Prove that for any positive integer $n > 2$ we can find $n$ distinct positive integers, the sum of whose reciprocals is equal to $1$.
Problem
Source: New Zealand NZMOC Camp Selection Problems 2013 p3
Tags: reciprocal, algebra, number theory
Source: New Zealand NZMOC Camp Selection Problems 2013 p3
Tags: reciprocal, algebra, number theory
Prove that for any positive integer $n > 2$ we can find $n$ distinct positive integers, the sum of whose reciprocals is equal to $1$.