If f:R→R is an invertible function such that f(x) and f−1x are symmetric about the line y=−x, then
A
f(x) is odd
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B
f(x) and f−1(x) may not be symmetric about the line y=x
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C
f(x) may not be odd
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D
None of these
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Solution
The correct option is Af(x) is odd Since f(x) and f−1(x) are symmetric about the line y=−x, if (α,β) lies on y=f(x), then (−β,−α) lies on y=f−1(x). Therefore, (−α,−β) lies on y=f(x). Hence, f(x) is an odd function.