Template:Polyhedra word description

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The {{{{{{1}}}-name}}} has {{{{{{1}}}-V}}} vertices, {{{{{{1}}}-E}}} edges, and {{{{{{1}}}-F}}} faces ({{{{{{1}}}-Fdetail}}}). The vertex configuration is {{{{{{1}}}-vfig}}}. Its symmetry group is {{{{{{1}}}-group}}}, its Wythoff symbol is {{{{{{1}}}-Wythoff}}}, and its Euler characteristic is χ={{{{{{1}}}-chi}}}.

Its uniform index number is U{{{{{{1}}}-U}}}, its Kaleido index is K{{{{{{1}}}-K}}}, its number in Wenninger's Polyhedron Models is {{{{{{1}}}-W}}}, and it was given the number {{{{{{1}}}-C}}} in Coxeter's 1954 paper, which first gave the complete list of the uniform polyhedra.

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See Template talk:Polyhedra DB for use of this template.