in this section, we introduce the idea of the indefinite integral. we also look at the process of...

14

In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more complex functions. Section 5.4 Finding Antiderivatives: Substitution

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Page 1: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more complex functions.

Section 5.4 Finding Antiderivatives: Substitution

Page 2: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Definition

For any function f, is called the indefinite

integral of f and represents the most general

antiderivative of f.

Page 3: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Definition

For any function f, is called the indefinite

integral of f and represents the most general

antiderivative of f.

For example:

Page 4: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Example 1

Find each of the following:

(a)

(b)

(c)

Page 5: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Example 1cont.

Find each of the following:

(d)

(e)

(f)

Page 6: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Substitution

What if the integrand is not something that we recognize as a “basic” antiderivative rule?

For example,

We would like to do a variable substitution so that the “new” integral is one that we recognize as a “basic” antiderivative rule.

Page 7: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

TheoremChange of Variables in an

Integral

Let f, u, and g be continuous functions such that:

for all x.

Then:

Page 8: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

The Process

Substitute: Choose a function u = u(x) such that the substitution of u for x and du for dx changes into

Antidifferentiate: Solve - that is, find G(u) such that

Resubstitute: Substitute x back in for u to get the answer to have an antiderivative of the original function

Page 9: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Our Example

Looking again at

Page 10: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Example 2

Find each of the following:

(a)

(b)

Page 11: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Example 3

Find each of the following:

(a)

(b)

Page 12: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Example 4

Find each of the following:

(a)

(b)

Page 13: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

TheoremChange of Variables in a Definite

Integral

Let f, u, and g be continuous functions such that:

for all x.

Then:

Page 14: In this section, we introduce the idea of the indefinite integral. We also look at the process of variable substitution to find antiderivatives of more

Example 5

Find each of the following:

(a)

(b)

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