The Chemistry Maths Book, Second Edition

(Grace) #1

196 Chapter 7Sequences and series


7.3 Finite series


Given a sequenceu


1

, u


2

, u


3

, =the partial sums


S


1

1 = 1 u


1

S


2

1 = 1 u


1

1 + 1 u


2

S


3

1 = 1 u


1

1 + 1 u


2

1 + 1 u


3





with general term


(7.5)


also form a sequence,S


1

, S


2

, S


3

, =A sequence obtained in this way is called a series


and, when the sequence converges, the limit


(7.6)


is called the sum of the series.


The word series is commonly also used for the sums of terms themselves. A finite


seriesof nterms is then


with sumS


n

, and the infinite seriesis


with sum (if it exists) given by (7.6).


The arithmetic series


The sum of the first nterms of the arithmetic progression (7.1) is


The value of the finite series is obtained by considering the sum in reverse order,


S


n

1 = 1 [a 1 + 1 (n 1 − 1 1)d] 1 + 1 [a 1 + 1 (n 1 − 1 2)d] 1 +1-1+ 1 a


Sardaadad an


n

r

n

= +− =++ ++ +++−


=


1

[( )] [ ][ ] [( 121  ))]d


r

r

uuuu


=


=+++


1

123





r

n

rn

uuuu u


=


=++++


1

123




SS u


nn


n

r

n

r

==










→→


=


lim lim


∞∞


1

Suuu u u


nn

r

n

r

=++++ =


=


123

1



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