Maths-
General
Easy
Question
If the product of two numbers is 180, if LCM is 60, find the GCF:
- 3
- 5
- 6
- 8
The correct answer is: 3
product of two numbers = LCM * GCF
180 = 60 * GCF
180 / 60 =GCF
3= GCF
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The probability density plots of 1s and 2s orbitals are given in figure
![](data:image/png;base64,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)
The density of dots in region represents the probability density of finding electrons in the region. On the basis of above diagram which of the following statements is incorrect?
The probability density plots of 1s and 2s orbitals are given in figure
![](data:image/png;base64,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)
The density of dots in region represents the probability density of finding electrons in the region. On the basis of above diagram which of the following statements is incorrect?
Chemistry-General
Chemistry-
Which of the following is an appropriate set of reactants for the preparation of 1-methoxy-4-nitrobenzene ?
A) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/656528/1/1190392/Picture49.png)
B) ![](data:image/png;base64,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)
Which of the following is an appropriate set of reactants for the preparation of 1-methoxy-4-nitrobenzene ?
A) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/656528/1/1190392/Picture49.png)
B) ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAXYAAABHCAMAAAAk0ZzrAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAMAUExURf///wAAAAgICM7e3u/v997Fzu/v5rW1tcXFxWtjc3OlnBA6UpRahBBaGWtazhBazhBahKWlpYSEhDo6OhAQGWMpUmNaKWMpGWMIUmNaCGMIGRDv3hDvnGvvWhCtWmvvGRCtGWsZpWsZ7xAZ7xAZpRDvWmulGRDvGULO3pSEWkLOnBDO3hDOnBDOWmuEGRDOGSkQIWNjYykpKVpaUpSMjGtapZxazhBjUkJazhAQUkJahJyUnJxaUpRapZQpUpRaKTFaGZQpGWta7xBa7xBapXtaUpQIUpRaCJQIGZzv3pzvWkLvWpyU70KtWpzvGUKtGZylGZwZpZzvnELvGZwZ70IZ70IZpe8p3u8pnHPv3nOU73PvnMUp3sUpnELOWpyEGULOGe8I3u8InMUI3sUInFJKUube3ua9rea9jJxa7zFjUkJa7+9a7+9SazEQUkJape9are9SKe8Za+8ZKe+U7++Ma++MKcVa78VSa8VarcVSKcUZa8UZKcWU78WMa8WMKRAxGe9azu9SSu9ajO9SCO8ZSu8ZCO+Uzu+MSu+MCMVazsVSSsVajMVSCMUZSsUZCMWUzsWMSsWMCHN7c0pKQu/vWu/vEMXvWsXvEObF7++9a++9Ke+Mrb3F5sW9a8W9KcWMrUKM70KMrRCM7xCMrWvOaxCMa2vOKRCMKWsphGspzhApzhAphL29lO+9Su+9CO+MjMW9SsW9CMWMjEKMzkKMjBCMzhCMjGvOShCMSmvOCBCMCGsIhGsIzhAIzhAIhO/ve+/vMe/vvWula8Xve8XvMcXvvZzO75zOa5ylzkKMa5zOKUKMKZwphJzOrZwpzkIpzkIphHPO73OlznPOre/vnGulSsXvnJzOzpzOSpyEzkKMSpzOCEKMCJwIhJzOjJwIzkIIzkIIhHPOznOEznPOjELv70Kt75Sla0KtrULvrRCt7xCtrULvzkKtzpSlSkKtjELvjBCtzhCtjCkQCHOEpTExEDo6WmuEUs7v95ytjAAQCP/m9wAACP//9wAAAHK9wY8AAAEAdFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wBT9wclAAAACXBIWXMAABcRAAAXEQHKJvM/AAAORklEQVR4Xu1da3abOhe1/BDKTz0GcoX8T+OxxuE5wFCz6uXa7vr2EQIjwA5u3C99eKe3xQSEtHUe+0gkd/FV4PQnfokQChtkpSqFP/gqgSJd9sInIVWH2qlaA/ir1oZNoBTprhc+iTIx2oe5sOXe9ImPx7jUhHTbvwjxvMEXjGnFlTvI7c5L6QsvC8+DXJ/PK+dcJa2ShcS5QgquGFul+/5B8J1MR59GqEz9wBwq5hD8/1U8L8J6xh7JkvAN+w/z/ixIw+wjtP84gPd/Obw/Bd48miN5zdjTItw/Crln5lEOFbuodPjCz0Eub5Y/VDBNQhT64al6oY9Qs3qa3FDVTlciTKbumhmfDl94HFxPyZLCHVy9b0qk0tQT+VOWzLzWCH4WwV+YTccdisJGxhtQaaqtKgZz419rBD8PVJxD1rmMbLstoLaqENrFE4OYEkr2SIn1BeDyqcXFY43dv9oyPQgVXpes1K6XMDlXqsbJQSzCjOmrvd97zBNH/1BT8l4UfGKnHkbFysHyyvcLM9XqnD514B5S3Yr+OPgbY7+5ivxKau+AG6bzrqFgnVaGIaA0LXPN45h7hfefAIw9540K1psivtZMZ9Fcnphep+MXctzhRZhBVoStL2/Hw6MyA62JwFPNcOQnTs3zmnq4pWc9uoD05v3GQOs9Lf7j/B0Cp3+DKLu1mefx8UT8uk79WPcTRzqcYYGRdbZNxw3UPVsncAQh1/cPqMjfK6vOGvlciMraym2OI4EB8qpSv1Xpw0JthX2z8/SqH0pxVe7vsw6gjspusuzx/WxvrVW86WMoClF0E8kDIX2YjxDQSDxaqTdb2dgIF0GIQshhhS3oYmG9cNV9ixGpaNS1HW+mCUtVZMu7YidcJ/vOdcvRuGPfsuaCnmG5vDbW92YVWuhj3vtWwFVFHb64WlE2L+LAUl5fW9o6Lx/k3VdaoxGwWIFLaq/WuoIj1s02cOaei0IjIbXYTthxi1D9ByldFR7NVNREZsshCNQtLWGhOEBthBnWHhy7+H6HOHTKJh3fgdizXb/56jrnc8BhQXVVVW+aGXp8kERO4p1v6U0Fe4wfJhGunpEQaPT7sox78PVGID+hvaJYrIWk2ShlvqohJGbGuNJV6PlJDZu7AtaxjI4tLFv26sIO0B+MtY1bVjcH9xEw/F06bhDMrI29Vcn2fWEf7PIwsoWbiKzHoSrkc00Ecwy/s3fkG3de/Gg+jMErM3BIWskr1WbNucfRgVO2Ya2/kCuNl0kRXJmClODowu31DYtxpnupyQnePQILIkv6MGDzBjDWQdCTo4J1EmdZ5kNBp2ZvrBLrrc+jB8vo5GSuzDUnYTX3Ah1IzmkUO5CcGEHHHF8cEUPaxgQaHtd+xZ4tm7PFbeVGM9YVKWh5wpj9kjqum0QqhxdMU4JB5wM4Vma0EjkNN5h6OO3uls00aNMLuVj3WOQWxqihSHvtmzardmVO8MWYkbXLZ2VNntIRK6jkPqPZtvIm2vNREqB609YYzzyX90dFCeBqTfg0qOaB78slEd/09zs7xH/vQ14GmfC8nbuOe66Yya4MsLg54akxoat5IYUzys6R9jY7yUuTKXzpDuNcDWvPrJdu7Tm3hbVz9KY9RbR/T8dXFEiVzWSAdnosP4bKicL1V0UO/Z4u1GWotQHJlEBiamiTnYvdg/1voBVhe7OVYJ3TTvfeiwxXEO2nzjFoH5zCp2JljfE33RZNgka6QuQcRwCVWy95Ty+he78ih2B1ci+idcLa9+1ZVOl0+9s7ritx3FtxQis9PlCujIfo0Qq1UCJ/48PH4tvXozUsUHevQM3g9oMVARhdZoS3QLS/dbeStdP4KwRRWuK31EbBKsR7sP5e4NywS8U2o5EKviEdxx7tlGUnaP8PSQX/FvF20N4pymsgobjdu5NEix0qcYnryXSi7yAz3g+0APxw2Ju1ZfLD+xJgY/mkSaR9f6s+ANJo1uhjz6BoSfMEqhVoF6QKKCkVMcjgCWATgbsLfHwjViL4PfMC8lM1GlOQjBnYD4U8Vq+CwJ/cgFsgpYJtpWjbzFCUC1ucIEAINSB91HejLbo3otXT9NIgyC/8x0EG2mOcIOr5r8rAngaaB3ZzYxu8D5RW/SxA1k7KGEFmtZBkNtUa1q7xLWg8DBrkd0Mn1RdB8wOfiRqTloRGPppSRcKETACnpiReCdH8KAfUVveWtTHEvhtJGH9Uu30gP4KGqAw0+g2j4ZyL1Wbl5cqr+MWFVwFnA0wGNnIaGvtipZdz5GPEyNrBuyG2WqD3eFaDY9isQqGCl4s1OfU1GpHUuyDj4V6UaQFZCyMVzODuQtuFpJnoTEiaMn5hiNZapyJBk7RjgkzZXjwpinfMgBM0g++fiFwEv0uBwvNqeKSQerRTzCnpkVxc3/f1jfEGdFNLy/TKH6wz7wbO9I7bYSAn5yBqd3anjdnTzDU39gCXm1GiNsD8DmnHVCjfYae29mDxx1k82BhzYpBqBWW4Hu1tbC9M5Iaqj5I31h6EiDXgVTo3qzWhauqbSHqifdgVRAzXXIxCnJXjUZ3B0/cYEqmiJX8D7YPZi7nmeoo6E9+23erSrdIigG9mIlZTwH+FXy5Bebkry53FwbeduzAY04Xhg6kxWj1S88gNIw+4hQlrp3On933pgNiJDjQyWxq328k1UkBPDJOZkFooUukdq0cbwwK32tSeWBsYa95Lon057Aqaaa0K8aaNyFtpuwsduzRq8AfZO54H2inJ9LAGSaaLcDR/kfUYwMq35uz3C4uNr2yMWEgyXm6UWPEN5kV6awVHnKFgs5E+8ODr0/hN07kiEEAnhjZEosAjgPH1kTsQ5rZeNeEN0QWPFAg3oAlEX1MIkUYck5Khz/yAorGJKxge4iyRkvcTQTiNOYJaGO2zkLWnQzQQFxNW8BLKs83C16rsdHs8HWkfrniT8XSE4A76cPYX7UBxSgGY38YoznFxb6S/RxrDs0sjh3rf2c239rdR/qTxz7ida8jx7jpKZGRQ4ltSI9H4yHMxTMRaYi3fRFyEE7F0Benp3rbiilYKydpT9iP/Ie9S7kKBvHEdcrLE6JkeiOeRsO3pFgIx3aXjbbOIIE51WCOkXBLtp8bacTEFoaGkGmOFORsYCYq7wYNvgvthxSbQ/TmTxgUq3NabaenQkv2tu6XeuJpYxshKTo9W61w+YKYy2gOG24vKipyD1GByRlwe5w2pApyx94YYlJxtJ8ja4T5E+1DyUMROjIDfb/HWKLFrtmw6BXmT+v2D+vEx7ZTNBnYEr5ohASPQi0E8glXNdBXwqlO4xpDTUHUXwSmTwfriPwWZkBaivyQudJk9Oqq3jnfULyCETDy1B9qvyaFo15zINZswVOAJ1Inod8PRU1GgJQ+wsiyAIJNSl4LEAJxMflosx0FmAqtyODlHPZJiN4A5y0lGxpnrKUT2exXCcbMz6aa1vHQ9Jhph7Q2btM7E6iyLQI6mo4TmStgu5xLlC1+cj+QxaWz4Jkr2hs9VbRofjQmhVvSjiPQAsB4lVb4ZQtg4zMqS6oSMUdeoAlpMRTvtXcKMJNUUIBgHLL/t+7tGd6Au++wJR3Rg6KK3QaywZukuBuWipjzbRp61YyVOo2YmU7r6+W3QlQZK9dAsKm3jZJX+uOBFXBA3jmyEbDPxQqxfgY7HkjSFoxyFh+BGA32moIJjn46NVu5uEtvOr+4AnoP57aVUOjOYiGmAt1wMw3zGpnIb0r/tl+bbNjFd6EPlVfdk7mIU4ZbeMhYKRdYHgEijUAHU9Ea42IKLrd4GyJT64FXtIx3RxBudShrXtUUG6Xc8Bah2U7TRhmxmjOsq01IPw5tLvjuBDDErVGwHYprvvsXtpQcQNuLaBM/3kpIlnOd5XoRUW6jVuN+Z0NxMmrVtBiIqveRzXPP1VONT50aAG86Op9Pwp1wmIFjNCRXINPmiD9TonKj21QgQ159kLHI0t41+IMkA7ZJZKWTUdVX2JsSe+b64QADNp+HXov/ox/DI5uMtrDQtS/MPI98dUCrOFAmpyg+zanDNdnoLWc8RrL8DkDkHuvdhKF3qQ13P1nyTgO4zzUpegtAmLsjdAe3dZLQ7c/nM3P9/sLbaK/X5H6WNihP4XLDih8H8kx+mw2ngjky1HH3Jlp8dzC9HXA6A0vm0VwoppXfuU1IG+DEqfO77DxUnWR6m6nvGm38308v/B0ep3MHZ1ZPs49OjofWenHecuZ0go63nUSnbDHihh3uTI/orghGhvFRZwL+Cdnu63caIYvlAefocfOxafwKKb8M9/7jy1qtmWghaUs9sHXXgcl5y+Tu4eiLOlRm+3RcXhnTRn43z0VcgXeerdPTrfK6Z4Lek9p7K/8oO088JDHkXB1Bcmm0V+JHzwLmgLRWj1cAFaBH3t1cxX4YPZrVql4iu4HG7AaLFkQDYEem4ZsAwvWE7vPGF+bATZSYvlKWV7AhjTDXx6hLum2vrTxSQX6xFnwdRT8sRrvzWq0NNP5KSTvVBbyT9NRx8BYoHNoc6QHpeMun5moIHwaUZaJQZqNqXHn5r3BvVw3by2A0fX73S88N0goCGT4cz8ESt9pWy78nYyBk/GZmBuz9lufd3xnq8oX0Xx934hfa/yAyfgjl8CHfj92pMYxt/OOsPxxcOID16RYta5T3exYKvxCaIIGQR1Psl+80DH+KJKufZee0BPHuehK7pFaw6yA6VzeC0rbUu8aWN0acHWX9hEpJeBFQoR0/4j53i72S7i6kXoF4T8SiCqgr6qy5rXeKvsm7/zwTK6pLR7wGgV9fK7mz1N6iYX2wn85tf0w+9rMO6/ztm6NV0+ukbHtYPSvsenhgVH2vqqeH45c9/OJ44gc/O8386XnxM4yYvi8X/AKyhoES9BxV3AAAAAElFTkSuQmCC)
Chemistry-General