Cubspherinder (EntityTopic, 13)
From Hi.gher. Space
(Difference between revisions)
m |
m (ontology) |
||
(3 intermediate revisions not shown) | |||
Line 1: | Line 1: | ||
+ | <[#ontology [kind topic] [cats 5D Tapertope Toratope Bracketope Curved]]> | ||
{{STS Shape | {{STS Shape | ||
| name=Cubspherinder | | name=Cubspherinder | ||
| dim=5 | | dim=5 | ||
- | | elements= | + | | elements=5, 8, 4, 0, 0 |
| genus=0 | | genus=0 | ||
| ssc=[(xyz)wφ] | | ssc=[(xyz)wφ] | ||
Line 11: | Line 12: | ||
| index=33 | | index=33 | ||
}}{{STS Toratope | }}{{STS Toratope | ||
- | | expand= | + | | expand=[[Cubspherinder|311]] |
| notation=(III)II | | notation=(III)II | ||
| index=12a | | index=12a | ||
}}{{STS Bracketope | }}{{STS Bracketope | ||
- | | index= | + | | index=? |
}}}} | }}}} | ||
- | |||
A '''cubspherinder''' is the [[Cartesian product]] of a [[sphere]] and a [[square]]. It is also the [[prism]] with a [[spherinder]] as the base, so it may also be called a ''spherical diprism''. | A '''cubspherinder''' is the [[Cartesian product]] of a [[sphere]] and a [[square]]. It is also the [[prism]] with a [[spherinder]] as the base, so it may also be called a ''spherical diprism''. | ||
+ | |||
+ | Its tera are four spherinders and one curved teron. Its cells are four spheres and four curved cells which come from the spherinders. Its faces are four sphere-surfaces. | ||
{{Pentashapes}} | {{Pentashapes}} | ||
{{Tapertope Nav|32|33|34|32<br>Cylspherinder|311<br>Cubspherinder|221<br>Duocyldyinder|tera}} | {{Tapertope Nav|32|33|34|32<br>Cylspherinder|311<br>Cubspherinder|221<br>Duocyldyinder|tera}} | ||
{{Toratope Nav A|11|12|13|(II)(II)I<br>Duocyldyinder|((II)(II)I)<br>Toraduocyldyinder|(III)II<br>Cubspherinder|((III)II)<br>Toracubspherinder|((II)I)II<br>Cubtorinder|(((II)I)II)<br>Toracubtorinder|tera}} | {{Toratope Nav A|11|12|13|(II)(II)I<br>Duocyldyinder|((II)(II)I)<br>Toraduocyldyinder|(III)II<br>Cubspherinder|((III)II)<br>Toracubspherinder|((II)I)II<br>Cubtorinder|(((II)I)II)<br>Toracubtorinder|tera}} | ||
- | {{Bracketope Nav| | + | {{Bracketope Nav|?|?|?|?<br>?|[(III)II]<br>Cubspherinder|?<br>?|tera}} |
Latest revision as of 23:08, 11 February 2014
A cubspherinder is the Cartesian product of a sphere and a square. It is also the prism with a spherinder as the base, so it may also be called a spherical diprism.
Its tera are four spherinders and one curved teron. Its cells are four spheres and four curved cells which come from the spherinders. Its faces are four sphere-surfaces.
Notable Pentashapes | |
Flat: | pyroteron • aeroteron • geoteron |
Curved: | tritorus • pentasphere • glone • cylspherinder • tesserinder |
32. 32 Cylspherinder | 33. 311 Cubspherinder | 34. 221 Duocyldyinder |
List of tapertopes |
11a. (II)(II)I Duocyldyinder | 11b. ((II)(II)I) Toraduocyldyinder | 12a. (III)II Cubspherinder | 12b. ((III)II) Toracubspherinder | 13a. ((II)I)II Cubtorinder | 13b. (((II)I)II) Toracubtorinder |
List of toratopes |
?. ? ? | ?. [(III)II] Cubspherinder | ?. ? ? |
List of bracketopes |