221 |
122 |
In 6-dimensional geometry, there are 39 uniform polytopes with E6 symmetry. The two simplest forms are the 221 and 122 polytopes, composed of 27 and 72 vertices respectively.
They can be visualized as symmetric orthographic projections in Coxeter planes of the E6 Coxeter group, and other subgroups.
Symmetric orthographic projections of these 39 polytopes can be made in the E6, D5, D4, D2, A5, A4, A3 Coxeter planes. Ak has k+1 symmetry, Dk has 2(k-1) symmetry, and E6 has 12 symmetry.
Six symmetry planes graphs are shown for 9 of the 39 polytopes in the E6 symmetry. The vertices and edges drawn with vertices colored by the number of overlapping vertices in each projective position.
| # | Coxeter plane graphs | Coxeter-Dynkin diagram Names |
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|---|---|---|---|---|---|---|---|---|
| E6 / F4 [12] |
D5 / B4 [8] |
D4 / B3 / G2 / A2 [6] |
A5 [6] |
B6 [12/2] |
D6 / B5 / A4 [10/2] |
D3 / B2 / A3 [4] |
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| 1 | 221 Icosihepta-heptacontidipeton (jak) |
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| 2 | Rectified 221 Rectified icosihepta-heptacontidipeton (rojak) |
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| 3 | Rectified 122 / Birectified 221 Rectified pentacontatetrapeton (ram) |
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| 4 | Trirectified 221 Trirectified icosihepta-heptacontidipeton (harjak) |
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| 5 | 122 Pentacontatetrapeton (mo) |
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| 6 | Truncated 221 Truncated icosihepta-heptacontidipeton (tojak) |
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| 7 | Cantellated 221 Cantellated icosihepta-heptacontidipeton |
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| 8 | Bicantellated 221 / Birectified 122 Birectified pentacontatetrapeton (barm) |
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| 9 | Truncated pentacontatetrapeton (tim) |
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