MathDB

numbers divisible by 2009

Source: Austria 2009

October 14, 2009

number theory unsolvednumber theory

Problem Statement

Let

a

be a positive integer. Consider the sequence

(a_n)

defined as a_0\equal{}a and a_n\equal{}a_{n\minus{}1}\plus{}40^{n!} for

n > 0

. Prove that the sequence

(a_n)

has infinitely many numbers divisible by

2009