12 x1 t01 03 integrating derivative on function (2013)

Integrating Derivative
on Function

on Function


f  x 
dx  log f  x   c
f x

on Function

e.g. (i)

1
 7  3x dx

f  x 
f x

on Function

e.g. (i)

1
 7  3x dx
1 3
 
dx
3 7  3x

f  x 
f x

on Function

e.g. (i)

f  x 
f x

1
 7  3x dx
1 3
 
dx
3 7  3x
1
  log7  3 x   c
3

on Function

e.g. (i)

f  x 
f x

1
 7  3x dx
1 3
 
dx
3 7  3x
1
  log7  3 x   c
3

ii 

dx
 8x  5

on Function

e.g. (i)

f  x 
f x

1
 7  3x dx
1 3
 
dx
3 7  3x
1
  log7  3 x   c
3

dx
 8x  5
1 8dx
 
8 8x  5

ii 

on Function

e.g. (i)

f  x 
f x

1
 7  3x dx
1 3
 
dx
3 7  3x
1
  log7  3 x   c
3

dx
 8x  5
1 8dx
 
8 8x  5
1
 log8 x  5  c
8

ii 

on Function


f  x 
f x

e.g. (i)  1 dx
7  3x
1 3
 
dx
3 7  3x
1
  log7  3 x   c
3

dx
ii  
8x  5
1 8dx
 
8 8x  5
1
 log8 x  5  c
8

x5
iii   6 dx
x 2

on Function


f  x 
f x

e.g. (i)  1 dx
7  3x
1 3
 
dx
3 7  3x
1
  log7  3 x   c
3

dx
ii  
8x  5
1 8dx
 
8 8x  5
1
 log8 x  5  c
8

x5
iii   6 dx
x 2
1 6 x5
  6
dx
6 x 2

on Function


f  x 
f x

e.g. (i)  1 dx
7  3x
1 3
 
dx
3 7  3x
1
  log7  3 x   c
3

dx
ii  
8x  5
1 8dx
 
8 8x  5
1
 log8 x  5  c
8

x5
iii   6 dx
x 2
1 6 x5
  6
dx
6 x 2
1
 logx 6  2   c
6

1
iv   dx
5x
1 5
  dx
5 5x

1
iv   dx
5x
1 5
  dx
5 5x
1
 log 5 x  c
5

1
iv   dx
5x
1 5
  dx
5 5x
1
 log 5 x  c
5

OR

1 1
 x dx
5

1
iv   dx
5x
1 5
  dx
5 5x
1
 log 5 x  c
5

OR

1 1
 x dx
5
1
 log x  c
5

1
iv   dx
5x
1 5
  dx
5 5x
1
 log 5 x  c
5
4x 1
v  
dx
2x 1

OR

1 1
 x dx
5
1
 log x  c
5

1
iv   dx
5x
1 5
  dx
5 5x
1
 log 5 x  c
5
4x 1
v  
dx
2x 1

OR

1 1
 x dx
5
1
 log x  c
5

order numerator  order denominator

1
iv   dx
5x
1 5
  dx
5 5x
1
 log 5 x  c
5
4x 1
v  
dx
2x 1

OR

1 1
 x dx
5
1
 log x  c
5

 polynomial division

1
iv   dx
5x
1 5
  dx
5 5x
1
 log 5 x  c
5
4x 1
v  
dx
2x 1

OR

1 1
 x dx
5
1
 log x  c
5

2
2x 1 4x 1
4x  2
1

1
iv   dx
5x
1 5
  dx
5 5x
1
 log 5 x  c
5
4x 1
dx
v  
2x 1
2  1  dx
 

 2 x  1

OR

1 1
 x dx
5
1
 log x  c
5

2
2x 1 4x 1
4x  2
1

1
iv   dx
5x
1 5
  dx
5 5x
1
 log 5 x  c
5

OR

1 1
 x dx
5
1
 log x  c
5

4x 1
dx
v  
2x 1
2  1  dx
2
 
2x 1 4x 1

 2 x  1
1
4x  2
 2 x  log2 x  1  c
2
1

vi 

2

2x
 x 2  1dx
1

vi 

2

2x
 x 2  1dx
1

 logx  11
2

2

vi 

2

2x
 x 2  1dx
1

 logx  11
2

2

 log 5  log 2

vi 

2

2x
 x 2  1dx
1

 logx  11
2

2

 log 5  log 2
5
 log 
2

vi 

2

vii  Differentiate x 3 log x and hence

2x
 x 2  1dx
1

 logx  11
2

2

 log 5  log 2
5
 log 
2

integrate x 2 log x

vi 

2


2x
 x 2  1dx
1

 logx  11
2

2

 log 5  log 2
5
 log 
2

integrate x 2 log x
d 3
3 1
x log x  x    log x 3x 2 
dx
 x

vi 

2


2x
 x 2  1dx
1

 logx  11
2

2

 log 5  log 2
5
 log 
2

integrate x 2 log x
d 3
3 1
x log x  x    log x 3x 2 
dx
 x
 x 2  3 x 2 log x

vi 

2


2x
 x 2  1dx
1

 logx  11
2

2

 log 5  log 2
5
 log 
2

integrate x 2 log x
d 3
3 1
x log x  x    log x 3x 2 
dx
 x
 x 2  3 x 2 log x

 x

2

 3 x 2 log x dx  x 3 log x  c

vi 

2


2x
 x 2  1dx
1

 logx  11
2

2

 log 5  log 2
5
 log 
2

integrate x 2 log x
d 3
3 1
x log x  x    log x 3x 2 
dx
 x
 x 2  3 x 2 log x

 x

2

 3 x 2 log x dx  x 3 log x  c

3 x 2 log xdx  x 3 log x   x 2 dx  c

vi 

2


2x
 x 2  1dx
1

 logx  11
2

2

 log 5  log 2
5
 log 
2

integrate x 2 log x
d 3
3 1
x log x  x    log x 3x 2 
dx
 x
 x 2  3 x 2 log x

 x

2

 3 x 2 log x dx  x 3 log x  c

1 3
1 3
 x log xdx  3 x log x  9 x  c
2

vi 

2


2x
 x 2  1dx
1

 logx  11
2

2

 log 5  log 2
5
 log 
2

integrate x 2 log x
d 3
3 1
x log x  x    log x 3x 2 
dx
 x
 x 2  3 x 2 log x

 x

2

 3 x 2 log x dx  x 3 log x  c

1 3
1 3
 x log xdx  3 x log x  9 x  c
2

Exercise 12D; 1 to 12 ace in all, 14a*
Exercise 12E; 1 to 6 all, 7 to 21 odds, 22abc*, 23*

12 x1 t01 03 integrating derivative on function (2013)

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