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Format:Politopuri k21

Politopuri k₂₁ în spațiul n-dimensional
Spațiu	Finit						Euclidian	Hiperbolic
E_n	3	4	5	6	7	8	9	10
Grup Coxeter	${\displaystyle E_{3}=A_{2}A_{1))$	${\displaystyle E_{4}=A_{4))$	${\displaystyle E_{5}=D_{5))$	${\displaystyle E_{6))$	${\displaystyle E_{7))$	${\displaystyle E_{8))$	${\displaystyle E_{9}={\tilde {E))_{8}=E_{8}^{+))$	${\displaystyle E_{10}={\bar {T))_{8}=E_{8}^{++))$
Diagramă Coxeter
Simetrie	[3^−1,2,1]	[3^0,2,1]	[3^1,2,1]	[3^2,2,1]	[3^3,2,1]	[3^4,2,1]	[3^5,2,1]	[3^6,2,1]
Ordin	12	120	1920	51 840	2 903 040	696 729 600	∞
Graf							–	–
Nume	−1₂₁	0₂₁	1₂₁	2₂₁	3₂₁	4₂₁	5₂₁	6₂₁

Documentație format

Politopuri k₂₁ în spațiul n-dimensional

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