P3

Part of 2024 Romania Team Selection Tests

Problems(1)

Nice NT with powers of two

Source: Romania TST 2024 Day 1 P3

n{}

be a positive integer and let

a{}

b{}

be positive integers congruent to 1 modulo 4. Prove that there exists a positive integer

k{}

such that at least one of the numbers

a^k-b

b^k-a

is divisible by

2^n.

Cătălin Liviu Gherghe

number theoryDivisibility