The Chemistry Maths Book, Second Edition

(Grace) #1

198 Chapter 7Sequences and series


This equation can be regarded in two ways:


(i) the value of the sum(1 1 + 1 x 1 + 1 x


2

1 +1-1+ 1 x


n− 1

)is(1 1 − 1 x


n

) 2 (1 1 − 1 x),


(ii) the series(1 1 + 1 x 1 + 1 x


2

1 +1-1+ 1 x


n− 1

)is the expansionof the function(1 1 − 1 x


n

) 2 (1 1 − 1 x)


in powers of x.


This concept of the expansion of one function in terms of a set of (other) functions


provides an important tool for the representation of complicated (or unknown)


functions in the physical sciences.


0 Exercises 20–23


The binomial expansion


The binomial expansion is the expansion of the function(1 1 + 1 x)


n

in powers of xwhen


nis a positive integer. Examples of such expansions are


(1 1 + 1 x)


2

1 = 111 + 12 x 1 + 1 x


2

(1 1 + 1 x)


3

1 = 111 + 13 x 1 + 13 x


2

1 + 1 x


3

(1 1 + 1 x)


4

1 = 111 + 14 x 1 + 16 x


2

1 + 14 x


3

1 + 1 x


4

In the general case,


(7.11)


with general term


EXAMPLE 7.3Expand(1 1 + 1 x)


6

in powers of x.


By equation (7.11), withn 1 = 16 ,


0 Exercises 24, 25


=++++++1 6 15 20 15 6


23456

xx x xxx






×× ××


××××






×× ×× ×


×× ×× ×


65432


54321


654321


65432


5

x


11


6

x


()116


65


21


654


321


6543


4


623

+=++


×


×






××


××






×× ×


×


xxx x


3321


4

××


x


nn n ...n r


r


x


r

()( )( )


!


−− −+ 12 1


()


() ()( )


11


1


2


12


3


23

+=++



!






−−


!


xnx ++


nn


x


nn n


xx


nn



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