Glominder (EntityTopic, 13)
From Hi.gher. Space
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| ssc=[(xyzw)φ] | | ssc=[(xyzw)φ] | ||
| ssc2=+T4 | | ssc2=+T4 | ||
| - | | extra={{STS | + | | extra={{STS Tapertope |
| - | | | + | | order=2, 0 |
| - | | notation=41 ( | + | | notation=41 |
| - | | index= | + | | index=31 |
| + | }}{{STS Tapertope | ||
| + | | holeseq=[0, 0, 1] | ||
| + | | notation=(IIII)I | ||
| + | | index=16a | ||
}}{{STS Bracketope | }}{{STS Bracketope | ||
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{{Pentashapes}} | {{Pentashapes}} | ||
| - | {{ | + | {{Tapertope Nav|30|31|32|5<br>Pentasphere|41<br>Glominder|32<br>Cylspherinder|chora}} |
| + | {{Toratope Nav A|15|16|17|((II)I)(II)<br>Cyltorinder|(((II)I)(II))<br>Cyltorintigroid|(IIII)I<br>Glominder|((IIII)I)<br>Toraglominder|((II)II)I<br>Toracubdyinder|(((II)II)I)<br>Cylindrical ditorus|chora}} | ||
Revision as of 20:13, 25 November 2009
A glominder is a special case of the prism where the base is a glome. It is bounded by two glomes and a 4-manifold formed by the extrusion of a glome in 5-space.
| Notable Pentashapes | |
| Flat: | pyroteron • aeroteron • geoteron |
| Curved: | tritorus • pentasphere • glone • cylspherinder • tesserinder |
| 30. 5 Pentasphere | 31. 41 Glominder | 32. 32 Cylspherinder |
| List of tapertopes | ||
| 15a. ((II)I)(II) Cyltorinder | 15b. (((II)I)(II)) Cyltorintigroid | 16a. (IIII)I Glominder | 16b. ((IIII)I) Toraglominder | 17a. ((II)II)I Toracubdyinder | 17b. (((II)II)I) Cylindrical ditorus |
| List of toratopes | |||||
