For the given reaction

What is 'A'?

Option 1 - Image  1 <img src="data:image/png;base64,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" width="115" height="22">

Option 2 - Image 2 <img src="data:image/png;base64,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" width="187" height="116">

Option 3 - Image 3 <img src="data:image/png;base64,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" width="143" height="80">

Option 4 - Image 4 <img src="data:image/png;base64,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" width="99" height="84">

4 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 - 2

Detailed Solution:

Refer to the image below