnrrZ7v6SsvO4LyeWe3IOkzPVJfp4ZtYdkzQYlBtvzaa69pedLPz8+rG/leF5g57uDF2rFjR7V/5M00vAOCMhu4cWzrOeWATFqRKFv3Z+vWlL7To9Tz+JH2uzQws8iUkW+8OMLjC9TZrbp00YbzwT2QLBlXSGYRvH1pstcFZpylevbsqV3bpUuXSlZWVtkrhqdDYPYJy9GgS4kC3+NBs2Nk3JJ46T45QlqOClbf46k/JmnZArmbKy1HjeqBOjJey5Qmhw0bpstWvX1y16sCM8boq1at0hoU62UQoduUludCow7/YnTEKCfOIKlLLZbxS+OlQd998mTn3Top2GZsqHwy9YA6uzGdx3or1ljZe+/58B6y05FVUeznJNmqDYstvCowY2KCAgOnKY471bXBwnA+LC09kFio6gr0xXsPHNNgW3LyjA6dTPkxUb0sGArBa+Od4YEybVWSlizcFawATLJ5dVCyYCcn6qo2bdro+qjagNcEZj7w48ePV30jW3J5A21llGfBBCCm8yxuXbQtVUYtiJWmQwPluZ57ZcziWDmSc6LsK0UOZ5bI/C2p0m58mLzwyV6p68ieW48J1fVNyTXsUFcRPL9pVLFVg72EDEQEBwfr6iObQr005ZO7NPxItsiWMcWvDXhFYC4tLdVsuWXLllK3bl2ZP3++/pnh/iArJgvOyj+lAyVfr0jQ0sRbgwPUbvOZ7nvVSGjk/EM6Os26KuCIm1d8Wtb7HZUek9mzt0/qddsj740I0ulBJv1qGlZe4fuNHQAKofbt2+uChkGDBql/i1nPXhoWW0yaNEmTLZr5hw8frjWukF4RmHmKki03atRIPZdpDhieQa4jgKKqICPuNTVSfY/xZ0ZdgW9F3+mROpq9MzRH0h0Z88VbRAjANAQ/dwTu1wf4q0Ru3uZU9U2uSQggTJvymfznP/+pDmh4B5Mxz5w5UxUGbPEuLCws+w7jYthMgs9ykyZNZNGiRbWqZ+DxgZnjTkBAgM7NM0yCPM4+7J7D4awTMuS7GHm2x169XnNkyS0+D1ZNMnv0AmJydbT6zJmqb0qahGwaoflHECfzrskJP4Jyenq69OnTR/785z+rbJMGVjlkyowVcx04cMCGny6CAMw9/Pnnn0uDBg10j583D5NUhscHZt4wjjs0B4YPHy75+fnWjfcgaNZNXZUoH44OlrZjQ9Xuc5Ujg2ardE5B6RVvlUYWRwBPyTyhPhk1CYGW2ijZ3qOPPqq15YqfSQaeCDZ4PWzatMl2T14E5mMkWJQm0S37+vrWunq8xwdmjjjU8OjYsvXacC/wvUBhQWmhsnFo6suoL7YEZalpPsMgNR1Yrxem1IKCgqRDhw5qoMXAU0UiIiI0i27durUe1zHmMX4mOjpaG/ivv/66Jl21peFXEY8NzBwXWbyIWfaTTz4p3377rTZbjJqF2EswPpJ9QkJi82VjQKYs25WmI9Q1NezB34nMOyPnpHpqVEf9GVuAqVOnSvPmzdU7GKkcmTG/8ucPPfSQZtQVSxyG4306eVIVLPXq1dNki35RbVRXeWxg5ilKM+XNN9/U4w51ZqPmSc06Iev9MtXZrcc3EdLy8/3SbESQapFrqiGHDC8ioUBLJjQJycxLqvBmdhYEE/y/Z8yYISNHjpQpU6aoWgjvFspujz/+uGntL4Jka//+/Vqbf/755zVbrq31d48NzBwHeaKyMoout2XL1Q8KCXbgsbuPoY8tQUd1kSkj0y/02iuPdtglz3RjkWmgzFibJHmFNSNhpDRC1t58ZJA802OPdJ90QC1A0485bxiFoEIJ42LQK+/cuVM3s7dq1Uruuusuuffee+XTTz/Vxp/xM0hcqb3z4MJFDr13bcUjAzM3APrQ5557TmVIsbGx1vCrAUpOntWN1uVr/lt8tl/39b3U21ca9fNT74rBs2Jk9voUCYjO1SB+LWBMRQkAj+2KF6WsK1Hg5BedlpV70nV91Auf+Oq04MdjQ2XR9lSnbEgBmlOUKmjskSSwg45smGY0f1cagAxJ3HHHHWoX4O/vr8HcOA8/CywUSLaoy69cubJWnyY8LjDzBtJYGTBggG695gNfWaZiuB48KXaEZMun30bJy7336SLT+o4M+cNRITJ5RYLsDMmRmOQitee81u0gTHTyEKZRxg1b8SKzIsO6XHBmCpCJwrX7MqTX1ANSv/sezeZbjQ6WmeuSdbPJ9UJgZgAC83ZkcLNmzVKdMpuce/Xqpf4tXHxu9+7dqw8b42cYJpk7d67u8aPxx2b72ozHBWY62GPHjtXaMr9iB2jUDLi9hcXna932g8+DpdeUA2rJ+ePuDB2Lvl4YqyfIEYSRnXFCKr9oDt1+++3yxBNPaHCmSXS5eiS7/3aFZcvoheeHUR5zBOfGgwP077wvKlele9dqpE/CQLaMiRayTTS4eDzwe1RDOKNNmDDBmn1VsGPHDp1DaNeunSpVaruniMcFZhoq6BuZnyfzqG36xuqC+ISKgvJDVSue+BrKGXsijskKn3QJPpQn2Xmn9M+uZ1MIZSlUDdykN954o9x99926JgxL1/KLz8H06dN11Plvf/ubqnNCQ0Mv28Hn3xR/pFhNkF7/1E8d6hj9xp1uuyP7v56df+XljIMHD+pnkwCzdetWDTrh4eFa4qisfFHby3AEYR5i9evXly+//NKMnhx4VGCmkUKXmxIGa8uZrjKcT3HJGQ1eGwOOyvTVSbJlf9YlVQwsUGUY5MxZ59RMeZ9RMBCQyYq5WTnqXgzKHDJqvo4Ju6FDh17x1Gdi+nGZtT5ZFSMYIDFtuHZfptPMjxiSwAscd7RL+bYQlJGI8W/hYVTbynI8SHft2qVeGHioX6z5rq14TGDmw433ADWo8s0k9mR1HiWnzkhazkk1CsK74uvlCbonD0vNAd9GSURiYbXpkH18fFRtQybcr18/baRVRXx8vNZwf/Ob38gzzzyjpa0rzUBRkyzcmiqDv4uRaY4HEGWZ0056uFwp/F35HBOc6JfgRFdbDLj4t3P6QR7HMAn67to2el0VHhGYOf6hvOjfv7/qP6ktk5HU9iOgMyAQUVvdeyBHg1PPbw6oQxs1WFzd2J3HdhC0ybnVJHebM2eO3HrrrVpXpvF3qfIETbSFCxfK3//+d3nggQdk/fr1moFeCXx8svJOSXzacVVnFJWc1j+rbqiNc0IgY2RMOywsrFZkzpR9mEWgh8AeP0pR1sg/j0cE5vIPLiWMFi1a2Oi1k8A2c1PQURm7KFZ36L01JEAe67hL/tmWtU371E4TXfI6vwwdm2aiz9XwXjOE8b//+7/yyiuvqE/CpW5WHs7UcLGGvPPOO3XKjhvekyDxwLYWxzmsQTklYAvq7WvRaO6ymQSjItwhzXzsZzwiMCNDornDcQdvDNt67RwoXXy+IFaeK3N2a9hvnzQdFiidJoRpKQMFA8d9Z9WOrwROQmSNN910k44z0zS7XEOPQQSagLfddps2CZ0V0EiemRo8VlCqNfSzF1mOOhu02jxYGEShXMdnnXq7N54Mediyxw/JIxJC3mdr5P+M2wdmBPrr1q1TyVGnTp1UhF5ZZ9u4enKLSmX2hhQdBOHqPyNK5m85LEExeRqQq1JjuBKypoEDB8qf/vQnzR4TExPLXqkavobhjb/+9a/a3XfWg5ua+oHEApm36bDMcfyc4o+4vqdBcEb/TN2cQZRyNYo3QQBGuUJpEnUV5araOnpdFW4fmGmGsPUBiRy1RNtMcmWQY+HqRu2UOmplMjD+LDqlSNUX1JD9Is97H9ckBGbGlQnMTIFdyVQnX0OdksCMv4KzAnNm3kn5dm2SvOM4RTQbHiTf/JgoMY6f18Vm/c6GiTea25wckAyiicYLxlsyZ2SDPHA4EQ0ZMkTfP+OXuG1g5kPIsRZR/osvvqgfTm/LHJwN9y2ytuz8UglLKNAx5G/XJssmR+CtykqT7zl37icdS3aH+54BIlbU33DDDarAwdTmckdcvI9ZKUYpg84+sjNnkJpVIhOXx8vrA/211MN2lS8WxUpIXL6crAYTJOwvkQPSGONhRU3W0ycGeS/pG9DoJDCjRrEpyF/jtoGZrAHzF0ZxX331VVm9evVla421ndTsE7I5KEsmLU+QT6Yc0PJE40EBMnpBrJYmPAFuXB7Gv//97/WBTGPvUqckPhMbN25UG81//OMf2iTmge4Mjp84o9al436I0x2ET3Y5P4yCfBCHOlQcroR/G9kko8rcBxj7ePraNEatafTx3lKyMvOxynHbwMxAAU0BOvOfffbZFdUaaxMkt4xE43scFlcgWx0BeYYjO+4yMUKe7+krD7fbKU932yOv9veXsYvi1I7TU1iwYIFmvwRaPCcu9UCm9DFt2jQ1ByJr3rNnj9MlV4dSi3TNFUtin+yyR+o5AnRXx895leNEwqCKqy1E6bPQKEO14ekWBMjjGE+nfs72Fm9sbDoDtwzMNPc4nqLC4MjD703f+EsYeaYevHJ3hvSeGinNR+x3HLUDpGFfP3mp9z55e2ig9JoSKZNWJOiocXa+5zRXdu/erV4oZM34J1RlaEN2zanqgw8+UB0zzWFUDM6GUg+N0hW70qXD+HB1z2OU+4PP92tTMCXT9S5oDKEQoCs7PRDc+HNOmZQFLlf6qSkYFKKmjIKGGrNly1XjloGZ6R9qheiWqS3zgTR+CXkGWfDEZQnybPe9UufjnWpp2ebLUBm3JF7W+GY4juEFkpRRooMh1TW15wwYT+b4zuTfb3/7W+3eV3Ziwo+CBzeNQiYFycBcGZRoojKePmhWtDrUEZxRslDuqEn4N1N/poxDg5xBDXdTOVBeYv4AGSCNfOrMRtW4ZWBeunSpZkE0PPCtrc3HHbK1qiDgzttyWD4aEyKdJoTLhGXnA3LckePXZcbjDuC1jPcF03wMjjCIwMqh8gvPFDaj33///XqyIiA5q7Z8KSgf+R44JiPnHZLukyJ0M8shJ9iGXi8sjsDJjkYhkkF3G7KhBEONHI02+mxvH565XtwuMKPjxKAI+RP1qNqqbzxRelYS0o+rfWZVxjooKdTbwhGM9x/M03IFDauaXN3vLHgYo65YsmSJ7nQkKyZAl1/UlLl69uypmtjqCMrlEJxZELAvMlffI1fXmK8EAh2rqvhZ9ejRQz1EKP+5g+afHgHG9zT8+LthPmazCJfGrQIzjRzeQDIhutBMA9U2mDSLSi6UxduP6FYQ3N0ikwqqvPmPnzyr9c/rsdl0Z5DP8YAmG6SLX34NGjRIpWQc4WsCTjLuUh4imaFJyp48nPZ4WOEZgjc01qOpqak12qPhPub0yzAJS5ONy+NWgZmbjBoUy1U5rjpLj+ruMGHH/rno5CLZFpwtYxfHqYH7o+13SYvP98tynzTJLrDJKE+Crdx4i5S6sKREo4+9gQzVMPmIZPDjjz/WUwY+0OwZZEiFBxt1+5qApiWZPOUmHq4YNBmXx20CMw0+fAKeeuoprSfylK8NumXKD3hSzFiTJANnRUvrMSHy2gB/lbqxm671mFBZsiNNHeAMz4BTT3h8gaphGOl2hd4ZFQbNT3ZeYuBEMkPtlg0peEAz/YiVAa9zP9XEyYIsHR8TBkkoY+C1fKXOf7UdtwnMyJ4YP6W7jo7V26EOfCCpUHfOYbX55kB/DcSPtN8pDfv5SbdJEaq4oH6Ms1tNrf43rg5KHEnpJbohBTOokfMOyqbAo2qC5CzQ+LNbkOwY6RllP/w1KkrpaLZR7vnXv/4lzz77rMrTUELw59UVHEmuWHLALAKeyyylNa4MtwjM1BEZIsFpiqkvjIq8HVQTy33StVSBGT3bpd8dFiTtx4fKuKVxmm1lOLJkHZUu+x7D/cGBLiqpSEZ+f0jHuJ/pvke6TAyXVXsy1M3PGT4bTP9xvzRp0kTr7RWnASkdoGQiKONd/sgjj2jCw15E6ruY8ZM9c8+5sgHHf5v6Nn9HypMsP7DR6yunxgMzT2+8aJkEQuqDaVFtGCbhBt0anKWj0x98FiyDZsXISkeg9o/OlcQMTNstQ/ZE6MGSHa/am6Ga8rqdfbQs1WZsiHpbO0NaR5mC+4RTZkWTJ4IyPs4EQ5YM4M5HfRkpHSoNsmpqzoxEc8+5KnPm74Pckdoym8F5KPAgMK6cGg/M1MRGjBihSgzeQG+ZBjqad1Li04q1qVdZ9x4VBSY5O0JydJVTUEy+FB63YOwtZDred1z78NXA7/rBj3do7wCf64jEgutaOnBxpksgJAtGpUIpkA3iODIynl4RlBvUejt06KDTtK6SohLwaUCiWaa+zf+XcXXUaGCmuccTvVGjRtK9e3d9srvrOOnlQDqM3pgbLjqlUJbsOKIlCWRvWG9WBsGZzJmyhjdoj42f4d08cfKselsPmR0tL/Ty1cz5tU/9ZdjcGPGLylU9tDMgEDJwg1yOwDtlypQLKgyCNskOZQWGtsik8dxAYleeaTsT/ptk5zQdUWLgtexuwy6eQI0FZoIygwHMziP1YQTbU4dJCMiMPu8Jz5E5Gw/LwJlR8sGo87XjDl+Fyd4Dx1xyExjuD7I5lBnfrEzQXYqPdfSR1x3B+cslcRKV5JxVSgRmFBhkzMwBUEYoB3ka9WjsDShx0IxDYueqBIgHAuUUvE7w0+ZEbFw9NRaYMVyZPn26eu6yrYGalydBeQIToXDHTbduX6bWD3tNOaCevXU77T6fHTmOrkPnxKiXwqVGqw3vh1PTwm2p0n5cmLQcHSwTlyeobt0ZkOSQAVccc6beTAmBmjK2uWwAmjlzpk7duRJq3x07dlSJHN4d/D2Mq6fGAjPKC2Q+KDF+/PFHj2sOYDyP93G/GVHSZEiANOrnJ6/02yev9veTJoPZmxcus9al6OhuieNIa9RuODAVlpyRDf5HZe6mwzpK78zJwYvrzmSqqCGeeOIJHYPevHmzy83AeECg/Khfv76qQmyxxbVTI4GZJzvHHbJllqx6ojyO+uDSHWm63v/OFltVFtVuXKgeUZduT5O9EcfkSNYJrT0bRjl5RafVFdDV49xkrnXq1FFPayRyrjYNQkNN2QS9MmUT7m/zw7h2aiQws06G4w7XmjVrtKzhjlzOf2JHSLZ0/CpMfXnHLIqVdX6ZKocqMnWFcY0QsJ0xxh0VFaVyObJmxrMpYbhKHgdI+MaMGaMlDGRyNACNa6faAzM1J2b4Oe6MGjXKaYsznQkBmWEADNBPlVZ9kyRlHpeNAZmyOyJHs2O0x65e1Gl4L6dOn1UDq9D4fMkvvr5JQe4zBk/QOrPIlak7Vw54MNRCc5FTsC22uH6qNTBz3EFbiY6S4w7ZsjuB1C0quUg3Ro//IV6m/pgowbF5VWpOTzpupILjp03qZlw3qDeQWeLvjGfKrPXJcjDl+puDBGO2uiBZc1WwJOgzg4DslWZjTRkmeRPVGpgPHz6s9n88WTHzZlNJTcMNwaRWtCNT2RBwVMYujtUxabZTvD0kUOZsStG9eobhSopPnlFZZe9pkfrZY0T/y8Vx2jx2lt7ZFdDwwwmSqV1mEShTWrZ8/VRbYKaOjLsUI5o4YdEoqMk3kCw3p+CUBMbkqnqCG4Kt0sjdWBv0WAcfeWdooK7/R6NsGK6EElh82nH5YlGcrgh7oqOPBuch38WIb+QxtzDjvxi0+az8wv+ZaUMmC6tzYYE3U22Bmam+fv366XQSe/xq+g2MTS2W7zc7MviZUdJ4YIA83G6XPF4m/m8//rwrGLrTgJg8OVboPGcww6gKMmM+b2jiP/oixJEc7JKnu7FXMFId6hjvdydYbMFuRgzwWZpLLdtwDtUSmDnuzJkzRzXLyOPwkeXPapJdYTnS5etwadB3n2YolC16TD6gVptr92VK/JFiXe+k7m5WQjaqCRrP6TknZcn2NFX8PNtjj9TvtkfafokvN+P9J6pcNVbdMEGI9Sij1wRod2zkeyouD8yMfrJ+nj1+DRo00DfQHY470SlFMnF5vLQaHaJ+yMt3pau5OUoMtKYWjI2a5GjeKR1G6fFNhNTrulsedWTP6OTLg3NNfz4x48eoCK9lki1c7jzV58YdcXlg5ik6bdo0Pepc7B3rCnAvZisI6gqkRwTZymBXHq+v8c0UH0f2bM5uhruR7/js4svNWP9LvX2l8aAAmb0+WZvRNR2Yt2/frgGZ6V2Miiqa9BvXj0sDM80BtibQ7MPZCk2lq2bncWhD1habWiQrfNK1aTL8+4MSdDCvyg8xDRdUGa7cy2YY10PJyTN6khu3JE6GzTkoAdF5Na6VJ1vGqpfSJOqqiqZJhnNwaWBmBQ7ZMu5xzM67yv6P4Y6doTkyd+NhGTHvoHw8NkTrcq8O8JOVu9Ms8BoeDUkH3t6sGEM3X5OQWDGL0LJlS5W97t69WxMww7m4NDAzL48BPm+iM4dJyBhyC0tVXrQ7PEdmrU2W7pMPyGv9/aVe1z3q7Naw7z7pMTlCm3zu0iwxDE8HcyTUVSgxGMEm+TKcj8sCM05W2HmyUn306NG6mNFZlJw4K/5RuTJqQaz6Hr/xqb+83GefXsjdPhwdLOOXxotfZK66wNkT3fBmSFSO5p6U9BzXKzZWr16tm+yxESVzttqya3BJYEZ1wQRQixYt5K233pIdO3Y4VR7Hh29LUJY0GRIof39/q+qP1Uhocaws25Um24OzVadsmbLh7aB9polNU5C1VTSyr2dt1aXABZIk64UXXtBfCwoKyl4xnI1LAjPOVgMGDNAFq+iXr8VyEGN5rqpyXczne02JlHeGBcqnM6NlyfYjEnuk2JE9WDA2ag+cCNf6ZejJkYnVXlMjZXNglmTlnXKqcgNnOuxDKUvih7F///6yVwxX4PTATNmA2jK7x5idR8N8tb6seUWlkph+XDeEkBFU9vnKyjspO0OyZXtIlhxyZMe5ju8xMyGjtlFUclq2BWepxvmR9rt0tyDN71nrUyTViR4vjF5jI1q+2MKVFqKGCwIz2TJ6Zd5AFkReqR8G3ebIpELZGZotM9cly4Qf4mXV3nRJOVpSqS8ymfFxx5HtbA1LhwyjJkGxwVDUj3sypNskhlH2SJ02O3W/IE51mHNdr7yOZa6LFi1SR0iCs+3xcz1ODczMzmOSzRs4dOhQCQ0NLXvllxBn+bAw8sxRjOx4vX+mjFpwSNqMDdWnPiua8KsIjSvQkoZhGFXD+jIUSP2mR6n50dPd2Tnpp/cUWn68wq/lPuIEzDDJhx9+KK1atdJlr9znhmtxWmCmuUfdie24Tz/9tKxfv77KzSQnT52VZMdTnhXuC7amqnCe49frA847uz3eyUfeHOQvXyyKlbB4R2B2ZrHMMLwUmn7cL2zTaeRIbOp23q2b2vvPiBLfA8fk5CWWPlQF2TILLR588EE9CWdnZ5vKqRpwWmBGz0i2TFBmnc2lvJYxaVm5O11HTd8eGqiqCrwAXnN8mNqPD9Uhke82pqhGmTqzfRAM48qhJDhtVZIaHz3hSHIaO5KcNb4Zl9zGUxkkWyxxZXIXV0hGr43qwSmBmcC5ceNGeatxY3m/eTNZv26NnDxR9eh1QtpxtTZsPnK/PN/TV17p5yetx4TI2MVxsjHgqCSkF0tB8Wmtn1kZwzCuDk6Y6JpXOJIffMZJgPYfqtqaoCrYfIL5GPI4hklo5BvVg1MCM0ZFn332mTz0zzoyfNhgOV506dFrPjQr9zje9OmR6uyGBnNPRI5abVJzNgzj+skuKJWQuHyVll6tpziqi23btmlQppGPVe+pU6fKXjVczXUHZjLjlcuXyPvN3pG3mjSVeYtWSvLRU3IgqUitCyuDTcDUmNkyvTv8mOPrTHpjGO4EXsusgSMw08intmxUH9cZmH9yHG9ipVv3bvLSK41l0OiZ8t3qSBmzOFE+mRql6/yrKkWgOcbZjSBtGEb1wz1Iw/BixQYSV9ZE4Z/eo0cP3UxiXsvVy3UF5syMdFmwdK00/miQPPP+F9J2lI90+OqAvNBrnzzZZY9aFR7NZQLJ6sSG4U4wuEWTcMGWVFm4NVUS0873hH46e0ZioqM0ILOfc+HChbpp26herjow82SlMRefXiKL1oVI5+HL5LWeq+XF3n7yysAIefezGGk17qD0npEoa/wLpMjKUobhdjiSZFm5L18+Ghsl740IkRlrUyU9/5ykpmXJ5MmT1KSIxp+rF1sYlXPVgRmlRLlx97tD9spLPbbJc913yTM9fKVRP3/pPilcZq5NlO3BRyU5o1hKTp5W2Y1ddtnlPldCWpGMXxIrrw/wU0ndm4MC5futR+XHjfukadN35I3XX5NVq1bZ1usa4qoDMyPQYXEF0mZskNzVbK3c1XSx3N5wgtz0eHe56cH35IF678hrTVrJRx+3ky6dOkrnzh2lQ4cOdtlllxtd77zfWh546l259akeckuDKXLHW4vlo6HrpM/gMVKv3lPSpXNnp1r1GlfHNdWYUzOLpN+kXfJ06++lQdsZ0uCDkVKvwftS51+Py3333iv33Xf+utfx+3vuuccuu+xyw+u+e++Tpxq0kNfaT5V3+qyQNv2mS/uOXaV1q5ayYP78K/a5MZzPNQXm7Jw8+W7xBhn19QJZumq77PUPE/+AINnts1N2bt8i27Zuli2bN8mmTRt18MQuu+xyr2uz4/7csW2L+PkHSUhkkgREpsmi5RvkqwkTZP78eXLw4MGyu92oCa4pMJccPy4x0ZESdSBUCvOu3mvZMAz3IyMjTcLDw+Xw4cNm61nDXFNgZrbzp3PnHL+YBtkwvAfHfW33tFtwbYHZMAzDcBkWmA3DMNwMC8yGYRhuhgVmwzAMN8MCs2EYhpthgdkwDMPNsMBsGIbhZlw2MCcnJ4ufn5/s3LnzV1d0dHSVC1cNw/AMsPVMSUmRqKgovd+rsvlk6IThE4ZQ+Hob2XYdlwzMsbGxusXgySeflPvvv/9X18cff6yrzYuLi8u+wzAMTyMxMVFGjhwpTZo0kREjRkh8fHzZKz+DpzoLltn9x1YTvj4nJ6fsVcPZVBqYjx8/LsuXL5cPP/xQ/vnPf+ob0bp1619dL774ojRu3FjWrl1rGw4Mw0OJiIjQTdg33nijvPPOOxIaGlr2ys8QmPFmbtWqlfzbv/2bfj2b8Q3X8KvAzDEGk5N69erJb3/7WzXMZiljaWnpr65JkyZJ/fr1Zdq0abao0TA8FEoYnH7vvPNO+eijjzRQXwyBmdJlp06d5P/+7//069mibbiGXwVmtuE2bdpUbrrpJnn99dc1KFdVczpy5Ii+fujQITXfNgzD8yDgtm3bVu6++24NuCxivRgCc0xMjHTp0kVuuOEG/XoLzK7jF4GZRt7YsWM1KJMJkzkbhuHdWGB2Py4EZn7wcXFx0qZNG7n55ptl2LBhtlbGMGoB5YEZ8/x27drpCbgyEhISpHv37lqLtsDsWi4EZqQwKCwoXzzwwAOyaNGislcMw/BmKgZmashI4SqDZl+vXr00MJPAWWB2HRcCc2FhocyfP1+eeeYZqVu3rqxevbrslfPZNPrGlStXyvfff68XX4tyY9OmTfpGnjtnPq6G4YlQoiBTvv322+Xpp5+Wzz777MJ9Xn7NnTtXRo8erQqt//mf/9EAnpmZWfZfMJzNhcCcl5cnU6ZMkYcfflgef/xxWbNmTdkrokF3w4YN+qb8/e9/1+uOO+6QW2+9VR588EGZN2+eqTIMw0OhdMGCVnpLBN2//OUvF+7z8utvf/ub3u8otf793/9devbsKUePHi37LxjO5kJgzs3NlQkTJmigJTCvW7eu7JXzGTOSmsmTJ8vw4cO1/swT87bbbpP//M//lFGjRlWp3DAMw71hvx8ZM4H3oYce0nub+7zixT1P4++xxx6T3/zmN/p7y5hdx4XAXFBQILNnz5ZHH31Ug/OyZcvKXqkcShstW7bURuEXX3xhO8IMw0O5uPnHxG9lMCHYo0cPa/5VAxcCM6WIHTt2SKNGjeSWW26RcePG6RBJVaSmpuoUEF9rgdkwPJeKgbl9+/aVjmQDvSRKGNb8cz0XAjN1ZI4myGH+4z/+Q0etecMqo1xaR8ZMYGZ+3gKzYXgm5YHZdMzuw4XAXM6SJUvk3nvv1foxBkbMx1fmg8GxplmzZvL73/9eu7gWmA3DM7HA7H78KjCjVfzqq6/0WPPHP/5Ra07BwcFlr/4Mf/bqq6/KH/7wB23+WWA2DM+EwExp4h//+Ieak10qMHfu3FnveStluJZfBWagfjxx4kTVNNOpfeONN2To0KEXLjJpsmXsQClnbNmyxbxZDcNDIRDjFodcztzl3INKAzMQaGkGEpQpa1ysa0THjBOVr6+vZcuG4cHQL+rbt688++yz0qdPH5XPXQyBmabg4MGDpU6dOvr1WVlZZa8azqbKwAwoNXCbYzz74kmghQsXSmBgoA2WGIaHgycOW0lIxMLCwnQKuDL4OrJrpn35ekvIXMclA7NhGIZR/VhgNgzDcDMsMBuGYbgZFpgNwzDcDAvMhmEYboYFZsMwDDfDArNhGIZbIfL/AWSzzINZ5VCzAAAAAElFTkSuQmCC)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The measure of x if the perimeter of the parallelogram MNOP is 24 cm is ______.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The measure of x if the perimeter of the parallelogram MNOP is 24 cm is ______.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The side equal to OS is _______.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The side equal to OS is _______.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
Which of the following is not true about a parallelogram?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAP0AAACQCAMAAAD0gZ1KAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAALlUExURf////f398TExJ6enqCgoLW1tenp6d3d3b6+vqenp5mZmZKSko+Pj62trdTU1PT09OHh4XZ2diQkJFJSUsDAwOzs7K+vr2hoaDc3NyYmJicnJ0lJSYqKis3Nzfj4+P39/fPz81RUVAAAACIiIpqamu3t7fz8/Obm5piYmEJCQhISEhoaGj8/P1NTU1BQUDs7Oy4uLkZGRouLi9nZ2fn5+djY2KGhoWFhYSoqKhQUFDIyMn19fcnJyUxMTC8vL1xcXFpaWiEhIUpKSu/v73x8fG9vb05OTmNjY+Tk5JycnODg4Pv7+4WFhRgYGOLi4v7+/ujo6I2NjVdXV3V1dZ+fn21tbXR0dM/Pzz4+Pnl5edra2h4eHtfX12RkZMzMzNbW1jo6OkhISLS0tHt7ezExMb29vSUlJaOjozU1NSwsLJaWlvHx8Tg4OGdnZ7u7u+Xl5RwcHFVVVfr6+rm5uUBAQHh4eC0tLVFRUTw8PJGRkU1NTWpqamlpaTMzM1tbW6ysrOrq6k9PTxAQEB0dHSMjIx8fHykpKZubm1lZWX9/f9vb2+fn5ygoKDk5OWZmZn5+foSEhJSUlI6OjsHBwdXV1ZCQkFhYWMbGxsjIyPDw8NDQ0GBgYAsLCxYWFktLSwQEBD09Pd/f34GBgRkZGQ4ODjQ0NNzc3NHR0bOzsxEREWJiYoaGhpeXl5WVlZOTk0NDQzY2NmxsbHNzc/X19Q8PD11dXampqYyMjHJyckFBQcXFxQkJCby8vAYGBrGxsba2toKCgsfHx/b29sLCwhMTE97e3kdHR0VFRc7Ozmtra8vLy+vr69LS0vLy8qSkpKKioqWlpaqqqq6urtPT0ysrKw0NDcrKyoeHh7e3t0RERJ2dnW5ubmVlZbCwsLKysr+/v1ZWVnd3d+7u7uPj46ioqF5eXri4uKampoiIiKurq4CAgHp6enFxcTAwMIODg4mJiV9fX8PDw7q6unBwcCAgIBsbGwAAAOYC88cAAAD3dFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wDuZjaTAAAACXBIWXMAABcRAAAXEQHKJvM/AAAGXUlEQVR4Xu1dy40kIQydGxJhNHkRAhIBkAJ5VDgcOeITYaxN0589rvYh2Zp6PT2q6kMJyjz8wYafGzdu3LjxD4jeJ9rXSuFS837yp7n9CwpuhNDTvtEJarWEhT7i/g0Div3xCF618Mn36+o551L6hErf+VquMqLm7nPvS27OuZRDb8CWUhq15lxVC9/53Mdq4LyCBwqfZh7NVzSfsCCfy1idniEgh77j50Y3i+p5b8leOk3jKsiRn3rgMdWK6nlPZF+To9jylYFicjyfeH4HJQynt/s864XSeXoqoSOlFEeu/DJd5TlVce9Z5tdT4WfgpMcvdfWaWn8SSyeY96HUOeasPXuYcqbB5kOKLvHQQhIKjDXns1Kin5Svghr7FPPjKj33Xq5Hb/tXfXjP+cssf2r+/4fwKQQxoUu4ylSr8l+y56vUrwyiaJylVL8wexlqPT2W/e49a+irgprZWI1ugbvRC9aBAIJl/xr5voSKaSbPeeWlQMSNAj0WjyX71bjIbg7bJwi4+ijv0Z7yA2pEIiHWDuum1BLrKJA7yjPII79nOjcuqAOBBFuk11UW+kSpezb0vnRnHFWtuRd9ZbXMqDDFROTil3HPd1o7L22LMfEnwkena010XmMs5acQ0rbWUkpwAdFkB0o+DLF8lP3tzwZ6ZqJY2XtUjifp2Rz/zNIY8HyaJ7NqQwjGXyV/X3CxsYMHlj21in7kKbjBYtrXINDoVftKzkbr0Gg2g1kPXh84BXKzoEMQbEFnvX79N4gNHmQon0GpZtWR/A94kA6w6FnXG2I9OuguL1RxJPsDEsWMZ73iaN43lmIGiykNK6x3wnqwumPWw5MhziBlWCD7hTh2vEg7FuvBFHUto2Jkh3HCHBfW612/+cYBc5y8FdZT4kEKbqlj1huZ8NtvZz1YTnFmI0buUsxo1rNzZ4P1MXe0mcesfy3hKQdTFJ1Xwq5tn/taN0444cJ6tSs3f+EE60WHGGG9OOH7BgQaJetdt/oGsWLGs76gsl/Ogg444XFWK6w/oJglRmaC9T+xlgkOvRE+Mn4ITvwbNOutRDVOOOHRKy9G+IBZj6aoGdaTxDLBLSVfrISxmfVg/4aiGf8miRO+r0Fw/EgbrGczD856GU02Jnx86E1KcNSmZP6N5YTDWd+NsJ6d8APrllYWr4T1aP8m6647/OBA6I1SN8R6sBNOcZphvVB0X4NwIPPnFBbrsbJnb9kI68UJB3d+rQbaYD3LCVwns1hvJKoxK3wFw9dqxMiVQQqm6LKbbQx8/H4AJ1YDz2A54WjWezOsl4AWWE4HcgAOYTnh2N47ce5sDHzPTvi+BkE0qJVEfFlk3DcYkMN7y4fgxBz/tawX1QSmqBMzzwTrV+htX4JgifXzRCK+kfKbxXqwnOyU38jiFdrCN8N6ah2diP9cDbTQ+0PlN9lISu4J1tspvxn48hsZTTbU3V1+s29AsJWIj2Z9/OXlN5o3DvzCSlQBi15WA03o+hPmuGvVygrGifKb58aZBnCgGt5S+Q3eCXfTTPkN3hxnLllZwWAn/ETRnZVEfHhdrKnyG/weWnYS8SVXAzzh4zN/TuFI+Y0d1v/i8htyFe6ESyK+DV0vihnO+gHfouYQogS09jUIcfY+k2NE7d95gvVXKNkEQoCH3hI/VDmeO4Yy0KW2YkB476derJ1i5R/u+Ku1E+fadlf/fEdrt9DvDY3/E87Xtfdqt5CexTqJUXFpibE+5GwR2YaXPSbN4ic5n0t2CQ7AfcHzIwzfmp+5FNVx7DS4gdzQNmudoIa6fO10pyZqRK+l52a5nkEnl+YEhfNiDrv37Nof0CMoUCvvE2p48gM1U2T/emjTK3xyM6BTkxhRRv5+k6kHrQkb7NWcCLvE+jlDLOo9+4p8P1EYJ7I30HsnDhg+8rBkv3vshtrgxqnef/E+jgLPdwXhpOzf13KO6L7RBZLeH+Z9DlpjmvQ59wqJb96nErQu4VGqJ45f/th6TPugNjGZuHHhHXMk1AAV2T97H9mQfg8DdZBj7l7LqzE1kKnLvO/s2TrizmOPDwWDTV1uKTfUxTlQCYpy0mPPtcqpUrodfHbyQueGyinUDTQ9uRGeJ6fyuEJ5TmdAzkvUlVvLRgmopZT85JHEQJex4sGO/WopSvJP8ItULfUbN27cuHHjxo1/ws/PHyoLBu5P4Fo3AAAAAElFTkSuQmCC)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
Which of the following is not true about a parallelogram?
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Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
If STUV is a parallelogram, then the value of y must be ___________.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
If STUV is a parallelogram, then the value of y must be ___________.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The length of side XY is ______.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The length of side XY is ______.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The given polygon is called a ___________.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The given polygon is called a ___________.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The sum of interior angles of an octagon is __________.
Octagon is an eight sided polygon whose sum of all angles can be determined using the formula: , where n is the number of sides of the polygon.
The sum of interior angles of an octagon is __________.
Octagon is an eight sided polygon whose sum of all angles can be determined using the formula: , where n is the number of sides of the polygon.
For what values of is ABCD a parallelogram?
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
For what values of is ABCD a parallelogram?
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.