Odd and Even Functions Derivative Problem: A function is called an odd function if it

Chapter 4, Problem 29

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Odd and Even Functions Derivative Problem: A function is called an odd function if it has the property f(x) = f(x). Similarly, f is called an even function if f(x) = f(x). For instance,sine is odd because sin (x) = sin x, andcosine is even because cos (x) = cos x. Use thechain rule appropriately to prove that thederivative of an odd function is an evenfunction and that the derivative of an evenfunction is an odd function.

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