Chemistry-
General
Easy
Question
Shows which type of isomerism
and ![](data:image/png;base64,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)
- fucntional group isomerism
- Ring chain isomerism
- Metamerism
- Geometrical isomerism
The correct answer is: Geometrical isomerism
Related Questions to study
chemistry-
The two compounds shown below are –
![](data:image/png;base64,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)
The two compounds shown below are –
![](data:image/png;base64,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)
chemistry-General
chemistry-
The compound whose stereo- chemical formula is written below exhibits ‘x’ geometrical isomers and ‘y’ optical isomers :
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485170/1/890769/Picture144.png)
The value of x and y are :
The compound whose stereo- chemical formula is written below exhibits ‘x’ geometrical isomers and ‘y’ optical isomers :
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485170/1/890769/Picture144.png)
The value of x and y are :
chemistry-General
chemistry-
The correct statements about the compounds a, b and c is/are
![](data:image/png;base64,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)
The correct statements about the compounds a, b and c is/are
![](data:image/png;base64,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)
chemistry-General
chemistry-
The absolute configuration of the following compound is :
![](data:image/png;base64,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)
The absolute configuration of the following compound is :
![](data:image/png;base64,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)
chemistry-General
chemistry-
The name of the compound is
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMkAAACLCAYAAADLVr1iAAAF/UlEQVR4nO3dIWwUzRvH8V/f/EUVOYFAnkC0rnVdQdI6qg5ZVDlFUWQVOVWKoQ6SiqvjHDWEVvXclYTkznUdSyCkcgUJK9f1Ff8X0muXm7vb3ZvrzPeTEBIEfULy45nZmd1n4fLy8lIA/uof2wUA846QAAaEBDAgJIABIQEMCAlgQEgAA0ICGBASwICQAAaEBDAgJKhMlmW2SygFIUElsixTEARK09R2KYURElRif39fjUZDtVrNdimF/c92AXBPHMc6OTlRv9+3XUop6CQoXRiGev36tRYXF22XUgpCglIdHR2pVqvp4cOHtkspzQJvJqIsaZoqCAL1ej3du3fPdjmloZOgNK1WS8+fP3cqIBIhQUkGg4GiKNLOzo7tUkpHSFBYlmUKw1Dtdtt2KZUgJCjs7du3Wl9f18rKiu1SKsHGHYVcXFxoc3NT5+fnzjzyvY5OgkKePXumN2/eOBsQiZCggOPjYy0uLjp1JpKH5RamkmWZlpeX1e/3nXvkex2dBFNx9UwkDxccMbEoinR2dqbz83PbpcwEnQQTazabevfune0yZoaQYCKun4nkYeOOsSVJoiAI9OXLF6cf+V5HJ8HYfDgTyUNIMJbj42NJ0qNHjyxXMnsst2Dk05lIHjoJjHw6E8lDSDBSFEUaDAZOvicyLkKCkXzdrF9FSPBXh4eHWllZ0dramu1SrGLjjlxJkmhjY0P9ft+JD8wVQSdBrjAMtbu7631AJEKCHN1uV2maamtry3Ypc4HlFoZkWabV1VWdnp6qXq/bLmcu0EkwZG9vT9vb2wTkCt4nwR+/3xPp9Xq2S5krhGSGWq2WBoOB7TIkSdvb23ry5MnQn7n2oeuysCeZoTiOlSSJ7TIkSfV6fWhJ1el09OnTJ69ephoXIYGSJNHm5qZOT0+9vZ81Cht3eH+B0YROUrEHDx7o8+fPtssY6f79+/r27ZvtMuYWG/cKJUminz9/6tevX3N7ch1FEY97DegkFXr8+LEajQYn17cce5KKcLXDHXSSCnC1wy10kgpwtcMtbNxLFsexut2uMzPMQScpHa+7uoeQlKjT6aher2t9fd12KSgRG/eScLXDXXSSknC1w12EpARnZ2e6uLi4cfUcbmC5VVCWZdrY2FC73fZqHIFP6CQF+Tivwzd0kgJ8mGEOOkkhnIn4gZBM6ejoSLVazfkZ5mC5NZU0TRUEgXq9Ho98PUAnmcLe3p6ePn1KQDzBBccJ+TbDHHSSifk2wxyEZCKcifiJjfuYfJ1hDjrJ2DgT8RchGYPPM8zBcsuIjzqATmLARx3AOckIzOuARCcZic06JELyV8wwx29s3HMwwxxX0UlytFotvXjxgoBAEiG5gY864DorIWk2m1pYWJiLX2EY/qkryzKFYah2u23jnwVzij3JFS9fvhz6HZA4J/kjjmOdnJzwoWvcMJOQfP36VQcHB7p79+4sftxUPnz4oIODA85EcMNM9iSvXr1SHMez+FFT+f79u+7cucOHrpGr8k4SRZF+/PihXq/H/9K4lSrvJFztwG1XaUg6nY6Wlpa42oFbrbJHwMzrgCsq6yTM64ArKgkJVzvgktKXW1mWKQgCvX//XktLS2X+1YAVpXeS/f19NRoNAgJnlHpOwtUOuKjUTsKZCFxUWkiYYQ5XlbJxZ14HXFZKJ+FMBC4rHJLBYKAoirSzs1NGPcDcKRQSXneFDwqFhHkd8MHUG3dmmMMXU3cSzkTgi6lCwgxz+GTi5RZnIvDNxJ2EMxH4ZqJOEkWRms0mM8zhlYk6CTPM4aOxQ8KZCHw11nKLGebw2VidhDMR+MwYEmaYw3cjl1tZlml5eVn9fp9HvvDWyE7CmQgw4kMQv2eYcyYC3/21k3AmAvxfbkgODw+1trbGmQignI07M8yBYTc6SRiG2t3dJSDAf4ZC0u12laaptra2bNUDzJ2h5dbq6qo+fvyoer1usyZgrgyFJE1TllnANZVNugJcMZMR1cBtRkgAA0ICGBASwICQAAaEBDAgJIABIQEMCAlgQEgAA0ICGBASwICQAAaEBDD4FxbqlhWEizFXAAAAAElFTkSuQmCC)
The name of the compound is
![](data:image/png;base64,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)
chemistry-General
chemistry-
The correct statement(s) about the compound given below is (are)
![](data:image/png;base64,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)
The correct statement(s) about the compound given below is (are)
![](data:image/png;base64,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)
chemistry-General
chemistry-
If
in above compound is rotated by
angle in anticlockwise direction along
, which of the following form will be produced :
![](data:image/png;base64,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)
If
in above compound is rotated by
angle in anticlockwise direction along
, which of the following form will be produced :
![](data:image/png;base64,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)
chemistry-General
chemistry-
The absolute configuration of
![](data:image/png;base64,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)
The absolute configuration of
![](data:image/png;base64,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)
chemistry-General
chemistry-
The correct IUPAC name of the compound is
![](data:image/png;base64,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)
The correct IUPAC name of the compound is
![](data:image/png;base64,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)
chemistry-General
chemistry-
The interchange of two groups (Br and
) at the chiral centre of the projection formula (I) yields the formula (II), while the interchange of another set of two groups (
and Cl) of (I) yields the projection formula (III).
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485166/1/890688/Picture113.png)
Which of the following statements is not correct about the structures (I), (II) and (III) -
The interchange of two groups (Br and
) at the chiral centre of the projection formula (I) yields the formula (II), while the interchange of another set of two groups (
and Cl) of (I) yields the projection formula (III).
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485166/1/890688/Picture113.png)
Which of the following statements is not correct about the structures (I), (II) and (III) -
chemistry-General
chemistry-
Consider the following structures (i), (ii), (iii) and (iv)
i) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485163/1/890687/Picture109.png)
ii) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485163/1/890687/Picture110.png)
iii)![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485163/1/890687/Picture111.png)
iv)
Which of the following statements is not correct -
Consider the following structures (i), (ii), (iii) and (iv)
i) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485163/1/890687/Picture109.png)
ii) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485163/1/890687/Picture110.png)
iii)![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485163/1/890687/Picture111.png)
iv)
Which of the following statements is not correct -
chemistry-General
chemistry-
The correct IUPAC name of
is
The correct IUPAC name of
is
chemistry-General
chemistry-
A naturally occuring substance has the constitution shown. How many stereo isomers may have this constitution -
![](data:image/png;base64,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)
A naturally occuring substance has the constitution shown. How many stereo isomers may have this constitution -
![](data:image/png;base64,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)
chemistry-General
chemistry-
Correct configuratIon of the following is 3 -
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EjyU//kKymDzhw+G4OjIf+ErQvVjoLjMZwxls42uAnpuQxbGg2mRknhlghTJBkbJ4M/NlBMjp2zzq9Jr68bCIZbtyttl55Dn0jxI4kJEmYmIkIsbAB3apdtTW30NTaRpst0T5RVlzcsGAhNyxY2Ce3XFtby6ZNm3jnnXcIhUJMnjyZhQsXEovFMM2+fUuKaZrIskxOXn8CAQPFP5Nhg9czfPU6ytdUsLGojMkTwEFSGbyG/VSu280h+0BcgyZw5chMCpIKOcqyjIxoH5qjcQSOLjsz8ZZWmlpaaI3FcHe4Ds+FCyrEZCvmdtpw2SUUpxe36+TJbrythmNHdrJTrac50ffDX0ZGBoWFheTm5uJ2u8nPz2fIkCHnIbX07LGpdhSbAs7rGDv5Ta7dvJZ///UfiLS5uGrCTMYcP/MgW1/5I8//aBG7Jj/ChM9/nutzISupLZfLidsuYXO4cLgcJ20PGokwDUd3sjtyFL0khiJ1JMFeDBvakiTRVn2QvauX8u6yLazcfYzyfb/m1bZrkNou5/rLgqRrRzi0/g2WLVvFn1ZX0aI+w5t6LaWxaVwxuZjCNEefVAq02Wy4XC6cTieKohwPA7PbU7F8po3CiTdxVXMz5fEaDpT/jief2k6J3UnQaMJU9rJ3bSOHB97CzBtnM2tmEVl2AJN46xEqP/6I1UuW8c5anW3eVzjWqPOENoX540sY4GmlYfvfeH/pIv68MkJF7DUaGwz+W72a2VcMYnC+j7OK1Dx7j/rZsX/F8+LxyYgRXk444YfdKvp9b63Y0iCEKP+zWHY/YnpR+3EZBOlXisD1z4hXd1pBD5+JeKsI//UB8Yvbc4UsHd/LFoAYevPD4rtrhDgcTr4gJhr3LREv3BQUczIRILefnz9BcM9i8cfOoIdH+ou7Rycd9wwWjPtP8ciSsw96uOBzxOzhU5j3w+coa7MR0m04RIyIvwRX3kCKPIBtPKPveZ4fXKdQE1FxS3GitiC2jBIm5vnOLsSol+icVoiU32DvGB/tXtyT7md+9myyr20jYZjIEghTkDl4AsWjIK/LdqgNT78xTPnGL8n9Qow7dTeqEUZ3Z2MERzA1XwJnkOKFj3H/hDCzWjzYRRTT5ifuKeWykUHOdnf1gpalE6dd6Z7BBCP5raEXENM0KS8vZ/ny5SxZsoT777+fW2+99YLfx5lzJpO1rm9GOJOuPW2rZ/l8LqjL4vTL/DP4AH2UPSeEIBKJoGkaHo8nReeGyZxJP3V9V8yZdO1pTznL59P3vrOLiEgkQiKRwO12XwRCvLiwhHiGiI6ydLqu43A4sNmsQmq9iSVEi5TAEuJn5OJZOV9cWEK0SAksIVqkBJYQLVICS4gWKUE3IV7gCbg137fooNtmmASmhpmI0BbTiWtme4kNmwub3U5A1RCSQlQ4cNpANuPEw23EdYEmJCQhEIoKqhu/S8Uu6WjRZmKaIK5LSJJASDZQHHjcDpyqbGWHWgCnCgNr2UHo3cf43jM7WLaxDrdbITTmfkZNn8sbk9bR6izlj5G53DzWIKdyOW/9/BHe2BlmfVs6Xq2OtoJpKFPu41f3TmOmZzef/v4env2wnmX7M0hXWol6hqOXLORfvnkVt0zMx42VqmzRTYjRwx+w/e03Wbl0O7tb7ThLiwlKgixHPc7DK3i+YjFNOXPYNXou8zQFh9OLOysfe3g5kYpyyh35eHLSmJjmwK0CNgf2tDzSRAVSzQE2tGZBsY0rx7lJc6mWAHuZMw9zSD26CHHPS/fyP8828Ny+L/CtP32NuxaOYDBgP7SY/cv/wJzvrqVuUCl3TACbDrb8q7jmZ1cx5LL/x4y3nueZgieYfMV1/HSWq8P3XcaI+9+gbOQTzFq5iFv33s7lk2ex9L7B5xxabnEyZx7mkHp0EeLSxYI613TmP3ovcycN53iJof7TKJmW4Gf31vGhlEdzHCLxE9e53R1h5S4PTrfrpAAMh9NJwGNnQFERxQX5J0SYql/Pi4nksKvYRhrWruC7T2/kUF0bLpeKEYuTNmo2g298kDvHOig5HjBooEX3s+WPv2TVhgrWRoJIsUYkXz9Cw27jS/OmcMdIqF7+Y1as2sji/UEUrQ27K0B94CrmXTuZO68dSIDe2XrpIsR3txRgmzWLLzw0ljFuOBGvlok0dAG33FfH0Logr0ngTIrXj8USxDQwtQS6fnIdG11LoJvQz+vAb0+60BLhuSNJIDSM5kpa1q1k+fJ3WP7JXupCcbLsEqZWh1yfYHesjCIxiczJQfwdT10YEVqOVFCx+m+8swdCAsgdh0edxezpAoQg0bCPqq0rWPM+HIsAroG4x5YxctJlvfr+6C5CrEgEKPClk+HuPJAUryapMOBLDOqv8A3A0yVUWrS/HtbmQHWc/P2wOe04bBKmbmKYXfds/i+jaBnMM6TmE+pX/icP/DTKRjGeb776JFNLcihqa8Lp38WaZ/7Mi/98D883Pcou8VUemWzDrSqonmFc8fBr9J/6ayY//21ecX4NMfYb/NsN+VxW6AZZUHjrs9w/eAFXLHuch3aMYX+/+fzlaxOYMiS7x9z8s6GLEFuyM3Dk9iMH6FohusMyqn7save6UCCrTsxYhPoPnmbp9g/RlikokoQuJCRJJr7vXRoa6zh2mc4YNenWRQQpWsGW9zax+sNyagwD+8Cx9J9yPVcO8FLo7aVPecliALUc3LSOpc9X0JAxlxFXLWTO2GGMAkjPAPoza3oV5syV/GTXKha/XMicknlMKnTglVRUp0r+gAGUZktkefIxCgczqkjC1m59kFU3mUWDGVrgY2BiMFLB5Vw2JIitlzPYum7fFKbj6xcgk+5i6xrJ2x1ZdWDGIbThdQ412dhs66xY0X6FoWvY07LJH2jgSBaiGYHmzWx960V+88uVVACMmMfI0CiCN5dROLAvM1S60lm2OPn3PseMQ+hdtq7ZxDPLMxj7H9ez8NsTGCoAqXM8seEaNJUFD3+Olx/8kMWvv8Bbt0zG368fEzrS7aJtbbTFIaFEMaOtNEd8ZHtOfD493EJLVCPDbSfhdxKOmPh9veuU6yJExekBWUKlu8ntmtvQHSMeQXEr5Mz/F8YPnsR9Y1VsioQmZCRJIbblBQ5WbOX1DJVwPCkHWHNAZCiX3/49vn/dQ2S497BjXZRVb39E6zgP8YH9zy418TygKAo2mw1FaTcFqfCeFaElSHy6nv27D7GbAsZneAnaTmE2fNkwZhzj+q3k0M7tbNp0hNEF/ZgwqKOdjtMkuxu710+gW30SW8BHwK1ib5N6pfLXqehqEetraKqtpwbI4IRVFEhImEjmURqb4FBTOsVBJ+m+9ociDA1JdeIbOIPLZs9mzrhu/yVvH3veO8x7YRt6ch09yQmuAQycnE2ZBA6KGeraS/02QaK1lYqmGuyNrUiGeV69gXa7/Xj4v6IoJ8UaqqpKNBqlvr6e1tZWgOP5K/F4vNcqPQghUBQFu91+RqkIkgSx2hpCiQTRzP5409xkcSpj4QPvIMoKHQzJqGNzfStNzSeKb0qyAhJED3xMVeQ5/hhyketTiGomsuomcXgNjZur2ZeewFEknZd5exchuis3c2z3ID6pvpZgDuR0VpsHMCLQuJJtm1Ve3T2Je67JY7yvc6IggTAxYq1EW+LQzY7Fmttojujoptm1lxwq5GbhlAB0qN9KXA0QvP1aDLGTnW+/zf4DR4jH4sjK+UmrN02TzMxM8vPzCQQCOByOk4SlqiqxWIzt27dz+PBhhBAcPXqULVu2oGlarwrRbreTnp5OXl4eXu9pJslCIMs2lMw0GJxLus9FJqcSogPIxJ/rJqtUwemS28vXdSDb7EiSTPPHS9hwaCkb6JoD1fnF7HdjlHlT5POSv9ZFiF+dfoC3yl/hqYcG4/7JXG4ps3fkEceB3Sz53xoOywVMvS6TYM6J5YzX48TrkFDdPlzukwdToYdprd/LPq2J3Hg32yZJhD79CztWPM2fP9zDJ67ZxCYN5/bCOIMMk1BjE22RyHnLEZEkifr6erZv345hnLooqKIoaJrGgQMHaGhoQJZl2tra2LJlC6Zp9mq0thACwzDQNA1d1086bpompmkyduJ0po4qYmBzE0pEg0PNtMU02uAUucUJoInWuigNRwxiMbPLECsMDSEE3hHTGTJpNreMcJDlkYnrAsnmQKveSsued1if7yCmnZ/RqcvTvfPWy2h7eje//fPveGeqhsMzjkHNEfzOSqqrqnh/Zzr9x5cwd0xae50UPUpLXS17yg+z82iCBvNT9ucWs7s4jwH9PNhlg3hTFTu2b2PV1iPs1deSkZ7HrpGjKM4P4OpYuMTrK6je9QFrtxt8zAE80hoiuQMIDCihuDVKLBo7PjfrTToXII2NjRw7doyWlhYSicRJCxFFUdB1nXA4TCwWw2azEQ6HaW5u7lUhyrJMIpEgFApRXV1NQ0PDSYukzvcByg4vpUEnZR4ffqkVe9Wn1NbM4SDtNWy69lYUxFFqjuocq/bh87rwek48etPQQQi8w+cwdurDfH9+tzGtfj2Ni/fz41onhzRxXt651EWI/b/wGvf4HyP/tz/m9/+9jGd+4CfDZhJtHULeoKv5ylN3MXNGWYf5j1Nfvozlj/4Tz713kLfrAP6Rje+/z5uffovnvz6TOb7tbP3lLTy1qIIXtgP8ktUbNzJ97d389OFr+OKUQjxA9sT7mDv0BqZKTWxavI2Pnl1Htq0IedIV3DR0NC7DQD+Pq1TDMI4/4FOJym63Ew6HWbx4MTt27MDlcjF79mwmTZrUq0MznLCIuq4fL+6ULMTO+/P4MvA7NXwRlcItLzOQ5RzbdzvbqmBsDqAkLzDjEGqgtjWNFlcO48cWUNr/xGKrs3WhJ9BjbbTFvDiS9u9EJEpEAxMJ5Ty5ZruOd/Y0yqYvwG4cIbw2ypAqsKsQDZcSLJnAtLFFDJA7V9QSqi+HgnFXc0W2RjDuw601EskeAcOzyHYBqp/AoJlMXDARJgbw00zU0R8tWExRx/s4JEByp+Nzp+MDZk1V0d7fgZJuww/0S0s7Lx/8s5KdnU1eXh7V1dW43W6Ki4vJyso6/YXnm/TZDBi+idmlK3l35dss8Y9hxvdLGHJ87WwS37uGNf/7ApvieSjXzObqwekMT1oZO91u3HZQ7SqG3dUesJKEaZpEmiqpbmigJkvHfYri++fKSRMvOXssJbf8nu/d0sMVx/dw7KQVTmXGd6Yyo8fmSxh0228YBHz9VIdNE1OPoxkmhpCw2R1UaXbUqUPJDvrJpn3Lti+qf3VH0zSi0SiJROL40JwaFNF/9HRuuO4Z1jy7ms0vv8SqO+7D1r8fRdFm7K7dbPzgbV54fBVH5/8bI+6+jel5Ttq/3u0Ps6WpiaaIICJaMZvrqWlOpzjjxKq9sbaSPfv2saduN432fVTVuUnL8/aq56ubEC+sUy1Wu4s9i77Jyx9W8ma5F7QIOaPnMnrhP3Jbej45F+xOLm58g+Zx+T+8wX/mvsjbH77If93yOv+uyWTJOoZ+FFdwPPn//BfumzeOGZe78DsBDBKRPXzyP//Bktf/wqKtcCDxOJRuY9u2B/juF2Zz/xhB1eLvsOjl53jqr7A/8gqs2c91O77IfXfP4b6FQ8jkPAQ9nFntmV74rx0IAGEiTBPTNDC1BA6vl2BpIen+zjNSwIORygiB7AgQGDSHK29rxh+IsPHFQxxujaE7FRLRAHkDJjD5ruuYNwTypK7XGloMNVBEv8tzCUbqkdJtNCqQ6NjvNbUYtrQCgpfnE4y3oLoC1NlkYlrvVsm9oNXATkKYGFoMTTfRzXanoKyoKHYHqgypFLKoaRovv/wyW7Zswe12c8MNNzBx4sS+vq2umBqGrhHXBGZH5TUh2vvUZndgU7pZL2FiJOLohoEuOl4jIMkI2Y5dVbAr7ULUdQPNPF6qCSHZUFUb9l5M9ei7Ai4dZewVuxvllE4E0eHRsThjZBXFruLu0SmT1KeC9v53uFDo7oJIbtJ1ykCX3qbvHPvhYXEAAAO0SURBVKZnUKLOEmFvk9SnKda5fe+5t7DAEqJFimAJ0SIlsIRokRJYQrRICSwhWqQElhAtUgJLiGeILEmdrzAGJKQUyFm5lLB6M4n/y9up2BQQOgnNRJccOF2+nho5T3d3adO3vuYUJFxziIPr3mJPk6BGc+IwwxhZg9AyB6HW7kQ/uJpw5XrUnFG4ckfjFGGiSj9IH8z0ScUMCnr60G968WL1WTdCh3ay6hcP8YcNMT5p7fhj2Q045z3EUzcNYXbWEXYdeIxfPbOC5fs6jvvG4xh3D0/lBugf9KCQch60lEd55JFHHunrm0gl7J4AmaWj6KeU45Nqab7sQaYt+BI/vGkEM4dkk5dXQGbpRErToqTZo6z3XcvwOZ/nsa/O5MqROaQ7bSkRyHuxYVnEJIQQOAPZlM26jbSWt/FIlVSX3s7sqydz2/G3bucTHHMTs0UlfnuENypv44qrr+C2WemdjfTZ+wIvZqzFShLJSUrhSJxwXKBHW4mGT07rjLW1EddgYLaPbJc9uZELcauXHJZF7AFhtsdLyg4PTu/J3eT0OPE6FdyaDUWxvs/niiXEnpBlhKGRaKyk9tARGgvsSICGCggih2qpbEgQcxlYr0c4dywh9oDi9KI3t1G58ps89nsvi9I63sHXsR7Wmg4hBQpx36LjdVjdeK5YPdgTwgQF1LRcsjKzGNCvXYBmx7Raq24jpqpEZM5bhay/Jywh9oARC2Pzp5H/+Z8zb+ZV/Ov0rlkbkfd/wifr3ucn2LqW2rM4K6xZdo8IJElGtrtxniIbye1x4XXZsdtsXSprWZwdlkXsAUVRUCQTDA09cXKB+khbK6HmJkLEjucAW5w9lkVMJmmup6oKqiIhq3ZU9eRuirbWcbRyJzsPH6WmNZrUxoW40UsPy8WXjCTRenQ/W159gkWLFrFoXT1b99ZysD7CMRFgQF46aVolB1Y8wSuvvMgzK+rZt/co1TXNNIedBHLSyPQ7kLF8zZ8Va2juRmtVBVsXPc6Kra2sDvnwVP6VrQmFg84yrho7gCIOcPjdx/lwWzPr6/345A0cW2/n8XiQ/qMLGZznI3VK0F88WGFg3Yi3NFC/71OOhQUthopNxNFcWSgZRYwuSidAE02Ht1HZZFIftWMnga74wZPDoNIsgn6HFfRwFlhCTEJ01Is5x0Ysf/NZYAnRIiWwVs0WKYElRIuUwBKiRUpgCdEiJbCEaJESWEK0SAksIVqkBJYQLVICS4gWKYElRIuUwBKiRUpgCdEiJfj/We8PALYuFHgAAAAASUVORK5CYII=)
Correct configuratIon of the following is 3 -
![](data:image/png;base64,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)
chemistry-General
chemistry-
The two isomers given below are -
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485181/1/890652/Picture408.png)
The two isomers given below are -
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/485181/1/890652/Picture408.png)
chemistry-General