Let and
Then is equal to:
- A
- B
- C
- D
Let and
Then is equal to:
Correct answer:B
Standard Method
Given:
with .
Find: .
Using logarithmic relations from the solution,
and the determinant simplifies to
Now use the adjoint property for a matrix:
where .
For ,
Hence,
Applying the same determinant-of-adjoint property again to ,
Therefore, the correct option is B.
Determinant and adjoint property chain
Given: the matrix has determinant as concluded in the provided solution.
Find: the value associated with .
First compute the determinant of :
For any non-singular matrix ,
So with ,
Now apply the same rule once more to the matrix :
Thus the final answer is .
Using is incorrect. For an matrix, the correct relation is . Here , so the exponent must be .
Forgetting that leads to a wrong base before applying the adjoint formula. First compute correctly, then use the adjoint determinant property.
Treating as if one adjoint operation cancels the other is wrong. The expression requires applying the adjoint-related determinant rule twice, not simplifying by cancellation.
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