Maths-
General
Easy
Question
Compute the value of x in the given figure.
![](data:image/png;base64,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)
.
The correct answer is: ![50 to the power of ring operator end exponent](data:image/png;base64,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)
By solving the figure we should find value of x
![F r o m space t h e space f i g u r e space i t space i s space c l e a r space t h a t
angle A B C equals 180 minus 120 equals 60 degree
S i m i l a r l y
angle A C B equals 180 minus 110 degree equals 70 degree
W e space k n o w space t h a t space s u m space o f space a n g l e s space i n space t r i a n g l e space equals 180 degree
H e n c e space x equals 180 minus 70 minus 60
x equals 50 degree](data:image/png;base64,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)
Hence option B is correct
Related Questions to study
Maths-
Compute the value of x in the given figure.
![](data:image/png;base64,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)
Choice 4 is correct
Compute the value of x in the given figure.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKoAAACeCAYAAACinZE5AAAdFUlEQVR4nO2deVxUVf/H3zPDNqCgLLmC5opWpoaaW8ZiopFBolmmZuWuT6GlWGa4UKKS4pKZmpbaYwkiPKg/F3wKEdRM0dxKXBBwQVD2feb8/nB5ohBZZve+Xy//8J653/O5w2fOvefcc75HJoQQSEgYOHJ9C5CQqA6SUSWMAsmoEkaBZFQJo0AyqoRRIBlVwiiQjCphFEhGlTAKJKNKGAWSUSWMAsmoEkaBURn18OHDrFmzhvz8fH1LkdAxRmXUoqIiFi1axPPPP09UVBTSfJrHB6MyauPGjVEqlZw5c4bXXnsNX19fEhMTpRb2McCojOrk5IStrS0AarWa6Oho/Pz82Ldvn56VSWgbM30LqAmOjo7Y2dk9+H+DBg0YP348ffr0qXGsnEtxfL92K5fLrFGXllCuFqAuo7zhs4waN5JeLeprUrpEHTGqFhXAwcEBABcXF0pKSmjXrh1OTk41jmPl0Ir2De8QvSMBRauuvNCvH+6ePWmQn0naleuali1RR2TGNsP/888/x9bWFk9PT4YPH055eTnbt2+nffv2NQ+WGsmgwONMnz8Dz1Z3W9DywmJUCgUWlubINKxdovYYnVGFEMhkdy0UHR2Nr68v48aNY9myZVhZWdUsWFoMPlMi6fvWm7zUWsm5y9ewte+Cz4uttaBcoi4Y1TMq8MCkAN7e3vzrX/8iLCwMDw8Phg0bVsNgChTZp9iyPI3DDWSkyRoxYqKbhhVLaAKja1H/TmpqKn5+fty4cYMDBw7Qrl27GpwcxaCZvzFtwUd4tapP9u0cigvLadzcQXuCJWqF0XWm/o6zszNBQUHk5eUxa9Ys1Gp19U+WyUBdSqG4e04DezsaO91kR+wJbuXUII6E1jF6owL4+Pgwbtx49uzeSe/OrenkPp6oc7mPPC/78kWyb14nLzeH3LxcCkpu88uaH0hKvoHc1iS+GpPB6G/99yksKODFLk/y64VbAPQNjGT7fF8cH/IUfuvkNj6Z+jFxt62xMpff6+GXUZjThilrlzDJsw0KXYmXeCRG15l6GNY21oTMehPPd8IQQHtnK6yruDqnZ4fyTdxQnemTqBsmdH+T0euNz5g25T1ATmtxGaW+JUloDJO59d8nIyODkSNHciQxkYPx8TzTqZO+JUloABNqUe/yxBNPEBgYiNLGhg8CAigrK9O3JAkNYHJGBXB3d2fy5MnExcURGhqqbzkSGsDkbv33KSgoYPDgwZw4cYLo6OhazbCSMBxMskUFsLGxISQkBCEEQUFBZGVl6VuSRB0wWaMCuLm5ERwcTGxsLKtWrdK3HIk6YLK3/vvk5eUxatQoYmNjiY6O5sUXX9S3JIlaYPJGBUhKSsLHx4c2bdoQHh6Oo6OjviVJ1BCTvvXfp3Pnznz66accPHiQL7/8sgZnqrj550kSDydTpDV1EtXhsTAqgK+vL/3792fJkiXExsZW76Sia/w0zwP/4I1cyNOuPomqeSyMGhMTw8SJE+nbty+Ojo5MmzaN69cfvS4qMzeNjMIetMg7ypEz0qiBPjF5o/7000/8/PPPhISEMGPGDBYuXMipU6dYsGBB1SeWl3J1Xzx9vlzLe61vsyMilkxpiqr+ECbM6dOnxYgRI0R2dvaDYyqVSrz++uuifv36Ijw8/KHnluacEN+uiBXlQogrP34kOnhMFEfSS3SgWqIyTLpFDQ4OJiAgoEIuALlcTkhICI0bNyYkJIQrV65Uem7Gjrls/uMUa79eS+SxyxT/uo89KRm6ki7xN0zWqL/88gv16tXjmWee+UdZixYtCA4O5tixYyxevJiSkpK/fSKTxJtd8HTI4saNNPLse+LzgpwdGw+SpdKNfom/oe8mXVu89957Ys+ePQ8tLykpEePHjxeAiI6OrlCWHBksvv7vJVH214MX14n+bVxF6OEi7QiWqBKTNGpaWpoYNWqUuHTpUpWfu3LliujSpYto1KiRiI9PEEIUi0NffSi61a8vmrkOEeEp5Xc/WHZeLH/3JdFUaSnsWnYTY5YerGhiCa2jszdTpUWZpF0tpnG75lhXSEGiIistnUKzBjRtbHtvnVIRKX+eJTk1D5vmT9GjvdP/spbkX+XoycuUKGxwdXPDqZLlJps3b+bKlSt8+OGHj0xK8fXXX/P+++/j4+NDeHg4MiFQCe7WJ5cjlwEI1CqBTC5HqMsRMgUKuZRHRZfo5hk17RDzJw7ltbFfcq7CPOYy0hPW8+aAQcz64di9tz8qbp2PY23YalZ9NZvXvcex+tj9Mc98DoRvIGxpKEtDF/NDxEUqmxZ95swZmjVrVq3MKVlZWfTp04e9e/fy3XffgVyOQiFHrrhvUgAZcoUcmQzkCjPJpHpAJ0ZVq0soVTakqcwc2V//xmoVxTKB0qIhDWX3pBTn8MeVAjwCVrI94gDLPa+xdOk+igHSYvlF1ZsF66P5aflinK9uJ6m8Yl3FxcUUFxfTpEmTR+qKiYkhNzeXtWvX8uSTTxIcHExSUpKmLltCg+jEqHIXD6ZNGErrchUVfCW3onXPEYz17Er94lJUAOZ2uPV6CY82VoAFnsNfxKKRHZYAynqU5ecgytSUld0hL9/8HytN09PTAWjWrFmVmlJTU4mNjWXYsGG0atWKsLAwkpOTCQ0NpaCgQGPXLqEZdDY8JSiiHCrJkKeinFJU90sUCqxs6z0oTUhIYMjAfndLHTyZ0PYPxrzUnm5DA1C9PIWn/hbt9u3byGSyB+kpK6O8vJxt27bRpk0bnnvuOQD69evHnDlz2Lx5M9u3b6/bxUpoHINe119w7Ad2WH/Ml+4NHhxzGTSLAwNmAjIUin/+zrKzsxFC0KBBg3+U3SchIYELFy6wbNmyB8fkcjkTJkwgLi6OgIAAunXrhqurq0avR6L2GOyAf2n6YbbF3GLUiN5YVfg5yVAoFJWaFO4aFcDa2rrS8qysLDZs2MDUqVOxtLSsUNakSRNmzpwJQGBgIOXl5ZWFkNADOjSqFRZmchTmfz+uQCEssbSS/e+xIDeZX37+jeZvDef5JrbcSd7NgcrfdP6DoqKqZ44uWrQId3d3OnbsWGm5t7c3kyZNYufOnSxfvrx6lUpoH10M1qrSYsRotzbCzqyeGDx7o7hSeL+kWJyJmiu6NbQTjk3biDm7b4jy/Jvi63dchFPzlqJzTw/R5/nnhZf7NLG/sKoa/sfatWvFJ598UmlZZGSk+PDDD0VZWdXD9dnZ2aJnz57CyclJJCYmVv9CJbSGTgb8RVk+N67dQWUmkFvUx9GhIRZyAEFxbhZZ2UWoZSqsGjbD0VpGzq10ckvuDq6r1GBu5USzpvWq1fyvXr2a27dv88knn1Q4npqaSlBQEIGBgbRt2/aRcY4ePUrfvn3x8PAgPDwcGxubWl27hGbQSWdKZl6PJi3qVVaCla0jzWwrHm3QqAUP7wrVHLVazbp16/D09KyWSQG6d+9OcHAwH330EStXrnzw7CqhHwy2M1VbKrtB7Nq1i7KyMl599dUaxRo7diwDBw4kNDSUhIQETUmUqAUmZ1Rzc/MKHaq0tDRiYmIYPnx4jW/fdnZ2BAUFoVAoCAoKejCiIKF7TM6oFhYWD94sqVQqvvnmG3r37k2nWmb16969OzNnzmTfvn2sWLFCk1IlaoDJGdXa2vrB7X/fvn1kZWUxcuTIOsUcP348AwcOZM6cOdIjgJ4wOaNaWVlRv359bty4wbfffsucOXPqHFOpVLJgwQKaNGnC+++/T05OjgaUStQERVBQUJC+RWgSa2trnJ2dWb9+PT4+Pg/e5deVJk2aoFQq2bBhAyqViv79+2skrkT1MLkW1dnZmYsXL6JUKvH09NRo7AkTJuDr68vatWvZuXOnRmNLVI3JGfXs2bMcOnSIN954Q+OD9HK5nC+++AI7OzvmzZtHSkqKRuNLPByTMmpBQQHbtm2jV69etdvEtxq0bduW4OBgjh49yldffSVNXNERJmXUvXv3kpeXx+uvv67Venx9fRkzZgyLFi1i//79Wq1L4h76nWqgOVJSUsSoUaPE1atXdVLf+fPnRceOHYWrq6tIT0/XSZ2PMybTooaGhuLv74+zs7NO6mvfvj2zZs3i6tWrfPrppzqp83HGJIz63XffYW9vz6BBg3Ra71tvvcXQoUPZunUrP/zwg07rftww+ozTSUlJrFu3jsDAQJo3b67z+m/fvs1zzz2HUqkkIiKCDh066FzD44BRt6j5+fls2bKFQYMG6cWkAPb29qxatYpz586xZMmSSvJYSWgCozZqVFQUtra2eHt761WHl5cXAQEBfPvtt9IKVi1htEa9cOECBw4cYPTo0cjl+r0MCwsLAgIC6NmzJzNnziQ5OVmvekwRozRqWVkZK1aswM/PDxcXF33LAe6+ug0MDCQvL4/AwEDUaik9tSYxSqP++OOP2Nra4uPjo28pFRg8eDDvvvsukZGRbNy4Ud9yTAt9D+TWlJMnT4qRI0dWSHduSGRlZQk3Nzfh5OQkTp48qW85JoNRtahFRUV8/fXXjB07tkK6c0PC3t6ekJAQCgoK+OyzzygsLNS3JJPAqIy6YcMG2rZtS8+ePfUtpUo8PDz4+OOP2bFjB998842+5ZgERmPUX3/9lXPnzuHv74+ZmUGnzAJg0qRJuLu7s3DhQo4dO6ZvOUaPURg1JyeHyMhIvL29dfYuv640bNiQBQsWUFxczPz588nNzdW3JKPGKIwaGRmJTCbj5Zdf1reUGtGrVy9mzZpFdHS09AhQV/Tdm3sUp06dEm+//ba4c+eOvqXUiuzsbDFgwABhY2Mjjh07pm85RotBt6glJSWEhoYyadKkKvOdGjJ2dnbMmTMHKysrpk2bRl6etPtvbTBooy5btgw3Nzfc3Nz0LaVO9OrVi9mzZ3Po0CEWLVqkbzlGicEaNS4ujoyMDIYPH45MZvy7kEyePBkPDw/WrFnD3r179S3H6DBIo2ZmZrJ9+3YGDx6Mo6OjvuVoBHNzc8LCwlCpVCxevJibN2/qW5JRYXBGFUIQGRmJs7Mz/fr107ccjdKhQwdCQkLYv38/q1atQqWSNlatLgZn1OPHj3P8+HHefvttfUvRCsOGDWP48OEsXLiQgwcP6luO8aDvYYe/UlBQIMaMGSMOHz6sbyla5fTp08LV1VU8/fTT4tatW1qtqyh5u5jiO0vEV5jDoxJXf14tpr6zTJwt/cvh8mxxYOV44drBVXQa/Jk4mnEvH/3NJLFogrto7/qUmL0jRai0qrhyDKpFXb16NZ07d6ZHjx76lqJVnnrqKQICAkhOTmbu3Llaq0dc2MbgNwL4929nyfnLU0bZ4eV4jPiU/ZfS7u6ICICKi0cj+K9iDEmnIhjDTvymbqKsPJufEw+h6LuU345F0nr3Bn7JK9Wa5odhMEY9ePAg58+fZ9y4cfqWohPGjh3LK6+8wsaNG4mMjNRKHbK2Q9n533W8aaXkr9O4zZ//gIM7l9CvRP1gL1mhlmFp48YHE3pgadaRidMGU784i5v5eShUpTTo8Cw2Nm3o2qaUa3d0PyncIIx669YttmzZwuTJk6u10a4pIJPJCA0Nxd7ennnz5mlx+YqaypYZCyqaTSaX07xTJ+zvlaqKbuHcsyuN7Jri1KgRf3w3g/kLprE5tR3dm1hWElG7GIRRN23aRJcuXXj22Wf1LUWnODs7s3TpUpKSkli6dCmlpbq/pVZOKmt+q09A/6cxlylwfc4DX8+2WFg0x/v9wbQx1/24tt6NeuDAAdLS0hg2bJhJDOzXlEGDBjFx4kS++uordu/erW85gIrTW/Zi3n4Qz3e9t/GxVSN6vjKWmTOm49GqYSX72WofvRo1IyOD6Ohohg4dSsOGDfUpRW9YWVnx0Ucf4ebmRkBAAFevXtVwDRaYyeUoLCoelWGBmeKfOyneOrGfE2obXhncm4bkkV1sGPlJ9GZUIQSbN2/GxcXF4Gfsa5snn3ySGTNmkJGRQVBQkOZWsJZlciw2jqTbZzhy4Di37+fGKE4h8Zd4Tl4/wZHEFIrvVXflv1/x+dLFnMh35Nz+/xA+72PWnjaMxxG9GTUxMZHTp08zdepUfUkwKIYMGcLo0aPZuHEjW7du1UzQkuv8npBN+yFuFJ5K4Nq9XY3UOVf547yMDl4uZJxKIqsUoIy0i6fJt25P4YmtbIvYzt6MbgzpbFFVDbpDD2O3Ijs7W4wYMUKcPXtWH9UbLOnp6aJTp06iZcuW4vTp0/qWY1DopUVdsmQJXl5eUkKxv9G0aVMWL15MSkoK8+bNo6ys7NEnPSbo3KgxMTGo1Wr8/Px0XbVR0L9/fwIDAwkPD69REgshBGq1mtzc3Af/CgsLTSZji07TTl65coXQ0FDGjBlD165ddVWt0ZGZmcngwYO5fv06kZGRdO7c+aGfLSkp4cyZM5w8eZLc3FyuXbuGEAIhBDY2Njg6OtK6dWvatm2Li4sLFhYG8sxZQ3Rm1NLSUpYvX46tre1j85q0LsTGxuLn58fAgQNZv3499epV3J1bCEFMTAyHDh0iPz8fBwcHHBwcaNeuHTKZDJlMRm5uLikpKVy4cAFLS0uaNGmCv78/bdq00dNV1R6dGTUuLo6oqCgWLVqEQqHQRZVGz9y5cwkKCmLFihVMmTLlwfFr164RFhaGmZkZXbp0oW/fvjRq1OihcVQqFRcuXODw4cPEx8fj7e2Nv7+/Li5BY+jEqAUFBbi7u2Nvb4+Xlxfe3t507NixGukiBWqVCjVyFDIQyBAqFTKFArnc9N9iZWVl4evry/Hjxzly5AhPP/008fHxrFmzhldffZWXXnoJW1vbascTQnD16lXWrVtHgwYN+OCDD4ym0dDJFpPz58+nd+/e+Pn5UVhYyOrVq9m7dy8tWrTAwcGhii8rl8gPffD0n8J/0i0w//Mnxgz6lEL3IfRy1uxmZ4aItbU1rVq1IiIigtOnT+Pq6kpERASTJ0/G3d0dS8uaTQ6RyWQ0aNCA3r17c+rUKfbs2WM8qyi0Pf4VExMjpkyZIkpLSyscT0hIEMOHDxdr1qwReXl5Dw+gLhbb5vUW7uNWi13rl4l/x/0m8rWs2dBYsGCBMDc3F+7u7iI2NlYjMYuKisSSJUvEhg0bNBJP22jVqMnJyWL8+PHiwoULlZYXFhaKlStXilWrVlVpVlXWCTGrh71o9cZscbZYW2oNl6KiItGpUyfh7Ows4uPjNRY3NTVVfPDBByIxMVFjMbWF1sZRy8vL2bx5M+7u7g/tZSqVSt577z3y8/OJiIh46JhfvlDwbL/RuOVdJzbxhrYkGyxWVlaEhYVRUFDA/PnzycjI0Ejc5s2b069fP3bt2mX4iTG09QuIiooSM2bMEIWFhY/8bGZmphg7dqw4fvz4P8pKcg+KuS8FiYNZpeLUd1NFF8/RYl9qgTYkGzwrV64UgPjiiy+EWq3WSEy1Wi38/f3FiRMnNBJPW2ilRU1NTWX37t2MGjUKpVL5yM87ODjg5+fHxo0b//baMIfo2YFsvRnHnbxirqffJu94DFOmrefqY7jS+M0338TX15fZs2dz5MgRjcSUyWR0796dQ4cOIQx5yzFNO7+8vFzMnTtXrFu3rsbnDhgwQPz555+almRSHD58WLRs2VL06NFDY+nhjx07JkaOHCmKiw23A6DxFnX37t1kZGTw7rvv1vhcLy8v9u3bp2lJJkWPHj2YPn06SUlJLFy4UCMxO3TowKVLlww6IYZGjXr58mW2b9/OzJkza3X+Cy+8QFxcnCYlmSTjx4/H29ubVatWsXPnzjrHUyqVFBQUGPStX2NGFUKwfPlyXnvttVpnhXZwcCArK0tTkkyW+3msrKysmDdvnkaWr6hUqmoYVaBSqypd1aptNGbULVu24OjoiKenZ61jPPHEExobejF1WrRoQVhYGEePHiUsLKxOrWFRURG2traPeKV9h+3LJ9HU0Z7B0yNIq2Z1paWlFBQU1FrbfTRi1PPnz3PixAn8/f2r1ct/GNevX6dZs2aakPRY8Oqrr/LOO++wcuXKOj0CXL58GRcXlyqNKtIT2bQpnIw7uezfMouo36sX+/fff2fKlClERUWRnZ1da4113l4kPz+fTZs24erqSrNmzWp961YoFCQkJNCqVStyc3Ol2e3VwMLCgokTJxIfH8/ChQvp0KEDDg4ONeoUWVlZsWvXLrp06UJ+fn7lrZ/cAmu1La3btIZjmTRr25NmFrnk3imjrIp52ZaWlmRmZhIVFcWmTZvw8fFhxIgReHl51XjVcZ1mT6nVakaMGMGePXto164d5ubmtb4FyWQyrl27hkqlwtnZ2aAf7A0JuVzOpUuXSE9P57nnnkOpVNbou1MoFFy8eBE7O7sqzSMzk5F3M4WzF9Kxc+5C+xZWUP5obTk5OZw7d+5Bw2NlZUXfvn0ZPXo0Q4YMqXZmnDq1qEIIzM3NadmyJSUlJRQXFz/6pCqwsbHBwsLC8F/nGRhNmzalefPmlJSU1Oq7a9y4MUII8vPzq/ycwroRXbs1Q11WSkF2/iM7VTKZjKKiogo/nOLiYtLS0rC3t69R+iatzEcVqlLKajEkJ4R4LLOlmCoWFhbExcXh6+tLfn4+Tz31FNOnT8ff37/GOcbq0KKWcilhDyduCizlZRQUlYNMYGZlR5f+A2hlrfdsQRIGQL169ejTpw8DBgzg3XffrXUSvDq0qIUcWR/M3C9XcUL0xHdAO8xV8MfuTeS/NJc186fytH3tIktUk5IsErYtJiJJjRwnBv3rPdrf/AOzbs/zhL613aOgoICSkhLs7etmhjre+ks5uW4y718Yxs8h/QHIObOIVzzX0HfL7wR7WtdJnEQVlJ0ndFgg/2fhxOCX+2BTXsb1Y//Hnl8tmBP3A161HyU0SOo4PCUDMyUlJXnkosKqVJBx5grXrZU0s5dMqjVENj9Of5tVtz0Jj5xLV/u7f8bsPl1ovS2cwlzAxIxaxxZVzR/fjuGpabG0d2mITK2i9HZ7AnYt5I2O7WlgnEvIDR6RuQvf7m9j8XEi295rXbFMlKPGDIXG+6SC/JsppN4uwtxMRnHJvbEpmQJlw+a0alpfq+ko69iiqijGlp5j1/LL4oHIgYx98/DwdefozP1smNhRIyIlKiKSz3G2uJjXWvzzLZ5MZoZ21pWqOLdrNfNXfMe+FDt6uLXAAjmyrLMkXO9M6MZ5DO/fmeqvia0Zde+ay+WohYr7o1FPeM3g0z7ZHNz+E2frHFyiMkqLC1CrVZiZP/qzmsOMbmNC+HfYZFoMnM3uPXvZu+f/2BP7Hz4bb878198kZHe61mqvo1EFuVnXUcjNHjTN5efC+TzeiuZdu9K6ynMlaotldz9eaWfPL7viqZC9VJSReWIr0draDgABxaWoVSUU3T9k9ywffrKWOX0F21du4bKWaq7DrT+HHR8OY9r3h8iS/8az++ojU0NZ7jUKBy5nX9Ar6H5LgscDmfUzzF00lT6DJjLKYTXfzOiHRYmg4OhqxsS78P10HQtS2NHbux0z1hwi+SY8+fCkLbWmDka15eX5EXgFyVDI1JSp7vXJ5AoslTZYGkcCDqPF7vkZxMY35V8DJ9B9ixLz8jLMXw4idr4fDfXSQsgQqNHWFI06GFWGubIe9x+TTGw0xCh4ouNbbE15S98yQJVH4t5zNGn8Nq0ba6eKOk/zk3ickIHSAoXC8n8NU95pli9fwNJ4J8ZFjNBav0QyqkQ1KeO374P4fMW3XLlszys+W7FEjuzWKQ6WufPt9xt45QUXrdWu00S+EsaMIPdaMlduFWJuJqPoLwP+1k3b0b6RUqsD/pJRJYwCaS6ehFEgGVXCKJCMKmEUSEaVMAoko0oYBZJRJYwCyagSRoFkVAmjQDKqhFEgGVXCKJCMKmEUSEaVMAoko0oYBZJRJYwCyagSRoFkVAmjQDKqhFEgGVXCKJCMKmEUSEaVMAoko0oYBZJRJYwCyagSRoFkVAmj4P8BmaGtnOXOSPgAAAAASUVORK5CYII=)
Maths-General
Choice 4 is correct
Maths-
In the given figure, if
and
then the value of
is
![](data:image/png;base64,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)
Hence 85o is correct option
In the given figure, if
and
then the value of
is
![](data:image/png;base64,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)
Maths-General
Hence 85o is correct option
Maths-
In figure, if
and y : z = 3 : 7, x = ?
![](data:image/png;base64,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)
Hence x=126 choice 4 is correct
In figure, if
and y : z = 3 : 7, x = ?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQcAAACkCAYAAACaVOtTAAAgAElEQVR4nO3dZ0BUV97H8e80hgGkKmAXjSZ2xQao2I0tsfeWqIk16ibZTbKbbMxuTPIkMaZoLDG2tWPv2IiiiA1RikIsoFJUEAQZZJiZ87yIMUUUjMwM5XxeJTP3zPwHnB/nnnvuOQohhECSJOlPlLYuQJKkkkmGgyRJBZLhIElSgWQ4SJJUIBkOkiQVSIaDJEkFkuEgSVKBZDhIklSgMhUOt2/dIu32bVuXIUllgqIszZCsXNENJycn9h4MQZgFTk5OeFeubOuyJKlUKlM9h/YdOmAwGGjj24wWTRowfMhAjoYe4crly7YuTZJKnTLVcwDwcndBp9NhNptxd3enlk9tevTqxaQp02xdmiSVKmWq52A0Ghk8ZChGo5GsrLtU9PRk7rffyWCQpL+gTIWDWq3mm3nfAzBuwusc/imUkUOHcPrUSRtXJkmlj2rWrFmzbF1EccrLy6Ny5Sq8/Y93uX0zlS07dhJzPpKmzZpTpUpVW5cnSaVGmRtz+L172fd4792/M+/7hbRr04rvFiykWXNfW5clSaVCmQ4HgMzMTP79z3eZt2AR/q1asHjpMho2amzrsiSpxCvz4QCQcecO7//zHRYvWoJv86asWr+BunXr2bosSSrRykU4AGRk3OGdt9/if8uXU79hA7bt3E31GjVtXZYklVjlJhwAsu7eZfrUyWzetJGaNWty4HAoXl7eti5LkkqkchUOAPqcHMa/Mpr9wcFUrFSJsFMRuLu727osSSpxyl04ABgMBoYNGkDYsaM4OztzOjIKZxcXW5clSSVKuQwHACEEfXv14MyZU+h0jpw5H4WLi6uty5KkEqNMzZB8GgqFgu17gvH1bYlen0Pr5k25dfOmrcuSpBLj6XoOZiMZqVfIUlejpqeDBcuyrr69ehB+PIyKnp7s3neAmjVr2bokqZww5d0l5fIVMsxa7NRgzM/HLAAB6Bxw96iMt4cTKhvU9hThYEZ/7TgfjniZ8KaL2TZ/IGVpGG9g35c4dPAAPj4+rNu4hXrPP2/rkqRy4F7SMRa/NZ3VkSncSFdQrW49PB0UYDZwV+RQwacHw1+bxFC/GugUCusWJ4rKlCsubZkgfHSeIqDbNLHjVpFblhrDBg0QjhqlaOPbVERHnbd1OVK5YRTRqyaJ9v6viA1Xfnv0buhKMaVTNeFed6DYcDFbmMzWrarIYw75+kSO77hK/Ql98U6L4OjR1CK1W7t6FRvXr//L4WVNa9YHMXDwECIizjFpwnjOn4u0dUlSKXY24gzLli4lKyurkCPzwNEVD5OBnHvGh486txvNu2N9qaPfxNbwHIxWvnRQxHAwk3t5L+vj2/Kf96bQwvMOkUdCufWEFiuWL+Xbr+cy842ppKenFUuxlqZQKlmxei1Tp08j8mwEb0yeROTZs7YuSyqlNgVtYNz48fznww+Y983XmIX5MUcKhNmEWaVB56T+7WHDJY6GXSVF1Rq/F+xRWfmsQl34IWA23uL06i04jF5Kc28d6W1rsenQYU6mDKbPn5ZoXLHsR27cuMG8b78mV59LlSpVMRqNfPbJx5aov9iplCocdDqcKlQgOjqK9/7xNh06dbJ1WVIpFHn2LFUqubNi2VJy9Xpu3LiOq6sr7/7rg0eOVai1GK+dZs3st4h0VwAK8tLOEHu9Fa9/NpMJbSpYfVCyCOEgMKefYcsVfz78vDZKoGX3XtTcGkR4+HX69K/Omv+tYF9wMPb29uwL3ktGxh2cnV3Qumq5dy+L6TNmWvyDPC0nnR0atZq72Xr+nOdqwMHRHoATx8M4dTIcgHvZevLL5awQ6a9wc3bA2dkFjUaDk5MTPy5ehMls5tKlS7g4OzPnm+9+O1iYUWidqFS9DnW8lUAu1/XxmDNvk3zjPBFpDQmoCNbsPBQeDkJBVNBsdp2Cm0MHoDQpMGRdJ+rqLTRnTpLSvzoNGjZCrbFDrVYTduzow+XhhRC4ubmzbuMWsrOzLf1Znspns/9LTHQ0a9atfeLsyO1bN7NqxQq0Wi1zv/uWevWex2gyWbFSqbRat3oVe3bvxN5eB4BZCITZTNdu3XFycvrDscKUj8rzebqMnMLw5355zJg9mJg1HzFs7n84Sy2OvhmA2ornFoWGg1CcZ//SGry9ZgoNDUYEoFBmcm7DAtacCSPy+kB6+ragmW8LAJ5/4QWys7MZOmgA2VlZqFRqtm/dwmdfzLH0Z3kqc7/8gry8PHr27vPIL+r3fFu0QK/PJWj9OoLWrSNo63Y8PDysWKlUWp0MP47RaCRXryf73j3WbAiicuUqtPHzL+BoBZiN5OUa+fVrqa5Qjaavvc6Q5T+x9Psgwqe1oZ2uSCMBxaLQd1JE7mBjy2EcbRuI3e8er5l3gb2vbuLAvkgCxzfD8cHjvy6kciDkCDk5OXRs58++PXtKXDgsXPIjA/u+xL172U8Mh0qVPJkz9xuM+fls2bSR7p07snf/ISp5VrJitVJppNfrSc/Ss3L5Mlq0bEmDho0ee6xCoSj4lOFGPFEGI0ZXJxysPCD55HkOt8+KOa0Hipl7DI88ZU44JP7Tu4qoN2im2JKU/diXuHH9ukhNSXnWS64WEdC6hbh9u2gTNjIzM8Xg/n2Fq6O9aFK/nsjMzLBwdVJpl5mRIRITEkR+fn4hR94VJxe/Ivz8RovVsb89mpsQLv7dy0/UcLEXo368KvRGi5b7iCfMkDzHVx3HsfhCMqKSN50+2MnCoQ8WaL11juX/Hc/7GxJRqQWmqgP5fP4sRrQqXbtLdWoXQEpKMhFRsTg4FD4dPFevZ9jgAYSHhVGxUiVOnj2Po6Njoe0k6XGyEg8y55UxrL6qxGQCe0dHtA8uSxgNetzdWjJ+9hcM6FiHChrr1vaEcDBjzMvHrAAhQKm2Q/PrYIgwYzLmYzQrUCAQKFFr1KiU1u73PJueXTsTHx+HRmPH2ehYdDrdE483Go0M7v8y4WFhqDUaHB2diIiKKVKwSFKBhJl8gwEzChSKXwbx+fUbqVCgUKrQaNRWvUrxq3J7y/bv+bf0JSPjDmGnzuDu/uhg4/3798nJyWHmtCns2b2LKlWqolKrSLt9mwoVKnD8VAQurvJ2b6lskeHwQDu/Vjg7O/Pt/IUo/tQD+nbuVyxesABn5wpUrOTJ/pDDVKlalR5dOhEZeRZPT0/2hRzB21suOSeVHTIcfudedjbdOgWitf/j6YWdnQaNxo572dksX70WHx+fh8/1frErJ44fp6aPD5u37aRmLXm7t1Q2yHAoBv379OLggf00bNyElavXUreeXPZeKv3K7UpQxWnT9p307NWbsxERTHh1LBdiY2xdkiQ9MxkOxUCpVLJizVoGDh7EsbBwpk2eRGxMtK3LkqRnUr5PK+6dZ+3iYJKEGnudBu8W/aibtIJ9l5UoK1TDv9dwAmoUfbpqVlYW0ydPZMWadXTrGMg387+nfoOGFvwAkmQ55bvnoFChzbnC0a/e5IOPVnBJaLl/ZR/fvb+Un++YUD/lT8fZ2Zk5337HK6NGsv+nI8yYOoX4+DjL1C5JFla+ew4AZJN46HOmDtuC85sfMJAr5DTtRt+uLXH5izPSbt28yTtvv8nyVWvoEtiOJctXUMundvGWLUkWJsMBgCzOL/0XYz8Ko87rXxP0r/bPPCPtZmoqb785k3Vr1xMQ4MfaoI1UqVK1WKqVJGso36cVDznTpL4jOqf7nD+ynOCUZ39FL29v5sz9hkGDBnAyPJzB/V4mPS392V9YkqxEhgNAykamLarGl5uW84pyI7Pf+ppzxbCei6eXF/MWLKJnn95ER0fRo1snsrMLW2xUkkoGGQ6c4vN/naHHzAkEvODL2Dkf4HpuPv+dtIVUY+GtC+NRsSLLVq6mfWAHrl65QqB/G+7n5j77C0uShZX7cDjx2TSWH17L7B0RoE/jp2/mEHknh1PbJzJywr8IKdoK/E/k4uJC0JbtNPf1JSUlhVa+TTEYDM/+wpJkQeV+QFKYjJgEoFChVoHZZMQsFPxy36wSlUpFcW00ZDKZ6NYxkLi4C7h7VORkRCQ6nbzdWyqZyn042EKn9gHEXbyIp5cXIaHHcHMrSxsLSmVFuT+tsIWQ0DDqN2hAclISL3buSGpKMVwekaRiJsPBRg4ePopvixbEx8czqN9LJCYk2LokSfoDGQ42tDv4AIEdOnA2IoJXx4zk8qWfbV2SJD0kw8GGlCoV6zdtpUev3oSGhjFl4mvEx8l7MaSSQYaDjel0OpauXMXAgf3Yf+gwM9+Yys/yZi2pBJDhUAK4uLjw3YLFDBsyiD37DzLzjWlcvnzJ1mVJ5Zz19taSnqhSpUrM+fpbFMCaDRsRkyey8IcfqVFTrkkp2Yac51DCJCXd4O2ZM9iwcTNdOnVg5eq1eFcuXZsFSWWDDIcSKDkpiRnTprBt63batQ9g09YduLnLiVKSdclwKKFSU1KY+No4Du3bR1NfX4IPhuDo+PgNfyWpuMlwKMHS0tIYPXwoJ8KPU7dePUKPn8DOTmvrsqRyQl6tsJoLLOzXBb8G9fFt2pi2Y1eSCuhTjjL7xZrU9WnH+Pe28fuJ1BUrVmT9pi00a+5LwtWr+LdqgclUDAtNSFIRyJ6D1ZgxXAtn7d9f4eP09szd8j29K2jBlE7E1gUsPNKQzz5/CXfto5um5t2/T9dOHbh86We8vb05efY8arW80CRZluw5WI0SuxoBjJ37MW2SD3L4iBkFcP92CrHhIbR+vT8eBQQDgNbeniNh4fj41OHmzVTatGhGTk6OtT+AVM7IcLC2KkOYNtKN3fPncSXfTHbaWSIi+9GxkO0tFAoFx06ewqf2c9xMTaVLh3bcSZdrUkqWI8PBBvzGf0jrG98xb3MiN06c4tqI7tQtYtuj4SdRKBRcio+n30u9SElJtmitUvklw8EWvPsxeYgraz5/k/n74a1hzxe56fFjx9Bqtfi3bcfZiAjGDB/GtcRECxYrlVcyHGxC4NtjAs/rT3Gz/kha6IrW6nDIIV7q2R2dg47NO3YS2KEjoUdCmfTaeK5euWLZkqVyp/Ahb/Ndrpw+Rmx0MrfMSlTamjQI9Kehl4G7KblU9KnMX9wYqhxToGjRhUFeO3Ad34aizlwYO2okCoWCAYOGoFFrWL1+A6+MGsmOXXuYMW0KX8+bT+3adSxauVR+PDEcjJkRBM9bxLafs9CpvFA7q1Db3SUl5QQbUvRUadKDKT5y3v9fcT9qK2crT2F2taK3cXVzZeLkybz3/r9/+X9XNxYvXcaU1yewadtOlDPe4Otv51PLx8dCVUvF7X7Gzxxet57oPBcqaCFPr8dgAoRAeHhRuXYTAv1aUN0G6xA/PhzMl1nz33eYHerJh5++T/fODamoAMgn4eg8Zv87nEy3zuRBkf/ylXf3ojaxdH8c+pw8ksNiaPjt2xQ1Whd+P59cvf5hMPzK09OLb+YvQKlUErRlO4ipzFuwkGrVaxT/B5CKnzBjNKQTG7yWvVFK2vYfRHNvJZj16BNPsuOHZWxrGECPSe8xrrWLlWsrkEFELRsn2lR8TozekFjA8ybx8+bV4pvPlosrBb+AVAD93mmijSNC6d1c/O3zE+LOU7RtWv954WyvEYa8vAKfT0xMEAP7viwUIPr07C5SU1KLp2jJCkziQtAM0c1/rFh3+XcP58WJ45s/Fv2aOojagUPFxovWrargcMg9KWZ1fk7UaDRFHM7IL/AQQ0aGuJV0Tdwr5A3+/rcZz1hiWXJbXD5xTIRFX3/qln4tmou9u3c98ZiMjAwxduQIoVMrRI8uncSd9KeJH6m4bd4YJAb27y8SEhIKOTJHRG9+R/RtPUIsO//n71ueuPrTh6JzNTfRaspukW6pYgtQ8GnF9fOcvpNHXuPWNNIVvKOLxtWVSq6uj+2RTBg3lrsZGRwPO8a169eKpZdT6ik1aLUaVMLEvLy8XzbTKaK0tDRWrVzB8qU/Iii4oUaj4erlK3h4eHD69ClGjxiCU4UKxVS89LTi4+K4fOkSr2XeQeegY/W6IJycCrqzViDE436rdtTqMIa+zdbydfBKjtzsQT+vYtplqRAFh0PuffTChNnRHq14ukLemDKRixcuciE2BpPJhJ2dHYdDDhVHreWanZ2WA/v3wWP+Cf1KrdagUqlwdHQk4swZhDBbp0DpEWq1Bnd3d2Kio8jPz6dv7x7Y2dmxZ//Tfh9q0aSxHZpz4UTGQz8vi5T7iILDoWo16mjtib+cwHWziRcKmQ7x6ez/smrlChwdHbl18yYGgwE7O7sHNwcJFAo5neJZ5efno1AooMC7L35jMpn+cOemnZ32QTvk/pxWpgCEEGg0GjQaDXEXLyAEtGzWGDdXV/b/FFrEV1JipwWU9zHkWbDgPyk4HNzb0a2pG4d3XOSyycwLhbzIGzP+xoTXJ6FQKBg+eACxMTEAmM1mPDwqEhJ6rJjLloqq14tduZaYiIODI5ExFwrreEjF6LNPPmbJ4kUPTyXUag1CCLbt2oPOvogz3wBII/GSEWFuQG0rXqUuOBwUHgx8fTjfhX3LG//cRec5fbG3U/32N8tsJCs6lguZmXgFBlLLyenhD2D3vgOYzb+cQ7Vs1pjs7CxGjxjGjj3B1vlE0h/8dPQ47f1akZSURI+unTkafkre7m0lTk5OaLV2GAwGdgXvp0HDRgBotU938d+UdJBdEXpo3J8uPtYZb4BC1nNI3TSJfh8G49V5BhPHjaJ1NVCI+6SfDGJ9tBHfoX+nt1wcuVRo7duU69euUbt2HYIPhsiByhIll5jNH/Lu58kMXvo/xjR4EAAiD33WSb7oNpk1yfcYsuwC/+mmK+TEsvg88U+I98CFbKu+iSXzN/PRuKWYzWbsXLzpOO6/TJ7uT7Wn6RlJNnXiTCQBrVoQH3eRl3q9yMat2/HwqGjrsso9c34O6SnRxJy7SMJ9BWmJP3PVXg1kk5W4hTnvbiLqbl2GffQFs7paLxhArgRVrhjz8+ncoR3nIiPx8/dn+aq1VJbL3ttU9o0jzJ/2BjvS3aighfy8PIxmASYz5po1qdV4PP8e1YO6Nuihy3AoZ3L0ObzcswfHjx2lS/fuLFi0hGrVq9u6LKkEktcYyxlHB0c2btlOh46d2LtnH9OnTubaNbkehPQoGQ7lkJu7G8tXraFHj25s3bGLt2ZO5/o1OYtV+iMZDuWUl7c33y9awsu9e7Bxy3bemjmd5KQkW5cllSDygnc5Vr1GDeZ+Nx+YStCWbZiFmQWLllDJ09PWpUklgByQlLhy+TIzpk1l995gXu7Ti+WrVuPi8vib6qTyQYaDBMCVK5eZNvE1Dh0MoWv3rgRt2Y5OJyeylGcyHKSHriUmMm7MKE6cCMc/oC179h9EpVLZuizJRmQ4SH+QkpzMkIH9iImOpmmzZoSEhtm6JMlGZDhIj7iTnk7P7l1ITEigbt16hIaftHVJkg3IcJAKlJNzj0D/NqSmpuBTuw6hx08+XBdCKh/kPAepQI6OTpyIOIenpzdXLl+mQ1t/8vLu27osyYpkOEiPpVarOXUuCm/vysRdvECv7t3IysqydVmSlchwkJ5IrVJx/HQEtXxqcTbiNMMGDSA9Lc3WZUlWIMNBKpRWq+Xg4aM0aNiII4dDGP/qGFJTU21dlmRhMhykInFyqsD2XXtp1dqP3Tv3MH3KJJKT5b0YZZkMB6nI3D08WLM+iI6dAtm0ZRtv/22GvFmrDJPhID2VylWq8MPSFbzYtTNrN2ziH2/9jdTUFFuXJVmADAfpqdWsVYvvFiykV7curF4fxFszppOWdtvWZUnFTE6Ckv6y+Lg4ZkybQvCBQwwZNIBFS5bi4mLlnaAli5HhID2T+Lg4pk1+nZCQI/Tt+xKr1m3A3t6+GN8hn9Rz21n6yTpiNRrUgMreEQe1gazag/hkYg+qumiK8f2kX8nTCumZ1Hv+eb5ftIR27fzZs2snQwf0w2wuzv059STfzSDVKYB+w0cwfMwYWjlcZveiw5g83NDZy7tGLUX2HKRikZiQwIihA4mNjsEvIOAvbBb7OEZy9Dno8ytQyUWJ4cI63pn4PsltP+OTD/tTR4aDxchwkIpNSkoyL/d8kcTERJo0bcqBIm8UW0TXQ5g9cxS7nGby1ecz8fOSpxOWJE8rpGJTuXIV9h06TOUqVYiNiaFz+4Die/GsGFbOeZ8f9QP4xzvTaS2DweJkOEjFys3dnfBTEXh4eBB38SKdA9tiMpme8VWzObdrGYvX2zFi/GRebqBFCQiz7PRakgwHqdjpHBw4fS4ad4+KXIiJoWe3zuTm5v6l1xJmE4mhy/jk7Y1UHjOVV7tV5d7du9xNDOWTj3ZwPeleMVcv/UqOOUgWk5ubi3/L5ty4cQP/gABWrwvC+SnnQdxPjmTJe/1YGOGKg9qE2SwQAPm55LZ/j52fjKG2h51F6i/vZDhIFpWdlUXnwLbEx8fRtfuLLP5xmdzdu5SQpxWSRVVwdmbPgRAaNmrM7h07eWPyJG7dumnrsqQikD0HySqSkm4wYsggwsJOMHzEML74ai5eXt5PbLN/XzAqlQqT0Uit2rWpW7eelaqVABCSZCVXLl8WnQPbCkC8OnqEuHnz5mOP/erLzwUgVCAA0SHATyxf+qNITEywYsXlm+w5SFYVd/Eib0x+nf0/hfLq6JF8Ofcb3D08AFi3djXZWdlkZ90lKSkJNzc3hACFAvLy8ti3dy9aR0eWLVtBneees/EnKftkOEhWFxsTw4xpUzjw0xHGjhzOoh+XErR+Pe+8/Sapt+/w2aef8Pd333uk3cULsaxatQa1UnD/voF/vv/+U1/9kJ6CbTsuUnkVHRUlOgW2FSoQk18bL+r51BBOdiqxbMkPhbY9GnpEPFezhujXp5e4mZpqhWrLJ9lzkGwmNjaGSRPGE3HmNE5OTixZtoI+L/ctUtvz5yLp82J3Qo4ep85zdSxcafn0hHDIZN+/J7LgzD00jvZwP4fc/N9uxTUbjbg078fkqdNoX1NeEZX+mvj4OMYMH8bVK5fo2r0Hq9cHFblt1PnzfP3Vl8z7fiE6BwcLVmk595LD+PEf7xJ81x0XLeTl6vntayZA2ZbpS96kS2Vnq887eEI45JP2cwzXYtYzffJynCf9wMe9f7v0ZLxykPWnU2k0/Ateba62UrlSWZSYcJUBL/chMTGRNn7+7AreX+S2Hdr6YTYL9h44hKOjowWrtAxTXiY34sLZt/Ir5uxVMuL9WfR57sH3SX+RH185Rvs9sxj0vBfW/pY94f00VKzbjIp10mjx1gYy6rbEt+Xvrku3rEK6fSj3byRD8xqWr1Qqs2rW8mHXvgN06xTImdOn6NGlM3sPFm09CK1Wy+lTpzCbn/XmLttQaV2p2aQTbQMOsu1oKj5N/fCt/+uzLXF/9wohuSYMZlBbuetQ6NsJFGgAsyn/twfvRHMyeD/ZdQfQu3vVx7Zt1bwJXTq0K446pTLO27syx8JP4+7hQVTUOV7s0rHIbTUaTYnc5PfzT2dTr3YN6taqzoXY2CccacSMEpUwYzIaf3no7iGWbDyB6DWT4Y280dngzL1IPRUBmI15DzdSvZsQx8mwg1SuOxY7LRiN+RiNJhQKGNy/LzHR0Wg0GnJz9dy6eZN6tWta8jNIZYRSoSA3NxeVSsWF2FheqFMLeDAL6jFnv4a8PLRaLb6NG/4yIaIEyTcYMBqNKBQK+vbugVKpRAjBybPnsbe3R6vV/rGBMGE05JGXZyQnIZ7Tt6rjZ+eEvbW7DA8UIRwUkJ/Hidm9aPPlL0Uacu7g0WIQ/3xwM9ynsz9mxbKlODk6kpmZidFofPBDUaJQKNAV64KjUlmmffBvxWw2k3HnDiqVCjs7O5ycnApcm1Kn0/3yHyXwopujgwM5ej159+9jMBh+WddCCNr7tcbVzZUjYSceHqu005F3cR+fjmzBPBUYs2/hOOBb7DS2G+wvQjgI0GgJ+M8R/jfilzGH3J9XsGZ9KNkPdmT/4MOP+ODDjwB4ZdQIYmNjSElOxmg0UrVqNU6fi7JU/VIZlZmZSXv/1iTduEGv3n34YdlydLrSdUVCr9czY+pkNm8KQmunpVqNGqhVao6eOIVS+ccvvdmQi7ZBb2Yt+x+j60P+8U9587gWg8EE2GadzCIPgIrfjTnoPANoFehMUgErdS1ftQaAwQP6kpF+hxvXr3PxQiwv1G/w7NVK5YarqysHDx+lZ7dObN28CaVSydfz5uPu7mHr0orsw/f/yYrlK2nduiVKlYptu3bj5ub++AYPxxzUaBp3pO0de1yVtusRFd5nUSgePcilLk0C+9Oz5l3uZKRx5/6jzYI2b+PA4VDqN2rIl//3WbEUK5Uvnp6ebN25l0ZNmrB+7Xr+/ubMUrWzVv0GDWnbPpBlq1ZzJCz8icGgUCj4w4iJkz/DejenWiXbTRMo9J0VIp8cFKi0f+7SCZL2bWb7NSea9x2M32OGFbZs31UMZUrlVfXq1Vm9LohXRo1g+YpVqFVqPvm/L/CoWPIXjBk34TXGTXitCEfaozIZuK9UY+9QcuYMqWbNmjWr4Kdyidu7lu3rglgXEkW2Sgu3Yog4c5qIM6c5FbKNrxZFYt/wRYZ0qIpcC1iyFHd3d/wDAoiKjGDz9p3czUinbfv2vw1GlmJ5dxMI27iANZv2cDjuNiaDAvsKrnhVc0dbeHOLekJMmchKvsoVfW2GvfUm5GZy+dKd3542m2g4pCd9+zSm9P+KpJKufoOGfPf9Qt6YOplFS5aCWfDF199QoUIFW5f2TMz5OdxKuImm3ktMbmIm+04Cyen3yBeAja/MyhuvpFLl3NmzTJ82maNhJ3h17GjmL/rh0fkCUrGQ4SCVOucizzJ10uucOnGaYSOHs/x/q0vkDMnSToaDVCpFR0UxfuxoYqKjeLlff9Zs2GjrksocGQ5SqRUfd5GhA/uTkJBAl65d2bh1h61LKlNkOEilWmJCAr26dyEt7Tb+AW3Zupx6kcIAAAHnSURBVHOPrUsqM2Q4SKXerZs3ae/Xmux72bRo2Yode4JtXZJFCSHIz8/Hzs6yO33JcJDKhLuZmbRo2ojc3FxatGzF9t17bV2SRQkhLD4IK9d3k8oEF1dXzpyLRufgwMkT4Qzs+xL5BoOty7IYa1ydkeEglRkurq6cPBOJq6srh0MOMXbUCPT6nIfP5+TkkJeXZ8MKSxcZDlKZ4u7hweFjx/GuUoWdO7YzdeLr3MvOJicnh3FjRrFn105bl1hqlJy7PCSpmHh5V2Z38H76vdSLdWvW4OnphZ2dHZs2b6VTly7k5OSUysVorU0OSEplVlLSDUYNHUxUVBQajRqdTkdSUiohR0IJaCfXNi2MPK2QyqT09DRCD/9Eu8AOGAx52NvrMJsFOp221N+sZS0yHKQyKTsri/37gsnJyaFjpy7cunWLrKwsVCoVG4PWk5mRYesSSzx5WiGVebHR0WzZvBF7nY5NGzZw/HQE5yPP0rhpM1uXVqLJAUmpzGvQqBENGjUCoFXrNpw/F0m16nIjpsLInoMkSQWSYw6SJBVIhoMkSQWS4SBJUoFkOEiSVCAZDpIkFUiGgyRJBZLhIElSgWQ4SJJUIBkOkiQVSIaDJEkFkuEgSVKBZDhIklQgGQ6SJBVIhoMkSQX6fwVovkADgeJPAAAAAElFTkSuQmCC)
Maths-General
Hence x=126 choice 4 is correct
Maths-
In figure, if
and
= ?
![](data:image/png;base64,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)
Hence 92o
is correct choice
In figure, if
and
= ?
![](data:image/png;base64,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)
Maths-General
Hence 92o
is correct choice
Maths-
In figure, sides QP and RQ of
are produced to points S and T respectively. If
and
=?
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)
Hence choice A is correct
In figure, sides QP and RQ of
are produced to points S and T respectively. If
and
=?
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)
Maths-General
Hence choice A is correct
physics-
A conductor PQ carries a current 'i' is placed perpendicular to a long conductor XY carrying a current I. The direction of force on PQ will be :–
![](data:image/png;base64,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)
A conductor PQ carries a current 'i' is placed perpendicular to a long conductor XY carrying a current I. The direction of force on PQ will be :–
![](data:image/png;base64,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)
physics-General
physics-
A circular current loop of radius a is placed in a radial field B as shown. The net force acting on the loop is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/496806/1/967147/Picture483.png)
A circular current loop of radius a is placed in a radial field B as shown. The net force acting on the loop is
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/496806/1/967147/Picture483.png)
physics-General
physics-
All straight wires are very long. Both AB and CD are arcs of the same circle, both subtending right angles at the centre O. Then the magnetic field at O is–
![](data:image/png;base64,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)
All straight wires are very long. Both AB and CD are arcs of the same circle, both subtending right angles at the centre O. Then the magnetic field at O is–
![](data:image/png;base64,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)
physics-General
physics-
A steady current is set up in a cubic network composed of wires of equal resistance and length d as shown in figure. What is the magnetic field at the centre P due to the cubic network ?
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/496814/1/967144/Picture481.png)
A steady current is set up in a cubic network composed of wires of equal resistance and length d as shown in figure. What is the magnetic field at the centre P due to the cubic network ?
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/496814/1/967144/Picture481.png)
physics-General
physics-
An infinitely long straight conductor is bent into the shape as shown in figure. It carries a current I ampere and the radius of the circular loop is r meter. Then the magnetic induction at the centre of the circular part is
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)
An infinitely long straight conductor is bent into the shape as shown in figure. It carries a current I ampere and the radius of the circular loop is r meter. Then the magnetic induction at the centre of the circular part is
![](data:image/png;base64,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)
physics-General
chemistry-
chemistry-General
chemistry-
What is A in the following reaction?
![](data:image/png;base64,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)
What is A in the following reaction?
![](data:image/png;base64,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)
chemistry-General
chemistry-
chemistry-General
physics-
In the given figure, B is magnetic field at P due to shown segment AB of an infinite current carrying wire. A loop is taken as shown in figure. Which of the following statement(s) is/are correct
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/496758/1/967083/Picture473.png)
In the given figure, B is magnetic field at P due to shown segment AB of an infinite current carrying wire. A loop is taken as shown in figure. Which of the following statement(s) is/are correct
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/496758/1/967083/Picture473.png)
physics-General
physics-
A circular current carrying loop of radius R is bent about its diameter by
and placed in a magnetic field
as shown in figure.
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/496741/1/967080/Picture472.png)
A circular current carrying loop of radius R is bent about its diameter by
and placed in a magnetic field
as shown in figure.
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/496741/1/967080/Picture472.png)
physics-General