Question
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==)
The correct answer is: ![](data:image/png;base64,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)
Related Questions to study
Of the following species, the one having planar structure is
Of the following species, the one having planar structure is
Strongest bond is formed by the head on overlapping of :
Strongest bond is formed by the head on overlapping of :
Molecule which contains only sigma bonds in it is
Molecule which contains only sigma bonds in it is
Dipolemoment is not zero for
Dipolemoment is not zero for
Which of the following bond has the most polar character
Which of the following bond has the most polar character
Covalent nature of a compound increases with
Covalent nature of a compound increases with
Melting point is very high for
Melting point is very high for
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 :
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.
Least ionic compound among the following is
Least ionic compound among the following is
Stability of ionic compound is influenced by
Stability of ionic compound is influenced by
The electronegativities of F,Cl,Br and I are 4.0,3.0,2.8,2.5 respectively. The hydrogen halide with a high percentage of ionic character is
The electronegativities of F,Cl,Br and I are 4.0,3.0,2.8,2.5 respectively. The hydrogen halide with a high percentage of ionic character is
The eccentricity of the hyperbola with asymptotes 3x + 4y = 2 and 4x – 3y = 2 is
The eccentricity of the hyperbola with asymptotes 3x + 4y = 2 and 4x – 3y = 2 is
The number of ways that '6' rings can be worn on the 4 - fingers of one hand is
It is important to note that we have used a basic fundamental principle of counting to find the total ways. Also, it is important to notice that each ring has 4 ways as it has not been given that each finger must have at least one ring. So, there can be 6 rings in a finger alone and remaining all the fingers empty.
The number of ways that '6' rings can be worn on the 4 - fingers of one hand is
It is important to note that we have used a basic fundamental principle of counting to find the total ways. Also, it is important to notice that each ring has 4 ways as it has not been given that each finger must have at least one ring. So, there can be 6 rings in a finger alone and remaining all the fingers empty.