20 Dec 2021
Problem 63c
Page 182
Section: 3.1 Derivatives of Polynomials and Exponential Functions
Chapter 3: Differentiation Rules
Textbook ExpertVerified Tutor
20 Dec 2021
Given information
Antiderivative for , where .
Step-by-step explanation
Step 1.
Following the pattern from the previous 2 parts of this exercise, we could propose that the antiderivative of a power function is what we have to the left, where is a constant and
We can check this antiderivative by differentiating it.
Because truly is the antiderivative of .
The antiderivatives of f(x)=