Reuleaux_polygon
Reuleaux polygon
Constant-width curve of equal-radius arcs
In geometry, a Reuleaux polygon is a curve of constant width made up of circular arcs of constant radius.[1] These shapes are named after their prototypical example, the Reuleaux triangle, which in turn, is named after 19th-century German engineer Franz Reuleaux.[2] The Reuleaux triangle can be constructed from an equilateral triangle by connecting each two vertices by a circular arc centered on the third vertex, and Reuleaux polygons can be formed by a similar construction from any regular polygon with an odd number of sides, or from certain irregular polygons. Every curve of constant width can be accurately approximated by Reuleaux polygons. They have been applied in coinage shapes.