List of tapertopes (Meta, 5)

From Hi.gher. Space

(Difference between revisions)
(renamed "Cyltriandyinder" for more consistency (if the prism of the Duotrianglinder is the Duotrianglindyinder, then the prism of the Cyltrianglinder should be the Cyltrianglindyinder))
(another case where I believe some letters were missed in a name (if the prism of the Duotrianglinder is the Duotrianglindyinder, then the prism of the Duocylinder should be the Duocyl*in*dyinder))
 
Line 225: Line 225:
<td>++T3</td>
<td>++T3</td>
</tr><tr class='row1'>
</tr><tr class='row1'>
-
<td class='key'>[[Duocyldyinder]]</td>
+
<td class='key'>[[Duocylindyinder]]</td>
<td>11a</td>
<td>11a</td>
<td>34</td>
<td>34</td>

Latest revision as of 07:01, 17 April 2022

This is a list of tapertopes in dimensions from zero to five.

Name Toratopic index Tapertopic index Tapertopic notation SSC2
0D tapertopes (total 1)
Point N/A 0 0 M0
1D tapertopes (total 1)
Digon N/A 1 1 M1
2D tapertopes (total 3)
Circle 1b 2 2 T2
Square 1a 3 11 G4
Triangle N/A 4 11 G3
3D tapertopes (total 7)
Sphere 2b 5 3 T3
Cylinder 3a 6 21 +T2
Cube 2a 7 111 Ko1
Cone N/A 8 21 &T2
Square pyramid N/A 9 [11]1 &G4
Triangular prism N/A 10 111 +G3
Tetrahedron N/A 11 12 Kt1
4D tapertopes (total 18)
Glome 4b 12 4 T4
Spherinder 7a 13 31 +T3
Duocylinder 6a 14 22 T2xT2
Cubinder 5a 15 211 ++T2
Tesseract 4a 16 1111 Ke1
Sphone N/A 17 31 &T3
Cylindrone N/A 18 [21]1 &+T2
Cubic pyramid N/A 19 [111]1 &Ko1
Cyltrianglinder N/A 20 211 T2xG3
Triangular diprism N/A 21 1111 ++G3
Dicone N/A 22 22 &&T2
Square dipyramid N/A 23 [11]2 &&G4
Coninder N/A 24 121 +&T2
Square pyramidal prism N/A 25 1[11]1 +&G4
Tetrahedral prism N/A 26 112 +Kt1
Triangular prismic pyramid N/A 27 [111]1 &+G3
Pentachoron N/A 28 13 Kp1
Duotrianglinder N/A 29 1111 G3xG3
5D tapertopes (total 45)
Pentasphere 9b 30 5 T5
Glominder 16a 31 41 +T4
Cylspherinder 14a 32 32 T3xT2
Cubspherinder 12a 33 311 ++T3
Duocylindyinder 11a 34 221 T2xT2xM1
Tesserinder 10a 35 2111 +++T2
Penteract 9a 36 11111 K5c1
Glone N/A 37 41 &T4
Spherindrone N/A 38 [31]1 &+T3
Duocylindrone N/A 39 [22]1 &[T2xT2]
Cubindrone N/A 40 [211]1 &++T2
Tesseric pyramid N/A 41 [1111]1 &Ke1
Sphentrianglinder N/A 42 311 T3xG3
Cyltrianglindyinder N/A 43 2111 T2xM1xG3
Triangular triprism N/A 44 11111 +++G3
Disphone N/A 45 32 &&T3
Dicylindrone N/A 46 [21]2 &&+T2
Cubic dipyramid N/A 47 [111]2 &&Ko1
Cylconinder N/A 48 221 T2x&T2
Cylhemoctahedrinder N/A 49 2[11]1 T2x&G4
Cyltetrahedrinder N/A 50 212 T2xKt1
Conic diprism N/A 51 1121 ++&T2
Square pyramidal diprism N/A 52 11[11]1 ++&G4
Tetrahedral diprism N/A 53 1112 ++Kt1
Cyltrianglindrone N/A 54 [211]1 &[T2xG3]
Triangular diprismic pyramid N/A 55 [1111]1 &++G3
Tricone N/A 56 23 &&&T2
Square tripyramid N/A 57 [11]3 &&&G4
Sphoninder N/A 58 131 +&T3
Cylindronic prism N/A 59 1[21]1 +&+T2
Cubic pyramidal prism N/A 60 1[111]1 +&Ko1
Diconic prism N/A 61 122 +&&T2
Square dipyramidal prism N/A 62 1[11]2 +&&G4
Triangular prismic pyramidal prism N/A 63 1[111]1 +&+G3
Pentachoric prism N/A 64 113 +Kp1
Conindric pyramid N/A 65 [121]1 &+&T2
Square pyramidal prismic pyramid N/A 66 [1[11]1]1 &+&G4
Tetrahedral prismic pyramid N/A 67 [112]1 &+Kt1
Duotrianglindyinder N/A 68 11111 M1xG3xG3
Triangular prismic dipyramid N/A 69 [111]2 &&+G3
Hexateron N/A 70 14 K1x1
Contrianglinder N/A 71 2111 &T2xG3
Hemoctahedrotrianglinder N/A 72 [11]111 &G4xG3
Tetrahedrotrianglinder N/A 73 1211 Kt1xG3
Duotrianglindric pyramid N/A 74 [1111]1 &[G3xG3]
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