Compound 'A' undergoes following sequence of reactions to give compound 'B'. The correct structure and chirality of compound 'B' is

[where Et is -C₂H₅]

Option 1 - Image 1 <img src="data:image/png;base64,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" width="153" height="44">

Option 2 - Image 2 <img src="data:image/png;base64,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" width="155" height="56">

Option 3 - Image 3 <img src="data:image/png;base64,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" width="164" height="48">

Option 4 - Image 4 <img src="data:image/png;base64,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" width="162" height="37">

14 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 - 3

Detailed Solution:

Consider the image below