The 60 faces are deltoids or
kites. The short and long edges of each kite are in the ratio 1:\frac{7+\sqrt{5}}{6} ≈ 1:1.539344663... The angle between two short edges in a single face is \arccos(\frac{-5-2\sqrt{5}}{20}) ≈ 118.2686774705°. The opposite angle, between long edges, is \arccos(\frac{-5+9\sqrt{5}}{40}) ≈ 67.783011547435°. The other two angles of each face, between a short and a long edge each, are both equal to \arccos(\frac{5-2\sqrt{5}}{10}) ≈ 86.97415549104°. The dihedral angle between any pair of adjacent faces is \arccos(\frac{-19-8\sqrt{5}}{41}) ≈ 154.12136312578°. == Topology==