Tiling Triangles with 2π/3 Angles

Abstract

Motivated by a question of Erd\"os and inquiries by Beeson and Laczkovich, we explore the possible N for which a triangle T can tile into N congruent copies of a triangle R. The reptile cases (where T is similar to R) and the commensurable-angles cases (where all angles of R are rational multiples of π) are well-understood. We tackle the most interesting remaining case, which is when R contains an angle of 2π/3 and when T is one of 6 ``sporadic'' specific triangles, of which only 2 were known to have constructions. For each of these, we create a family of constructions and conjecture that they are the only possible N that occur for these triangles.

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