IMO 1984 LL SWE58
Let (an)\infty
IMO 1984 LL SWE58
Origin: SWE
Problem
Let (an)\infty 1 be a sequence such that an \leqan+m \leqan + am for all positive integers n and m. Prove that an n has a limit as n approaches infinity.
Let (an)\infty
Origin: SWE
Let (an)\infty 1 be a sequence such that an \leqan+m \leqan + am for all positive integers n and m. Prove that an n has a limit as n approaches infinity.