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How do you use substitution to integrate
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Text solutionVerified
Explanation:
We have to evaluate,
So, let
(By simple differentiation)
Thus the integral
In terms of , the integral is,
, where is the integration constant.
We have to evaluate,
So, let
(By simple differentiation)
Thus the integral
In terms of , the integral is,
, where is the integration constant.
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Question Text | How do you use substitution to integrate |
Topic | Integration & Its applications |
Subject | AP Calculus BC |
Class | High School |
Answer Type | Text solution:1 |