Problem 593 (difficulty: 7/10)

Prove that if \(\displaystyle f:\R\to(0,\infty)\) is continuous and for all \(\displaystyle x,y\in\R\) the equality \(\displaystyle f(x+y)=f(x)\cdot f(y)\) holds then \(\displaystyle f\) is an exponential function.

Give me another random problem!

Subject, section:
Requested difficulty:
Request for a concrete problem:I want problem no.

Supported by the Higher Education Restructuring Fund allocated to ELTE by the Hungarian Government