Revision as of 07:40, 28 September 2017 edit Tomruen (talk \| contribs) Autopatrolled, Extended confirmed users, Pending changes reviewers 120,750 edits →Order-infinite-3 square honeycomb ← Previous edit		Revision as of 07:41, 28 September 2017 edit undo Tomruen (talk \| contribs) Autopatrolled, Extended confirmed users, Pending changes reviewers 120,750 edits →Order-infinite-3 hexagonal honeycomb Next edit →
Line 286: \|bgcolor=#efdcc3\|Faces\|\|[[Hexagon\|{6}]] \|- \|bgcolor=#efdcc3\|[[Vertex figure]]\|\|[[~~heptagonal~~order-3 apeirogonal tiling\|{∞,3}]] \|- \|bgcolor=#efdcc3\|Dual\|\|[[Order-infinite-6 triangular honeycomb\|{3,∞,6}]] Line 294: \|bgcolor=#efdcc3\|Properties\|\|Regular \|} In the [[geometry]] of [[Hyperbolic space\|hyperbolic 3-space]], the '''order-infinite-3 hexagonal honeycomb''' (or '''6,∞,3 honeycomb''') a regular space-filling [[tessellation]] (or [[honeycomb (geometry)\|honeycomb]]). Each infinite cell consists of a [[order-63 ~~hexagonal~~apeirogonal tiling]] whose vertices lie on a [[Hypercycle (geometry)\|2-hypercycle]], each of which has a limiting circle on the ideal sphere. The [[Schläfli symbol]] of the ''order-infinite-3 hexagonal honeycomb'' is {6,∞,3}, with three ~~order~~infinite-5order hexagonal tilings meeting at each edge. The [[vertex figure]] of this honeycomb is a ~~heptagonal~~order-3 apeirogonal tiling, {∞,3}. {\| class=wikitable

Order-infinite-3 triangular honeycomb: Difference between revisions