Maths-
General
Easy
Question
If PQRS is a Square and STR is an Equilateral Triangle,find the value of a
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGIAAABbCAYAAACI0FBrAAAZcUlEQVR4nO2deVRUV57HP++9WpBFQBaRUgREJCAoBjFiGzQuEUXjHk3ULEbHmHPsmO6eXjITO5Ne0uvEzmmNo0nHfUFEBbdgIkJEE9QoLkFUxAWUgCIqUMtb5g8oooIIsqbN95z6p6rerXr3e3/7794naJqm8SPaHGJb/4EfUYUfiWgn+JGIdgJdXW9qmoqq2k2HgCgKIAgINZ9r/GhaakMQBARBqJqb6jlU75onQRQRBBFREBCEe6+9jwgNULFUVlBeXomKgCDqcHB0wtHBAAJoqorNZsNms7X8nf1AoGkaqqoiiiLOzs5oio3K63lkfraNxN1fcaVMxc0vgmefn0l8f39cHXQI9zEh3Os1aaDe4GDiKjakfovSwRknJxc8ew1m3OgYgjwcMFdWkpmZybfffovRaKw14OMEu2ZQFIXCwkKsFgt/+OMfkG8XkLb2A9ZlSQyeOpUYfx2XDyayZGM+Q975KwsGdUEnidw9c7UlQrNQcukCxQ69mDwmmk6WM6z/31+zqOyfLJ/Xj8qKCjIyMrhw4QL9+/dv1Rtvb9A0DVmWOX78OFlZWXz3XRHv/s873Cg4zf7My4RPfpcZcWE4CBq9enZHuPgy//VJKi8+NQPv+okA0NAQMLqb6BkSTpBnOPLBT/nP42cx0w80Db1ez+DBg5k1a9ZjKxF2ScjKyuLIkSOMHz+eTz75GAEbd8ouUnzHnX49utGhesI1yY2+T/ZCTj1OnjwDL8O949VprAGst0souJSHLT+Pz07AEyOCcBCgstogSZL0WKsmRVHIyclhw4YNhIWFMXz4cNasWY0gaKiqjKwakO5b9QajAZ18GwtV1vhu1E2EZqP4dDrbKcDTWYfjsJ/y1sTedBBFzC11Zz8Q2O1CTk4Oq1atIiAggKlTp2I2mwEBBD0dHL3p6HCA4uIyZNUFUdDQNBuX865g7tKHblLtuOEB7quIe4/+jBgzhKAu7nj6dqWzq0Mtl+txhKqqFBQUsG7dOgwGA1OmTMFkMpGfn189PwbcOwcTEaBxOO0LToVN4YlOIrfOpvLp7u8YMHEkJgnun8o6iRBECUdPP3qGhBLS2QFRFBGE2hc/btA0jeLiYlavXs3t27eZP38+3bp1u089Czh3DiZuxkuUfbKG/5qzDQejzI3rMj1Hv8HbE4IxiFJDiBCQJB1GowG9XodOJzXbjaiqgqqo1cGgBoJYFSgKYpXdEdsv1YqiUFFRQXJyMkePHuXdd98lODgYQRBQFKX6W1X/X9I7YgofyRt/GMiUgkuc3rmMP2W4MvW5aLo46YEqG1GP1ySC1IW4BX9hpKohic2ZAbGR9a//5pOvrqPYLFgqK9CMHengYKRDYCyvPT+KcH+3dit1ZrOZ5ORkUlJS+M1vfkNISEhNJF0bVYGw0dEVU48wvKfN4nze3/nzzxfg7mBi4vt/YaK/HumuS+uUCFEUaFYOAJDwf3oyM3qWc+daLp9vWsmt8Im88HR3DB274NupQ3P/YLNAVVUsFgvp6emsXbuWn/70p0RFRVWr67qXjf19UZAQRRHRO4r/eH8JcRcKuSW6EWhqkGpqKYh4Bz2JZ4DMzQt6zqV1pCy4L0/FhGCoXlntURpsNhv79u1jyZIlzJ49myFDhiBJjVHXAqKkQ3D0JDDMs/qt2vfaqtlXQaiStirDLyCIQlUCTPw+CaYoCgUFBezZswer1dpmyUVN07BYLHz55Zd8+umnTJ8+nfj4eHS6R1m7Qo0ae9CCa3dpcFmW2b17Nx9++CHl5eVtRoSiKBw6dIhVq1YRFxfHhAkT0Ov1iM2vs4F2SITNZuOzzz7DbDaTlJSELMv1fl/TNGw2G1arFVVVqcqXKWiaikLtCPZhsI93/Phx1q1bR0xMDBMmTGjxLEKbEGF3V+sS0qKiIr766itmzpzJ3r17+eabb1BV9QGSoWG9VcSBzUv5cFUKJwoqUFQNrfIMOz/dxrFyBbURTNij5rNnz7Jy5UpCQkIYO3YsLi4ujbQLjUcrGms7BESdHklvrAkU78bnn39OVFQUI0eORBRF1q5di8lkokuXLnVOhvVOCcfSk1iR7c1thy54TY7Cy5xHxvYvCBsbT7ijREOn0B41r1y5End3dyZPnoy3t3eLqaO70eoSIQgizr5hvPanNfznuB7oquVCrS44bd26lVmzZtGpUyeGDx+Oq6srCQkJ2Gy2OqVC01QUZ1+6d3HhYlY62edKURUrVrMFq9Yw1WSXhBs3brBmzRoqKiqYOXMmXbp0QaerXcRpCbS+ahIERJ0BSW+sLh1Wva0oCgcOHECWZUaMGIFOp8Pb25u4uDguXbrEgQMHHlAVFBB07vR6cgAmywUOHjrCDXP9duV+aJpGWVkZiYmJ5OTkMHfuXAICAlpcHd2NtrMR9wVEVquVrVu3MnLkSIzGKrUliiJ9+vThySefZO/evZw/f77aIN8/oIjRN5xnBnSmKPsIpy/fwqJqDZaG8vJyduzYQWZmJnPnziUkJARJklo1xd9uvKbCwkKOHj3K008/XRO1CoKAo6Mjw4YNQxRFdu3aRVlZWZ3XSzoX+g59hjDjFT77Jo+SCuWhesleYduzZw8JCQnMmDGDmJiYR4wVmoZ2QYSmaRw8eJAnnngCf3//ez4TBAEvLy8mTpxIfn4+6enplJeX1x5EEDF07sOIwX5czjhMfslt6pMJTdOwWq2kpKSwceNGXnnlFWJjY+tNXbQk2pwITdO4c+cOR44cYfjw4Tg7O9f6jk6nIzIykpEjR7J582Zyc3NrPrOn50VBRJBc6B79LNEO5ZSaKx4oEfauiy+++IIVK1YwdepUxo4di9FobKG7fDjawH29F7Isc+TIESwWC717937gZIiiSGxsLGfOnGH16tUEBwfj4GDEoVN3xrz4GlYXX4w6EcEzlKlvvU/YdJEgVx26Oha3LMukp6ezcuVKXn75ZcaMGdMqLmp9aHOJUBSFjIwM/Pz88PHxqXdCHB0dmTVrFhUVFfzrX/9CUVT0HToSHBZBbz8XdKKApOuAb8RgRjw7iAAH8Z4Ywl7wP378OMuXL+fZZ59l9OjRdOjQ9pnfNifi6tWr5OXlERoaSseOHevVz6Io4uHhwVtvvcXy5cs5evRoo3JRqqqSk5PDkiVLiI2N5bnnnqNDhw7togGiUUTYb7o5DJp9dZ44cQI3NzcCAgIeqh6qsrcifn5+vPvuu/z2t7+lpKSkbpe2jt+6evUqK1asoHv37kyaNAk3N7dmU0lNbUNt1L9QVZWKigokScLV1fWRfxSqknsFBQXk5uYSFhZGQEBAg8k1GAyMHj2aXr16sWzZsnrbP+3/+dy5c2zfvh03NzdeeuklPD09m40EWZYpLCzEZDI98gJtsLHWNA2z2Ux6ejqSJDF69OhH+kH7WIWFhaxYsYLw8HAmTpzYqChWFEU0TaOiogJnZ2csFkudRl7TNG7fvk1SUhKHDh1i7ty5hIeHN6uLqmkaJSUlvPHGG6SlpT1yDNJoiQCQJKlJkaeqqly6dIlbt27Rp08fJElq9Oo0Go3Mnj2bzMxMsrKyaqkFe7CWkpJCSkoK06ZNIzIyEp1O1+xRs90dfpiKrA+PJJtNuQlN0ygtLeWbb76hS5cudO/e/ZHHCwsLY/z48Wzfvp1Tp07dU7uwWq1s2bKF5ORkXn31VWJiYuop9rc9Wt1rUlWVoqIijh49ylNPPdWkgouLiwsjR47Ey8uLTZs2cf36dVRVRVEU9uzZwyeffMILL7zAqFGjMBgMDx+wDdHqAZ3dhbTZbERERDR5hbq5uTFo0CCWLFnCW2+9RUREBF5eXuzatYv58+czYsSINg/WGoJWJcKe3zlw4ADR0dG4uLg0mQhZlsnPz+fQoUPcvHmT/fv3YzQaWbRoEc8++2ybpi0ag1YlQlVVbty4wYkTJ5g3b16z5Ptv3LjBwYMHMZvNVFZWUllZiSiKmEwm9Hp9u7UJ96NVibDZbGzfvr0mbmgOlSGKInq9HlVVv2/sEsV2EzE3FK2qPO/cuUNCQgKjRo1qtuqXu7s70dHR6PV6fHx8CAwMpFu3blit1mYZv7XQqhJx/PhxKioqGDBgQLO4krIsc+PGDa5du0ZsbCxRUVEEBgaSnZ3Npk2bCA4Oxtvbu00KPY1Fq0mEpmkkJSUxadIkHB0dm0VtlJWVkZSUREFBAb/85S9ZuHAh48eP580338RgMPDxxx/XXURqh2gVImRZ5sKFC2RnZzN+/PgmqyVFUbBYLCQnJ3Ps2DFeeOEFIiIiaiJ0V1dX5s2bx+HDh/n8889RFKXd7wtvNSJ27NhB7969CQwMbLKRVhSFxMRE9u7dy/Tp0+nXr19N24s9QxsYGMjrr7/O+vXrOXnyZJPSD62BViGivLyc5ORkxo0b1+Qclb3Yv2rVKl577bUHFvt1Oh2xsbEMHTqUxYsXU1JS0tTbaFG0ChFHjx5FkiQiIiIeOfNprymkp6ezdOlSfvaznxEdHV3TenM/7C7s2LFj6dChA6tXr8ZisbRbyWhRIuxZyfT0dIYOHYqLi8sjj6NpGrt27eLNN9/k1Vdf5emnn8bBweGh1/r4+DBnzhwyMjKYO3cuO3fufKT/0NJoUSJUVSU/P5+zZ8/yzDPPNGji6oJ9T/O6desoLS3Fzc3tgZJwP3Q6HSEhIYwZM4acnBwMBkO7NN4tSoQsy+zbt4/u3btjMpkeyVtSVZW8vDyWLl1K3759mTNnDocOHWqUihEEAYPBQHFxMV9//TU3btx4vIiw9yuFhobi7u7eaNugKAoXLlxg/fr1eHt7M2XKFCZOnMjJkyc5fPhwg07IkWWZvLw8Tp06xfTp0ykqKmL//v2YzeZ2RUaLEpGTk4PFYqnuQXJoFBGapvHdd9+xYcMGysvLmT59OoGBgYSFhTFmzBh+97vfkZ+f/9Bxbt68yZYtW3Bzc+PNN99k4MCB7N+/n9zc3HZluFuECPv+sxMnTuDv74+fn1+jry8pKWHjxo2Ulpby4osv1jQXCILA+PHj6dOnD8uXL+fkyZM1u4XsK9y+66e4uJg1a9ZQXFzM888/X9Pq37VrV5KSkrh69Wq7IaPFiCgsLOTKlSuEhobi6enZqGttNhubNm0iOzubF198kfDw8Hvsi5OTEwsWLMDHx4cPPviAxMREioqKaurGZWVlpKWl8c4773Dt2jVeeeUV/P39kSQJLy8vJk+ezJUrV9i5c2ebbpi8Gy2SDVMUhezsbCorK+nVqxd6vb7B11osFjZu3MiBAwdYuHAhvXv3ruUdCYKAh4cHL730EllZWWRmZvLZZ5+h1+uRJInbt2/j7e3NsGHD6N+/PyaTqWYMQRDw8/Pj5Zdf5oMPPqBPnz5ERka2eSm1RYi4c+cOJ0+exNXVtcH9SvbVnJqayrJly1i8eDGRkZF1elp2FeXh4cGwYcMIDw+nrKys5lgFTQMXF2e8vb3rrInrdDqio6MZN24c7733Hp9++ikeHh5tWr9oEdV07do1SkpKCA8Pb3CBxmazkZGRwR//+Ef+8Y9/0Ldv3wakQzR0kohHp074deuGn193/P0D6dkzCJPJ9MDGBLs7O2XKFHx8fPjrX/+Koihtai+aVSLsvUQXL17EYrHQp0+fh5Jgzx9lZ2fz5z//mXfeeYfIyMgGpkJUyq+fITUhka/ybqIYOtH76ThGDQ7H01D7mIW7YSfjvffeY8aMGWzbto34+Pg2q3E3q0TYvZ1jx47Rq1cvunbt+tBr7Hualy1bxsyZM+/ZMfTwH1SRbWZkfWfCBw6ir1cJO1b8Hzu/vUKF+vCNjJIk4e3tzdtvv81HH33EqVOnGnajLYBmJUJVVa5evUpubi5PPfVUvTsy7R0dubm5bNiwgaioKOLi4hrX56RpdHDpTEjvHjhqVlQnZ5zMN7lyvRxLA7SM/Ui8/v37ExcXx6pVq7h06dJDN9m3BJqVCJvNRnZ2NgAhISH15oJUVeX8+fNs3rwZX19fxo4di5ubW6PSIJqtnIKsLSz/v7V8fuQMV8sqkDUNRaVRG92dnJyYNm0aBoOB9evXc+vWrYZf3ExoNiLsQVxWVhaDBw/Gycnpgd+zd09v3boVo9HIxIkT6dy5c6O9Fs1aSdHJI1x1HcCMN+Yz87nBBHk5Nfqm7Pv0xo4dS35+PgcPHsRisbRqfNFsxtreWFxYWMiQIUPqVUmlpaUkJCRw69YtZs2ahZ+f36OVT3UG3AOCcDmQzup/XsFdLOL05VtE0Lhj7wRBQK/XExERQX5+PmlpaXTr1o2wsLBW22vdLETY9b29HOrr61unWlJVFbPZTGJiImfPnmXBggUEBQU9culUNLriP/glFnrmcrlMpaNnJyZPccDNzx/XOg4wfBicnZ0ZPnw458+fJyUlBR8fH7y8vH5YJw9UVlaSnJxMXFxcnZG0XSUlJyeTmprK66+/TlBQUNO68UQ9Dm5dCYuOZcQzQxjYrx99+4bh38kJwyPcmd2Lio+P5+zZs2RmZrZalrbZJGL//v04ODgQGRlZq2fJXqlLS0vj/fffZ+3atQQHBzeT2AuIolR19F0zrFz7aQdjxoxh48aNBAQEEBYW1uK9UU2WCHstefPmzUydOrXOaNhqtfLll1/y+9//ng8//JCgoKDmPWxEEJqFhKqhBHQ6HaNHjyYgIIC1a9dSWlp610mWLYMmE6EoCnl5eZw5c4b4+Pha+l6WZb7++mv+/ve/86tf/aomvmjPEAQBBwcH5s2bR0FBATt27GhxL6rJRMiyTGJiIkOGDKl1tpHVaiUrK4t169YxdepUYmNjH2mbVltAEAR8fX2ZN28eCQkJHD16tJ4DvJqOJs9IcXExqampPPfcc/eoG03TOHHiBGvWrKFfv36MGzfuB9WhbVdR0dHRxMfHs3jxYi5fvtw+iLBPoizLNavj8OHDuLq6EhoaWmOkFUXh22+/ZevWrfTq1Yv4+HicnZ1/MCTcDZ1Ox7Rp0+jRowcfffQRN2/exGaz3ZOptXcXNkXSG3Wl0WgkMjISVVU5cOAAAIGBgVgsFq5cuQJ8b7wLCgq4fPkyPXv2xNPT8wdJAlS5tG5ubsyfP5+oqChWrVpFSkrKPfkoV1dXfvGLX/Dzn//8HqNu78eqedXzOw0mwi6qnTt3RpZlLl26BFCzS8fLywv4PvG3f/9+QkJC6NevX6ueBNYSEAQBk8lEXFwcfn5+bNu27Z5+WgcHB2JiYvjiiy+q3qt+2JMiy1jMZiwWC1arDUVRH5gDe4D7UnUYnnrXsQbfP1Hq+2qapmns27ePgQMH0rFjx3vSF2azmTlz5uDl5fWDMM4PgyRJODk5ERMTw+nTp0lISMBkMtVE3nb1BFXPpKHiKl/vTmJr2hkskh7HTt3oN2IiY5404aCXEO/TEHXPkKahqTJWcyXl5XcoL6+gwmzBpqg1h1Gpqsr169fJyspi9OjR6PV6Kisr2bJlC8eOHWPBggVNOhKhvcLT05MJEyZQWlrKtm3bqh/gcR80Dc1SyrkTORQqnen/zE/o7XKeD994gw8P36yzElinRMiW2+Qf3kNSyj6OnS/GInags/8TDIp/kdjgqiN1ZFkmLS2Nrl27EhAQgNVqZffu3aSmprJo0SJ8fX3bfbzwKJAkiZCQEEaNGsX27dsJDQ2lX79+93lTVY9lUDUDbl17ETVoGN1ig7mW+RoZWUWo0e61xq3zYU+3cvfyweJEnIe+wK/n9cOpooATWZmcv3QVS88ANKCiooL9+/cTERGBk5MTqamprF69mkWLFvHEE0/8W6ijumBXQUOHDuXcuXPs2LEDDw+Put1aTcZ8u5SiwisoFdnkW3wIDXKvUw3V+UDAiuJrFKvO9Pbzwa2jG25enRjhH8EIQeRmddEkLy+PsrIyevToQUZGBuvXr2fhwoVNar3/oUAQBJydnZk0aRJ/+9vfSE1NJSYmprbKUcu5cvIQuzacpujUOcx9Z/H6QLc60zH3ESEAIh39Q4k2ZZK26WPOZgXS3WTCv2dvoqLCkaoHyc7OZtCgQeTm5pKRkcHs2bOJjY1t1+ddNCckScLPz49JkyaxdOlSHB0da0fegh4Xb296BHugXCzgposRSag7x1bngzwc/frz/Fw9PY+fJvdCAYU5BzmekUpW/jymjAioaWcsKiri2rVrTJ48uaYY9DiQYIcoigwYMIALFy6wcePG2rVuyQmfoAgGx8cyPMiV//3HWv7p7M7br8bgoZfQ3fUonzoVuaRzwjc0hjHPv8S8+fN5fe5sJkbC0d3pnKtUMZstSJJEfn4+w4YNY8SIEej1+nuOy3kcXpqmYTQaGTt2LL6+vsiyjMViuYconV6PwcEVv/7PMW/mkxQl/ImlO89VhQZ3zfl9EqECCoXHMjlSJBIWGYa3oyNu3t4YrGYkdw9cBIXbt2+j0+kICgri5s2bJCUlPXbScDdkWa5JeG7ZsoVZs2YidezB6NkLiBWc6GzUIYqu9HxmNn8KHI3q0RWdKNT3sCeh6mUp4suVH/H+H0S8O3sg3rpCuXsMc349gUB9JZ3c3QgODsbZ2ZmLFy8+tgTYYU/rjBs3jp/85CdUnVfuiKfJkbvbr/WOnviH1t2Qfd/Te6ugqgqqbKHsu0KuXq9AcvXF3+SKQZKq1E91PuVxJ+BuaJp2T/KvsXNTJxHfD66iadUT3k4fxvTvgnqJ+BGth3/P8PcHiB+JaCf4kYh2gh+JaCf4f7lkoGd1wl5TAAAAAElFTkSuQmCC)
- 600
- 450
- 900
- 450
The correct answer is: 450
Related Questions to study
maths-
In a Trapezium ABCD, as shown,
and
then length of AB is
![](data:image/png;base64,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)
In a Trapezium ABCD, as shown,
and
then length of AB is
![](data:image/png;base64,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)
maths-General
maths-
In the following diagram, the bisectors of interior angles of the Parallelogram PQRS enclose a Quadrilateral ABCD. Then find angle A.
![](data:image/png;base64,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)
In the following diagram, the bisectors of interior angles of the Parallelogram PQRS enclose a Quadrilateral ABCD. Then find angle A.
![](data:image/png;base64,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)
maths-General
maths-
In a Rhombus PQRS; QRS = xº then P = ?
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d//of8/Hz+/Oc/63TCTB8wMjIiPj4etVrNmjVrUKvVD7SH6EHRO5O0tbWxdetWSktLCQgIICYmBhsbG13L0jn+/v4olUpOnDhBWloatra2zJo1Syt161V3o9FoyMnJYdu2bbi5ubFgwQLs7e11LUsvEIlEBAYG8sQTT1BTU8PXX39NTU2NVurWK5NkZWWRlJRES0sLMTExhIeH61qSXmFoaMjy5cvx8fEhNzeXPXv2aMUofe5u1F0dNJcVUi0X0I4EI1E3SkUnXd0gkJpg6uiJq72Eu22Nam1t5euvv+bw4cP88Y9/JDQ0tK/SBi3PPvssMpmMDz/8EBsbm35f3+mzSQRCAWIJtGSnk5lbSlGbDS6j3RnhYI6JRkn76WOcNHbF2suf0CAHLETX7rf7Pzo6Oti0aRPnzp0jMDCQ6Ojo+zomc6jh6+tLVFQU6enpJCcnY2xszOzZs/utvj53NwKRFBMXTwzrsijc8xnrtp0ir0GDxMYSU7Gcqz9+ztZ/fshf/pHMj9VKWm4pr1arKSoq4rPPPsPOzo7XXnsNMzOzvsoa9AQEBPD666+Tl5fHli1baGpq6re6HkJMIgCkaFQqhDILjIOjmTV9GrGPTmHStBie/X8vMPeRDgwObeDLb6vIr7q59IkTJ/jv//5vRo0aRUxMDP7+/nqzcKfPmJj07N+ZPXs2DQ0NrFmzpt+M8hCGwN1AGZWVjdS3WeA5cxKeLs5IAEyswWQkDuZqhHUXOVfaSlObBn7qcMrKyjh48CBFRUX8/ve/JywsrO9yhhAymYxFixbR2dlJamoqkydPZubMmb2sbbUjb2qhsa4djZEUgaYLdVc3nRoxUjM7rK1lGF9vMv7vfwQPxSRKaMvmQulVyuWOBAR7YGV2LbmiC+rLqGtS0mpog72lGGPDnsoVHR3s3LmTM2fOEBQURHR09D0ddDfMzfj4+BAZGUl2djZJSUkYGhoSGRl5mye76WqrpLroLIUVTbQKTDE0s8TWTIxIdBEjcxtsR7jg4mCOqUR4UxfT9+6mUwkF2VysEFFjOpqgIBMsr8WcGgW1Kd+SXdBGpdOjRM5wYpQL0KXkTG4uW7ZswdDQkHfffXc4DukDoaGhvPXWWxw7doyEhAQqKyv5+XXPZlhYCrGRZJK4ZhVrP97P9oJOUNVT8e0a/vWn5Sz83Vb2Fzdy9ZaSfR8CK5VUn8mlvLGBBnUHzcWnONskoKyumPO5maR/X0v1yFieiXiCWC8TnIHTZ3J5++238fX1Zf78+Tg6OvZVxpBGKpXi5+fHM888w4kTJ/jb3/7GmjVrfr6DwEiKiaUMVbMGcw93vEOnMzaoHbFdLV2qfZz5ZhOJaSFYWNgw54bzj/vcknQq6ynIPk+D0AxTN1fs2yppqbjMpbJKaq92ohk5k6mPL+DZheMYbSriyuVLHEg5yIULF5gzZ04vTeMw94upqSlLlizB09OT48ePc+jQIZqbm29+SKlA3dqB3NATVz8/Hp1ii4uzGw6THyUkyA6b+izyC2u5eEsiXB9bklaU8vOczq1F4RBBUOTjRPt00SJX0+7sT9BcV15xMEJyw2Dli42b+f7771m0aBFTp04dsMdW6iMjRowgNjaW1tZW/vGPfyCRSG7+ElZVUJedzwXpKELdnPE1BzUg7GhB3tZJt4EJRoYGSG9J7u+jSSpRVOWTXSJBEu5N0MSxjPCUgwY6ESM2lF43SLu8jbRD35GRkYG9vT3PP/98vx90NxQJCwtDIBCwcuVKvv32W2xt7QgOHgtAY3UlBQUXUHpF4OU1mmvH+7UdPUzGd2fJNZrIM5NdCLrlHOS+maS+gpZzZznb7oqrqysBjwiQyHqGX7ceL9fVraKhoYG6ujrMzMyuG0Sj0QzPizxEDAwMcHd3p7m5mdraWlpb2376pJ2amnJy8+oQ2shpKj/L6cxLtNReIj/lIoUEMmPZAmJDRjDmluS/PplEVVHOldwLVJj5MsHDEd87DFCkUine3t7Y2NjQ0tJCaWkprq6uOt03MxhRKpUUFxcjEolwc3PDxcX1p0+KqK6sIP+SBLuRHbSUHGZX/jlO51fRZhmE/6w4/rQoiom2cOtlLX36D1WUl5KVW0aXpx9eI5wYfYdnDQ0NCQ0NJSYmBgMDA9555x3Kysr6Uv0wtyE5OZlPPvmE0NBQoqOj8fBwAzRQlUvFhQbOCycQ/uJLPDXTgUe6SznROI7JTz3HqyuimGQD0ts06vdvElUnqqYSSrO3sCtxP9vS62itLaOsvIqSli7udPCkUCgkLi6O6dOnk5GRwcGDB6mrq7tvCcPcnmtnxjU2NvL0008THBzc84FGQ3dhPmXVbdQ5jCVolAsTx41kpJctxjWXaekQIReCpBc33L9JNN1olK00VZTTJrTBwncykx6xxFqipqG5s9ed89dwdnZm9uzZ+Pj4kJaWptOtAoOJxsZGtmzZQnl5OWFhYcyYMeOGnQUdlOYXU97cjcgnEE9DDeYOXtj7+ROgzqEk/zw/Xuj93fcfkxgYYWDvT+AcX/wjV/K6WoNGIEIkEiIUCu/JdWPGjOHdd99l8eLF14+x8vb2HhS3TOmClpYWfvzxRxISEnjsscd44403boj11GhUVeTlX6am3QG3RwNxkoiAkRi7BTDZ6xP2XL5AXm4jeFnd9v0PFpMIhAiFBhiIJUikUqQSAwxEQoT3OEgRiUR4eHjwwgsvIBaLWbVq1XC30weOHDnC6tWriYyMJD4+/pbLIdsRyHPIO6egWeNCwDgfzGVCwAhTS28eDXFAfaWYoux8qnp5v86GFgYGBsTHxzN+/HiKiopITk7W+Z7XgUh2djZpaWm0tLQwb948Jk2adP0zlbKdlpIMcvbtJv1sNecbFKjk9dTLezZ4GZna4z/ZD+uWfM6n7eI/Jy5SUK9AcctB1Todf1pYWBAdHU1kZCSbNm0ajk/uE6VSyWeffUZBQQG/+tWvCA4OvqnL7rp6iUtZx0nZdYrL3QLkQjlXz2dT1qToSf4yMcU2ZCrBzp1ILh1h57bv+bGwnnrFzfXoPAgIDAxEJBKRmZlJWloazs7OWtsqMJBpampi586dFBUVERgYyOLFi3+W8imx8sB71jLsgucRI1ehEptgYmmDraUhRgAiS/B4lt9+GsMSOQgtbLGxNMPslpUSnZsEenIiFi9ezN69e9m4cSNjxox54Ju+hwJqtZrMzEy++uorAgICiI+Pv21OsFAsw8hShpGlIz9fZ9cABiCxxdHT9jaf3/Cehyf9wRGJRCxbtgw/Pz/y8vJISUmhqqq3MGqY06dPk5qaSkNDw/Wz1u6fe18K0YuW5BpLlizB2NiY9957DyMjI61uZRwoKJVKNmzYQEZGBu+//z4hISH9XqdetCTXGDVqFLNmzcLHx4cDBw7o5ZmmuqS9vZ2PPvqIiooKwsLCCAsL08oR6XplEujZU/Lcc89RXV1NQkICFRUVupakF3R1dZGZmUlCQgJubm4sXrxYa2fo651JjIyMWLBgASEhIVRWVvLFF18Mz5/Qs/Vk8+bNWFlZER0dzfjx47VWt96Z5BrLli0jLCyMrVu3cuzYMdrb23UtSWdUVFSwd+9eMjIyeOmll5g6dapW69dbk3h4eBAREYG3tzeJiYmkpaXpWpJOaG9vZ/PmzRQXFzNlyhRmzJih9S2wemsSgODgYN58801ycnJISEigqqpK52eaahOFQkFeXh5bt27F0tKSN998UyeHCuq1SQwNDQkMDGTJkiU0NTWxatUq5HK5rmVpjaysLFatWkVISAhPPvkkI0aM0Ekmn16bBMDY2JiFCxfi5+dHTk4OycnJOj3TVFsUFRXx7bffUldXR0xMjNbjkBvRe5MAuLm5ERkZyahRo/jmm284fvy4riX1KwqFgh07dpCVlcXMmTMJCwvD1NRUZ3r0asb1ToSFhSGTyXjmmWfYv38/I0eOxNfXV9eyHjpyuZz09HQOHjyIk5MTb7zxBlZWt08G0hYDoiWBnrvrfHx8ePnllyktLeWjjz6ira3t7gUHGIWFhaxevZpRo0axdOlSnRsEBpBJoGcr4+LFi/Hy8iI3N5d9+/YNqvjk7Nmz7N+/n4aGBmbPnq03W2AHTHdzDXNzc5566inEYjFr1qzBysqqX4+C0ibbtm0jOTmZ3/zmNzoNVG9lwJkEYOLEibS3t5OZmUliYiJSqZRp06bpWtZ9c233Ynd3N19++SV5eXn4+/szd+5cnJycdC3vOgOqu7mGQCBg3LhxPPXUU5w7d45du3YNyERqgUCASqXizJkz7NixA0tLS55++mm9MggMUJNAT7fzq1/9ChcXF86cOTNg45OzZ8+SmJhIU1MT06dP18sz9AesSaAno+31118nODiYd999l7y8PF1Lui86OjrYs2cPW7Zs4bXXXiMmJkbXkm7LgDYJ9OTHzpo1i9GjR7N582a+++47XUu6Z9avX8+pU6cIDw9n6tSpenuG/oAMXG9l8uTJtLe3895772FhYYG/v79e343T3d1NQUEBCQkJ2NnZ8fLLL+tdHHIjA74lAbC0tCQyMpLp06dTXFzMxx9/jEKhuHtBHVFYWMjatWuxsrJi7ty5BAcHI7r5OlC9YlCYBHom2l588UXc3NxITk7myJEjerlifOXKFVJSUsjOziYuLo65c+fqWtJdGTQmARg9ejQRERE4OjqydetWsrKydC3pJrq7u0lKSuLo0aOEhoYSHh6uF9Pud2NQxCQ3MmfOHIyMjFi6dCkjRozA29tbL44AVSqVFBQUsHv3bjQaDevWrRswZ8YNqpYEeu7UDQoK4pVXXuHUqVP8/e9/17UkAMrLy/nDH/6AnZ0dL730Ek5OTgPmrLhBZxIAW1tbfvGLXzBixAjOnDlDYmKiTleMS0pK2L17Nw0NDUydOpXIyMgBdVbcwFF6HwgEAtzd3Xn88cdxdnZm/fr1Op1o279/P3v37uWxxx67wwUB+sugNMk1YmNjeeKJJ7h06RL79u0jPz9fq/WrVCr27t3L999/j0wm48UXX2TUqFFa1fAwGNQmAZgwYQLPP/88R48eZdu2bXR0dGit7pKSEj799FNEIhEvvvgiLi4udy+khwx6kzg4OPDcc89hY2NDZmYm+/fv18r8SUlJCUlJSVRWVjJx4sR+vyevPxn0JoGeE5V+//vf4+Liwl//+ldKSkr6vc6DBw+ybt06li1bxhNPPNHv9fUnQ8IkAoGAiRMnEhERgb29/fWFtYfJjffL/Pvf/+bQoUNMmjSJmTNn4urqeoeS+s+gm0zrDaFQSFhYGI2NjWzatAl7e3u8vLwe2s78awlE58+fZ+/evahUKpYvX46Xl9dDeb8uGRItyTWcnJxYtGgRLi4unDp1il27dj3UhcDS0lI2b97M1atXCQ0NJSoqCrFYfPeCes6QMgmAmZkZb731FiYmJnzyyScUFxfT3d3d5/e2traSnp7Oli1biIuL47nnnnsIavWDIWcSkUiEn58fUVFRODk5sW7duocy0ZaQkMC+ffuYNm0a4eHh2NnZPQS1+sGQiUluJSYmBoFAwH/9138xevRo3NzcHmhFVqVSceHCBfbu3UtNTQ3r1q1jzJgx/aBYdwy5luQalpaWTJs2jfnz53Po0CE+/fTTB3pPfX09q1atQq1Ws2TJEvz9/QdFHHIjQ9Yk0BPILl26FDMzM3744QcOHz6MUqm85/JVVVUkJSVx7tw5Jk2axPz58wflJQpD2iTX4pPIyEhkMhkbN27k3Llz91RWo9Hw3XffsWfPHkJCQoiIiNDrvNq+MPhs/wA8++yziEQi/vSnPzFu3Disra3vmJisUqnIycnhwIEDlJWV8cEHHzB69J3uDRvYDOmW5BrXJtp+85vf8M0337Bp06bbPnctSai5uZl33nmHlpYW3njjDdzc3LQpV+sMm+Qn3N3dWbhwIVZWVmRkZJCcnAz0HMl1DSMjIxobG/n666+prq4mODiY2NjYm54ZjAyb5CcEAgGenp48++yzSCQS/vnPf1JdXWeaKaQAAAEvSURBVI1KpbqeRaZQKPjhhx/YsGEDM2fOZN68eTdcYTZ4GY5JbmH+/PnU1dWxceNGvvrqK+rr6zE2NkYsFpOUlERWVhbW1tbEx8cTGBioa7laYdgktyAQCIiIiKClpYV9+/YBPWfe19bWkpaWhlgs5te//jU+Pj46Vqo9hrub2+Dp6cmiRYuQSqVUVVVRWFjIiRMnqK2t5ZFHHmHhwoXIZDJdy9QemmFui1Kp1Jw8eVITExOjoecGIc3bb7+tKSsr07U0rTPc3fSCRCJh/PjxjB8/nrNnz+Lp6cm0adMGbJ5qXxg2yR0QCoWEh4djYWGBm5sbfn5+upakEwQajeZul4IPcwMajRo0oBEIECBggGzC6xPDLcn90NlI45UrlNfJ6TL1wMXdHgejuxcb6Px/3b0qmAjExvEAAAAASUVORK5CYII=)
In a Rhombus PQRS; QRS = xº then P = ?
![](data:image/png;base64,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)
maths-General
maths-
In an Isosceles Trapezium PQRS, PR = (5 x + 2) and QS = (8x-7 cm - ) then find the length of PR.
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)
In an Isosceles Trapezium PQRS, PR = (5 x + 2) and QS = (8x-7 cm - ) then find the length of PR.
![](data:image/png;base64,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)
maths-General
Maths-
ABCD is a square then find ' a ' in the given figure
![](data:image/png;base64,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)
ABCD is a square then find ' a ' in the given figure
![](data:image/png;base64,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)
Maths-General
maths-
What is the value of 'a '?
![](data:image/png;base64,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)
What is the value of 'a '?
![](data:image/png;base64,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)
maths-General
maths-
Find the value of ' ' x in the following figure
![](data:image/png;base64,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)
Find the value of ' ' x in the following figure
![](data:image/png;base64,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)
maths-General
Maths-
In a Quadri latera l ABCD,
and ![stack B with _ below equals left parenthesis 2 left parenthesis 2 a plus 7 right parenthesis right parenthesis to the power of ring operator end exponent text then end text A equals ?](data:image/png;base64,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)
In a Quadri latera l ABCD,
and ![stack B with _ below equals left parenthesis 2 left parenthesis 2 a plus 7 right parenthesis right parenthesis to the power of ring operator end exponent text then end text A equals ?](data:image/png;base64,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)
Maths-General
maths-
In
If
bisects
bisects ÐABC
and CP = 3 then find Area of
.
![](data:image/png;base64,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)
In
If
bisects
bisects ÐABC
and CP = 3 then find Area of
.
![](data:image/png;base64,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)
maths-General
maths-
The three s ides of
are extended as shown so that
and
Find the ratio of the area of
to that of ![triangle A B C.](data:image/png;base64,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)
![](data:image/png;base64,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)
The three s ides of
are extended as shown so that
and
Find the ratio of the area of
to that of ![triangle A B C.](data:image/png;base64,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)
![](data:image/png;base64,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)
maths-General
maths-
in
BC = 13, CA=14, AB=15. If D is a point on
such that
then length of ![stack B D with bar on top.](data:image/png;base64,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)
![](data:image/png;base64,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)
in
BC = 13, CA=14, AB=15. If D is a point on
such that
then length of ![stack B D with bar on top.](data:image/png;base64,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)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKAAAAC8CAYAAAD/26XNAAAgAElEQVR4nO29V3Bcd56Y+53OOaEbaMRuNDLABBDMpMQgURRJaSzdsVS7qmvf3Yet6yq7asvlfV/vi59ca6+rtu5d77h2PbN7rZ29o5FESYySwCCSYEAics4NNBEajc7d5/iBEiVSYAbZ3eT5XtGn8TvnfP0Pv38SJEmSkJHJEIpMByDzaiMLKJNRZAFlMoosoExGkQWUySiygDIZRRZQJqPIAspkFFlAmYwiCyiTUWQBZTKKLKBMRpEFlMkoqkwHkJNIIlIyTGh5gYXbC8zdXiWl1KJUq9FrBFIpAZXegsmRjzvPgEGjlH/pD0AW8GkQU0jhOfy933Hlu8ucPD9E2FCIKc9BqUNBJAw6VxUlm/dyeLePsjwDBoWQ6aizElnAp0GhQmEqoqjcTcWElujwNIqDb1Nz+E3+YKOa6MS3XD3fxsn/9g39M/+O4/s38VadVS4F10B+Jk+DoAC1Aa2UQhULM7dqwlTkoXJjLVVVNdRtrKLELiKOtXL5ag+9YwvEJZBn/v4cWcCnRiI2P8/CxDyzukpcJS7Ki9QAqO1ubE4HBfoIi9MzLCwsE0MWcC1kAZ8KCYjjn5lheDJAwltPSb4Dr+77v67Msnx7nsmgCrO7GEeeHYMAcivw58htwKdBSkJ6mpkZP2OzInk1GyhwmNGH/dwOjNN94RyXu0OsVr7Jof0b2VLlRI0s4FrIAj4NYgJpdYiZmQDjAQHXDh2plVlGO/xMdV/jwoU+JsRCyt98m2Ov17KpzCxXNQ9AFvApkJJxUhM9zMyGGF2SyL99jktfLHF+ZpTum4OIjf+K14+/zR//H82UGtUYlJmOOHuRBXxiJNKJGIH+fvwRHUL16xx77zhVBhFNYIC5xpP88/k2ei/o+a27lH+9uwCDTZvpoLMWWcAnJkEitsxo7ygLqULMtdvZ3byNKpsOY7iEeE2Yju/+jq87r/JV/g7eaLCSb9Oiz3TYWYrcNHlSxAiJ2Cy9fTOsCCZcFZWUaJQYBVAYrGg9GynLN2CKBZjs6WUuHCUs518eiCzgEyLF54nd7qN3QgC9G19lCVqV8k4PNx2H2G1C4QQxQY8hz4VFo0Ind38fiFwFPxESqaV5giN9DAWt6B1uKnwW1EoFghglHJhi+vp3DAQkRJeHzc01uEx65Bbgg5EFfCwkkNIkEzGWJsaZaO9jLG6n3qzDaVwlFBSJJuaZ6erg6icXGY46cWzbytuHGnBb1agzHX4WIwv4OEgJxNQSM903uXauhdNnu5mPlmLqusj538wwIK0SnJ0msBThdnIbzX94hB07G3nNq8aulevfhyHIu2M9DimkdITF6QnG+/sYGhhhImnD5nKS7zSiFeNEgytEUgoSugIq6usoL3ZRbFXLox+PQBZQJqPIvWCZjCK3AZ8Rv9/P6dOnqampobKykry8vEyHlFPIAj4Dq6urDA4O8vHHH7Nr1y4kSZIFfEJkAZ+BmZkZrl+/zsWLF1lcXMRkMrFz585Mh5VTyG3Ap0SSJDo6OmhpacFut+P3++nr6yMSiZBOpzMdXs4gC/gUpFIp5ufnGRoaYnJykry8PPR6PUtLS7S3t7OyspLpEHMGuQp+CuLxOF1dXfj9fjQaDWazGbVajVKp5MSJEzgcDmw2G4IgZwEfhVwCPgWhUIgvv/wSpVLJG2+8gVarpbq6mry8PE6cOMHk5CSJRCLTYeYEsoBPSDAYZGRkhOHhYZxOJ9u2bUOj0eB0OiksLMRkMjE4OMjo6GimQ80JZAGfkNnZWdrb21EoFJSVleHz+VAqlej1ekpLS9mzZw+Dg4N0dHQgiiLyQNPDkQV8AiRJoq+vj2+++YZdu3ZRX1+PQvHjIywuLuaXv/wlExMT3Lx5k2g0Kgv4CGQBHxNRFJmammJ0dJSVlRWamprweDz3fMZkMlFVVYXH4yEajXLp0iVCoVCGIs4NZAEfk3Q6TUdHB36/n5KSEioqKnA4HPd8Rq1WY7PZaGpqQqPRcPbsWRYWFhBFMUNRZz+ygI9JMpnk3LlzhEIhjh07ht1uXzPNIggC+/btw+l0curUKebm5kilUhmIODeQBXwMlpeX6e7uZnZ2Frvdzvbt2zEajWt+VhAE8vPzqaysxOv10tbWxuDg4AuOOHeQBXwM/H4/LS0tGI1GKioqKCoqQq1+8ER7vV5PZWUl27Zto729nZ6eHlKplNwhWQNZwEeQTqcZHx/nq6++or6+nsbGxnt6vg/C6/Vy4MABhoaG6OvrY3V1VRZwDWQBH8Hk5CRDQ0MsLy9TX19PRUXFY11nMpnweDzU19ezsrLChQsXiMVizzna3EMW8BG0tbUxMTFBc3MzZWVlmM3mx7pOpVJht9vZt28foijy7bffsrKyIveI70MW8AGk02kikQg3btxgYWGBd955h/z8/CeaYKDVatmzZw9ms5lbt24xPT1NOBx+jlHnHrKADyAcDtPb28vU1BR6vZ59+/Zht9uf6DuUSiVut5uqqipcLhcXLlxgYmLiOUWcm8gCPoBAIMDnn3+O1Wply5YtmM1mVKonm70mCAIqlepu5+XChQsMDQ3JecGfIAu4BtFolKmpKS5cuEBpaSlbt259rJ7vgygvL2fz5s3Mz88zOjqK3++Xe8TfIwu4Bn6/n4GBAfx+Pz6fj4aGhmf6PqvVSnl5OXV1dczMzHDt2jVZwO+RBVyDtrY2uru7OXLkCF6v94mr3vsRBAGHw8Hx48cJh8NcunSJWCwm94iRBbyHVCrFwsICfX19zM/Pc/jwYYqLi9dlar3RaKS5uRmLxYLf76e3t1eeKYMs4D3E43H6+/uZmppCrVazc+dOXC7Xuny3RqOhqKiImpoaTCYTp06dwu/3r8t35zKygD8hGAxy4sQJ9Ho9+/fvR6fTPVPnYy22bt1KbW0tn376KePj4ySTyXX9/lxDFvB7VldXmZiYoKurC6fTyfbt25+57bcWZWVlVFZWAjAyMvLK5wVlAb/H7/fT09NDNBqlpKSEmpoalMr1P1/BarXi9XppampiZGSEjo6OV7pHLAv4PT09PVy8eJF9+/ZRW1v7XOT7gcLCQj744AOmpqZobW0lkUi8sj3iV15AURTx+/0MDQ0xPz/Pzp078Xg8z3VRudlsZsOGDbjdbkKhEK2tra9sj/iVFzCZTHLr1i38fj92u53a2lqcTudz/Z8ajQaXy8WGDRvQarWcPn2ahYWFV7IqfuUFjMfjnDlzhng8zltvvYXNZlv3nu+D2Lt3L263m88//xy/3/9KjhG/0gKGQiGGh4cZGRnBYrGwe/du9PoXd6ZRUVERPp8Pl8vFrVu3GB4efmH/O1t4pQX0+/1cuXIFjUaD1+ulrKzsoWs91huTyYTP52Pbtm10dXXR09PzynVGXlkBRVFkZGSEkydPsnHjRjZu3IhKpXrhO1p5vV6OHj1Kf38/XV1dr9wY8Ssr4OzsLMPDw/j9fjZt2kRVVVVG4jCbzVRUVFBZWcnKygqXLl0iEolkJJZMkAX7A0qkIguEAlOMDIwQstRhLqpiS7EK5Ro/DykZJTHXz8DEPKPzEe6UFQIaSwFWzybqC7XYH+OA3vb2dqampqitrcXr9WK1Wtf7xh6LH3ZT2LlzJ52dnZw7d46GhgYMBsN9naE0UjpOcHqYyfFFZpaVFO3eQpHdRN49zykFYoy5/k5GRycYmlkhKugx5pdTVF7F5ionZq0yG148kHEBJaRUlHBgmLG2b/nsn75irur/ouL1cjYWqfi5RilSsUUCHaf4tuUWZ7sXudNv1GCvaKb6WCX5FtVDBRRFkWQyydWrV1laWuLYsWO4XK4X1vNdC41Gw969exkbG6OlpQW/34/NZsNgMHz/CQkxFSOxOsdk+xnOnRniuxETB7zlvG65V0AxGSEZGmfg2hm+bblKS+cUgagKg283DfuOo7XvozbfgF2dHZtnZrQKltIpEvODTAxc5+qN61y8OsjwdJBwWmLNlJgUIhIa5cL5LgZHb5NSKFAoFCjVdsy2AioqrRiND/9NhcNhhoaGGBkZQa1Ws3//fmw22/O5wcdEoVBQUlKCz+fDbrfT2tp63xhxksiSn6n2Vm61XuJaZy9tEyFWEmnS9zwnkej8FJNnf093tAjL7o/4N//+3/Cv9+dTsHCFy7/7Nf/rSoD++ezZwzqjJaAgKFCaXLg8Hnw1xTgEkXD6/of6I6mFKUKjPYyZd1D+moW9RSaUgCCYsBQUU1agwqp5+C97fn6eL774AovFQkNDA3l5eRkt/eDOhFWNRkNtbS1NTU1cunSJoqIiqqqqvh8SVKLR27AVV1PrdXGjK0zSn0b82XNKIWkMpB0b2eDxordZcRti1BaEiUdPsXRllLHJFRYbkkiosuIYscxWwQolKksRbkOIVHSUUouGSeVaj0UCKU5wcpDR1qsMp96kqaSWLVuLcDgdmLVKtGtedy/xeJypqSlOnz7N4cOHaWpqeq5jvk9KeXk527Zt4/Tp0wwPD7OwsIDT6UShUKIx5eH0mbHMeSm/voSmf63qS0JpcmCq2Uep04xer0GQYhS7tjN8Y4C+rn6iSgmFkD0jLlnSFlUgoESlFFCs6ZEE4hxjA52c+t1XfLfUTXdbM32Dr/HGO4fZWmKi2PzoWwkEAgwPDzM8PExVVRUbNmxY9zt5Fux2O5WVlZSXl+P3+7lx4wZvvPHGvSW0UolCoVyjfQygQafTUFgkISgUP5ZwkoikcmGwQ0Oji8J8XVaUfpCNaZg1C0AJKR5DaXRiqWyirkiFYvYal3/3t/zX//if+NVnVzk/FuZRv+u2tjb6+/t58803KSsrQ6vNrqOkFQoFNpuNI0eOEIvFaGlpeWBecG2BBARBQKFUcCedmSIdX2G6tZNlpRPLG+/zermVMlP2vPYsKQEfhQAYcHg2svlNPa7ANKODfQz2j9B15XPOqYwklQa8hVtwqQX09z3fdDpNOBymq6uLubk53n//fYqLizPe9lsLo9HIzp076ejouLsZus/nw2KxPNH3SPFllucnGO/v5NqXLdwIe4j6GkjG00hpEdTZce+5IaCgQDCUUraxlLKNrwOQWupl9NpJfvOf/yuftp7hrKSnfv9mXreD/r5DouPxOKOjo4yOjpJOpzl06BA6nS4Td/JINBoNHo8Hn8/H9PQ03377LXq9/gkFlJBWRhm9/Dm/+4f/xSdXppiIOrDVBLBVePgDrYcdxdlRDeeGgGugNJVStHE/H/3pAqv/z3d0Lw5xuTPGpiYtRdp7W0iLi4t8+umnmM1mmpub0Wq1WVn6/ZSmpiaWlpY4ceIEtbW1VFZWPqDdtxYCgrWCytf+gP/Tu41d7V9z9tR3nO/s5MxvT1NtPYyvsAaX4kFV+Ysju9/CQxDUJowuH5U7D9NYZaVEF2TKnyAWv7e9FIlEmJ6e5tq1a7hcLnbs2IFSqcz6U4y8Xi+1tbWEw2FGR0eZmpp6ousFjQWLu5Lqptd5/e33OH6wiX3lsNjbz+TcAgtZMtycswICoDKisG/CW5pPeYECSUxzfwY7EAgwMDBAIBCgtLSU+vr6rJcPwOFw4PP5qK2tZWJi4inXjggIKgOm0l1s27mDY7tLsSZWiUVjhCQe2Wl7EeS2gABISAo7JoubqirTz0ZCurq6aG1t5cCBA1RVVb3Q6VbPSkFBAb/85S/x+/1cvnz5Gbb5FdBZbTjKSslz5eM06LFmQfULWSSghIQkST85XegnD1oSSYf8LMz5GZkNEU2KiIAYDxGbusasmE/KtYUDPjV5hjuPNZ1Os7CwwMDAANPT0+zbt++5r/VYb8xmM42NjTgcDhYXF2lra2MlGESSREREJFG6rxSTEFNJ4qshYskUybt/TBNdjRGJCOQ3bqakqABXlrz5zHZCpDuTEaIrSywGFgnGUqyGgqwsBAisFOAya9Cq71St0dlu+keWubVgobaumDyTBnVigdhUN4sGD1ZPHTsKFJi/f7DJZJK+vj5mZmbQ6XRs2rRp3XY5eFFotdq7uyl0dnZw6uRJDrkmWA6FiCclluYXWFpyEbbrMagFBCKsLvqZ6BxgxVyAxmIlz6RBKUa5PbGCP2qjfk8jFZ4CbEJ2lIAZFjCNtDzGWOd1Lp5rpft2mLn+dhJXznG2eD8HGtx4nHqkdIzFW6f4+p9b+NuLYZwbtuDNN+G2WRCsDex7cyNbN5Vj+0m1EolEOHXqFKIocujQISwWS1YNuz0Ju3fvZHFhnl//j79lqUbL+JzI0oqJ62dbyFeocWxtoNYloBbHGW/7nF/9h//CVf0G9L4atm4oxhhdJKXzYCo7xh8c8OCxG7Km6susgIICweTGXfMar5l8lGz4gKg+H1NBGRVeJw6j5s7HVFocW97hID5MdfNETG7y8vMpLHBhtRbg8RaQb1LffajhcJjJyUm6u7vZsGEDe/bseaFrPdabsjIPlZXVWBxOdN563jxQxy/cNTi8FZSWFFFkFlAKgMJNYdU+fvFvU/iCWuJ6B/mFBbjsRoyWfKz2Arw2HYYsmYoF2SCg3oGjxIGjZAMbdjzoYxpMvp005VVTuWWBhbgarTUPm92GTaf42fix3++nra0NgNLSUnw+33PZZuNFYbFYKfdV0Lx9F3GNhsLKet59992ft2cFB47SRvZ+WEJFIMxqQoGgM5NX4MSi16DLwgogh96KGp21AJ21gPxHfHJoaIizZ8+yZcsWGhoa0Gg0LyTC54nH4+G9997jL//yLzGbzRw9enTNNSwKtR6FrYyyzE5xfGyypSmwLkiSxPz8PENDQ4yPj9PU1HR3I6Bcx2KxUFdXR0lJCcFgkMuXL78UO+6/dAJ2dnYyOzt7t+q9/0TLXOWHU9mbmpoQBIFz584RDAZzfjeFl0ZASZJIJBJcunSJYDDIkSNHcDqdOdvzXQulUsnevXux2Wy0tLQwNzdHIpHIdFjPxEsjYCQSYXJykr6+PtRqNQcOHMjYSrfnhUKhwOv14vP5MBqNtLe35/z+gi+NgPPz85w5c+buqeVutzunht0eF71eT1VVFU1NTVy9epX+/v6cXsj+UgiYTCaZmJjgq6++wufzsWXLFtRqdU4Nuz0J5eXl7Nmzh9HRUQYGBggGgzkr4Ush4OLiIsPDw3R3d1NbW/vM53pkO3l5edTV1VFQUHA355mre02/FAK2tbUxMjLCnj17KCsre+Bp5i8LSqUSm83GoUOHSCQSfP3110Sj0ZzsEee0gD+s9Whra2Nubo7jx49TVFT0UvV8H4Rer2fPnj2YTCb6+/uZnJzMybxgTguYSCSYmZmhr6+PWCzG22+/nXMzXp4WjUZDVVUVHo8HgCtXruTkuSM5NBT3c27fvs2nn36KzWajqqoKg8HwSpR+P2XTpk0EAgFOnjxJWVkZPp8v69e7/JTcifQ+YrEY09PTtLS04Ha7757r8bL2fB+Ez+djw4YN95zEmUvkrIALCwuMjIwwOjpKaWkpmzZtynRIGcHlclFVVUVxcfHdg3ZyiZwVsLOzk7a2Ng4ePEhFRcVLMePlaXE6nbz33nssLCxw8eLFnyxryH5yTsB0Ok0wGKS3t5fJyUkOHjyIx+PJqXbPemM2m9mxYwdms5nZ2Vl6enpYXV3NdFiPRc69tWQyyfDwMJOTkwBs376d/PxHzRB8udHpdHg8HsrLy1EoFJw9e5ZAIJDpsB6LnBMwFApx8uRJFAoFr732Glar9ZXr+a6FIAjs2LGD8vJyPv74Y6anp3NieC6nBIxEIszMzHD9+nUsFgt79uxBq9W+cj3fB+Hz+aiqqiKZTDI4OJgTM2VySsBAIEB3dzfRaPTuckW59PsRh8NBeXk59fX1DA4O0tPTk/WdkZwSsL+/n5aWFhobG6mrq0On08ml332UlJTw4YcfMjw8zLVr17K+R5wTAkqSxOLiIoODgwwPD7Nz586XZq3HemOz2WhqasLpdLKwsMCNGzeyeow4JwRMp9P09PQwOztLXl4e1dXV5OXlZTqsrESr1VJQUEBDQwMKhYJz586xvLyc6bAeSNYL+MNaj/Pnz7O6usrBgwdxOp0v5Wzn9UIQBPbu3UteXh6nTp0iEAhk7UmcWS9gNBplZmaGjo4O1Go1hw4dwmw2ZzqsrEYQBCoqKu7mBbu6urK2R5z1As7NzXHhwgW0Wi1er5fS0tJXetjtcTGZTFRUVNDY2MjNmzfp6+vLys5IVguYSqUYHx/n9OnTVFZWsmnTJjnv9wR4vV4OHDjA0NAQfX19rK6uZl1yOqsFDAaDjIyM0N7ezoYNG176tR7rjcvlYtOmTdhsNmZnZ+ns7My6dcRZLWBHRwcTExNs3rwZr9f7xEcVvOqoVCrsdjt79+4llUpx7ty5rEvJZKWAoigSi8W4fv06gUCAI0eO4Ha7c3qHq0yh0+nYu3cvJpOJ9vZ2Zmdns+o84qwUMJFIEAgE6OrqIhqNcvToUZxOZ6bDyknUajV1dXWUlpaSSCS4efMmc3NzmQ7rLllZpAQCAT777DMsFgvV1dXYbDa59HsGlEolDQ0NTE9P8/XXX+N2u/F6vVnRmcu6EjCRSDA9Pc2ZM2coLCykubkZjUbzSk84XQ8qKipoampicnKSkZERAoFAVqRlsu6tBoNBxsbGaG9vp7y8nM2bN2c6pJcCt9tNXV0dFouFyclJent7ZQHXor29ne7ubg4ePEh5eXlO7+2cbdjtdn7xi18QDAb55ptvsmJ4LmsEFEWR1dVVbt26xfj4OEeOHKGsrEye77eOmM1mdu/ejcFgYGxsjOHh4YyvHcmMgKkI8WiY5dUUqfSdaiCRSDA5Ocno6CiJRILXXnvtlV/rsd7odDqqqqooLS1FFEUuXbrE7du3MxpTRgQUF9oY7rnOpxcCBIJJJO60/b788kuUSiU7d+7EarXKM16eA4IgsHXrVmpqavjtb3/LxMRERtuCLza3IcUgvcStlrO0TpvoLaxnb1ogkUjg9/s5d+4cOp0Oi8XCmTNncqL6nZiYuLsUUqVSMTMzk+mQHsn8/Dxzc3N0dXXR29tLVVUVhYWFGYnlBQookYouEp29wqWzl7gWrUZ8V0cKBelUnGg0ysrKCoIgsLy8zJUrV15caM/A8vIyyWSSQCBAT09PzmyNEQqF0Ov1hEIhgsHgqyBgkvDsEEOf/L+cvjbGVGEtuyxqVCoBlUpFYWEhH3zwAaurqzlxnu8P6HQ6GhsbsVgsmM3mnJkqZjKZKC0tpbGxEbvdnrE4XpiAybke5sa7uBy0EkmaMav1WCwKlMo7g+ZOp5O3336bZDKZFfmpx+WHcWu1Wp1zmyNJkoTL5croZu7PX0ApiZRaZmZ8ionJJRR2K2qtFZX2BwEFFAoBo9FIVVXVcw9HJrt47gJK6QjplW46h+PMBawc3KDigtlAUHNHQJUqd0qMlx8JSRQR1ziHWJLuvCcBEL5vIt1/Rt/T8HwFlKKEF+foPd1FwraRwkYLrsXLpNNqRK0eq/lOFSyTBUgiUvw2s0O9DPT0M7CsBIWARikipuJEk0rEOOjS4HrjKDWVpdSZnt3A5yigRGJhioWxAXpWXRRUFVFmXkQaXSEpGFDo9Fi0oMqasZjHQSIZCRJe8jM95WdxNUlMUqHWa1ErQIECERVGu5s8p538PCOaLDkY+sFIpFYDrPoHaGsbZHIpzqrSgNlmwahToVWISGKClaluRiYCtAzqONAcoXydbuo5CShCKsryeC/jPT2Mmd+iVGfEEh9myr9ERLCi0xuwKLlzzm0OkYousTTewY3TZ7kxHmNOtFNaXYJdI6ABkmkl5nwfpRU+amq9FNqMGDVKsrWlISZCLE120X/hU/6/r2aIe/ew5d1j/GK7mwKj+ntBRELtQU6GbvP/XzFwTK3CplufG3o+AqbjiAs36Bsc5XznbSLm01yeVtEaHGXp5jiTUR/1ej0WBeRWDSygtbrJK6ulRPg7zvmVjJkbePdf/Es2OfQ44kvEFwb47sTnfH1Jyd/bX+eP//gwWyucFGozHftaiERGznLli1P893/sRPPW/82hN/byXnMBDr3qJ+9GgcFXQ2mzhh0jCmptRvLWqeZafwGlKIlogKGueSKaYqoO1OMwqlAJaYIjKQa7kmiNejR6AxYhS2fEPgSFUkJQJlm5vUBY8KJ1V1BT5MZj02NMWUjbtDTtGmMhfJOBK7/jhMeNIG3hcIMDFVlUHYthiE9y89uv+fbKOIOGZj7atpkdG0ooMGt+FqfSWIjbo2HPXhVFdiPrVACu9/tPkwjdZnFqiN5pDdbqanY111KkApUQZ9YaIf2NiAkDWr0esyL3qmDSqyQiM4xPh0nqnbgrKynWqDAIoFAbUNjKqXvtTYLzcwx9/T9pOdeMu8BFc50DZxaV+GJ0kcTMJS61tHFzyopxz3F2bSyjJl+79o9E4cDhMrFtu4Y8q37d7mOduwAxFocH6Dv7HcHyBszlPorV3Gn/SAkSiTALCxHSSg1anR6DkD0v5HGR4vPEF3rpnxDBUISvuhyDSvmT+xBAW05+oYeN5Qriva0MDg3TG4NE1uTXReKLfvxf/56bwyss2SrY/dYuSvIsGB5UIAhWzGYXlRVWjAb1upXk61ICSvEVksuTdN88z8WWLq52hSktWKbcWwiigBRfZGa0nbbWy7QMJfGbhrAPdHOxq5iGcidOoxZtjpSEqcUAK4NDjERcWPLdVPoMqO4vxgUVOq0em0WHIjbP8tIy/qBEWpslvzgpSmh5jo7WHubCbsx1HprqjFiMioeIpUBQrH/WYn0ElCQQkyRiCSSdBWNZMcU2HTa1hISEJKVJp0RUpnyKtr/LXn0VRaUmUsk0ogRZUzA8kjSrgQAz/aPMaUoocRdQXaj+uYAICAoBlVKBkI6TTCSIJn5M5mYcKcRqaJ6+/jmCNFDiKqS6QIkhAw3ydfmXCp0VTeEWdry3hR3vrfEBQxFlm4oo2/Q2x/94Pf5jJpCAOAuBOQYGJwm7dlBQ6KbSKIOUoy0AAAtYSURBVKzRjpVIp9LEonHSkgOlWo1WA1kzTCyuEI/eZmYuRcxqx2hzUKQkI7VQTqWBM4sEqUkC89P0j4nYPNW4C/KxCWs8RClEKLTE9FyEpKkIpzMPj0WRfUl3AQSlCqVSlbGEebY9kuxFSiMujzI/G2B4yURhhQd3gR3tz16chBSeYGF+mr5ZAa23gbLSEjw6sicZLRjQaK248jRoxRiJWIQVEdIZCEUW8HERRRJTg8zNLDGZLsJT5aYg33jfA5RAShGb6WJydJzuZSdFjVupriyjUJlFOU+FHaO5kJoaB1ZxifDteUZWUkTTa7TGJRExGSUeTxBPrv/OWrKAj4WEKCa5PTTCbCBByFFDlcdIge2+xyfFkdLzdJ27QFtPiOWq4xx9o47malt2PWhBj63Aw+533qDKusTKUDsnvp1hbin+s1IwHQ0SHWulo2eYzrEgada305g1P8qsRoojpm4zMjDOTEhAXVaDz67HqfmxTpUSyyzP9DN8s4UzPWlWC3fwL469xWv1bkotquwZAQFAgcZajGvbB7x9+DNMPUuMfvn3fLa8mYbKIkrzDGikOPFYkngijYQalc1AnvUBSepnQBbwEUipGPGIn+X5Ltp7JxlftKOs1iEsBQhORwiLIqIoko748Q930XnpJlOaZjzNe3jn2E7KjQKGbMj93YdCn4em7AAHjycxWy9xoqWLoW6BeCRIuMSGQUiQjKdIqyzoihrYXOCiOE+/7iW5IOXS/PcMkFgYZqrvO65dPMH//PUF2hctSJ7tvLu3FJdBQIrHiEYiRJJqtA4PJZt2sbvRS0WxA4dei0qRReO/P0NCTMaIx8KEV1dYmg+wtBIlnFKithSQn2/H6TChU6nRqJWo1mMG6n3IAj6CdHSZ1SU/czNjDAwHWIyrEcx5lLiMaJVAOkUqlSIpqlAbbFjdpZQWmLDo1TlUvYhIYor46irRWIJYWkChMWAw6jBo1c91vF4WUCajZFXnTObVQxZQJqNkvJmSTqdJJpOk02n0en1ubEQppRHjy9yemWVhJUnCVU+pQ4ND/5DGkpQCcYXpgXEWViSk8k14rUqsuTIN6DmRMQHT6TTxeJxgMMjy8jLpdJqKioqsPwFTEtOIiRCRuV5unb9I20iU6J4y3tlsw6F/cL5FSkdIhXq5efJL2sYVKD+o5Ze1OlnATPxTSZKYnp7m6tWr/P73v2dkZIT8/Hz+/M//nOrqaoxGYybCeizSIT9L4+1cPf8lX57u5FawgKr6JOHkw65KEVueZvyrv+fMuW5uJurZGpGIZ2Lw9Sn54YAbQRDWtYB4oQLGYjEWFxdpbW3l5s2bdHR0cP36dZaWlqiqqiISiWTdST73I6gNaG0uSiqdWM4LpEdXiSZF1hpG/YF0cILF8ZtcGl1hai5CWhMjkYbsvtN7uXr1Kj09PSwvL9PY2EhNTQ1FRUXPLOPz3xlBkkin0ywtLTE1NUVfXx//+I//eFc8s9mM1+tlw4YNmM3mrG8DKg12LCV1bHHO0PltLwP9Kw+Z5CyBGCU4M8TEQA/DGjcKrR+nQDZnp9ekpaWFf/qnf2JsbIz333+fN954g61bt5Kfn4/BYHjqvRyfu4DpdJpgMMiJEyf48ssvaW1tZWlpiUQicfcQlWPHjnHo0CEKCwtzY3cpARBUKBRKHvp7kZIQHaK3d44bPXp2HXeT7hljcPRFBbp+LC0tcfv2bUKhEL///e+5evUqDQ0N/NEf/RGNjY1PvZvtcxFQkiRSqRQdHR1cvnyZ7u5uenp6GB4eZm5uDp1OR11dHXv37mXjxo1UV1cDd84HyRYUCgUajQaz2YxOp7vvr99PAnzoJM4Uqdgyk99dYzasQ7F5F7WFk/TplQw918ifD0ePHkWv13P+/Hl6enoYGxtjeXmZcDhMY2MjW7duZffu3dhsticqDZ+LgNFolKtXr3Lq1CnOnj1LV1fXPYfkKZVKzGYzeXl5xGIxenp66OnpeR6hPDUKhQKVSkVjYyM+n++JtzATo4uE/f109QaJFpZR0VRPkXEOQ3a3MB7Irl27KCgowO12c+HCBW7dusXU1BRnz56lr6+PgYEBgsHg3VOZ8vPzH6vDsu4CiqLI/Pw8f/Znf0Z7ezuiKP5sv794PM7Nmzdpb2/P2pRLOp0mkUjwp3/6p3z44Yds3br1Ca6WSASGud15lmuK19hcVM/BMjWacHbe6+Og0WioqamhsrKSo0eP8sUXX/DrX/+avr4+xsfHmZiY4KuvvuKdd97h/fff5/jx44+1X+K6C/iD9alUinR67TxDMplEFMWs3wNapVJhNBqf8KwSCSk8wPCYn0s9Lja95qG+2o5aWH1kv+OH9NRf//VfMz4+Tjwef5bwnwuSJBGLxfD7/YyPj7O6unr3vJF0Ok1LSwtDQ0P85je/4U/+5E/YsWPHQ3dgfS5VsMlk4t1336Wmpob5+Xl6enpYWVkhkUggSRJKpRK3201NTQ1ut3uNNlbmEQQBpVJJc3MzeXl5j3+hJBGbbGegvY2T362wUa9macxCByGIdXFjaIqpgIaVb37LmdVNpDZ6aK7K+/5SiWAwyMmTJ+nr6yOZfGhyMStIp9N3a7h0Os3U1BRTU1MIgsD+/ftpaGh4sQIKgkBeXh5/8Rd/wezsLK2trfzN3/wNfX19BAIBotEoWq2Wmpoa/vAP/5B9+/ZRVFSEVqvN+hLx0UiASHikl8muC1y9Oc2Nzi/vLMeURCBGaClCPCmg/Ls/Z7T/T1h5/9g9AkqShEKhwGKxZOUBjT/IlkwmicfjhMPhe2o6pVKJRqO5O6z6qLzuc73DvLw89uzZQ3l5OdevX+ebb77hs88+I5FI0N7eztzcHJ9//jmHDx/mrbfeoqSkJMfPBhEAJcaGo7yu24B5V+jHbrK4Cok+vvnna/RNq7G8+6842NzIgc3Fd69WKBR4vV7+6q/+isXFxaw73Rx+rILb29v55ptv6O3tvef84dLSUnbv3s2HH37Ixo0bKSgoeOj3PVcBNRoNTqeTvLw8rFYrBQUFeDwe2tvb7/ac/H4/y8vLBAIBPvzwQ0pLS3PgfLjvt3P4vsSSJLjbzxIENPnVlBtLcVQmf1zAIy5BRMHM5TEWVnU4t+yneaOL2mLT3W8VhDt7ZW/bto1YLJZ1Ai4vLzMyMsLg4CAjIyMsLy8jSRIWi4Xi4mK2bt1KXV0dW7ZsYe/evRgMhkeW4i+kjBcEAY/HQ0lJCfv37+eLL77g9OnTXLp0iUAgwOXLl5mdnWXXrl04nc7sFlBMko6HCS8FCYWjRJJx0sFFQqtmInEDBq0Spd6GRW/D8tPr0gZYdWAz6tBpDBicJeQ79dhN9+ZlBEFArVZnXU0wPz/PxMQEFy5c4JNPPmF4eBi4U8uVl5ezfft2PvrooydOWb3QRoZCoUCv13PkyBEaGxvp6+vjH/7hH+jo6MBut2e/fIAUWSA83cWVS5e52TvK8GIc9Xdf0ep4nXx9Ddt8mTvy4Hny8ccf88knn9DT00MoFEIQBNxuNx999NHdzobVan3ikawXKuAPKRqLxYJOp8NqtWIwGPD7/Wg0GkpLS7N/KE5jQuusoKLpF/zSsp3dSyIKdw0V5cUU2R+yDarCBLom9v1LC96DKgw1GorXYZPvF8Xt27eZmppiYWGBLVu20NzcTHNzM42NjXi9XhwOx1N9b9asCZEkKWuT0jLwq1/9irNnzzI/P8+BAwc4cOAA27ZtQ61WP9N7yxoBZbKbUChENBpFFEUsFsu6pc1kAWUei3Q6fTent55HkskCymSUHJ2bIfOyIAsok1FkAWUyiiygTEaRBZTJKLKAMhlFFlAmo8gCymQUWUCZjCILKJNRZAFlMoosoExGkQWUySiygDIZ5X8DWHWGtrzFvy8AAAAASUVORK5CYII=)
maths-General
maths-
In
if AD is bisector of
and DE bisects
find ![left floor B E D.](data:image/png;base64,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)
![](data:image/png;base64,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)
In
if AD is bisector of
and DE bisects
find ![left floor B E D.](data:image/png;base64,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)
![](data:image/png;base64,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)
maths-General
maths-
In given figure
and
if
then find ![∣ C D B](data:image/png;base64,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)
![](data:image/png;base64,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)
In given figure
and
if
then find ![∣ C D B](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACwAAAAPCAYAAACfvC2ZAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAMyZLetQAAAY5JREFUeNrVlTFIA0EQRY9DgthZpBARQcRSbEQs7ESCiISAhUgQewsLIVhZ2ImFWNjIEYKIIGIhYmdtG1JYCCKWNkEkSIqA/oUfGJabu+GuiR9ek/uZ+7s3sxsE+TUFjkET/IAPcARGPV8X/Ao64AZMKnWdv8d6b+AejMUZq+DaGHYfPIAlEPK3CbAH6sI3zQX1FfLluwxU8er6/oCbUM8TuAYujAsrgyvl2Qb4FgvW/BWthiXwDD/TkDHwIb+GJtce856/5nkaoJQ18Ak/u1WuV9cTnj+BZc9f5q7PgSjpfZbAL+wzq161gaHeQdHzy+EsJRVPCxxygq0K+VJNI+BT8Re4889sw0yBCxwSqxb4yTVte8Mb59/i0Zm5JTrcGYs22YOaWmA2xV9NOpEsgaOUqZc6AzvKs1OS5o+4kMyB3e3UBgfiRhsGaywuJ/7OGxrXUivgEZzH1Jb+Is/pJv+XOXD/Nmqwn900f4FbsOr52mLiexwwdwEsKnWlv8ss43lOiYHTvwvsjpDLQQ33BwCuZEArnm+5AAAAbnRFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtbz4mI3gyMjIzOzwvbW8+PG1pPkM8L21pPjxtaT5EPC9taT48bWk+QjwvbWk+PC9tYXRoPsPziCQAAAAASUVORK5CYII=)
![](data:image/png;base64,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)
maths-General
maths-
In the diagram, if
and
are Equilateral then find ![text C end text X Y](data:image/png;base64,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)
![](data:image/png;base64,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)
In the diagram, if
and
are Equilateral then find ![text C end text X Y](data:image/png;base64,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)
![](data:image/png;base64,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)
maths-General
maths-
if
then the triangle is
![](data:image/png;base64,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)
if
then the triangle is
![](data:image/png;base64,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)
maths-General