Question: Exercise 5.3.10: A function f is an odd function if f(x) = -f(-x), and f is an even function if f (x) = f(-x). Let

Exercise 5.3.10: A function f is an odd function if f(x)
= -f(-x), and f is an even function if f (x) =

Exercise 5.3.10: A function f is an odd function if f(x) = -f(-x), and f is an even function if f (x) = f(-x). Let a > 0. Assume f is continuous. Prove: a) If f is odd, then faaf = 0. b) If f is even, then Saaf = 2fo f

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