Let be a function which satisfies Then is equal to:
- A
- B
- C
- D
Let be a function which satisfies Then is equal to:
Correct answer:C
Standard Method
Given:
and
Find: .
Using
we get
so
Comparing coefficients with the given form used in the solution,
therefore
Adding,
that is,
From the final simplification shown in the solution,
Hence the value of is .
The solution marks C, but the computed value matches option B in the listed options. Therefore, the defensible correct option from the working is B.
Answer discrepancy note
The solution contains an internal inconsistency: it states "The Correct Option is C" and later says "the correct answer is option (3)", but the numerical result obtained there is , which corresponds to option B in the provided option list. By the stated working, the answer should be taken as B.
Using incorrectly. The identity is , not a product of separate sines or cosines. Expand first before comparing coefficients.
Comparing coefficients with the wrong form of . The coefficient of must be matched with the integral containing , and the coefficient of with .
Trusting the marked option label without checking the computed value. Here the solution's option label conflicts with its own final expression. Always match the final expression with the listed options.
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