Suppose we want to evaluate the definite integral, rV2504 - 4r dr using the substitution, u= 2504 - 4r2. Part 1. Re-write the definite integral in terms of the variable u and remember to use the limits of integration for the function u = f(r), Then, input the antiderivative of the integrand and the limits of integration you found. %3D Note: Type your answers above in such a way that the lower limit of integration is less than the upper limit of integration. Part 2. Finally, evaluate the original integral by evaluating the antiderivative using limits of integration from Part 1. above. rV 2504- 4r dr =

Suppose we want to evaluate the definite integral, rV2504 - 4r dr using the substitution, u= 2504 - 4r2. Part 1. Re-write the definite integral in terms of the variable u and remember to use the limits of integration for the function u = f(r), Then, input the antiderivative of the integrand and the limits of integration you found. %3D Note: Type your answers above in such a way that the lower limit of integration is less than the upper limit of integration. Part 2. Finally, evaluate the original integral by evaluating the antiderivative using limits of integration from Part 1. above. rV 2504- 4r dr =

Trigonometry (MindTap Course List)

10th Edition

ISBN:9781337278461

Author:Ron Larson

Publisher:Ron Larson

Chapter6: Topics In Analytic Geometry

Section: Chapter Questions

Problem 33CT

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Question

25
Suppose we want to evaluate the definite integral,
rV2504 – 4r dr using the substitution, u = 2504 – 4r2.
Part 1.
Re-write the definite integral in terms of the variable u and remember to use the limits of integration for the function u = f(r). Then, input the antiderivative of the integrand and the limits of integration you found.
/-
%3D
Note: Type your answers above in such a way that the lower limit of integration is less than the upper limit of integration.
Part 2.
Finally, evaluate the original integral by evaluating the antiderivative using limits of integration from Part 1. above.
25
rV2504 – 4r2 dr =
16

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