${(C_{7} H_{5} O_{2})}_{2} \overset{h v}{\to} [X] \to 2 {\overset{•}{C}}_{6} H_{5} + 2 C O_{2}$

Consider the above reaction and identify the intermediate 'X'

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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">

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 - 4

Detailed Solution:

This is the formation of free radical mechanism, hence free radical will be formed