The Chemistry Maths Book, Second Edition

(Grace) #1

176 Chapter 6Methods of integration


Then, solving for I,


and


0 Exercises 49–51


6.5 Reduction formulas


The method of integration by parts can be used to derive formulas for families of


related integrals. Consider the integral


where nis a positive integer. Choosingu 1 = 1 x


n

and in the formula (6.14),


or


(6.15)


This result is called a reduction formulaforI


n

, or a recurrence relationbetweenI


n

andI


n− 1

. For example


where


Then


I


a


ex


a


x


a


x


a


C


ax

3

32

23

1366


= −+−














Iedx


a


eC


ax ax

0

1


==+Z


I


a


xe


a


II


a


xe


a


II


a


xe


ax ax ax

3

3

22

2

11

13 12 11


=−,=−,=−


aa


I


0

I


a


xe


n


a


I


n

nax

n

=−



1


1

I


a


xe


n


a


xedx


n

nax n ax

=−



1


1

Z


d


dx


e


ax

v


=


Ixedx


n

nax

=Z


Z


0

2

1



exdx


a


a


−ax

=






cos


Ie xdx


a


exaxC


ax ax

==






−+


−−

Z cos (sin cos )


1


1


2
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