Geopeton (EntityTopic, 20)
From Hi.gher. Space
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| + | <[#ontology [kind topic] [cats 6D Hypercube]]> | ||
{{STS Shape | {{STS Shape | ||
| - | | image= | + | | image=<[#embed [hash 5N7NJKG9P1CPTV2X2D3STA0YSZ] [width 180]]><br>[[Petrie polygon]] |
| dim=6 | | dim=6 | ||
| elements=12, 60, 160, 240, 192, 64 | | elements=12, 60, 160, 240, 192, 64 | ||
| genus=0 | | genus=0 | ||
| ssc=[xyzwφσ] | | ssc=[xyzwφσ] | ||
| + | | ssc2=K6c1 | ||
| pv_square=1 | | pv_square=1 | ||
| - | | extra={{STS | + | | extra={{STS Tapertope |
| - | | | + | | order=6, 0 |
| - | | notation=111111 | + | | notation=111111 |
| - | | | + | | index=84 |
| - | | index= | + | }}{{STS Toratope |
| + | | expand=[[Hexeract|111111]] | ||
| + | | notation=IIIIII | ||
| + | | index=21a | ||
| + | }}{{STS Bracketope | ||
| + | | index=194 | ||
| + | }}{{STS Polytope | ||
| + | | altern=[[Demihexeract]] | ||
| + | | dual=[[Aeropeton]] | ||
}}{{STS Uniform polytope | }}{{STS Uniform polytope | ||
| schlaefli={[[Square|4,]][[Cube|3,]][[Tesseract|3,]][[Pentacube|3,]]3} | | schlaefli={[[Square|4,]][[Cube|3,]][[Tesseract|3,]][[Pentacube|3,]]3} | ||
| - | | vfigure=[[ | + | | vfigure=[[Pyroteron]], edge √5 |
| vlayout=((([[Square|4]][[Cube|<sup>3</sup>]])[[Tesseract|<sup>3</sup>]])[[Pentacube|<sup>3</sup>]])<sup>3</sup> | | vlayout=((([[Square|4]][[Cube|<sup>3</sup>]])[[Tesseract|<sup>3</sup>]])[[Pentacube|<sup>3</sup>]])<sup>3</sup> | ||
| - | |||
}}}} | }}}} | ||
| - | + | The '''geopeton''', also known as the '''hexeract''', the '''hexacube''' and the [[regular]] '''dodecapeton''' is the six-dimensional [[hypercube]]. It is a special case of the [[prism]] where the base is a [[geoteron]]. It is also the [[square]] of the [[cube]]. | |
== Equations == | == Equations == | ||
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The net of a hexeract is a penteract surrounded by ten more penteracts, with one more penteract added to one of these. | The net of a hexeract is a penteract surrounded by ten more penteracts, with one more penteract added to one of these. | ||
| + | {{Hypercubes|6}} | ||
{{Hexashapes}} | {{Hexashapes}} | ||
| - | {{ | + | {{Tapertope Nav|83|84|85|21111<br>Penterinder|111111<br>Hexeract|5<sup>1</sup><br>Pentaspheric cone|peta}} |
| + | {{Toratope Nav A|20|21|22|(((II)I)I)I<br>Ditorinder|((((II)I)I)I)<br>Tritorus|IIIIII<br>Hexeract|(IIIIII)<br>Hexasphere|(II)IIII<br>Penterinder|((II)III)<br>Torapenterinder|peta}} | ||
{{Bracketope Nav|193|194|195|(<xy><(zw)φ>)<br>''Unknown shape''|[xyzwφσ]<br>Hexeract|[<xy>zwφσ]<br>Narrow hexeract|peta}} | {{Bracketope Nav|193|194|195|(<xy><(zw)φ>)<br>''Unknown shape''|[xyzwφσ]<br>Hexeract|[<xy>zwφσ]<br>Narrow hexeract|peta}} | ||
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Latest revision as of 20:44, 11 February 2014
The geopeton, also known as the hexeract, the hexacube and the regular dodecapeton is the six-dimensional hypercube. It is a special case of the prism where the base is a geoteron. It is also the square of the cube.
Equations
- Variables:
l ⇒ length of the edges of the hexeract
- All points (x, y, z, w, φ, σ) that lie on the surpeton of a hexeract will satisfy the following equation:
Unknown
- The hypervolumes of a hexeract are given by:
total edge length = 192l
total surface area = 240l2
total surcell volume = 160l3
surteron bulk = 60l4
surpeton pentavolume = 12l5
hexavolume = l6
- The pentaplanar cross-sections (n) of a hexeract are:
[!x, !y, !z, !w, !φ, !σ] ⇒ pentacube of side (l)
Net
The net of a hexeract is a penteract surrounded by ten more penteracts, with one more penteract added to one of these.
| Hypercubes |
| point • digon • square • cube • geochoron • geoteron • geopeton |
| Notable Hexashapes | |
| pyropeton • aeropeton • geopeton • square cubic truncatriate | |
| 83. 21111 Penterinder | 84. 111111 Hexeract | 85. 51 Pentaspheric cone |
| List of tapertopes | ||
| 20a. (((II)I)I)I Ditorinder | 20b. ((((II)I)I)I) Tritorus | 21a. IIIIII Hexeract | 21b. (IIIIII) Hexasphere | 22a. (II)IIII Penterinder | 22b. ((II)III) Torapenterinder |
| List of toratopes | |||||
| 193. (<xy><(zw)φ>) Unknown shape | 194. [xyzwφσ] Hexeract | 195. [<xy>zwφσ] Narrow hexeract |
| List of bracketopes | ||
