Basic Engineering Mathematics, Fifth Edition

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326 Basic Engineering Mathematics


(b) When a sum of several terms is integrated the
result is the sum of the integrals of the separate
terms. For example,

( 3 x+ 2 x^2 − 5 )dx

=


3 xdx+


2 x^2 dx−


5 dx

=

3 x^2
2

+

2 x^3
3

− 5 x+c

35.3 Standard integrals

From Chapter 34,
d
dx

(sinax)=acosax. Since inte-
gration is the reverse process of differentiation, it
follows that

acosax dx=sinax+c

or


cosax dx=

1
a

sinax+c

By similar reasoning

sinax dx=−

1
a

cosax+c

eaxdx=

1
a

eax+c

and


1
x

dx=lnx+c

From above,


axndx=

axn+^1
n+ 1

+cexcept when
n=− 1
Whenn=− 1 ,


x−^1 dx=

∫ 1
x

dx=lnx+c
A list of standard integrals is summarized in
Table 35.1.
Table 35.1Standard integrals
y


ydx

1.


axn

axn+^1
n+ 1

+c(except whenn=− 1 )

2.


cosax dx

1
a

sinax+c

3.


sinax dx −

1
a

cosax+c

4.


eaxdx

1
a

eax+c

5.

∫ 1
x

dx lnx+c

Problem 1. Determine


7 x^2 dx

The standard integral,


axndx=

axn+^1
n+ 1

+c

Whena=7andn= 2 ,

7 x^2 dx=

7 x^2 +^1
2 + 1

+c=

7 x^3
3

+c or

7
3

x^3 +c

Problem 2. Determine


2 t^3 dt

Whena=2andn= 3 ,

2 t^3 dt=

2 t^3 +^1
3 + 1

+c=

2 t^4
4

+c=

1
2

t^4 +c

Note that each of the results in worked examples 1 and
2 may be checked by differentiating them.

Problem 3. Determine


8 dx


8 dxis the same as


8 x^0 dxand, using the general
rule whena=8andn=0, gives

8 x^0 dx=

8 x^0 +^1
0 + 1

+c= 8 x+c

In general, ifkis a constant then


kdx=kx+c.

Problem 4. Determine


2 xdx

Whena=2andn= 1 ,

2 xdx=


2 x^1 dx=
2 x^1 +^1
1 + 1

+c=
2 x^2
2

+c

=x^2 +c

Problem 5. Determine

∫ (
3 +

2
5

x− 6 x^2

)
dx


(
3 +

2
5

x− 6 x^2

)
dxmay be written as

3 dx+

∫ 2
5

xdx−


6 x^2 dx
i.e., each term is integrated separately. (This splitting
up of terms only applies, however, for addition and
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