The major product of the following reaction is

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

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

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

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

3 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:

Acidic order

Simple concept of conjugate base stability