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Definition 6.1.1 - Let f be a real-valued function defined on an interval I containing the point c. (We allow the possibility that c is an endpoint of I.) We say that f is differentiable at c (or has a derivative at c) if the limit as x approaches c (f(x)-f(c))/(x-c) exists and is finite. We denote the derivative of f at c by f'(c) so that f'(c) = the limit at x approaches c (f(x)-f(c))/(x-c) whenever the limit exists and is finite. If the functin f is differentiable at each point of the set S subset I, then f is said to be differentiable on S, and the function f':S to Real Numbers is called the derivative of f on S.

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x sin 2 x + 0 Let f(x) = x = 0 (b) Use Definition 6.1.1 to show that f is differentiable at a = 0 and find f' (0).