2. If f is Riemann integrable over [a, b] , then the function defined on [a, b] by F(x) = * (a

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2 If F Is Riemann Integrable Over A B Then The Function Defined On A B By F X A R B Is Continuous On A 1 (14.51 KiB) Viewed 28 times

2. If f is Riemann integrable over [a, b] , then the function defined on [a, b] by F(x) = * (a <r<b) is continuous on (a,b). Moreover, if f is continuous at ce [a,b], then F is differentiable at c and F'(c) = f(c).