For any positive integer $n$ let $n! = 1\times 2\times 3\times ... \times n$. Do there exist infinitely many triples $(p, q, r)$, of positive integers with $p > q > r > 1$ such that the product $p! \cdot q! \cdot r!$$ is a perfect square?
Problem
Source: 2023 NZMO - New Zealand Maths Olympiad Round 2 p1
Tags: number theory, Perfect Squares