Tetrahedron (EntityTopic, 18)

From Hi.gher. Space

(Difference between revisions)

Revision as of 10:33, 2 March 2014

A tetrahedron is the three-dimensional simplex. It is a special case of a pyramid where the base is a triangle.

Cartesian coordinates

A regular tetrahedron with edge length 2√2, centered at the origin, can be defined using the coordinates:

(1, 1, 1);
(−1, −1, 1);
(−1, 1, −1);
(1, −1, −1).

Alternatively, a regular tetrahedron with symmetry through the z-axis and edge length 2^√6∕₃ can be defined using the coordinates:

(0, 0, 1);
(2^√2∕₃, 0, –1/3);
(−^√2∕₃, ^√6∕₃, –1/3);
(−^√2∕₃, −^√6∕₃, –1/3).

Finally, a regular tetrahedron with edge length 1 and two opposite edges parallel to the axes can be defined using the coordinates:

(¹∕₂, ^√2∕₄, 0);
(−¹∕₂, ^√2∕₄, 0);
(0, −^√2∕₄, ¹∕₂);
(0, −^√2∕₄, −¹∕₂).

Equations

The hypervolumes of a tetrahedron with side length l are given by:

total edge length = 6l
surface area = √3 · l²
volume = ^√2∕₁₂ · l³

The perpendicular height h of a tetrahedron with side length l is given by:

h = ^√6∕₃ · l

Incidence matrix

Dual: Self-dual

#	TXID	Va	Ea	3a	Type	Name
0	Va				= point	;
1	Ea	2			= digon	;
2	3a	3	3		= base of pyramid: triangle	;
3	C1a	4	6	4	= tetrahedron	;

Usage as facets

16× 1-facets of a aerochoron
600× 1-facets of a hydrochoron
pyramid: 5× 1-facets of a pyrochoron
9× 1-facets of a duotrianglone
5× 1-facets of a pyrorectichoron
8× 1-facets of a tetrahedral bipyramid
prism: 2× 1-facets of a tetrahedral prism
12× 1-facets of a (dual of triangular diprism)
8× 1-facets of a octahedral pyramid
8× 1-facets of a square pyramid bipyramid
1× 1-facets of a K4.8
4× 1-facets of a K4.8 dual
4× 1-facets of a square biantiprismatic ring
40× 1-facets of a castellated rhodoperihedral prism
288× 1-facets of a (dual of truncated snub demitesseract)
288× 1-facets of a (dual of truncated snub demitesseract)
8× 1-facets of a D4.11
32× 1-facets of a D4.11
4× 1-facets of a (dual of bilunabirotunda pseudopyramid)
4× 1-facets of a bilunabirotunda pseudopyramid
2× 1-facets of a D4.16 (named cap tets)
6× 1-facets of a D4.16 (named sweep tets)
2× 1-facets of a D4.16 dual
4× 1-facets of a (dual of bitrigonal diminished pyrocantichoron)
6× 1-facets of a triangular hebesphenorotunda pseudopyramid (named bola to roof)
3× 1-facets of a triangular hebesphenorotunda pseudopyramid (named lat to roof)
12× 1-facets of a triangular hebesphenorotundaeic rhombochoron
12× 1-facets of a tetraaugmented triangular hebesphenorotundaeic rhombochoron (named oogg)
24× 1-facets of a tetraaugmented triangular hebesphenorotundaeic rhombochoron (named bola to roof)
12× 1-facets of a tetraaugmented triangular hebesphenorotundaeic rhombochoron (named lat to roof)
12× 1-facets of a D4.7 (named roob)
12× 1-facets of a D4.7 (named rgcc)
24× 1-facets of a D4.7 (named rygc)
80× 2-facets of a aeroteron
15× 2-facets of a pyroteron
36× 2-facets of a (dual of triangular triprism)
24× 2-facets of a (dual of triangular triprism)

Simplices

triangle • tetrahedron • pyrochoron • pyroteron • pyropeton

Demihypercubes

tetrahedron • aerochoron • demipenteract • demihexeract

Notable Trishapes
Regular:	tetrahedron • cube • octahedron • dodecahedron • icosahedron
Direct truncates:	tetrahedral truncate • cubic truncate • octahedral truncate • dodecahedral truncate • icosahedral truncate
Mesotruncates:	stauromesohedron • stauroperihedron • stauropantohedron • rhodomesohedron • rhodoperihedron • rhodopantohedron
Snubs:	snub staurohedron • snub rhodohedron
Curved:	sphere • torus • cylinder • cone • frustum • crind

10. 11¹ Triangular prism	11. 1² Tetrahedron	12. 4 Glome
List of tapertopes

@@ Line 21: / Line 21: @@
 | petrie=4,0
 | dual=''Self-dual''
+| bowers=Tet
 }}{{STS Uniform polytope
 | wythoff=<nowiki>3 | 2 3 or | 2 2 2</nowiki>
@@ Line 27: / Line 28: @@
 | vfigure=Equilateral [[triangle]], edge 1
 | vlayout=[[Triangle|3]]<sup>3</sup>
-| bowers=Tet
 }}}}
 A '''tetrahedron''' is the three-dimensional [[simplex]]. It is a special case of a [[pyramid]] where the base is a [[triangle]].