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Definite the Integral as the limit of a sum

Calculus
Integral Calculus(VII)
Definite Integral as the Limit of a sum
Method of Summation
Definite Integral

It is an explanation for finding the integral by the method of summation i.e., by evaluating
the integral as limit of a sum(part 7).

Evaluate the definite integral
∫ x^(1/2)dx, where the lower limit is 0 and the upper limit is 1,
i.e., integral of x^(1/2), where the lower limit is 0 and the upper limit is 1.
as limit of a sum.

See the attached file.

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Calculus
Integral Calculus(VII)
Definite Integral as the Limit of a sum
Method of ...

Solution Summary

This solution is comprised of a detailed explanation for finding the value of the definite integral by
using the method of summation.
It contains step-by-step explanation for the following problem:

Evaluate the definite integral
∫ x^(1/2)dx, where the lower limit is 0 and the upper limit is 1,
i.e., integral of x^(1/2), where the lower limit is 0 and the upper limit is 1
as limit of a sum.
Solution contains detailed step-by-step explanation.

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