Calculus: An Applied Approach (Min...

10th Edition

Ron Larson

ISBN: 9781305860919

Textbook Problem

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Evaluating a Definite Integral In Exercises 17-38, evaluate the definite integral. See Examples 3 and 4.

∫ − 1 1 ( e x − e − x ) d x

To determine

To calculate: The value of definite integral ∫−11(ex−e−x)dx.

Explanation

Given Information:

The integral is ∫−11(ex−e−x)dx.

Formula used:

The fundamental theorem of calculus states that,

If f is integrable on interval [a,b] then ∫abf(x)dx=F(b)−F(a).

The integration formula is ∫exdx=ex+C.

Calculation:

Consider the integral,

∫−11(ex−e−x)dx

First find antiderivative by applying the integration formula,

∫−11(ex−e−</

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Evaluating a Definite Integral In Exercises 17-38, evaluate the definite integral. See Examples 3 and 4. ∫ − 1 1 ( e x − e − x ) d x

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Math
Calculus Calculus: An Applied Approach (MindTap Course List)10th Edition

Evaluating a Definite Integral In Exercises 17-38, evaluate the definite integral. See Examples 3 and 4.

∫ − 1 1 ( e x − e − x ) d x