Give a power series representation for the function f(x) x^3/(1 + 9x^2)

asked Sep 12, 2020 51.3k views

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Recall that for
|x|<1 , we have

$\displaystyle\frac1{1-x}=\sum_(n\ge0)x^n$

Replace
with
-9x^2 and we get

$\displaystyle\frac1{1-(-9x^2)}=\sum_(n\ge0)(-9x^2)^n=\sum_(n\ge0)(-9)^nx^(2n)$

Lastly, multiply this by
x^3 , so that

$\boxed{f(x)=\displaystyle\sum_(n\ge0)(-9)^nx^(2n+3)}$

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