Maths-
General
Easy
Question
If TP and TQ are the two tangents to a circle with centre ‘O’ such that then
,is
![](data:image/png;base64,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)
- 60°
- 80°
- 70°
- 9°
The correct answer is: 70°
insufficient data
Related Questions to study
Maths-
In the following circle, ‘O’ is the centre .If ![C A B equals 35 to the power of ring operator end exponent text then end text left floor A B C equals](data:image/png;base64,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)
![](data:image/png;base64,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)
In the following circle, ‘O’ is the centre .If ![C A B equals 35 to the power of ring operator end exponent text then end text left floor A B C equals](data:image/png;base64,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)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAI8AAAB9CAYAAACbOTCBAAAZcElEQVR4nO2deVxTV97Gn4QkiMDQoIIssiiKUcYRUBStC7S1juBGbcfyqqMo0g6+jtvbmY5aaW2tu061Vlw6ra20VevWKValOjqiloJrKwhRUQRENgVZk5vn/YNCxYVCvJAE8/188gfhnt957r1Pzjn3nk1SWlFFALBpo4AZMw1xr7K63t9SA+kw0wowm8eM3pjNY0ZvzOYxozdm85jRG7N5zOiN2Txm9MZsHjN6IzO0AGOmuLgYZ86cQWZmJnJycpCdnY3s7GwUFBRAo9EgJSUFbm5ucHJyglKphIuLC5ydneHi4gI3Nzf4+vqiY8eOhj6NZsNsnvtIT0/HwYMHkZSUhKSkJKSnpwMA5HI5nJ2d64zh6+sLmUyGy5cv48UXX4RcLkdRUREyMjLwn//8B9nZ2aisrAQAuLm5oW/fvggICMBzzz0HPz8/SCQSQ56maEie5u4Jkjh37hx2796N3bt349KlS7C2tq672X379kXfvn3RqVMnSKWNr+FJIi8vDykpKXVGTEpKQlFREdzc3DB27FiEhYVh4MCBsLCwaMYzFJcHuydQWlHF0ooqPk2UlZUxNjaWPXv2JAA6OjoyKiqKBw8eZFVV81wLQRCYmJjIefPmsXPnzgRAV1dXvv/++ywoKGiWPMWm1iu1n6fKPNnZ2fzb3/5Ge3t7ymQyhoeH8/jx49RqtS2qQ6fT8ezZs4yOjqa1tTWtrKwYGRnJS5cutaiOpvJUmqe0tJRvvfUW27Zty/bt23P+/Pm8efOmoWWRJIuLi7lq1Sp6eHhQKpUyKiqKt27dMrSsR/JUmUer1XLTpk10dHSktbU1Fy9ezLKyMkPLeiQajYaxsbF0cHCgjY0N3333XaPT+tSYJyMjg/3796dUKuX06dOZm5traEmNoqSkhAsWLKCVlRW9vLx46tQpQ0uqo9WbR6fTcePGjWzbti179OjBlJQUQ0vSi8zMTA4dOpRSqZQLFixgdXW1oSW1bvMUFRUxJCSEADh79mxWVFQYWtITIQgCV61aRYVCQT8/P169etWgelqteTIyMujt7U0HBwcmJCQYWo6oXLx4kSqVih06dGBiYqLBdDxonlbRt3X8+HH069cPcrkcSUlJeO655wwtSVR8fHxw8uRJ9O7dG8HBwYiLizO0pBpMveTZuXMn5XI5R4wYwbt37xpaTrOi0Wj4+uuvEwCXLl3a4vm3qmprz549lMlknDp1aou/6DMUOp2Oy5YtIwCuXLmyRfNuNeb597//TblczsmTJ1MQBEPLaXGWLFlCAPzggw9aLM9WYZ4jR47Q0tKS4eHhT02J8ygWLVpEANy6dWuL5Gfy5rl69Srt7e05cuRIajQaQ8sxKDqdjnPmzKFcLueJEyeaPb8HzWNSQzLKysowYMAAaLVanD59Gra2toaWZHAEQcCIESNw/vx5pKSkwMXFpdnyMtkZoyQRERGB69evY+/evWbj/IKFhQW++OIL2NjYICwsrG4QWktgMubZsmULduzYgbi4OHTt2tXQcowKe3t77N27Fz/99BPmz5/fchmbQpvnxo0btLW15YwZMwwtxahZv349JRJJs3WmmlybhyRCQkKQmpqKixcvwsbGxtCSjBadToegoCDk5+fjzJkzaNOmjajxTa7N89lnn+HAgQPYsmWL2Ti/gVQqxdatW5GZmYnFixc3f4bGXG2VlZXRycmJU6ZMMbQUk2LZsmVUKBS8fv26qHFNqmN0/fr1KCoqwjvvvGNoKSbFzJkz4eDggJiYmObNyFhLnuLiYiqVSs6bN8/QUkySzZs3UyqVijqo3mQazAsWLMC6detw9epVtGvXztByTA6tVouePXvCx8cHX3/9tSgxTaLBXFFRgQ0bNmDmzJlm4+iJTCbDwoULsWfPHly7dq1Z8jBK83z11VcoKSlBVFSUoaWYNC+//DLat2+P2NjYZolvlOb56KOPMGrUKLi6uhpaikljaWmJqVOnYuvWraiqqhI9vtGZp3Z+9+uvv25oKa2CqKgoFBYWitbuuR+jM09cXBzc3d1b3ThkQ+Hh4YEXXnihWcY9G5V5SGL//v0YM2ZMk1alMNMwY8aMQUJCAsrKykSNa1R36PLly1Cr1Rg1apShpbQqRo4ciaqqKiQkJIga16gWd9q/fz/s7OwwaNAgQ0t5BNXIPrUPh9PKoCktg93gVzGut71x/foeg6urK3x9fbF//36MHj1atLhGde7fffdd3UpbRkW1Gl/+dRKWXfHBy1MmI3KKL87MGIMlZ6t/O62REBoaigMHDoga02jMo9PpkJycjAEDBhhaygMUI+GN8Vj/zDwsn6CCNQDY9sHowCJs/yzJ0OIaTWBgIHJzc5GTk3PftzqU5Wfhxo0byMrKRXGlrkkxjcY8arUapaWl8Pf3N7SUelT/uBpvfN0V/zuzD34dHUPcvVuKqkrx3500F7XXNSUlpd73vPctZgROQuyPP2DnG6Mw8p3jjY5pNOZJTk6GRCJB7969DS3lPqqR9MUO3Bw4FiPu7yXR/oQTSWXo3b+XwZQ1FQcHB7i6uuLIkSM4fPgwsrKyAEjR5k428nqGYfqYMYiY5o/c7TsbHdNoGswpKSno3r27kQ340uB65i24/t4bVvd9W5qwCV+WjcOHYzsYTFlDCIKAa9eu4dKlS0hNTa375OTkYO3atTh58iROnDgBQMCVg8egGBoLx5Kf8OX6/8Jx2rJG52M05lGr1VCpVIaW8QCW6NbdE2XFxRDwy8W6cwzvxCTjxbUH8IKBJ3BUVlYiPT29nkFSU1ORnp5e1x3h4OAAlUoFPz8/JCXVtNE+//zzmocS3Q0cOlIKj+HHsHJuHPZXRyJudt9G5280QzICAgLQr18/rFu3zqA6HkSXdwB/n7IZlpP/F0FyNU6dSEObkLmYFeyMlloEt6Sk5CGDpKam4urVq9Dpahq57u7uUKlUdZ8ePXpApVLB3t4eABAfH4+QkBC0adMGFRUVNed2+2O8FJKK/0tcgQFIxNw/TET5ulR89LzlI3U8OCTDaEqenJwcODk5GVrGQ0gd/4jl8UOQl34dpb/riyFjbZrFNCSRn5//UFWTmpqK7OxsADXDLLy8vKBSqfDKK6/UmcTb2xvW1taPjZ2Xl4cpU6agf//+OH36NMrKymBtbY2Sowm41ufP8FMAKLyJnDJH+Dg1/uyMwjw6nQ55eXlwdnY2tJTH0BaO3VRwFCGSTqdDVlbWI01SVFQEALCyskL37t2hUqkwZMiQOpN06dIFCkXTagj+MllSoVAgJiYGw4cPR25uLjpaZGH9lqOw8BiI7RtScPF4Mp5ZtBGzejbeEkZhnsLCQmi12la1T4NGo4FarX7IIGlpaSgvLwcAKJXKumpm7NixdSZxc3MTrW/vww8/xIEDB/D999/D09MTAHDr1i14PRuEBYdzsaD2wL80PbZRmKe2Dm6o6DVWysvLkZaW9pBJMjIyoNVqAQDOzs5QqVQYMGAApk6dWmcSBweHZt2H4ueff8a8efPwxhtvICgoCLdv3wbw6/V+UozCPLUXWSYzCjn1KDu7Ea+/vhJHi90wOGIGgtoV1TPJ9evXQRISiQSdO3eGSqVCaGhovcarnZ1di+uurKxEeHg4evbsWTf7pPb61l7vJ8Uo7hZJQ0sAUKMjNzf31/bIpWR8v+NzpBfpAFxB3N+PYpdCgW7dukGlUmHSpEl1BunWrRusrKx+M4+W4h//+AcyMjJw9uzZh9pJYl1vozCP2L+I30IQBGRmZj6y0VpSUgIAsLGxgaq7F9q1lQJFNY/DFu6TUabebJQl5P0cOnQIa9asQWxsLLy9veu+r72+YnU8G8VVqJ1TLfbyIFVVVcjIyEBqamo9o6Snp9fl1b59e/To0QO9e/fGq6++WleSuLq6QiKRoPLnbZgzay1OlHbGy+++b/TGKSgowOTJkzF69GhERkbW+1/tOTf1ie1xGMWVaNeuHSQSCfLy8vRKX1pairS0tIdKkqtXr0IQBABAp06d0KNHDwQHByM6OrrOJO3bt28wdpuek7Dh8CS9dLU0JDFt2jSQxJYtWx5qjNdeX0dHMV46GNQ895CfL0WHDm0hk8ng4ODwwHCB+owZMwbXr19HdHQ0tFptPZPcvHkTQM1CR7Uv0caNG1dnEOPrM2seNm/ejH379uHgwYOP/FHUXl+xXsYayDw63N47Dwtux2Dj9LaQouZxNjc3FyQf+RLt3LlzuHfvHiIjIyGTyeDj4wOVSoXp06fXmaRr166iFcmmRlpaGmbNmoXZs2dj2LBhjzwmNzcXbdu2xe9+9ztxMjXEXHUh+xvO8HXhqztrtgTKzMyki4sLAdT72NnZMTAwkBEREVyxYgX37dvHadOmEQBPnjzZopqNmaqqKvr5+bFXr14N7rfx1ltvsUuXLnrn8+Bc9ZYveYRM/PubEjh72EPaoSZ7d3d3+Pv71/XhzJ07F3PnzkXHjh0fqrdDQ0ORnp6OyMhInDlz5pEljXDrJLZvS0B2u6H4858Hw/mXsxSyT2HPUTUqIEOnAS9haOfWUUotXLgQly5dQnJycoMLOqWnp8PDw0O0fFt4MJgWl3cfAIb1g+KOHRwcfu2EGz16NGQyGcLCwrBq1Sq8++67j3wTKpVKsWnTJqjVamzYsOHhLKrOY/uWU7DwckHu5nBM/PAqaprMd3F401rsOngIhxJ+RpHMdDaGbYgjR45gxYoVWLlyJXr27NngsSkpKeKO1GzJaqvyp21c8NZafvrJ2xzVOZSbC3/937lz5wiASUlJ/OSTT2hjY8Pu3bs/dr+sSZMm0dfX9+F/CBpqflnX+3bsGL6wSk0tSW3aGk74nxX8Lu0OW8t68YWFhXRxceGIESOo0+kaPPbOnTsEwK+++krv/Ay3iHfpGe7ckcwSkqzYzYnef+be+6rn6upqtmnThhs3biRJXrlyhQMGDKBcLufSpUsfWun922+/JQCmp6c/MjvhTjJXR8fwaAlJCsz7fjWjXw1i13aufHHZ6RodJoxOp+NLL71EBweHRu1JevToUQLglStX9M7TIOYpu3qIS0aP4BvHCikIBfxp+1R2tw/muyezWXnfcf3796+3hJxGo+E777xDCwsLDhkypN4yaVVVVVQqlVy8ePHDGWqv8dv3pzG4s5I9/ppQzygVlzZxbOcAvn3BtFeP//jjjwmA3377baOOX7p0KZVK5W+WUA1h1NsHLFy4kB07dnxoI5LTp0/Ty8uLdnZ2jIuLq/t+woQJfPbZZx8bT3t5BYf6/JXH6p2ehudjnueU3aa7C2BGRgatra2btLTw4MGD+corrzxRvka9JuHIkSNx69YtJCcn1/u+X79+OHv2LMaNG4fw8HBMmDABd+/ehZ+fHy5evPjYjj4L165Q9eoG93rPlALKZL4Y1Mc0n7Q0Gg3Cw8Ph4eGB5cuXNypNYWEhTpw4gZEjR4qqxSi6J2rx9/eHk5MT9u/fj4CAgHr/s7GxwZYtWxASEoLIyEj06tULS5Yswbp16yAIQl2fk3BlK6Lm/gDPkAFoV5CLgX//K9yRh7gpo/F52xEIcrOApe9fEN3JqH43jebtt9/G+fPn8eOPPza6Fz8+Ph4SiQQjRowQV4wxVVskGRkZSR8fnwaPyc7O5rBhwyiRSPjmm2+yqup+/VUsuHKBF9Jyee++2k8ovclLF9W8XflQOJPh2LFjlEgkXLNmTZPSjRs3joMHD37i/I26zUOSCQkJBMAff/yxweMEQeA///lPWlpa0t/fn2lpaS2k0DAUFxfTzc2Nw4YNa9LmdLdv36ZCoeD69eufWIPRm0cQBHbr1o0RERGNOv7ixYvs1asXrays+NFHHz3R04SxotPpOH78eLZr1445OTlNSrts2TJaW1uLsv+q0ZuHJFevXk0rKysWFRU16viKigrOmTOHADhy5Ejm5eU1s8KWZdu2bQTAffv2NSmdIAj09PRkVFSUKDpMwjxFRUW0srLi6tWrm5Tu8OHDdHZ2poODQ6Pffxg7V65coa2tLV977bUmp42PjycAnjt3ThQtJmEekoyKiqKzszPLy8ublK6goIAvvfQSATA6OpplZWXNpLD50Wg0DAwMpLe3d5PPQ6fTMTAwUJSGci0mY56srCxaWlpy+fLlTU6r0+n4r3/9izY2NlSpVDxz5kwzKGx+YmJiKJfLH9u/1xD79u0jAP73v/8VTY/JmIck58yZQ6VSyeLiYr3Sq9VqBgYGUi6Xc9myZSa1E3JiYiKlUqlePx6tVksfHx+GhoaKqsmkzJOfn09bW1u++eabesfQaDR8++23aWFhwaFDh4q+jVBzcPfuXXp6ejI4OFivPeO3bdtGiUTC8+fPi6rLpMxDku+//z7lcjkvXrz4RHFOnTrFzp0785lnnuGXX34pkrrmYeLEiVQqlczKympy2tu3b7NDhw6cPHmy6LpMzjzV1dX09fVlnz59nngf9ZKSEkZERBAAJ06cyDt37oikUjzi4uIIgLt27dIr/fjx4+no6MjCwsLfPriJmJx5yJqBYjKZjEuXLhUl3tdff017e3u6u7uL2qB8UjIzM2lnZ8epU6fqlX7Pnj0EwN27d4usrAaTNA9JLlq0iJaWlqI9Od28eZPPP/88pVIp58+fz+rqalHi6otWq+WgQYPo5eXF0tLSJqfPycmho6Mj//SnPzWDuhpM1jxVVVUcOHAg3d3dmZ+fL0pMQRC4Zs0aWlpask+fPrx8+bIocfXhvffeo0wmY1JSUpPTVlZWMjAwkB4eHqJdm0dhsuYhydzcXDo7OzMoKOiJ2z/3c+HCBfr4+LBt27aMjY1t8f6xH374gTKZjO+9955e6adPn04rKyvR3iQ/DpM2D1kzqlChUHDmzJmi3uSKigrOnj2bADhq1Cjevn1btNgNUVpaSi8vLw4aNEiv91AbNmwgAH7xxRfNoK4+Jm8ekvzkk08IgDExMaLHPnToEJ2cnOjo6Mj4+HjR4z9IREQE7ezsmJmZ2eS027dvrxvT1BK0CvOQ5AcffEAAXLJkieixCwoKGBYWRgCcMWNGk/vXGsvOnTv1LjV27NhBCwsLRkdHt1g122rMQ5IrV64kAK5YsUL02Dqdjh9//HFd/9jZs2dFjZ+VlUWlUsmJEyc2Oe2ePXsok8kYGRmp1xtofWlV5iHJJUuWEABnz57dLH1XarWa/fv3p1wu5/Lly0W5WYIgMCgoiJ6enk0epLVu3TpKpVJOnjy5RY1DtkLzkDVzmGQyGUNDQ1lSIv50Po1Gw5iYGFpYWDAoKIg3btx4onjLly+nVCplYmJikzRER0cTABcuXNjixiFbqXnImhmR9vb2/MMf/kC1Wt0seZw8efKJ+8dSUlIol8u5aNGiRqfJz8/n8OHDqVAo+Nlnn+mVrxi0WvOQZHp6OlUqFW1sbLh58+ZmaUiWlJRwypQpdf1jTal27t27R29vbwYGBjb6PVV8fHzd05+hu1JatXlIsry8nDNnzqwbz9yYedz6sGvXLtrb29PDw6PRNzUqKoq2traNmi9+7949vvbaawTAsLCwZn1z3FhavXlqOXz4MF1cXKhUKrl69eoH5naJQ1P6x/bu3UsA3LZtW4MxBUHg9u3b6ebmRltbW3766adGMyPkqTEPWTOQftasWZTL5ezSpQt37dol+o0QBIGrV6+mQqF4bP9YTk4O27Vrx/HjxzeY//Hjx9m3b18CYHh4uNENXHuqzFNLRkZG3aD4Pn36cPv27aKXRI/rHxMEgcOGDaObm9sjh9MKgsD4+Hi++OKLBMBnn32WP/zwg6jaxOKpNE8tiYmJHDVqFCUSCZ2cnLh48WJR20QVFRWcNWtWvf6xNWvWUCqV8vjx4/WOvXv3LtevX09vb+860+zdu9doqqhH8VSbpxa1Ws1Zs2bR1taWUqmUQ4YM4dq1a0WrJmr7x/DLwpzz588nWfPIvXXrVoaEhFChUFChUHDSpEl6zY4wBA+ax2h2+jMEpaWl+Oabb7B7924cOHAA5eXl6N27NwIDAxEQEICAgAB4e3vDwqLp6xcWFBRgwoQJUKvVCAkJQXJyMk6fPg2pVIrg4GCEhYVh7NixcHBwaIYzax4e3OnvqTbP/ZSXl+Pw4cP47rvvkJSUhAsXLkCr1cLGxgaenp5wcXGp+3To0AEKhQIWFhYQBAFarRaFhYXIzs5GdnY2cnJykJmZWbf5Wo8ePRAQEIDg4GCEhoZCqVQa+Gz1w2yeRlJZWYlz584hOTkZmZmZyMnJqTNHQUEBNBoNtFotLCwsIJfLoVQq4eLiAmdnZ7i4uKBTp07w8/ODv7+/eItmGxizeczojdFuUNuqqMxC4v5DSL0HULCE0voZeI4Ohb/pbWTYIKa5tprRokNR4gq8On4FrvUYh2kRUxE5zhHHPv8PysXZ4sqoMJc8IiJc+wRTpxzEkP3fYUL3Xy6tchDC/iKBbytsFZjbPKJRiSMzfo+pVR/gp81/RCuroQA83OYxV1tiUX0eB4/eQb8XBrVK4zwKs3nEgvdQWmELe/tW2Lh5DGbziIW8N4YEaHAhJfOXXXZqqMq+jpzqx6YyacxtHhHRZe3HG69tRPnwKIz3fwblhXegdfDF8H5ureLJxPySsNmpRvH1K8iptIOblzNsW8e2XgDM5jHzBJiftsyIhtk8ZvTGbB4zemM2jxm9MZvHjN6YzWNGb8zmMaM3ZvOY0Ruzeczojdk8ZvTGbB4zevP/JX2A3aF3R5AAAAAASUVORK5CYII=)
Maths-General
maths-
The length of AC in the figure
![](data:image/png;base64,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)
The length of AC in the figure
![](data:image/png;base64,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)
maths-General
maths-
In the figure shown, PT and PAB are the tangent and the secant drawn to a circle. If PT = 12 cm and PB = 8 cm then AB is
![](data:image/png;base64,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)
In the figure shown, PT and PAB are the tangent and the secant drawn to a circle. If PT = 12 cm and PB = 8 cm then AB is
![](data:image/png;base64,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)
maths-General
Maths-
Find the value of ‘x’ in the given figure
![](data:image/png;base64,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)
Find the value of ‘x’ in the given figure
![](data:image/png;base64,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)
Maths-General
Maths-
‘0’ is the centre of the circle and ![B A C plus B O C equals 120 to the power of ring operator end exponent text then end text angle C O B equals](data:image/png;base64,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)
![](data:image/png;base64,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)
‘0’ is the centre of the circle and ![B A C plus B O C equals 120 to the power of ring operator end exponent text then end text angle C O B equals](data:image/png;base64,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)
![](data:image/png;base64,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)
Maths-General
maths-
In the given diagram
and
Find the value of DC.
![](data:image/png;base64,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)
In the given diagram
and
Find the value of DC.
![](data:image/png;base64,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)
maths-General
Maths-
In the given figure, find the values of x y, and z.
![](data:image/png;base64,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)
In the given figure, find the values of x y, and z.
![](data:image/png;base64,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)
Maths-General
Maths-
ABCD is a quadrilateral. AD and BD are the angle bisectors of angle A and B which meet at ‘O’. If ![C equals 70 to the power of ring operator end exponent comma L equals 50 to the power of ring operator end exponent. text Find end text left floor A O B](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANMAAAASCAYAAADBs+vIAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAPUJuPDwAABD5JREFUeNrtWlFkXEEUHSsiqsqqiogIFRURFSoqqipERUVFWBVVEaWq+lEVqqL6EaWqHxVVVq2IqhAREdGfqIhYVaoiIiLko/pRUaIiYq1le6c5W5PJzNu3u/NmXrvvcD528vbt3Hn33DlzXxj7P/GcuAc+Z9WHao8/gsFEShMbwJUqS6hqiD8fpbkd7COJCmhAhY7ij8TkBGeJL4irxAPiN+IYMW54Qbwo4hTxDfEzmMRYkMnE444FnBB+YncVf7F5BpncecNieuDjmvPEFHEH6zVJbNNcmyHmoItt4ry05n8xQlwgXhaSqQkTmrAg5ATxrTT2kXhd+NyHMT82J12GzWkhroWoutqOv9R5hllMN4hZYo3HNU+Ic8RO5DxnP8RyUZEbq9LYmEobjxSJbBP18Ph1krjGFde+Ig56JNQ+WE4i8YWcComYXMTv2lKZElMcRXERz1SFUez0KnQrhMPv814aG5DHzmHLqnEoJr5ddkhjM8SrmkBnAprHUxSWMIjJRfyV7kx5oRBswxYtw+HIuIKEzeLaYYNiSqLgDBFfK/7Oc36ziJ3fk443qtzglrBXHHjp01uWevbxG/hdbLcydom1ivFa+NsgMO1RyUzF73ddXMRvQkwJnLubMTYMQYloJW4Q2/G5DQXChJi6cFwpOJ5txTU85+8Xuc8ijjxybsRQ+FMq3WzAD7pAMw7Wql0x5/G9bEDz2SI2WkjSLCrfB+JD4smQxF+sWPgRU7c0FlPMN6WxqpWKiefRF2kn/ArxilgXxK7Dd6nZsyWsw768IxUCzTi0d8uKxfeTTEHMOYZFsgX+4C9gV95UPHDb8Zu0ecWu+yGdj02JiVuxEWnsGfGe9JwPfDybX5rc4M6gh/gJdvGIZdgzWLlKsXkJVGYddjQ2py4gm8O7N0sObC7D2WjZcfw2xZQLoAHRil1IdTabLzHneW6+k3JD7qLehJ09Aq64E5Z3pBiqcUeRA3ivJvGCOIBz2zHB3CHjOH6bYspoDv+ViGnFo6iJLfKC7fRqPqTZ0db4IKypiFtM0QFPKbbGoNGvqMQyBpi6XT/B9K3hSjCOw7ILtCsOyrbjtykm7gAuSWOnKxDTHXb4ykAH/rrjmvB5weNZP2bHW+aq3FCe+5rROeI3iQtWog9f6AngQU35TNwldExqsD2P+hChn9/Os+Ndu1nNTmAas+g4FV4S9kJIA5biZz5taJBi4lV/Ec2eGHItXeac+AvqNU0Tp4Dbktha4IyGhB2rA9YuqXlmhdw4Axu4qrHhf24+CS+Zx+FrRlKzSewwf/+iFIegMzg0JossWiVi2vWwCbUGY0+gM5TDb/KWa6fF+MMgJobD+xxiSyOZy5nTNMTohUasuYgmrC1/Bj/Z4cvXLs33xdzIIIeC7vr+M5gKsFBEcGs9I1gEr4DrzO1/fESobEfNR8IKB/j2XB8tQwRT+A0iRI7k4asSqgAAARt0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bWk+QzwvbWk+PG1vPj08L21vPjxtc3VwPjxtbj43MDwvbW4+PG1vPiYjeDIyMTg7PC9tbz48L21zdXA+PG1vPiw8L21vPjxtaT5MPC9taT48bW8+PTwvbW8+PG1zdXA+PG1uPjUwPC9tbj48bW8+JiN4MjIxODs8L21vPjwvbXN1cD48bW8+LjwvbW8+PG10ZXh0PiYjeEEwO0ZpbmQmI3hBMDs8L210ZXh0Pjxtbz4mI3gyMzBBOzwvbW8+PG1pPkE8L21pPjxtaT5PPC9taT48bWk+QjwvbWk+PC9tYXRoPkdmIxQAAAAASUVORK5CYII=)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKIAAACFCAYAAADYWyOVAAAVdklEQVR4nO2de1RU5frHP8NNbpoI3lBxGDmaqGCoCBHe83aoyAE8SCKC144e9ZdHzV+y0lN54VRS6TJYpHhCUG6mdqgfanYyNbwQ3TBzQBDFg2AoINeZ/fvDJA1QLnPZo/uz1l6LNXvv93mG+c7zPu/77nleWUV1rYCEhIExe9BJW0sLffkh8QhSWVPX6mtNdOiHhESrkYQoIQokIUqIAkmIEqJAEqKEKJCEKCEKJCFKiIIHziM+FPXP7F7xv+wv0iAzMaNTl564DB/PjOAXGN7dVEsuSjwOdCwiqn/lh8OHKR8Wxry5Ifj79OHXzHU86zaRDV/9qiUXJR4HtNA1m9Jj6CSm/fkFgiLW8P7BLP5vqYatEes4UtXx1iUeD3SQI9rw1NJlTL+1n8Qva7TfvMQjiW4GK1YDUPQq53LhLTRAWVkZDQ0NOjEl8WjQscFKS6hvUHbTgie6WmMCvPPOO2zevBmFQsGAAQOaHAqFAisrK524ImEc6ESIFcdTybzlw+ox1gAMHDiQadOmsX79elQqFSqVip9++okDBw6gUqm4cuUKvXv3biJQFxcXBgwYgJ2dnS7clBARWhWipuYa2Z9Es+qVVPqu/ZyXHO/0/AqFgqKiIjw8PPDw8GhyX01NDZcuXWoU6cWLFzlx4gQqlYr8/HxsbGyaFeiAAQPo3bs3JibSdKixI3vQg7EPfR6x7hSr3McQfcUWGzMBjdCJnkPGEbR0HatnDsH2t8uKiooYOnQo5eXlbXZQrVZz5cqVRoHeFevdo66urrHLv1egAwYMQC6XY25u3mabEtqhLc8jdkyIrUSj0WBlZcW1a9e02s0KgkBZWVmzAlWpVFy/fp1+/fo1Eejdw9bW9uFGJNqN6IQId/LEpKSkZrtmXVFZWUleXl4TgV68eJHCwkIcHByaFaiLiwsODg7IZDK9+foo0hYh6mbU3AzOzs7k5+frVYi2tra4ubnh5ubW5Fx9fT0FBQX3CTQ5ORmVSkVeXh5mZmYt5qV9+/bF1FRawtQmeheiWDA3N8fFxQUXF5cm5wRBoLi4+L4IevToUWJjY1GpVFRWViKXy5vNS52dnbG0tDTAO2of6uKviPnnB6R8lct/66zo7jQYr+mhLJw7AXkn/fmhVyHm5eXpy1yHkMlkODo64ujoiK+vb5Pz5eXl9w2evvvuO9LT01GpVBQXFzdORTWXm3bt2tUA76h51IWJzBm/jNzxkbwR8xaDO1eSd+IT4t6PImnsWNYM1l/U11uOuG/fPnbu3ElGRobW2hQj1dXV5OfnNzt4ys/Pp0uXLs3mpXenovSXl1by7/lDmFP8GmcOzKf/vTNgdVVUYYNNBz9+UeeIjzpWVla4urri6ura5Jxareby5cv3ifPQoUONkVWj0TRZfbobVZ2cnLQ7FVWbxadHKhj7ZtD9IgSwsMFGe5Zahd4iYmlpKX379uX27dvSBHQzCILA9evXm4zu7/5948YNnJycmh08KRQKbGzaKJ2qBGb0Xk//T3/gXV/d/H5dlBHR3t4eCwsLrl27hqOjo77MGg0ymYwePXrQo0cPvL29m5yvqKhonIq6ePEiFy5cICMjA5VKxeXLl+nevXuLeam9vX3TLt/UGhvLKipuafT0Dh+M3oQok8kau2dJiG2nc+fOuLu74+7u3uRcXV0dBQUF90XQ06dPN05FWVhY3CdQHx8f/KZ7MGpoBduOnKbmz74Yepyvt64ZwN/fn4CAAF566SWttivRMhqNhqtXrzYKdM+ePdjZ2ZGcvJeyAwvwnJON37/2E+XXDwuAqgsceHcPFSHrCHHu2KhZtCVHjGkK51HBxMSEvn37MnbsWMLDwxk/fjwajQYwwf75aD55dxRnF7vT708ejPYchlN/X149KeBgq99VJb11zXBHiNnZ2fo0KfFAbBgatoPjoW9T/MtFrt62oJfLQPp01v+qkd6FmJaWpk+TEq3BxIbeg9zpbUgX9GnscZlLlGg7ehWiXC6nqKiI+vp6fZqVMAL0KkRbW1vs7e0pLCzUp1kJI0DvSxwKhULqniWaoHchSnmiRHNIQpQQBZIQJUSBJEQJUSAJUUIU6F2ITk5OlJWVUVUllQqT+B29C9Hc3Jw+ffpw6dIlfZuWEDEGeVRamkuU+CMGEaL0OJjEHzGYEKWIKHEvkhAlRIEkRAlRYFAhCoK0VbTEHQwixF69elFXV8eNGzcMYV5ChBhEiCYmJlL3LHEfBiu5IE3hSNyLQYUoRUSJu0hClBAFkhA7QuVPpG9ZQcTsOSxeF8eJa2pDe2S0SEJsL+pcPpgxmVUnuuA9fRJ/Kokl6NlXONz2jRMk0PMP7O/F2dmZgoICNBqNUZapqzu+g/dyJ/HPn9bzQmcgyJM6X2/eTV7DhPm9pI2w24jB/l92dnZYW1tz9epVQ7nQIW7+/DPX5MNws/7tBVM5bq42qM6rkHYdbDsG/eIa8xSOpbU1ptWVVDYuDjVQVVWLtY2NFA3bgcGFaKx5ovUzExl16RMSsioAUF/aR+JXdoyZ+KTh8h0jxqD/M2MWoql8PtFbThIww5V/y3tSfek6/RbuItbX0CUvjRODCzErK8uQLnQACwaHf8z3gVfIVZVi2W8wA+x1U4v6cUDqmjuISec+pB08wFcH9xjaFaPG4BHR2IX42WefsXHjRgDc3d156qmnDOyRcWJQIcrlcq5evUptbS2dOulxvy0tcenSJUJCQoiNjaWoqAilUsnZs2eljc7bgUG7ZisrK3r27ElBQYEh3WgXNTU1BAQEEBwcTEhICKtWrcLNzY3Q0NDfalRLtAWDT3kZa/e8fPlyzMzMePvtt4E723fs2rWL3NxcNm3aZGDvjA+DT3kZoxDj4+NJTU3l3Llz96UUXbt2JTU1FR8fHzw9PZk0aZIBvTQupIjYRnJycvjrX//Knj176NevX5Pz7u7ubNu2jeDgYIqKigzgoXEiCbENlJeXo1QqWbNmDc8++2yL182ZM4cZM2YQGBhIXV3rN715nJGE2EoEQSAsLIxBgwaxdu3ah14fHR1NfX09K1eu1IN3xo/Bc0RjqYMTFRVFTk4OZ8+ebdVja5aWlqSkpDBixAi8vb0JDg7Wg5fGi8EjYt++fbl58ya3bt0ytCstcuzYMTZs2EBqairdunVr9X1yuZyPP/6YhQsX8uOPP+rQQ+PH4EI0NTXFyclJtFHx6tWrzJw5k+joaDw8PNp8/7Rp01ixYgVKpZKKigodePhoYHAhgnjzxPr6eoKCgvDz8yMiIqLd7URGRtK/f38iIiKk6hYtIAnxAaxevZqqqio++OCDDrVjampKQkICp06dIjo6WkvePVoYfLAC4hRicnIyO3fu5OzZs1hZWXW4PQcHB1JSUpgwYQIjR47kmWee0YKXjw5SRGyG8+fPExERwe7du1EoFFpr19PTk6ioKIKCgvjvf/+rtXYfBUQhRDFN4VRWVqJUKlm6dCnPPfec1ttftGgREydO5C9/+QsNDdLPrO4iCiGKpUydIAgsWLCA3r17s2HDBp3YkMlk7Nixg9LSUl577TWd2DBGRJEjdu/eHYCSkhJ69uxpMD+2bdvGf/7zH86dO4epqe52cbexsSE1NRVPT0+8vLzw9/fXmS1jQRQRUSaTGTxPPHnyJKtXryY5OZkePXro3N7AgQPZuXMnYWFh/PLLLzq3J3ZEIUQw7IDl+vXrBAYGsmnTJry9vfVm98UXX2TBggUolUpu376tU1s3b94kIyODY8eO6dROe3nshahWqwkODmbMmDEsWbJE7/bfeust7OzsWLRokU5y5LNnzzJv3jzkcjlRUVHU1NRo3YY2EI0QDTVyjoyMpLi4mJiYGGQymd7tm5mZsXfvXjIzM4mJidFKm7dv32bnzp14enoyY8YMFAoF58+f5+jRo0ydOlUrNrSNKAYrcCciHjx4UK82Dx48yPvvv09WVha2trZ6tX0vvXr1Yt++fUydOhUPDw9GjRrV7rbS09NZsmQJw4cPJzIykmnTpul04KUtRCVEfUbEvLw8QkNDiYuL48knn9Sb3Zbw9fXlH//4BwEBAZw7dw57e/s23V9SUsKSJUv49ttvSUpKwtfXV0ee6gbRdM3Ozs5cvnxZL5O81dXVKJVK5s6dS2BgoM7ttZYVK1YwatQoQkJCUKtbV/RTEAT27NnDsGHDcHZ2Jicn56EiFGWeWFFdK7R06Bt7e3shPz9f53bCw8MFHx8foa6uTue22srNmzeFgQMHCq+//vpDr21oaBAiIiKEoUOHCllZWQ+8Vq1WC5mZmcKQIUMEMzMzbbn7QB6krT8eouma4ffuWS6X68xGXFwchw4dIjs7G3Nzc53ZaS9dunQhLS0NLy8vRo8e3eLgoqGhgbCwMIqLizl16hQ2NjbNXldaWspHH31ETEwMNjY2KBQKra6fawvRdM2g+zzx3LlzLFu2jL179+Lo6KgzOx1lyJAhfPjhh4SEhDS7r3V9fT3BwcGUlZVx6NChZkUoCAJxcXG4urqSm5vLxx9/zLfffsvo0aNF+QUUVURUKBQ6K9x548YNlEolkZGRjBs3Tic2tMmsWbM4efIkAQEBHD9+HEvLO+XuamtrCQoKQhAE9u/f32yplosXL7JgwQIqKys5fPgwbm5u+na/zTwWEVGj0RAaGsrw4cP5+9//rvX2dcXbb7+NmZkZy5cvb3xt6dKlmJiYkJKS0kSEDQ0NbNmyBS8vL/z8/Dh58qRRiBBEFhGdnZ2Jj4/XersbN27k559/5syZMwaZtG4vFhYWJCcn4+Hhgbe3N926dSMzM5OcnBwsLO6vxVhTU0NgYCCVlZVkZWWJMg98EKITorYjYmZmJps2beLrr7/miSee0Grb+qBfv34kJibi7++PpaUl6enpdOnS5b5rKisr8ff3x8HBgbS0NFHmgA9DVF2zk5MTJSUlDBo0iPnz5xMfH49KpWr3GmxhYSHBwcFs377daLqo5pg0aRKvvvoqarWaYcOG3XeuvLycKVOm0L9/fxISEoxShCAyIXbq1AlHR0c2btyIu7s7GRkZjBkzhsGDBxMfH099fX2r26qtrSUwMJDAwEBmz56tQ6/1w6uvvoq3tzdhYWGNX8yysjImTpzIyJEjiY2NNYqlvJYQlRDhzsi5U6dOLFmyhKSkJIqKiti+fTu7du1i0KBBxMTEUFtb+9B2XnnlFTQaDVu3btWD17rHxMSEhIQEcnJyiIqKQhAEZs+eja+vL1u3bjXKTZPuRXTe/zFPlMlkTJgwgS+++ILdu3eTnp6Oi4sLH330UYtddkJCAomJic2OLI0ZOzs7UlNT2bBhA8uWLaO0tJSoqCijGoC1hKgGK/DgAcszzzxDRkYGp0+fJiIigi+++IIPP/wQa2vrxmt++OEHFi1aRHJyMv3799eX23rDw8OD9957j3nz5vHll18abU74R0QfEZtj1KhRnDp1CplMhpeXV+Oj9rdu3UKpVLJy5UrRPnenDcLDw/Hx8WHNmjVtypvFjFEKEcDa2pr4+HgWL17M008/TVpaGuHh4SgUCtatW6cHTw3L559/TnV1NatWrTK0K1pBlF1zXl4egiA8NPeRyWQsXryYESNGMHnyZExNTblw4YLRJ+6twdrampSUFEaOHIm3tzdBQUGGdqlDiO4Tc3R0pKamhl9//bXV99TW1lJXV4cgCGRnZ+vQO3GhUCjYvXs38+bNIzc319DudAjRCdHExAS5XN7qFZZr164RFBTEu+++S3p6OrNmzeL777/XsZfiwc/Pj7/97W8olUoqKysN7U67EZ0QofV5Yn19PTNnzmTKlCksWLCAsWPHsnXrVvz8/Ix2H+j2sH79ehwdHZk/f77Bq2W0F6MW4tq1aykvL2f79u2N+eSsWbNYuHAhfn5+j00hdVNTUxITEzl+/HiHS+gZCtENVqB1QkxLSyM2NpYzZ87cN48Id5bDjh8/TnR0tFE99tURunfvTnJyMpMmTWLEiBE8/fTTD79J/TO7V/wv+4s0gAzTTk/QZ9izvLRwJiPt9RujjDIiXrhwgblz5xIfH4+Li0uT8zKZjK1bt7J582aKi4t16aqo8PLyYvPmzQQGBlJSUvLwG9S/8sPhw5QPC2P+/AhmzxiNWeb/MHl2LIV63sXN6IRYVVWFUqlk8eLFvPDCCy22MXDgQObNm8fq1at15aYoefnllxk3blwbyt6Z0mPoJKZNm87zgQt5PcIbdf5Frui5Yp6Bhajm/K4lBCjnsT3793zubtWHP26uKAgCixYtwsHBgTfeeOOhrb/22mscPXqUEydOaN1zsSKTyYiJiaGkpITIyMhW3KGhougHcnK+5fTRf/H6Rxd4etFsRuh5D3TD5ogN35EQnUz2LQ05O18i4qlxdOLO4r6lpSXFxcX06dOn8fIdO3Zw5MgRsrOzMTN7uOu2trZs2bKFpUuXGt3T2R3hj2Xvnn/++ZYvFqrJ2rGEBUkyUNdw41oldtkn+L7SjRF6LH5h0IhYdyaJ9NJpvPnmn6k+mMix3wpiNVemLisri5UrV5KcnNymGorBwcHU1NTw9ddfa9t9UTNo0CDi4uKYM2cOKpWq5QtlNkx84xjffPMN35zJ4ZfzyUz9cTWL3vkeffbOBhRiLaeS9nNrSiDP+QUwpeFT9h75fUL2XiGWlpYSEBDAm2++iY+PT5usyGQy5syZw+7du7XqvTEQEBBAeHg4SqWS6urq1t1kO4zRbrYU5ec/JkKs+Yqkg7VMVY7HxnYCAdNMyUj6jPLfTt8VolqtJiQkBC8vL5YtW9YuUyEhIaSkpLT+w3iE2LRpE507d+bll19uxWR3A9fPxBGX2YD3uJHoM000mBCrjiRx8EZ/upZ8QmLiJ5R0lVP9+V7+fePO+btC3LBhA4WFhcTFxbU7x+vTpw8jR47kwIEDWnwHxoG5uTl79+4lIyODuLi4phcIFaRH9KVbt27YdXXAdWYCNsuS2THbUa/ikFVU17b4NbG11NV3ooL00CdZesGb8X+6u4dJNb8cPUrPN3NJD+tJxqefsmrVKgoKCjhx4gSurq4dspiQkEBSUpLeS9+JhS+//JLnnnuO0NBQSkpKSEtL07nNypo2rGwZpAjTjSQhqNdQYc039fe8WC+cXjtM6Dp1h3BFLQiZmZmCmZmZAEiHlg9/f3/dfbb3IPIiTBquH9zL0Z7+rPK417wZw4NexHnbPlIvz+fl8eO5efOmVi1Pnz6d5cuXM3nyZK22a0wIgiDKnxcYqGuWeBxoS9csyiU+iccPSYgSokASooQokIQoIQokIUqIggdO37RpQlJCogNIEVFCFEhClBAFkhAlRIEkRAlRIAlRQhRIQpQQBZIQJUTB/wNSkgkTytfrtgAAAABJRU5ErkJggg==)
ABCD is a quadrilateral. AD and BD are the angle bisectors of angle A and B which meet at ‘O’. If ![C equals 70 to the power of ring operator end exponent comma L equals 50 to the power of ring operator end exponent. text Find end text left floor A O B](data:image/png;base64,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)
![](data:image/png;base64,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)
Maths-General
maths-
In the unit Square, find the distance from E to
in terms of a and b, the lengths of DF and AG , respectively.
![](data:image/png;base64,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)
In the unit Square, find the distance from E to
in terms of a and b, the lengths of DF and AG , respectively.
![](data:image/png;base64,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)
maths-General
maths-
ABCD is a Parallelogram,
and
If DC=16cm, AE = 8 cm and CF = 10 cm, Find AD
![](data:image/png;base64,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)
ABCD is a Parallelogram,
and
If DC=16cm, AE = 8 cm and CF = 10 cm, Find AD
![](data:image/png;base64,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)
maths-General
maths-
Two Rectangles ABCD and DBEF are as shown in the figure. The area of Rectangle DBEF is
![](data:image/png;base64,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)
Two Rectangles ABCD and DBEF are as shown in the figure. The area of Rectangle DBEF is
![](data:image/png;base64,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)
maths-General
Maths-
In the g iven f igure, ABCD is a Cyc lic
and
then ![A B C equals](data:image/png;base64,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)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJEAAAB2CAYAAADImXEZAAAefElEQVR4nO2deViUVfvHv8POwMiqgCi7AhqJWwqKsghCgWKayqtILuAGmf3sFdO35c01NSsXXFJ81RLTohGTHUVAEkVUCEMRCUiUHYVhnbl/f5QkMoOzPCzifK5r/nnOOfe5H/x61vs5h0VEBBHUNTaLSpIjpw2FnnZAzsuPXERyZEYuIjkyIxeRHJmRi0iOzCgxYURTTYUJM3J6AdLMyOUtkRyZkYtISvi/H0XwrJlYsi8Lr/pqmlxEUtGKW999jdNZN8DdFY7LTT3tT88iF5E0NF9DRGQFvDZtwlsNUTh5kdfTHvUochFJQdOvEfj58VS84+ONWVNb8cupRNT1tFM9iFxEEtOIlIgoNHnOhIuGJlxneUExOgIxNT3tV88hF5Gk1CciIqoKptpl4J48CW6ZNswaYnHqfFVPe9ZjMLJO9CrxJO4UoskaDqUJOF/617P+NqpIPHUWj+a+C4NX8L+lXEQSUY3zEfHQ9eciYssbbX+81mvrMcr9FH5+uABLB756Knr13lgGBOVROJVkAN9Zo9r971Oyn40Z5un44cfiHvOtJ2ExEZQm3/boO0iz7SHvzp6htrYW9+/fR0FBAYqLi1FVVYWqqipUV1eDz+dDR0en7WdsbAwLCwtYWFhAX18fLBarp93vMV7plujRo0eIiYlBdHQ0Lly4gMrKSpiYmMDS0hImJibQ0NCAuro61NXVwWKx0NjYiIaGBvB4PDx48AC//fYbHjx4AFVVVUycOBFeXl7w8vKClZVVT7+a1EjTEr1yIqqpqcGpU6dw7NgxZGRkwMHBAd7e3vDy8oKNjQ2UlZXFshMREYF58+YhISEBpqamiI+PR1RUFBITE2Fubg5/f3/Mnz8fgwcP7uI3Yhap4uqpE540NIn1exn47bffaO7cuaSqqkqjR4+mvXv3UkVFhVS2vv32W2Kz2aSqqkoffvhhu7T6+nqKiIggd3d3UlRUpClTplBSUhITr9AtiPtv/uyvz4uouLiYFi1aRCoqKrRw4UK6ceOGTPZ27txJOjo6tHDhQpo2bRrp6uoSj8cTmrewsJDWrVtHGhoa5OnpKXPd3YE0IuqzU/zW1lZs3boV1tbW4PF4uHXrFo4cOYIRI0ZIZY+I8PHHH2Pbtm1ISkpCbm4uAgICYGJigpMnTwotY2pqis2bN6OgoAC2trZwcHDAsmXL8PjxY1lerffBhCp7Gzk5OTR27FgaNmwYXblyRWZ7fD6fQkJCaPDgwZSXl0cVFRWkoqJCNTU19O2335K9vT0JBIIX2iksLKQpU6aQiYkJxcXFyexXV/DKd2cCgYD27NlDbDab1q1bR42NjTLbbGlpoQULFpC1tTUVFRUREVFERAQ5OTkRERGPxyNdXV1KSUkR28cDBw4Qh8OhkJAQam5ultlHJpFGRH1mdtbQ0IBly5YhISEBp0+fhqOjo8w2Gxsb4efnh8LCQsTGxmLAgAEAgIULF8LKygrr168HAKxduxaFhYU4deqU2Lbv37+PWbNmgc1m4/Tp0zA0NJTZXyZ4ZWOsS0pKMHHiRBQVFeH69euMCKiurg7e3t4oLy/HhQsX2gRERIiLi8PUqVPb8q5YsQJcLhd//vmn2PbNzc2RmpqKIUOGYPTo0cjIyJDZ557ipRdRcXExJk+ejPHjxyM+Ph4GBgYy26yqqoK7uzuUlZURFxcHbW3ttrScnBw0Nzdj1KhRbc9MTU3h5eWF/fv3S1SPuro6Dh8+jPXr18PDwwPp6eky+94TvNTbHsXFxXB2doa3tze++uorsFgC5B17D+t/LoHg2YyKlpi7cytmmyi+0ObDhw/h4eEBGxsbnDhxAioq7bvqmJgYeHh4QEGh/f+/kJAQ+Pn5YcOGDVBVVRX7HVgsFlasWAE1NTV4eXkhOjoaDg4OYpfvDby0IiotLX1OQCwAfFTnJCCh5h0c+3A82taeFbQwVPfFAiosLMSUKVPg7OyMAwcOQFGxY5nY2FgEBAR0eO7i4oL+/fvjhx9+gL+/v8Tvs2jRIgCAl5cXEhISMGbMGIlt9BhMjNS7Gx6PR2+88QYtXrz4ual1E6V/aEu6c36geglt5ubmkrGxMf3f//2fyOl6XV0dqaqq0sOHD4Wmh4WF0dixYyWsuT179uwhIyMjKi4ulsmOtEgzO3vpWiIiwsKFC6Guro59+/YJ3T1vLUrBd+F1/zSzCnoYNd0bI7SFDwEzMzPh6emJ999/Hx999JHIHfmLFy/C1tZW5Lhr/vz5CA0NxZUrVzBu3DhpXg8rV67E7du3MW3aNKSkpEBDQ0MqO93JSzew/vzzz3Ht2jX8+OOPHcYrT2mt+B3paWlIe/q7fBNFIr7quXTpEtzc3PDJJ59g/fr1nYZ0xMbGwtPTU2S6pqYmFi1ahN27d0v0Ts/z1VdfQU9PD/7+/iDRKzC9Byaatu7i0qVLpKGhQTk5OSJySNadnTt3jjQ1Nel///ufWPUPGTKELly40Gme/Px8UlVVpdLSUrFsiqKqqopMTExo7969MtmRlD69d/b48WMsWLAAGzduxPDhw2W2FxERgblz5+L48eNYsGDBC/MXFBSgtLT0hWtQlpaWmDJlCg4ePCiTfzo6OggPD8e///1v3LlzRyZbXc1LI6LVq1fD1NQU7733nsy2Dhw4gKCgIPz888/w9fUVq0xsbCxcXV1FdqHPEhISgv3796O5Wbav9F1dXbFo0SL4+/ujtbVVJltdChNNW1eTmJhI6urqdO/evRfkbKL0D21IWYVDOjo6//wGuNC231qJiGjbtm2kq6tL6enpEvkwffp0sbsWPp9PQ4cOpZMnT0pUhzDq6+vJwsKCdu7cKbMtceiTG7AtLS1kZ2dHn332mUx2BAIB+fv7U79+/ejWrVsSlW1qaiIOhyOGiP/hm2++IUdHR0ndFAqXyyUtLS169OgRI/Y6o0+OiQ4dOoSamhqsWbNGahsCgQArVqxAfHw8ACAxMVGi8unp6TAwMICFhYXYZQICApCdnY3r169LVJcwfHx8MHbsWPznP/+R2VaXwIQqu4q6ujrS09OTqVtobm6mf/3rX2Rra0slJSWUlZVF/fv3p88++0ysGCAionXr1lFwcLDEdQcHB9O7774rcTlhZGdnk4qKCuXm5jJiTxR9rjvbv38/WVtbE5/Pl6o8j8cjb29vGj16NJWXl7c9v337Ng0aNKjT1elnGTlyJEVFRUlc/++//05qampUVlYmcVlhzJ49m5YtW8aILVH0KREJBAIaNmwY7dmzR6ryjx8/JmdnZ5o0aRLV1tZ2SL9//z5ZWlpSUFAQtba2irTz8OFDUlVVpSdPnkjlh4eHB23evFmqss+TmppKbDabqqqqGLEnjD41JkpKSkJJSYlYazjPU1FRAVdXV2hoaCAmJgb9+vXrkMfMzAwpKSlIS0uDv78/WlpahNqKj4/HhAkToKmpCfDyEbUlED4TR+K110Zj8oxg7Er4o9Pj9kJCQhAWFsbIFN3R0RE2NjY4cuSIzLaYpNeK6NixY1iwYAE4HI5E5f78809MnjwZVlZWiIyMhLq6usi8RkZGSE5Oxt27dzFz5kw0NjZ2yBMTE/NXAFrrHRzyc0bgOTbe3vQdoqKO4mPPFnznNxn+xwvBF1GHl5cXlJWVweVyJXoPYbBYLKxcuRLHjh2T2RajMNG0MU1rayvp6+uLHbf8lPz8fDI3N6elS5d22kU9T21tLU2aNIlcXV3bdVt8Pp/69+9PN2/epJrIBWRsNItOlD47PuNT4X4v0jVfTvGd7LPs3LmTJk+eLNG7iKKyspKUlJSosLCQEXvP02e6sytXrkBRUVGi4KycnBxMnDgRs2fPRlhYmNBYIFH069cP0dHRUFFRgbu7O6qrqwEAWVlZUFJSgp3dUFyNS0bj5NmYbvjsn0wBprNmwaHyIuJvie7UFi1ahKtXr+LWrVti+yQKXV1duLi44JdffpHZFlP0ShFFRUXB19dXbCFkZGRg8uTJWLVqFbZu3SrV4QpsNhtcLhfGxsZwcXFBWVkZYmNj4eHhARaLj0cPq6BnZIQOmx6aRjDiVOHhI4EwswAAbW1t+Pv7Y8+ePRL7JYy3334bUVFRjNhigl4poqSkJHh5eYmd193dHRs3bkRoaKhM9aqoqCAiIgIjR46Ek5MTuFzu36EfimBrqIH3pA4dAjP4dahrVIOGRufCDQ4OxnfffYeqKtmP5XvzzTdx6dIlkZOB7qbXiYjH4yErKwsTJkx4YV4ul4vp06cjLCwMy5cvZ6R+JSUlHD58GC4uLsjIyIClpSUAFYwc8xpqM1KR89wkq/FqKjL5dhhj1/lBEK+99hrGjRvHyMzKxMQEenp6uHHjhsy2GIGJQRaTXLhwgWxtbV+Y7/jx46SpqUlnz55ltP6n/PTTTzRw4EAyNDSk7Oxs4j/6iQJM9cnp42Qq+3ts3fIgjtaM0aGhK2KoRkybZmZmEg36ReHn50e7du2S2c7z9ImBdVpa2gtbob1792LlypWIioqCj49Pl/gRGxuLxYsXY/Xq1XB2dkbmH4OwO3IjLH6Zg2EWI+EwfgQs7BYibfRXiNw+FVpi2PTx8YFAIGBkUDxhwgSkpqbKbIcJel2MdV5eHsaOHSs0jYiwZcsWfPnll0hISBCZT1aICLGxsThx4gQmTJgADocDd3d3nD17FkevFaPmjzwUVrOgZ26NwVrizwKVlJSwYsUK7N69G9OmTZPJx9dffx0HDhyQyQZjMNG0MYmTk5PQfSqBQEBr1qwhIyOjTsJjmSEvL4+0tLSopaWl7dnx48eJw+HQ+fPnZbJdUVFB6urqMm+kFhcXE4fDEXsTWVz6RHdWWFgIc3Pzds/4fD6CgoLw008/ITU1lZHw2M6IiYnBlClToKT0T0M9f/58HDt2DLNnz8bp06eltq2npwc/Pz+Zp/sDBw5EU1NT25pWj8KEKpmiubmZFBQUqK6uru1ZU1MTzZ49m4YPH04PHjxgrK7OePPNN+nQoUNC0+Li4ojD4dCRI0ektp+VlUWamppUUyPOcFw0Q4YMoczMTJlsPI80LVE3j4n4yDu2uu0zZ5aiKrSM7eA+fynmjNFDVVUVVFVV27614vF4mDVrFiorK5GcnAw9Pb0u97CxsREXL14U+V29u7s7oqOj4e3tjSdPnkgV821vbw97e3scPXoUq1atktpXfX19lJeXS12eKbq5O3v6mbMd3g0MxGL/tzFOKR4fePjjUJEANTU1UFNTA/DXccBTp05FY2MjEhISukVAAJCamgpTU9NOD+ycMGECEhMT8fnnn2PTpk1SfRsWEhKCPXv2QCAQvdL9ItTU1FBT0/M30/TImEhxwGuY4uWFN6e9g6WfLoYD/z7y/2xFbW0t1NTUUF5eDhcXF+jq6uL8+fMS7+TLwos+UHzKqFGjcOnSJezbtw+hoaESC2nGjBloaGhAbGystK5CTU0NtbW1Updnih4RkeBJCXJu3sSNq0k4/ukR3HFcBv/RKqipqYGioiKmTp2KYcOG4cyZM20tU3fRFvohBra2tkhNTcXp06exYsUKiVoVZWVlLFu2TKavZV/hlojQkLEfwUFBWBr8b+zg3kFdZRYuZ9dBIBCAxWLh999/R3BwsNhnSjPFn3/+iXv37mHSpElilzE3N0dKSgqSk5MREBAgUfBZUFAQLly4gLt370rjLlgsFvh8UZFM3UcPiIgFDbeNuHjlCq5cuYabd3/Hac/fsHbZl6jQ0AKfz0doaCg++OCDbv8OPTY2FpMmTeo0kE0YxsbGuHTpEnJzc/HOO++gqUm8S2EHDBiAd955B3v37pXGXTQ2NrY7gKun6AXrRJqwG/c6NEvuo5ajjcbGRqxZswbFxcUSnYHIBLGxsWJ3Zc+jr6+PpKQkVFRUwMfHB/X19WKVCwkJQXh4OOrqJL8AVC6iv2ktv4bDh+PR6uAMx/5/iYjNZmPr1q1Yu3YtGhoausUPPp+P+Ph4sQbVotDS0kJsbCxYLBY8PDzEGq+MHTsWtra2UoW8vsIiIjyJXIxBurrQ1dGG/rA5+E5jFU7v98cwfV00NDSgqakJfn5+MDQ0xJdfftktXl29ehWampqwsbGRyQ6bzcbZs2dhaGgIFxcXsdZxnk73Je2+a2pqoKurK62rzMHE6iWTGBoaUl5eHhERXb58mTQ1NbtlpfrTTz+lJUuWMGbv6fnXNjY2Lzz1rKmpiQwMDCg+Pl5s+wKBgNhstshT26SlT+ydmZmZ4f79+wAABwcHvPXWW9iwYUOX1yvu+pC4KCkpITw8HC4uLnByckJBQYHIvCoqKli6dKlE0/2ysjIIBIK2o5F7kl4tIgDYtm0bIiIikJWV1WV1VldXIzMzE25ubozaVVBQwN69ezFnzhxMnDgRubm5IvMuXboUsbGx7d69M+7fvw8zM7NecVlfrxORlZVVuz+2qakp3n//faxevbrLpvxPY5O6YpDKYrGwdetWhISEYPLkycjMzBSab+DAgZgxYwb27dsnlt3c3Ny/Q3d7nl4nonHjxiEtLa3ds9DQUOTl5eHnn3/ukjolWaWWlnXr1uGTTz6Bm5sbUlJShOYJCQnB4cOHweOJOGDyGdLS0jB+/Him3ZQOJgZZTFJeXk5KSkr0+PHjds8PHz5MlpaWjFz68iwCgYCMjY0ZuY1IHI4ePUocDodiYmKE+jJq1Cg6ePDgC+1YW1tTYmIi4/5JM7DudSIiIho6dGiHmUprayvZ29vT9u3bGa0rJyeH9PT0GAmeF5czZ86QpqYm/fjjjx3SwsPDyc7OrtOIxbKyMlJUVJT6kInO6BOzMwCYNGlS24FUT1FUVMSuXbuwceNGRmNoYmJi4O7uLtEXs7Iyc+ZMnD59GgEBAR0WGefOnYvS0lJcunRJZPmEhATY29v/dchEL6BXisjHx0foAQjOzs5wdXXFxx9/zFhdTE/txcXT0xPnz5/He++9127vTE1NDYGBgZ1O97lcrsyB/ozCRNPGNDwej9hsNt2+fbtDWn5+Pqmrq1N2drbM9dTX15Oamlq3hd0K4+rVq6Snp9fuDKOioiJSVVVtu6TvWRobG4nD4dDNmze7xJ8+052pq6vDw8MDkZGRHdIsLS2xcuVKRnb5k5OTMXToUBgZGclkRxbGjBmD5ORk7N69G+vWrQMRYfDgwfD29kZYWFiH/BcuXICenh7s7Ox6wFvh9EoRAcC8efNw6NAhofEyGzZswI0bN3D+/HmZ6uiprux5hg8fjpSUFERERCA4OBgCgQAhISE4dOhQhzOT9u/fj3nz5vWKRcY2mGjauoKWlhYaNGiQ0BkM0V83+lhbW8t0h2pXTZOlpbi4mGxsbMjf35+am5vJzs6OwsPD29Lv3LlDKioqVFJS0mU+9JnuDPjna1FRu/hLliyBsrKy0CZfHP744w+UlJSIdXBEdzFo0CAkJycjOzsbc+bMaQufpb+77a+//hq+vr4wNjbuYU+fgwlVdhXl5eWkrq5OSUlJQtPj4uJIR0eHKisrJbZ94MAB8vb2ltXFLqG6upocHR3Jzc2NtLW1KS0tjUpKSojNZlNqamqX1i1NS9Trb6PesGEDzp07h8zMTKFrOT4+PrCwsMDXX38tkd23334brq6uCA4OZspVRqmvr4evry9yc3Mxfvx4sNlsVFdX49y5c11arzS3Ufd6ET158gRWVlb4/PPPERQU1CE9Ly8PI0eOxPXr18UOKGtpaYG+vj4yMzNhZWXFtMuM0djYiClTpiAtLQ0KCgq4cXYjDoVfRYmABQUlVfQzsIK9y9vwm26P/gytlfbJK805HA4+++wzrF+/HpWVlR3Sra2tERQUJNG1Db/++iv09fV7pYAEAgGuXLmCjz76CKNHj0ZWVhbU1NTg6ekJa71qJCTUwO7dJVg4zxcTjKsR/x93vO72X6T05Cf5TPSPXU1LSwu98cYb5OfnJzS9srKSdHR0KDY2Vix769evp+XLlzPpokzweDw6d+4cBQYGkqGhIQ0cOJCWLVtG0dHRtGnTJjIwMKCysjJqSv+QbHXn0A/PnlRbd502OenQkJUJVCeyBvHpMxuwwsjPzydNTU364YcfhKZ/8803NHz48HbHwYhizJgxxOVymXZRIsrLy+no0aM0Y8YM0tDQIDs7O9qwYQNlZGS0XUORnZ1NqqqqbTv+QkVERI/PzCMD48X0S4PsfvVpERERHTt2jPT09IRuUzQ3N5ONjQ3t27evUxtlZWWkoqLSIdSkO7h79y7t2LGDnJycSEVFhZydnWnXrl1Cr8BqamqikSNH0gcffPDPMxEiasn6D43Q8KCwR9LdgfIs0oio152U1hnz589HYmIiZs6ciaSkpHafWCsrK2Pnzp0ICAiAn5+fyCjF+Ph4ODg4dMv3/QKBABkZGeByueByuSgqKoKnpycCAwMRGRkp8pAKIsLy5cuhpKSEzZs3v7AeflUlalW0oM3umSFurx9YPwuLxcKBAwfAYrEQFBTUYe/My8sLo0aNwsaNG0Xa6OqtjoaGBpw7dw6BgYFtIa9VVVXYsWMHKioqcObMGfj7+3d6ysmuXbsQFxcHLpcLVVXVF9T4BKk/xuPxhKmYxGb2XcSGiaatu3n06BGZmZnRli1bOqTl5OSQuro63b17t0Man88nAwMDun79OqP+lJeXU3h4OPn6+hKbzabhw4fTunXr6Ndff5X4mq1ffvmFOByOUB/bd2d8aii9RhGhrmRs4EI7bjAT8dnnx0TPkp2dTTo6OkLvZV2+fDn5+vp2eJ6VlUUGBgZS35/2LHfu3KHt27eTk5MTKSsr06RJk2jnzp1CxSsuiYmJxOFwKDIyUmh6U/qHZKOsQhwdHdLR1iJtg6E0Yc4GishhLsLxlRIR0V+xOMKEVFZWRlpaWh22S7Zs2UL+/v5S1cXn8+ny5cu0du1asrW1JTabTTNmzKCjR4+2u5BPWp4KiInLh2XhlRMR0T9C2r17d7vnO3bsoBEjRrSLnXZ2dqYTJ06IbZvH49HZs2dp8eLFNGDAADIwMKAlS5ZQVFQU8Xg8xt7h6TmQPS0goldURER/CcnIyIhWrVrVtk7U1NREVlZW9O233xLRXzcxqqqqvvAqzbKyMjpy5Ejb+MbW1pZCQ0MpPT2dkW7wefbt20f9+vUTuf7V3byyIiIievDgATk6OpK7u3vb9ZaRkZFkYGBAjx8/Ji6XS6NHjxZaNi8vj7744guaOHEiKSsr08SJE2n79u10586dLvO3ubmZVqxYQWZmZpSVldVl9UiKNCLq9RuwktDc3IzVq1cjOjoaYWFh8PDwgJubG8aPH4/a2lpoa2tj06ZN4PP5uHLlCrhcLs6ePYs//vgDHh4emD59Ory9vdG/f/8u9TM7OxuBgYHQ0tLC999/322HmoqDNBuwfaYlepYzZ86Qrq4u+fn5UXx8PKmrq9OgQYNo8+bNtGjRIhowYAANGDCAFi9eTFwul+rrO7k2kUHq6+tp7dq1xGaz6YsvvuiS7lFWXvmW6FlKSkoQEBCAa9euYciQIcjOzoaZmRl8fX0xffp0jBs3rtu+NWtpacHRo0fx3//+F5qamvj+++8xcuTIbqlbUuQt0XPw+XyKiIigoUOHkra2Nm3fvr1b98yam5vp+PHjZGVlRYaGhrRr1y5GZ3VdgbwlEgGfz8eZM2ewadMmFBYWIiAgAMHBwbC2tu6S+h4+fIiDBw9i//79UFBQwJo1a7B06VKJDxTtCaRpiV6qDVjx4KM05SB27DmDlNuP0KzeHya24/HmgqXIuHkTmZcvIywsDCNGjIC9vT3c3Nzg6uoKR0dHqf+RW1tbcf36dSQlJSExMREpKSlwdnZGWFgY3nrrrXYXzfRF+lhLxEfRyQC4rLoNl483ItjLFpy6AlzmHsbudDv871wobP8eBlVUVCAhIQEXL17ExYsXUVBQAHNzc1hZWcHS0hJmZmbQ09ODrq4udHV1oaioiOrqalRVVaGqqgpFRUW4d+8e8vPzce/ePejo6MDZ2RnOzs5wd3eHqalpz/4ppKRPxlhLRN15BA4PQOmGazgbaNouRKG5vh7Q0Oh4m/TfVFZWIj8/HwUFBSgoKEBRUVGbaKqrq8Hn86Gjo9P2MzY2hqWlJSwsLGBhYYGBAwf2rg8KpeSVF1FT0krYznqETffPwE+c+zTldKBPBupLQmtpKSr0B2NQ7x+/9in6lIgU2RpQq3+Cx9Lf/iRHCvqUiFRGjcVrT1KQeLXxxZnlMEafEpHC4Hl4f3Yrwt9fi3PF//Tt9XfOYuOn3+F+z1/I0yfpUyKCgh6mfc3FrrGZWD5iMIaMGoc37Exg6rQO6aQPzZd/8tQr6VOzs2cR1Jfibv4D8FQMYTXUGJzuO5LxpeaVn+LLkZ0e2/YQ5/BuOb0XRUVFMT5NEg0jLZGcV5u+NbCW0yPIRSRHZuQikiMzchHJkRm5iOTIjFxEcmTm/wGl0Wls7geQOgAAAABJRU5ErkJggg==)
In the g iven f igure, ABCD is a Cyc lic
and
then ![A B C equals](data:image/png;base64,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)
![](data:image/png;base64,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)
Maths-General
Maths-
In the f igure be low
and
If
and
then which of the following is correct ?
![](data:image/png;base64,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)
In the f igure be low
and
If
and
then which of the following is correct ?
![](data:image/png;base64,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)
Maths-General
Maths-
If ABCD is a square, MDC is an Equilateral Triangle,find the value of x .
![](data:image/png;base64,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)
If ABCD is a square, MDC is an Equilateral Triangle,find the value of x .
![](data:image/png;base64,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)
Maths-General
Maths-
If PQRS is a Square and STR is an Equilateral Triangle,find the value of a
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJMAAAByCAYAAABX/eMyAAAVSklEQVR4nO2dfVzN5//Hn92sUmlu1iRfos3XxEoay2xlHqFC5SbpfuZmGnO75ov1bTJqGPtaaoTOSWWS3E1ZYfjJihlGNrdxmPvQtBR1zu8P0xjqnNPndDr1eT4e/jmf63pf75PXua7r8/pc1/XRUygUCkQaDCVl97XWtr7WWhZpcIhiEhEMUUwigiGKSUQwRDGJCIYoJhHBEMVUjyg9s5XosYN527ErXZ1cGTJxCTsuaO9WX1UMayxReZKkqbPZdEkO+i9g/tIrvDlsLKP7dcDkryJFRUVs2bJFs5k2MIqKiigtLWX27NkYGBhQcSoB/74R3BwWzfyUPrSrPEd27Az8XfNYvDuV4PYG2k65RvRqNC3v5/FJN3d+8k0ivGcl149vJXZRNu0W5ZIWaoMBcOTIEVxcXBg0aFDdZK3jlJeXk52dTUlJCWVlZRgbl7EptAsfln7Bz+sCsXo0XsgvsHxQd75ov47jcW6YKhFbm6ZlzT0TAAa83NUNj4GmMHAwdsXdeDd5GzeCP6z64m3atCE1NVVzmTYQSktLcXNzw8XFhczMzIcflh8ke08Zrgu9/xYSgL4Nw4f34pNFOfxy3w1nI62krDRqzJkqKS97gKFJE14QZ1wqUVFRwciRIzExMeHLL7987MI1rt5qSevWT6vFvHVrmhZd5Zq8DhNVEyV7Jjk3TuwmJ+s+Vw6nsXCNIcFJ3jTXbG4NCoVCwfjx45HJZOzZs4dbt279fdHAFDOTUu6WPD3jqCwp4V6TZpjp1WGyaqJk31LGya1L+SouiawLrzJt6w985dFCvBVUgcjISHbu3ElWVhYvvvjikxeNHHmjazEH9h2n4okLZRzcdwi5fU/sX6jDZNVEyZ7JlLdnZPCtrzJTQJF/Eh8fT3x8PLm5ubRu3frpAvrt8P9oKEvGTWVu/w1EuliiTwVXciL4OMWQ0LThvKwDv1wlxSSiLhkZGcyYMYMdO3bw73//+zml9Hl5yNdsvP4RY/3skFq9ipX8d07eaEPg1xv5om/TOs1ZXXRA77rL3r17CQ0NJS0tjZ49e9ZQuimOH0j46eJp9iR/zcy+LanoNJJwv04Y10m2tafmnsnImQUnijSYQjl7okP438EHz7imx4vv/ofEj3posH3NcOzYMby9vVm2bBnu7u7KVzRshk2XN/jX5OkMdpuMS8+NtDe0ZJjkWya9Vr+Ny3owzBnS0f19xnaTAxX89FUoy80/5ZsxnTFAD+N/2Wg7QZWRyWR4eHgwc+ZMQkJC1Iph0D6I1ONuFBw5Q7FJG+xerd9CgnohJgOsHQdgDUAZ9781xrTZG/T3cKGee3TP5NatW7i7uzN8+HDCw8NrF8zEii7OVsIkVgeIcyYBuXfvHoMHD8bBwYHFixejp6cD5pCA6JyYfvrpJxwcHCguLtZ2Kk9QUVGBv78/TZo0QSKRoK+vc3/aWlMPhjnV2LBhAydOnKC8vFzbqVShUCiYMGECMpmM3bt3Y2ysK/dfwqJzP5/8/Hz69OnDqFGjqC+7tKKiosjJySEzMxMLCwttp6M1dEpMhYWF7N+/H6lUyrVr14iLi1OiViUnkyYxfKgfszddoep5afH3zAn8nJ1/1i6nFStWsGzZMr7//nusrHRnsqwJdEpMSUlJDBw4EGtra1JSUoiMjKSgoKCGWpXcPr6TvUcOsnLWQnJLH34qLy9k/3c/cv5Z9paSbNq0ifDwcLZt20bHjh3VD9RAqGdiMsFbeoVT/3vaFpDL5UilUt577z0AOnXqRHR0NAEBAZSVldUQVw+LftP4wDyFuavPUSlApvv27SMkJIS0tDR69NA9U1UT1DMxPZ+9e/dSWlr6hJs8ZswYbG1tmTVrVs0BDDvz4WxPTi2JIbuWN4IFBQV4e3sTFxfHgAEDahesAaEzYpJIJAQFBfHCC3+vxdDT0yMhIYF169aRnZ1dQwQ9mg/6Dx+13cy8b06g7lqzS5cu4e7uzsyZMwkKClIzSsNEJ8R09+5d1q9fXzXEPc5LL72ERCJh1KhR3Lhxo/pABp34IMKXG7HzyLil+p3g7du3cXd3x9fXl+nTp6tcv6GjE2JKT0/Hzs6Orl27PvN6v3798PPzY8yYMTXaBebvhjPdfifRsQWoMve+d+8eXl5e2Nvbs2jRokbnbiuDTohJIpE8s1d6nPnz53P+/HlWrFhRfTB9G0I+DaUiWUKekhs5KisrCQgIwMTEpNG628pQ7/8qZ8+eJT8/H39//2rLmZiYkJqayqxZs/j111+rL/vmVGb2M6NciZHucXc7IyMDIyNdfPxcN9T7xylSqRQvLy9atGhRY9kuXbowZ84cAgICyMvL++uxhhHOC45z5vGC+lYErL9GgBLtz507l5ycHPbv30/Tprqx4lFb1Oue6Z/ekjJMmDABa2trIiIiat1+QkJClbvdqlWrWsdr6NRrMf3www88ePCA/v37K11HT0+P1atXk5SUxM6dO9Vue8uWLYSHh5OZmcmrr76qdpzGRL0Wk0QiITg4GEND1UbjVq1asWrVKkJDQykqUn3J8f79+wkODiYtLQ0nJyeV6zdW6q2Y/vjjDzZs2EBoaKha9QcOHIiPjw9jx45VaXXBr7/+ipeXF3FxcSr1iCICiOnIkSP4+/vXeAelCqtWraJ///6UlpZiZ2enVozS0lJ27dqFp6enUp7QpUuXaNeuHVlZWdy8eZPAwEC12lWGwsJCbG1t/zq0ouGsfaqXPVNiYqJKk+5nYWpqSmpqKp988gmnTp2qtuzt27fx8PDAz8+PadOm1ardxky9E9Pp06c5dOgQI0eOrHWsbt26MXv2bAICArh//9kO5b179/D29sbBwYEvvvii1m02ZuqdmCQSCT4+PjRr1kyQeFOnTqVZs2ZERkY+da2yspLAwECaNGnC6tWrRWe7ltSrv15lZSVJSUm1HuIeR19fH6lUysqVK9m9e3fV5wqFgokTJyKTyUhPTxedbQGoVw74rl27UCgUuLm5CRq3TZs2hIeH4+HhQefOnXFxccHCwoIdO3aQm5srOtsCUa/ElJiYSEhICAYGwu5ePXPmDFFRUSgUCg4fPoxMJqOkpIQTJ07w8ssvC9pWY6beiOnOnTts3LiRo0ePCh47KSkJS0tLzp8/D1BlZIo9krDUmzlTWloa3bt3r+bYGfWxsLCgouLJY7QMDAwwNRXPmxKSeiMmIbyl5/HIBdfX16dFixaYmZlhZWUlTroFpl6I6bfffuPo0aOMGDFCI/FLSkoAcHd3Z9SoUaxevRpbW1vmzJmjkfYaK/ViziSVShk6dOjTZz0KwJ07d3B3dycwMPAJU9LZ2RlHR0f69++Pi4uL4O02RrTeM2nCW3pEWVkZ3t7edO/enZiYmCeutWvXjri4OIKDg7lz547gbTdGtC6mnJwcDAwMePfddwWNW1lZSVBQEKampqxcufKZD3v9/PxwdXUlLCys3pxboMtoXUyJiYmEhoYK6i0pFAomT56MTCZj/fr1T+y1+yexsbHk5+eTnJwsWPuNFa3OmW7fvs3mzZs5fvy4oHHnz59PdnY2ubm5mJubV1vWwsKC5ORkBg0aRO/evbG1tRU0l8aEVnumb7/9lh49egi6LHb16tVV67YtLS2VqvPWW28xadIkgoKCnvKjRJRHq2JKTExk1KhRgsWLiYlh3LhxZGZm0qFDB5XqfvrppygUCnx9fRkyZIhgOTUmtCamgoICCgoK8PX1FSReXl4eMTExmJubq2UxGBoakpKSwrZt2+jSpYsgOTU2tCYmqVTKsGHDBHk+9ttvv+Hl5cWKFSvw9fVl48aNasVp1aoVBgYGJCUl1bszM3UBrYipoqKCNWvWCDLEXb58GXd3dyIiIhgxYgQjRoxg+fLl3Lt3T+VYCQkJ9OnTh7feeouJEyfWOrfGhlbE9P3332NsbIyrq2ut4jxyt/39/fnoo48AcHNzw9HRkRkzZqgUq6CggHnz5rF06VLi4+PZs2eP+DJGFdGKmCQSCaGhobVaJltWVoaPjw9OTk7Mnz+/6nM9PT3i4+PZvHkzmzdvVirW3bt3CQwMJDo6mo4dO9K8eXPWrFnDxIkTq5atiNRMnYupqKiIrVu3qr0fDh6628HBwZiZmbFixYqn3O3mzZuzfv16xo0bh1QqrTbW5cuXcXV1pXfv3owePbrqc1dXV8aPHy/aBSpQ52Jau3Ytzs7OapuDCoWCKVOmcPHiRdLS0p7rbvfs2ZMffviB6OhoBgwYwJ49e3jw4O8TmS5cuMC8efOwt7fH19eX2NjYp0T52WefUV5eTnR0tFq5Njbq3AFPTEysmt+oQ0xMTJW7bWZmVm1ZOzs7jh07xjfffMO0adM4c+YM1tbWVW/tHjhwIHl5ec81TY2MjEhJSaFnz57069cPZ2dntfNuFChqyeHDhxWvvfaaUmWPHj2qMDMzU9y9e1etthITExXW1taKwsJCteqrS0JCgsLW1lZRXFwsSLxz584pAEVZWZkg8R7n7r1yrf2r02FOKpXi6+tb4/OyZ5GZmcnHH39MVlYW7du310B2z2f06NE4ODgwadKkOm1X16izYe7BgwckJyeTlpamct38/HyCgoLIyMjA3t5etcryG/woXcb6/AtcvwvNXumF7wfv49pG+a/+6FRfe3t71q1bh5+fn4rfoHFQZz1TVlYW5ubmvPPOOyrVO3nyZJW73adPH9Ubll/nSF4hRq/1YfCgt2lzbhnDvOdySMUbtJYtWyKVSgkLC0Mmk6meRyOgznomdbyly5cvM2DAAP773/8yfPhw9Ro27ELYcilUlnD1/Hlsm3mwacR+DhTJcWql2m/Jzc2N999/n+DgYHbt2iX4/j5dp056phs3brBt2zaVXjFaXFyMp6cnQUFBTJgwQf3GK86yfkpfXmnVgV4+7zN9QSYXKipR1zqaN28excXF4iEXz6BOxJSamsrbb7+t9MS5vLycIUOG4OTkxNy5c2vVdsmmCCZkWBJ54BKFxw6wd9NUetRih5OxsTGpqanExMRw4MCBWuXW0KgTMSlzjvcj5HI5ISEhmJmZsXz58lof3l5e/AflLTrS5V/GQAVXfjrKxVq+icfOzo6YmBgCAwOrtlGJ1IGYjhw5wtmzZxk6dGiNZRUKBVOnTkUmk7Fu3TqVz7J8Fs2HTOFDk1V4vt6DXm90Z0jsCe4LsHcgLCyMTp06MXny5NoHayBofAIukUgYMWJEjW41wIIFC8jOzmbfvn2Cbd3Wb+FGdO4pPvztHHebv8pr1maC/IL09PRYtWoV9vb2pKenq3+D0IDQqJju379PSkqKUovVpFIpX3/9Nbm5ubRs2VLYRAya0raLg7AxebiYLjExkeDgYN58803atm0reBu6hEaHuW3bttGsWTN69+5dbbmsrKwqd9vGxkaTKQmOp6cnAQEBhISEUFkpxGsRdReNiunRxLu6SfSBAwcICgoiPT2d119/XZPpaIwFCxZw/fp1Fi1apO1UtIrGxHTt2jW2b99erbd06tSpKne7tqsutUmTJk1ITU3l888/59ChQ9pOR2toTEwpKSm4uro+dx5x9epV3N3diYyMZNiwYZpKo85wcHAgKiqKgIAA/vyzlq8k11E0IiaFQlHteUt//PEHHh4eBAYGEhYWpokUtMLkyZOxsbFh6tSp2k5FK2hETD///DMymQwfH5+nrj1yt9944w2ioqI00bzW0NfXRyKRkJGRofZ2K11GI2KSSCSMHDnyKa9ILpcTGhqKmZkZ8fHxDfLVpNbW1qxcuZIxY8bw+++/azudOqXWYurWrRtr166lc+fOVZ8tWrSI9PR0fvzxxyfK6unpYWVlxc2bN5/7xoCGgI+PD0VFRURFReHm5oZc/uS7yjt06MC5c+cwMTGhvLxcS1kKj0Z6pq1bt2JpafnUmumFCxeSnZ3Nd9991ygOJ128eDEXL15kyZIl2k6lTtCIA/4sfykpKanK4VbmFakNATMzM1JTU3F1daVv3744OjpWW77yZBJTZ2/ikhz0DIyxsO5Cv5APGenUQvsHaSmB4DleuXKFnJwcgoODqz7bvn17lcPdrl07oZus1zg5OREREUFAQAClpaXVlq28fZwdO+7w+ntjGR0yhDeN9/CJmxcLj+nGvj0lxVTJ1f9bxqShLnS360xXp3cYFDKdJdsL+efXTE5Opm/fvrRp0waAgwcPEhQUxIYNG+jatauw2esIH3/8MVZWVkyfPr3mwgYv09XNA8/BIxg/fwnjXjnC9l2XkddcU+soJabyvM8YOHQ5JQPmsCYziw3fzGKIjYwUyU4ePytEoVA8sXbp9OnTeHl5kZCQoPLa74bEo5NV1q1bx5YtW5SvWP47l2+ZYtX6RZ0Y5mqYMz3sd37N+o6TDh/w3dh3aa0PtG9Ppx4eBP5ZihFw8a/SBw8e5PLly3h7e3P16lUGDBhAZGSkeHgW0LZtW5YvX87o0aP55Zdfnl/wwRmy/reQQvltTmansc9xLhk+wh9prQlqELw+oE/rDjYYHf6WJRsOIrv795NxEzPTJwJIJBL8/f25f/8+np6eBAcHM378eI0krov4+voyaNAg3nvvvafsgirkZRTfKuJ6QTYbT7/Of74cQxcdeZGCUmJqFbSYFaFGbBjzFu1bvIhVp154hS1mh+zvGZNcLmft2rUEBgYydOhQevTowWeffabZ7HWQpUuXcubMGRITE59dwLgrI+fEsCh5I/F9jzJ95BxydeTcMeWGYkNbhi/eydkb1zi9fxNfT+mHef7neA35e/9ZSUkJVlZWxMbGYm5uzrJlyxqkw11bmjZtSkpKCl9++WX1BfXb4vdNCpP0YgkYm8Q5HVgqpdq8zqgFr/RwwzcsCsmy0dicPMTRv9bTFxcXY2lpycWLF1m7dq0g67cbKs7OzlUPuKs94c68FxFrl/Jm/mT8IvbWUXbqU8P/+MNHHnlLZ7Ov43jGe7zCw1MC7nJs1wFuvtaH7uZw/fp1/vzzT8zNzenVqxdxcXGazlvnefRGqTlz5lQ55EbOCzhR9GQ5g/ZBpF0Iquv01KIGMT3suCxMr5M21pEoRRs62bRAUVTIVQt3old/QjdDyKyowMHBAVtbW65du1YHaTcMQkJCmDJlirbTEAw9hULJl4bIy7hx/gyXbj3A6KX2dGzfHB25yWhUlJRp7wG68mIS0Qm0KSZdMFZFdARRTCKCIYpJRDBEMYkIhigmEcEQxSQiGKKYRARDFJOIYBhq0+QSaViIPZOIYIhiEhEMUUwigiGKSUQwRDGJCIYoJhHBEMUkIhiimEQE4/8BY5+Cw/oyFEgAAAAASUVORK5CYII=)
If PQRS is a Square and STR is an Equilateral Triangle,find the value of a
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJMAAAByCAYAAABX/eMyAAAVSklEQVR4nO2dfVzN5//Hn92sUmlu1iRfos3XxEoay2xlHqFC5SbpfuZmGnO75ov1bTJqGPtaaoTOSWWS3E1ZYfjJihlGNrdxmPvQtBR1zu8P0xjqnNPndDr1eT4e/jmf63pf75PXua7r8/pc1/XRUygUCkQaDCVl97XWtr7WWhZpcIhiEhEMUUwigiGKSUQwRDGJCIYoJhHBEMVUjyg9s5XosYN527ErXZ1cGTJxCTsuaO9WX1UMayxReZKkqbPZdEkO+i9g/tIrvDlsLKP7dcDkryJFRUVs2bJFs5k2MIqKiigtLWX27NkYGBhQcSoB/74R3BwWzfyUPrSrPEd27Az8XfNYvDuV4PYG2k65RvRqNC3v5/FJN3d+8k0ivGcl149vJXZRNu0W5ZIWaoMBcOTIEVxcXBg0aFDdZK3jlJeXk52dTUlJCWVlZRgbl7EptAsfln7Bz+sCsXo0XsgvsHxQd75ov47jcW6YKhFbm6ZlzT0TAAa83NUNj4GmMHAwdsXdeDd5GzeCP6z64m3atCE1NVVzmTYQSktLcXNzw8XFhczMzIcflh8ke08Zrgu9/xYSgL4Nw4f34pNFOfxy3w1nI62krDRqzJkqKS97gKFJE14QZ1wqUVFRwciRIzExMeHLL7987MI1rt5qSevWT6vFvHVrmhZd5Zq8DhNVEyV7Jjk3TuwmJ+s+Vw6nsXCNIcFJ3jTXbG4NCoVCwfjx45HJZOzZs4dbt279fdHAFDOTUu6WPD3jqCwp4V6TZpjp1WGyaqJk31LGya1L+SouiawLrzJt6w985dFCvBVUgcjISHbu3ElWVhYvvvjikxeNHHmjazEH9h2n4okLZRzcdwi5fU/sX6jDZNVEyZ7JlLdnZPCtrzJTQJF/Eh8fT3x8PLm5ubRu3frpAvrt8P9oKEvGTWVu/w1EuliiTwVXciL4OMWQ0LThvKwDv1wlxSSiLhkZGcyYMYMdO3bw73//+zml9Hl5yNdsvP4RY/3skFq9ipX8d07eaEPg1xv5om/TOs1ZXXRA77rL3r17CQ0NJS0tjZ49e9ZQuimOH0j46eJp9iR/zcy+LanoNJJwv04Y10m2tafmnsnImQUnijSYQjl7okP438EHz7imx4vv/ofEj3posH3NcOzYMby9vVm2bBnu7u7KVzRshk2XN/jX5OkMdpuMS8+NtDe0ZJjkWya9Vr+Ny3owzBnS0f19xnaTAxX89FUoy80/5ZsxnTFAD+N/2Wg7QZWRyWR4eHgwc+ZMQkJC1Iph0D6I1ONuFBw5Q7FJG+xerd9CgnohJgOsHQdgDUAZ9781xrTZG/T3cKGee3TP5NatW7i7uzN8+HDCw8NrF8zEii7OVsIkVgeIcyYBuXfvHoMHD8bBwYHFixejp6cD5pCA6JyYfvrpJxwcHCguLtZ2Kk9QUVGBv78/TZo0QSKRoK+vc3/aWlMPhjnV2LBhAydOnKC8vFzbqVShUCiYMGECMpmM3bt3Y2ysK/dfwqJzP5/8/Hz69OnDqFGjqC+7tKKiosjJySEzMxMLCwttp6M1dEpMhYWF7N+/H6lUyrVr14iLi1OiViUnkyYxfKgfszddoep5afH3zAn8nJ1/1i6nFStWsGzZMr7//nusrHRnsqwJdEpMSUlJDBw4EGtra1JSUoiMjKSgoKCGWpXcPr6TvUcOsnLWQnJLH34qLy9k/3c/cv5Z9paSbNq0ifDwcLZt20bHjh3VD9RAqGdiMsFbeoVT/3vaFpDL5UilUt577z0AOnXqRHR0NAEBAZSVldUQVw+LftP4wDyFuavPUSlApvv27SMkJIS0tDR69NA9U1UT1DMxPZ+9e/dSWlr6hJs8ZswYbG1tmTVrVs0BDDvz4WxPTi2JIbuWN4IFBQV4e3sTFxfHgAEDahesAaEzYpJIJAQFBfHCC3+vxdDT0yMhIYF169aRnZ1dQwQ9mg/6Dx+13cy8b06g7lqzS5cu4e7uzsyZMwkKClIzSsNEJ8R09+5d1q9fXzXEPc5LL72ERCJh1KhR3Lhxo/pABp34IMKXG7HzyLil+p3g7du3cXd3x9fXl+nTp6tcv6GjE2JKT0/Hzs6Orl27PvN6v3798PPzY8yYMTXaBebvhjPdfifRsQWoMve+d+8eXl5e2Nvbs2jRokbnbiuDTohJIpE8s1d6nPnz53P+/HlWrFhRfTB9G0I+DaUiWUKekhs5KisrCQgIwMTEpNG628pQ7/8qZ8+eJT8/H39//2rLmZiYkJqayqxZs/j111+rL/vmVGb2M6NciZHucXc7IyMDIyNdfPxcN9T7xylSqRQvLy9atGhRY9kuXbowZ84cAgICyMvL++uxhhHOC45z5vGC+lYErL9GgBLtz507l5ycHPbv30/Tprqx4lFb1Oue6Z/ekjJMmDABa2trIiIiat1+QkJClbvdqlWrWsdr6NRrMf3www88ePCA/v37K11HT0+P1atXk5SUxM6dO9Vue8uWLYSHh5OZmcmrr76qdpzGRL0Wk0QiITg4GEND1UbjVq1asWrVKkJDQykqUn3J8f79+wkODiYtLQ0nJyeV6zdW6q2Y/vjjDzZs2EBoaKha9QcOHIiPjw9jx45VaXXBr7/+ipeXF3FxcSr1iCICiOnIkSP4+/vXeAelCqtWraJ///6UlpZiZ2enVozS0lJ27dqFp6enUp7QpUuXaNeuHVlZWdy8eZPAwEC12lWGwsJCbG1t/zq0ouGsfaqXPVNiYqJKk+5nYWpqSmpqKp988gmnTp2qtuzt27fx8PDAz8+PadOm1ardxky9E9Pp06c5dOgQI0eOrHWsbt26MXv2bAICArh//9kO5b179/D29sbBwYEvvvii1m02ZuqdmCQSCT4+PjRr1kyQeFOnTqVZs2ZERkY+da2yspLAwECaNGnC6tWrRWe7ltSrv15lZSVJSUm1HuIeR19fH6lUysqVK9m9e3fV5wqFgokTJyKTyUhPTxedbQGoVw74rl27UCgUuLm5CRq3TZs2hIeH4+HhQefOnXFxccHCwoIdO3aQm5srOtsCUa/ElJiYSEhICAYGwu5ePXPmDFFRUSgUCg4fPoxMJqOkpIQTJ07w8ssvC9pWY6beiOnOnTts3LiRo0ePCh47KSkJS0tLzp8/D1BlZIo9krDUmzlTWloa3bt3r+bYGfWxsLCgouLJY7QMDAwwNRXPmxKSeiMmIbyl5/HIBdfX16dFixaYmZlhZWUlTroFpl6I6bfffuPo0aOMGDFCI/FLSkoAcHd3Z9SoUaxevRpbW1vmzJmjkfYaK/ViziSVShk6dOjTZz0KwJ07d3B3dycwMPAJU9LZ2RlHR0f69++Pi4uL4O02RrTeM2nCW3pEWVkZ3t7edO/enZiYmCeutWvXjri4OIKDg7lz547gbTdGtC6mnJwcDAwMePfddwWNW1lZSVBQEKampqxcufKZD3v9/PxwdXUlLCys3pxboMtoXUyJiYmEhoYK6i0pFAomT56MTCZj/fr1T+y1+yexsbHk5+eTnJwsWPuNFa3OmW7fvs3mzZs5fvy4oHHnz59PdnY2ubm5mJubV1vWwsKC5ORkBg0aRO/evbG1tRU0l8aEVnumb7/9lh49egi6LHb16tVV67YtLS2VqvPWW28xadIkgoKCnvKjRJRHq2JKTExk1KhRgsWLiYlh3LhxZGZm0qFDB5XqfvrppygUCnx9fRkyZIhgOTUmtCamgoICCgoK8PX1FSReXl4eMTExmJubq2UxGBoakpKSwrZt2+jSpYsgOTU2tCYmqVTKsGHDBHk+9ttvv+Hl5cWKFSvw9fVl48aNasVp1aoVBgYGJCUl1bszM3UBrYipoqKCNWvWCDLEXb58GXd3dyIiIhgxYgQjRoxg+fLl3Lt3T+VYCQkJ9OnTh7feeouJEyfWOrfGhlbE9P3332NsbIyrq2ut4jxyt/39/fnoo48AcHNzw9HRkRkzZqgUq6CggHnz5rF06VLi4+PZs2eP+DJGFdGKmCQSCaGhobVaJltWVoaPjw9OTk7Mnz+/6nM9PT3i4+PZvHkzmzdvVirW3bt3CQwMJDo6mo4dO9K8eXPWrFnDxIkTq5atiNRMnYupqKiIrVu3qr0fDh6628HBwZiZmbFixYqn3O3mzZuzfv16xo0bh1QqrTbW5cuXcXV1pXfv3owePbrqc1dXV8aPHy/aBSpQ52Jau3Ytzs7OapuDCoWCKVOmcPHiRdLS0p7rbvfs2ZMffviB6OhoBgwYwJ49e3jw4O8TmS5cuMC8efOwt7fH19eX2NjYp0T52WefUV5eTnR0tFq5Njbq3AFPTEysmt+oQ0xMTJW7bWZmVm1ZOzs7jh07xjfffMO0adM4c+YM1tbWVW/tHjhwIHl5ec81TY2MjEhJSaFnz57069cPZ2dntfNuFChqyeHDhxWvvfaaUmWPHj2qMDMzU9y9e1etthITExXW1taKwsJCteqrS0JCgsLW1lZRXFwsSLxz584pAEVZWZkg8R7n7r1yrf2r02FOKpXi6+tb4/OyZ5GZmcnHH39MVlYW7du310B2z2f06NE4ODgwadKkOm1X16izYe7BgwckJyeTlpamct38/HyCgoLIyMjA3t5etcryG/woXcb6/AtcvwvNXumF7wfv49pG+a/+6FRfe3t71q1bh5+fn4rfoHFQZz1TVlYW5ubmvPPOOyrVO3nyZJW73adPH9Ubll/nSF4hRq/1YfCgt2lzbhnDvOdySMUbtJYtWyKVSgkLC0Mmk6meRyOgznomdbyly5cvM2DAAP773/8yfPhw9Ro27ELYcilUlnD1/Hlsm3mwacR+DhTJcWql2m/Jzc2N999/n+DgYHbt2iX4/j5dp056phs3brBt2zaVXjFaXFyMp6cnQUFBTJgwQf3GK86yfkpfXmnVgV4+7zN9QSYXKipR1zqaN28excXF4iEXz6BOxJSamsrbb7+t9MS5vLycIUOG4OTkxNy5c2vVdsmmCCZkWBJ54BKFxw6wd9NUetRih5OxsTGpqanExMRw4MCBWuXW0KgTMSlzjvcj5HI5ISEhmJmZsXz58lof3l5e/AflLTrS5V/GQAVXfjrKxVq+icfOzo6YmBgCAwOrtlGJ1IGYjhw5wtmzZxk6dGiNZRUKBVOnTkUmk7Fu3TqVz7J8Fs2HTOFDk1V4vt6DXm90Z0jsCe4LsHcgLCyMTp06MXny5NoHayBofAIukUgYMWJEjW41wIIFC8jOzmbfvn2Cbd3Wb+FGdO4pPvztHHebv8pr1maC/IL09PRYtWoV9vb2pKenq3+D0IDQqJju379PSkqKUovVpFIpX3/9Nbm5ubRs2VLYRAya0raLg7AxebiYLjExkeDgYN58803atm0reBu6hEaHuW3bttGsWTN69+5dbbmsrKwqd9vGxkaTKQmOp6cnAQEBhISEUFkpxGsRdReNiunRxLu6SfSBAwcICgoiPT2d119/XZPpaIwFCxZw/fp1Fi1apO1UtIrGxHTt2jW2b99erbd06tSpKne7tqsutUmTJk1ITU3l888/59ChQ9pOR2toTEwpKSm4uro+dx5x9epV3N3diYyMZNiwYZpKo85wcHAgKiqKgIAA/vyzlq8k11E0IiaFQlHteUt//PEHHh4eBAYGEhYWpokUtMLkyZOxsbFh6tSp2k5FK2hETD///DMymQwfH5+nrj1yt9944w2ioqI00bzW0NfXRyKRkJGRofZ2K11GI2KSSCSMHDnyKa9ILpcTGhqKmZkZ8fHxDfLVpNbW1qxcuZIxY8bw+++/azudOqXWYurWrRtr166lc+fOVZ8tWrSI9PR0fvzxxyfK6unpYWVlxc2bN5/7xoCGgI+PD0VFRURFReHm5oZc/uS7yjt06MC5c+cwMTGhvLxcS1kKj0Z6pq1bt2JpafnUmumFCxeSnZ3Nd9991ygOJ128eDEXL15kyZIl2k6lTtCIA/4sfykpKanK4VbmFakNATMzM1JTU3F1daVv3744OjpWW77yZBJTZ2/ikhz0DIyxsO5Cv5APGenUQvsHaSmB4DleuXKFnJwcgoODqz7bvn17lcPdrl07oZus1zg5OREREUFAQAClpaXVlq28fZwdO+7w+ntjGR0yhDeN9/CJmxcLj+nGvj0lxVTJ1f9bxqShLnS360xXp3cYFDKdJdsL+efXTE5Opm/fvrRp0waAgwcPEhQUxIYNG+jatauw2esIH3/8MVZWVkyfPr3mwgYv09XNA8/BIxg/fwnjXjnC9l2XkddcU+soJabyvM8YOHQ5JQPmsCYziw3fzGKIjYwUyU4ePytEoVA8sXbp9OnTeHl5kZCQoPLa74bEo5NV1q1bx5YtW5SvWP47l2+ZYtX6RZ0Y5mqYMz3sd37N+o6TDh/w3dh3aa0PtG9Ppx4eBP5ZihFw8a/SBw8e5PLly3h7e3P16lUGDBhAZGSkeHgW0LZtW5YvX87o0aP55Zdfnl/wwRmy/reQQvltTmansc9xLhk+wh9prQlqELw+oE/rDjYYHf6WJRsOIrv795NxEzPTJwJIJBL8/f25f/8+np6eBAcHM378eI0krov4+voyaNAg3nvvvafsgirkZRTfKuJ6QTYbT7/Of74cQxcdeZGCUmJqFbSYFaFGbBjzFu1bvIhVp154hS1mh+zvGZNcLmft2rUEBgYydOhQevTowWeffabZ7HWQpUuXcubMGRITE59dwLgrI+fEsCh5I/F9jzJ95BxydeTcMeWGYkNbhi/eydkb1zi9fxNfT+mHef7neA35e/9ZSUkJVlZWxMbGYm5uzrJlyxqkw11bmjZtSkpKCl9++WX1BfXb4vdNCpP0YgkYm8Q5HVgqpdq8zqgFr/RwwzcsCsmy0dicPMTRv9bTFxcXY2lpycWLF1m7dq0g67cbKs7OzlUPuKs94c68FxFrl/Jm/mT8IvbWUXbqU8P/+MNHHnlLZ7Ov43jGe7zCw1MC7nJs1wFuvtaH7uZw/fp1/vzzT8zNzenVqxdxcXGazlvnefRGqTlz5lQ55EbOCzhR9GQ5g/ZBpF0Iquv01KIGMT3suCxMr5M21pEoRRs62bRAUVTIVQt3old/QjdDyKyowMHBAVtbW65du1YHaTcMQkJCmDJlirbTEAw9hULJl4bIy7hx/gyXbj3A6KX2dGzfHB25yWhUlJRp7wG68mIS0Qm0KSZdMFZFdARRTCKCIYpJRDBEMYkIhigmEcEQxSQiGKKYRARDFJOIYBhq0+QSaViIPZOIYIhiEhEMUUwigiGKSUQwRDGJCIYoJhHBEMUkIhiimEQE4/8BY5+Cw/oyFEgAAAAASUVORK5CYII=)
Maths-General