2021 USAMO Problems/Problem 3
Revision as of 03:15, 3 March 2021 by Y.grace.yu (talk | contribs) (→Made-up USAMO problem -- (3) is unsolved...)
A perfect number is a positive integer that is equal to the sum of its proper divisors, such as 
, 
, 
, and 
. Prove that
(1) All even perfect numbers follow the format 
, where 
is a Mersenne prime;
(2) All 
, where is a Mersenne prime, are even perfect numbers;
(3) There are no odd perfect numbers.
Note: a Mersenne prime is a prime in the form of 
.
