What $n$ is the smallest such that “there is a $n$-gon that can be cut into a triangle, a quadrilateral, ..., a $2006$-gon''?
Problem
Source: Sharygin 2006 finals 8.2
Tags: polygon, cut, minimum, combinatorial geometry, geometry
Source: Sharygin 2006 finals 8.2
Tags: polygon, cut, minimum, combinatorial geometry, geometry
What $n$ is the smallest such that “there is a $n$-gon that can be cut into a triangle, a quadrilateral, ..., a $2006$-gon''?