Let be a matrix such that If then the value of is:
- A
- B
- C
- D
Let be a matrix such that If then the value of is:
Correct answer:D
Standard Method
Given: is used in the extracted working, and Find:
Using the determinant property for a matrix,
and hence
The second extracted approach gives
which leads to
so
and therefore
Now use the given equation in :
Equating exponents,
So,
which gives
Factorising,
Thus,
Therefore,
The extracted the solution concludes the final value as and marks the correct option as D. There is a discrepancy between the intermediate expressions shown and the printed question expression, but the source solution concludes that the correct option is D.
Therefore, the correct option is D.
Extracted Working and Discrepancy Note
Given: the solution contains two inconsistent approaches. Find: The option supported by the solution.
In Approach Solution - 1, the working states
then uses and finally states the answer is . However, for a matrix, the standard determinant identity is
so applying it twice gives
not .
Approach Solution - 2 also begins from a different statement,
which does not match the printed question. It then solves
and obtains
After that, it concludes with
Since the solution explicitly states The Correct Option is D and both extracted approaches conclude , the answer recorded from the source is D.
Therefore, based on the source solution authority, the correct option is D.
Using the wrong determinant identity for the adjugate. For an matrix, , so for a matrix it is , not . Apply the dimension-specific formula before substituting.
Equating powers before rewriting both sides with the same base. The exponent comparison is valid only after expressing both sides as powers of the same quantity. First convert in terms of .
Ignoring the condition . Even if an algebraic equation has real roots, only integer roots belong to . Always filter the solutions using the set definition.
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