In this problem you will calculate +1) dæ by using the definition 4 | f(2) da = limIE f(z:)A¤ n00 i=1 The summation inside the brackets is R, which is the Riemann sum where the sample points are chosen to be the right-hand endpoints of each sub-int Calculate Rn for f(x) = - +1 on the interval 0, 3] and write your answer as a function of n without any summation signs. R, = lim Rn = Note: You can earn partial credit on this problem.

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Consider the function f(x) = - +1. In this problem you will calculate +1) dæ by using the definition 4 f(x) dæ = lim f(#:)A¤ n00 i=1 The summation inside the brackets is R, which is the Riemann sum where the sample points are chosen to be the right-hand endpoints of each sub-interval. Calculate Rn for f(x) = - +1 on the interval 0, 3 and write your answer as a function of n without any summation signs. R, = lim R=| Note: You can earn partial credit on this problem.