Chemistry-
General
Easy
Question
Arrange in the increasing order of boiling points:
i) ![](data:image/png;base64,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)
ii) 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)
iii) 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)
iv) ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAFkAAACtCAYAAADbCNOgAAAf3klEQVR4nO2dZ3cbV5qgn0ooAAQIZjBnkWIWRVGByrKnp7vnzMzO7Dmzf2730+6X3Z3uCd1O3e62MkVJzDnnBEYABFBApf0Aye22LZuiCID28rF0js8RgLr14OLWe9N7Bdu2bc5JKWKmC/D/A+eS08C55DRwLjkNnEtOA+eS08C55DRwLjkNnEtOA+eS08C55DQgZ7oAf4URJH6wT/BIIxg10CwZSc3Cm19IXr6LrO95i23pmAmNRNzARAaHE4eq4BBB+L5r2AaWnkCLGxi2hKSqOBwysvCO158CZ0CygRkLEdpdY3Nxno21TQKhOAdRA81MSvYVV1BcXU9VeTGluW48LunrgtuRXcLrs6yt7rNv56OUN1JWWURpFijfZ804QAusMje/T8DIIae2joryXAqVn61kHYLTzL98yvPHL3k9tclqyMZUVFSnA1UwsBMxNENG8FXjv3iNKz099FypoSkn2dJZh0vsDvyel48mmTCbyb7npcdXRIH7HZK1TSLzj+n93TTD8Trqfu3jfmEueUrq2s4MStbQdidY6f2CLz55xMORXbaEPJz+MgrzfRTnusmWY5ihPQLrS2ws9TKwssb6dpCD+MfYtxqpzxZwJHaJrAyy8Oolg2aC/KpfUnsNjHcN4OqHaNvTzA2+4nUsgd75EZd0sFJ4pxmSrEN8npWXn/H5v37BF+Mm0cr7XL13ixtXaqnMVshxSMiCia3HiAZGWRx4zKOvBhl89Z98lhCxXQX889UC6hQJUQBsC9u2eev2xwbJbdsmOZSe+uH0zEiOHxCbf8nYk6c8Hg6x679N99//C3//cSc3KmRc3359cy1N1cXk2zGETwZ5OPiYJ+UXqau4So7Tie1w4nS6UA0Vhywi/dBDTBARJAVFVVEtB4okJr+kFJIRyVZog63BPsbGt1lztlBz92/55d920lnyPYIB8OGoukXXx1vEQ3tsfLrI8sgLBq9WUVYlItoisgiCKCBIMpICivSOiysyiiwiCik2+w0yECfrxEIbLM8ssrArkPC3UN/UxKVSmdwfum/BjbuxhaYrjVwoiCFtTbM4F2Bpy0Q3QBIFBEFCcjhxOMH5rs9xqTgdMrIkJGt7GibfMlCTo0SPtlnfCrNv+sgqqaKswEfBcd7qzMdTXUt5SR85+/scrO2xnW9TYoKsSljhffZmexl9lCCrGHyKjmmCZQOSgmgbSOFRNgfWWN7TMFUBQUp9jU6zZBs4QteCBMM6CTsXV3YuniwXjmO9PwvZl0e214Ubjb1QkKOwjI2A4pQxQiusP/5f7E3+nl4HKKLF19PEggi2jWAGie0fsrEJriYRWU4+OFOpOgM1OY5paSR0GwsHqqoiy8cthgSKA1mWkbEw9TiGkYwSBABBQBBEJElGlGwUUcC0SYoWJAQsZCTikogopjJo+2syIFlBFBVkWUDExDQNTNM6ZtNoYBtxdMNAtxUkRUGWJbAtjLiF7Cmn4sY/ceV2F1eKLPIVg4T5JgYWHYi2jhoZZ23oKf/52QLzpoVlJGt7KpvmNEsWgGwUNYdsj4QiRAiHQ0RjcSxcvCsg+AsahA45OooRIQvF48PtAWFPwNRNRNWHr6qDC9136KmyyVdMTOuNQEFGwEA6VFiOz9H/fI3FmI1lHfcLPjkZiC68uLzFVJTlkO8IE9lYYH1rj53jvDW6Q3BhifWtGGFHPnllhfiLspAlAdOyAAFBUJBkcDgEEGUkWU42LxJIkgyyjCIJX8fG6VjZkwHJIm5fGbUN1dTm6Qgbo0xPLzC8DUc/+D6D+OosswPTzG7JGPm11NQXUlMi45DBNP/S2xOANIbBP0pGxpMlbynFHdfpaCml1phk9flnfPLpS57NHrAdh8S33xDf5nD+Ib2f/pHPnq2wINbgv3SdzsYCanwWDtHGsABsbNvCssA033Fxy8KybNK5OC0z3WpHPmr9TVpvrnN79ff8fuIpA/8hIATvcnC9nbqyPKryneTKBnZ0i82pPsZ6v+LLL/oZ2MlF7bzN1bvddJRlU7AbJ2Aa6IaBYZqYPyrQBtvCMk1M08L6xnhHqsiMZEECtZryy7/ggWagu/t4NvOKqc8WWesvJi/PR5HPiUc2sKP77G+ssLm1T0CvJPfqHbr/9iN+2ZFHhRukuIYRDRENBTkyj1A1g4T1A22tbWAlosSOwoSjEaJxE+PnFV18EwW1pIOLv8hGLajA/+gZfSPzzC0sMzdtM42AZQtgCwhqDtmlHTRcuk33zR5utlfQkJdsew0lG9V/gbLmGA3mBXwlXvJU3h2pSB6U3ErKGw65qFVTWeDGK6W23RQyv3TWwj7aYHt5gZWVVTa3dtkPRTgIx4kYMoIzG19hCf6yCsqraqgoL6bU+xeJVniT0MYc62sH7Nl5OMoaKa0opORdMyOJXWKBVeYWD9gxfeRU11FelkNBCgftz4Dkb6NhxyKEjxJETRnB6cWT7STrJzzlewYl//z4CdePnw5nYLb6u9i2zdraKqHDIIVFhRT5/aR2nCy1nMmabJoGfS96+c3//T8MDQ2SSOiZLtIHcSYlW5bFzNQ0z54+ZXF+AcMwMl2kD+JMSoakaNNIDoOmtQ+cAs6sZEVRUJ3O5ID+WRrtOQFnVvLPiXPJaeBccho4l5wGziWngXPJaeBccho4l5wGziWngXPJaeBccho4l5wGziWngXPJaeBccho4l5wGziWngTMvWRRFRPHMF/MHOZOlF95MNwkISJL0HntKziZnUrLyZvONYers7e1xcHCQ6SJ9EGdSciQaAcFGN3Tm5mYZGxkmHAplulgn5kz9Dg8ODpiZnmJyYpzpqSlkWSYQ2OKzTz9hfn6epuZmGhsvUlBYmOmivhdnYsFhIh5nd3eXkeFhHj38isnJcRRFoaSkFEEU2dkJEItGqamp5e69+1y+3IW/uBiHw/GTWC6Qccmrq6u8ftnHyNAQa2tr6IZOQX4BLW1t1NTUYtkWqysrTE1Nsr62hixJlJVXcLnrCle6u6morMxk8Y9FRpqLRCLB/v4eKyvLjA6P8PpVHxvr6/hycujuvsat23e42NyMy5XMGaBpGvNzszx++JCXfS8YHhpkb3eX3d0dLnVeorKymrz8fBRFycTt/Chpr8mmZTE5Mc6zJ0/of/WSg8MD8vLyaG5u4WJzC/X19ZRXVKKq6l+9T9d11lZXmZ+fY3J8nInxMbYD2+Tl5XHt+g1u3b5DU3MzZ3H1Z9okh8NhFhfmmZqaZHJigpWlJaKxKKWlZVy5epWbN29TWVV1rM9aW1vl6ePH9L3oZX19DV+2j8rqappbWmhouEhtXR1ZWd+XeyszpFyyZVkcHh4yOjLMk8ePGOzvRzcMmpqauHb9Bs2trfj9fny+nGP37CzLIhg8JLC9zdjoKK9e9jExPo7icHD5chf3Hjygta0Nrzf7TPQWUyp5e3ubgf5XjAwNsbS0SCKRwOVyUVtbz6XLl+m8fJnc3LwPusbB/j5DgwP0v37N3Pwc0UgUX7aX2voLXLp0iY7Oy+Tlfdg1PpRTl2wYBqFgkM3NTcZGR+h9/pS52VncbjfXrvfQc+sWTc3NeL3ZSNKPb1k/DqZpEgoFGRsd5fGjRwwPDKAbOhcaGrjRc5OWtjaK/cV4s7O/7rKnk1OXPDM9xdMnjxnsH2B3d4fsbC/VNbU0NTXT2NREdU3t11HDaROJRFiYn2d6coLJiQnm5mZJJBJUVFRyvaeHazduUFZWnpJr/xCnIjkajbC2usbs7AyT42NMjI8TDAYpKvJzvSdZey9caDiN8h4L0zCYnJzg4VdfMdTfTygcwl9cTOPFJlpaW6mrq6e0rCxtA08fLDkcDjM+OsLjx48YfN2PpmlUVlVx5epVWlrbKK+oIC8vL+0jaYlEgr3dXVaWlxkdGeb1q5esr62RX1jArVt3uHn7NhcaGtNSrhNL3t/bY3xsjKGhQebnZjk42EdVVCqrq+m83MWVq934/cWnXd4Tsby0xMsXvQwODrKxsYYiKxQWFdLU1EJbezvNLa04vhWXnybvJdmyLDRNI7C9zfDgIC9e9DI+OoKiKLRfusTde/dpamklNzc3Oa5wRrBtm0Q8znYgwGD/a549fcLkxDhul4vOrivcunOXxsaLZPt83+kEnQbHlmzbNjs7AQb7+3n29AmL8/OoLhelJaU0XrzIxaZmGpsu4vF4T61w0Tf5gbKU04t1d3YCTE9OMTY2wszUFDuBHZxuJy2t7dy6fZuOS5dQlNOtIMdukHRdZ3Z6mkcPv2JocACv18uNW7e4d/8BjRebPigci+gWgZhJKGFzpFtEdYuDuMWRbmHZ4FFEclSBLEXCowh4HSL5Tolc9f3lFxYWUVhYxKXLnQy87ufxo4c8ffKIjfUNVFWlsqqKgoLCU+3EHFtyPB5ndnaGrc1NLjQ0cqPnJteuX6e8ouKDBQ/sxOnbirMYNtiImOzETBKGjSi+SVyKgCJCjipR7pGo8Mp0FqhcK1YpcJ7s2h6Pl86uLkrLyhBFkd5nz1hfWyUQCODz5Zxqs3FsyaZpsr+/j2maNDQ2cr3nJtXV1Se+sG3D6H6CZxsaQ7tx9rRknjYJmwKniFsWyVIEbCBm2ESNZO63A80iEEswd2gweZDgZomTzkIV5wkyFXq9XrxeLx2XOpmenETXdaKRCOY7c+ucjGNLFgBRlJAVBYfD8UFj5VHdYvpQ5z8WIzxc18CG9gKVljyF2myZApdErirhlJMXiZs2h3GLA81iOawzspdgbC/BXDDB2pGJbtp0Fqp4HOKJx+CcLieq6kzJWMd7BYnfnJ63LAvTNN+7qdiOmjzdiPHpcpTZQx2/W6bbr9LtV6nyypS4JVzyd2+0ygu6ZVMflanzKdRly/RtxxkIxNmKGPyiysUvKtyUe94/7rVtC1EUkSQpJd3uE0Xif0nw/H4cJiwer8f47XyU2WCCxhyFf67zcLfMSYHrx78sRRQo98iUe2Ta8x005Cj860KUwZ04v52PYtnwyyo35Vnvd1tv7ydVY2Vp64bFDIuhnTj/uRhlIaRzv9zFP9Rk0ZyrkH8Mwd8mWxW5WuzEq0pUe2U+W47y2/kIPofE31VLuOWzM3ifNslDuwn+bT7KYkino1DlX+o9dPs/7Ame7RC55lcpdEnsaSZPNzX+tBqjyCXSU+JESXWK72OScsk2yXb4y9UYL7Y0LuYq/LcLWTTnnd58XKVH5u+r3ZiWzcBOgs+XRep8MuWeszHnl/Jpg62IyZ9XYwztJMhVRe6WubjmV0+1FyeLcLlQ5VaJE9u2Gd1LMBc0iL3ziIb0knLJiyGdT5ejhBMWv6xyc6vUiecUBb/F4xBpzHVQ51MwLJuZQ52d2OnGuycl5ZIDMZOpgwSqLHCzxEm1N3UtVK4zKTpHFdmImGxFzTORjySlknXL5lAziVs2+U6RmmwZRwpzyDslkTqfQoFTYif6RnLKrnZ8UibZBg7jFsGEhVcRKXBKqCkOq5yyQIlbJksRCMQMdmMG1hmoyimTrFs2mxGDw4RFoVOi2C2n/GwPhyhQ7pFQJYGVsMlGxPyZSzZtAjGTiG6Tq4rku04+rnBcZBGK3CIOSSAQMwloZvL4iwyTMsmmDVHDJmElf8but4enpBiXLOCQBBKWTcKwMX/OkiUBsmQRhyh8PVSZ6vu1gYhhY9nJ3qBHEc/EytqUSXZIIsVuiWyHwJ5msR1LfftoWjabR8lOSLFbwu+SkM+A5ZRJlkUo9Uj4HCKBqMlmJPUxa9y0WY+YRHWLYpdEkVtCyvxSuNRJFkhOF/kcIjHTYlczOdJTa1kzbTaOTI50i0KXRKFLIj1Pgh8mpd+zAPhUEacsEIybLIV14il8EmmmzXJY5yBuke+UKHBJP+82+S1lHpmuIhXdgi9XY8wepi6D7G7MYvJAJ5SwqPLKFLulM1CP0yC51ifzq0o3PofIl6sxnmxohFPQbBzpFlMHOoshA0UUaMxT8LtPZ9Xoh5JyyXmqRE+Jk26/imHZ/Hktyp9Xo0T10z1FrHczzh9XokgCdBU5qPXJqGk4a+84pOXZW+CSeFDm4n65i92YxW/nI7wMxEmcQvusWzYT+wl+vxRhfD9OR4HK31S4yVXPRi2GNE0/CUBTnoOEbbEdMXm9E+d/TITZiZk8KHeRf8IFKjHD5vF6jE+Wo7zY0qjwynxU4aKtwIHjjEw9wQklC4Lw3lPnbkWgo0DlV9UWmmUze6jz2/kI4YRFZ6GK3y2RoyYXtfwQb9dg7MRMJg8S/HElxuh+gkqvzD/WZNHtV997UuDt/aRqFf4HSX5v0bLI7VInPofIV+sxXm7H+e/jYSq8Ma4XO+kuctCW78D3jp+6ZtiM7yd4FYjTtx1n7jCBJML1IpUHFS66/U78J5j5fkvGlwTYto1h6MQ1DU3TAOFEq20KXRIflTspdCc7Kr1bGruayYstjaWQTu+mRqEreWae8ObsUstODvQcaBZrRwZrEZNdzcTrEOkqUvl1pZuuIvXkEwICRKNRYrHYqS/RgveQLIoiqpqcqAxsb7O6skJhYeHJ9ssJAk25Cn6XlwflLsb34wzsJJjY13myoWHZIAkCkvjmfCfLxrCT/5/vTM5+3Cl105bvoNankOeUTiTYtm3i8TiB7W1C4TD+YgtZlhFPuT0/tmSH6qCuvp75uVkmJyc4PDxkY32Nq1evUVNX994XVkQBv1vC706u0izNUqjNTrAcNgjGLUybryWbb45z8yoilV6ZxhyF9gIHVd6TT/lrcY3RkRGGBwb46s9/wjB0SkvLKCgsRJZPdynBsSWrqkpraxsH+3uEwyFmZ2bQYjGCB4dcutJFVWUVObm5J1pyWuSSeFDu4m6ZSkS3CSVsdIuvmwubZKzpUcDrEJHF5FH2JyFydMTe/h4z09O8eP6M4eFhYrEo7e0dXO7qwu8vPvV9JO+1nUHXdba2NpmbnWVsdJT52Rk2NzfxeDy0d3Rw++592trbz+xG8lAwxKuXL3j+/Bkz01NYlk1ZWRltbe20trdTVZXcCH/anHhjzvbWNn0vnvP40UOWlxZxudzUX2igqbmZCw0NVFZVZ3wn6Fu2t7eT+7onJxkbGWF9Yw1JlGhtb+fW7Ttc7rqC2+1O2fU/aIvZwcEB21tbTE1NMDw4yMTYOAk9QUNjI/c/+pjLXV0UFflPs7zvzdraGn29vTx+9BWLCwt4vF66urq4dLmLCw0N5OcXpHyz+6lsloxEjhgdHqbvxQump6cIBYP4cnKoqKykvb2D1rb2Y2cAOC3mZmcZHhpkbGyUjfV14ok4uTm5tLa1cfXadZpbWk9t2/GPcWrbfg3DIBwOMz83x/NnT+l/9ZLdvV0qK6u5fv06l7u7qayoJCsrCzlFbbauJ4gcRVhYXOBVXx/Pnz0lENimoryCm3fu0N19lZraWhwONW2CIQV7q3VdT+5vnppkYmKchfkFjsIhcvNy6bzcxbXrPbS0tp76tgHDMBgZHqb3+VNGR0Y4OjrC682m/kI9La2tNDe3pv3X9JaUpmJYWVnmyePH9D1/xtrqKrl5eVxobKS9vYO6+guUlpXh9X7Yvr9wKMTGxgYz09MMDw0yNTVBLBqjrr6enlu3uXGjB39xZnfGplSybdsEAgG2NjeYmphgaGiImelJRFGkrb2Du/cecKmzE19Ozok+Pxg8ZKC/nyePHjI6MgI2XGi8QGdXN01NTZSWlqUkJHtf0pYeJxgM8vrVS/p6nzM/N4tpWuTlF1BTW0tLawvNzS0Ul5Qe67MC29uMj48xPjrC7OwswcNDZFmmobGRa9dv0HWlG88H/kJOk7QmetI0jXAoxMzMNH29vbx61UcoGKK2rpY7d+/R2XWF0pJSVKfzOw+mt/u6Nzc3GRro58njh8xOz5Dl9XDt2g1u9NyksbERT3Z2SvZHfwgZyQuXiMeZnp5mZGSI6Tf53izLorCwiLaODrq7r3Gxqemv3rMwP09fby+DgwMEtjZRHA78/mKaWppp77hEY+PFlO70/xAymnzPNE2WFhd4+uQxL573srm5QX5BPm1tHbR1dFBaWoooiuzt7jLyJn9cYHubIr+fW7fv0HPrNvUXLpyJZE4/RMYzHFqWxebGBktLS0xNjDM+Mcbq8iqGaZDj8+F2u0noCY7CEfLy82lrb6O5uZXaujpKSkvTGu+elIxL/ia7Ozu8etnH82fP+NMf/8D6+hpFRUU0NF6kpraOrivd3OjpobikJNNFfS/OVNbZgsJCbt+9R2NTE5oW4w9ffE5tbT3/+E//xOWubvx+/5mKGo7LmZIM4PF48Hg8lJWVU5BfSEtrGzdv3aGsPP1ZsE6LM/nEMAydRCKB0+mkuKTkTHQoPoQzKdmyLGzbRhAEZFn+STzcfogzKfktyRly4/wE9nN+nHPJaeBccho4l5wGziWngXPJaeBccho4l5wGziWngXPJaeBccho4l5wGziWngXPJaeBccho4s5Jt++TZbc8aZ1ZyIqERi0UxTSMjRwmdJmdSsiCKeLxe8gry8WZ7keWf9vTTmZutBlBkhZu3br/ZNNN26kdSpJsztbgFLDAS6LpB6ChKPGHgcntwZ2fjkN51ZuSbdjv5B95uSX7nNd689s3ewB9//YdzhmqygXW4zv72FruHUYJxm7jtBEcW2YXF+Mv8FLu+K9rWYySODjk60tBsJ6I3lyyPC48M37ux1NIwokccBjVilorq8+HxqLjE1B38mXnJVpCjzSWWZ6aYmZ5jZWOfg5hJ1ATLFhFEBdVXRH5lA9V1DTTUllNRnEX2m2baCq2zP/WSqYkN1u1ynE03aGippjEH1O+zltghujrOUP8Gy7off+cVWi4WU+FMnYzMSrYPiK28ZvBPf+RPXw0wsBRm18rC4fWS63PhEeNYkUMODqNExAI8Nde4dPdjPr7XzrUaD26A0Ar7I1/Q/+kwg2YnOYkapIpqanzwvQtp41tEFp/z6vMR+rQmmj015NUWU+ZM3W1mUPI+B7PPGP78d/z+D6MM7LiQyju52FBDWb6H4mwnWVIcK3LA3uoki7MLTE1+wZODQ4IxHePverhWrpBtR9D3V9hZnGbFzCeyGyGUgHfu9Tej6KEtAiuLLMVyyD3UiJikNPtiZiTbUeyDMWaffs7nn7zixW4xOT3/yMe/vsu9K5WUu0XcYjK+tG0dY3+SlcEv+dO/f8aXQ4/p+9yNnFtO3t/U0KGoSKobp8uN03TiVCTkH2pfBQlRVnE4XbhsFVU5+T7t45IZyZEdghPPGX0xzMBWFnL7XW7+l1/zcXclLdnfFuQCdxctHg9K5BAz/CW/nXnFyPNW+ht95Oc5MCQZRZGRBQlRTEYK7+6/CCCIiJKEJImIKY4sICOdERs9uM7a8DATC0fs53bSePseH/dU0vAdwW+RIaeFhlsPuH+3gRZPgOjMa8Zmt5jbh4QpIAsgCBKS6kJ1g/tdd5blwu1UkklLUneTf0UGJMeJhjdZXtpi/ciFWNJAdWU5dS740S5HSRVlrQ3U+MEdXGVzYZfVTR3dAEkWAAtT14jHIGJCsqW1/xITA0RjRDUD3Ux9Fty3ZKC5OCIW2WFrN0rI8pFVVEZRjpfs47xV8uEsrcBf6Ma3GiK0vcfejkidLaA4ZYydddZf/IY/x4ZZzwGPbGJaycEmRAnBNhFji+zPjjO8HkEvEJHkNCTPTvHnfwsbiGLqR0RjJiZOnO4snE7HMW9URXR5cLmcqIJOMHaEFlOwAdkhYUYDBEb+wP7yM0YlkIVv1tZkehLRiqIdaRwcKOQUiYiS+HXyklSRgZpsYNkGpgk2ErIiI4rHrU0iSMmT1ATbxjZNLEvCti1sE0TVh6+shdL6SiqyLLIkE8N6E56JCoJt4Ehssbe2xPjEEZplY1vf6JKniAxIdiMrbpyqgEScuKaR0A3e0XX4FgnQImhaHM12IbncqE4JDm10zUD2lFF2/b9y/1c3uVdqU+AwSJhgAYgKoq2jhvpZ6v2M/xkcY9CysAwr5W1zmiULgA+Hs4D8XCduKcL2wQ7BUASNLH40d4oVxtjd5SAYIyLl48rNJdtnIQYELMtCkFSc2cXkl5ZRWQPZ3/dYP1zHmM0i2ykiRG0sO/UPwAxEFy7c2SXUVBdQ7AwRXZlkYWWb5eNk/A1uEpiYZnFNI+Qsxl9VRHmJC0UWMM23CVYFBBHeuX9SFL5/4CiFZGTQ3ukro6q5mcZyFe/eGLMjw/ROHbGaeFfbaIO5w/boEP0v55gN+nBUtnCxoZDaIgGHBIYJ9tv/LLDeldTWStbedB6lkxHJQlYJee236exqoM21wl7vv/O7//0Jn/cuMLEPh3/1ahv2J1h89m98/ptP+N3LPTZ8rdTeuEVXfT6VLgNFsDDsN6Gabb+ZH3zHxd/+e8rv8i9kplste5HKumjs2eKj7UPCzxaZe/ZvfBlZZ2ellZrSfKoKnOQqBvbRJpvTr5no7+N5f4BVVwu1tz/i/q0WmgoVvKsx7HgMLRpFMzXi+jciiu/DNrGNBAlNQ9MSJAwr5WeRZHAUroD85vvclByIuY941DfDzMBv+MPAJyguFx63A1W0sOMRIuEIMcuFXHKb9isPuPPgOrfrFQplsA0Ty0z+NU0L0/rxB5ltW29eb36dPTGVZFCygOSpoqjLwz1vEXnFL3g9NMXM6i77kSjR0BFRSwTJibPgItXVTTR03qDryiU66zzkvym5kVWGr/k+Hb+qwGU14G31U+MFx7sebo5Csiq76fwoFzVRRXVtHsWO1LabZ2OOz4gQCx0SOtwnHDwgFDpiP6hxZEgI7hxy8osoLMglL8eH1+vim4f52nqExFGISERDw4mUlYPb4yJLeYe4N9NPwZBGzFZRs7PxZKk4Uzj9dDYkfwcDK55AMyUEZ3L+7afMGZX88+InXkd+GpxLTgPnktPA/wMQ1OYAGH62YQAAAABJRU5ErkJggg==)
- I < II < III < IV
- I < II < IV < III
- IV < I < II < III
- IV < II < I < III
The correct answer is: I < II < III < IV
Related Questions to study
maths-
Number of rectangles in fig. shown which are not squares is
![](data:image/png;base64,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)
Number of rectangles in fig. shown which are not squares is
![](data:image/png;base64,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)
maths-General
maths-
Digit at unit place of sum (1!)2 +(2!)2 +(3!)2 ……… +(2008!)2 is
Digit at unit place of sum (1!)2 +(2!)2 +(3!)2 ……… +(2008!)2 is
maths-General
maths-
A person writes letters to 6 friends and addresses the corresponding envelopes. In how many ways can the letters be placed in the envelopes so that at least 4 of them are in wrong envelopes ?
A person writes letters to 6 friends and addresses the corresponding envelopes. In how many ways can the letters be placed in the envelopes so that at least 4 of them are in wrong envelopes ?
maths-General
maths-
The total numbers of integral solutions for (x,y,z) such that xyz = 24 is
The total numbers of integral solutions for (x,y,z) such that xyz = 24 is
maths-General
maths-
Number of ways in which 5 different toys can be distributed among 5 children if exactly one child do not get any toy
Number of ways in which 5 different toys can be distributed among 5 children if exactly one child do not get any toy
maths-General
maths-
A seven digit number is in form of abcdefg (g, f, e, etc. are digits at units, tens, hundred place etc.) where a < b < c < d > e > f > g. The number of such numbers are
A seven digit number is in form of abcdefg (g, f, e, etc. are digits at units, tens, hundred place etc.) where a < b < c < d > e > f > g. The number of such numbers are
maths-General
maths-
Number of ways in which 25 identical balls can be distributed among Ram, Shyam, Sunder and Ghanshyam such that atleast 1, 2, 3, and 4 balls are given to Ram, Shyam, Sunder and Ghanshyam respectively, is-
Number of ways in which 25 identical balls can be distributed among Ram, Shyam, Sunder and Ghanshyam such that atleast 1, 2, 3, and 4 balls are given to Ram, Shyam, Sunder and Ghanshyam respectively, is-
maths-General
maths-
One hundred identical marbles are to be distributed to three children so that each gets atlest 20 and no two get equal number. The number of ways of doing this is -
One hundred identical marbles are to be distributed to three children so that each gets atlest 20 and no two get equal number. The number of ways of doing this is -
maths-General
maths-
The number of five-digit telephone numbers having at least one of their digits repeated is
The number of five-digit telephone numbers having at least one of their digits repeated is
maths-General
maths-
The maximum value of P such that 3P divides 99 × 97 × 95 × .... × 51 is-
The maximum value of P such that 3P divides 99 × 97 × 95 × .... × 51 is-
maths-General
maths-
If
for
, then ![f to the power of straight prime left parenthesis 0 right parenthesis equals](data:image/png;base64,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)
If
for
, then ![f to the power of straight prime left parenthesis 0 right parenthesis equals](data:image/png;base64,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)
maths-General
maths-
The largest value of r satisfying inequality 20Cr
20Cr – 1 is -
The largest value of r satisfying inequality 20Cr
20Cr – 1 is -
maths-General
maths-
A double decker bus can accommodate (u +
) passengers, u in the upper deck and
in the lower deck. The number of ways in which the (u +
) passengers can be distributed in the two decks, if r (
) particular passengers refuse to go in the upper deck and S(
u) refuse to sit in the lower deck, is -
A double decker bus can accommodate (u +
) passengers, u in the upper deck and
in the lower deck. The number of ways in which the (u +
) passengers can be distributed in the two decks, if r (
) particular passengers refuse to go in the upper deck and S(
u) refuse to sit in the lower deck, is -
maths-General
maths-
Domain of f(x) = log10(log10(1 + x3)) is -
Domain of f(x) = log10(log10(1 + x3)) is -
maths-General
chemistry-
The correct orders about compounds I and II are:
i) ![](data:image/png;base64,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)
ii) 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)
The correct orders about compounds I and II are:
i) ![](data:image/png;base64,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)
ii) 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)
chemistry-General