Chemistry-
General
Easy
Question
IUPAC name of
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402212/1/884014/Picture10.png)
- 2-Methoxy-4-ethoxy-3-pentanone
- 2-Ethoxy-4-methoxy-3-pentanone
- 2,4-Dimethoxy hexanone
- 2-Ethoxy-3-methoxy-3-pentanone
The correct answer is: 2-Ethoxy-4-methoxy-3-pentanone
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There is a rectangular sheet of dimension
×
, (where
. It has been divided into square of unit area by drawing lines perpendicular to the sides. Find number of rectangles having sides of odd unit length
![](data:image/png;base64,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)
There is a rectangular sheet of dimension
×
, (where
. It has been divided into square of unit area by drawing lines perpendicular to the sides. Find number of rectangles having sides of odd unit length
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQgAAACbCAYAAACecwWmAAAUB0lEQVR4nO3de0xUZ94H8O8MtxkuIyII4aKI1Eu3a8EK3baiga5dVlbWNnbXZtdebJM1G+OatHbXbNtYbdMmvWTTbHaNJVtN3Ky7ukar8VJwvbRFwkUEq6U6DCwqMMxwmYFh7ue8f/gOb33LQWbOgxTn+0lIdIbzO79Dy9czz3meczSyLMsgIhqFdrIbIKLvLwYEESliQBCRIgYEESliQBCRIgYEESliQBCRIgYEESliQBCRIgYEESliQBCRosjJboAmjyRJkCQJsixDlmVoNBpotVpotVpoNJrJbk9RoO9ArzRx+NMNU263G8ePH8fvfvc7FBYWIjc3F8uWLcPbb78Nk8k02e0p8vv9qK6uxrp16/Cf//xnstu55/EMIgxZrVYcOnQIf/7zn7FixQq8/vrrkCQJlZWVOHDgAKxWKz766KPJbvM2LpcLRqMR//rXv3D8+HG0trbiySefnOy27nkMiDDk8XjQ2dkJAFixYgUeffRRaLVaSJKEK1euoLa2dpI7vJ3X64XRaERVVRWys7Mxb948mEwm+P3+yW7tnseACEPx8fEoKirCrFmzUFBQgPj4eADA7NmzMWvWLDQ3N498b3t7O7744gtYrVbk5eVh3rx5OHToEOx2OwwGA8rLyxEREYG6ujpcvnwZiYmJKCkpQW5uLiIiIoT0q9FoEBsbi7lz5yIvLw9DQ0P4/PPPhdSmsTEgwpDBYEBxcfF3Xnc4HPB4PJgzZ87Ia3a7HWfOnEFTUxOuXbuGhx9+GDU1Nbhx4waMRiOio6Mxbdo01NfXo7a2Fn19ffB4PNiwYYOwgIiMjEROTg5ycnLg8Xg4MHkX8SdNAACbzYbLly9jcHAQv/jFL0ZeX7RoEUpLS7FkyRLcvHkTDQ0N2LFjB7Zv3w5ZlnH48GFcvHgRpaWl2L59O9LT01FbWwufzzeJR0OiMCAIfr8fp0+fRn19PR544AGsWrXqtvevXbuGqqoqxMXFYevWrUhNTYUkSQCA6OholJWVobi4GLIsIyoqCllZWaP+K+/z+WC32xW/HA7HXTleGj9+xCDU1dXh1KlTyMnJwW9+8xsYDIbb3m9paUF2djbWrFmDmTNnYmhoCBcuXIDL5cKzzz6LgoICAMDw8DDsdjvy8/NH/Xhx7tw5rF27VrGPwsJCHD16VOzBkSoMiDB3/vx57Nu3D7m5ufjZz36GlJSU2yZJGY1GWK1W5ObmIj8/H1qtFn6/H9evX0dJSQmys7MRFRWFoaEh3LhxAzabDQ888MCoAbF48WJ8+umnir0kJCRMyDFS6BgQYcrv96OzsxMff/wxcnNzUVJSgtmzZ8NqtaK5uRnZ2dnIyclBV1cXHA4HUlJSkJaWBuDWJKv6+noUFhaOXAGxWq0wm81ISkpCdnb2qB8xEhMT8aMf/eiuHiepwzGIMCRJEvr6+lBRUYH4+HgUFxdj3rx5AICOjg6cOnUKFosFkiShvb0dOp0OaWlp0Ol08Pl8sFqtuHLlCrKyshAXFwcAMJvN6O7uRkZGBuLi4iZ0qrbb7YYsy/B4PPB6vRO2H+IZRFgaHh7GhQsX8Mknn6C8vBxNTU0wGo3wer345ptv0NTUhPLycgDA5cuXkZSUhMzMTACA0+mEyWRCX18fFixYMDJe0d7ejosXLyIxMRENDQ3Iy8sTdpkTuHWV5erVq+js7ERdXR0cDgeqq6uRkJCAuXPnIicnhx9RJgADIgy5XC50dHRgzpw5aGxsRGNj423vp6enIyEhARqNBpGRkXjwwQeRk5MD4NaVCI/Hg0ceeQQLFy5EbGwsgFuzHQOLqM6fP684DhGq/v5+fPHFF2hubkZnZycWLlwIo9EIp9OJoqIiJCcnMyAmgIZP1iIiJRyDICJFDAgiUsSAICJFDAgiUhS2VzEuXLiAhoaGyW6D6K548sknkZycHPR2YRsQR44cwc6dO3H//fcLq9nd3Y24uDhhl9t8Ph9u3LiBjIwMREVFqa43MDAAr9eLlJQUAd3RVODz+XD+/Hnk5+czIIL1k5/8BLt37xZSS5Zl7Ny5E4sXL8bDDz8spGZ/fz/eeecdbNmyRfUvtSzLqKqqQk9PD371q18J6Y++/2w228gcllBwDEIQl8uFTz/9FC0tLULqSZKE3t5eVFRUwGazqa7n9XpRW1uL06dPC+iOwgUDQpDAnY5E3e1IkiR4PB5ERUUJWdfg9Xohy7LQ2Y1072NACOJyuRAZGYnISDGf2iRJgtvthk6nExYQAISMZVD4YEAI4na7ERkZKexf6MAZhMiAkGUZ0dHRArqjcMGAEGQiAsLtdiMmJoZnEDRpGBCCTOQZhIhxDQYEhYIBIchU+IgBMCAoOAwIQQKDlKICwu/3C/+IEbjrNNF4MSAECZxBiLqKEbilml6vF3oGwUFKCkZYz6RsbW3F+++/j5MnT6qu1dfXB7PZjLq6Orz33nuq63m9XvT29sJsNuOZZ55BTEyMqnqDg4OwWCyIiIgQcrw0Nfh8PgwODoa8fVgHRGJiIgoKCoSsnWhsbITRaEReXh7uu+8+1fXsdjuamprQ1taGVatWfedZFcFqbW1FS0sLDAYDioqKVPdHU4PT6URdXV3I24d1QMyYMQPLly/H8uXLVdf65z//ibi4OPz85z8X8gsYWPil1+vx7LPPIjU1VVW9zz//HHFxccjIyMBLL72kuj+aGmw2G3bs2BHy9hyDEMTtdiMiIoJXMeiewoAQZKIuc/IqBk0mBoQgoq9iBAJC5FUMjUbDgKCgMCAEkGV5QudBiJhJ6fF4eAZBQWNACOLxeIQGRGAehKgxCJ/PB4DzICg4DAhBRJ9BiF7u7fF4AHCQkoLDgBBkKqzF4EcMChYDQpCJGqQUtZoz8BGDAUHBYEAIMhUucwIcg6DgMCAEmagbxoi6zMkxCAoFA0KQ7/sZBD9iUCjCei3G1atXsX37dhw5ckR1LZPJhOrqanz00UdCfgmHh4fR2dmJK1euID4+XvU4RHd3NyRJwr///W/o9XrV/dHU4Pf7YbfbQ94+rANi5syZKC0txfz581XXevfdd7Fs2TIsWrQI8fHxquu1tbVh7969+PWvf42srCzVg58HDhyALMsoLi4O6QlLNDUNDw9j06ZNIW8f1gGRmJiIwsJCFBYWqqojyzIqKirw2GOPYcWKFZg+fbrq3urr63Hs2DGsXLkSCxYsUD24eOnSJWi1WqxevRoZGRmq+6OpwWaz4ZVXXgl5e45BCDKRlzk5D4ImCwNCkO/7RCkOUlIoGBCCiF6LwftB0PcBA0KQiVyLIWo1J8CJUhQcBoQg/IhB9yIGhCCyLAOAkF/mQD1ZloXWA8T1R+GBAUFEihgQRKSIAUFEihgQRKSIAUFEihgQRKQorBdrmUwmfPjhh/jss89U1ZFlGWazGb///e8xY8YMIb319fXBYrGgrKxMyESpr776CjExMaqe00hTDx/eq4LBYEB+fj50Op3qWg0NDXjssccwb948AZ0BRqMRRqMRq1atEjL5ym63Y9q0aVi1apWA7miqcLlcqKmpCXn7OwaE2WyG0WiEyWQaeXx8RkYGHnroIaSnp6t+LH2orFYrvvrqq5F7HIQiOTkZxcXFIW8fIMsy3nvvPZSXl6OkpERVrYCzZ8/iwIED2LBhg5DZjw0NDUhPT8dvf/tbAd3RVGGz2fD222+HvP2YAXHz5k2cPHkSDQ0NGBgYgN1ux+DgIFwuF1avXo21a9ciOzs75J2Hwul0or29HdXV1Th8+DDS09NV/4IT0ejG/HD75ZdfYs+ePbBYLNi4cSP279+P999/H8PDw/jrX/+KlpaWu9UngFu3z2ppacHBgwdRUVGB06dPY2Bg4K72QBROxgwIrVaLBQsWoKysDI888gh0Oh1+8IMf4Omnn4bb7cbw8DCAW6fYPp8PLpcLbrcbsizD6/WO/D2wUEgNSZJgs9mwZ88eLFq0CJs2bcLSpUtV1yUiZWN+xCgrK8Pjjz9+2ziDRqNBfHz8bQNn7e3t2LdvH3bt2oVZs2Zh//79ePPNN3Hq1ClERERg7dq1eP3111U1qtVqkZiYiG3btkGn0+H06dOq6hHRnY0ZEHq9/jt3QPZ4PPjss8+wdOlSzJo1CwCQlpaGZcuWoa2tDYODg9i8eTOKi4uxZMkSHDp0CBcvXkRrayvmzp2rqtlASAT+TEQTK6jfsv7+fhw5cgS9vb0oLy8fGaDU6/UwGAwYHBxEc3Mz8vPzUVJSguLiYmRmZsLhcMDhcEzIARDRxBn3PAi73Y4LFy7gxIkTWLNmDYqKim67e3N/fz+ampqQmZmJ1atXY/bs2Whra4PL5UJsbCxmzpw5at3a2lpUVVUp7jcvLw8rV64M4pCISJRxBYTdbkdjYyPOnj2L7OxsrF+/HklJSSOn+S6XC11dXRgYGMAbb7yBjIwMREZG4r///S+GhoaQkZGBtLS0UWtbLBY0Nzcr7pvPcCCaPHcMCI/Hg+bmZpw4cQKSJOGPf/wjEhIS0NfXh4iICMTGxqK3txdtbW2IjY1FUVHRyKBma2srtFrtmLMLy8rKUFZWJu6IiEiYMQNClmVcv34dR48eRVdXF959910YDAbIsoxDhw5hxowZKCgogMPhQH9/P3Q63chDWSRJwrVr1yBJEnJzc4U3HriFmuhbsxHR/xlzkHJoaAi7d++G0+nE5s2bkZqaClmWMTAwgMbGRvT19QEAenp6YLFYsGTJkpFte3p60NHRgdjY2AmZbRmYY+H1elUtRiEiZWOeQVRXV6OmpgaXLl3CmTNnoNfrIcsy/H4/rl+/PnKZs6urC52dnSgtLR3Z1mQyoa+vD2fOnIHBYMBrr72GlJQU1Q3//e9/R21tLWpqatDS0gKdTodnnnkGP/zhD7Fu3Trk5uaOe33ItWvX8NZbb+Ho0aOq++rq6sLGjRthMBhU1wJujfuYzWYsXbpUyNmRyWRCdHQ0KisrBXRHU8WEPrx34cKF2LJlC6xW66jvP/jgg5g+fToKCgqQlJR025nC3Llz8Yc//AE9PT3IysoS8kBbAFi8eDHS09OxfPlyuFwuaLVa6HQ6zJgxA2lpaUE9+i45ORkrVqxATk6O6r42b96Mp556Cvfff7/qWgDQ0tKCv/zlL9i4caOQ1Zy7du3C9OnT8fTTTwvojqaKwNl/yOQwtW3bNvm5554TUkuSJDk7O1s+deqUkHqyLMtnzpyRs7KyZI/HI6Te+vXr5ddee01ILZo6BgYG5KSkJLmuri6k7TkdkYgUMSCISBEDgogUMSCISBEDgogUMSCISBEDgogUMSCISBEDgogUhfWDczweD6xWK4aGhgBg1DUPSusgvv26/L837bVYLLhx48Ydv388tXt7e+H3+9Hd3T0yfXw8vSi95nQ64XA4YLFYxl0jlL6/z7VFvT5Va4cirAPi66+/xtatW7Fnzx5oNBpotVpoNJpR//ztv4/2fnd3NzZt2gS9Xj+u7UZ7/duvDQ0Nobe3F7/85S9ve+9O2432Z61Wi4aGBsTGxuLmzZujfu9ovd2pbijfe6efY7Dbjef1O9Uaax/B/AzG2g6AYr1g9xHMdmqFdUDMnz8fO3bswMsvvzxyX4lgv4Bb97546qmnsHXrVjz00EO3vS9JEgAEXffSpUv44IMPsGXLFkRERIzUCuwz2H1YLBYkJiaitLQ0qOMKpfexviRJUjwONT+vOx3L3djHt+vejX3caT/JyckoLy+Hy+UK+XckrANCp9MhLS0NqampI699+3+o8bwG3PqPFh0djfvuuw+LFy8e97ZjvabRaBATE4OlS5ciKirqO+8HW+/EiRNITU3FT3/6U1X9jfa+iOOdyH2Md5vJqjdR+4iJiUFiYiLeeusthCqsAyLg26dioZyWyfKtO1pFR0cLeRAwAMTFxY3c5l/Eszn1ej3i4+MV7w1K9yabzabqdgG8ikFEihgQRKSIAUFEihgQRKSIAUFEihgQRKSIAUFEihgQRKQorCdKDQwMoL6+Hu3t7aprORwOnDt3buRpY2pduXIFw8PDOHjwoJDnYrS3t8Nms+HAgQMCuqOpYnh4GB6PJ+TtwzogzGYzjh49isOHD6uuZbPZsHfvXiQkJAjo7NZjD+12O9555x0hi246OjoQFRWF1tZWAd3RVOH3++F0OkPePqwDYv78+di2bRu2bdumqo4sy8jJycGuXbtQUlIipLezZ89i3bp1qKurEzLV+sUXX0R6ejp27NghoDuaKmw2m6onx3EMgogUMSCISBEDgogUMSCISBEDgogUMSCISBEDgogUMSCISBEDgogUMSCISBEDgogUhfVajN7eXpw7dw5Xr15VXWtwcBDHjh2DyWQS0Blw9epVOBwO/O1vfxOymvObb76B2WxGRUWFgO5oqnA6nXC73SFvH9YB0d/fj5qaGhw/flx1LYfDgaqqKjQ0NAjo7NZSdIfDgX/84x9CVnO2trYiJiYGDodDQHc0Vfh8PgZEqHJzc/Hqq6/i1VdfVVUnsJrzww8/FL6as7Kykqs5KWRczUlEE4YBQUSKGBBEpIgBQUSKGBBEpIgBQUSKGBBEpIgBIYhGoxEyoen/1ySaTGE9UUqk559/HpmZmcLqZWZm4oUXXoBWKybDf/zjH2PatGlCalH4COuAqKysxBNPPCGkVkdHByorK6HX64XUczqd6OnpwZdffinkTMJisSAiIgJ/+tOfBHRHU4XP58Pg4GDI22tkWZYF9jNl1NfXo66ubrLbILor1qxZg5SUlKC3C9uAIKI74yAlESliQBCRIgYEESliQBCRIgYEESliQBCRIgYEESliQBCRIgYEESliQBCRIgYEESliQBCRIgYEESliQBCRIgYEESn6H8x2U0dfesC2AAAAAElFTkSuQmCC)
maths-General
chemistry-
IUPAC name of
is
IUPAC name of
is
chemistry-General
chemistry-
Number of primary, secondary, tertiary and neo carbons in the following compound respectively are
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402020/1/883853/Picture6.png)
Number of primary, secondary, tertiary and neo carbons in the following compound respectively are
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402020/1/883853/Picture6.png)
chemistry-General
physics
The compressibility of a substance equals……..
The compressibility of a substance equals……..
physicsGeneral
chemistry-
A & B respectively are
A & B respectively are
chemistry-General
chemistry-
1.68 mg of an organic compound (A) with molecular formula
on Zeisel estimation produces an yellow precipitate of wt 4.7 mg the compound (A) is
1.68 mg of an organic compound (A) with molecular formula
on Zeisel estimation produces an yellow precipitate of wt 4.7 mg the compound (A) is
chemistry-General
chemistry-
Which of the following ether cannot be prepared by Williamson’s synthesis
Which of the following ether cannot be prepared by Williamson’s synthesis
chemistry-General
chemistry-
Ethoxy benzene is called PHENETOLE
How many more ethers can be drawn for the same formula ?
Ethoxy benzene is called PHENETOLE
How many more ethers can be drawn for the same formula ?
chemistry-General