trapezohedron
English
Etymology
From trapezium + -hedron, with trapezium used in the US sense of a convex irregular quadrilateral.
Noun
trapezohedron (plural trapezohedra or trapezohedrons)
- (geometry, crystallography) Any of a class of polyhedra that have kite-shaped faces and are dual polyhedra of antiprisms.
- 1969, Carl W. Correns, William D. Johns (translator), Introduction to Mineralogy: Crystallography and Petrology, 2nd Edition, page 40,
- The general form is called the tetragonal trapezohedron. In this case also there are both left- (Fig. 97) and right-handed (Fig. 98) forms.
- 2002, John Montroll, A Plethora of Polyhedra in Origami, page 105:
- This trapezohedron, or antidiamond, is composed of ten quadrilaterals. In each quadrilateral, three of the angles are 108° and one is 36°.
- 1969, Carl W. Correns, William D. Johns (translator), Introduction to Mineralogy: Crystallography and Petrology, 2nd Edition, page 40,
- (crystallography) A deltoidal icositetrahedron.
- 1998, Cornelius S. Hurlbut Jr., W. Edwin Sharp, Dana's Minerals and How to Study Them (After Edward Salisbury Dana), page 23,
- A trapezohedron has 24 equal faces, each a four-sided figure or trapezium. Unlike the forms already described, which are always the same, there are several different trapezohedrons, all having the same number of faces but differing in the angles between the faces.
- 1998, Cornelius S. Hurlbut Jr., W. Edwin Sharp, Dana's Minerals and How to Study Them (After Edward Salisbury Dana), page 23,
Usage notes
In crystallography, trapezohedron usually refers to the second (deltoidal icositetrahedron) sense, although crystals exist in both shapes.
Synonyms
- (polyhedron whose faces are kites): antibipyramid, antidipyramid, deltohedron
- (deltoidal icositetrahedron): deltoidal icositetrahedron, strombic icositetrahedron, tetragonal icosikaitetrahedron, tetragonal trisoctahedron, trapezoidal icositetrahedron
Derived terms
- twelve-faced trapezohedron
Translations
polyhedron whose faces are kites
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any of several forms of crystal with trapezia as faces
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Further reading
- Trapezohedron on Wolfram MathWorld