Chemistry-
General
Easy
Question
Which bond angle q., would result in the maximum dipole moment for the triatomic molecule XY2 shown below
![](data:image/png;base64,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)
The correct answer is: ![theta equals 90 to the power of ring operator end exponent](data:image/png;base64,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)
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physics
Given graph shows relation between position and time. Find correct graph of acceleration → time
![](data:image/png;base64,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)
Given graph shows relation between position and time. Find correct graph of acceleration → time
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANYAAACZCAYAAABT7cSXAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AACDeSURBVHhe7Z2HV1xXtubn/5iZt2bNm5l2t7O7+7U7uO12t9vu9vNzDrJyRBEhCYFAJAkkchBI5CSiAJEkghBZBCFyzjnnnCn45uyjki1ZuEUBRdw/r7OE696qunXv/e7ZZ5+99/lvYBhm1WFhMYwaYGExjBpgYTGMGmBhMYwaYGExjBpgYTGMGmBhMYwaWD1hLSxgYV4BhYLaPObnRaPXFuRG8e/C49eebKdt8o0Ms/VYJWEtQDHZj8GWclQV5SP3UQGKispR2dSDztFZzCimMD3UirbKIhQ/ykNheROaBqYxqVC+nWG2GKsnrIlu9NVkICfSDZ7WVjC38YN/chVqxhWYWZjBTNNDlER7w98vDEHJlSjvnsT4nPLtDLPFWDVTcEExg9nRFrSn3YC33mHs2WuKy0EFqJoHhOGH+eoUlIY5wzsiDZFlI+ifmoeCbUFmi7LKzotZzHVm46GPAfR2H4amRSSim0YxPtqB/sJEJEfEIaGwFbXDJDaG2bqssrCIGYzUxiPV9jj0tM1x0SMNGdlJeJSTidjsNjT3zyj3Y5itixqEJZhtwdAjV3hcPI39uy5C3+omQh9WoWJwDjPssGC2AeoRFuaAqVJku2hB6x8f45ODjnBIbcOgcivDbHXUJCwxgppqQvUdc9hqfI2vdxrDKKAQlZM8tmK2B+oR1lgfRiuTkZsSCHcnCxgcPAJtIw945g2hXYiLYbY6KguLIijm5uYwNTWF2ZlZ+f/PMoKJlgIUxkcjKacYGYVZSHPTwZXT56Bpn4aE+imwtpitjsrCGhsbQ3NzMyorKtHZ0SnDlCQLc1BMj2CyMQ0FSbcREJWPBzWTmJ7rw0xdMIKNj+HQroswDc5DzuAMJufmOaSJ2bKoLKz6+npEhIfD18cXuY9yZcwfoRhrRVt+DKJtDHDV2Aa28bXIH6Itc8B4NlIdjkLj/b/g493GMAjJw6PWUYyxh5DZoqgsrOTkZGieOoUD+/YhLCQUCmWPpRhtRPPDSITY2uGaYwiiK7rRKjcJ4U23oC7ZC74mZ6CjawWLwGxkNQ5jlIXFbFFUEtbs7Cx8vL3x7p/ewW/e+jXsbGwxMjIity0opjE9Noj+rm509wxhZHoOs3KLQJiJs+ODGOpuR0d7F7r6xzA2reCQJmbLsmRhkajIDLxkbIxXf/Uy/t///ndonzmLkpJSTE9PK/diGIZYsrCGhoZwOywM+3bvwRuvvoZXf/kr7PjmW/jf9ENvT49yL4ZhiCULq7GxEUYXDfDeO3/GW6+/gbdee12ahDra51FZUaHci2EYYknCIjMwPS0N3339DV5+6Zf4zZtv4bdijEV/f/5fn+J+QoKc22IY5jEvFBZNADc3NcHV2Rkff/SRFBOZgm+KHutXv3gJH/7tA7i6uKC1tRUL8+yNYBjihcKiGhYpycm4qKePPbt24f333sPrL7+K115+RZqCe3buxOVLl5CWmoqZaU4JYRhiScLKy81FaEgIwkJDYW1lhb27duPrL7+CkYGhfD06Klruw8JimMcsyRQcHx/HxMSEdKuXlZbC090DVhaWSBRjqyevj4+NLRI3yDDbkyU5L56mpbkZIcG3cOP6dWRnZSlfZRjmaVQWVlVlJW76+MLO1laOvdgbyDDPw8JiGDXAwmIYNcDCYhg1wMJiGDXAwmIYNcDCYhg1wMJiGDXAwmIYNbBsYdnb2SE1JUXGEjIM8ywrEhZFtP9Q/oxhmB9YlrB8vX1gbWkpExyfVGliGOZHVBZWTXU1vDw8oX/hgkxwpGj37u5u9Pf3Y3BwUNbGoMpN42M/RsSzuchsN1QWVn1dPdxdXGVRme+++RZnTp+G7nkd6OtegImRMa6YmeGagwP8/fwQERGBFDEOq6mpwRRXcmK2ESoLq662Dh6ubjhy8BD279mL8+e0pbg0T5yEluZpnNU6gws6ujAxNsEVUzPYWFnLni04KAiJ9++jvLwcwyPDyk9jmK2JysKqrqqSY6yrV67IcmitLS1oa21FQ0ODrOdeXFyMzMxM3L1zB0EBQbjhdB16ojfb/f1O7Nm9G+ZXryI5OQkd7e2YEb0YJ0cyW5FlOC8q4Od7E46O15Dz8KHy1WehlUi6e3rQ1NiEEiG0+wn3pSfRxtpa1se4oKsLI0NDaS7W1tYo38UwW4dlCOvHCWJV57H6+vrkmOuKqSkOHTyIUydPwtXZRQq0r7dXuRfDbH5WJKzlRF6Mjo7KZYDIXKSx1xkxLjt35ixCb91Cd1eXci+G2dysubCepra2FreCgmBsaCQdH9R7NdTXK7cyzOZlXYVF0DxXYUEhzC6b4sSx49IxQosvzM5wKTVm87LuwiJIXFT/3dPDA+e0zsLB3h7lZWWytDXDbEY2hLCe0NBQDzsbGxw6cFCGTJWWlHLUxjpCzqay0jKkpaYhLiYWkeERCL99GyFiPOx38yYC/PzllAu9Fh0VJecpMzMypAVCVgeNp7crG0pY1ENRiJSluQWOamjA5YazDKHiua61YWpyEv1CTDQnWVBQgNiYGDhfvyErHp89rYUTR4/hmLguB/cfkEs47dzxPTQOH8bxo0ehefIk9C/o4YrZFTjY2cPby0vGklZVVaGnu0eGudE0DD0ot8P13FDCImbE2IomoT3cPXDqxEk5wdze3q7cyqgLWuOMridZDKdPaeLE8eOyXr+1hZV8wPn6+Mhy4rLHEv8GBgQgKDBQ9li0JjVtC/DzE+a8p7w3KJb0mIYQnLiGFOZG+2dlZqKtrU0KbKuz4YT1hMamJlhaWODkseNyQrqrs1O5hVlNaBL/XlycfIAZ6OnhpBAUOZEu6uvD3c0NSYmJMqKGpkImRY9GVsWMaPTv043KkHeKa1QtLIwMYQ6SkMghdVZLC9pnz8nPoxjS1NRUaWJu9V5rwwqLLlZhYSFMjIykuUEhUuwpXB3opqZeg0Tg5ekJjUOH8f13O6BzTluMn0JQVlaG3t5eDA8PS/OQrvFShED70L7kjBobG5MZD2RWZmVlwcfbB06OjoiPj0eXEOlWz+PbsMIi6ALdjY6WZomerq5c/G5OCI5ZGU3NzbJHoRhOCqK2EpZBUEAgMtIfiF5n9SfpScQksJLiEtlDUu/GPdZPWEthERSsS7b8oQMHYGpigiZxgdT9nVuVaXGDl5WUip7DCbu+/x57d++Bm4sr6mprlXswq8WGFxaZDI1CTOZXropB9SmEi8EymRKMatB5LBKmNZ3Hb778CkePaEjHQ1trG09pqIENLyyCLnxBfoG4Ka7gwnkdOVfCLB3ytNLc0pXLpnLRQAM9fdyLv4f+gQHlHsxqsymE9YR7cfEyaNfDzU2WA2BezNTkFPJz82Bx9SoO7T8AC3Nzmcqz1cc4682mElZTY6Ost2FsaIjQ0FDptWJ+Hurp8/PycdXsCg7u3y9DxahMAntX1c+mEhZ5CSmG0EBfH9pnzso8LipYwzzP7OycnH+iKBYKEbO3s0VFRYVyK6NuNpWwCHLV0vefOn4C18QTmI6HeRYy8+pqauHq4ooTx47B1sZGxu4xa8emExZRX1uPa3b2OHrkiAynYZ6FYvMoQPbkiZMy2oHy3rj+49qyKYVFPEhPl+Ey9DRuFGMvnjh+DNV1vBV8S1bLooI/pSUlyi3MWrJphdXZ0YHQWyEyHs3/ph+n9QumZ2aQLh441FNRuYPcR49kaBiz9mxaYdH3tjS3yLqFVMfwkbiJ5rb5RGdebq4smnrq+EncCrqF8dEx5RZmrdm0wiIWxH9RkZFSWJRmUt/QoNyyvaCoioGBAdxwcpITwB6u7mhv41Sb9WRTC4sgbxelN5w5rYXQkNBtGZ5DmbqUVEiBypRDRT0XrwKzvmx6YU3PTMvj2L93H4wNDKV5uN3ERQ+XyyYmOK+tjcT7iRgdGVFuYdaLTS8sgm6sS8YmMnWc6jFQIt12YVCYgDTlQKnxVKeRUuAZFVkQvbtiBrPigTwt/lyNYK8tISyaNE5OTMIZLS3Z8vPylFvWBpqQpWMgQas7EoS+izJ56XtoXEVjTKo1YW1ltea/+2nI+zhMSzgND8ug300Vizjaj+nWOrT0DKB1SvyWVTh0lYVVuQGFRdCT297OXhY4oePr6Vm7ktVkehYWFMhkwaKiIuWr6oG+i1ZsoUIvtILLqRMncGj/QZmZS1m760VHR4cc51HZ8fa2tnW5Lyihkh5wqjGBobJsFIWF4n5eLYpnhLCUW1bCc8JSzIqn4WAfBno60dXZjvaObvSOTOJJ+Y+aDSosIjUlVa7VRS3hXsKazeHQ91Bu09HD6o8EofN9T4iI5qnoIfLZJ/8Fo4sGqKurU+6xPlA6P9Uocbp2TU5KU1znWtPf1y+Pgx7+JPSxF5Zfm8PCTCMqotzhqW0Ae//7SOidxIDoslY6Sn9KWNT/DaO3oRCPYqORKFr07SD4u3oh+F4+CgeASbFLY00l/JTC2miLew8ODMoa8Pt275VluHrXaKxFNzuN7Q7s3Yew0FDlq+qBznfs3RiZ/fvuO3/Gnl27ER52e93HVqWlpbIak724LygthczBtaarswtREZFybTbTy5dx9+5ducTUz5ulk5jry0Wm5yWY7D6Ec5dc4ZXbiPKBWUys0Kn6o7DmxqDofIDc+EC4eUYhPD4d6Ym3EOVoBDNLbzgntKJ+eAa1DbXwp2V8HBxkkZCNRnNjkxxzUC34rMysNbvAd6g2x7HjiBEXU93ciYrG119+hb/+5X0xtrLeEFEn1GPa29rBzcUFtTXrszQTTTGkJqdgz85d+P1//E7WP7S2tEJYSCge5eSIXqwdimcsrBkohkqQ42cJiwPHoG/pi8DSdtQOz2FqheOsH4S1MNqGoWRbhDjbwCSkAQ+aZzE7XYeRAjdc0zfF+UsxSGwYQmFrszAFfXBVPBGoFgWdRKoVR8VC1rNRvCCV3/ox/+gALK+ay1JcZBbQCieLvW8lrampSbRm1FTXSI/cvj175ZwanQ91nBP6ffXiBnaws8MH7/8VH37wdxlkS9WWaFxD52Cx96mzNYvfT+eXTG9D/YsyS5lMVSrUSYsSrsUx0XfQtaBjSYi/J5fxffmlX+Kt19/A737zW3wkzpOmGIvStckWD9tu0bNNT5GpKtSz0IXKuz7w1NKDY3AK0sbmMU4vP5bFsvlBWLMDdajzO4MbpoYwiOzFI2lFDQnD9Q78hQ2ve8IDoeU9yBAX19PdHYf37cN3334ri2pSwKeWpuY6t9MyR4uOh2o6/PW9v+Djj/4hl3TV0T4vJ5AXf9/yG2Uzy2ViT57Et19/I2/2HeKc0PiH2mLvWUmj8mT0uV998QXe/u1/4J0//FGWLaPzr32Wvu/0c+9Rd6PfT99N2cmf/ucn+OLTz3Bw3/7H94U85+o/JjoGur5UE4VE9TfRk7/52ut47eVX8KtfvIRXf/Uy/vC7t/HhX/+GwwcOwt3VDVWV1eL+JvkMozreH75nDeESnoUsMSxfDRvnB2HNDdSiyusUbPXP41xQC7KldTEGTKUgTPQAlzW9EFnejYwOISwPDxw9eFDY+buhK25aPR1dWUpr3Zs4jovCDKSSyHShSVyffPyfsgQyhT0t+p4VN13pLNm9c6d8MtKYZ/H9VtaemLdPHhrvv/sePv/0U/nbaGH1xd6zNu3xeaW8ry8++1we33GNo4/vC+U2dTequkuNHqDkQPq7ENDTwnr9lVfx5z+9g8+E8DVPnpI1DqurqTIVCatf9Fg34XVGCCvyIXLE2Go13HFPmYKt6I41g+slHRy3z8DdsglMz3RjujcWwQ43YGMej6yGQRQKk+qmry+szM3lHApVTKL5m43SqPY4ud7JNKGnO0UjREVFSXOFCkgu9p6VNjLRfLy85GLnVIp5sX1W0ug30bHniHECFTD9/tvvsGvH9/JmooUIFnvPWreMBw9gLI6Nams8SEuTZesW20+draenBw/SH8gekwT16zffwh/f/r30nJIAybFEWdSDg0NPjb17UBXjCy9NHdj7JyBxaBYjCopCXRlPOS9GMN0Uj/vuZtA/Zw37wDSk5GYiP9EHfjcjEJDYhqbBGdTUP3ZekFv159Yg3gjQjUjzSufOnIGPuNnVPWEZGREhvYK06oa6yH2UK5+4O4SwqPQ2LTlbVFSo3Lq+kPOCCtXQfbFezgtxkZGemopdwjz+7Vu//qHOBzmUyFNJE+rPM4LmJB/cPLkL53SvwCK+DLmd0xBDrRXxo7AgPmm+G225Mbjr4gTvgEiE3UtGSuxdJOeUo6gXGFcADTVVP7jbaR5ro8bl0XGVlJTg/Llz0kSoLK9Q25wbfVeauKC21jYyAVMd1NfXyfrqNBlsoH8R3l7eCAkOluuKbQTIgRAcGCjn8cihsB55YJSjR4s20FDgsrGJLEv+4gU15jBUmYwMdxPYW9rDISIfD1unMLp6wiLmoZgawkhnAxqrq1BV04SmDmGGjE9jWjzw6Zm/kSeIfwpVcfL384fhRQPpwWxualJuWV2epG3Q5w8ODipfXT0oep2SOck54+hAlkKOLP9G9dXXM9riaSjMihauIHNscmJiXaLr6ZzQ8kM0SUzHstQojPnJAYx11qChvgn1HaMYnhI6WKGB8xNhPcXsFKYnZ57zkGzUkKbFIPOvQTxJKU9J69RpaRIsbLJ0CvoN5Lqm8SI5BR5mZ2+LZXCWA8VPbpSSeD8vrJ9B7UG485OYGu5Fb1cPuvrHMbYKFkVcXBwOiAHtVTMzuXj4ZspVoh4gWJh8Gkc0YGVpKXspZuOzsYQlRDXXW4bKtHCE+wXB7/YDPKjsRb8Yxq2kZ6YJVLopKWCVVhrs2URVdGnMpqOtDSNDQ/k317DYHGwgYY1grLsMxfG3EO7mACeLyzC5YIDL10IQlNuFlpHl9zI0DqF67zIS/MABGYW9+smA4jzMD6OvuwdtbUMYn17ZeSETkNIwKFqAJj39/fxkBSZmc7BBhCX6o/k29FSnIjYgFGEh0YiL9kXgVQ2cPqoNDes0JNaMrijimCKfyWtHUQuUFFlcvMrpHYpujDalID46HqExFWgZXNk4iJwBtB6YkaGRDBXKy8tVbmE2AxtDWJTBOdmBodYKlJY3oaq1G709Veh4eB3Oxno4dCYIoQ/bsZI12BVzCiQlJsl5oJ3f7ZDR6Ks5tzXbnYOyUGMY6l6F7vVslHRNKrcsD3ITm1+9ijNaZxATE8O91SZjgwhL3OBTY5gZH5Ph+o8/cQIYjkOctz3O6YQiMqsNqqaw/RSqEBvoHyCFRTUiaO5lVY5/shsDxYGIdNDEnoNGOGGVjsL25WcSk3udUnIohMnKwkpGdizOHGZHutHV3IzWjn70j8+uSjjOsliYw8JIO3qaq1BRVY/K+l70jc6uOIJhs7JxxlgkrqevwsIA0HQbsYGeMHPJQUbV8IovEvVQ5Migxdeo9jvNDa3MkSGOaG4SUw3ZqE12wS0/CxzTccJFu3SUdSz/MUAp9vZ2drC4ai7TIJ53WCxgQTGOqb561BVkITM1C1mF9ajvm1hxuoPq0HWbxcxQK9oKUpB1/w6i7sQjOiYd2aVC8BMKzGyuGY5VYQM5L55FMdqOrmRf3A25hYCcHtQOrc73UGZrVmamjIqmeaGVhWVNYG68CeUPUpF9JwAZia4ws/KAEQmrfXkTt9Rbubu6QuPwETHWDJPJm88zgMH6LKTeCkJISAKSiltQ1zWEocm5deixhOgnq9FUmIDwwHuISy5BdUUeKlMCEBkVj5CHfWK8uf2UtTGFNTOMkfpcZN0OR+z9PBQPixtOuWk1oJTtG9evS5OQYsnIJFwOCjEuHGzMQXpWBYqK8tBbEQCPG54wdshCVbfqYyya+KUeitIgKBWkuKhYueVpJjHWmIpHoc647hSCgJQ6NE3LfmOdEL+zLw7ZETdgYJmIyDzqXfuAGg/c8vaA8c06FLSuvdzXmw0orHkousvQlHsfCekVeNQwAWVKmrQWVwvqqQwuXsS+PXtktD554ZYOmT/T6K/ORf7dCCTkVKGyoxqdxb5wtnKEnlUy8pqGoZhX7YAp7o/i3I4fO4bQkBAZsf0sc1CM1aDA3wZuBiawiyhASus4xNBq/YS1IM5bVywyg6ygbRAMj/udGJ1sw0yFL8L9/WEZ0ojS9u0397bBhCU+a6wVHdUFKCiuQ7W4rx47rYW4JqfFBROyW6U7iGpEUAGYb776WvYQtKDd0gOKhdTHS1F81x2O+qawcvBBYLg3Ap11cebICew6eR3Xo0tRq0KvRWM9imekfC6q10G1Gp47t7PdmKwJg7/ROZw8oAML7zAEJ2QgNasadf0zPxT8WVvomlWg6p4z7M6dh94VL3hGJyIpOgTx99Jxv2IE3eNsCr4Q9QhLqGV2GKPNwuyLdoOXsxsc/e4jPi0Hj7LTkZORjbz6HjEQFubXKl6jutpamepw+MAhOF67hprq6iWGOwnBjDxEUbwXHE3tYHXlGtwdTWFnooGDO/fgywPmuHwzB8VtS/MM0ndSOjtl4lLSZIowBxdjYagE3fdMYaatg71nrsPT3w+3fYSIHbzgFV+GvM5JzKxL1zWLsbpkZNofg/6hHfjysDFOGwciPKMB7eJ0bj9ZbRhhiVM/Won6xBtw1NqDvV9+g517D0PjqAYO7TsNTV13+D9sQuMKQ5t+CiW7FRUWwdjQSGZDU7Liz7u2n0b85pkeDLTXoKKoDEUFZajOj0V25FUYnjfA0QvBiMxuQv/00nrAttY2uRwR5XNFiHHlyPDiUSGK1gxU+Z7GhfOXcco1D9m1zegrCkK0nQ5O63vCLroWHeujLCwMCxElOuGmwU7s/nYPPj9kD7uoStSJzn0lE/ublY3TYwm7vKssCfHBvvBxcYWPpxs83V3FAP0mvIPSkd04gNVPyBD6mJ1BUmKizNuikCdKWFxyZaeFeRktPye60YWJSvQXuMDC2AqnLyUgt3FpUdZdnR3w9vTC0SMasBS9Jy1g/nPM1iahwPkY9IwdYHh3AE1kaU7moPy2Cc7uMYSubTIKxhVyTLp2CNnMdqKnIQ8Zd6OREOaNEDdTmGqdhfaVQHg/7EXbSpObNiEb0Hmx9tB4i8RF2cYX9fTkgm2UU6QSinZMNtxBsM8tOPnlo6bnxeMrcq1HhofjyKHDotc0RH5+3r8sdDnXlIYKHy0YX3WBUdSANI2BZnQW+MLmsAkum99B1ugcVSpZOxbEyK43GXlxvrB0ScO94h5M9OWhMtQAxjqXoOn4CA/lE2B7wcJSQqn8IbdC5PKrdJNnq1wzcQbzU33o7uxGa+coJmf/9VOaJn0TE+7LMRVVGIq9e/eFnsmFvnx0xJnB3NwZer71qB+kc9+CzvIQOOpcg4NTKipEj7U2lRSVKISMa4KQHmiLC665iJYJzf2Yaw+Bn9M1XDBLQEbFwLYbZ7GwnoIWa3O+fgM7vvkWpiYmakt7p/mqvNw8WXnpmMZR3A4Nk9mvL2S6CxO10QhxtIeZ5S3cyalAeUU6Ht3zwnXXGIQktaB/duWFUFRCIXqsdmH6RjjhsnUoPGOqUddai/bqCNwOCMQ173wUN46t33TAOsHC+gkF+QXSmUEVl2jymOo3rGZdDzpfxUVFsLawlNEVVMdiaQ4TYh7zky2ojg9EpIszfKPvI+pOFBIiKJayHgVdC+sQeSH6ovlWNBfEIczFE35BsUh48ACZ8SG4E5OKmMJBdIxuN1mxsJ5jYnxCjrGoYAt56Zxv3EBtDdWgWzlP0uydrjnKcCo7G1vRK1bK15fOHKZ7m9FRmS89mgWFZaiqaUbb0PSKC6Asn1lMjXSjs7oElYXiuIpLUVZejfq2PvSML3Cs4FLY6sIiqIeibF0qL0ahRdfsHWTpatWiM56FPI20CgeJSvvsOVmHg0KWlp+6Mo+5sWGMj0+vQ+Dtz7EgetRhjAwOYVgc1HZ0sz+BhfUzkBBoHSoXZ2dZbZaSI8mhQZV/VK2ZQZ6+/Px8ec5OHj8hRdXS3LwK524jmlhijCceFtvP+HsWFta/gHouis4I8PeX5aup/BjNOdXX1Sv3eDFDg4OyFABVrdU4fBhOQlQU4cFsbVhYS2BAiIOKP54XJpzWKU24u7nLRbQLCwvlKhd9vb1SQFRTkOoLkjOiuqpampN+vjelh5Hc+FQTkPLBmK0PC2uJUL06Muc8PTyhK3ovMukoEt3HyxtxMbHiXKQgJSlZ9k7kPqe1omjil7yL1paWslIuCW67nK/tDgtLBWhsRe73uNhYKTByx1OBGhsrq8fN0gqW5hYyQ5myf+lvH29vmRGsciQHs6lhYS2T8YlxOVaiqHQqTebl6SkbCY7SP6hmRetiqR/MtoCFtQIoLImqJ1HUBJl5T1pvT4+MA1y+K53Z7LCwGEYNsLAYRg2wsBhGDbCwGEYNsLAYRg2wsBhGDbCwGEYNsLAYRg2wsBhGDagsrOqqKgT4+eOag4MMLGVhMczzLKvH8vX2ga2NDZKTklhYDLMIKguLFhO4bHIJmqdOIfx2OC82zTCLoLKwMh48wAUdHRzcfwDBQcEsLIZZBJWFVVJcjOuOTjAxNkZ8XBybggyzCCoLi3KQaB1fWp2DnRcMszjLcl5QHQdaI5fd7QyzOMsSFs9jMcy/ZlmmIPVYdna20hRkGOZ5liQs8vxRAUsqpkLC8r/pJwupUF0H2vakcSo6wzzmhcKiopUV5RXIysxCXV0dCvLzHwvLzh6xMTGoF69RFSKqGrvkBdsYZovzQmFRT5R0PxE2VtYyjInGVhf19HH6lKZcR8rJ0VEuHJCUlCSXp2EYZgnCIvMv52GOLE75yT8/xjt/+CP+8ud38e6f3sHvf/c2Pv7HP2F62VSu90QiZBhmCcKicVNPT4+sWU5i+rf//j/w2suv4PVXXsX/+p//hj++/Qd4enigr7ePx1gMo2RJzgsiLzcXB/btk4L6zZtv4deivfHqa9i543tkZmQq92IYhliysNra2mBrbY1/fvQR3nztdSmqDz/4O66Ymam0+gbDbAeWLKyJyQk5b3Xi2DG8/NIv8Yv/839FD7Zf1jEfHRlV7sUwDLFkYRE93T1yEYC33nhTioscGo2NjcqtDMM8QSVhkYcwPOw2vvjsc3z4tw/g7uq2ouVDGWaropKwCFqL18rCEgZ6+rgXF48FFZcNZZjtgMrC6ursRFZmJhLi42VALguLYZ5HZWHRJPDIyAj6+vrkUjXguSuGeQ6VhcUwzIthYTGMGmBhMYwaYGExjBpgYTGMGmBhMYwaYGExzKoD/H/khfkbDG+sFwAAAABJRU5ErkJggg==)
physicsGeneral
chemistry-
Of the following species, the one having planar structure is
Of the following species, the one having planar structure is
chemistry-General
chemistry-
Strongest bond is formed by the head on overlapping of :
Strongest bond is formed by the head on overlapping of :
chemistry-General
chemistry-
Molecule which contains only sigma bonds in it is
Molecule which contains only sigma bonds in it is
chemistry-General
chemistry-
Dipolemoment is not zero for
Dipolemoment is not zero for
chemistry-General
chemistry-
Which of the following bond has the most polar character
Which of the following bond has the most polar character
chemistry-General
chemistry-
Covalent nature of a compound increases with
Covalent nature of a compound increases with
chemistry-General
chemistry-
Melting point is very high for
Melting point is very high for
chemistry-General
Maths-
The number of ways can 7 boys be seated at a round table so that 2 particular boys are separated is :
When n distinct objects are arranged in n places, then the total number of ways possible are n!. But, when n objects are to arranged in n places on a circular table, there are (n−1)!ways.
The number of ways can 7 boys be seated at a round table so that 2 particular boys are separated is :
Maths-General
When n distinct objects are arranged in n places, then the total number of ways possible are n!. But, when n objects are to arranged in n places on a circular table, there are (n−1)!ways.
chemistry-
Least ionic compound among the following is
Least ionic compound among the following is
chemistry-General