Show that $f$ is a polynomial if it's the uniform limit of polynomais

real-analysis

Solution 1:

Hint: if $f$ is a non-constant polynomial, then $f$ is unbounded. What does this say about $f_n(z) - f_m(z)$, if $f_n$ is a sequence of polynomials that converges uniformly on $\mathbb R$?

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