SECTION 5.3 Concept of Power Series 283
a+ar+ar^2 +··· =a
1 −r.
Let’s make a minor cosmetic change: rather than writingr in the
above sum, we shall writex:
a+ax+ax^2 +··· =a
1 −x, |x|< 1.In other words, if we set
f(x) = a+ax+ax^2 +··· =∑∞
n=0axn and set g(x) =a
1 −x,
then the following facts emerge:
(a) The domain off is− 1 < x <1, and the domain ofgisx 6 = 1.(b)f(x) =g(x) for allxin the interval− 1 < x <1.We say, therefore, that
∑∞
n=0axn is thepower series representationofg(x),valid on the interval− 1 < x <1.
So what is a power series anyway? Well, it’s just an expression of
the form
∑∞
n=0anxn,wherea 0 , a 1 , a 2 , ...are just real constants. For any particular value of
xthis infinite summay or may not converge; we’ll have plenty to
say about issues of convergence.