Chemistry-
General
Easy
Question
Total number of enol possible for the compound formed during given reaction will be
(including stereoisomer): ![](data:image/png;base64,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)
- 2
- 3
- 4
- 5
The correct answer is: 3
Related Questions to study
Chemistry-
What is compound Z? ![C H subscript 3 end subscript C H subscript 2 end subscript C H subscript 2 end subscript B r stack ⟶ with N a C N on top X stack stack ⟶ with H subscript 3 end subscript O to the power of plus end exponent on top with text heat end text below Y stack stack ⟶ with C H subscript 3 end subscript C H subscript 2 end subscript O H on top with text end text H to the power of plus end exponent text end text below](data:image/png;base64,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)
What is compound Z? ![C H subscript 3 end subscript C H subscript 2 end subscript C H subscript 2 end subscript B r stack ⟶ with N a C N on top X stack stack ⟶ with H subscript 3 end subscript O to the power of plus end exponent on top with text heat end text below Y stack stack ⟶ with C H subscript 3 end subscript C H subscript 2 end subscript O H on top with text end text H to the power of plus end exponent text end text below](data:image/png;base64,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)
Chemistry-General
Chemistry-
What is the final product(B)of this sequence? ![](data:image/png;base64,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)
What is the final product(B)of this sequence? ![](data:image/png;base64,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)
Chemistry-General
Chemistry-
Chemistry-General
Chemistry-
Chemistry-General
Chemistry-
Which is the major product of the following reaction? ![](data:image/png;base64,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)
Which is the major product of the following reaction? ![](data:image/png;base64,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)
Chemistry-General
Chemistry-
Which is the major product of the following reaction? ![](data:image/png;base64,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)
Which is the major product of the following reaction? ![](data:image/png;base64,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)
Chemistry-General
Chemistry-
Allbutoneofthefollowingcompoundsreactwithanilinetogiveacetanilide.Whichonedoesnot?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAO0AAABfCAYAAAAET0DxAAAgAElEQVR4nO1deVhUR7b/9Qbd7Mhi2ARBgrsmqAi45qkQn2JUjBAVTdQY34xRR2M0Zpn3ki+TxLjFJC6DGyMCSkQNShTRgAtqdIyJGgQVFxYVRBC66aa7b70/2ipvN82mLJK5v+/rr7vvrVvbqVN16pxT54oIIQQCBAhoNxC3dQUECBDQNAhMK0BAO4PAtAIEtDMITCtAQDuDwLQCBLQzCEwrQEA7g8C0AgS0MwhMK0BAO4PAtAIEtDMITCtAQDuDwLQCBLQzCEwrQEA7g7Q5M+M4DgAgEolQU1MDCwsLo/sikag5ixMgoFVACDEau/WdsWmNMd7sK61IJALHcbh//z7KyspYA4XDRALaI/jjV6/XMwamzNkWC1GzrrS0QYQQKBQKWFhYCKurgHYPyrgikQg6nQ4ajQYcx8HCwgKWlpYAAL1eD5FIBIlE0uL1ETXneVqO49hKK5FIQAgxWmHFYmELLaB9gY5hsVgMtVqN3377DZmZmSgvL0eXLl3Qu3dv9OrVCzKZjI37lkazMi1gPCvp9XrGqK3VIAHtH6Z7yLYEx3GMcXft2oVVq1bB1dUVnp6eKCoqQnl5ORYsWIBXX30VVlZWrVLvZhWPTSGRSKDX6yGRSJ4bIghoHzBdS9py/EgkEqSnp2PlypUYO3YsFi1aBFtbWxBC8PXXX2PevHnYv38/+vXr1yr1aRFFFL+D6UorMK2ApoDjOKhUKmaRaAvQFZ/jOOzevRsqlQoTJkxgDCsSiTBhwgRYWFggNTW11ZStLbrJfJ7EHAHtB4QQcByHqqoqpidpK4hEIlRXV6OwsBBOTk6wtrYGYFA86fV6eHl5wdfXF2fOnIFer2+VOrUo0/I7W2De9oX6Vo2WXlGoFrZDhw5ModmWoIooR0dHyGQyo2sWFhZwcnJqValAUOcKaBT49srGTsBUgcNnOnP/TSESiSAWiyGTySAWi9tswqfmSxsbG3h4eKCgoAAVFRXsHsdxUCqVuH37Nl588UVIpS2qImIQmFZAo0BFVv7/hj4UdPDzPeZoHuYY0lwebQF+nceMGYOqqiocPnwYarUaUqkUEokEhw8fRn5+PiIiIlrNpNmgyYdvwuE7T9Br5tLz05q7Z5q32YoJ4nSbwpTpWrqs55XedE+t0WgQGxuLH3/8EV27dkVwcDAuX76Ms2fPom/fvli6dCkcHBxapR1NYlo667TEjMInHLXvPq+E/E8Af6UjhODUqVMoKysDYBjICoWC3aNjgz9WxGIx9Ho9dDodADBxV6fTQa/XQy6X46WXXoKTk9Nzbb+nY57jOKjVapw+fRonT55EVVUVampq8MorryA0NBROTk4AWmexaVAIp8SQSCQQi8Worq5mFdZqtaipqUFNTQ0IIbC0tIRMJoNWq0VlZSU7NEDT07x0Oh10Oh0IIZBKpQgICICfn5/RKi6gbcH3sU1LS8MHH3yA8vJyqFQqtnfjMyqAWlIUfZ7PzJTB5XI5YmJisHjxYtja2rZu45oAsVjM2mJjY4Pg4GDY2NjA2dkZhBAolUo4ODhAr9e32p62wZWWz7RlZWVYsWIFUlJSIBaLwXEcc6IWi8VG3k9UJQ4AarXaiKD8ZziOw+DBg/Hpp5+iR48e4DiOeU8JK23bga60Op0O0dHRuHjxIqZNmwZHR0dUV1dDKpWySbquIURpqdPpwHEctFotrKysoFarsWfPHlRUVGDPnj3o2rVrK7eucTDn4HHixAmsXLkS33//PS5duoS4uDhs2LABCoWC8UlLo96pgXY6ZcbMzEwkJydDKpXC29ubNYQyl1gsZpWmz8nlctjY2IAQAnt7e8hkMkZsjuPw66+/IisrC2lpaejRo0etUxQCWhf8bYpYLMa+ffuQnZ2N999/H9OnT8c///lPaLVazJ8/n42LxuxJ7927h88++wy9e/fGrFmzMHToUEybNg3Jycn429/+Bisrq3p1JW0Bc/V48OABcnJyoFKpUF5ejrKyMmi1Wsjl8lZTRDW4ntMV8dq1a/jnP/8JW1tbrFmzBt27d0dlZSXs7OwglUpZOnOg+1PKyPfv30dhYSH69u2LK1eu4O7duzhw4ADCw8PRs2dPtro/L8T7TwBdWfnirFqtxqZNm+Du7o7XXnsNZWVl2L59OyZPngxLS8sm0cfFxQVqtRpxcXEICQnBgAEDEBYWhu3bt2PcuHHo3r17kyaBtoJcLmfjmJ7y4W8D2vw8rVgsZnJ6eno6srOzMWXKFAwePBjffPMNli9fjoqKCtjb28PW1hZ2dnZmP9bW1rCysoKVlRV0Oh127dqF6Oho/PTTTxgwYABmzJiBvLw8HD58GMDzM9P+J4J/ZjQ5ORmXL1/GrFmz0KFDB3z55ZdwdnbGtGnTmkQjuoedMWMGqqqqkJSUhMrKSsyZMwcWFhbYuXMn1Gr1c7fSmoOVlZXR9k6r1TKmba1618u0lHi3bt1CWloaevXqhYkTJ+LMmTPYu3cvunfvzrRmND3/t6m9TavVwt7eHsOHD4dWq0VcXBxUKhXGjBmDgQMH4sCBA/jjjz8E8biNQD2RxGIxysrKsGHDBnh7eyM8PBw3b95Eeno63nvvPXh5edXa79Vlo6X5AkBISAiCgoKwa9cunDp1Cl27dsXUqVORkJCA3377jdlF29LfuCGYmkDpb/53S6MW0/I7XSQSQavVYu/evTh79iymTp2KTp06YePGjfDx8UF0dDTs7e3ZzMMHf/ah4rFUKoVOp0PPnj2xfPlyHD9+HBs3boSHhwcmTpyIa9euITY2FuXl5awu/G8BLQu+72xiYiKuX7+ORYsWwdHREV999RX8/f0RFBRk9lk+vc3Z5zmOg6WlJWbPng0bGxvs3LkTpaWlmDVrFhwcHLBhwwaoVCrodLpmtiIQANwzfIxBtcm0Xea2FS0Nsystv/Dff/8dO3bsQFhYGGbPno09e/bg7NmzmDhxIvz8/JiY0BhtL2VgKysrhIeHo2/fvti9ezdyc3Mxfvx4hIWFITk5GefOnTNbFwHNC9NVke4pb926he3bt8PLywsDBgxAeno6Tp06hWXLlsHW1rbJTvzUssBxHIKDgzFu3Dj8/PPPOHnyJJycnDBnzhxkZWXhl19+MVJkPo/gT2zUjdHU9NXSMMu0lCBKpRJ79+5FUVERxo8fj7KyMsTHx2PAgAEYMWIES9tYcZbP2D4+PoiJiUFBQQFSUlIgl8sRHh4GrVaLPXv2oLS0lM1eAuO2DGj/8iUlkUiElJQUFBUVYeHChVAoFIiLi0NoaCj69OnDGLCpNKGMTgjB7Nmz4evri40bN+LOnTuYOXMmAgMDsW7dOlRUVDzXARNkMhmrm6WlJSorK5kDSZuttPxZ9MKFC9i3bx/Gjx+PiIgIbNmyBSUlJZg1axY8PDyaXEl+eplMhldeeQX9+/fH5s2bcfToUYwdG4GIiHFITExEdnY2ADqBCPvblgJ1dKEa0UuXLiEhIQE9e/bEkCFDsHv3bhQVFWHBggWws7NjK2ZTVlrTcdKpUyfMnj0bubm5OHjwIABg7ty5uHjxIlJTU9mk8Dxuj6ytrc2GVGpNjbcR0/I7qqSkBPHx8dBoNJg0aRKuXLmCtLQ0DB06FH379n0q8YW/IhNC4O3tjblz50IikSA+fidUKjVmzpyFTp18kJZ2CCUlDx7PzkBz043fVlNH+PYCU8Xf0zwvlUohk8mYlSAxMRElJSV4++23UVVVhR07diA6OpqZZJ42eJnpgH711Vfx0ksvYf369bh27RpCQkIQFhaG77//HkVFRax+TzPOjPtFZPQxDHnDx/Df9DpNS9MYS3p88Z0QAq1WW2ffm046dSnqmkpHI6ale05CCC5cuID9+/cjIiICAwcORGxsLGQyGaZNmwZra+tmOZxMCEFwcDAmTZqEH39MxZ49KejfPxAjR45EYmIisrKyHjMsB4NC4dnKMveh4McCooOF/83//TzhaQc28ITedC/7yy+/ICUlBaNGjcKgQYOwfv16SKVSTJo0CXK5nD3TVLqbKqkIIXB0dMScOXNQUlLCPOzmzJmD0tJSxMfHQ6/XP3V/8xcGQjgjWvMnakPfmTKUCMCT5+g92scSiQSWlpbgOA5SqRRarZYpz+gKbDpmjPMntcYZ/z7/f10wu9IWFRUhPj4eTk5OiIyMREZGBjIzMxEeHo6uXbs2WzQBjuNgbW2NsWPHwtvbC/v378X9+yWYOnUqOnbsiH/9618oKiqGRPJsniZ8M4LpIOeLNaYzIv8aP/3zAqoU4R/maCxMzSvV1dWIj4+HSCTC66+/zkw8MTEx6NixIyunucxxer0eISEhGDduHBISEnDx4kX4+/sjOjoaCQkJyMnJeapDI6bWD/6kxN+7868bS4AcCDG1fhgYWa/Xw9nZGW+88QacnZ3h5+eH119/HVZWVgCMg/XTsvn14reH1pNeMx1z9Y0zyd///ve/0z8ikSGu608//YQ1a9Zg7ty5CA8Px5dffgmJRIJly5bBzs6uVuWeFpRh3NzcoFKpsGdPChwcHBERMQYPHjxAQkICevfujS5dukAikT51WXyzkzlTlLmPWCyGTqdjxOW39XmxIdP9qEajabKHEgVt14kTJ7Bu3TpMmjQJ48aNw+rVqyESiTBv3jx06NCBpQWax2OJnhQKCAhAXFwcysvLMXLkSPTs2RNJSUlQKpUYOXKkkRttU/ImhOCPP/5Abm4uKioq4OrqyvyfL1y4gBs3buDhw4eorKxEXl4eCgoKUF5ejg4dOkCn0+HWrVvIzc1FcXExLCwsoFBYPV5l5fD09MK1a9egUqkwbNgwODo6sv6QSCRQqVS4e/cuKioqUFNTw043PXr0iB2yoUpZpVIJtVoNjUbDzKK0f+vqY8knn3zydz4hbt++jf/7v/+DnZ0dPvroI5w8eRIHDx7EvHnzmI2Of/LhWYjHFznc3Nxw/vy/cfr0WYSGhmLgwGBkZWUhJycHQ4cOQ4cODkarSVPKvXfvHjIyMnDq1ClIpVI4Ozsz18zExERkZGTg0aNHuHbtGg4cOICTJ0+CEAI3Nzc8evQIW7duxeHDh/H777/D1dUVDg4OdZZlboWuy8XtWQc/9VqKjY2FSqWCr68vc+BvTN50pn/48CHWrFmD4uJiLFmyBJcuXcK//vUvzJ8/n0UYbIlJixACJycnlJaW4ocffoCvry/69esHQgj27t2Lfv36wd3dvcl5UmRmZmLFihVIT0/H4MGD4ejoCJVKhfj4eMTGxkKhUEChUGDz5s1ITk5Ghw4d0LdvX2i1WqSnp2PFihXIzc1Dr1694eb2Aq5ezcWWLVtx5swv+OOPP3Dp0iVkZv4MmUyGzp07Q6lUIiUlBUlJSbh+/TquXbuGgwcP4saNG3B0dMT27duRlJQElUoFf39/WFhY4ODBg0wR6+3tDRcXF6MFxRzEwJPo6FqtFhkZGTh37hxiYmKgUCgQHx+PHj16ICIiwvjBZjjvyhdRfHx8EBUVjeLiYvz4Yyo8Pd0xdepUXLhwAUeOHGEzkVarbXI5UqkU58+fx4cffoh169bh/v37AAx+pGfOnMG2bdugVCohkUjw3XffITY2FhKJhH0qKirw1Vdf4dixY0wUqg9UbOXvbYDmF63FYjEUCgX+/e9/4/3338fnn3+Ou3fvGukm6lJ+8HHs2DFkZWXhtddeg4ODAzZt2oTAwEAMHTqUTQLNKV2YDsq3334bHTt2xPr161FRUYHXX38d3t7eWLt2bZ1iv2mbTNsnEokQEhKCqqoqZGZmYv369SDE8OaLwYMHo7q6GgMGDEDv3r3h7u6OoqIi9OzZEzKZDHK5HAEBAaipqYGlpRweHh549KgKa9asRXJyMvz8OiM6OgpTpkSjpOQ+jhw5Ar1ej5SUFKxYsQIKhQJBQUFsAoqNjYVWq8Xdu3eRkpICvV4PGxsbSCQSODs7Iz09Hb/++iukUmktqc4s9Ho9qampIXq9nly9epWEhISQYcOGkdu3b5MVK1aQAQMGkOzsbEIIIXq9nrQEOI4jhBBy/34piY6eQgICupMzZ86SR48qyejR/00CAweQnJyrhOM4VleO4+r9mGLv3r3E39+fWFtbke+++5ao1WpCCCHbtm0jb731Frl79y4hhJDg4GAydepUotVqWTk5OTmkc+fOZPny5Y1qj1arJTqdjtXDtD46nY5UV1eTqqoqolKpiEqlIkqlkn2qqqrYp67rKpWKVFVVkYcPH5LMzEzyl7/8hbi5uZHIyEiyefNmUllZyfqCtsN8n98nU6ZMIf379yfnz58n33zzDQkODibp6emsD/htaQ6Yo9WmTZuIq6sr+frrr0lNTQ1JTk4mfn5+5PDhw03OX6/XE71eT9RqNYmIiCCffPIJ6dq1Kzl06BAhhJCioiIybtw4UlhYSHQ6Hdm4cSMJDg5mY4AQQ79ERUWRjz/+hHAcITt3JpL+/QeS2NgtbOwQQsjZs2dJWloayc3NJf369SPz588nSqWS3c/NzSUrV64kSqWSfPvtt2To0KEkNzeX9YNOpyPh4eFk3rx5pLy8nNW/vv6WUqUSPYFx9epVrFq1CuXl5di1axdGjRqFgQMHtqiHChUfXVycMH16DE6fzkZSUhK++OIfmDEjBnPn/gUHDx6Et/c77N0pjZn5CW+FkEplGDZsGHJzryE+PgGBgf0QFBQEGxsbeHp6sqOCcrkcLi4uRlIA/+AEzde07qZlSiQS5OfnIzY2Fjdv3mRHz7RaLdRqNbRarZFCj5hZOYjJCkfLojZCuufmOA6VlZUoLy9HSkoKTpw4wc592tvb1+EMYcj38OF0nDqVjbffng1ra2vs3buX0VwikbA6NvdKywchBOPHj0dqaio2b96M114bj6FDh2H48FewceNG9OnzEuzsbJmCCHiyNROJAMPQpO0TQSqVQCwWQafTQyQSY9KkSSgrK8MXX3yBkJAQcBwHmUyGmpoaAAaJqKSkBBkZGXjhhRcgkUhQUFCA/Pyb6NatOwCCY8cyYGOjwLBhQ2BpaYmaGi0kEjFeeuklcByH1NRU3Lx5EytXrmSHCkQiEby8vPD2229DoVAwCayqqgpKpZIFj+C/iYP2R336AynVPF65cgXx8fGIiIjAyJEjsWLFCojFYkybNo01rDW8VIYNG4rXX5+EpKQkjBw5Aq++OhrBwQOxdesWDBs2FAEBAQ3WhR68FolEsLCwgFwuh1qthoeHF6Kjp+DLL7/Ajh070L17d4hEIsawhBBUV1cjNTUVWq2WhUi5e/eu0RsAgdrhYYkZEbiqqgrHjh1Dfn4+OnbsCEII5HI5K5O+gYHmQRUR9TEJnRAkEgkcHBxgZ2cHCwsLFBcXMwZ2dHREQEAAU07VZlhAJALu3CnEDz+kwN//RYwZMxbJycmwsbHB2LFj2Rnop/F+airI473tO++8gxkzZmDlylVYvXoVoqOjMXXqVIwfP54xAgCechCgkw+dzAgheOGFF/Dhhx+iUycvZjp69913MW/ePKxevRozZ85k0VXohFxaWoqjR4/CxcUFMpkM5eXlKC4uglQqgVarRVlZGRwdHdmiIZE8Ee/FYjHKy8tBCGEKL8pXdPzRieLq1atYuXIlvL29WWznS5cuoVevXkY6HtP+4Y8HKWA4N7lu3Tro9XrMmTMHubm5yMjIwJIlSxAQEFBLXd1SoE7l77zzDjIzM7F27Vr06dMHixcvxvTp0xETE8NOFdEjUbRR/D0cHfQajQbDhg3D//7v/zINXpcufli4cAE+/PBD7N27l4XHoYNbq9XCw8MD48aNYyE8r169ipMnT7LZsKKiAgcOHMDvv/+OESNG4JVXXmH1AJ748Pr6+uL777+HRqNhIVXovoV+mzI7XdHpf9M+N9V8y2Qy5Ofn49NPP4VYLEZMTAz++te/4sUXX4RCoaiXZpaWlrCyUqCqqhJKpRI3buRj9OjR6NWrl1HZLU132vehoaGIiIhAQUEBqqqU4DgCS0sFQkND4eHhDo2mBlqtDtXV1XiyslJmNfyrrq5+PNkaoiWq1dWoqalBt27dMGfOHLz33ntwd3eHSCQy8jfo1KkT3nzzTXTu3BmEEDx48ACFhYVsIlAoFMjPz4darTaqM6U1pe+tW7fg7+9fa2GhlhkPDw+88cYbePHFF9lbFH755RdoNBqWNiMjAwcOHMDLL7/M3mDAl/SkAHD16lWkpqaiT58+8PX1xYcffghPT0+MHTvWqHPNLdXNCWo39PHxwWuvvYa4uDjcvHmTBf9SqVRwcHBggaNNRUs6mPV6PVQqFRQKBdzc3GBhYQG9Xg+ZzND4UaNG4dixY0hKSoKrqys8PDyM/ElfeuklDBo0iK2G9vb2kEqlsLCwgFqtxsaNG/Hzzz+jY8eO+Pzzz1FeXo7IyEgju6der4dCoUDfvn1brL8AICUlBd9++y3u3LmDTz/9FJGRkejYsSMzHdQHV1dnDB48CF99tQInT57Cu+/Og5ubW4son+oDpZ9CocAnn3zyePtQg127dqFnzx744IOlUCjoSkvt7Py6kcei85PI/9bW1kzspAwxfPhwhIWF4dNPP4W7uzvkcjkIIdBoNJDJZPDw8GDaaisrK8jlcmg0GlhYWGDYsGHIzs7GxYsX4evry/omLy8PpaWl6NWrF9zc3HD06FGEhYWxdt27dw85OTkYNGgQRCIRbG1t4efnhy5durDaOzs7Q6vVQiqVIjU1FXFxcQgODkZCQgLzAedDSl9tMHDgQFy9ehWXL19GSEgIOnbsCDs7OwDPbo9tDEw1irNnz0Z4eDi8vb2xaNEiEEKwfv16vPzyyyCEGL371twekxrS5XI5b/9H2yDC/PnzMXfuXCQnJ2PmzJmsbJ1OVyuyPbXZOjk5QalUorCwEEFBQVi4cCE++OADpKWlYdSoUbC1tWXlm77q03QVbi7cvXsXLi4uWL58OQYMGGD02or6yqJMOX78eBw/fgKJiQkIDQ2Gq6trg882N/givLu7OzQaDX766RBOnz6N9eu/h4ODw+P7Mpa+LvD1BI8ePYJarWYncWxsbLBw4UIcP34c5eXlLJaZSqWCWq1mgcgBw4qt0WhQWVkJlUqFqKgoHD9+HN9++y28vLzQt29fiMViJCYm4s6dO1i9ejWmTJmCbdu2ITw8HIMHD4ZUKsXvv/+Ozz77DFu2bIFUKmWBEYEnY0Kn07H9rVwux5tvvolBgwbBy8sL27Ztw9y5c9mbDQBAKpVK4eDggHnz5mHGjBk4evQoPvroI5ZpWzgSEEJgZ2eHPn36IDMzExkZGYiMjMTAgQONJpKG8qDii06nwx9//IFff72I0aNHo2NHV7i5uSEyMhInTpxgq+yVK1fw4MEDXLx4Effu3YO7uzvKyspw5swZqNVq5OXlgeM4fPzxxwAMJiNHR0eUl5fXcvMzVSSZm2DM9W9T+lun02Hy5MmYPHkyc+bnM1x9eYlEIuj1HFxdXRAREYH331+Cffv2ISAgoF47dEuAH8yPEIKKigps2LARnTp1qvP8bl3g9/369euhUqnw3XffwdPTE35+fvDy8sL777+P3bt3QyQS4erVq/jpp59QUVGBnTt3wsfHBzKZDDt37sSFCxdQUFCAn3/+GaNHj8ZHH32Er776CosWLYKPjw8UCgXOnDmDYcOGQSqVYvr06SguLsbixYvh5+cHd3d3XLx4EQqFAgUFBcjOzkZhYSEOHDgALy8vuLq6Yv/+/SguLsbt27dx7tw5DB48GHq9HiUlJUhPT0enTp3YPpq1UafTEbFYjEePHmHZsmU4evQotm/fjqCgoDZjWgqO4zB58mT89ttviI+PR2BgoJE2k183c3Wl13JyrmLdum9x9OhRzJo1C3PnzoGVlRUqKiqwY8cOvPjiixg0aBB27dqFK1euQCqVIiIiAoGBgSgqKsIPP/zAlFrDhw9n0QMTExOxZ88eLFiwAKGhobXq0JAW8FlBlS+mq2LjNOsAxxFIJCJUVirxt78txE8/pWH9+vUYPXp0q0hXT+ryxJas0WiwYcNGrF37DTZt2oSwsJFNyot/BJDvaWRtbc10CFTb7uDggJqaGpSWlkKn07FJWCqVoqSkBFVVVbC0tIS9vT1TzKnVahQXF7NADQ4ODnB3d4dCoWAeatS7iorlnTp1gr29PW7duoVHjx5BIpGgW7ducHBwwLVr11BWVoaKigr4+/vDw8MDarUaa9aswaZNm/DWW29h+fLlxoyr1WqZPe7cuXOkU6dOZNq0aUa2qLZCQkIC8fT0JF988QVRKpXM/tZUe7FeryfV1Wry4EEZqah4xOxgOp3O6FNdXU1of1DbJL3Ht1dqNBqSlZVFZs6cSbZu3cruNWRfa27w7Zym9umG6kHbRtMdPXqMdO3ajfzP//wPuX//fstVuo66GGhUTQoKCsiAAQPJlCnTiEZTQ/T6pvWnqQ2Y0o9vs66pqWE2f0o3Pt11Oh37TdPw+YTSW61WG+XB/9ZoNOw3/1NTU8Pypve1Wi2rT3V1NVEqlaSmpoYcP36c9OjRg1y6dMmojWL+PjIgIACTJk3CkSNHsGfPnlqzIGlB1b9pGbdv30ZsbCwcHR0xduxYWFlZNc5bxAyoKcXOzhZWVgqj/SUVKQGwMJh8J25qYqF7bp1Oh4MHD+KTTz5BYGAg+vXrh5SUFOTn57fqPpC2iy9+12XeqScHlj4kJBgjR47ADz/8wNw4gdY5IGEQ1Q0vH9+9ezcePSrHggXvQiaT4llPd/HD+tKyqCZWJpOxfqNmNEp7/jcA9u4eOiZoNEaqrDSlg1QqZVKQkblGauxDT9MaFKUGsXzfvn2oqKiAo6Mjkz6M2sQnio2NDSIjIyGRSLB161aUlZWZ3Z+1FPja16SkJJw/fx7Tp09H586dATz9ADI8Z3zyg4ISzBzD0fL4ByRycnKwbt063Lp1C4cOHcKCBQuQkpKCysrKZ6pjc6GxZhpDPzxJY2OihesAAA1NSURBVGlpiTfeeAOurq44dOgQSkpK2L2Wfu8qeay4u379OmJjYzFmzBi8/PLL7C0UTYG5rZO58ky/Tcvhm9b4SkXTsEqEp/TkO+OYC8HEXwj4egf+s9XV1di9ezdiY2Px+eef45VXXoG/v79xA0xd7R4+fEg++OAD4uLiQuLj4wkhBrc86j7YUuA4jmi1WkKIwfVr4MCB5L/+679Ifn5+s5ZhTmysy92QD9r2hw8fkvPnz5OTJ0+S7OxskpWVRS5dukQqKyuZyNNeYE68XrhwIXFzcyM7duwg1dXVT7UdaSqoy+HSpUtJz549yZ07d2qJtm2Bxm43GjN+GlMWx3Gkurqa5ObmkhMnTpBz584RpVJJdDqdUVqYI9yFCxdI9+7dyZgxY0hJSQkhhLQ48SiRCCHk448/Jg4ODiQ2NpbtDZqrjLqYtiGi0Pab8+Gl99tygD0raB9fvHiRBAYGkhEjRpBr166xybQl26XX60lmZiYJCAggK1asYGWa+nA3FQ3RtDGMWF8+TdEhmCub/wx/b2uatqamxuia2FSU4DgO3bp1wzvvvIOzZ89i586d7HpLi8cSiQQXL17E/v37MWrUKIwePRoWFhbNJnLWJTY1Zp/M3zNScci0Xq3hNdYQzNWrsdDr9ejduzeioqLw66+/Yt++fY16wzktk/9pSl3VajVWr14NX19fxMTEADDs/finXp4GDZm8GrrfUD6NSVNf2fxn+GI43SbSfjR9sVetcDOAYX8THh6Ozp07IykpCbdv326Uh83TgOYpEolQXV2N7du348GDB5g6dSrc3Nyeu1CadA/M/0+/25phTQ8gPG0ekZGR6NWrFzZv3ozbt2/XchQxBX8QNqYf6IAkj/d3mZmZuHz5MubMmQNnZ+daef8noTF9WEv7IhIZHJ2pL2Z+fj527dplSNyM2lE6o/Ard/LkSaSmpmL06NEIDQ01qlNbwtyArOt3W6KiooKdN34apqW09/HxwcyZM1FWVoa9e/dCqVQa5dnUldVcGvJY+VJYWIh//OMfGDx4MIYPH97iVornFeYmvroYuM64x5aWlggLC0OvXr2wa9cuXLp0id1vTKfWl4a/utLflZWVSEpKgkgkQnR0NDp06FBL0/a84HkdVKYTydOA9jV1LtmyZQuuX79eS+PZlJXVnChITW07duxAbm4uJkyYABsbm+eS3q0N/uRoDrXemsfvXE9PT0ybNg3Lly9/7Lzds1aautDY/QLF0aNHcejQIUycOJE52T8Pq5c5PK/1oj66T1M//gRKCIGtrS3++te/4q233kJCQgICAgJQWlqKw4cPsxNTNC3HcdBqNY99eQ2RDA150sDmT0wdosfH6cLCRkGprEJcXBymTJmCoKAgo7clPq993BpoaOI1y7RURKEnYg4ePIiUlBSMGzcOgYGBRulpWmoc53d4SUkJlEqlWR9cet6V7lvT0tJgb2+PCRMmwN7evs1dKNsrnoVpTX8PHz6cuXfOmDEDhYWF2LJlCzsHTAhhh/n1et1jBjZ8CCEQS8QQicQAATslJRZLIBYDnp7uOHLkCJRKJaZPnw5nZ2fhFaeNhNn301LG5TgOLi4uiIyMRFZWFnbs2AEXFxckJibi9OnTTDlFDxrztVxisRilpaWoqqoyCmFJn1Gr1bCyssK0adPg5OSEtLQ0TJ8+Hf37939uxc/2gGcRLU2tCBYWFliwYAFiYmKwYcMGLFmyBOvWrWMRBgGwFdfgvPLk/bKG/MSgpJRKJY89nACxWISSkhIcOXIEU6dOha+vLytfYNiGUe9LpamyYMiQIRg6dCgyMjIQHh4OsVgMtVoNS0tLSCQS5uKlUCjYgV2RSMRCb1JtK9/LRKvVwtbWFpaWlkhMTMQLL7yACRMmQC6Xt/rRsP9U8HULphCJDK6FQUFBmDhxInbs2AFnZ2f4+vqyMDd8ZaJhxX3iISQCQIhBsUUAiMVPpDKJRIwzZ07D2toaEydOZM74AsM2DvUyrUhkOF/q7OyMKVOmYPHixUhNTcXixYvx5ptvAjCOqEjDnfBFZsB89H56fjElJQWnT5/GvHnz0KdPn1axBwt4grr6mk7YYrEYs2bNwuXLlxEXF8dC81BQ+6Lh8LkhpIpMZgG9noNez9HMoOd0jxnTcEmprMLMmTPZYXCB5o1HnUxLO5EyXEhICEaMGIHk5GTk5OQw7S4fdI+j0WhYYCsaSYDugUwPKd+6dQtBQUGIiIgwcmAQiNg64NtL63IW8PPzw8aNG1FWVmbkvE6Zmk7WAIGFhSVkMsvHDgJ6ZkYy+BHTiV0PkQhwdXVlzjMCvRsPEalnA0mZjM66v/32G5KSklBaWmp0IoJmwT8NQ3/T4GN8cVcikTyekWVQKBTo1q0bevTo8aRSwt6mxcDXENMJ1JzXkemwaAl60AlD2Ao1DQ0yralNVa1WNxhWk16nGmVz70yh+fNna3pNYNiWAZ/UpkwLmA9tas7Diq6exs+YY/KGjwoKtG466mVaoHb8XT4Rm9rhpoOA/jcdPAJaDrTPc3NzkZubi379+sHZ2RkiUcOvsOSv0uYmYL7UZcrs9e2dBcZtGhpkWgECBDxfEJY2AQLaGQSmFSCgnUFgWgEC2hkEphUgoJ1BYFoBAtoZBKYVIKCdQWBaAQLaGQSmFfDMWLx4CaKjp7R1NYzg4+OLvLw8AEBWVhYGDRrC7pn+52Px4iVYvHhJvXnfuHGj+Sr6FGg2pn0Wwj1tBzcGbd3B/wk4ffo0srOzGQ2fFQ0xTWNw8+YN+Pv7Iy8vDzExM4zuDRkyBCdOZNV6JjExCcnJyQ3mPWrUqGeu37Og2Zj2WQj3NB3cWLR1B//ZkZiYhM8//wyenp5ITT3QLPkVFhY2Q80M8Pf3R1zctkaljYqajMjIyAbTXb9+/Vmr9UxoFqZtLsI1pYMbi7bu4D87zp07jyFDhmDixAk4e/YXs2l8fHzZh49Bg4YYXU9MTMLSpcuQnZ3NpK+srCyzzycmJiE6egoSE5Pg4+NrJI3l5eXVKosP+iwFvwxzaem91avXADAcVWxTkGbAokXvEUIIWbVqNYmKeqPW/VWrVpNFi94jq1atJt7enY3S5ObmEm/vzux/ZmYmCQ0dzP4nJCQapQ8NHczSeHt3JgkJiUbPent3Jt7enVmd/Pz8mqOJAurAqlWrCSFP6Jibm2t0n9KLEEKiot5g6aOi3mC0448bU3rz09Hf5ujML5veo+CPKfosLcN0/PHzNB2L3t6dSWZmJrl+/frTd1gzoFlWWg8Pwyvvx4z571oicmJiEtau/YbtFdLTDyE7O5vdHzkyrM58s7KysHTpMvY/OnoKCgoKEBMzA1u3bsb8+e/i3LnzAMBE65s3b+DmzRs4ffo0EhOTcPjw4eZoogAzoLT18fFldORLWnQcDBliWAUTEuKxcOECAEB2djaWLl0GHx9frF37De7cuWO2jISEeERFTYaPjy8bN0OGDMEXX/wDwcHB+Prrr1ja4uJiAIYxVhfosxSpqQeMRGL+7/Pn/42CggKjVbioqJjFtGorPDPTNkS4qKjJmD//XURGRjKCAU8I2pQOTkiIh6enJ+LitrE3idH9z/nz/wbwRBQrKChAcXHbd/CfGcXFxWySvHnzBubPfxc//LDHKE1BQUGdz6enH2LP1qW3WLx4CXx8fHHz5g0EBwc3a/0bg8jISKM2RkVNbvU6mOKZmbYxhGstBAcHG9WFP0kIaF5kZWXBzc3N6NqYMf+NgoICZGUZGNDf3x+enp5sLwiA/Q4ODsbHH/+dXa9LY5ycnFzvxP6scHNzQ3JyMltETp8+jeTkZCQmJiEw8GUkJyez9mRlZSExManF6tJYPBPTNoZwrYXAwJeRnZ3NOjUvL89osAhoPqxevQYxMTOwdOkyIzpTJoyJmcGYcOvWzUwS8/HxRWDgywAMUtOdO3fY9X79DPG03d3dmCIqKysLkZGRGDkyDD4+vrhz5w6WLl2G7777jimsFi9ewpRQMTEzkJeXxyS+QYOGsG1TQUEBoqOnsC0XfZZqjGkZXl5eiIyMRFTUZCbpxcTMgI+PLz744MPnYqV96kPwq1evwdq13wAA4uK2sX1LdPQUtveIjIxEv36BbF86f/677BnAYOqhewVPT09s3bqZdXhwcDDmzp3DTECRkZEoLCxkefPzioyMxNdff4WsrCwjk9HNm4KNVsCfD0LkCgF/CuTk5OD+/fuwtrZG9+7dcf/+fQCAXC6HRCLB3bt3YWFhAVtbW2g0GhQXF8PW1hadO3eGTCZDfn4+Cxd87949lJWVoX///rCyssK9e/dw5swZ1NTUoEuXLvDy8jJ6BYvpqyhbGgLTCvhTgDwO3yuVSsFxnNFLvggv4qPpWxRobDIaqI7+pt/82GiUVeirUGQyWZu8k1hgWgF/ChBekEDA+CXgxCSgYF3BCU0D05kyLX2Gn2dbhPsVmFbAnwKEFykSaDg0qzmG5d8jJhEniZlok40tq7khMK0AAU2EKcu0NtO27g5agIA/Ado6TrNwnlaAgHYGgWkFCGhnEJhWgIB2hv8HWfjl3TAGtaYAAAAASUVORK5CYII=)
Allbutoneofthefollowingcompoundsreactwithanilinetogiveacetanilide.Whichonedoesnot?
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)
Chemistry-General
Chemistry-
Choosethebestsequenceofreactionsfortransformationgiven.Semicolonsindicateseparatereactionstepstobeusedintheordershown.
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)
Choosethebestsequenceofreactionsfortransformationgiven.Semicolonsindicateseparatereactionstepstobeusedintheordershown.
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)
Chemistry-General
Physics-
PQRS is a square loop made of uniform conducting wire the current enters the loop at P and leaves at S. Then the magnetic field will be
![](data:image/png;base64,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)
PQRS is a square loop made of uniform conducting wire the current enters the loop at P and leaves at S. Then the magnetic field will be
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOQAAACuCAYAAAAmlKGHAAAW40lEQVR4nO3dW2zT9/nH8bdPcRzHzslJg3MiENpA0tw0FaiZViVo+4dWAjbEyjqNttLG6FQCu4AhrajdpG0CdjOExMrFGJ2mdqoQAk1D2gbEtOHM6EKCIQQHkwMhJ3yIYzs+/S9QfiOjUGgJ/jl+XldNGuCxnI+/j7+/7++xJpFIJBBCqII22QUIIf5LAimEikgghVARCaQQKiKBFEJFJJBCqIgEUggVkUAKoSL6ZBcwk/bs2ZPsEsQMe/vtt5NdwhMlK6QQKjKrV0iA0tLSZJcgZkBfX1+yS5gRskLOMpcuXeLo0aPJLkN8RbN+hZxSU1OT7BKeipqaGvbt28fPf/5z3nrrLVatWpXskp6ozs7OZJcwo9ImkFMsFkuyS5hxLS0thMNhtmzZwocffsi6detYs2ZNssv62vx+f7JLmHHSss5SmzdvZt26dXR0dNDS0kJTUxNHjhxJdlniS6TdCjklVV9td+3axb59+6Z9z2q13vdz/9sJdHR08MYbb7B48WL+8Ic/fOGfUat06GqmpG0gU1VLSwtvvvnmtO/5fL77fs7v93P58mW2bNmifG/x4sVs27YtpcKYbtI6kLN5g+DSpUv85je/AaC2tpYf//jHVFZWEo/HU+Zxp8tG3L3SOpBTZts1ra6uLv785z9jt9tZvXq1ci02lR5nul4/lkDOMn19fbS3t/OTn/wkbX+pU5kE8h6pfi7S4/EAkJubm+RKvrp0P38sgZxFUjmI4i65DimEikgghVARCaQQKiKBFEJFJJBCqIgEUggVkUAKoSISSCFURAIphIpIIIVQEQmkECoigRRCRSSQQqiIBFIIFZFACqEiEkghVEQCKYSKSCCFUBEJpBAqIoEUQkUkkEKoiARSCBWRQAqhIhJIIVREAimEikgghVARCaQQKiKBFEJFJJBCqIgEUggVkUAKoSISSCFURAIphIpIIIVQEQmkECqSdoHs7e1NdgniK/j444/p6+tLdhkzLq0C6fP5eOONNySUKeivf/0r/f39yS5jxqVVIP/0pz/R0dHBBx98kOxShPhCaRNIn8/HgQMHgLuvtunQ/ojUkzaB/Oc//6mE0Ov1smvXriRXJB6H1+vFarUmu4wZlxaBDAQC7Nu3b9r3Dhw4wNDQUJIqEuKLpUUgL126hNPpZOPGjZSVlSmr40cffZTkyoSYLi0C+dFHH7Fx40ZaWloAaGho4G9/+xtHjx6VVVKoyqwP5OnTp3n++eeVME5ZuHAhv//972WVVKmjR49O+9rr9WKxWJSv+/r6GB0dfdplzbhZH0iAH/3oR8p/5+Tk4PV6AaisrGT58uUEg8FklSYewGw2P3Djraenh2PHjlFQUPCUq5p5sz6QS5Yseej/r6ysxGQyPaVqxKNasmQJBw4cuG8zrqenh1//+tc0NTUlqbKZpU92AUI8SEtLC1u2bCEzMxOAM2fO8Mtf/pIlS5ZQWlqa5OpmxqxfIUXqWrVqFaWlpbz77rv4fD62bNkCwPe///0kVzZzJJBC1aY246be9y9dupSioqJkljSj0i6Q927qCPVbtWoVZWVlAFitVpYvX57kimZW2gVSpJ7NmzcD8NZbb83q1REkkCIFLFu2jNraWt58881klzLj0m6X9bXXXqO8vDzZZYjHkJOTw8GDB9FqZ//6kXaBXLNmDQB+vz/JlYjHkZOTkxbP2ex/yREihUgghVARCaQQKiKBFEJFJJBCqIgEUggVkUAKoSISSCFURAIphIpIIIVQEQmkECoigRRCRSSQQqiIBFIIFZFACqEiEkghVEQCKYSKSCCFUBEJpBAqIoEUQkUkkEKoiARSCBWRQAqhIhJIIVREAimEikgghVARCaQQKiKBFEJFJJBCqIgEUggVkUAKoSISSCFURAIphIpIIIVQEQmkECoigRRCRSSQQqiIBFIIFZFACqEiEkghVEQCKYSK6JNdgJrs2bMn2SWINCcrpBAqIiskUFpamuwShABm6Qo5NjbGwYMHk12GmEG5ubkAfPLJJ4yMjCS5midHk0gkEsku4km6evUqJ06cACAvLw+j0UhRURGFhYUAWCwWAPx+f9JqFI/n3udsaGgInU7H4OAgkUiEkZERYrEYjY2NVFdXJ7nSr29WBbKtrY329nZMJhOFhYVotVrsdrvyhGq1WsxmMyCBTCVTz18gEGBychK9Xs/ExAR9fX1EIhFGR0cJBoPU1dXR0NCQ5Gq/nlkRSI/Hg8PhYGBggKKiIjIyMsjOzmbOnDlkZGQQDAYpKChAo9Gg1c7KLj1tRKNR7ty5Q2ZmJtFolL6+PgKBANFolMHBQWw2G83NzUqIU03KB7K7uxuHw0EsFqO0tJRYLIbdbicvLw9ACaNOp2NycpLJyUlS/CGnrYyMDIxGIwD9/f1YrVYA7ty5w8DAAFqtlv7+/pRuYVM6kKdPn+bixYtkZmbyzDPPADBv3jwyMjLQ6XR4PB7sdjuxWIzJyUmi0SgA4XBYeWKF+vl8PiwWCxqNhkgkQnZ2NhkZGQwPD5OVlUU8HicajdLd3U0ikWB4eDhlW9iUDKTf76e1tZW+vj4KCwsxGo2YzWYqKirQaDRkZmaSkZFBIpEgEAgQiUTQ6XQEAgH6+/uJRCLJfgjiMel0Oux2O1arlXg8TiQSwWazodFoCIfDhMNhAG7cuEEgECAUCjEyMpJyLWzKBbKnp4fW1lYmJycpLS0lHo/zzDPPYLPZADCbzeh0OhKJBLdv3yYzMxOtVsvo6CjDw8PEYjHi8bi8l0whsVgMnU4HgM1mU7qh8fFx5syZA0A8HicQCAD/bWE1Gg39/f0YDAYaGxuprKxMzgN4DCkVyHPnznH+/HmlRU0kEsybNw+j0YhWqyU7O5tEIoFGoyGRSOD3+4lGo9y8eZNgMEg8Hsfj8TAxMZHshyIeU2ZmJnl5eeh0OjIyMigrKyMzM3PaC7BGo2F8fJx4PM7k5CQul0t5YQ6HwynRwqZEICcmJmhtbcXtdmOz2cjMzCQrK4u5c+cqLarRaCQejyutaSQSQa/X09PTg8/nw2w2Mzg4iNfrxW6309TUlDJtTDoLh8O0trbicrkwmUxUVlbi8/nIysqiqqqKWCyGXq8nOzubWCyGRqMhGAwqb0uuX79OKBRKmRZW9YF0u920trYSCoUoKSkhkUhMu9B/7yukTqfD7/cTi8WAuzuw4XAYq9WKy+UiFApRV1dHfX29bOqkmAsXLnD27FkAFi5cqFxHXrhwofL2Iycnh3g8Dtxtc6c6oeHhYYaGhlKihVV1IKeeBKPRSHFxMfF4nMrKSkwmExqNRnmDf2+LqtVqCQQCuFwu9Ho9Op2O69evYzQaeemll1JyK1zc5Xa7cTgcBAIBysvLMRgMhMNhysrKyMvLIxaLTXuB1mq1eL1eACYnJ7l27RparVZpYevr63nxxReT/KimU2UgQ6EQDocDl8tFXl4eZrMZk8nE3Llz0Wq1GI1GjEajsipOtSR6vZ7+/n5GRkamtahqb1PEowsEApw4cYIbN25gsVgoKytTLovMmzePaDSKwWDAbDazZ88e1q9fz8TExENb2OXLl6umY1JdIPv6+nA4HPj9fkpKSoC7O2smkwmn00l3dzf9/f20tbXx+uuv8/rrrxOLxdBqtXR1dUmLmiamNvgAqqurGR8fB2DRokVoNBp8Ph8rVqzAarWyf/9+SkpKlF3YqRY2kUjQ39+P0Wjk//7v/5Tft2RSVSA///xzTp06hd/vZ3x8nO7ubrq7uxkfH8fpdE772ZycHA4fPkx5eTnhcJiuri70ej0ZGRl0dXVJi5oGenp6cDgcBINB5f1gJBJh7ty5WCwW4vE477zzDidPnmTXrl28+uqrSgsbDAZxuVxotVpu3bpFJBJRRQure//9999PagXc7e+PHTtGe3s7ubm5lJSUKGdRq6qqKC4uJj8/n2vXril/Zv369SxbtoyBgQF6e3sxm834fD56e3uVFrW8vDyJj0rMtLy8PObPn8+dO3dwu90AFBQUMDQ0RCgUoqCggObmZrKysti0aRMej4dly5Yp7y9tNht+v1+5Vu1yuRgYGKCyshK9Pjm3Cid9hRwYGMDhcODxeJQbhfPy8rDb7cDdXdTx8XE2bNhAW1sbPp8Pq9XK3//+dwKBwH0tanV1NS+99JK0qGnmzJkz/Pvf/wam78LW1NQA4HQ6+elPf6q0sHa7XdmFHRwcZHR0dFoLu3z5cuWwydOU1OMq7e3tHDp0iImJCebOnQtARUWFEkaLxcKpU6d44YUX8Pl87NixA4DvfOc7jI2NEYvFyMrK4vLlyyQSCRoaGmhsbJQwpqHFixfz7W9/m4yMDJxOJwaDAb1eT2dnJ8FgkJqaGg4dOkRZWRmNjY384x//UDb5iouLlWvalZWVxONxPvnkE9rb25/640hKyxqPxzl+/DgXL17EYrFQUFCAwWBgwYIFZGZmYjAYSCQS/OpXv2L37t1s2LCBTZs2cfXqVU6dOsW6desoKiq6r0VV43Ul8fTk5+czf/58RkdH6e3tRavVkp+fz+3bt4lGoxQXF9Pc3IzZbGbTpk0ANDU1Kbv1NpsNr9ertLDXrl1jYGDgqe5DPPWWdWhoiOPHjzM2NkZJSQkajYacnBylXTWbzfj9flpaWjh58iQ7d+5k6dKl6PV6fvvb3zIwMMDPfvYzenp6CIVCVFZWyqoo7jN1szrc3Xn1+XwA1NbWkkgkprWwBw8eJDs7W2lh+/v78Xg8xGIxbt269VRb2KfasnZ2dnLgwAH8fr9yZ0ZFRYUSxuzsbE6fPs3SpUvx+XwcPnyYb33rW0QiEf7zn/9w/fp1vve97+F0OpUWtbm5WcIo7tPQ0EBTUxN6vZ7Lly8r5507OjoIBoMsWrSIQ4cOYbVaqa+v5/Tp08o0iZKSEioqKtDpdFRUVDzVFvaptawOh4Pz589jNpspLCxEr9dTVVWltKgWi4WdO3eybds21q5dy9atWykuLsbr9eJyuZSzqhkZGdhsNhoaGuSShngom83GvHnzGBkZobe3F4PBQE5ODkNDQ8pdQitXriQajbJp0yY0Gg1NTU3K+VibzcadO3cwmUxEo1FcLhejo6NUVVXNWM0z3rKOjIzgcDgYGhrCbrej1WqxWq2Ul5eTSCTIyspiYmJCuV50b4t65coVwuEwFotFaVHtdrusiuKxffrpp3R0dAAPbmF/8IMfUFtby4cffojJZCIYDAJw8+ZN5c6hqTEhjY2NM9LCzmggr1y5QmtrKzqdjpKSEmKxGGVlZcroBYvFwsmTJ2lpaaGsrIzt27dTUlJCOBzG7XYTi8WmXeivr6+nrq5upsoVs5zT6cThcJBIJKiqqiIUCgGwYMECMjIy8Pl8vPPOO3R0dHDw4EFqamqUE0Dj4+O43W50Oh19fX3EYjEaGhqe+O/jjLWsn376KWfPniUrK4uioiJ0Oh0LFizAZDIpt8vs3buXzZs3s3LlSt577z2KioqUFnXqwPhUu5qqM1KEehQWFlJRUcHw8DB9fX2YTCasViuDg4MAFBUVsWLFCsbGxti4cSO5ubl84xvfUFrYgoICPB4P169fp6CgAJfLxfj4+BPd3X/iK+TY2BgOh4PBwUGKi4vR6/VYLBbl1IzJZGJiYoJ3332XI0eO8Lvf/U558z1176LFYmFgYEC5d1FaVPEkJRIJTpw4weXLl9FqtVRXV+Pz+dDpdCxatIh4PM7Zs2dZv349tbW1HDx4kEgkoqyox44do6Ojg5dffvmJt7BPNJBdXV04HA4ApUUtKSlRpkxbLBY6OztZu3Yt5eXlbN++nTlz5hCPx3G5XEqLevPmTRKJBPX19Tz33HMSRjEjOjs7laHaCxYsUN4zPvvssxgMBnw+Hz/84Q/xer3s37+f2tpa/H4/Pp+Pb37zm/zlL3+Z1sI+iS7uiV32OHnyJEePHsVgMCjXF5999llyc3PR6XRYrVb27t3LypUrWbZsGbt376akpAS/34/T6SQWi5FIJOjq6iKRSNDY2EhdXZ2EUcyYmpoavvvd7yrnpKdOfnV1dTE6OkpeXh6HDh2iubmZpqYm9u7dS25uLvn5+Wg0Gjo7O9FqtcyZMweTycTx48dpa2v7WjV97RXS6/XS2tp635Di8vJyZbxGKBTiF7/4BUeOHOG9995jxYoVD21RZbyGeJpisRgOh4OrV68qJ8Z8Ph8Gg4Hq6mri8Tjnzp1jzZo1LFu2jP3799PY2IjX68XhcCiT7sLhMMPDw1/r/tuvFcgvGlI8Z84c8vPzgbsX+i9fvszatWvJzc1lz549ypSwLxqvMbWLKquiSIZLly7x2WefAXfb1qmTO1MtrNPpZOvWrcDd2//a2trYsWMHq1atemLDmr9yIB82pHhqAtwHH3zAzp07ee2113j77bfJzc3F6/Vy8+ZN9Ho9iUQCt9ut7KLKWVSRbLdu3aK1tRWPx0NJSQlZWVkEg0HsdjtGoxG3283WrVuVa5plZWWcOHHiiQ1rfuxAjo+P09raSm9v77QhxVN3a2RmZhIMBtmxYwcff/wx77//vrSoIqVEIhFaW1vp7u6mp6eHnp4eLly4wPDwsHJd8l67d+9m5cqVT2RY82MF8saNGxw/fvyhQ4qdTicbNmxAo9Gwfft2nnvuOUAmwInUc/HiRU6fPg3cHRPyr3/9i0AggMfj4cqVK5w5cwa4u0peuHCBRCKhBHZ0dJTBwcHHnnT3yIF82JBijUZDdnY2ANu2bcPj8bB161Zyc3MfOAFOWlSRCnp7ezlx4gQ+n4/S0lJlk7K0tJT8/Hzcbjcul4uXX36Z7Ozsrz2s+UsDOTExoewkFRQUYDKZ7htSPPU5GjKkWMxG905BvHdYs9lspqqqatqku6mBa1826e5BLexDAxkOhzl+/Dhut1sZUlxYWEhRUREgQ4pFenmUYc25ublKBu79vJH/HdZcWlrKq6++et+/8aUHA3p6ejAajUQiEebNm6eE0Wq1TvvAGo/HQyKRIBgM0tnZSSwWw2g0KuM1GhsbaWhokDCKlPXCCy/wyiuvKHslOp0Oo9GI0+nE7/crH4E49TkjWq2WnJwc4O452gULFhAKhdBoNNy+ffsL/42HBtJoNGKxWAgGg4yMjBCNRjEajVitVmVVnJycxO/3o9fruXXrFi6XC7PZzJ07d7h+/To2m43Vq1fLwXAxK1RUVLBq1SoqKipwu90MDw9jsVi4efMmPT096HQ6xsfHCQaD6HQ64vE4VqsVg8HA8PCwMolgam7U//rSFXLqDWg0GuXcuXNotdppLWooFEKr1XLlyhVGRkawWq243W68Xi91dXUsX75c3i+KWcVsNvPKK69QX1+Pz+fD6XRisVjw+/3KVIFIJILH41HyEgqFuHr1qvK+8vnnn//Cv/tLA1lZWamkORKJ0NbWhkajUZbmSCTCpUuX7psAJy2qmO1efPFFmpubyczMxOl0otfrMRgMdHZ2EggE0Gg0eL1ewuEw58+fV8JYV1f3wCnpj3TZIxwO88c//lH5urq6mvnz50/7HI2xsTHlHN9M3U0thBrd+4neOTk52O12/H4/ubm5lJeX09nZqQxytlgsrF69+oEL1SNfh+zv7+fw4cMAGAwG5bYpGVIsxF2nTp3i888/B/67Czt14Bx4pM8QeayTOu3t7crtJdnZ2djtdhmvIcQ9pm64mJycpLKyksHBQYLB4CMfhnnss6xTJ3b0ej3RaFRaVCH+x723JAKP9cFPX+luj56eHs6fP4/NZpMWVYgHGB8f57PPPqO+vv6RF6ykf9iOEOK/kvphO0KI6SSQQqiIBFIIFZFACqEiEkghVEQCKYSKSCCFUJH/B7KB5DB8czBiAAAAAElFTkSuQmCC)
Physics-General
Physics-
A uniform wire is bent in the form of a circle of radius R. A current I enters at A and leaves at C as shown in the figure :
If the length ABC is half of the length ADC, the magnetic field at the centre O will be
![](data:image/png;base64,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)
A uniform wire is bent in the form of a circle of radius R. A current I enters at A and leaves at C as shown in the figure :
If the length ABC is half of the length ADC, the magnetic field at the centre O will be
![](data:image/png;base64,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)
Physics-General
Physics-
A vertical wire kept in Z-X plane carries a current from Q to P (see figure). The magnetic field due to current will have the direction at the origin O along
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)
A vertical wire kept in Z-X plane carries a current from Q to P (see figure). The magnetic field due to current will have the direction at the origin O along
![](data:image/png;base64,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)
Physics-General
Chemistry-
Which one of the following is used as a purgative in medicines?
Which one of the following is used as a purgative in medicines?
Chemistry-General
Chemistry-
Which of the following is not a fundamental particle
Which of the following is not a fundamental particle
Chemistry-General
Chemistry-
The valency shell electron configuration of an atom is 4s2 4p5 The maximum no of electrons having parallel spin in this configuration are
The valency shell electron configuration of an atom is 4s2 4p5 The maximum no of electrons having parallel spin in this configuration are
Chemistry-General
Maths-
Let
Then f(x) has
Let
Then f(x) has
Maths-General