Maths-
General
Easy
Question
Convert ¾ into whole number ;
- 0.45
- 0.55
- 0.75
- 0.65
The correct answer is: 0.75
3/4
4 30 0.75
28
20
20
0
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Write the coordinates of A:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAmMAAAH/CAYAAAAbhNrYAAAgAElEQVR4nO3df5Cc9X3Y8c9xK7j1PispEIyNjQ2SnDgtttE42B1b2NhNEM3UMThkgmmwRafDjNR0jHPESmump+soMwVzAZrWcvpLGtMxSkpNaKYTDrcBG2GHYAewnaSJdcI2GINdQHB7vhPo2P7BSEHidDpJ++zn2d3Xa2Zn0N7uPt9nh9177/d57rtD7Xa7HQAApDgpewAAAINMjAEAJBJjAACJxBgAQCIxBgCQSIwBACQSYwAAicQYUDlPPjOXPQSArhFjQKW0ZvfHxt99RJABA0OMAbFp06YYGhqKPXv2vOpna9asiTVr1nRtLLfe/Vi0ZvfHjTt3d22bAJnEGBDXXnttRETceOONh1y/c+fOmJqaiq1bt3ZlHE8+Mxf3f/vpKOq1ePLZl/8boN8N+W5KIOLl2bFt27bF1NRUrFq1KiLi4IzY7t3dmaW69rPfjrevXh533PfDuPbyNXHjzt1xx9Z3d2XbAFnMjAER8erZsW7Pit3/7afjyWfn4iPvOzMa9eFYfWYj3rF6RXx+8vtd2T5AFjEGRETEqlWrYuPGjbFt27aIiNixY0esX78+Lr/88q5s/46v/DCuvOisKOq1g9dde/mauPXux5zMD/Q1MQYcdGB27OKLL47Jycm47rrrurLdL37liYiIWH/+GYdcX9RrBw9XAvQrMQYcdGB2bHJyMtavXx/r1q0rfZut2f3xxfueiCsvOuvgdUW9FjOz8xHxcqC15vY7mR/oW2IMOMQVV1wREREbNmzoyvYemXou3nvuafGONSuOeJvf+rW3xDennu/KeAC6rXb0mwCU573nnhbvPfe0RW+z+g2N2PiGc7o0IoDuMjMGAJBIjAGVU4zUojW7P3sYAF0hxgAAEjlnDDjEunXrwhdzAHSPmTEAgERiDKicol6L1pxzxoDBIMYAABKJMQCARGIMACCRGAMqp1Efts4YMDDEGABAIjEGAJBIjAGVU9RrMTM7nz0MgK4QYwAAicQYAEAiMQYAkEiMAQAkEmNA5TRGrDMGDA4xBgCQSIwBACQSYwAAicQYUDlFvRYzcxZ9BQaDGAMASCTGAAASiTGgchp1S1sAg0OMAQAkEmMAAInEGABAIjEGVE5Rr8XMrKUtgMEgxgAAEokxAIBEYgwAIJEYAyqnGKlZZwwYGGIMACCRGAMASCTGAAASiTGgcop6LVpzzhkDBoMYAwBIJMYAABKJMaByGvVhS1sAA0OMAQAkEmMAAInEGABAIjEGVE5Rr8XM7Hz2MAC6QowBACQSYwAAicQYAEAiMQZUTlGvWWcMGBhiDAAgkRgDAEgkxgAAEokxoJKcNwYMCjEGAJBIjAEAJBJjAACJxBhQSY36sHPGgIEgxgAAEokxAIBEYgyopKJei5nZ+exhAJROjAEAJBJjAACJxBgAQCIxBlSWpS2AQSDGgEoqRmrZQwDoCjEGAJBIjAEAJBJjAACJxBhQSUW9Fq05J/AD/U+MAQAkEmMAAInEGFBJjfqwdcaAgSDGAAASiTEAgERiDAAgkRgDKqmo12Jmdj57GAClE2MAAInEGABAIjEGAJBIjAGV1BixzhgwGMQYAEAiMQYAkEiMAQAkEmNAJRX1WszMWWcM6H9iDAAgkRgDAEgkxoBKatQtbQEMBjEGAJColj0AYDCNj4/HxMREFEWx4OX5fbWYeWFZ7P3WG494m8MvzWYze7cAjtlQu91uZw8CGEzT09PRarUWvPzZt56Iqceejnf/TP2Q6xe7z+joaIyNjWXvFsAxEWNAJd3/7afjSw/+OLZc9dbsoQCUyjljAACJxBgAQCIxBgCQSIwBlVSM1KwzBgwEMQYAkEiMAQAkEmMAAInEGFBJRb0WrTnnjAH9T4wBACQSYwAAicQYAEAiMQZUUqM+bJ0xYCCIMQCARGIMACCRGAMqqajXYmZ2PnsYAKUTYwAAiWrZAwAGx/j4eExMTERRFAtems3mwf8++ZTXxJ4Hn43t2//qiLc/cB+AXjbUbrfb2YMABsf09HS0Wq2jXp7Z+3zccc+eeP/bikXvMzo6GmNjY9m7BXDczIwBXdVsNpc0m9Wa3R+7l30j/svWd3dhVAB5nDMGVFJRr1lnDBgIYgwAIJEYAwBIJMaAynKoEhgEYgwAIJEYAwBIJMYAABKJMQCARGIMqKxGfdgJ/EDfE2MAAInEGABAIjEGVFZRr8XM7Hz2MABKJcYAABKJMQCARGIMACCRGAMqqxjx3ZRA/xNjAACJxBgAQCIxBgCQSIwBlVXUa9Gac85Ylk2bNsXQ0FBs2rQpeyjQ18QYAAvatm1bbNy4MbZt25Y9FOhrYgyAV9m5c2dERFx77bWH/BvoPDEGVFajPmxpiyQ7duyIjRs3xqpVq2L16tWxY8eO7CFB3xJjABxiz549MTk5Ge973/siIuLqq6+OycnJ2LNnT/LIoD+JMQAOcfvtt0dExLve9a6IiHjPe95zyPVAZw212+129iAAFvKZnd+Jt69eHuvPPyN7KANlzZo1sWbNmrjrrrsOuS4iYvfu3VnDgr5lZgyorKJei5nZ+exhDJRdu3bF1NRUfPCDHzzk+osuuiimpqYcqoQS1LIHAAyO8fHxmJiYiKIoFrw0m81D/v3wo/vi9NNWxPxTb1z0PnTOV7/61YiI2Lx5c2zevPlVP7/99tvjU5/6VLeHBX3NYUqgq6anp6PVai3p8rVvPhFDL83FaY35I95mdHQ0xsbGsnerbyx0iPKVP4twqBI6zcwY0FXNZnPJs1nb7nw0zvipU+Ij7zuz5FER8XeHKLdu3brgz6+++urYvHlz7Nq1K9atW9fl0UH/cs4YUFmNEeuMddMXvvCFiIi4/PLLF/z5ZZdddsjtgM5wmBKorM9Pfj8iIj62/k3JIwEoj5kxAIBEYgwAIJEYAyqrqNdiZs46Y0B/E2MAAInEGABAIjEGAJBIjAGV1ahbZwzof2IMACCRGAMASCTGgMoq6rWYmbW0BdDfxBgAQCIxBgCQSIwBACQSYwAAicQYUFnFSM06Y0DfE2MAAInEGABAolr2AIDBMj4+HhMTE1EUxYKXZrN58L9feOnk+LO/mY3t9Z894u0P3AegVw212+129iCAwTI9PR2tVuuol8d++Gzc9/Dj8a631Be9z+joaIyNjWXvVlf9+bcei9v+5Jvx8P99IvY+/5NYufw1cd5bz4yP/qO3x7vedlb28IBjIMaAypr6wUx85g++E5/7zfOyh1Ip/+NL34rP7LgvGivOjPay5TFcOyXm9++LF36yN/b/5Mn4rQ0XxK/84tuyhwkskXPGAHrMf7z9wTi5+cY4qX56DNdOiYiI4dopUV9+RpzcfGP8/n9/MHmEwLEQY0BlNerDlrY4gqGTlh3xZ/MvOeABvUSMAfSYqy87P/btfTRmn38q5vfvi4iI+f37Yvb5p2J272PxTy99Z/IIgWPhrykBesyv/OLb4qzXrYxb//jh+NZ3puKZ52di5fJGrH3L6+PKD/2yE/ihx4gxgB70rredJbqgTzhMCVRWUa/FzOx89jAASlXpGNu0aVMMDQ3Fnj17socCAFCKrsfYrl27YmhoKG644YZX/Ux8AQCD1gpdj7F169bF+vXrY/PmzYc8kXv27Ilt27bFxo0bY9WqVQevW79+/cF/AwD971haoR+krMC/Z8+eWL16daxfvz7uuuuuiIi4+OKLY3JyMg4MZ9euXXHBBRfE1NRUXz3hwLH5xdH740sT780eBtBlS2mFfpHy15SrVq2K66+/PjZv3hy7du2KiIjJycm47bbbDt5m69atcf311wsxABhAS2mFfpH63ZRDQ0OxevXqg//evXt31lCAijIzBoNtEFohdZ2x2267LT760Y9GRMR9992XORQAoIIGoRVSl7b4/ve/f/C/H3/88cSRAFVV1Gu+nxIG2CC0QtphygMn5m3cuDH27NnTlyfkASfu0useiFs//c4o6r4wBAbNoLRC2szYjTfeGBERn/3sZ+O6666LiFhwPREAYDANSiukxNiuXbti27Ztcf3110fEy+uJbNy48VXriQAAg2mQWiHlMOWaNWsi4tC/iFhoPRGAX/+dr8eNG8+N1506kj0UoIsGqRW6PjN2ww03xNTUVGzduvWQ6w+sJzI5OXlwPREAYPAMWiukrjMGcDRmxoB+J8aArhofH4+JiYkoimLBS7PZPOTf/+vB5+JD686OVWedtuh9AHqVGAO6bnp6Olqt1pIu//O+R+Pn3rAsYn72iLcZHR2NsbGx7N0COC4W7gG6rtlsLnk26+nffTh+69feEqvf0Ch5VAA5UlfgBwAYdGIMqLRixNchAf1NjAEAJBJjAACJxBgAQCIxBlRaUa9Fa845Y0D/EmMAAInEGABAIjEGAJBIjAGV1qgPW2cM6GtiDAAgkRgDAEgkxoBKK+q1mJmdzx4GQGnEGABAIjEGAJBIjAEAJBJjAACJxBhQaY0R64wB/U2MAQAkqmUPABgc4+PjMTExEUVRLHhpNpuvuu6b390Xp9QbcfpLZx/xPgC9bKjdbrezBwEMjunp6Wi1Wku+PPw3T8bcT2bitOKlBX8+OjoaY2Nj2bsFcNzEGFBpX/zKE/HUs/ti44fPyR5Kz7j17sfiyovOyh4GsETOGeOY3Xr3Y9lDABZx5/0/jL2tF7OHASyRGOOYeaOHalvRqMVzM16j0CvEGMesjDf6MmbbzOD1h0bd0hbHamXj5Hh+prPPmdcTlEeMcczKeKMvY7atGzN4Wb+gytruoP/C7Zf9X17CByYz4lAeMcYxK+ONvozZtm4cqsn6BVXWdgf9F26/7P+KxrJ4rsMfmHrp0Ge/RDWDQ4xxzMp4oy9jtq2Mxzxc1i+osrbbS79wy1DW/nc7DpY3avFc64WOPmaZr6dOPz/9EtUMjr6Ksb1798aOHTuyh9H3ynijL2O2rYzHPFw3gq+b283an8UU9VrMzM53ZVtl7X+342Bl0fkPTGW+njr9/Az6hwp6T1/E2N69e+Pmm2+OtWvXxiOPPJI9nL5Xxht9OYdVOv+Yh+tG8HVzu1n7UxVl7X+34+Dl//c7fdi/vNdTp5+fKn6ogMX0/Nch3XvvvfHJT34yVq5cGXfccUecd9552UPqeysay+JvH2919DFLm23r8GMerhvB183tZu1PVZS1/92Og+WNWse3V+brqdPPz6B/qKD39GyM3XvvvXHLLbfEd7/73RgbG4tLLrkke0gDo4w3+pXFsnjq2X2Vf8zDdSP4urndrP2pilKf1x6fGSvz9dTp52fQP1TQe3ruMOXevXvjk5/8ZFx11VXx/ve/P+655x4h1mXlHQKp/mMeroxDtpnbzdqfxRQjta6tM1bW/nc7DlYUy+K5Dp+jVubrqdPPz6B/qKD39NTM2N69e+Occ86JvXv3RkTE+Ph4jI+Px8qVKxe8/ULXL/W6Y71+xYoVJzSGqtx2Kcp4oy/rsEr5f03Z+UO2mdvN2p+qKGv/ux0HZYRTma+nTj8/3ZgVh07qqRhbuXJl3HPPPXHLLbfEww8/HJ/4xCfikksuORhnh1vo+qVed6zXH+m23/ve91513ZH+yOBEx9aJ2y4l3E6qjcTZv/TvY+3atcd1/4Wuf2H4p2NvsS6uuuozHYvdZ2ZHYuoHp8eOHX9+QmNb7LrZ1lw8vXffq57PE4ndpSjrF2M3ArbKytr/bsfByMkvH/SYe+Glg/99osqcGev08zPoHyoG1c033xwrV66MDRs2ZA/lmPVUjEVEnHfeebF9+/bYsWNHjI+Px5e//OUYGxuLs88+O3tofWGp4fYbn3sifv8/bY+Ta0e/7VIicebFZfGlqRXx/vPe37HY3X9SEc8v/8fx5S9/+YTGtth1p6w8J059+8finE9fuKTH7VQQDr3mDXHSm345PvCBf97Rmd3W/PKY2vdzsWXLH3Z0vCdy2+nnT4p9s9OHPKdlxW5ZwZERBwf2ZeTkUzrzeCXMiB987A4/P4P+oWJQXXjhhXHppZf2ZBf0XIwdsGHDhtiwYUPcfPPNcc4558RNN90U11xzTfawet6SD+0W/y/evPrn4oyf6swb/dwLL8VdYw909BPN3Asvxa+OPRDbt2/v2GMe7qln98Xof/hWfPXZZ5d0+04F4XOzQ3Hr/cPxG2NjHZ3ZXXbSi/HiS8sOXl+Fmd1nnnk25l58Kf7b1uGj3jbixE5PWPnas6P2M/8sPvCBa45622O5/qXGqvjhi2+OLX/7hc6Od5EoXXbSKfHgX/xlvPG0kxa9/VKvK3NmrNPx1I3zRame8847Lx599NGDXTA2NhZbtmzJHtaS9GyMHXDNNdfEhRdeGLfcckusXbvWX1Z2yYFPyZ2KsTIOq5TxmIc71jf9Tp2/N/fCS/Gfv/JAXHjhumO+79Ee91fHHqjUG9jUD2biM3/wnfjcby5t2ZoTOT3hx08/FzdNDsenx8aOettjuf7xp1+MF9vLFrztUoP3WAI2IqJ99j+Jf/N//jRefOavj/kxjvS4H/gXX4rTTn99vLR/7pDrT3QGdPkZb425n/6FuPTSTx/3477yVIZ97Xp8b+adsWXLlkrM7nb6vF0Wd80118Qll1wS4+PjsXbt2vjEJz5R+UOXPR9jEYceurzzzjvFWBeU+dePnTqsUtZjvlI3gq+b283an0460V98/+5/fy3+wXve09H9PzCDuuW67kXuv/3C38b5P/vh+IfvPL1jj/nrW78ev//1b8bpKw4NyxOdAX3sqem445EV8bFf+HhHHnfZ0N/FbxVmdzt93u6x3nZQ/0ht+/btce+998ZVV11V+UOXfRFjBxw4dEn5yjgno9OzbWU95qu2UXLwdXu7WftzJI36cNeWtogo90NBN5XygalYFu2T6rFyZXHI9Sc6yzP3wkvxhw8/0NEP0h/6l1+L3/5X/7rnPlSUEXmD+Edqh1+/Y8eO+KM/+qN46KGHKhlkfRVjdE+vrAvWjV+C3Qi+bm43a3+qooz9z5hxXNGodfz7MMt6PZX5159V+VCxVA5pdtaBmbGzzz47brrppkqGWIQY4ziV8Ubfy2uNZZwsXOZf/g3yyc9lP6/dioMVxcnxo8c6/7VlZb2eyvrrz0H9UDHoXvlVidu3b48LL7zw6HdK1Fvzt1TGiqLz37XXqzNjWX9Gb62xcpS1/2UuDbHg9kr4CqZSV+Hv8PMz6B8qBtUrv6Xn4x//eNxxxx2VD7EIMcZxKueNvozDKp1/zFdvw8xYmYp6LWZm57u2vX55Xlc0lpXwgam811Onn59B/1AxiLZs2RJr166NN7/5zfHQQw/FNddc0zOHeB2m5LiU8kZfwmGVMh7zVdvoQvB1c7tZ+1MVZe1/t+NgeaMWe2c6+xVMZb6erDXGiTr77LPjnnvuqex5YYsxM8ZxKeWNvqTZtvJP4O/8IdvM7WbtT1WU9rwmzIx1+svJy3w9dfr5GfQPFYNow4YNPRliEWKM41TOG30Zh1U6/5iv3kb5wdfN7WbtT1WU+bx2Mw5WFsviw+99fUcfs8zXU6efn0H/UEFvEWMclzLe6MuYbSvjMQ/XjeDr5naz9qcqSnteE+LgyovO6ujjlfl66vTzM+gfKugtYozj1uk3+rJm2zr9mIfrRvB1c7tZ+3MkRb3W1UVfy9r/foiDMl9PnX5+Bv1DBb1FjFEZZcy2lfGYh+tG8HVzu1n7UxVlPq+9Hgcvv55eV8pjd/r5qdqHCliMGKNSOj3bVtZjvlI3gq+b283an6ooa//7JQ6uvOhNpTxup5+fQf9QQW8RY9ABZQdft7ebtT9H0u1DlWXsvzhYXKefn0H/UEFvEWMAXSAOFlfGIdCqfaiAIxFjAF0iDhZX1iFQqDoxBgCQaKjdbrezBwEMpvHx8ZiYmIiiKBa8NJvNKIoi/vSR6fjQ+86J15++8oi3feV9AHqJGANSTU9PR6vVWvTyX//4b+L95zaiPT8XrVZr0fuMjo7G2NhY9m4BLJkvCgdSNZvNo85mPfD81+O3N54brzt1pEujAuge54wBACQSY0DlFfVazMzOZw8DoBRiDAAgkRgDAEgkxgAAEokxoPKKke5+NyVAN4kxAIBEYgwAIJEYAwBIJMaAyivqtWjNOWcM6E9iDAAgkRgDAEgkxoDKa9SHLW0B9C0xBgCQSIwBACQSYwAAicQYUHlFvRYzs/PZwwAohRgDAEgkxgAAEokxAIBEYgyovMaIdcaA/iXGAAASDbXb7Xb2IIDBNj4+HhMTE1EUxYKXp54filNGGnH+33/9EW9z+KXZbGbvFsCSiDGgEqanp6PVai14ufvPvhdzsz+Jv3fWskOuX+w+o6OjMTY2lr1bAEdVyx4AQEREs9k84mzW8BlPxFPP7ouNHz6ny6MCKJ9zxgAAEokxAIBEYgwAIJEYAyqvUbfOGNC/xBgAQCIxBgCQSIwBlVfUazEzO589DIBSiDEAgERiDAAgkRgDAEgkxgAAEokxoPKKkZp1xoC+JcYAABKJMQCARGIMqLyiXovWnMOUQH8SYwAAicQYAEAiMQYAkEiMAZXXqA9b2gLoW2IMACCRGAMASFTLHgAwuMbHx2NiYiKKoljw0mw2oyiKOHnkNfHQg8/F7y3/2hFv+8r7APSSoXa73c4eBDC4pqeno9VqLXp55tnn4wt3746L37k8Wq3WovcZHR2NsbGx7N0CWDIzY0CqZrN51Nms1uz+ePiFb8QtW9/dpVEBdI9zxgAAEokxAIBEYgyovKJes84Y0LfEGABAIjEGAJBIjAEAJBJjQE9w3hjQr8QYAEAiMQYAkEiMAQAkEmNAT2jUh50zBvQlMQYAkEiMAQAkEmNATyjqtZiZnc8eBkDHiTEAgERiDAAgkRgDAEgkxoCeUIz4OiSgP4kxAIBEYgwAIJEYAwBIJMaAnlDUa9Gac84Y0H/EGABAIjEGAJColj0AYLCNj4/HxMREFEWx4KXZbEZRFPHQnn3x5COnx1+sfu0Rb/vK+wD0iqF2u93OHgQw2Kanp6PVai16+ZOvfi9W1PfHa5vtaLVai95ndHQ0xsbGsncLYEnMjAHpms3mUWez5k7/Trx99fJYf/4ZXRoVQHc4ZwwAIJEYA3pCUa/FzOx89jAAOk6MAQAkEmMAAInEGABAIjEGAJBIjAE9oTEyHK1Z300J9B8xBgCQSIwBACQSYwAAicQY0BOKei1m5iz6CvQfMQYAkEiMAQAkEmNAT2jULW0B9CcxBgCQSIwBACQSYwAAicQY0BOKei1mZi1tAfSfWvYAgME2Pj4eExMTURTFgpdmsxlFUcTe2eH4wTMRv9c654i3feV9AHrFULvdbmcPAhhs09PT0Wq1Fr385dSP4q+mfhxrV50SrVZr0fuMjo7G2NhY9m4BLIkYA3rC/d9+Or704I9jy1VvzR4KQEc5ZwzoCcVIzTpjQF8SYwAAicQYAEAiMQYAkEiMAT2hqNeiNeecMaD/iDEAgERiDAAgkRgDekKjPmxpC6AviTEAgERiDAAgkRgDAEgkxoCeUNRrMTM7nz0MgI4TYwAAicQYAEAiMQYAkEiMAT2hqNesMwb0JTEGAJBIjAEAJBJjAACJhtrtdjt7EMBgGx8fj4mJiSiKYsFLs9mMoijirm88H1dctCZO/anlR7ztK+8D0AvEGFAJ09PT0Wq1Fr187o6/jl86f0W8MPeTaLVai95ndHQ0xsbGsncL4Khq2QMAiIhoNptHnc3606ceiLFPvzOKurcuoH84ZwwAIJEYA3pGoz5srTGg74gxAIBEYgwAIJEYA3pGUa/FzOx89jAAOkqMAQAkEmMAAInEGABAIjEGAJBIjAE9oxipWWcM6DtiDAAgkRgDAEgkxgAAEokxoGcU9Vq05pwzBvQXMQYAkEiMAQAkEmNAz2jUhy1tAfQdMQYAkEiMAQAkEmMAAInEGNAzinotZmbns4cB0FFiDAAgkRgDAEgkxgAAEokxoGc0RqwzBvQfMQYAkEiMAQAkEmMAAInEGNAzinotZuasMwb0FzEGAJBIjAEAJBJjQM9o1C1tAfQfMQYAkEiMAQAkEmMAAInEGNAzinotZmYtbQH0FzEGAJBIjAEAJBJjAACJxBjQM4qRmnXGgL4jxgAAEokxAIBEYgwAIJEYA3pGUa9Fa845Y0B/EWMAAInEGABAIjEGAJBIjAE9o1Efts4Y0HfEGABAIjEGAJBIjAE9o6jXYmZ2PnsYAB0lxgAAEokxAIBEYgwAIJEYAwBIJMaAnlHUa9YZA/qOGAMASCTGAAASiTGgpzhUCfQbMQYAkEiMAQAkEmMAAInEGABAIjEG9JRGfdgJ/EBfEWMAAInEGABAIjEG9JSiXouZ2fnsYQB0jBgDAEgkxgAAEokxAIBEYgzoKcWI76YE+osYAwBIJMYAABKJMQCARGIM6ClFvRatOeeMAf1DjAEAJBJjAACJxBjQUxr1YUtbAH1FjAEAJBJjAACJxBgAQCIxBvSUol6Lmdn57GEAdIwYA0qza9euGBoaihtuuCF7KACVJcaAY7Zp06YYGhqKPXv2vOpna9asiTVr1iSMCqA3iTHgmF177bUREXHjjTcecv3OnTtjamoqtm7dGhERjz/+eEREXHbZZd0dIEAPGWq32+3sQQC9Z9OmTbFt27aYmpqKVatWRUQcnBHbvXv3wX9fffXV8alPfapj2/385PcjIuJj69/UsccEyGRmDDguh8+OHT4rtnPnzoiIjoYYQD8yMwYctwOzY+12Oy6++OKIiLjrrrtK3aaZMaDfmBkDjtuB2bGLL744Jicn47rrrkseEUDvEWPAcVu1alVs3LgxJicnY/369bFu3bqubHdmzjpjQP8QY8AJueKKKyIiYsOGDV3ZXlGvdWU7AN0ixgAAEokxAIBEYgzoKY36cLRm92cPA6BjxBgAQCJnwgInZN26dWG5QoDjZ2YM6ClFvRYzs5a2APqHGAMASCTGAAASiTEAgERiDAAgkRgDevm5ZKkAAAG/SURBVEoxUrPOGNBXxBgAQCIxBgCQSIwBPac15zAl0D/EGNBTirovDgH6ixgDAEgkxgAAEokxoKc06sOWtgD6ihgDAEgkxgAAEokxAIBEYgzoKUW9FjOz89nDAOgYMQYAkEiMAQAkEmMAAInEGNBTinrNOmNAXxFjAACJxBjQF8yWAb1KjAGV9sWvPBGTDz616G0+P/n9uPXux7o0IoDOEmNApb3n3FPjc3d+N558Zu7gda88b+zJZ+bi7q//KC76+ddmDRHghIgxoNJed+pIXHT+a+Nzd353wZ/fcd8P46Kff22sfkOjyyMD6AwxBlTelRedFbufaMUju5875PpHdj8X93/76fjI+85MGhnAiRNjQOUV9Vps/PA58Zk/+M4h199692PxkQvOjKJeSxoZwIkTY0BPeO+5p8WaM4v44leeiEZ9OO5+8Efx5LNzcdH5zhUDettQu91uZw8CYClas/vjyt/5xsF/b9nw1njHmhWJIwI4cWbGgJ5R1Gtx6QWvj9bs/njH6hVCDOgLYgzoKR9b/6Y449RT4tILXp89FICOcJgS6DlPPjMXrzt1JHsYAB0hxgAAEjlMCQCQ6P8Doi2EvVB/X4UAAAAASUVORK5CYII=)
For such questions, we have to count the distance of from both the axis
Write the coordinates of A:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAmMAAAH/CAYAAAAbhNrYAAAgAElEQVR4nO3df5Cc9X3Y8c9xK7j1PispEIyNjQ2SnDgtttE42B1b2NhNEM3UMThkgmmwRafDjNR0jHPESmump+soMwVzAZrWcvpLGtMxSkpNaKYTDrcBG2GHYAewnaSJdcI2GINdQHB7vhPo2P7BSEHidDpJ++zn2d3Xa2Zn0N7uPt9nh9177/d57rtD7Xa7HQAApDgpewAAAINMjAEAJBJjAACJxBgAQCIxBgCQSIwBACQSYwAAicQYUDlPPjOXPQSArhFjQKW0ZvfHxt99RJABA0OMAbFp06YYGhqKPXv2vOpna9asiTVr1nRtLLfe/Vi0ZvfHjTt3d22bAJnEGBDXXnttRETceOONh1y/c+fOmJqaiq1bt3ZlHE8+Mxf3f/vpKOq1ePLZl/8boN8N+W5KIOLl2bFt27bF1NRUrFq1KiLi4IzY7t3dmaW69rPfjrevXh533PfDuPbyNXHjzt1xx9Z3d2XbAFnMjAER8erZsW7Pit3/7afjyWfn4iPvOzMa9eFYfWYj3rF6RXx+8vtd2T5AFjEGRETEqlWrYuPGjbFt27aIiNixY0esX78+Lr/88q5s/46v/DCuvOisKOq1g9dde/mauPXux5zMD/Q1MQYcdGB27OKLL47Jycm47rrrurLdL37liYiIWH/+GYdcX9RrBw9XAvQrMQYcdGB2bHJyMtavXx/r1q0rfZut2f3xxfueiCsvOuvgdUW9FjOz8xHxcqC15vY7mR/oW2IMOMQVV1wREREbNmzoyvYemXou3nvuafGONSuOeJvf+rW3xDennu/KeAC6rXb0mwCU573nnhbvPfe0RW+z+g2N2PiGc7o0IoDuMjMGAJBIjAGVU4zUojW7P3sYAF0hxgAAEjlnDDjEunXrwhdzAHSPmTEAgERiDKicol6L1pxzxoDBIMYAABKJMQCARGIMACCRGAMqp1Efts4YMDDEGABAIjEGAJBIjAGVU9RrMTM7nz0MgK4QYwAAicQYAEAiMQYAkEiMAQAkEmNA5TRGrDMGDA4xBgCQSIwBACQSYwAAicQYUDlFvRYzcxZ9BQaDGAMASCTGAAASiTGgchp1S1sAg0OMAQAkEmMAAInEGABAIjEGVE5Rr8XMrKUtgMEgxgAAEokxAIBEYgwAIJEYAyqnGKlZZwwYGGIMACCRGAMASCTGAAASiTGgcop6LVpzzhkDBoMYAwBIJMYAABKJMaByGvVhS1sAA0OMAQAkEmMAAInEGABAIjEGVE5Rr8XM7Hz2MAC6QowBACQSYwAAicQYAEAiMQZUTlGvWWcMGBhiDAAgkRgDAEgkxgAAEokxoJKcNwYMCjEGAJBIjAEAJBJjAACJxBhQSY36sHPGgIEgxgAAEokxAIBEYgyopKJei5nZ+exhAJROjAEAJBJjAACJxBgAQCIxBlSWpS2AQSDGgEoqRmrZQwDoCjEGAJBIjAEAJBJjAACJxBhQSUW9Fq05J/AD/U+MAQAkEmMAAInEGFBJjfqwdcaAgSDGAAASiTEAgERiDAAgkRgDKqmo12Jmdj57GAClE2MAAInEGABAIjEGAJBIjAGV1BixzhgwGMQYAEAiMQYAkEiMAQAkEmNAJRX1WszMWWcM6H9iDAAgkRgDAEgkxoBKatQtbQEMBjEGAJColj0AYDCNj4/HxMREFEWx4OX5fbWYeWFZ7P3WG494m8MvzWYze7cAjtlQu91uZw8CGEzT09PRarUWvPzZt56Iqceejnf/TP2Q6xe7z+joaIyNjWXvFsAxEWNAJd3/7afjSw/+OLZc9dbsoQCUyjljAACJxBgAQCIxBgCQSIwBlVSM1KwzBgwEMQYAkEiMAQAkEmMAAInEGFBJRb0WrTnnjAH9T4wBACQSYwAAicQYAEAiMQZUUqM+bJ0xYCCIMQCARGIMACCRGAMqqajXYmZ2PnsYAKUTYwAAiWrZAwAGx/j4eExMTERRFAtems3mwf8++ZTXxJ4Hn43t2//qiLc/cB+AXjbUbrfb2YMABsf09HS0Wq2jXp7Z+3zccc+eeP/bikXvMzo6GmNjY9m7BXDczIwBXdVsNpc0m9Wa3R+7l30j/svWd3dhVAB5nDMGVFJRr1lnDBgIYgwAIJEYAwBIJMaAynKoEhgEYgwAIJEYAwBIJMYAABKJMQCARGIMqKxGfdgJ/EDfE2MAAInEGABAIjEGVFZRr8XM7Hz2MABKJcYAABKJMQCARGIMACCRGAMqqxjx3ZRA/xNjAACJxBgAQCIxBgCQSIwBlVXUa9Gac85Ylk2bNsXQ0FBs2rQpeyjQ18QYAAvatm1bbNy4MbZt25Y9FOhrYgyAV9m5c2dERFx77bWH/BvoPDEGVFajPmxpiyQ7duyIjRs3xqpVq2L16tWxY8eO7CFB3xJjABxiz549MTk5Ge973/siIuLqq6+OycnJ2LNnT/LIoD+JMQAOcfvtt0dExLve9a6IiHjPe95zyPVAZw212+129iAAFvKZnd+Jt69eHuvPPyN7KANlzZo1sWbNmrjrrrsOuS4iYvfu3VnDgr5lZgyorKJei5nZ+exhDJRdu3bF1NRUfPCDHzzk+osuuiimpqYcqoQS1LIHAAyO8fHxmJiYiKIoFrw0m81D/v3wo/vi9NNWxPxTb1z0PnTOV7/61YiI2Lx5c2zevPlVP7/99tvjU5/6VLeHBX3NYUqgq6anp6PVai3p8rVvPhFDL83FaY35I95mdHQ0xsbGsnerbyx0iPKVP4twqBI6zcwY0FXNZnPJs1nb7nw0zvipU+Ij7zuz5FER8XeHKLdu3brgz6+++urYvHlz7Nq1K9atW9fl0UH/cs4YUFmNEeuMddMXvvCFiIi4/PLLF/z5ZZdddsjtgM5wmBKorM9Pfj8iIj62/k3JIwEoj5kxAIBEYgwAIJEYAyqrqNdiZs46Y0B/E2MAAInEGABAIjEGAJBIjAGV1ahbZwzof2IMACCRGAMASCTGgMoq6rWYmbW0BdDfxBgAQCIxBgCQSIwBACQSYwAAicQYUFnFSM06Y0DfE2MAAInEGABAolr2AIDBMj4+HhMTE1EUxYKXZrN58L9feOnk+LO/mY3t9Z894u0P3AegVw212+129iCAwTI9PR2tVuuol8d++Gzc9/Dj8a631Be9z+joaIyNjWXvVlf9+bcei9v+5Jvx8P99IvY+/5NYufw1cd5bz4yP/qO3x7vedlb28IBjIMaAypr6wUx85g++E5/7zfOyh1Ip/+NL34rP7LgvGivOjPay5TFcOyXm9++LF36yN/b/5Mn4rQ0XxK/84tuyhwkskXPGAHrMf7z9wTi5+cY4qX56DNdOiYiI4dopUV9+RpzcfGP8/n9/MHmEwLEQY0BlNerDlrY4gqGTlh3xZ/MvOeABvUSMAfSYqy87P/btfTRmn38q5vfvi4iI+f37Yvb5p2J272PxTy99Z/IIgWPhrykBesyv/OLb4qzXrYxb//jh+NZ3puKZ52di5fJGrH3L6+PKD/2yE/ihx4gxgB70rredJbqgTzhMCVRWUa/FzOx89jAASlXpGNu0aVMMDQ3Fnj17socCAFCKrsfYrl27YmhoKG644YZX/Ux8AQCD1gpdj7F169bF+vXrY/PmzYc8kXv27Ilt27bFxo0bY9WqVQevW79+/cF/AwD971haoR+krMC/Z8+eWL16daxfvz7uuuuuiIi4+OKLY3JyMg4MZ9euXXHBBRfE1NRUXz3hwLH5xdH740sT780eBtBlS2mFfpHy15SrVq2K66+/PjZv3hy7du2KiIjJycm47bbbDt5m69atcf311wsxABhAS2mFfpH63ZRDQ0OxevXqg//evXt31lCAijIzBoNtEFohdZ2x2267LT760Y9GRMR9992XORQAoIIGoRVSl7b4/ve/f/C/H3/88cSRAFVV1Gu+nxIG2CC0QtphygMn5m3cuDH27NnTlyfkASfu0useiFs//c4o6r4wBAbNoLRC2szYjTfeGBERn/3sZ+O6666LiFhwPREAYDANSiukxNiuXbti27Ztcf3110fEy+uJbNy48VXriQAAg2mQWiHlMOWaNWsi4tC/iFhoPRGAX/+dr8eNG8+N1506kj0UoIsGqRW6PjN2ww03xNTUVGzduvWQ6w+sJzI5OXlwPREAYPAMWiukrjMGcDRmxoB+J8aArhofH4+JiYkoimLBS7PZPOTf/+vB5+JD686OVWedtuh9AHqVGAO6bnp6Olqt1pIu//O+R+Pn3rAsYn72iLcZHR2NsbGx7N0COC4W7gG6rtlsLnk26+nffTh+69feEqvf0Ch5VAA5UlfgBwAYdGIMqLRixNchAf1NjAEAJBJjAACJxBgAQCIxBlRaUa9Fa845Y0D/EmMAAInEGABAIjEGAJBIjAGV1qgPW2cM6GtiDAAgkRgDAEgkxoBKK+q1mJmdzx4GQGnEGABAIjEGAJBIjAEAJBJjAACJxBhQaY0R64wB/U2MAQAkqmUPABgc4+PjMTExEUVRLHhpNpuvuu6b390Xp9QbcfpLZx/xPgC9bKjdbrezBwEMjunp6Wi1Wku+PPw3T8bcT2bitOKlBX8+OjoaY2Nj2bsFcNzEGFBpX/zKE/HUs/ti44fPyR5Kz7j17sfiyovOyh4GsETOGeOY3Xr3Y9lDABZx5/0/jL2tF7OHASyRGOOYeaOHalvRqMVzM16j0CvEGMesjDf6MmbbzOD1h0bd0hbHamXj5Hh+prPPmdcTlEeMcczKeKMvY7atGzN4Wb+gytruoP/C7Zf9X17CByYz4lAeMcYxK+ONvozZtm4cqsn6BVXWdgf9F26/7P+KxrJ4rsMfmHrp0Ge/RDWDQ4xxzMp4oy9jtq2Mxzxc1i+osrbbS79wy1DW/nc7DpY3avFc64WOPmaZr6dOPz/9EtUMjr6Ksb1798aOHTuyh9H3ynijL2O2rYzHPFw3gq+b283an8UU9VrMzM53ZVtl7X+342Bl0fkPTGW+njr9/Az6hwp6T1/E2N69e+Pmm2+OtWvXxiOPPJI9nL5Xxht9OYdVOv+Yh+tG8HVzu1n7UxVl7X+34+Dl//c7fdi/vNdTp5+fKn6ogMX0/Nch3XvvvfHJT34yVq5cGXfccUecd9552UPqeysay+JvH2919DFLm23r8GMerhvB183tZu1PVZS1/92Og+WNWse3V+brqdPPz6B/qKD39GyM3XvvvXHLLbfEd7/73RgbG4tLLrkke0gDo4w3+pXFsnjq2X2Vf8zDdSP4urndrP2pilKf1x6fGSvz9dTp52fQP1TQe3ruMOXevXvjk5/8ZFx11VXx/ve/P+655x4h1mXlHQKp/mMeroxDtpnbzdqfxRQjta6tM1bW/nc7DlYUy+K5Dp+jVubrqdPPz6B/qKD39NTM2N69e+Occ86JvXv3RkTE+Ph4jI+Px8qVKxe8/ULXL/W6Y71+xYoVJzSGqtx2Kcp4oy/rsEr5f03Z+UO2mdvN2p+qKGv/ux0HZYRTma+nTj8/3ZgVh07qqRhbuXJl3HPPPXHLLbfEww8/HJ/4xCfikksuORhnh1vo+qVed6zXH+m23/ve91513ZH+yOBEx9aJ2y4l3E6qjcTZv/TvY+3atcd1/4Wuf2H4p2NvsS6uuuozHYvdZ2ZHYuoHp8eOHX9+QmNb7LrZ1lw8vXffq57PE4ndpSjrF2M3ArbKytr/bsfByMkvH/SYe+Glg/99osqcGev08zPoHyoG1c033xwrV66MDRs2ZA/lmPVUjEVEnHfeebF9+/bYsWNHjI+Px5e//OUYGxuLs88+O3tofWGp4fYbn3sifv8/bY+Ta0e/7VIicebFZfGlqRXx/vPe37HY3X9SEc8v/8fx5S9/+YTGtth1p6w8J059+8finE9fuKTH7VQQDr3mDXHSm345PvCBf97Rmd3W/PKY2vdzsWXLH3Z0vCdy2+nnT4p9s9OHPKdlxW5ZwZERBwf2ZeTkUzrzeCXMiB987A4/P4P+oWJQXXjhhXHppZf2ZBf0XIwdsGHDhtiwYUPcfPPNcc4558RNN90U11xzTfawet6SD+0W/y/evPrn4oyf6swb/dwLL8VdYw909BPN3Asvxa+OPRDbt2/v2GMe7qln98Xof/hWfPXZZ5d0+04F4XOzQ3Hr/cPxG2NjHZ3ZXXbSi/HiS8sOXl+Fmd1nnnk25l58Kf7b1uGj3jbixE5PWPnas6P2M/8sPvCBa45622O5/qXGqvjhi2+OLX/7hc6Od5EoXXbSKfHgX/xlvPG0kxa9/VKvK3NmrNPx1I3zRame8847Lx599NGDXTA2NhZbtmzJHtaS9GyMHXDNNdfEhRdeGLfcckusXbvWX1Z2yYFPyZ2KsTIOq5TxmIc71jf9Tp2/N/fCS/Gfv/JAXHjhumO+79Ee91fHHqjUG9jUD2biM3/wnfjcby5t2ZoTOT3hx08/FzdNDsenx8aOettjuf7xp1+MF9vLFrztUoP3WAI2IqJ99j+Jf/N//jRefOavj/kxjvS4H/gXX4rTTn99vLR/7pDrT3QGdPkZb425n/6FuPTSTx/3477yVIZ97Xp8b+adsWXLlkrM7nb6vF0Wd80118Qll1wS4+PjsXbt2vjEJz5R+UOXPR9jEYceurzzzjvFWBeU+dePnTqsUtZjvlI3gq+b283an0460V98/+5/fy3+wXve09H9PzCDuuW67kXuv/3C38b5P/vh+IfvPL1jj/nrW78ev//1b8bpKw4NyxOdAX3sqem445EV8bFf+HhHHnfZ0N/FbxVmdzt93u6x3nZQ/0ht+/btce+998ZVV11V+UOXfRFjBxw4dEn5yjgno9OzbWU95qu2UXLwdXu7WftzJI36cNeWtogo90NBN5XygalYFu2T6rFyZXHI9Sc6yzP3wkvxhw8/0NEP0h/6l1+L3/5X/7rnPlSUEXmD+Edqh1+/Y8eO+KM/+qN46KGHKhlkfRVjdE+vrAvWjV+C3Qi+bm43a3+qooz9z5hxXNGodfz7MMt6PZX5159V+VCxVA5pdtaBmbGzzz47brrppkqGWIQY4ziV8Ubfy2uNZZwsXOZf/g3yyc9lP6/dioMVxcnxo8c6/7VlZb2eyvrrz0H9UDHoXvlVidu3b48LL7zw6HdK1Fvzt1TGiqLz37XXqzNjWX9Gb62xcpS1/2UuDbHg9kr4CqZSV+Hv8PMz6B8qBtUrv6Xn4x//eNxxxx2VD7EIMcZxKueNvozDKp1/zFdvw8xYmYp6LWZm57u2vX55Xlc0lpXwgam811Onn59B/1AxiLZs2RJr166NN7/5zfHQQw/FNddc0zOHeB2m5LiU8kZfwmGVMh7zVdvoQvB1c7tZ+1MVZe1/t+NgeaMWe2c6+xVMZb6erDXGiTr77LPjnnvuqex5YYsxM8ZxKeWNvqTZtvJP4O/8IdvM7WbtT1WU9rwmzIx1+svJy3w9dfr5GfQPFYNow4YNPRliEWKM41TOG30Zh1U6/5iv3kb5wdfN7WbtT1WU+bx2Mw5WFsviw+99fUcfs8zXU6efn0H/UEFvEWMclzLe6MuYbSvjMQ/XjeDr5naz9qcqSnteE+LgyovO6ujjlfl66vTzM+gfKugtYozj1uk3+rJm2zr9mIfrRvB1c7tZ+3MkRb3W1UVfy9r/foiDMl9PnX5+Bv1DBb1FjFEZZcy2lfGYh+tG8HVzu1n7UxVlPq+9Hgcvv55eV8pjd/r5qdqHCliMGKNSOj3bVtZjvlI3gq+b283an6ooa//7JQ6uvOhNpTxup5+fQf9QQW8RY9ABZQdft7ebtT9H0u1DlWXsvzhYXKefn0H/UEFvEWMAXSAOFlfGIdCqfaiAIxFjAF0iDhZX1iFQqDoxBgCQaKjdbrezBwEMpvHx8ZiYmIiiKBa8NJvNKIoi/vSR6fjQ+86J15++8oi3feV9AHqJGANSTU9PR6vVWvTyX//4b+L95zaiPT8XrVZr0fuMjo7G2NhY9m4BLJkvCgdSNZvNo85mPfD81+O3N54brzt1pEujAuge54wBACQSY0DlFfVazMzOZw8DoBRiDAAgkRgDAEgkxgAAEokxoPKKke5+NyVAN4kxAIBEYgwAIJEYAwBIJMaAyivqtWjNOWcM6E9iDAAgkRgDAEgkxoDKa9SHLW0B9C0xBgCQSIwBACQSYwAAicQYUHlFvRYzs/PZwwAohRgDAEgkxgAAEokxAIBEYgyovMaIdcaA/iXGAAASDbXb7Xb2IIDBNj4+HhMTE1EUxYKXp54filNGGnH+33/9EW9z+KXZbGbvFsCSiDGgEqanp6PVai14ufvPvhdzsz+Jv3fWskOuX+w+o6OjMTY2lr1bAEdVyx4AQEREs9k84mzW8BlPxFPP7ouNHz6ny6MCKJ9zxgAAEokxAIBEYgwAIJEYAyqvUbfOGNC/xBgAQCIxBgCQSIwBlVfUazEzO589DIBSiDEAgERiDAAgkRgDAEgkxgAAEokxoPKKkZp1xoC+JcYAABKJMQCARGIMqLyiXovWnMOUQH8SYwAAicQYAEAiMQYAkEiMAZXXqA9b2gLoW2IMACCRGAMASFTLHgAwuMbHx2NiYiKKoljw0mw2oyiKOHnkNfHQg8/F7y3/2hFv+8r7APSSoXa73c4eBDC4pqeno9VqLXp55tnn4wt3746L37k8Wq3WovcZHR2NsbGx7N0CWDIzY0CqZrN51Nms1uz+ePiFb8QtW9/dpVEBdI9zxgAAEokxAIBEYgyovKJes84Y0LfEGABAIjEGAJBIjAEAJBJjQE9w3hjQr8QYAEAiMQYAkEiMAQAkEmNAT2jUh50zBvQlMQYAkEiMAQAkEmNATyjqtZiZnc8eBkDHiTEAgERiDAAgkRgDAEgkxoCeUIz4OiSgP4kxAIBEYgwAIJEYAwBIJMaAnlDUa9Gac84Y0H/EGABAIjEGAJColj0AYLCNj4/HxMREFEWx4KXZbEZRFPHQnn3x5COnx1+sfu0Rb/vK+wD0iqF2u93OHgQw2Kanp6PVai16+ZOvfi9W1PfHa5vtaLVai95ndHQ0xsbGsncLYEnMjAHpms3mUWez5k7/Trx99fJYf/4ZXRoVQHc4ZwwAIJEYA3pCUa/FzOx89jAAOk6MAQAkEmMAAInEGABAIjEGAJBIjAE9oTEyHK1Z300J9B8xBgCQSIwBACQSYwAAicQY0BOKei1m5iz6CvQfMQYAkEiMAQAkEmNAT2jULW0B9CcxBgCQSIwBACQSYwAAicQY0BOKei1mZi1tAfSfWvYAgME2Pj4eExMTURTFgpdmsxlFUcTe2eH4wTMRv9c654i3feV9AHrFULvdbmcPAhhs09PT0Wq1Fr385dSP4q+mfhxrV50SrVZr0fuMjo7G2NhY9m4BLIkYA3rC/d9+Or704I9jy1VvzR4KQEc5ZwzoCcVIzTpjQF8SYwAAicQYAEAiMQYAkEiMAT2hqNeiNeecMaD/iDEAgERiDAAgkRgDekKjPmxpC6AviTEAgERiDAAgkRgDAEgkxoCeUNRrMTM7nz0MgI4TYwAAicQYAEAiMQYAkEiMAT2hqNesMwb0JTEGAJBIjAEAJBJjAACJhtrtdjt7EMBgGx8fj4mJiSiKYsFLs9mMoijirm88H1dctCZO/anlR7ztK+8D0AvEGFAJ09PT0Wq1Fr187o6/jl86f0W8MPeTaLVai95ndHQ0xsbGsncL4Khq2QMAiIhoNptHnc3606ceiLFPvzOKurcuoH84ZwwAIJEYA3pGoz5srTGg74gxAIBEYgwAIJEYA3pGUa/FzOx89jAAOkqMAQAkEmMAAInEGABAIjEGAJBIjAE9oxipWWcM6DtiDAAgkRgDAEgkxgAAEokxoGcU9Vq05pwzBvQXMQYAkEiMAQAkEmNAz2jUhy1tAfQdMQYAkEiMAQAkEmMAAInEGNAzinotZmbns4cB0FFiDAAgkRgDAEgkxgAAEokxoGc0RqwzBvQfMQYAkEiMAQAkEmMAAInEGNAzinotZuasMwb0FzEGAJBIjAEAJBJjQM9o1C1tAfQfMQYAkEiMAQAkEmMAAInEGNAzinotZmYtbQH0FzEGAJBIjAEAJBJjAACJxBjQM4qRmnXGgL4jxgAAEokxAIBEYgwAIJEYA3pGUa9Fa845Y0B/EWMAAInEGABAIjEGAJBIjAE9o1Efts4Y0HfEGABAIjEGAJBIjAE9o6jXYmZ2PnsYAB0lxgAAEokxAIBEYgwAIJEYAwBIJMaAnlHUa9YZA/qOGAMASCTGAAASiTGgpzhUCfQbMQYAkEiMAQAkEmMAAInEGABAIjEG9JRGfdgJ/EBfEWMAAInEGABAIjEG9JSiXouZ2fnsYQB0jBgDAEgkxgAAEokxAIBEYgzoKcWI76YE+osYAwBIJMYAABKJMQCARGIM6ClFvRatOeeMAf1DjAEAJBJjAACJxBjQUxr1YUtbAH1FjAEAJBJjAACJxBgAQCIxBvSUol6Lmdn57GEAdIwYA0qza9euGBoaihtuuCF7KACVJcaAY7Zp06YYGhqKPXv2vOpna9asiTVr1iSMCqA3iTHgmF177bUREXHjjTcecv3OnTtjamoqtm7dGhERjz/+eEREXHbZZd0dIEAPGWq32+3sQQC9Z9OmTbFt27aYmpqKVatWRUQcnBHbvXv3wX9fffXV8alPfapj2/385PcjIuJj69/UsccEyGRmDDguh8+OHT4rtnPnzoiIjoYYQD8yMwYctwOzY+12Oy6++OKIiLjrrrtK3aaZMaDfmBkDjtuB2bGLL744Jicn47rrrkseEUDvEWPAcVu1alVs3LgxJicnY/369bFu3bqubHdmzjpjQP8QY8AJueKKKyIiYsOGDV3ZXlGvdWU7AN0ixgAAEokxAIBEYgzoKY36cLRm92cPA6BjxBgAQCJnwgInZN26dWG5QoDjZ2YM6ClFvRYzs5a2APqHGAMASCTGAAASiTEAgERiDAAgkRgDevm5ZKkAAAG/SURBVEoxUrPOGNBXxBgAQCIxBgCQSIwBPac15zAl0D/EGNBTirovDgH6ixgDAEgkxgAAEokxoKc06sOWtgD6ihgDAEgkxgAAEokxAIBEYgzoKUW9FjOz89nDAOgYMQYAkEiMAQAkEmMAAInEGNBTinrNOmNAXxFjAACJxBjQF8yWAb1KjAGV9sWvPBGTDz616G0+P/n9uPXux7o0IoDOEmNApb3n3FPjc3d+N558Zu7gda88b+zJZ+bi7q//KC76+ddmDRHghIgxoNJed+pIXHT+a+Nzd353wZ/fcd8P46Kff22sfkOjyyMD6AwxBlTelRedFbufaMUju5875PpHdj8X93/76fjI+85MGhnAiRNjQOUV9Vps/PA58Zk/+M4h199692PxkQvOjKJeSxoZwIkTY0BPeO+5p8WaM4v44leeiEZ9OO5+8Efx5LNzcdH5zhUDettQu91uZw8CYClas/vjyt/5xsF/b9nw1njHmhWJIwI4cWbGgJ5R1Gtx6QWvj9bs/njH6hVCDOgLYgzoKR9b/6Y449RT4tILXp89FICOcJgS6DlPPjMXrzt1JHsYAB0hxgAAEjlMCQCQ6P8Doi2EvVB/X4UAAAAASUVORK5CYII=)
Maths-General
For such questions, we have to count the distance of from both the axis
Maths-
Write the LCM of 10 and 11 :
Write the LCM of 10 and 11 :
Maths-General
Maths-
what is the least common multiple of 3 and 11:
what is the least common multiple of 3 and 11:
Maths-General
Maths-
What will be the reflection of (5 ,-3)on gragh:
What will be the reflection of (5 ,-3)on gragh:
Maths-General
Maths-
what is the absolute value of -234:
what is the absolute value of -234:
Maths-General
Maths-
What is the LCM of 20 and 18 :
What is the LCM of 20 and 18 :
Maths-General
Maths-
Find the lateral surface area of a cube whose side is 2.5m :
Find the lateral surface area of a cube whose side is 2.5m :
Maths-General
Maths-
What is the GCF of 10 and 20:
What is the GCF of 10 and 20:
Maths-General
Maths-
Find the GCF of 16 and 24:
Find the GCF of 16 and 24:
Maths-General
Maths-
Find the LCM of 20 and 3 :
Find the LCM of 20 and 3 :
Maths-General
Maths-
Find the LCM of 4 5 6 7
Find the LCM of 4 5 6 7
Maths-General
Maths-
Find the total surface area of a triangular prism whose three sides are 4cm , 5cm ,6cm ; base is 6 cm; length is 10cm; height is 8 cm :
Find the total surface area of a triangular prism whose three sides are 4cm , 5cm ,6cm ; base is 6 cm; length is 10cm; height is 8 cm :
Maths-General
Maths-
Divide 18 by 15 :
Divide 18 by 15 :
Maths-General
Maths-
Choose the best type of graph :
We should know different definitions of graphs.
Choose the best type of graph :
Maths-General
We should know different definitions of graphs.