, 02.12.2019 22:00 lizdeleon248

# Exercise 5.3.10: a function f is an odd function if f(x) = βf(βx), and f is an even function if f(x) = f(βx). let a > 0. assume f is continuous. prove: a) if f is odd, then r a βa f = 0. b) if f is even, then r a βa f = 2 r a 0 f

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Exercise 5.3.10: a function f is an odd function if f(x) = βf(βx), and f is an even function if f(x...
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