Correct structure of $γ - m e t h y l c y c l o h e x a n e$ carbaldehyde is

Option 1 - Image 1 <img src="data:image/png;base64,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" width="112" height="69">

Option 2 - Image 2 <img src="data:image/png;base64,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" width="129" height="66">

Option 3 - Image 3 <img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJkAAAB1CAYAAABd2kNDAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAAA2FSURBVHhe7d0JWFXVFgfwPw6ggQjOOeVQoqU9pxyyHmaJimJRSpiKPUdQS8s0pXwOrx42OKCWQ4U54tCjlBxyCH0ag2VOOJfirIGCghMC6+19zr5PP0NTLod7Dqzf9yG611Xh3j97r7PPvec6kQDGDFRMfWbMMBwyZjheLk3mUMJarNkUhyPHz4BKeaJegybw9feHV+XS6hbWwyEzi8wUhI8ahDGfRcG5Qh089kgl4EYGjuzfh0yPRpgQPgcjA1upG1uMDBlztAyaOfBZ8cNemvp+GEnnMtSwcP5gLPX1qUdwKk+T1xxQo9bCITOBpA1TSCyG5D8+So3cIW0vdX3MhUrU8qODl9WYhXDj73DXsXxeBK6VaYR3Br6kxu5QtiHGjOiDrKRoRG46pAatg0PmaNeTkbAzEZ5PtMKjDzupwT/zat0WFcXnhLid+oCFWCZkOTk5mD9/Pg4dst5P8r3kZCQj5SxQuWJ1uKmx3JQqUx6VRAavpKWrEeuwTMjS09MxatQoxMTEqJHCwcmpuPYo/NUxPuVkIUt8drr7ZGdalgmZ6B9RqlQpFCtWuFZ4J/fKeKR2aZw6fhAXs9VgLtIvnMVZEcSKNaqqEeuw1CMmA+ZkxR/leylZCZ3bt8WVvRvx465UNfhnm6OW4TLc4evTUo1YR+GaFiypGDoPHI4n3ZIx6u33cOKqGr7NqbiFGDl1A+r6DcPLzSuoUevgkJmAa20ffD0vDNnbZqFNh15YEB2DvQcOY/cvP2FheCiebRuEC7V88FX4SHhYcSLXt8vMLzU1lWrVqkVz585VI4XP4S2L6cXW9aiMmztVqPIwlfMoQ25lylOXfqG06+QldSvrscy5y7S0NDRp0gShoaEYMGCAGi2MsnD60B5s33MY5FYFTzVvhhoVy6iaNfFyaTolUM2rKfy7B+LlTm0tHzCJQ2YiGzduREJCgvqTTi40K1asQFJSkhqxHg6ZiYSFhUH0nOpPuszMTAQHB2Pz5s1qxHo4ZCbi7OyszVx3cnFxQXb2PXZqTY5DZiJyozm3Mxpy3Mqb0BwyZjgOGTMch4wZjkPGDMchY4bjkDHDcciY4ThkzHAcMmY4DhkzHIeMGY5DxgzHIWOG45Axw3HImOE4ZMxwHDJmOA4ZMxyHjBmOQ8YMZ52QFS+hX5xLfi7E7ny1UmG4VJZ1voNrV5CedgmZaRfUQOFz5coV7WVx0uzZs7F+/XqULFlSe+1lVpa8BJ41WSNk22Pw0Ht90Nc1G42jZgERHwHpl1Sx8AgKCtJC5uvri5CQEPj5+aF///7o0KEDvL291a2sx9whSzoM/GsoMG4gnGt74eMft6JN6AfAD1HA0K7A2mWAhV/0ersTJ04gMTERixYt0pbMrVu3ar+Xn+Pj47VZLSMjQ93aYsQ3ZD6X04giPiV68UmikK5ECTGqoKScJ5o5jsivIdFbAUS741TBeq5evUpTpkyh6tWrU8OGDSkyMpJycnJUlejChQs0YcIEKleuHDVv3pxWrVqlKtZhrpDJO3dDFFGQN1FAC6KoCKIb11UxFwd3E40OIupcn+jTUURnjquCNURHR1PTpk2pfPnyNH78eC1Qd7N//34KDAwkV1dX6tatG+3Zs0dVzM88Idu3g2hkTxGYBkTh7xOdP60K9yEmmuj1dkTdmhMtmyOmh9veN8aExLJIAQEB5O7uTj169KADB+7/7WxWr15NzZo104I5duzYewbTLBwfsj9EmMLH6uGSIUv8RRUeUMZlovlTiV76G9GgTkTbflAF85CBeP/997Wlr2XLlrRmzRpVeTByiZ02bRpVq1aN6tWrRwsXLiRx9Kmq5uO4kGXeEMvhPKLuT+nLo1wms/PhjjrxO9GHbxL5itCOG0T0+35VcKwFCxaQl5cX1axZk6ZPn64FxV5JSUkUHBxMbm5u1L59e4qLM2dv6piQbd9MNFg09LKxj/hENPqpqpCPtm8hGiL+j67i4ODLj4jSUlShYMkHXgZABmHw4MF0/Hj+943btm2jdu3aUdmyZWno0KEkjlRVxRwKNmTHjxB9MFTMMqJRnxhCdPSgKhgkUxw0fPs10autiHr/neiHFURZN1XRWPKBlqHy8PAgHx8fio2NVRVjyOVy3rx5VLduXW22nDFjBl2/fo+DpgJUMCFLT9P7pRcbEQV3Fj/em1ShgCSfI5ou+r4uYgl9O5Boz3ZVyH/Xrl3T+qWqVatqy2NB90vJyck0evRo8vT01Pq+devWqYrjGB+yTSuJ+rTVj/y++UI8CldUwQH27yQa1UuE7XGiqWOIzp1UhfwhG3n5wFaoUEE78ktJccwSLe3atYv8/f21LY9evXrRoUOHVOWWo1uXitl2GMUey70/3LHyM1EfTdtPp6uRvDEuZPt/JXq3tzhqtD2gp1TBBDZ+K4L/nDjoEMFfIYJ/1b7g79u37/97WHJrwkx7WN999x01btyYKlWqRBMnTqSLFy+qCtHW8D7ybDx9vi33nnjR8Dai7kwRO/9QI3mT/yFLEUvTjH/qG6QjxNK017ilyS5yCf96CtFL4uBDW8I3qsL9k29gMW7cOG3mkrvxcg/LjNLT02ny5Mna1kn9+vXp2LFj2njcnMEiRKXoq3hxX+RieWgnUa9Mi/ckq5G8yb+QyS2JlQuIAlqKJttbb7Kzs1XRxOTByMQh+sHIhPs/GFm8eLHWc8m9qqlTp1JGhrk3gKUjR45QWFgYnTyptwnWCtnPW/QtCdt2QarjepE8k+dHQ/z0zVy5rXLp1rJyu/j4eOrYsaO2XRASEqLtVVmVLWRLEm+dK73d9xP8RL2S3SGz721vTh0DFkwDYtcDT3kDQW8Btb1U0YJuZgLRi4Blc8R9Xxro9Sbwgr/2ZMnTZ85gUliY9u7BLVq0wPjx4/HMM8+ov2hNCV++gVYDZqPf2Ol43ssNN27antHiBOdSxfHT4k/w+fepWLL3V/RoaMe702lRe1CXRKO4eKa+mTrIl+in9apQSMjzptNCxcz8BF0d8w+a+cnHVLVGTa2fESGjmzcLZq/NaNsjhssJhkq7uZOnR1ntXKr+UZY8y3nQQy4lRN2LliY6YrlcEE70dEWiyFlEN0UvVlgd+JViu3tTNfFAvPvOCEpLy713saq4uXK5dKEZG45Rupg45LlV/eMipWdcooi324t6FVpi53KZtyctXk0HGjYHAoOBEvrThQul+k3QNGgQdgU8jUmT/g3Rh6lCIaE1Sk5wL1cZbu4eEEef6sMTbq7u8HCVj62YiOTN7JC3kBUrDhQXH0WAixOhgrur+MHK5S11C4ks2YvmIis7R/3OPnl/+rUdxwuWkiPuaHlnF5Xv1wDWeCEJM4Rol8SvOXddDonkTHb3+v3ikBVlOXLL4qY2WeeGtHqWCmPecciKsAZdhiF6zTp0aiB6zlx495uE71f9B8/Xse+Ah0NWhHnUeBxdOvmgukfur8qv8lgzdPZ7Dg+72beDwCFjhuOQMcNxyJjhOGTMcBwyZjgOGTMch4wZjkPGDMchY4bjkDHDcciY4ThkzHAcMmY4DhkzHIeMGY5DxgzHIWOG45Axw3HImOE4ZMxwHDJmOA4ZMxyHjBmOQ8YMxyH7K/ItqSE/WF7lLWTyjUy1O78IkNdfy7rJV/WxQ95CVtoV2B0PrF4ir8qhBguhpCPAt/OAaxn6JaRYnuTtwsQp54DIWcD6b/QLEb8+AmjaRhULgQvngZULgagIoEYdoO87QHPvojN75zP7rn79WyKwYDrwy3+Bp9sDvd4AatVTRQu6cR1Yt1y/+rX02mCg06tA8dwvSMLuj30hs4nbqF9q/ewJoGtvoFt/wN1TFS0ifhOwMFy/bHzn1/TvoVxFVWT2yJ+QSXIWWLsMWC5mgWKi1esxBPB5BShp8gsX/7YPWCRm4x3b9Pci6P2maAHqqyLLD/kXMpsU0c98MxdYs1QsnaJfCxou+pm/q6KJaF/nF/rX+cijIlzi62zRVhVZfsr/kNn8vl8soWL5kf1a6xfM069l3tCDtVz8IMg+PjAE6NAdcHbR6yzfGRcym9t7Hb+ewCv9AE8H9Tq23vHcKcC3h+i75Ndix9u5sPtifMgkeZ34tWL2WDpb9GvF9dmjo5g9SpRUNzDYb2JWlUHfIWbVlu2AnmJWrcN9V0EpmJDZXPgDWCH7tUjRB4mlU/Zrstk2iu3/W7scqFnX+P+P5apgQ2Zz9ICYWcQR3fYYMbM8r/dr+TmzaH2XCLKcOeVsKWdOeaTLfZdDOCZkNgkiZLJHOi36Nbk3Jfs1e/em4n8U/+ZU4MwJoIv6N7nvcijHhkyy9WuRsl8rpo72uj34rCP7rkWi7/p5i34023Mo73eZhONDZpOaovdPq0Xg5PnCoGFAi+dU8R4uir5LLotyI1guub3F3zPjvlwRZp6Q2Rw9qC+hP2++dSRYt4Eq3sa23yVP1Ds739rvKsHnGc3GfCGzSRC91Xx1PrRjABAw8FZvFbdJ1KYA506Kvsu298Z9l1mZN2SS1q/J86FiGZXP55KNvHzmR5wIoLcv8NoQoOaj6sbMrMwdMps00a/JvmvFl4BXI2BgKNC4tSoys7NGyGzOHAfKVwZcSqkBZgXWChmzJH61EjOcU2xsLM9kzEDA/wDhjq9Mrt0xNgAAAABJRU5ErkJggg==" width="126" height="96">

Option 4 - Image 4 <img src="data:image/png;base64,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" 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5 Views|Posted 7 months ago

Asked by Shiksha User

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Answered by

Payal Gupta | Contributor-Level 10

7 months ago

Correct Option - 1

Detailed Solution:

Consider the image below