Let . Then is equal to:
- A
- B
- C
- D
Let . Then is equal to:
Correct answer:B
Standard Method
Given:
Find: .
Multiply the numerator and denominator by the conjugate of the denominator:
Now simplify:
and
Hence,
The denominator is always positive, so the real part is zero when
Using ,
The extracted working in one solution path on the page is inconsistent, but the page concludes that the correct option is B and explicitly lists the final answer as . Therefore, taking the solution as the authority, the correct option is B.
Therefore, and the correct option is B.
Detailed Extraction Note
The solution contains two different derivations. The first derives
which does not directly lead to the listed option value. The second derivation introduces a different equation,
which does not match the question statement, but it ends with the option value .
Since the page explicitly states The Correct Option is B and the extracted final result is , the answer is recorded as B despite the inconsistency in the intermediate working.
Setting the denominator to zero while enforcing . For a complex fraction, the real part becomes zero when the real part of the numerator after rationalization is zero, provided the denominator is nonzero. First rationalize, then equate only the real numerator part to zero.
Using an incorrect identity for the denominator. does not simplify to . Since , the correct simplification is .
Assuming that all four angles in can be written without carefully checking the exact trigonometric condition. After obtaining an equation such as or , list all solutions in the interval systematically by quadrants.
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