The Chemistry Maths Book, Second Edition

(Grace) #1

208 Chapter 7Sequences and series


Alternating series


If the terms of the seriesa


1

1 + 1 a


2

1 + 1 a


3

1 +1-become progressively smaller and alternate


in sign then the series converges. For example, the alternating harmonic series


converges. We will see in Section 7.6 that the sum of this series is ln 1 2.


7.6 MacLaurin and Taylor series


Power series


A power series in the variable xhas the form of an ‘infinite polynomial’


c


0

1 + 1 c


1

x 1 + 1 c


2

x


2

1 + 1 c


3

x


3

1 +1-


wherec


0

, c


1

, c


2

,1=are constants. The convergence properties of such series can be


investigated by the methods described in the previous section. Thus, applying the


ratio test, a power series converges when


or, equivalently, when


(7.18)


where Ris called the radius of convergenceof the series. The series is therefore


convergent when|x| 1 < 1 R; it diverges when|x| 1 > 1 R, and the casex 1 = 1 ±Rhas to be


tested by other methods.


The geometric and exponential series are examples of power series. The


geometric series has radius of convergenceR 1 = 11 , the exponential series hasR 1 = 1 ∞


(see Examples 7.9).


EXAMPLES 7.11Radius of convergence


(i) The coefficient of x


n

in the series


is. By the ratio test,|c


n

2 c


n+ 1

| 1 = 1 (n 1 + 1 1) 2 n 1 → 11 asn 1 → 1 ∞and the radius of


convergence isR 1 = 11. The series therefore converges when|x| 1 < 11 and diverges when


|x| 1 > 11. It also diverges when x 1 = 11 , when it is the harmonic series, but converges


to ln 1 2 whenx 1 = 1 − 1 (see the MacLaurin series for the logarithmic function).


c


n


n

=


1


x


n


n

n=


1


||< =



+

x


c


c


R


n


n

n

lim



1

lim lim


nn


cx


cx


x


c


c


n

n

n

n

n

n

→→


+

+

+

=| | <


∞∞


1

1

1

1


1


1


2


1


3


1


4


−+−+

Free download pdf