R84.7′

genus ^c	84, orientable
Schläfli formula ^c	{210,10}
V / F / E ^c	42 / 2 / 210
notes
vertex, face multiplicity ^c	5, 210
Petrie polygons	10, each with 42 edges
rotational symmetry group	420 elements.
full symmetry group	840 elements.
its presentation ^c	< r, s, t \| t², (sr)², (st)², (rt)², rs³rs^‑1, s¹⁰, r²¹s²r²¹ >
C&D number ^c	R84.7′
The statistics marked ^c are from the published work of Professor Marston Conder.

It can be built by 2-splitting R42.7′.
It can be built by 3-splitting R28.29′.
It can be built by 7-splitting R12.6′.

Other Regular Maps