The integral is equal to:
- A
- B
- C
- D
The integral is equal to:
Correct answer:D
Standard Method
Given:
Find: The value of the integral and hence the correct option.
Let
Then
Using double-angle identity
From
we get
Now use
So,
Therefore the integral becomes
Evaluating the limits,
Therefore, the value of the integral is . The correct option is D.
The solution uses limits to , whereas the given question shows limits to . The source solution and final answer consistently support , so the answer is taken from the solution as instructed.
Using the wrong identity for or substituting and inconsistently. This gives the wrong sign. First express one trig square correctly in terms of , then apply the double-angle formula carefully.
Assuming directly implies . That is incorrect because cotangent is a ratio, not cosine itself. Convert through identities such as or .
Ignoring the discrepancy in limits between the given question and the solution. Reversing limits changes the sign of a definite integral. Always verify which source is being used before final evaluation.
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