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Line 3: In [[geometry]], the '''infinite-order triangular tiling''' is a [[regular hyperbolic tiling\|regular tiling]] of the [[hyperbolic geometry\|hyperbolic plane]] with a [[Schläfli symbol]] of {3,∞}. All vertices are ''ideal'', located at "infinity" and seen on the boundary of the [[Poincaré hyperbolic disk]] projection. == Symmetry == A lower symmetry form has alternating colors, and represented by cyclic symbol {(3,∞3)}. :[[File:H2_tiling_33i-4.png\|160px]] ==Related polyhedra and tiling== This tiling is topologically related as part of a sequence of regular polyhedra with [[Schläfli symbol]] {3,p}.

Infinite-order triangular tiling: Difference between revisions