Question
In a Rhombus PQRS; if
?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJAAAADNCAYAAABXVvmRAAAcP0lEQVR4nO2deVwVZfvGr+Gc4RwWEQWjQs3S1JQ0ldRcckv0VQsXDoJLhoILafpmbpWVb+USSbkFLmAuIArxcw9FWVSURHFBUFNwFzdkR5Zzzv37wzBQOCzncGaGme/n0z8zzzxzebh67vuZeZ57GCIiSEjUEhOuBUgIG8lAEnohGUhCLyQDSeiFZCAJvZAMJKEXkoEk9EIyEIqRkXoaccdOIvlWLjSlh/Nv4sYDLZfCBAEj5geJuec24L9ei3BY3hvO/d+EWc5t3MyxguPQD2AdtQnXJmzF/7qbci2T35BI0dwOptH2LNm7bqUb6jLHH0XRnC4WJLMdR+F53OkTCiINYWpcDPRF+L0mGPyJC5rL/j1jYtMPC78aiaad30N3M+4UCgXRGig19SY02jw8SM/G85mOeZv2GNizB5qI9NepCSL9ieR4vUVTyCgXB5b/gKjH5S3ENOyMkUPbQc6ROiEh2iRacz0QI7t5YfdDBnZOPyMifBbeMedalfAQ6QgEyFp8gnWB0+BgpsX9g3MxzN0PFwq5ViU8RDsCPUWNa0ET8IHHNqSp5WjhGoDDW8fjDSl2VRvRjkBPkeP1sesRvnQAbJkSXN/hDfcfTkIaiKqP6AykffwAD9Vlj5ij46ytCJj4JljkIeHX/2FruvQEurqIzEAaXNzgh4i85w6b2OGjZT9CZWcCyk1A3KliTtQJEZEZKBsJCSlQV3TKuhd6tJcDDAu5nDGyLuEiLgMVJeLk6dNIOFXw4jntXaQ/JJhYv4d+XRXG1yZQRGUgzbUEJN6+hqBvluF4VtkzWtzbtRJbU8zQ/fMvMcqGK4XCQ1TT+KwgT4w91RGDG5zC/rhcvP5+H3R8RY6MC/ux9f9uoO20VfCb3w92ovrfSj9EZCAtMlNSkNvG4enLU/VjXP4rHkk3cyBv0gqd33NEcwuuNQoPERlIoi6QBmsJvZAMBICIcPr0aa5lCBLJQAAWLVoER0dHbN68mWspgkP0OVBKSgo6d+4MtVoNhUKBkydPon379lzLEgyiHoHy8/Ph4uKCPn36wMLCAqNHj4aLiwvy8p5/1yFRGaI1EBFh2rRpkMlkmDVrFhiGwerVq8GyLKZMmQKRD8zVRrQGCggIQHh4OEJDQ6FUKgEA5ubmCA0Nxe7du7F+/XqOFQoEDnaCcM6ZM2dIqVRSUFAQERFFRUVRw4YNn50PCQkhhUJBp0+f5kqiYBDdCJSdnQ2VSoVPPvkEY8aMqbDN6NGjMWnSJKhUKmRnZxtZobAQlYGICJ6enrCyssIvv/yis62vry8aNWqEiRMnSvmQDkRloFWrViEyMrJc3lMZCoUCoaGhOHz4MFasWGEkhQKE6xhqLOLj44llWQoPD3/h3PM5UFl27txJLMvSiRMn6lqiIBHFCPT48WO4urpixowZGDFiRI2udXZ2xsyZM+Hq6oqMjIw6Uihc6r2BtFotPv74Y9jb22Pp0qW16mPx4sVo1qwZxo8fD61WWnBflnpvIB8fH8THx2P79u1gWbZWfbAsi+3btyMhIQHLli0zsEKBw3UMrUtiY2NJLpfTn3/+qbOdrhyoLAcOHCC5XE4xMTGGkih46u0I9ODBA7i5uWHevHkYPHiwQfp0cnLCggUL4Obmhvv37xukT6FTL9/GazQaDBo0CBqNBpGRkZDLde9Vjo6OxogRI5CVlaWzXWnfTk5OAICDBw9CJpNVcUX9pl6OQN9//z0uXLiAbdu2VWmemiKTyRAcHIyUlBQsWrTIoH0LEq5jqKE5ePAgyeVyioqKqvY11c2ByhITE0NyuZwiIiJqKrFeUa8MdPv2bWrSpAn98MMPNbquW7duJJPJaN26dZSenl7t6xYvXky2trZ069atmkqtN9SbHKikpAT9+/eHpaUl9u3bBxOT6kfnrVu3wtPTE/b29khLS0OHDh0wcOBAODk5oXv37rCysqrwOq1Wiw8//BBZWVmIiYmp9WMCIVNvDDRv3jwEBwfjzJkzsLW1rdG1pUl0ZmYmrly5gsjISERGRiI6Oho5OTlo3rw5HBwc4ODggBYtWsDGxgaNGzeGjY0NCgsLMWLECLi7u1f5grY+Ui8MtHv3bri4uCAmJgY9evSo8fWVzcLUajVSU1Nx4cIFJCUlISkpCbdv30ZGRgYyMjLKtTcxMUF4eDicnZ31/vcICi7jpyG4du0aWVtb0/Lly2vdR22SaCIitVpN+fn5VFxcTL6+vtSwYUNKTU2ttQ4hIugRqKioCL1794a9vT3Cw8PBMLUry1KT50CVQURwcXHBjRs3EBcXB4VCHBU+BP0caM6cOXj06BE2btxYa/MYCoZhEBgYiMzMTMyePZtTLUaF4xGw1uzYsYMUCgWdOnVK775qG8IqIjExkRQKBYWEhBikP74jSANdvnyZGjRoQH5+fgbpz5AGIiJau3YtWVpa0qVLlwzWJ18RXAh78uQJVCoVhg0bhilTpnAtp0K8vLzg7OwMlUqFgoIKqqHVIwRnoBkzZqCoqAhr167lLu+pYE2ZRvPvQYZh4O/vD7VajenTpxtRGAdwPQTWhN9//53MzMwoKSnJoP1WJ4Q9SQqh77xdqX/HptS4/SyKyn16XJN+kL7ub09K8/Y090hhuWuSk5PJ3NycAgMDDaqXTwhmBLpw4QKmTZsGPz8/ODg4GF+ArCGaO3TCm5bFyE4JhE/QHWjy4/G9+2fYm2sJC+YJ8go05S5p164d/P398emnnyIpKcn4mo0B1w6uDrm5udS2bVuaOHFinfRfkyRac2c9DbU2Icshv9HBH8fS9PA7pCYi0lR+jaenJ7Vp04ZycnIMopdP8N5AWq2WxowZQ2+//Tbl5+fXyT1qNAvT3CW/QeZk0sCe+n1zhKpjiYKCAurQoQO5ubmRVqvVSyvf4H0IW7duHXbv3o2wsDCYm/Pge0wmL6F//3cgLzBFu75d0aAal5iZmSE0NBT79u3D2rVr61yiMeG1gRITEzFz5kxs2LABrVu35lrOPxCKSzSQaW/jZFwqNFVfAABo3bo1AgICMGvWrHpVTo+3BsrKyoJKpYKnpydGjx7NtZxnaNJ+x/qc3viPjQbJx+PwqAbbxFQqFSZPngyVSqXXezc+wUsDEREmTpyIxo0bY/ny5VzL+RdNKjYuS8b7s2ZhwDumKDx9FCeeAMg7hcPHHlT0eOgFfHx8YGtrCw8Pj3pRtIGXBlqxYgWio6OxY8cO7t9qF57GKg93LNh+AvsWzkfiB3Mw4hU79O7VDrKMYzgQk4I/ftyOO6/aVOvHVCgU2LFjB2JjY+vHAjSus/jnOXHiBLEsS7t27TLaPXXNwjR3/GmQBUOMzIZ6fRNLj/+Zrpec+Y66KBkysXakL/68p2sWXyF79uwhlmUpLi5OP/EcwysDPXr0iJo1a0Zz5swx6n11T+NL6E78btrz120qKne8kG7E7aMjqXm1vu/cuXOpadOm9PDhw1r3wTW8WVCm1WoxbNgw5OTkIDo62qgL1A2xoKw2lG4EsLCwwP79+2u0EYAv8EbxsmXLkJCQgJCQENHsbmBZFiEhIUhMTMSSJUu4llM7uB4CiYiio6NJLpfTgQMHOLm/odcD1ZTabIbkC5yPQPfu3YO7uzu+/PLLZ3vOxcbAgQPx1Vdfwd3dHenp6VzLqRGc5kAajQYDBw4EwzCcFirgKgcqi0ajweDBg1FSUoJDhw4ZfE9/XcHpCLRo0SJcunQJwcHBoq9yIZPJEBQUhCtXruC7777jWk714Sp2RkREEMuyFBsby5WEZ3CdA5XlyJEjxLIs7d+/n2sp1YITA928eZNsbGxoyZIlXNz+BfhkICKiZcuWUePGjenmzZtcS6kSo+dAJSUl6Nu3L6ytrbFnzx5ePPvgQw5UFq1WC2dnZzx69AixsbEwNTXlWlKlGP2vt2DBAty+fRubN2/mhXn4iImJCTZt2oT09HTMnz+fazm6MeZwV1q0Oz4+3pi3rRK+hbBS/vrrLzI1Na2wODpf0D1XzL+J8xfuouC5IMcwciitmqDZG6+hcTVflqelpWHChAnw8fFBt27daml3cdG1a1f8/PPP8PDwQIcOHdCyZUuuJb2ILndpslLp+K6VNK6tKTFgiLXvRqM+mUqfzZxOE4e/S02t7endscsoKl33u+jCwkLq0qULjRo1ipdrgvk6AhE9XROuUqmoU6dO9OTJE67lvEA1QtgT2vlxEzJhWOq2+OLTHQhERKSh+3u9qDVrQg26fkd/6fi3eXt7U8uWLSkrK8sAkg0Pnw1ERJSdnU2tWrWiqVOnci3lBao2UMk5+rYzS2AdaMHJkufOJdBXb7MEk5fJY0/FDtq2bRspFApKTEw0hN46ge8GIiI6e/ZsuY/k8YUqp0HaO1GITVZD1rQvBnZ4PmVSQM4CoEzcv//khWsvX74MLy8vrFy5Ep06dTJQ0BUnHTt2xKpVqzB58mRcvHiRaznPqMJAWjw6dAinihnYvj8QXZ9LmLX3jyP+bzUYeVt07lx+g0tBQQFcXFwwfPhweHl5GVi2OJk0aRJGjRoFlUqF/Px8ruUAqNJAuYiOPIECWKHnwN6wKHcuE9HLfkVUvgleHTUf0zqWH52mT58OjUYDPz8/zos/1RcYhsFvv/0GAPD29ta5KF+Tn4mMhw/xsPS/jAw8zsxFYXX3IVUXnQEufx9NelVGjLI/rbz570yrKP0kbZrZg2zl5tRq5Ao6+VxuHBgYSObm5pScnFwHUdfwCCEHKktKSgpZWFjQhg0bKmmhobsnNtO3w1uSggHBpCG17vsRDR/yPrV71YaadRpGszYmkiGmNDoNVHRkJrWSMyRv+i4NHTKEhg0bTP17d6MunbrSoAlfkX/kVXp+RfC5c+dIqVTSli1bDCDPOAjNQEREQUFBpFQq6ezZs5W20VxbTr1ZkEmTsRT2zx5sTUYszXe0IEb2En24PrXMrLp26DBQCSV+3ZFYsNRx4RkqqbzhM3Jycqh169bk5eWlpyzjIkQDERFNmTKF3nzzTcrOzq7wfFHMZ9RSzlDD4ZvoUZnjjzYMJXMGxHb5H12ozh9WB5XnQJo0HDx8EWp5C/R3aoeqljcRESZPngwzMzPpI7VG4tdff4WlpSU8PT0ryIfUuBR1FDc1Zug6cAAalTljZtUApgC0jx/goZ45UaUG0t47hENnS2Bi1xdOjlW/DQ4ICMDOnTsRGhoKMzMz/VRJVAulUonQ0FDs3bv3xaINmhs4GJUMNdsJA51eLvOHLkbS6fPIIwaWDp3wlp77Fyo1UFbUISQUMmjUxwk9dX8hGwBw/fp1KJVKvPzyy/opkqgRdnZ2MDMzw/Xr18sd1z44hEOJJZC3HwCnFv+u9ixK9sc3AZegseiE6fPdYKfvgojKYtt2NxsyYSxo6Ib71dp1KeQaOELNgbRaLY0dO5YcHBxeqJ30eOtIsmZk1NwjlK6l36XrF45R2HIves+OJVP7vjR39w29E2giHUn0R41MCPJ2NC++qLImL/D3338btPyusRCqgdatW1dJOeE82jnBjkxkdtTz40/Ja2wvaipnyMSmL83ZeoSu1X4z7QtUaiAZAwKjoJZDP6dlwQnP9oRXhSELgBsLIRpIZ0HzwsP0aQsZmTQZS3/kEpE6mb5/lyWGdaTvLxhi3PmXOllQNmPGDHr99dcpMzOzLro3OEIzUFZWFrVs2ZK8vb0rPF/01zxqJ2fIynnjP9P3Ejr/XRdiGVPqXm5Fhf7UyZrS+lYDh08QESZNmgRra2v4+vpW0EKDqwejcEWjQJcB/f+Zvsvx1vChcJCX4My+PbhmwNcZdWKgsjVwfv3117q4hWhZuXIlDh06hNDQ0IprJ2lvIzIqCWr52+g/wP7ZH1jefjiGviVH8am92H3DgA4y4Gj2AkKpgSOUEFZaO2nnzp2VttHc8aNBlgzJ35xFR8rNf0ro5AIHYhkl9fK5YrAwVueL6oVQA0cIBiqtnTR79mwdrdR0+ef3yZwBmfZbQTefm/gUxc+lt+QMsa0/oygDlayucwMVFxdTr169aPDgwaTR1LSOl3Hgu4E0Gg0NGTKEevToQcXFxRW2yTzzB6342p06WpsQAGIs3ybXhWso8lqZsaYojr5oIycwcnqp63j66rfDdEPPocgo23pq+zluY8F3Ay1ZsoRsbGx4+Xlxo+0L43MNHD4bKCYmhliWpYiICK6lVIjRtoaWrYFz7949Y91W0Ny/fx9ubm6YP38+Bg0axLWcCjHq3vjSGjhqtRqRkZG8qYHDt73xwNPfysnJCUSEyMhI3pa/Merm9NIaOJcvXxZWDRwOWLRoEVJSUvhfO4mLuBkbG0tyuZw3NXD4lgNFRESQXC6nmJgYrqVUCWcFppYuXUo2Nja8qIHDJwPdunWLbG1tafHixVxLqRac1UjkUw0cvuRAfKydVBWcKSytgXP37l0sWLCAKxm84ssvv8StW7eEVTuJ6yGQDzVw+BDCSmsnnThxglMdNYVzAxERrVy5kho2bEipqamc3J9rA6WlpZG1tTX98ssvnGmoLbz4VgYRwdXVFWlpaYiLi4NSWY1V/AaEyxyoqKgIPXv2xGuvvYawsDDBbQPnRaBlGAYbNmxATk4OPv/8c67lGJXZs2cjKysLgYGBgjMPAO5zoLKcOXOGlEolBQcHG/W+XIWwkJAQ3tdOqgpeGYiIaP369WRhYUEXL1402j25MNClS5fI0tKS1q5da9T7GhpehLCyTJo0CSNHjoRKpUJBQQHXcuqEgoICqFQqODs7C752Eu8MxDAM/Pz8oNVq8emnn3Itp06YPn061Go1/P39hZn3lIEfr8Ofw8LCAmFhYXB0dMT7778PDw8PriUZjI0bN2L79u1ISEiApaUl13L0h+sYqostW7aQUqmkc+fO1el9jJUDnT9/nszMzGjz5s11fi9jwbsQVpZx48bh448/houLC3JycriWoxe5ublQqVQYN24cxo8fz7Ucg8FrAwFPvyFvYWEBLy8vwW5SpH9qJymVynpXO4n3BiqtgRMREfGswKTQ8Pf3x759++pn7SSuY2h1+eOPP8jU1JROnjxp8L7rMgdKSEggU1NTCg0NrZP+uYb3I1ApI0eOhLe3N1xdXZGZmcm1nGqRmZkJlUqFqVOnwsXFhWs5dYJgDAQ8/ba8nZ0dJkyYwPt8iIjg4eGBl156CT4+PlzLqTMEZSBTU1Ps2LEDcXFxWL58OddydOLr64sjR45gx44dvP7ioN5wHUNrw759+4hlWTp69KhB+jN0DnTs2DFiWZb27t1rsD75iqBGoFKGDBmCL774AqNHj8bDhw+5llOOhw8fYvTo0Zg9ezaGDh3KtZw6hxcLymqDWq3GBx98AIVCgf379+u1d8pQC8q0Wi2GDBmCgoICREVF8WbjZF0iyBEIAORyObZt24azZ8/ixx9/5FoOAGDx4sU4c+YMQkJCRGEeAMLMgcpy+PBhksvldOjQoVr3YYgcyBA6hIhgR6BS+vfvj2+++QZjxozB3bt3OdGQnp6OMWPGYOHChRgwYAAnGrhCsDlQWfTNPfTJgUpzMVNTU/z555/83sdeBwh+BAKeblLcsmUL0tLSsHDhQqPe+9tvv8XVq1cRFBQkOvMAEH4OVJbaPn+pbQ5k6OdRQqReGYiIyMfHhxo1akTXr1+v9jW1MdCNGzeocePG9NNPP9VUYr2iXuRAZSEijBgxAunp6Th69Gi1XiPUNAcqLi5Gnz590KRJE+zatUvw65r1oV7kQGVhGAYbN27EgwcPMHfu3Dq5x7x583Dv3j1s2rRJ1OYBUL9yoLLUZB1OTUJYXa5LEiL11kBERGvWrKEGDRrQlStXdLarroGuXLlCVlZWtHr1akNJFDz1LoSVZdq0aRgyZAhUKhWePHmiV1+FhYVQqVQYPHgwvL29DaRQ+NRrAzEMg/Xr16OgoAAzZ87Uq69Zs2YhPz8f69evl/KesnA9BBqD8+fPk1KprHQ/VlUhbOvWrUbZnyZERGEgIqLAwEAyNzen5OTkF87pMlBycjKZm5tTQEBAXUsUJPU6hJXFw8MDrq6ucHFxQV5eXrWuyc/Ph0qlgkqlqlfbqw2JaAwEAGvWrIFMJsPUqVOrXJRPRJg2bRoYhsGaNWukvKcSRGUgc3NzhIWFYdeuXdiwYYPOtgEBAQgPD0dYWBgsLCyMpFCAcB1DuWDbtm3lKoM9nwNxVSlNiIhk3WV53NzccPToUahUKpw+fbrcuezs7Gc5j7u7O0cKhYOoQlhZfH19YW1tjYkTJz7Lh4gInp6esLKyquSLyBLPI8oRCPj3y9KdO3fGK6+8AgBYvXo1IiMjkZiYaPRSw0Kl3i3nqCm7du3CqFGjwLIstFottm/fjuHDh3MtSzCINoSV4uzsjJEjR6KwsBDTp0+XzFNDRBvCyuLv748WLVrwZn+ZkBB9CJPQD2kEeh5tPu5eTsG1h4VgbVuhfdtXYCH6QF85koH+oejGYaz1WYHQs2q89k4HvN7wCa7H7cGf15rC5etfsNSrC6y5FslHuHyKyQs0GRS/0p3a2baiET5H6J66/LnD/+1ASpkN9fc9T0WcieQv4jaQ+jbtntGJrNgW5Pr7lYoN8jiMxtqZkEmjjyjwjsbYCnmPiKN7Pk4uGY3xay7gZS9/+E9ohQo3ADXqh36OClDWIYTsvm9skbxHtAYqOPEjJv9wHHmvuGPp94PQqNKWSlhZmgJUhKspl42oUBiI00Cai/ht3kqcL2bxjud/8WFjHW21ecjILAQASA88XkSUBiqIWY3fjucD5n0wcVIH3VPRkhSkXFWDYIJXmzczlkTBIEIDFSB6207c1DBQdneGs73un0B95QiO39IA8tfg2F0y0POIz0DF5xF7/AE0kOOtXr1hp/MXUONS+G6cVwPy14dhZNd6XK63lojPQCVpSL2lARgzvNG2pe7wVRiPwKBzKIE5unlORk+FsUQKB/EZCFqQFoBJA1g31GUfLW4F/YRNVzVg23jh+2lvQYTlo6pEfAZi30DLZjJAm4+cXHWlzbT3/w9fLdqPTNN28F71Lfo1MKJGASE+A5k6YpRza7DIRcKRv1BYUZvCC/CbOB3B917Gh74hWPZB5U+JRA/Xj8K5QHPvD/qkBUsm1n3J53xh+XOPjtPPHzYnRaMuNGXrRXrCkUahINr1QPnnA/CZxzwE334Doya5omdzUzz+Ow77D1xGgz4TMW/BFPRrJmXNVSFaAwEAtNk46z8JEzZaYezMD9GxZTs4dmkDG2m2Xm1EvB4oF+c2LsTy1OEIjhmH9jo2n2oe3MAdi9fQXNqg+gLiS6IBoOASgqf0xX9+uggmLx4bl/2M3/efwd2CF5tmJwVjye9JYOrZp04NhehCmDY9At95fY2wq5nIvHsL9/NK/nlJykBm8QrecnRExzeborGiBBk3rqOgrSd8fnBFKykdqhDRGQjqfORrLGChAKAtxP1LCYg7dgTHjifgbEoa7uXLYW3XDG26OWHkGDcMedtGeoCoA/EZSMKgiDMHkjAYkoEk9EIykIReSAaS0AvJQBJ6IRlIQi8kA0nohWQgCb2QDCShF5KBJPRCMpCEXkgGktALyUASeiEZSEIvJANJ6IVkIAm9kAwkoReSgST0QjKQhF5IBpLQC8lAEnohGUhCLyQDSeiFZCAJvZAMJKEXkoEk9EIykIRe/D/DTxUxVHz9ewAAAABJRU5ErkJggg==)
The correct answer is: ![left parenthesis 180 minus 2 x right parenthesis to the power of ring operator end exponent](data:image/png;base64,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)
Related Questions to study
In an Isosceles Trapezium PQRS,
then find the length of PR.
![](data:image/png;base64,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)
In an Isosceles Trapezium PQRS,
then find the length of PR.
![](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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)
ABCD is a square then find 'a’ in the given figure
![](data:image/png;base64,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)
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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)
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,iVBORw0KGgoAAAANSUhEUgAAANAAAAB3CAYAAAByvc4iAAAcS0lEQVR4nO2dd1xUVxbHfzNDF5GuUqQodRDFCkqi2EAjiagxYK+LUTToRpMYW9BsxOwaiW7UmNiyRs0aUBRFiBIQ1KBGZAGpgoAIiAVpA8zM2T8iyAgoMMwM4P1+Pn7Aefe9cx7zfu+2c8/lEBGBwWC0Ca6iHWAwOjNMQAyGFDABMRhSwATEYEgBExCDIQVKinaAwWgJVFmE4qciiF76XLm7AQy6KyvEJwDgsGFsBqPtsCYcgyEFTECMTkd6kUDRLtTDmnAM+VJTiOshR/Fr7F1UKqlCiaMKw/4uGMC9gwd2q7BwmIqiPWwVch9EEGT9jhM/HcEvV+8DWkbo00sTvFoBhBqmcBr3Prw97NCD1YtdECHyLvwDK9cEg/PBVmz7xypYd+cCwgJEfu6F6d9q4svMNYp2svWQAqj+fQVZKqmR284cEhERkYAeXN1Pi50MyMxzJ90oU4RXDNlRTWkHZpBFdyua/8s9Er58uOwkzR21juJrFeGbdCjgXS/Gw/+loIDTH2PGmzzvhKmil/Ni7D25EVbRazFr/e8ol79jDBkhiP8Ss1acgtri/dj1fh/wXi6gZoaBk0eA/4r2EJXly9LFtiN/zZbQ4Sk9SJn/Kf1R3fjYj+90I662Fx0ulr9nDBkgzKJd47SIp/MeHSwQtfky4qqSdnSq/ZB/DVT2OyLiKmE8egIGNOovasKsjz44ZbcQn1Qtd9cY7Y8w5Sccii6HtvtMePVu++PGUdNrR6/aD7kLSBB3AdFPdTFqwjCoNnGciADUoobppwsgxsPLsUgSKmGg61vormh3ZICcBVSDGxHRKOrmiglvdWvieAVy80sg5vZB334syqjzI8b9giKIOdowNdXpkpOO8r0nYQoiLmVDxXk83Ho0cbz8MmJuVkN5wERMMm/U1WR0Ojjo3q0bABGELwexdRHkKiDR3Qv47Q4XTuPGw7CRZTHyTvyI0If6mLxy0StHZBidBR4sRruiL/cZEm4kQdhMqYqnpc0e6+jIUUBiFERGIoH4GDu+8VCm8O5PWLUpCr0XfIdvZxl1yer+TURl+Eqs9zJE2g8bse/Oyx1bIfIufo+fb1V02u9bfu958QOEnfkDtSbzMMqmgVlxGdLCgvDJp0chWnoaF9eNQa/O+tdkNIZrilkHzqF2zUpseWcU4ufMg7ujIThP85FbLILRqFlYOKLnawVUE7cBKiO3yMXl1iC3WLj/bPXCxoDTyFGxgrv3WJhxqlFZ9gRPngqgbjMecz9cjMm2XXGchlGHqPQekpKzUFjGg26//hjQVxctjXyrTToAZYeFMvWvLXS4YNLU1FT4+voiISEBHA6nyTJEhNraWvB4PPB4bLBB1lRWVkJZWRnKyq1fuMblcuHu7o7vvvsOOjo6MvBOsXS4rnpYWBhiYmLw/vvvQ19fv8ky1dXVOHDgAJydneHk5CRnD9887t69i5iYGHh5eUFdXb1V56anp+P48eMoKSnBuXPn2iTCDo0iwyCaYty4cdSrVy8Si8XNlnny5AkBoMDAQDl69mYzf/58cnFxocrKyladJxQK6d133yUA9OGHH77ye+2MdKjuekVFBWJiYuDh4dFs842hGPbt2wc1NTXMnTsXYrG4xefxeDwcPXoUAwcOxJ49e7B7924Zeil/OpSAoqOjUVNTAw8PD0W7wngJFRUVBAcHIyUlBQsXLkRNTU2Lz9XU1MSZM2dgZGQEf39/hIeHy9BT+dKhBBQeHg4ul4tx48Yp2pUuRDVyY37FxbtNhwII7ifiSmwsYmNjERsbh5vZZS8Oiopx49c9+GbXUcTkCqCtrY2oqChkZGRg/PjxKCkpabEXJiYmCA0NhZqaGj744AOkpKRIe2MdA0W3IRtiZWVFzs7Ory3H+kAtQUgFsQfoU8++pKFkTEvOC5ookkk73boTByAABJ4xLTj99K9jZX/QNvehNGN3HKUl/ExLXN1oY/QTIiKqqqqi2bNnk6WlJcXGxrbKq+DgYOJwOGRhYUHFxZ1/zUqHEVBmZiYBoE2bNr22LBNQyxAIBCSI8Scr5aYFVP7bKvLyO0IRkZEUGRlJv126TQ+EREQCuvqZI2mP3UX3REREIio8+B7p235EUc9XC4vFYtq1axdpaWmRr68vPXnypMV+BQYGEgBydXUlgaAJYXciOkwT7sKFCwDA+j/tiKqqKpT0DaDT1LcsysHhoFuw8BiBYW7jMG7cOIx1c0QvHoDycOw9mIq+b4+GERcAuDAY4waH7P/gu7OPAQAcDgd+fn5ISkpCUVERbG1tsWPHDpSVlTVhTJI1a9Zg4cKFiI2Nha+v7/MlLJ2TDiOg8PBw6OjoYOjQoYp2pWvB5Tb5JVfG7kTQ+Wjs8LSGSb+xWHkkEXWPfs2fUYgrUYKphVn9RCHX0BLm2s/wR/SfaBjRZmpqipCQEBw+fBhnzpyBqakpPvnkE2RmZjbrEofDwZ49e+Dm5obDhw9j+/bt7XSz8qdDCKimpgaXLl3C+PHjWWSBnFBx9MfJy+dw9J9+GKVyHf9e4AbPbddRAaAqOxv3SRt6+g0Cbbha0NIkFOXloqqJ67m7uyMqKgq//fYbcnNz4ejoCHt7e3z66aeIjo7G48ePJe2rqODkyZOwtrbGZ599hpCQEJner6zoEJEIcXFxqKioYM03OaKkY47+zubo7+yBmb6LsWfWRKz88hPsf/8CfCqrIIIqJIMO/pqXI0EVqsSAdjOv3iFDhuDYsWOorKzExYsXERoaigULFiAnJwf6+vqwtbWVCOkxMDBAZmYmvL29ce3atU4XWdIhBFQ3L+Du7q5gT95QuvWH796v8Fv/D3HpcgUWa3aDEoQQNlykQ5WoEhCUNLtDswXtFg0NDXh6esLT0xMAUFVVhYyMDKSmpuLZs2f15VRUVODj4wN/f394enoiPj4eRkZG7XyDsqPDCMjR0bFT/eG6GtxeHpgwSBlnxQQVW2uYcS+ipEQI1GWuqH2MR6VcmFpZNZnL4nWoq6vD0dERjo6OTR7X1NTE/Pnz8d577yE6OhoaGhptvhd5ovA+UEFBARITE1nzTdGISlEqGoRRI7WgMtAdY0xqkJGcXr9SVJidjpxaY4yd6NTiJQitYd68eVi3bh1u3LiB+fPntypcSJEovAbav39//c8jR4606ByRSAQdHR2oqanJ0rWugUgIIYkhEjUcKq7AnbBfkWYyGe8O0AUXNcgJ3oHrI77AQRsegFFYvmIEThwPQ9pmJ/B5ImSdv4j8kavw0SjZ/c23bNmC9PR0/Pe//4WtrS0CAgJkZqu9ULiArl+/DiUlJXh6erZ6BM7KykpGXnUFxHh0MwT/2X8GGcISPPnxaxzUnIsFo8wAUSEuBX2EldFrMXCCG2y6EbQG/Q27NrtCEwDAg92K/diZtBAfrzXEbIskHLs0BPsOLYe1DAdJuVwuDh8+jHv37mHLli2wsbHBrFmzZGewHVDogjqRSAQDAwO4uroiNDRUUW68mVQ/QOK1RBTzesNukCOMm+xy1KAo6Q/cqTDGwCGW0JbTDENhYSGGDRuG4uJiREVFwcXFRT6G24BCBXTt2jW4uLjg3//+N5YtW6YoNxgdkMTERIwcORIaGhqIj4+HmZmZol1qEoUOItQNX7MBBMbLODo64sSJEygpKcHkyZNbFCKkCBQuICsrK1haWirSDUYHZdKkSfjmm2+QlJQEHx8fiEQdLzujwgT06NEjxMfHs9qH8UpWrFiBZcuWISwsDGvXrlW0O41QmIAiIyNBRCz6gPFKOBwOgoKC4OHhgR07dtRPe3QUFCagCxcuQEVFBaNHj1aUC4xOgpKSEo4fPw4+n49ly5YhKipK0S7Vo5BROCKCkZERHBwcEBkZKW/zjE5KTk4Ohg8fjtraWly7dg3W1taKdkkxNVBiYiIKCwtZ/4fRKszNzXHq1ClUVlbC09MTT548UbRLihEQG75mtBUXFxccOnQI6enpmD59OmpraxXqj8IEZGJiAnt7e0WYZ3RyvL29ERAQgEuXLmHFihUKXRIudwGVlZUhNjYW7u7uLHkio82sX78es2fPxr59+/Dtt98qzA+5CygqKgpCoZA13xhSweFw8MMPP2DkyJFYvXo1zp07pxA/5C6g8PBw8Hg8ljyxiyOqroas4wZUVVUREhICc3NzeHt7IykpScYWGyNXARERzp8/D2dnZ2hra8vTNEMu1CAr+BNMstOFuro61LX7YrTvD7hVKjuLBgYGOHv2LLhcLiZPnozi4mLZGWsCuQooIyMDOTk5rPnWRSmP/hwzPo6DwdTPEPiPjzHF/DEu71+KSfMPIluG1ZGdnR1OnjyJ/Px8eHl5QSAQyM7Yy8gzi2NQUBABoPj4eHmaZciFEjq6YjH9lC188VHZVfp8sBpxlAfSxlu1Mvdg3759BIBmz54tt21U5CqgSZMmkb6+PolEInmaZcgD4T26EneXhBIfiujeztGkwjWiRWHtm8L34cOHtGvXLvLx8SE7OztSVVUlHR0dWrlyJQGgrVu3tqu95pDbkm6BQICoqCh4eXmBy1V4LhNGe8PrA5cRL3/IhWY3dXCULWFbv7G0GBX3E3Hl92jE5Zth/sdTYM4DxEUx2PtNKGonfoKPRhk0ayYzMxOff/45QkJC0LdvX7i7u2Pt2rWwtraGnp4e+vXrh5ycHKxfvx42NjaYPn26rO74L+QiUyKKiIggAHTkyBF5mWQonCqKXGpGupP2PU9ST0TCDPp5zSx6Z6AhKfOMaeGZZyQqOkcrB+mSuhKPjJecb/JKQqGQAgICSFVVlaZMmUJXrlxptplWVlZGAwcOJHV1dbp+/bqM7u0v5Cag1atXEwAqLCyUl0mGghEVHydvi2G06XoTzbfyKFphpUw95xyiXz79GwX9WUYVD7Io/1njolVVVTRt2jTq3bs3hYWFtch2Xl4eGRkZkZGREeXn5zdTqppyYo/R18u9aMIEd3rPZxH5LplPcxavpW9OJ1MTrjRCbgKyt7cnJycneZljKJwnFLliOI0NTKCmez/V9PsKS1LWtqNFP+dTc71ioVBIHh4eZG1tTdnZ2a3y4MaNG6ShoUGDBg2i8vLyZkqJKGfH26SiPJS2JguJqJYeRP6dBmlo0ZCNca+1IRcB5ebmEgD67LPP5GGOoXBEdP/kEvLw/ZXyXzFeVH5qLhmqDKbNic2P0AUEBFDPnj2poKCgTZ6EhIQQh8OhqVOnNjN4VUYnZ+qTssM6ul7nhjCV/uGsTDzjv732+nLpzbO9f94sSq9+Bf/QIfhX0FQYN/uElePP5PtQRQriYh+iqTykycnJCAgIwNGjR9G7d+82+TJlyhQEBgYiODgY69evb1xAEIeImFKYjXWHY904h7AQhQ8JXH3D1xtok6xbybRp06h79+5UU1MjD3MMBVJ+K4hm+wTSHxIdCBE9SUokiSmiuED6dP9Z2jhYhfR8/ktlRCR4+pQqGpw1Z84c8vLyktonsVhMixYtIgB0+PBhiWPVl1eRtbIxLT5X9dzVRxS7+S3S0bCmRb++vtaT+YrU2tpa6OvrY+zYsQgODpalKYaCKb+5Ex/M/Am6M2dhkNbzSHsSouzeVZwrnIATQQ6IOl2Otz1q8f32fMwLWoiCj2wwMdwTF+LeR9KJSniv8IAB96+kM7169cLly5fh7OwstW91u7/HxsYiIiLieSoBIW5tHILhXz2D26LJ6CcsRsaN2yhz8MFHH/thxkDd14fqSC3v13D58mUCQHv37pW1KYYCqU3ZTe6GvBcbFjf8x+lBnj8+oIqQOaTPVaIe/IV07Hl1VH5uCZkqqZPphACKfvSijxIaGkr6+vptjiiorq6mxMREOnbsGK1fv56mTJlClpaWBIBMTEzo7t27RMJU+spZlfS8j9OjqqeUf+sUfeFhTBrG7rT9WkvG4ORQA23YsAFbt25FdnY2zM3NZWmK0dERP8T/YtKg6jQC1j3q3u2lSL+aBpUBw2DeIL3wunXrkJSU9NqUz0KhEJmZmUhOTkZycjKSkpKQnJyM9PR0CBtscGRmZgY+nw97e3s4OTlh6NCh6KsWjvE2n0NjdyZOLzQEF4C4YC8mWi9DzMBA3I5e89pc4DKPRAgPD4etrS0TDwPgGqD/6JejDHrA2mVYo6JFRUXo06dP/f9FIhGys7MbCSU1NRU1NTX15YyNjcHn8+Hu7g4HB4d60XTv3v0lC2I8PBiJ6zQIAWP065tqXF1TmGhxUJuXjTwhFCug4uJi3LhxA/7+/u1+bXFRNIK2/IQMCJGT9ACmM77AV0udocuihDo1RITc3FxYWVmhoKAAc+fORXJyMu7cuYOqqhe7s/bs2RN8Ph++vr4SQmm4feSrKcOlC3Go5q/EWJMXD40w8yZulwDdJw2Dg/LrryJTAdWlrGr34euaBARO9UbkjCuI/MgMpZEr4DL5HXiLr+C8nw3YNsUdHyJCQUFBfU1SV6ukpKSgvLy8vpyuri4cHBwwf/78eqHw+Xzo6+tL58DTSIRGlcF8znjUhelV54Rho+9O3O7hhu1bZqJnC17GMu0DzZkzBydPnsTjx4+hLrljrVRUR/nB1iMCXheTsMNVBRClYZtrf2ysWIMrf36JIQrf9YhRBxGhuLi4kVCSk5NRWvpipZ2WlpaEQOp+79mzZ7vnzsi7egIn936JDT/dgc6IGfBw0ED1w3u4k/4YesO9sHSNP6bYdGvRtWT2qInFYkRERGDUqFHtKh4AqM3LR6GoChUVz7XPM0N/vj7oXBGKhegA24a9mTx69EhCIHW/P3r0qL5Mt27dwOfzMXXqVAmhGBsbyy3JjKnLB1jl8gFWHZb+WjJ71BISElBcXNz25psYjdbLikRi8HhcqFiYw4RzDrdvZkPkbgseOFDi8aDBdwJfFht4MiQoLS1tUihFRUX1ZdTU1GBnZ4dJkyZJ1Cp9+vTpUstZZCagtiRPFCSdQOCeYMTEXUGCcDpOXvsGbpqAuDASm2YtwD+vaWNl+E0EjvDD2km/wO+HrxAy7wCmqsfi3P8s8fd/zYNZ1/luFE55eTlSUlIaCeX+/fv1ZVRUVGBjY4MxY8ZICMXCwqLVW3Z2RmQqIDMzM9jY2LT8JF4P9HFwgtXt3xF95QC+Pvox3p6dh60+K3G2QhPdOFUorxQBvH5YcuIyjHYH4Zd1frhqYom395/FNL6mrG6nS1NVVYU7d+40qlVycnLqy/B4PFhbW8PFxaW+2eXg4IB+/fpBSenNbTPLZBChtLQUenp6WLx4Mfbu3dvq88UFP+Bdvi+iR+xG8Mg4hNptx04vI/CaaNYxWk51dTXS0tIaCSUrK6s+uyeXy0Xfvn0l+id8Ph/W1tZQVVVV8B10PGTy6rh06RJEIlGb9/7h9noHk4er4fzlL/HVkGM47WX019A0E0+LqK2tRUZGRiOhZGRkSOzyZmFhAT6fj2nTptWLxdbWtt0HfboyMhFQeHg4lJSUMGbMmLZdgGuIMWMGQum3B7AfPQwvzyEz/kIkEiErK6vR8HBaWppE0nVTU1Pw+Xy888479UKxs7ODpiZr8kpLuwuIiBAeHo4hQ4Zg27Zt9Z1MR0dH2NratrC9TKipFYEnzkd8XBZEbvZv9OSoWCxGTk5Ok2EsDXOg9e7dG3w+H2PHjpWYne/Ro4cCve/atLuAUlNTkZubi5kzZ6KgoACPHz/G0aNHkZWVBQMDA8yaNQsLFy5E//79m72G6O4h7H/2FibqXUf4lTiUiO1bNCvc2SEi5OXlNRJKSkoKKisr68vp6+vDwcEBixYtkuir6OrqKtD7N5N2F1Dd8PWMGTPg5ORU/3lZWRnOnz+PQ4cOwcnJCfPmzcO2bdtgYPBScKEoCwcDk/H25o9R9OdunLp5GVerlmAK3cDFhD5wczXs9F0hIsKDBw+aFMqzZ8/qy2lra8PBwQFz5syREIqhYQtWSjLkQruPwnl4eCAhIQEFBQXNTpglJCRg2bJlSEtLw+nTp+E6RB27PvwnCjxWwvX2DoQ5BWH3+4ZI/mI4Bm95gkWnz2Jc7EFULNmGuZadqzH38OHDJsNYGu6upqmpKSGQup+9e/dmW8B0dNq0WqkZKisrSU1NjebMmfPasiKRiDZt2kRqamr0649Lyb0bhzg8PXLdGE2Pn6+rqr21mQarcYirPYQ+Pl/YbOaWjsCjR48oJiaG9uzZQ35+fjR69GgyMDCQWFimrq5OgwcPpnnz5tH27dspLCyM7t27J7c0tIz2p12bcNHR0RAIBC2KPuByudi8eTN69eqFWcv9Ebp/J/ysp2HCMGPUReMoDfwUwReH4l6vUXjLsmXBfbLm2bNn9bVJwxrlwYMH9WVUVVVha2uLCRMmSMzOm5ubd6kwFkY7N+H8/f3x7bffoqioqHHf5hUsX74cERERSEhIQLduHUMoFRUVuHPnTqPmV15eXn0ZJSUl2NjYNJp07Nu37xs9O/8m0a4CsrW1hZaWFuLj41t1XnV1Nezt7eHn54dVq1a1lzstQiAQIDU1tZFQcnJyJGbnraysGgnFysoKKiosevVNpt0ElJOTAwsLC2zYsAEBAQGtPv/777/HF198gezsbJk8lDU1NUhPT28klKysLIjFf2Ul43A4sLS0bLQmxcbGBmpqau3uE6Pz0wYBiXDvP/74Uf9rBHi8eKj27duHpUuXIjY2FiNHjmy1IwKBADo6OoiIiMBbb73V6vPraJhkoqFYmksy0VAodnZ20NDQeMXVGQxJWt1QF2Xux4drfofjKcnOcHh4OHr06IHhw4e3yRE1NTUMHToUcXFxLRJQwyQTDYXycpIJIyMjODg4tCDJBIPRelonoJokBP1tHS487o9xPV+cWlNTg4sXL8Ld3V2qzrOTkxOSk5MlPhOLxcjNzW0klJSUFIkwFkNDQzg4OMDX17e+VmldkgkGo/W04mkX4GbQTqTomYGnrIee+i9qoKtXr6KsrEyq5CFEBD09PeTm5mLHjh0Ss/NNJZlYsGCBRPNL6iQTDEYbaLGAyuO2Y0/NPHibXsYRHQPoN0j5U5c8viXLF4gIRUVFjeZRGiaZOHXqFLS0tMDn8+Hj4yPRV5FFkgkGo620TEBPLuKrg+pYvnsw7i56COj3Qs8GETXh4eFwcHCAiYmJxGklJSVNCuXlJBP29vb1SSbqhCLPJBMMRlt5vYDExTjz5TEY+n8HJ5XHuFpcAY6eYX10dGFhIW7dugVvb298//33EmJpKsnExIkTJeZSzMzM2Ow8o9PyGgGJcf+Xv+PLdHPMv3oY+68U4WKWGOrDDFGX2jgmJgYaGho4fvw4jh8/DmVlZdja2sLNzU1CKJaWlm9EkgnGm8UrBSTK/hk7b7khcJ09VAGgthJhzzjQMzSoX+CWmZmJ1atXY8CAAeDz+ejXrx+UlVuQE5XB6AI0LyBhKg7tLcB769bCtW5BY2kqxJWArqFh/Ynr1q2TuZMMRkel6c6H+DEubdiMu5OWvxAPAFF+Hh4IOdDW1QXr3jMYTQioLDkUXy+egOn/uoLk63+iQAwA1ciJPYptGw7htlCIW8e/xsHIOyhtfD0G441C5htsMRhdGTZ+zGBIARMQgyEFTEAMhhQwATEYUsAExGBIARMQgyEFTEAMhhQwATEYUsAExGBIARMQgyEFTEAMhhQwATEYUsAExGBIARMQgyEFTEAMhhQwATEYUsAExGBIARMQgyEF/wf1OKKBXcbL5QAAAABJRU5ErkJggg==)
In DABC, if AD is bisector
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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)
Therefore, is 85.
In DABC, if AD is bisector
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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)
Therefore, is 85.
Find ‘b’ in the given figure
![](data:image/png;base64,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)
Therefore, the value of b is 125.
Find ‘b’ in the given figure
![](data:image/png;base64,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)
Therefore, the value of b is 125.
Find x in the given figure
![](data:image/png;base64,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)
Therefore, the value of x is 65.
Find x in the given figure
![](data:image/png;base64,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)
Therefore, the value of x is 65.
Find x.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGQAAAB/CAYAAAAZ82cMAAAQ+klEQVR4nO2de1AUV77HvzMMEMAHjggIiAQCoggUGrk+YiLsBJCsRkN8ESKJL4zZLCiitdx1y+uWrokp31dCvFEUlFIXERUVF1lfiCayIsGgFsIIIg8FBhge8+rf/cM4ijDAwDx6dD5VUzXT5/zO79fz7T7n9OnTpzlERDDCGrj6DsBIR4yCsAyjICzDKAjLMArCMoyCsAyjICzDKAjLMArCMoyCsAyjICzDKAjLMArCMoyCsAyjICzDKAjLMArCMoyCsIw3WpDKyko4OjqCw+Fg9erV+g4HwBsqSGFhIebMmQMnJyc8fvwYwDNxWAG9ITAMQ+fPn6dJkyYRgE6fs2fP6jtEIiJ6Y86Q9evXIygoCHl5eTA3NweHw+mQbmdnp6fIOvLGCDJu3Dh4eHhg+/btyMrKAr0y+4ktgrwxVdZzxGIxDR8+nABQXFwc8Xg8AkBSqVTfoRER0RsnSEREBAGgMWPGUGNjIwEgKysrfYel5I2psgDg+PHjSElJgYmJCTIyMtDY2AgAGDJkiJ4jewFP3wHoisrKSnz22WcAgMTERLzzzjuQSqWIjIzExIkT9RzdS+j7FNUFCoWCJk6cSAAoNDSUGIbRd0gqeSOqrC1btuD69euwtrZGcnJypy4vm+AQvd6z3wsKCuDn5wcAyMnJQUBAgJ4j6h6DPUOYuhyknq7oNk9raytmzpwJAIiOjma9GAAMtA1RVFHaQg/66Men3WZbtGgRASAPDw+SSCQ6Cq5/GOAZwqAiMxmphS0YOsxKZa5Tp05h37594HK5OHnyJMzMzHQYY98xuG6vovQ4jjf7YYI1H0/suj6eqqurMX/+fADA7t27MWrUKDW9MKi/cQ5XayUY6DsTAc4m/Yy69xjWGSItxpGThBmzrPCkjg87u85/FBFh7ty5aG1thUAgwPLly7soiIHozgkcuVQN5uXvzBP8ciIFh49lYv/p+3Cf3IKLqXcg1/6eKTEgQST49dhRPOA249Kho7hew4fdsM6CbN++HVeuXAGPx8Pq1au77uKKhbh5YAu2X3wCRvm9GncTYnGQQhE28t84crECXDMeFG2tYHSwd88xGEGaf0nDbbdorPvzInw5yxMDB9hg2CvNQlFREVatWgUAiIqKQmRkJNatWwe5/JVjfIArJo93gQXnpe9MCVJTGuH7AR/mvoEY+eg6krJEcAvygS5bHwMQRIwH5zYhIi4HVs4DgdYK5B0+h8Lmh7j1y4tub3t7u7KLu2LFCuzevRsFBQW4ePEi1q5d27nYl88cDgdQPERJHR+2lgA4Q/H24AEY/l+L8eVkSy3vX0cMoFEfALeQeGSEPP89ApOi0/EoumOumJgYlJWVwdXVFVu3bgUA2NvbIyMjA/7+/vD398e8efNUu+HwwIP89/ZCConMAgMHmmp+d3rAAM6Q7rl8+TJ8fX2RmJgIADh58iTMzc2V6Xw+H/v370d8fHznqutlTEZjgvtTCKsUQFs5qu3exYQB2o6+MwYtSHp6OoKDg1FYWAgA+Oqrr+Dl5dUp39SpU+Hs7IwjR44829BegfzbQlTc/QX3qx4++37/ESb9aQpKDqQhY99tjF0ThTH6qD/0fWXaH6ZNm9ZhosKsWbNU5k1OTqZPPvmkxzJlDZVU2SDTZJhqYdBniEKhUH7ncDjw9PRUmVcgECAnJ6f7agsAz9oBDtb6a1oNVpDi4mJcuXIFADB48GBYW1tj8uTJKvPb29uDz+ejtLRUVyH2CYMURCKRKLu4S5cuhUgkwq5du7Bt27Zu7ZycnNgzIU4FBinImjVrUFJSAhcXF+zYsQMAMHfuXJSUlCA/P1+lnYODg3KmIlsxOEEuXLiAnTt3AgAyMjJgYWEBADA1NUV0dDS+//57lbZEBC6X3bvM7uheoa6uDmFhYQCe3Zb18fHpkL506VKcP38eQqGwS/uWlhZYWakesmcDBiMIESEiIgKNjY2YMmWKcszqZQYNGoRFixYpq7FXEYlEGDRokLZD7R9663Cryd69ewkAWVhY0OPHj1XmKy8vpyFDhlB9fX2H7QzDEJ/Pp+rqam2H2i8MQpD79++TiYkJAaATJ070mP/zzz+nzZs3d9hWUVFBtra22gpRY7BeEKlUSp6engSAIiMje2VTUFBADg4OHe6jp6WlUXBwsLbC1Bisb0Pi4+Nx9+5dODk5Yc+ePb2y8fX1hZeXF1JTU5XbTp8+jenTp2srTM2h7yOiOy5duqQcp8rPz1fLNisri8aOHUsMw1B7ezvx+Xx6+PChliLVHKy9HyISiTB79mwAwMaNGzFu3Di17D/88ENwuVxkZWVBLBbDy8sLzs7O2ghVs+j7iOgKhmFoxowZBID8/f1JoVD0qZyDBw9SYGAgjR8/ntLT0zUcpXZgpSBJSUkEgMzNzamioqLP5UgkEnJwcKAlS5b0WVRdw7pGvbS0FEuWLAEApKSkwMnJqc9lmZmZISYmBm1tbawfMlGi7yPiZWQyGXl7exMACg8P10iZIpHIYBp0IpZVWfHx8QSA7O3tqbm5WWPlxsbG0qpVqzRWnjZhjSC5ubnKLu7PP/+s0bKfD6c0NDRotFxtwIqKtampCbNmzQLw7HnyCRMmaLT8ESNGIDQ0FHv37tVouVpB30cEEVFYWBgBID8/P5LL5VrxcevWLXJ0dGT9Ywl6FyQlJYUAkJmZGQmFQq36EggEdODAAa366C96FUQoFJKpqSkBoEOHDmnd37lz58jb25vVD33qTRC5XE5+fn4EgD799FOd+GQYhsaOHUtZWVk68dcX9CbI+vXrCQANGzaMGhsbdeY3KSmJBAKBzvypi14EuXHjhrKLe+3aNZ36lkgk5OjoSLdu3dKp396ic0Gam5vJ3t6eAFB8fLyu3RMR0bfffksRERF68d0TOhckPDycAJC3tzfJZPqZQ9vQ0EBDhgyh8vJyvfjvDp0KcuzYMQJAPB6PHjx4oEvXnVi5ciXFxsbqNYau0JkgFRUVZG5uTgAoKSlJV25V8vDhQ+Lz+SQSifQdSgd0MnTCMAzCwsIgkUjw8ccfY+HChbpw2y3Ozs4ICQlh33CKLlTfuHEjASA+n8+qAb78/HxycnJi1XCK1gXJz89XdnEvX76sbXdqExgYSMnJyZotVF5NxXkFVCZW31SrgrS0tJCjo6Py3nhTU5M23fWJM2fOkI+PjwaHUxRUk7qNfvrtDO3co/61jlbbkBUrVqCyshLu7u5wdXXFtGnTUFtbq02XahMSEgKGYZCdnd1tPqb+VxxYuRjbbr30BFZLHv6+8H+QK21F4aFtSEj9Ef/7z99QIWzEW3bWaG14pHY8WhMkIyMDBw4cAJfLRWZmJg4fPozQ0FAEBwdDKpVqy63acDgcxMbGdvsYAwBw+aPwjtlT1LQ9X9ehGTeOZeJ2bT3ahAew6d+OiJg3B4NOb8QvXiPRerUMdt7j1Y5HK4JUVVVhwYIFAJ6tb+ju7g4Oh4MNGzbA0dERmzZt0obbPrNgwQIUFRUpn+ZVBY9ngufLDTTmpaNk9Az4WHIgvXkNj+zehgXXCi78R8jnzscXIXPxxYzhaseicUEYhsGcOXPQ1taGkJAQLF68WJnG4XCQkJCAHTt2oKmpSdOu+4y5uTm++eabHs+S5zD1OUjKtcQYixrUtzSisroJDO/ZIgNEcjAKgGfWtzmIGhdk27ZtyM3NxeDBg3Ho0KFOi7+MGDECAoEAycnJHQ2ZGlzaFYX3XAPw/c3L2L4oGIErT2k6PJUsX74cp0+fxqNHPdf7JJaC2/IrTqSdx53K+/i5zR6DaqsghxxPRDbw9OzHChAa6loQEdHt27eVXdycnByV+dLS0mj69OldpMio4G8TyDs8iQpaNBlZ74iJiaG4uLiuE5vu0U/zx9PcvXdfbJPdpg2zo+lC6yP659/+m346lUh/+fspqu7HnDyNCdLa2kouLi4EgKKjo7vNKxQKyd7evsu0htR55DrnEOnj8rGsrIz4fH4f789IqL66jtr7GYPGJlvHxMRAKBTC3d0d3333Xbd5nZ2dIZVKUVVVheHDX2r4WvKRJfGE3/1c3Gz5EN7tQ2E3VHcTY1xcXBAUFIS9e/ciKioK2dnZuHPnDkxMTGBjY4OPPvqoY7wdMMMQO37/g+inoERElJmZSQCIw+FQcXFxr2zef/99ys7OVv5OWxFAs2P+j26IHlHiH0dT6F+PU5Eeqq2rV6+SlZUVWVlZkUAgoLVr19KaNWto/vz5ZG1tTYGBgVRYWKg1//0WpKamhqysrAgA7dmzp9d2EydOpNzcXOVvSW05Vf0ugKyukqr1IAYRUW1tLY0cOZISEhI6pbW3t1NCQgLZ2NjQwYMHteK/X4IwDKNcAEYgEKg1/ODp6Ul37tzpj3utkZmZSb6+vir3p6ioiGxtbTU+w5Kon4KsWLGCAJCbmxu1t6vXnNna2rL6idiAgIBupybl5eWRnZ0d1dTUaNRvnwUpLS1VvgzlyJEjattbWlpqdEK1ptm1a1e3yz0xDENTp07t0753R58Ekclk5OvrSwBo3rx5atu3t7cTj8dj9YQ1sVhMNjY2dO/ePZV5tm7dSsuWLdOo3z4J8vXXXxMAcnV1pba2NrXtn78tje1s2rSJFi5cqDK9oKCAPDw8VKaHhIQQAAoMDKSSkpJe+VRLEIZhaPHixcqr8aKiInXMlcTGxtL69ev7ZKtL6urqyNLSkkxNTSklJaVTel5eHr377rsq7dPS0sjCwkL5f61cubLHe0JqCbJq1Spl4aampnT8+HF1zInomaijR4+m69evq22raw4fPqxsJy0sLCgxMbFD+tGjR2n27NndllFfX09RUVHK/23gwIG0f/9+lc88qvX+EFNT0w5L5HG5XJiaqjeQxjAMZDIZzMzMWP1iFQCQyWRgmBfrWnM4nA6L+stkMnA4HPB4PQ94SCSSTtuePHkCGxubDtvUGjp5VRCGYbp01BvYdJOqtxBRl/v78tqP6tCVnVoDRWKxGKtXr8YHH3yAH374AQqF4rX+yOVyrFu3Dn5+foiLi4NcLle7DLFYjPj4eOV/yOPxsHnzZkil0q5fZqmZ2tZIV1y4cIFsbGyU7Ud4eHiPF5JGQbRIQEAAASAfHx+6efNmr2x60agzaLh3Bsk/nUetrRccua2w8J+L8PccdfrWAEOkvLwcxcXFCAoK6n0HpleySa5RnM979I+7ciLRGVo2yo/ib7Bntt/rRK96WYqyS7huFoAdbiaA3BJvUSNEza/12/ZewNSj4Og+ZJSZwX7oW2BEZbiVz0FwwiaEaeB+1Kv0QhAGleezUTHiI1SfTcaW82dQH/EDtgSY92xq6EjvIenLL3B83G4c/st4DAAAxW/Y/KcT8NDSWpo9d3uZp/hXdjUC5/wBw0yqcSOvBm7T/GHPiiUHtIkct7//En+tj8TOmN/FAAATD/xx2UyM1tZKYz1Wag2pNG9UJKWLiYja6cLXb5Pt5+mk/pCigSE+TYudHGhhum7nI/d4nIsvZeGW1x/wvhUA+UMU3BHD08cTun/3jG6R/5aLGw3emDx5oE79dnviNT+4gJ17zkJuORKpO/+Bsp+vonT8Lvz4jSd092Y//cDIZZCbWGKAjhfCfu1fTtxnWs4hyufPMEn8D/YIXrz7qLnsAcTObhiupSPSKIhKGNRe2IDFG4rgt2gJBG+bQPRUDDO3KQjytdXaYwNGQXpC0YiKe0I0mNjBzd0eVlruXRoFYRmv/dWEoWEUhGUYBWEZRkFYhlEQlmEUhGUYBWEZRkFYhlEQlmEUhGUYBWEZRkFYhlEQlmEUhGUYBWEZRkFYxv8DDXPBgMsxOXYAAAAASUVORK5CYII=)
Therefore, the value of X is 70.
Find x.
![](data:image/png;base64,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)
Therefore, the value of X is 70.
Two circles of the same radii are
So we understood the concept of circles and how they can be equal with the same radii, so Congruent circles are those whose radii are equal.
Two circles of the same radii are
So we understood the concept of circles and how they can be equal with the same radii, so Congruent circles are those whose radii are equal.
The point which divides the line segment joint the points A(7,-6) and B(3,4) in the ratio 1:2 internally lies in the
Here we used the concept of line segment and section formula, the coordinates of the point that splits a line segment (either internally or externally) into a certain ratio are found using the Section formula. Here the x coordinate is positive and y coordinate is negative, so it lies in IV quadrant.
The point which divides the line segment joint the points A(7,-6) and B(3,4) in the ratio 1:2 internally lies in the
Here we used the concept of line segment and section formula, the coordinates of the point that splits a line segment (either internally or externally) into a certain ratio are found using the Section formula. Here the x coordinate is positive and y coordinate is negative, so it lies in IV quadrant.
2 women and 5 men can together finish an embroidery work in 4 days while 3 women and 6 men can finish it in 3 days What is the time taken by 1 woman alone?
So here we used the substitution method to solve the question, apart from this method we can also use the elimination method to solve the problem as we have variables here. So the total number of days taken by a woman is 18.
2 women and 5 men can together finish an embroidery work in 4 days while 3 women and 6 men can finish it in 3 days What is the time taken by 1 woman alone?
So here we used the substitution method to solve the question, apart from this method we can also use the elimination method to solve the problem as we have variables here. So the total number of days taken by a woman is 18.
In a competitive exam, 3 marks are to be awarded for every correct answer and for every wrong answer, 1 mark will be deducted Madhu scored 40 marks in the exam Had 4 marks been awarded for each correct answer and 2 marks deducted for each incorrect answer, Madhu would have scored 50 marks How many questions were there in the test? (Madhu attempted all the questions).
In a competitive exam, 3 marks are to be awarded for every correct answer and for every wrong answer, 1 mark will be deducted Madhu scored 40 marks in the exam Had 4 marks been awarded for each correct answer and 2 marks deducted for each incorrect answer, Madhu would have scored 50 marks How many questions were there in the test? (Madhu attempted all the questions).
Two sets A and B are disjoint if and only if
Two sets A and B are disjoint if and only if
If ![A equals open curly brackets x colon x text is a factor of end text 15 close curly brackets comma B open curly brackets x colon x text is a factor of end text 18 close curly brackets text then end text A intersection B equals](data:image/png;base64,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)
So here we understood the concept of sets and its various types that are there. The concept of intersection of sets was used which is basically when there are common terms in the given number of sets, those comes under the intersection. So .
If ![A equals open curly brackets x colon x text is a factor of end text 15 close curly brackets comma B open curly brackets x colon x text is a factor of end text 18 close curly brackets text then end text A intersection B equals](data:image/png;base64,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)
So here we understood the concept of sets and its various types that are there. The concept of intersection of sets was used which is basically when there are common terms in the given number of sets, those comes under the intersection. So .