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Title: Integration exercises
Description: integration exercises and answers to further develop integrating skills, this is my notes from university mechanical engineering course
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FY009 INTEGRATION TUTORIAL 1
(1)

Estimate the area under the curve of the function y  x 4 for 0  x  2 using 4
subintervals, working to four decimal places throughout
...


(2)

Evaluate the following integrals
...
Where appropriate expand the
brackets
...
25, 0
...
25 and 1
...

A  0
...
254  0
...
254  1
...
0703
...
4

5
 5 0
0
2

4

(2)

(a)

x9
c
9

(3)

(a)

x 3
c
3

(c)

5x 9 / 5
c
9

x3
 x 2  4x  c
3

(b)

x7 x5

 x3  2x  c
7
5

(c)

1
c
2x 2

(d)

2x 3 / 2
2 x c
3

(e)

x 3 5x 2

 6x  c
3
2

(f) 2 x 3 

(g)

x2 2
5
  2 c
2 x 2x

(h) 3x 3  3x 2  x  c

(b)

(d)

2
7

5x 2
 4x  c
2

(i) g ( x)  x 4  2 x 3  x  c

Final Answer  34
...
25
4

(k) g ( x) 

2x 3 / 2
 x4 x
3

Final Answer  5
...
2
5

Final Answer 

78
 15
...
5
2

INTEGRATION EXERCISES 2
1
...

(a)

 sin(5x) dx

(c)

 sin 3x  cos 4 x  5e

(e)

 4 ln( x) dx

(g)



1
16  x

2

(b)

dx

dx

(d)

 3x  x dx

(f)

2x

 4 cos(8x) dx

e

(h)

x

1

(i)

 x   sin(x)dx

2
...
(You may assume

2

0




 x
  sin x  cos 2   dx
 

0

3x

5

(j)

0

(k)

1

( x  1) 2
ln(x)
and y 
81
ln(10)

ln( x) ( x  1) 2
for x in the given range)
...

3
...

cos(2 x)  cos 2 x  sin 2 x to show that sin 2 x  
2
2
(b) Use the answer to part (a) to show  sin 2 x dx 

x sin(2 x)

 c
...




cos 3x sin 4 x 5e 2 x


 c (d)
3
4
2

4 x ln x  4 x  c

(e)

(g)
(i)
(k)

10

2
...
5
0

ln( x)

(f)

(h)
(j)
(l)

sin(8 x)
c
2
3 2
x  ln( x)  c
2

e 3 x  e 3 x
c
3
4
 x
tan 1    c
3
3
0
...
3054

9

 ln(10) dx  10  ln 10  6
...

1

( x  1) 2
x 2 2x 1
 81 dx   81  81  81 dx  3
1
1

10

10

Hence the required area is 6
...
0913
...


(a) From the first of the trig equations we get cos 2 x  1  sin 2 x
...


Rearranging to make sin 2 x the subject gives sin 2 x 

1 cos(2 x)
which is

2
2

the required result
...


(b) From part (a) we get  sin 2 x dx  

Title: Integration exercises
Description: integration exercises and answers to further develop integrating skills, this is my notes from university mechanical engineering course
Buy These NotesPreview