MHT CET · Maths · Definite Integration
Let \(f: R \rightarrow R\) and \(g: R \rightarrow R\) be continuous functions. Then the value of the integral
\(\int_{\frac{-\pi}{2}}^{\frac{\pi}{2}}[\mathrm{f}(x)+\mathrm{f}(-x)][\mathrm{g}(x)-\mathrm{g}(-x)] \mathrm{d} x\) is
- A \(\pi\)
- B \(1\)
- C \(-1\)
- D \(0\)
Answer & Solution
Correct Answer
(D) \(0\)
Step-by-step Solution
Detailed explanation
Let \(\mathrm{h}(x)=[\mathrm{f}(x)+\mathrm{f}(-x)][\mathrm{g}(x)-\mathrm{g}(-x)]\)
\(\therefore \mathrm{h}(-x) =[\mathrm{f}(-x)+\mathrm{f}(x)][\mathrm{g}(-x)-\mathrm{g}(x)] \)
\( =-[\mathrm{f}(x)+\mathrm{f}(-x)][\mathrm{g}(x)-\mathrm{g}(-x)] \)
\( =-\mathrm{h}(x)\)
\(\therefore \mathrm{h}(x)\) is an odd function.
\(\therefore \int_{\frac{-\pi}{2}}^{\frac{\pi}{2}} \mathrm{~h}(x)=0\)
\(\therefore \mathrm{h}(-x) =[\mathrm{f}(-x)+\mathrm{f}(x)][\mathrm{g}(-x)-\mathrm{g}(x)] \)
\( =-[\mathrm{f}(x)+\mathrm{f}(-x)][\mathrm{g}(x)-\mathrm{g}(-x)] \)
\( =-\mathrm{h}(x)\)
\(\therefore \mathrm{h}(x)\) is an odd function.
\(\therefore \int_{\frac{-\pi}{2}}^{\frac{\pi}{2}} \mathrm{~h}(x)=0\)
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