Let $A$ be a finite set of positive integers. Prove that there exists a finite set $B$ of positive integers such that $A \subset B$ and $$\prod_{x \in B} x =\sum_{x \in B}x^2$$
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Tags: number theory, 1st edition
Let $A$ be a finite set of positive integers. Prove that there exists a finite set $B$ of positive integers such that $A \subset B$ and $$\prod_{x \in B} x =\sum_{x \in B}x^2$$