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Cantic octagonal tiling

Cantic octagonal tiling
Poincaré disk model of the hyperbolic plane
Type	Hyperbolic uniform tiling
Vertex configuration	3.6.4.6
Schläfli symbol	h2{8,3}
Wythoff symbol	4 3 \| 3
Coxeter diagram	=
Symmetry group	[(4,3,3)], (*433)
Dual	Order-4-3-3 t12 dual tiling
Properties	Vertex-transitive

In geometry, the tritetratrigonal tiling or shieldotritetragonal tiling is a uniform tiling of the hyperbolic plane. It has Schläfli symbol of t1,2(4,3,3). It can also be named as a cantic octagonal tiling, h2{8,3}.

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Dual tiling

*n33 orbifold symmetries of cantic tilings: 3.6.n.6

Symmetry*n32[1+,2n,3]= [(n,3,3)]	Spherical	Euclidean	Compact Hyperbolic			Paracompact
Symmetry*n32[1+,2n,3]= [(n,3,3)]	*233[1+,4,3]= [3,3]	*333[1+,6,3]= [(3,3,3)]	*433[1+,8,3]= [(4,3,3)]	*533[1+,10,3]= [(5,3,3)]	*633...[1+,12,3]= [(6,3,3)]	*∞33[1+,∞,3]= [(∞,3,3)]
Coxeter Schläfli	= h2{4,3}	= h2{6,3}	= h2{8,3}	= h2{10,3}	= h2{12,3}	= h2{∞,3}
Canticfigure
Vertex	3.6.2.6	3.6.3.6	3.6.4.6	3.6.5.6	3.6.6.6	3.6.∞.6
Domain
Wythoff	2 3 \| 3	3 3 \| 3	4 3 \| 3	5 3 \| 3	6 3 \| 3	∞ 3 \| 3
Dualfigure
Face	V3.6.2.6	V3.6.3.6	V3.6.4.6	V3.6.5.6	V3.6.6.6	V3.6.∞.6