Surface area and volume The
surface area of a polyhedron is the sum of the areas of its faces. In the case of a regular icosahedron, its surface area A is twenty times that of each of its equilateral triangle faces. Its volume V can be obtained as twenty times that of a pyramid whose base is one of its faces and whose apex is the regular icosahedron's center; or as the sum of the volume of two uniform
pentagonal pyramids and a
pentagonal antiprism. Given that the edge length a of a regular icosahedron, both expressions are: A = 5\sqrt{3}a^2 \approx 8.660a^2, \qquad V = \frac{5 \varphi^2}{6}a^3 \approx 2.182a^3.
Relation to the spheres The
insphere of a convex polyhedron is a sphere touching every polyhedron's face within. The
circumsphere of a convex polyhedron is a sphere that contains the polyhedron and touches every vertex. The
midsphere of a convex polyhedron is a sphere tangent to every edge. Given that the edge length a of a regular icosahedron, the radius of insphere (inradius) r_I , the radius of circumsphere (circumradius) r_C , and the radius of midsphere (midradius) r_M are, respectively: r_I = \frac{\varphi^2 a}{2 \sqrt{3}} \approx 0.756a, \qquad r_C = \frac{\sqrt{\varphi^2 + 1}}{2}a \approx 0.951a, \qquad r_M = \frac{\varphi}{2}a \approx 0.809a. A problem dating back to the ancient Greeks is determining which of two shapes has a larger volume: a regular icosahedron inscribed in a sphere, or a regular dodecahedron inscribed in the same sphere. The problem was solved by
Hero,
Pappus, and
Fibonacci, among others.
Apollonius of Perga discovered the curious result that the ratio of volumes of these two shapes is the same as the ratio of their surface areas. Both volumes have formulas involving the
golden ratio, but taken to different powers. As it turns out, the regular icosahedron occupies less of the sphere's volume (60.54%) than the regular dodecahedron (66.49%).
Other measurements The
dihedral angle of a regular icosahedron is 2\arcsin(\varphi/\sqrt{3}) \approx 138.19^\circ, obtained by adding the angle of pentagonal pyramids with regular faces and a pentagonal antiprism. The dihedral angle of a pentagonal antiprism and pentagonal pyramid between two adjacent triangular faces is approximately 38.2°. The dihedral angle of a pentagonal antiprism between pentagon-to-triangle is 100.8°, and the dihedral angle of a pentagonal pyramid between the same faces is 37.4°. Therefore, for the regular icosahedron, the dihedral angle between two adjacent triangles, on the edge where the pentagonal pyramid and pentagonal antiprism are attached, is 37.4° + 100.8° = 138.2°. The regular icosahedron has three types of
closed geodesics. These are paths on its surface that are locally straight: they avoid the polyhedron's vertices, follow line segments across the faces that they cross, and form
complementary angles on the two incident faces of each edge that they cross. The first geodesic forms a
regular decagon perpendicular to the longest diagonal and has the length 5 . The other two geodesics are non-
planar, with lengths 3\sqrt{3} \approx 5.196 and 2\sqrt{7} \approx 5.292 .
Symmetry s. The regular icosahedron has the thirty-one axes of
rotational symmetry (that is, rotating around an axis that results in an identical appearance). There are six axes passing through two opposite vertices, ten axes rotating a triangular face, and fifteen axes passing through any of its edges. Respectively, these axes are five-fold rotational symmetry (0°, 72°, 144°, 216°, and 288°), three-fold rotational symmetry (0°, 120°, and 240°), and two-fold rotational symmetry (0° and 180°). The regular icosahedron also has fifteen mirror planes that can be represented as
great circles on a sphere. It divides the surface of a sphere into 120 triangles
fundamental domains; these triangles are called
Mobius triangles. Both reflections and rotational symmetries are the
isometries—transformations in order to maintain the appearance—which forms the
full icosahedral symmetry \mathrm{I}_\mathrm{h} of order 120. This symmetry group is
isomorphic to the product of the rotational symmetry group and the
cyclic group of size two, generated by the reflection through the center of the regular icosahedron. The rotational
symmetry group of the regular icosahedron is isomorphic to the
alternating group on five letters. This non-
abelian simple group is the only non-trivial
normal subgroup of the
symmetric group on five letters. Since the
Galois group of the general
quintic equation is isomorphic to the symmetric group on five letters, and this normal subgroup is simple and non-abelian, the general quintic equation does not have a solution in radicals. The proof of the
Abel–Ruffini theorem uses this simple fact, and
Felix Klein wrote a book that made use of the theory of icosahedral symmetries to derive an analytical solution to the general quintic equation. The regular icosahedron is
isogonal,
isohedral, and
isotoxal: any two vertices, two faces, and two edges of a regular icosahedron can be transformed by rotations and reflections under its symmetry orbit, which preserves the appearance. Each regular polyhedron has a
convex hull on its edge midpoints;
icosidodecahedron is the convex hull of a regular icosahedron. Each vertex is surrounded by five equilateral triangles, so the regular icosahedron denotes 3.3.3.3.3 in
vertex configuration or \{3,5\} in
Schläfli symbol. == Appearances ==