During high school I participated in a few math contests, and in undergrad I wrote several problems for the Caltech Harvey Mudd Math Competition and USA Math Talent Search. Every two weeks I will post a recreational (non-research) math problem which I encountered during this time (and particularly enjoyed) below.

Balanced Pairwise Sums

Let $n$ be a positive integer.

Suppose $S$ is a finite set of positive integers with $|S| > 1$, such that when two distinct elements of $S$ are selected uniformly at random, the remainder when their sum is divided by $2^n$ is equal to each of the possible numbers $0, 1, \dots, 2^n-1$ with equal probability.

What is the smallest possible size $|S|$ of such a set?

A new problem will be posted here on December 13th, 2021.

Previously posted problems can be found here.