Template:Regular hyperbolic tiling table/sandbox

Regular hyperbolic tiling table
Spherical (improper/Platonic)/Euclidean/hyperbolic (Poincaré disc: compact/paracompact/noncompact) tessellations with their Schläfli symbol
p \ q	1	2	3	4	5	6	7	8	...	∞	...	iπ/λ
1	{1,1}	{1,2}	{1,3}	{1,4}	{1,5}	{1,6}	{1,7}	{1,8}		{1,∞}		{1,iπ/λ}
2	{2,1}	{2,2}	{2,3}	{2,4}	{2,5}	{2,6}	{2,7}	{2,8}		{2,∞}		{2,iπ/λ}
3	{3,1}	{3,2}	{3,3}	{3,4}	{3,5}	{3,6}	{3,7}	{3,8}		{3,∞}		{3,iπ/λ}
4	{4,1}	{4,2}	{4,3}	{4,4}	{4,5}	{4,6}	{4,7}	{4,8}		{4,∞}		{4,iπ/λ}
5	{5,1}	{5,2}	{5,3}	{5,4}	{5,5}	{5,6}	{5,7}	{5,8}		{5,∞}		{5,iπ/λ}
6	{6,1}	{6,2}	{6,3}	{6,4}	{6,5}	{6,6}	{6,7}	{6,8}		{6,∞}		{6,iπ/λ}
7	{7,1}	{7,2}	{7,3}	{7,4}	{7,5}	{7,6}	{7,7}	{7,8}		{7,∞}		{7,iπ/λ}
8	{8,1}	{8,2}	{8,3}	{8,4}	{8,5}	{8,6}	{8,7}	{8,8}		{8,∞}		{8,iπ/λ}
...
∞	{∞,1}	{∞,2}	{∞,3}	{∞,4}	{∞,5}	{∞,6}	{∞,7}	{∞,8}		{∞,∞}		{∞,iπ/λ}
...
iπ/λ	{iπ/λ,1}	{iπ/λ,2}	{iπ/λ,3}	{iπ/λ,4}	{iπ/λ,5}	{iπ/λ,6}	{iπ/λ,7}	{iπ/λ,8}		{iπ/λ,∞}		{iπ/λ,iπ/λ}