The idea is to rewrite as $20x\sqrt{2022}+21y\sqrt{2022}=22z\sqrt{2022}$. Then loosely the fractional part of the LHS is close to $\{(20+21)/3\}=2/3$ but the fractional part of the RHS is close to $\{22/3\}=1/3$, with the bounding being simple. Also: what is KAMO?

IAmTheHazard wrote: The idea is to rewrite as $20x\sqrt{2022}+21y\sqrt{2022}=22z\sqrt{2022}$. Then loosely the fractional part of the LHS is close to $\{(20+21)/3\}=2/3$ but the fractional part of the RHS is close to $\{22/3\}=1/3$, with the bounding being simple. Also: what is KAMO? Kosovo & Albania Mathematical Olympiad for children in grades 7-9.