R39.1′

Statistics

genus c39, orientable
Schläfli formula c{42,4}
V / F / E c 84 / 8 / 168
notesreplete
vertex, face multiplicity c1, 14
Petrie polygons
8, each with 42 edges
rotational symmetry group336 elements.
full symmetry group672 elements.
its presentation c< r, s, t | t2, s4, (sr)2, (st)2, (rt)2, (sr‑2)2, r42  >
C&D number cR39.1′
The statistics marked c are from the published work of Professor Marston Conder.

Relations to other Regular Maps

Its dual is R39.1.

It is self-Petrie dual.

It can be built by 2-splitting R18.1′.
It can be built by 7-splitting S3:{6,4}.

List of regular maps in orientable genus 39.


Other Regular Maps

General Index