Question:
The integral \( \int_{\pi/2}^{-\pi/2} \sin x \, dx \) is:
The integral \( \int_{\pi/2}^{-\pi/2} \sin x \, dx \) is:
Show Hint
Remember that the integral of any odd function over a symmetric interval about zero is always zero.
Updated On: Apr 23, 2025
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The Correct Option is C
Solution and Explanation
We are given the integral:
\[
\int_{\pi/2}^{-\pi/2} \sin x \, dx
\]
Step 1: Evaluate the integral
Since \( \sin x \) is an odd function and the limits of integration are symmetric around zero, we know that the integral of an odd function over a symmetric interval is zero:
\[
\int_{-\pi/2}^{\pi/2} \sin x \, dx = 0
\]
Thus, the correct answer is \( 0 \).
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