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Created by T. Madas
Created by T. Madas
INTEGRATION
BY REVERSE CHAIN RULE
Created by T. Madas
Created by T. Madas
Question 1
Carry out each of the following integrations.
1. ( ) ( )4 5
2 233 1 1
10x x dx x C− = − +∫
2. ( ) ( )1 1
2 3 32 211 4 1 4
6x x dx x C
−
− = − − +∫
3. 3 44sin cos sinx x dx x C= +∫
4. 2 31sin cos cos
3x x dx x C= − +∫
5. 2
2
1010 7
7
xdx x C
x
= − +−∫
6. 2 2
6 e 3ex xx dx C= +∫
7. 4 2 51tan sec tan
5x x dx x C= +∫
8. 4 41sec tan sec
4x x dx x C= +∫
9. sin 2 sin 21e cos 2 e
2
x xx dx C= +∫
10. ( )2ln 1
ln2
xdx x C
x= +∫
11. ( )32
2 2cos sin 2 sin
3x x dx x C= +∫
12. 32
32
14 5
5
dx x x C
x x
= + +
+∫
Created by T. Madas
Created by T. Madas
Created by T. Madas
Created by T. Madas
Question 2
Carry out each of the following integrations.
1. ( )3
4
4
1ln 2
2 4
xdx x C
x= + +
+∫
2. 2
3
3
1ln 4
4 3
xdx x C
x= − − +
−∫
3. 2
2
42ln 1
1
xdx x C
x= − +
−∫
4. 2
3
3
3ln 1
1
xdx x C
x= + +
+∫
5. 2
2
2
3e 3ln e 1
e 1 2
x
x
xdx C= − +
−∫
6. 24sec
4ln tan 4lnsec 4lnsintan
xdx x C x x C
x= + = + +∫
7. ( )2
2
1ln 9 1
9 1 18
xdx x C
x= + +
+∫
8. 2cosec
ln 1 cot1 cot
xdx x C
x= − + +
+∫
9. 2
2
42ln 10
10
xdx x C
x= − +
−∫
10. ( )ln 2 12
2 1 ln 2
xx
xdx C
+= +
+∫
Created by T. Madas
Created by T. Madas
Created by T. Madas
Created by T. Madas
Question 3
Carry out each of the following integrations.
1. 2
2
1ln 9
9 2
xdx x C
x= − +
−∫
2. 2
2
105ln 9
9
xdx x C
x= − +
−∫
3. 2
2
3 3ln 4 2
4 2 4
xdx x C
x= − − +
−∫
4. 2
3
3
1ln 1
1 3
xdx x C
x= + +
+∫
5. 2
2
2 6ln 6 1
6 1
xdx x x C
x x
+= + + +
+ +∫
6. 3
3
3
4e 4ln 1 e
1 e 3
x
x
xdx C= − − +
−∫
7. ( )ln 3 13
3 1 ln 3
xx
xdx C
+= +
+∫
8. ( )22
2
ln 5 35
5 3 ln 25
xx
xdx C
+= +
+∫
9. 2
2
2 1ln 4 2
4 2 2
xdx x x C
x x
−= − − +
− −∫
10. sin cos
ln sin cossin cos
x xdx x x C
x x
−= − + +
+∫
Created by T. Madas
Created by T. Madas
Created by T. Madas
Created by T. Madas
Question 4
Carry out each of the following integrations.
1. ( )
( )2
2
32
11
41
xdx x C
x
−
= − − +−∫
2. 2 21 1 1cos sin sin cos cos 2
2 2 4x x dx x C x C x C= + = − + = − +∫
3. 2
2
42 1 2
1 2
xdx x C
x
= − − +−∫
4. ( )2 2 31sec 1 tan tan tan
3x x dx x x C+ = + +∫
5. ( ) ( )22 1
sec 1 tan 1 tan2
x x dx x C+ = + +∫
6. ( )32
2sec tan sec 1 sec 1
3x x x dx x C+ = + +∫
7. 2 2 31tan sec tan
3x x dx x C= +∫
8. sin sine cos ex xx dx C= +∫
9. ( )322 2
sin cos sin3
x x dx x C= +∫
10. ( ) ( ) ( )2
2 2 4 3 21 1 32 1 1 1
2 2 2x x x dx x x C x x x x C+ + + = + + + = + + + +∫
Created by T. Madas
Created by T. Madas
Created by T. Madas
Created by T. Madas
Question 5
Carry out each of the following integrations.
1. ( ) ( ) ( )2 22 1 sin 1 cos 1x x x dx x x C+ + + = − + + +∫
2. ( ) ( ) ( )2 211 cos 2 1 sin 2 1
2x x x dx x x C+ + + = + + +∫
3. ( ) ( )
3 2
1 1
1 ln 2 1 lndx C
x x x
= − ++ +∫
4. 4 514 cos sin 4 cos
5x x dx x x C− = + +∫
5. 2 2
3
cos 1 1cosec cot
sin 2 2
xdx x C x C
x= − + = − +∫
6. ( )32
2
1 2 tan 11 2 tan
cos 3
xdx x C
x
+= + +∫
7. cos
2 sinsin
xdx x C
x= +∫
8. 1
ln lnln
dx x Cx x
= +∫
9. 2 4 3
1 1
cos tan 3tandx C
x x x= − +∫
10. 3 41sin 2 cos 2 sin 2
8x x dx x C= +∫
Created by T. Madas
Created by T. Madas
Created by T. Madas
Created by T. Madas
Question 6
Carry out each of the following integrations.
1. ( )
( )cos ln
sin lnx
dx x Cx
= +∫
2. 2
2
3 34 2
24 2
xdx x C
x
= − − +−∫
3. 3
4
sin 1sec
cos 3
xdx x C
x= +∫
4. 3 41cos sin sin
4x x dx x C= +∫
5. 2
3
4
sin 1tan
cos 3
xdx x C
x= +∫
6. ( ) ( )e sin e cos ex x xdx C= − +∫
7. 4 51sin 2 cos 2 cos 2
10x x dx x C= − +∫
8. ( ) ( )3 52 22 3 31
3 4 2 4 25
x x dx x C− = − − +∫
9. ( )2
23
3 2
1 32 3
42 3
xdx x x C
x x
+= + + +
+ +∫
10. 21 1sin 2 cos 2 sin 2 or cos 4
4 8x x dx x C x C= + − +∫
Created by T. Madas
Created by T. Madas
Question 7
Carry out each of the following integrations.
1. ( )
( )2
3ln 1ln
3
xdx x C
x= +∫
2. ( )( ) ( )4 5
2 211 2 1 2 1
10x x x dx x x C+ + + = + + +∫
3. 4 51sin cos cos
5x x dx x C= − +∫
4. 3 31sec tan sec
3x x dx x C= +∫
5. ( ) ( )4 5
2 213 3
10x x dx x C+ = + +∫
6. 3
cos 2
sinsin
xdx C
xx
= − +∫
7. 32cos sin sin
3x x dx x C= +∫
8. ( ) ( )
2
3 2
sec 1
1 tan 2 1 tan
xdx C
x x
= − ++ +∫
9. sin cos 1 2
cos 2 1 cos2 2cos 2 1
x xdx x C x
x= − + + = −
+∫
10. ( )2
2lnln
xdx x C
x= +∫
Created by T. Madas
Created by T. Madas
Question 8
Carry out each of the following integrations.
1. ( ) ( )3 52 22 3 31
3 4 2 4 25
x x dx x C− = − − +∫
2. e
2ex
xdx C
x= +∫
3.
31 22
1 41
3
xdx x C
x
+= + +
∫
4. 2
21
1
xdx x C
x
= + ++∫
5. 2
12 tan
cosdx x C
x x= +∫
6. 2
21
1
xdx x C
x
= + ++∫
7. 1
4 11
dx x C
x x
= + +
+∫
8. 4
5
sin 1sec
cos 4
xdx x C
x= +∫
9. ( )322 21
1 13
x x dx x C− = − − +∫
10.
31 22
2 3 22 3
4 3
xdx x C
x
+= + +
∫
Created by T. Madas
Created by T. Madas
Question 9
Carry out each of the following integrations.
1. ( )2
20
24 2 1
4
xdx
x
= −+∫
2. ( )
36
0
1ln16
2dx
x x
=+∫
3.
3
2
0
1ln 2
9 2
xdx
x=
+∫