Question: Given that f (x) = + is Riemann integrable on [1, 2) calculate U (P) and L(P) and deduce that both converge to In

Given that f (x) = + is Riemann integrable on [1, 2)

Given that f (x) = + is Riemann integrable on [1, 2) calculate U (P) and L(P) and deduce that both converge to In v2. [P, is obtained by dividing [1, 2) into n equal intervals]

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