C H 3 − C H 2 − C N → E t h e r C H 3 M g B r A → H 3 O + B → H C l Z n − H g C The correct structure of C is

$C H_{3} - C H_{2} - C N \to_{E t h e r}^{C H_{3} M g B r} A \to_{}^{H_{3} O^{+}} B \to_{H C l}^{Z n - H g} C$

The correct structure of C is

Option 1 - <math> <mrow> <mi>C</mi> <msub> <mrow> <mi>H</mi> </mrow> <mrow> <mn>3</mn> </mrow> </msub> <mo>−</mo> <mi>C</mi> <msub> <mrow> <mi>H</mi> </mrow> <mrow> <mn>2</mn> </mrow> </msub> <mo>−</mo> <mi>C</mi> <msub> <mrow> <mi>H</mi> </mrow> <mrow> <mn>2</mn> </mrow> </msub> <mo>−</mo> <mi>C</mi> <msub> <mrow> <mi>H</mi> </mrow> <mrow> <mn>3</mn> </mrow> </msub> </mrow> </math>

Option 2 - Image 1 <img src="data:image/png;base64,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" width="144" height="60">

Option 3 - Image 2 <img src="data:image/png;base64,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" width="152" height="48">

Option 4 - Image 3 <img src="data:image/png;base64,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" 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3 Views|Posted 8 months ago

Asked by Shiksha User

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Answered by

Payal Gupta | Contributor-Level 10

8 months ago

Correct Option - 1

Detailed Solution:

Consider the below image