Integrating Even and Odd Functions In Exercises 61–64, evaluate the definite integral using the properties of even and odd functions. See Example 8 . ∫ − 1 1 ( 2 t 5 − 2 t ) d t
Integrating Even and Odd Functions In Exercises 61–64, evaluate the definite integral using the properties of even and odd functions. See Example 8 . ∫ − 1 1 ( 2 t 5 − 2 t ) d t
Solution Summary: The author explains how to calculate the definite integral of function displaystyle
Integrating Even and Odd Functions In Exercises 61–64, evaluate the definite integral using the properties of even and odd functions. See Example 8.
∫
−
1
1
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2
t
5
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d
t
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
Section 2.4: Chain rule
In Exercises 9–34, find the derivative of the function.
Write the definition of the definite integral of a function from a to b. (b) What is the geometric interpretation of f(x) dx if f(x) > 0? (c) What is the geometric interpretation of f(x) dx if f(x) takes on both positive and negative values? Illustrate with a diagram
Part 1 of 4
0.83
The area of the shaded region is
Chapter 5 Solutions
Bundle: Calculus: An Applied Approach, Loose-Leaf Version, 10th + WebAssign Printed Access Card for Larson's Calculus: An Applied Approach, 10th Edition, Single-Term
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