Problem

Source: Kazakhstan National Olympiad 2019, Problem 2

Tags: combinatorial geometry, combinatorics



The set Φ consists of a finite number of points on the plane. The distance between any two points from Φ is at least $\sqrt{2}$. It is known that a regular triangle with side lenght $3$ cut out of paper can cover all points of Φ. What is the greatest number of points that Φ can consist of?