Triangular hebesphenorotunda

Template:Short description Template:Infobox polyhedron File:J92 triangular hebesphenorotunda.stl

In geometry, the triangular hebesphenorotunda is a Johnson solid with 13 equilateral triangles, 3 squares, 3 regular pentagons, and 1 regular hexagon, meaning the total of its faces is 20.

The triangular hebesphenorotunda is named by Template:Harvtxt, with the prefix hebespheno- referring to a blunt wedge-like complex formed by three adjacent lunes—a figure where two equilateral triangles are attached at the opposite sides of a square. The suffix (triangular) -rotunda refers to the complex of three equilateral triangles and three regular pentagons surrounding another equilateral triangle, which bears a structural resemblance to the pentagonal rotunda.Template:R Therefore, the triangular hebesphenorotunda has 20 faces: 13 equilateral triangles, 3 squares, 3 regular pentagons, and 1 regular hexagon.Template:R The faces are all regular polygons, categorizing the triangular hebesphenorotunda as a Johnson solid, enumerated the last one ${\displaystyle J_{92}}$.Template:R It is an elementary polyhedron, meaning that it cannot be separated by a plane into two small regular-faced polyhedra.Template:R

The surface area of a triangular hebesphenorotunda of edge length ${\displaystyle a}$ as:Template:R $${\displaystyle A=(3+\frac{1}{4}\sqrt{1308+90\sqrt{5}+114\sqrt{75+30\sqrt{5}}})a^2\approx 16.389a^2,}$$ and its volume as:Template:R $${\displaystyle V=\frac{1}{6}(15+7\sqrt{5})a^3\approx 5.10875a^3.}$$

The triangular hebesphenorotunda with edge length ${\displaystyle \sqrt{5}-1}$ can be constructed by the union of the orbits of the Cartesian coordinates: $${\displaystyle \begin{array}{cc}(0,-\frac{2}{\tau \sqrt{3}},\frac{2\tau }{\sqrt{3}}),& (\tau ,\frac{1}{\sqrt{3}{\tau }^2},\frac{2}{\sqrt{3}})\\ (\tau ,-\frac{\tau }{\sqrt{3}},\frac{2}{\sqrt{3}\tau }),& (\frac{2}{\tau },0,0),\end{array}}$$ under the action of the group generated by rotation by 120° around the z-axis and the reflection about the yz-plane. Here, ${\displaystyle \tau }$ denotes the golden ratio.Template:R

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