© ((xV3oo3oo5xo))&#zq, where V = 2f
| Acronym | ... |
| Name | hyperbolic "120N pen + 120N rap + N rox + 60N ipe" tetracomb |
| Circumradius | sqrt[-(6 sqrt(5)-13)/44] = 0.097282 i |
| Vertex figure |
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The above displayed vertex figure, ((xV3oo3oo5xo))&#zq, can be considered as a uniform sidpixhi augmented by dodecahedral pyramids with lacing edges of size q = sqrt(2) = 1.414214. That lacing edge size then allows for a common circumradius.
Incidence matrix according to Dynkin symbol
x
Ø |
o
3 / \ 3
...............
: x o :
: 3 | | 3 :
: o-----o :
: 5 :
:.............:
o3((x3o5o3o))3*aØx (N → ∞) . . . . . . | N ♦ 2400 120 | 3600 3600 2400 | 3600 2400 1440 3600 | 720 1200 600 1440 ---------------+-----+-----------+------------------+---------------------+------------------- . x . . . . | 2 | 1200N * | 3 3 1 | 6 3 3 3 | 3 3 1 3 . . . . . x | 2 | * 60N ♦ 0 0 20 | 0 0 0 30 | 0 0 0 12 ---------------+-----+-----------+------------------+---------------------+------------------- o3x . . . . | 3 | 3 0 | 1200N * * | 2 0 2 1 | 2 1 0 2 . x3o . . . | 3 | 3 0 | * 1200N * | 2 2 0 0 | 1 2 1 0 . x . . . x | 4 | 2 2 | * * 600N | 0 0 0 3 | 0 0 0 3 ---------------+-----+-----------+------------------+---------------------+------------------- o3x3o . . . ♦ 6 | 12 0 | 4 4 0 | 600N * * * | 1 1 0 0 o3x . . o3*a . ♦ 4 | 6 0 | 0 4 0 | * 600N * * | 0 1 1 0 . x3o5o . . ♦ 12 | 30 0 | 20 0 0 | * * 120N * | 1 0 0 1 . x3o . . x ♦ 6 | 6 3 | 2 0 3 | * * * 600N | 0 0 0 2 ---------------+-----+-----------+------------------+---------------------+------------------- o3x3o5o . . ♦ 720 | 3600 0 | 2400 1200 0 | 600 0 120 0 | N * * * o3x3o . o3*a . ♦ 10 | 30 0 | 10 20 0 | 5 5 0 0 | * 120N * * o3x . o3o3*a . ♦ 5 | 10 0 | 0 10 0 | 0 5 0 0 | * * 120N * . x3o5o . x ♦ 24 | 60 12 | 40 0 30 | 0 0 2 20 | * * * 60N
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