How do you find a power series representation for $f(z)=z^2$ and what is the radius of convergence?

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How do you find a power series representation for $f(z)=z^2$ and what is the radius of convergence?

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Answer 1 · 2015-11-20T12:09:05

$f(z)$ is effectively a power series already with a radius of convergence of $oo$ .

Explanation:

A power series (centered at $0$ ) is just a sum of the form $f(z) = sum_(n=0)^(oo)a_nz^n$
so in this case, $f(z)=z^2$ is already a power series with
$a_n = {(1 if n = 2), (0 if n !=2):}$

In general, no manipulation is needed to find the power series of a polynomial function, as a power series is itself essentially a polynomial of infinite degree.

As for the radius of convergence, for any real value, the above power series has a single nonzero term which is equal to the square of that value, and thus does not diverge. This means the radius of convergence is infinite.

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How do you find a power series representation for $f(z)=z^2$ and what is the radius of convergence?

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How do you find a power series representation for f(z)=z^2 f(z)=z^2 and what is the radius of convergence?

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How do you find a power series representation for $f(z)=z^2$ and what is the radius of convergence?