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The series $\sum\limits_{n=0}^\infty {a_{n}}(x-c)^n $ is a polynomial in $x$.

(This is from this question.)

For $c=0$ this clearly means that, for some $n>k, \space a_n=0$, almost by definition.

Is it also true for all other values of $c$ that there exists a $k$ such that $n>k, \space a_n=0$?

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    @EuYu What Marc said; I have updated the question.2012-12-08

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The substitution $x:=x-a$ maps polynomials to polynomials, and since its inverse is the substitution $x:=x+a$, the result of the substitution into a series $S$ is a polynomial if and only if $S$ is itself a polynomial. Therefore $\sum_{n=0}^\infty {a_{n}}(x-c)^n$ is a polynomial if and only if $\sum_{n=0}^\infty {a_{n}}x^n$ is a polynomial.

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    Yeah, so as I said, a polynomial translated is still a polynomial; ignore the complex algebra that would otherwise occur.2012-12-08