Limit of a sum of periodic functions

by @ancient-tree · difficulty 60/100

Analysis

Status: Unreviewed

Let $f$ and $g$ be two periodic functions of respective periods $T_1$ and $T_2$ . We also assume that $f(x)+g(x)$ admits a limit as $x$ goes to $+\infty$ .

Show that $f+g$ is constant.

Proofs

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Limit of a sum of periodic functions

Proofs

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