12 x1 t02 02 integrating exponentials (2014)

Integrating
Exponentials
e ax dx 


Integrating
Exponentials
1 ax
 e dx  a e  c
ax

Integrating
Exponentials
1 ax
 e dx  a e  c
ax



f  x e f  x dx 

Integrating
Exponentials
1 ax
 e dx  a e  c
ax



f  x e f  x dx  e f  x   c

Integrating
Exponentials
1 ax
 e dx  a e  c
ax


e.g. i   e5 x dx

f  x e f  x dx  e f  x   c

Integrating
Exponentials
1 ax
 e dx  a e  c
ax


e.g. i   e5 x dx
1
 e5 x  c
5

f  x e f  x dx  e f  x   c

Integrating
Exponentials
1 ax
 e dx  a e  c
ax


e.g. i   e5 x dx
1
 e5 x  c
5

f  x e f  x dx  e f  x   c

OR

e5 x dx

1
  5e5 x dx
5

Integrating
Exponentials
1 ax
 e dx  a e  c
ax


e.g. i   e5 x dx
1
 e5 x  c
5

f  x e f  x dx  e f  x   c

OR

e5 x dx

1
  5e5 x dx
5
1
 e5 x  c
5

1
x2
ii   xe dx   2 xe dx
2
x2

1
x2
2
1 x2
 e c
2
x2

1
x2
2
1 x2
 e c
2
x2

iii   e9 x 5 dx  1  9e9 x 5 dx
9

1
x2
2
1 x2
 e c
2
x2

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

1
x2
2
1 x2
 e c
2
x2

iv 



e x dx

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

1
x2
2
1 x2
 e c
2
x2

iv 



x
2

e x dx   e dx

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

1
x2
2
1 x2
 e c
2
x2

iv 



x
2

e x dx   e dx
x

1
 2  e 2 dx
2

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

1
x2
2
1 x2
 e c
2
x2

iv 



x
2

e x dx   e dx
x

1
 2  e 2 dx
2
x
2

 2e  c
 2 ex  c

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

1
x2
2
1 x2
 e c
2
x2

iv 



x
2

e x dx   e dx
x

1
 2  e 2 dx
2
x
2

 2e  c
 2 ex  c

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

v 

 e

x

 1e x  3dx

1
x2
2
1 x2
 e c
2
x2

iv 



x
2

e x dx   e dx
x

1
 2  e 2 dx
2
x
2

 2e  c
 2 ex  c

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

v 

 e  1e  3dx
  e  2e  3dx
x

x

2x

x

1
x2
2
1 x2
 e c
2
x2

iv 



x
2

e x dx   e dx
x

1
 2  e 2 dx
2
x
2

 2e  c
 2 ex  c

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

v 

 e  1e  3dx
  e  2e  3dx
x

x

2x

x

1 2x
 e  2e x  3 x  c
2

1
x2
2
1 x2
 e c
2
x2

iv 



x
2

e x dx   e dx
x

1
 2  e 2 dx
2
x
2

 2e  c
 2 ex  c

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

v 

 e  1e  3dx
  e  2e  3dx
x

x

2x

x

1 2x
 e  2e x  3 x  c
2
e5 x  e x
vi   2 x dx
e

1
x2
2
1 x2
 e c
2
x2

iv 



x
2

e x dx   e dx
x

1
 2  e 2 dx
2
x
2

 2e  c
 2 ex  c

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

v 

 e  1e  3dx
  e  2e  3dx
x

x

2x

x

1 2x
 e  2e x  3 x  c
2
e5 x  e x
vi   2 x dx
e
  e3 x  e  x dx

1
x2
2
1 x2
 e c
2
x2

iv 



x
2

e x dx   e dx
x

1
 2  e 2 dx
2
x
2

 2e  c
 2 ex  c

iii   e9 x 5 dx  1  9e9 x 5 dx
9
1 9 x 5
 e
c
9

v 

 e  1e  3dx
  e  2e  3dx
x

x

2x

x

1 2x
 e  2e x  3 x  c
2
e5 x  e x
vi   2 x dx
e
  e3 x  e  x dx
1 3x x
 e e c
3

vii 

1

x e

2 x3

0

dx

vii 

1

x e

2 x3

0
1

dx

1
2 x3
  3 x e dx
30

vii 

1

x e

2 x3

0
1

dx

1
2 x3
  3 x e dx
30
1 x3 1
 e 0
3

 

vii 

1

x e

2 x3

0
1

dx

1
2 x3
  3 x e dx
30
1 x3 1
 e 0
3
1 1 0
 e  e 
3

 

vii 

1

x e

2 x3

0
1

dx

1
2 x3
  3 x e dx
30
1 x3 1
 e 0
3
1 1 0
 e  e 
3
1
 e  1
3

 

vii 

1

x e

2 x3

0
1

dx

1
2 x3
  3 x e dx
30
1 x3 1
 e 0
3
1 1 0
 e  e 
3
1
 e  1
3

 

viii   3x dx

vii 

1

x e

2 x3

0
1

dx

1
2 x3
  3 x e dx
30
1 x3 1
 e 0
3
1 1 0
 e  e 
3
1
 e  1
3

 

3x

c
log 3

vii 

1

x e

2 x3

0
1

dx

1
2 x3
  3 x e dx
30
1 x3 1
 e 0
3
1 1 0
 e  e 
3
1
 e  1
3

3x

c
log 3

 

Exercise 13C; 2 to 8 ace etc, 9, 10,
11, 13, 17

Exercise 13D; 2 to 18 evens, 21*

12 x1 t02 02 integrating exponentials (2014)

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