Problem #PRU-34872

Problems Calculus Functions of one variable. Continuity Certain properties of a function and recurrence relations.

Problem

On a function $f (x)$ , defined on the entire real line, it is known that for any $a > 1$ the function $f (x) + f (a x)$ is continuous on the whole line. Prove that $f (x)$ is also continuous on the whole line.

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