Problem

Source: Regional Olympiad - Federation of Bosnia and Herzegovina 2017

Tags: Arithmetic Progression, Sets, number theory



Let $S$ be a set of $6$ positive real numbers such that $\left(a,b \in S \right) \left(a>b \right) \Rightarrow a+b \in S$ or $a-b \in S$ Prove that if we sort these numbers in ascending order, then they form an arithmetic progression