Acronym
| ..., s∞x2o3x6s |

Name
| ... |

The mere alternated faceting (here starting at thaph) e.g. would use edges of 3 different sizes: |s2s| = x(4,2) = sqrt(2) = q = 1.414214 resp. |sefa(s6x)| = x(12,3) = e = 1+sqrt(3) = 2.732051, besides the remaining unit edges (refering to elements of s∞o2o3x6s here).

Even so this snub can be made all unit edged. However then it neither would become uniform nor scaliform, because pairs of the former trapezia would become adjoining coplanar squares, that is the elongated triangular trapezobiprisms then would become triangular triprisms, which have an internal dihedral angle of 180°. In fact, this rescaled structure then happens to be quite similar to thiph in its 2-coloring of the triangles of the underlying that: on the hexagons there are stacks of monostratic hexagonal prisms (hip), on the red triangles there are stacks of tristratic triangular triprisms, based on all the layers of level 0 mod 4, then followed by a usual monostratic trip, while on the blue triangles there are also stacks of tristratic triangular triprisms, based on all the layers of level 2 mod 4, also followed by a usual monostratic trip.

Incidence matrix according to Dynkin symbol

s∞x2o3x6s (N → ∞) demi( . . . . . ) | 6N | 1 2 1 2 | 2 1 2 4 2 | 1 2 2 2 ------------------+----+-------------+----------------+-------- demi( . x . . . ) | 2 | 3N * * * | 2 0 0 0 2 | 1 0 2 1 x demi( . . . x . ) | 2 | * 6N * * | 1 1 1 1 0 | 1 1 1 1 x s . 2 . s ) | 2 | * * 3N * | 0 0 0 4 0 | 0 2 0 2 q sefa( . . . x6s ) | 2 | * * * 6N | 0 0 1 1 1 | 0 1 1 1 e=x+h ------------------+----+-------------+----------------+-------- demi( . x . x . ) | 4 | 2 2 0 0 | 3N * * * * | 1 0 1 0 x4o demi( . . o3x . ) | 3 | 0 3 0 0 | * 2N * * * | 1 0 0 1 x3o . . . x6s | 6 | 0 3 0 3 | * * 2N * * | 0 1 1 0 x3e sefa( s 2 . x6s ) | 4 | 0 1 2 1 | * * * 6N * | 0 1 0 1 xe&#q sefa( . x 2 x6s ) | 4 | 2 0 0 2 | * * * * 3N | 0 0 1 1 x2e ------------------+----+-------------+----------------+-------- demi( . x o3x . ) | 6 | 3 6 0 0 | 3 2 0 0 0 |N* * * x-trip s 2 . x6s | 12 | 0 6 6 6 | 0 0 2 6 0 | * N * * xe3ex&#q ditra . x 2 x6s | 12 | 6 6 0 6 | 3 0 2 0 3 | * * N * x x3e ditriangular hip variant sefa( s∞x2o3x6s ) | 12 | 3 6 6 6 | 0 2 0 6 3 | * * * N xeex3oooo&#(q,x,q)t elongated triangular trapezobiprisms starting figure: x∞x o3x6x

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