If , , then is equal to
- A
- B
- C
- D
If , , then is equal to
Correct answer:A
Standard Method
Given:
Find:
Expand the determinant along the first row:
Now evaluate the minors:
Substitute these values:
Differentiate twice:
Therefore,
So, the correct option is A.
The solution also confirms: The Correct Option is A.
Use row-based minors directly
Given: the determinant has second row and third row .
Find:
Observe the cofactors of the first row entries:
Hence the determinant immediately becomes
Then
So,
Therefore, the correct option is A.
A common mistake is forgetting the sign pattern while expanding the determinant along the first row. The middle term carries a negative sign, so use . Otherwise the simplified expression for becomes incorrect.
Some students differentiate incorrectly and write . This is wrong because . Differentiate carefully before taking the second derivative.
Another mistake is not simplifying the determinant fully before differentiation. First reduce the determinant to , then compute derivatives. Direct differentiation of the determinant without simplification is unnecessarily error-prone.
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