calc 7.8(10)

Improper Integrals

Objective: Evaluate integrals that become infinite within the interval

of integration

Improper Integrals

• Our main objective in this section is to extend the concept of a definite integral to allow for infinite intervals of integration and integrands with vertical asymptotes within the interval of integration or one of the bounds.

• We will call the vertical asymptotes infinite discontinuities and we will call integrals with infinite intervals of integration or infinite discontinuities within the interval of integration improper integrals.

Improper Integrals

• Examples of such integrals are:• Infinite intervals of integration.

0

dxex

12x

dx

21 x

dx

Improper Integrals

• Examples of such integrals are:• Infinite discontinuities in the interval of integration.

2

1 1x

dx

3

32x

dx

0

tan xdx

Improper Integrals

• Examples of such integrals are:• Both Infinite discontinuities in the interval of

integration and infinite intervals of integration.

92x

dx

0 x

dx

1

sec xdx

Definition

• The improper integral of f over the interval is defined to be

• In the case where the limit exists, the improper integral is said to converge, and the limit is defined to be the value of the integral. In the case where the limit does not exist, the improper integral is said to diverge, and is not assigned a value.

b

ab

a

dxxfdxxf )(lim)(

),[ a

Example 1a

• Evaluate

12x

dx

Example 1a

• Evaluate

12x

dx

b

b x

dx

x

dx

12

12

lim

Example 1a

• Evaluate

12x

dx

b

b x

dx

x

dx

12

12

lim

b

b

b

b xx

dx

112

1limlim

11

11

b

Example 1b

• Evaluate

1 x

dx

Example 1b

• Evaluate

1 x

dx

b

b x

dx

x

dx

11

lim

Example 1b

• Evaluate

Diverges

1 x

dx

b

b x

dx

x

dx

11

lim

bb

b

bx

x

dx1

1

lnlimlim

1lnlnb

Example 1c

• Evaluate

13x

dx

Example 1c

• Evaluate

13x

dx

b

b x

dx

x

dx

13

13

lim

Example 1c

• Evaluate

13x

dx

b

b x

dx

x

dx

13

13

lim

b

b

b

b xx

dx

12

13 2

1limlim

2

1

2

1

2

12

b

Improper Integrals

• These examples lead us to this theorem.

if p > 1 if p < 1

divergesp

x

dxp

11

1

Example 1

• On the surface, the graphs of the last three examples seem very much alike and there is nothing to suggest why one of the areas should be infinite and the other two finite. One explanation is that 1/x3 and 1/x2 approach zero more rapidly than 1/x as x approaches infinity so that the area over the interval [1, b] accumulates less rapidly under the curves y = 1/x3 and y = 1/x2 than under y = 1/x. This slight difference is just enough that two areas are finite and one infinite.

Example 3

• Evaluate

0

)1( dxex x

Example 3

• Evaluate

• We need to use integration by parts.

xu 1

0

)1( dxex x

dxdu dxedv xxev

Example 3

• Evaluate

• We need to use integration by parts.

xu 1

0

)1( dxex x

dxdu dxedv xxev

dxexedxex xxx

)1()1(0

Example 3

• Evaluate

• We need to use integration by parts.

xu 1

0

)1( dxex x

dxdu dxedv xxev

dxexedxex xxx

)1()1(0

xxxxx xeexeedxex

0

)1(

Example 3

• Evaluate

0

)1( dxex x

bxb

x xedxex 0

0

lim)1(

Example 3

• Evaluate

0

)1( dxex x

bxb

x xedxex 0

0

lim)1(

bb e

b

lim

Example 3

• Evaluate

• This is of the form so we will use L’Hopital’s Rule

0

)1( dxex x

bb e

b

lim

Example 3

• Evaluate

• We can interpret this to mean that the net signed area between the graph of and the interval is 0.

0

)1( dxex x

01

lim bb e

xexy )1(),0[

bb e

b

lim

Definition 7.8.3

• The improper integral of f over the interval is defined to be

• The integral is said to converge if the limit exists and diverge if it does not.

b

aa

b

dxxfdxxf )(lim)(

],( b

Definition 7.8.3

• The improper integral of f over the interval is defined to be

where c is any real number (we will usually choose 0 to make it easier). The improper integral is said to converge if both terms converge and diverge if either term diverges.

c

c

dxxfdxxfdxxf )()()(

),(

Example 4

• Evaluate

21 x

dx

Example 4

• Evaluate

21 x

dx

2

)(tanlimtanlim1

lim1

10

1

02

02

bxx

dx

x

dxb

b

b

b

b

Example 4

• Evaluate

21 x

dx

2

)(tanlimtanlim1

lim1

10

1

02

02

bxx

dx

x

dxb

b

b

b

b

2

)tan(limtanlim1

lim1

1010

2

0

2

axx

dx

x

dxa

aa

aa

Example 4

• Evaluate

21 x

dx

2

)(tanlimtanlim1

lim1

10

1

02

02

bxx

dx

x

dxb

b

b

b

b

2

)tan(limtanlim1

lim1

1010

2

0

2

axx

dx

x

dxa

aa

aa

22

Definition 7.8.4

• If f is continuous on the interval [a, b], except for an infinite discontinuity at b, then the improper integral of f over the interval [a, b] is defined as

• In the case where the limit exists, the improper integral is said to converge, and the limit is defined to be the value of the integral. If the limit does not exist, the integral is said to diverge.

k

abk

b

a

dxxfdxxf )(lim)(

Definition 7.8.5

• If f is continuous on the interval [a, b], except for an infinite discontinuity at a, then the improper integral of f over the interval [a, b] is defined as

• In the case where the limit exists, the improper integral is said to converge, and the limit is defined to be the value of the integral. If the limit does not exist, the integral is said to diverge.

b

kak

b

a

dxxfdxxf )(lim)(

Definition 7.8.5

• If f is continuous on the interval [a, b], except for an infinite discontinuity at a point c in (a, b), then the improper integral of f over the interval [a, b] is defined as

• The improper integral is said to converge if both terms converge and diverge if either term diverges.

b

c

c

a

b

a

dxxfdxxfdxxf )()()(

Example 6a

• Evaluate

2

1 1 x

dx

Example 6a

• Evaluate

2

1 1 x

dx

2

1

2

1 1lim

1 kk x

dx

x

dx

Example 6a

• Evaluate

2

1 1 x

dx

21

2

1

2

1

|1|lnlim1

lim1 k

kk

kx

x

dx

x

dx

Example 6a

• Evaluate

2

1 1 x

dx

21

2

1

2

1

|1|lnlim1

lim1 k

kk

kx

x

dx

x

dx

|1|ln|1|ln|1|lnlim 2

1kx k

k

Example 6b

• Evaluate

4

13/2)2(x

dx

Example 6b

• Evaluate

4

13/2)2(x

dx

4

23/2

2

13/2

4

13/2 )2()2()2( x

dx

x

dx

x

dx

Example 6b

• Evaluate

4

13/2)2(x

dx

4

23/2

2

13/2

4

13/2 )2()2()2( x

dx

x

dx

x

dx

3/12

13/22

2

13/2

)2(3lim)2(

lim)2(

x

x

dx

x

dxk

k

k

Example 6b

• Evaluate

4

13/2)2(x

dx

4

23/2

2

13/2

4

13/2 )2()2()2( x

dx

x

dx

x

dx

3/12

13/22

2

13/2

)2(3lim)2(

lim)2(

x

x

dx

x

dxk

k

k

3)21(3)2(3lim 3/13/1

2

k

k

Example 6b

• Evaluate

4

13/2)2(x

dx

4

23/2

2

13/2

4

13/2 )2()2()2( x

dx

x

dx

x

dx

3/12

4

3/22

4

23/2

)2(3lim)2(

lim)2(

x

x

dx

x

dxk

kk

Example 6b

• Evaluate

4

13/2)2(x

dx

4

23/2

2

13/2

4

13/2 )2()2()2( x

dx

x

dx

x

dx

3/12

4

3/22

4

23/2

)2(3lim)2(

lim)2(

x

x

dx

x

dxk

kk

33/13/1

223)2(3)24(3lim

k

k

Example 6b

• Evaluate

4

13/2)2(x

dx 3 233

Homework

• Section 7.8• Page 554• 1-21 odd• Skip 5