MathDB

IMO ShortList 1998, number theory problem 7

Source: IMO ShortList 1998, number theory problem 7

October 22, 2004

number theorysum of digitsDigitsDivisibilityIMO Shortlist

Problem Statement

Prove that for each positive integer

n

, there exists a positive integer with the following properties: It has exactly

n

digits. None of the digits is 0. It is divisible by the sum of its digits.