Problem 178: Find a formula for the Riemann sum obtained by dividing the interval into equal subintervals and using the right-hand endpoint for each . Then take a limit of these sums as to calculate the area under the curve over .
Solution: We will divide the interval into subintervals. Since the subintervals have the same length, the length of the subintervals is given by
The height of the subintervals is given by
which is the height of the function at each right-hand point of the subintervals. That is, the Riemann sum is given by
(1)
Taking the limit,
(2)
Hence, the area under the curve over the interval is .
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