For every integer d≥1, let Md be the set of all positive integers that cannot be written as a sum of an arithmetic progression with difference d, having at least two terms and consisting of positive integers. Let A=M1, B=M2∖{2},C=M3. Prove that every c∈C may be written in a unique way as c=ab with a∈A,b∈B. arithmetic sequencealgebranumber theoryfactorizationpartitionIMO Shortlist