Golden rhombus geometry , a golden rhombus Varignon parallelogram formed from the edge midpoints of a golden rectangle .Rhombi with this shape form the faces of several notable polyhedra.rhombi of the Penrose tiling , which are both related in other ways to the golden ratio but have different shapes than the golden rhombus.Angles The internal supplementary angles of the golden rhombus are:Acute angle: ; Obtuse angle:Edge and diagonals parallelogram law :length of the golden rhombus in terms of the diagonal length is:lengths of the golden rhombus in terms of the edge length are:Area By using the area formula of the general rhombus in terms of its diagonal lengths and : By using the area formula of the general rhombus in terms of its edge length : As the faces of polyhedra Several notable polyhedra have golden rhombi as their faces.golden rhombohedra , the Bilinski dodecahedron ,rhombic icosahedron ,rhombic triacontahedron , andnonconvex rhombic hexecontahedron . The first five of these are the only convex polyhedra with golden rhomb faces, but there exist infinitely many nonconvex polyhedra having this shape for all of their faces.
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