List of tapertopes (Meta, 5)

From Hi.gher. Space

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This is a '''list of [[tapertope]]s''' in dimensions from zero to five.
This is a '''list of [[tapertope]]s''' in dimensions from zero to five.
-
{|style="border: 1px solid; border-color:#808080; border-collapse: collapse;" cellpadding="2" width="100%"
+
<table class='shapelist' style='width: 100%;'><tr>
-
|valign="top" width="20%" style="background-color:#ddddff; text-align:center;"|'''Name'''
+
<th class='key' style='width: 20%;'>Name</th>
-
|valign="top" width="20%" style="background-color:#eeeeff; text-align:center;"|'''[[Toratopic index]]'''
+
<th class='key' style='width: 20%;'>[[Toratopic index]]</th>
-
|valign="top" width="20%" style="background-color:#eeeeff; text-align:center;"|'''[[Tapertopic index]]'''
+
<th class='key' style='width: 20%;'>[[Tapertopic index]]</th>
-
|valign="top" width="20%" style="background-color:#eeeeff; text-align:center;"|'''[[Tapertopic notation]]'''
+
<th class='key' style='width: 20%;'>[[Tapertopic notation]]</th>
-
|valign="top" width="20%" style="background-color:#eeeeff; text-align:center;"|'''[[SSC2]]'''
+
<th class='key' style='width: 20%;'>[[SSC2]]</th>
-
|-
+
</tr><tr>
-
|valign="top" style="background-color:#bbbbff; text-align:center;" colspan="6"|'''0D tapertopes (total 1)'''
+
<td class='cat' colspan='5'>0D tapertopes (total 1)</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Point]]'''
+
<td class='key'>[[Point]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''0'''
+
<td>0</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''0'''
+
<td>0</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''M0'''
+
<td>M0</td>
-
|-
+
</tr><tr>
-
|valign="top" style="background-color:#bbbbff; text-align:center;" colspan="6"|'''1D tapertopes (total 1)'''
+
<td class='cat' colspan='5'>1D tapertopes (total 1)</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Digon]]'''
+
<td class='key'>[[Digon]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1'''
+
<td>1</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1'''
+
<td>1</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''M1'''
+
<td>M1</td>
-
|-
+
</tr><tr>
-
|valign="top" style="background-color:#bbbbff; text-align:center;" colspan="6"|'''2D tapertopes (total 3)'''
+
<td class='cat' colspan='5'>2D tapertopes (total 3)</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Circle]]'''
+
<td class='key'>[[Circle]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1b'''
+
<td>1b</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''2'''
+
<td>2</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''2'''
+
<td>2</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T2'''
+
<td>T2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Square]]'''
+
<td class='key'>[[Square]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''1a'''
+
<td>1a</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''3'''
+
<td>3</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''11'''
+
<td>11</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''G4'''
+
<td>G4</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Triangle]]'''
+
<td class='key'>[[Triangle]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''4'''
+
<td>4</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1<sup>1</sup>'''
+
<td>1<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''G3'''
+
<td>G3</td>
-
|-
+
</tr><tr>
-
|valign="top" style="background-color:#bbbbff; text-align:center;" colspan="6"|'''3D tapertopes (total 7)'''
+
<td class='cat' colspan='5'>3D tapertopes (total 7)</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Sphere]]'''
+
<td class='key'>[[Sphere]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''2b'''
+
<td>2b</td>
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|valign="top" style="background-color:#eeeeff; text-align:center;"|'''5'''
+
<td>5</td>
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|valign="top" style="background-color:#eeeeff; text-align:center;"|'''3'''
+
<td>3</td>
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|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T3'''
+
<td>T3</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Cylinder]]'''
+
<td class='key'>[[Cylinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''3a'''
+
<td>3a</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''6'''
+
<td>6</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''21'''
+
<td>21</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''+T2'''
+
<td>+T2</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Cube]]'''
+
<td class='key'>[[Cube]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''2a'''
+
<td>2a</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''7'''
+
<td>7</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''111'''
+
<td>111</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''Ko1'''
+
<td>Ko1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Cone]]'''
+
<td class='key'>[[Cone]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''8'''
+
<td>8</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''2<sup>1</sup>'''
+
<td>2<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&T2'''
+
<td>&T2</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Square pyramid]]'''
+
<td class='key'>[[Square pyramid]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''9'''
+
<td>9</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''[11]<sup>1</sup>'''
+
<td>[11]<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&G4'''
+
<td>&G4</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Triangular prism]]'''
+
<td class='key'>[[Triangular prism]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''10'''
+
<td>10</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''11<sup>1</sup>'''
+
<td>11<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''+G3'''
+
<td>+G3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Tetrahedron]]'''
+
<td class='key'>[[Tetrahedron]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''11'''
+
<td>11</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1<sup>2</sup>'''
+
<td>1<sup>2</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''Kt1'''
+
<td>Kt1</td>
-
|-
+
</tr><tr>
-
|valign="top" style="background-color:#bbbbff; text-align:center;" colspan="6"|'''4D tapertopes (total 18)'''
+
<td class='cat' colspan='5'>4D tapertopes (total 18)</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Glome]]'''
+
<td class='key'>[[Glome]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''4b'''
+
<td>4b</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''12'''
+
<td>12</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''4'''
+
<td>4</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T4'''
+
<td>T4</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Spherinder]]'''
+
<td class='key'>[[Spherinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''7a'''
+
<td>7a</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''13'''
+
<td>13</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''31'''
+
<td>31</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''+T3'''
+
<td>+T3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Duocylinder]]'''
+
<td class='key'>[[Duocylinder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''6a'''
+
<td>6a</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''14'''
+
<td>14</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''22'''
+
<td>22</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T2xT2'''
+
<td>T2xT2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Cubinder]]'''
+
<td class='key'>[[Cubinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''5a'''
+
<td>5a</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''15'''
+
<td>15</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''211'''
+
<td>211</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''++T2'''
+
<td>++T2</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Tesseract]]'''
+
<td class='key'>[[Tesseract]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''4a'''
+
<td>4a</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''16'''
+
<td>16</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1111'''
+
<td>1111</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''Ke1'''
+
<td>Ke1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Sphone]]'''
+
<td class='key'>[[Sphone]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''17'''
+
<td>17</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''3<sup>1</sup>'''
+
<td>3<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&T3'''
+
<td>&T3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Cylindrone]]'''
+
<td class='key'>[[Cylindrone]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''18'''
+
<td>18</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''[21]<sup>1</sup>'''
+
<td>[21]<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&+T2'''
+
<td>&+T2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Cubic pyramid]]'''
+
<td class='key'>[[Cubic pyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''19'''
+
<td>19</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[111]<sup>1</sup>'''
+
<td>[111]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&Ko1'''
+
<td>&Ko1</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Cyltrianglinder]]'''
+
<td class='key'>[[Cyltrianglinder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''20'''
+
<td>20</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''21<sup>1</sup>'''
+
<td>21<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T2xG3'''
+
<td>T2xG3</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Triangular diprism]]'''
+
<td class='key'>[[Triangular diprism]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''21'''
+
<td>21</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''111<sup>1</sup>'''
+
<td>111<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''++G3'''
+
<td>++G3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Dicone]]'''
+
<td class='key'>[[Dicone]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''22'''
+
<td>22</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''2<sup>2</sup>'''
+
<td>2<sup>2</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&&T2'''
+
<td>&&T2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Square dipyramid]]'''
+
<td class='key'>[[Square dipyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''23'''
+
<td>23</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[11]<sup>2</sup>'''
+
<td>[11]<sup>2</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&&G4'''
+
<td>&&G4</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Coninder]]'''
+
<td class='key'>[[Coninder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''24'''
+
<td>24</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''12<sup>1</sup>'''
+
<td>12<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''+&T2'''
+
<td>+&T2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Square pyramidal prism]]'''
+
<td class='key'>[[Square pyramidal prism]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''25'''
+
<td>25</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''1[11]<sup>1</sup>'''
+
<td>1[11]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''+&G4'''
+
<td>+&G4</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Tetrahedral prism]]'''
+
<td class='key'>[[Tetrahedral prism]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''26'''
+
<td>26</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''11<sup>2</sup>'''
+
<td>11<sup>2</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''+Kt1'''
+
<td>+Kt1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Triangular prismic pyramid]]'''
+
<td class='key'>[[Triangular prismic pyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''27'''
+
<td>27</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[11<sup>1</sup>]<sup>1</sup>'''
+
<td>[11<sup>1</sup>]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&+G3'''
+
<td>&+G3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Pentachoron]]'''
+
<td class='key'>[[Pentachoron]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''28'''
+
<td>28</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1<sup>3</sup>'''
+
<td>1<sup>3</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''Kp1'''
+
<td>Kp1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Duotrianglinder]]'''
+
<td class='key'>[[Duotrianglinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''29'''
+
<td>29</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''1<sup>1</sup>1<sup>1</sup>'''
+
<td>1<sup>1</sup>1<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''G3xG3'''
+
<td>G3xG3</td>
-
|-
+
</tr><tr>
-
|valign="top" style="background-color:#bbbbff; text-align:center;" colspan="6"|'''5D tapertopes (total 45)'''
+
<td class='cat' colspan='5'>5D tapertopes (total 45)</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Pentasphere]]'''
+
<td class='key'>[[Pentasphere]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''9b'''
+
<td>9b</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''30'''
+
<td>30</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''5'''
+
<td>5</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T5'''
+
<td>T5</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Glominder]]'''
+
<td class='key'>[[Glominder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''16a'''
+
<td>16a</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''31'''
+
<td>31</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''41'''
+
<td>41</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''+T4'''
+
<td>+T4</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Cylspherinder]]'''
+
<td class='key'>[[Cylspherinder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''14a'''
+
<td>14a</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''32'''
+
<td>32</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''32'''
+
<td>32</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T3xT2'''
+
<td>T3xT2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Cubspherinder]]'''
+
<td class='key'>[[Cubspherinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''12a'''
+
<td>12a</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''33'''
+
<td>33</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''311'''
+
<td>311</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''++T3'''
+
<td>++T3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Duocyldyinder]]'''
+
<td class='key'>[[Duocyldyinder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''11a'''
+
<td>11a</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''34'''
+
<td>34</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''221'''
+
<td>221</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T2xT2xM1'''
+
<td>T2xT2xM1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Tesserinder]]'''
+
<td class='key'>[[Tesserinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''10a'''
+
<td>10a</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''35'''
+
<td>35</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''2111'''
+
<td>2111</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''+++T2'''
+
<td>+++T2</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Penteract]]'''
+
<td class='key'>[[Penteract]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''9a'''
+
<td>9a</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''36'''
+
<td>36</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''11111'''
+
<td>11111</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''K5c1'''
+
<td>K5c1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Glone]]'''
+
<td class='key'>[[Glone]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''37'''
+
<td>37</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''4<sup>1</sup>'''
+
<td>4<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&T4'''
+
<td>&T4</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Spherindrone]]'''
+
<td class='key'>[[Spherindrone]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''38'''
+
<td>38</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''[31]<sup>1</sup>'''
+
<td>[31]<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&+T3'''
+
<td>&+T3</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Duocylindrone]]'''
+
<td class='key'>[[Duocylindrone]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''39'''
+
<td>39</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[22]<sup>1</sup>'''
+
<td>[22]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&[T2xT2]'''
+
<td>&[T2xT2]</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Cubindrone]]'''
+
<td class='key'>[[Cubindrone]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''40'''
+
<td>40</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''[211]<sup>1</sup>'''
+
<td>[211]<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&++T2'''
+
<td>&++T2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Tesseric pyramid]]'''
+
<td class='key'>[[Tesseric pyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''41'''
+
<td>41</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[1111]<sup>1</sup>'''
+
<td>[1111]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&Ke1'''
+
<td>&Ke1</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Sphentrianglinder]]'''
+
<td class='key'>[[Sphentrianglinder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''42'''
+
<td>42</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''31<sup>1</sup>'''
+
<td>31<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T3xG3'''
+
<td>T3xG3</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Cyltriandyinder]]'''
+
<td class='key'>[[Cyltriandyinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''43'''
+
<td>43</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''211<sup>1</sup>'''
+
<td>211<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''T2xM1xG3'''
+
<td>T2xM1xG3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Triangular triprism]]'''
+
<td class='key'>[[Triangular triprism]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''44'''
+
<td>44</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1111<sup>1</sup>'''
+
<td>1111<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''+++G3'''
+
<td>+++G3</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Disphone]]'''
+
<td class='key'>[[Disphone]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''45'''
+
<td>45</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''3<sup>2</sup>'''
+
<td>3<sup>2</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&&T3'''
+
<td>&&T3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Dicylindrone]]'''
+
<td class='key'>[[Dicylindrone]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''46'''
+
<td>46</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''[21]<sup>2</sup>'''
+
<td>[21]<sup>2</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&&+T2'''
+
<td>&&+T2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Cubic dipyramid]]'''
+
<td class='key'>[[Cubic dipyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''47'''
+
<td>47</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[111]<sup>2</sup>'''
+
<td>[111]<sup>2</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&&Ko1'''
+
<td>&&Ko1</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Cylconinder]]'''
+
<td class='key'>[[Cylconinder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''48'''
+
<td>48</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''22<sup>1</sup>'''
+
<td>22<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T2x&T2'''
+
<td>T2x&T2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Cylhemoctahedrinder]]'''
+
<td class='key'>[[Cylhemoctahedrinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''49'''
+
<td>49</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''2[11]<sup>1</sup>'''
+
<td>2[11]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''T2x&G4'''
+
<td>T2x&G4</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Cyltetrahedrinder]]'''
+
<td class='key'>[[Cyltetrahedrinder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''50'''
+
<td>50</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''21<sup>2</sup>'''
+
<td>21<sup>2</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''T2xKt1'''
+
<td>T2xKt1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Conic diprism]]'''
+
<td class='key'>[[Conic diprism]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''51'''
+
<td>51</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''112<sup>1</sup>'''
+
<td>112<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''++&T2'''
+
<td>++&T2</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Square pyramidal diprism]]'''
+
<td class='key'>[[Square pyramidal diprism]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''52'''
+
<td>52</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''11[11]<sup>1</sup>'''
+
<td>11[11]<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''++&G4'''
+
<td>++&G4</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Tetrahedral diprism]]'''
+
<td class='key'>[[Tetrahedral diprism]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''53'''
+
<td>53</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''111<sup>2</sup>'''
+
<td>111<sup>2</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''++Kt1'''
+
<td>++Kt1</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Cyltrianglindrone]]'''
+
<td class='key'>[[Cyltrianglindrone]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''54'''
+
<td>54</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''[21<sup>1</sup>]<sup>1</sup>'''
+
<td>[21<sup>1</sup>]<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&[T2xG3]'''
+
<td>&[T2xG3]</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Triangular diprismic pyramid]]'''
+
<td class='key'>[[Triangular diprismic pyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''55'''
+
<td>55</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[111<sup>1</sup>]<sup>1</sup>'''
+
<td>[111<sup>1</sup>]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&++G3'''
+
<td>&++G3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Tricone]]'''
+
<td class='key'>[[Tricone]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''56'''
+
<td>56</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''2<sup>3</sup>'''
+
<td>2<sup>3</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&&&T2'''
+
<td>&&&T2</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Square tripyramid]]'''
+
<td class='key'>[[Square tripyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''57'''
+
<td>57</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[11]<sup>3</sup>'''
+
<td>[11]<sup>3</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&&&G4'''
+
<td>&&&G4</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Sphoninder]]'''
+
<td class='key'>[[Sphoninder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''58'''
+
<td>58</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''13<sup>1</sup>'''
+
<td>13<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''+&T3'''
+
<td>+&T3</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Cylindronic prism]]'''
+
<td class='key'>[[Cylindronic prism]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''59'''
+
<td>59</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''1[21]<sup>1</sup>'''
+
<td>1[21]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''+&+T2'''
+
<td>+&+T2</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Cubic pyramidal prism]]'''
+
<td class='key'>[[Cubic pyramidal prism]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''60'''
+
<td>60</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1[111]<sup>1</sup>'''
+
<td>1[111]<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''+&Ko1'''
+
<td>+&Ko1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Diconic prism]]'''
+
<td class='key'>[[Diconic prism]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''61'''
+
<td>61</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''12<sup>2</sup>'''
+
<td>12<sup>2</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''+&&T2'''
+
<td>+&&T2</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Square dipyramidal prism]]'''
+
<td class='key'>[[Square dipyramidal prism]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''62'''
+
<td>62</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1[11]<sup>2</sup>'''
+
<td>1[11]<sup>2</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''+&&G4'''
+
<td>+&&G4</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Triangular prismic pyramidal prism]]'''
+
<td class='key'>[[Triangular prismic pyramidal prism]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''63'''
+
<td>63</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''1[11<sup>1</sup>]<sup>1</sup>'''
+
<td>1[11<sup>1</sup>]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''+&+G3'''
+
<td>+&+G3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Pentachoric prism]]'''
+
<td class='key'>[[Pentachoric prism]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''64'''
+
<td>64</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''11<sup>3</sup>'''
+
<td>11<sup>3</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''+Kp1'''
+
<td>+Kp1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Conindric pyramid]]'''
+
<td class='key'>[[Conindric pyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''65'''
+
<td>65</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[12<sup>1</sup>]<sup>1</sup>'''
+
<td>[12<sup>1</sup>]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&+&T2'''
+
<td>&+&T2</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Square pyramidal prismic pyramid]]'''
+
<td class='key'>[[Square pyramidal prismic pyramid]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''66'''
+
<td>66</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''[1[11]<sup>1</sup>]<sup>1</sup>'''
+
<td>[1[11]<sup>1</sup>]<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&+&G4'''
+
<td>&+&G4</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Tetrahedral prismic pyramid]]'''
+
<td class='key'>[[Tetrahedral prismic pyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''67'''
+
<td>67</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[11<sup>2</sup>]<sup>1</sup>'''
+
<td>[11<sup>2</sup>]<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&+Kt1'''
+
<td>&+Kt1</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Duotrianglindyinder]]'''
+
<td class='key'>[[Duotrianglindyinder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''68'''
+
<td>68</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''11<sup>1</sup>1<sup>1</sup>'''
+
<td>11<sup>1</sup>1<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''M1xG3xG3'''
+
<td>M1xG3xG3</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Triangular prismic dipyramid]]'''
+
<td class='key'>[[Triangular prismic dipyramid]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''69'''
+
<td>69</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[11<sup>1</sup>]<sup>2</sup>'''
+
<td>[11<sup>1</sup>]<sup>2</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&&+G3'''
+
<td>&&+G3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Hexateron]]'''
+
<td class='key'>[[Hexateron]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''70'''
+
<td>70</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''1<sup>4</sup>'''
+
<td>1<sup>4</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''K1x1'''
+
<td>K1x1</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Contrianglinder]]'''
+
<td class='key'>[[Contrianglinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''71'''
+
<td>71</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''2<sup>1</sup>1<sup>1</sup>'''
+
<td>2<sup>1</sup>1<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''&T2xG3'''
+
<td>&T2xG3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Hemoctahedrotrianglinder]]'''
+
<td class='key'>[[Hemoctahedrotrianglinder]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''72'''
+
<td>72</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''[11]<sup>1</sup>1<sup>1</sup>'''
+
<td>[11]<sup>1</sup>1<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&G4xG3'''
+
<td>&G4xG3</td>
-
|-
+
</tr><tr class='row2'>
-
|valign="top" style="background-color:#ccccff; text-align:center;"|'''[[Tetrahedrotrianglinder]]'''
+
<td class='key'>[[Tetrahedrotrianglinder]]</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''73'''
+
<td>73</td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''1<sup>2</sup>1<sup>1</sup>'''
+
<td>1<sup>2</sup>1<sup>1</sup></td>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''Kt1xG3'''
+
<td>Kt1xG3</td>
-
|-
+
</tr><tr class='row1'>
-
|valign="top" style="background-color:#ddddff; text-align:center;"|'''[[Duotrianglindric pyramid]]'''
+
<td class='key'>[[Duotrianglindric pyramid]]</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''N/A'''
+
<td>N/A</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''74'''
+
<td>74</td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''[1<sup>1</sup>1<sup>1</sup>]<sup>1</sup>'''
+
<td>[1<sup>1</sup>1<sup>1</sup>]<sup>1</sup></td>
-
|valign="top" style="background-color:#eeeeff; text-align:center;"|'''&[G3xG3]'''
+
<td>&[G3xG3]</td>
-
|}
+
</tr></table>
[[Category:Tapertopes|$]]
[[Category:Tapertopes|$]]

Revision as of 19:06, 30 May 2010

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
Duocyldyinder 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
Cyltriandyinder 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]