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- In [[group theory]], a branch of [[mathematics]], the '''Vierergruppe''' (German, meaning group of four) is the smallest [[cyclic group|non-cycli The classic example of a Vierergruppe, first given by Klein, is the set of rotations over 180° around three orth3 KB (395 words) - 11:25, 30 July 2009
- 79 bytes (9 words) - 09:57, 30 July 2009
- Auto-populated based on [[Special:WhatLinksHere/Vierergruppe]]. Needs checking by a human.433 bytes (55 words) - 21:30, 11 January 2010
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- #REDIRECT [[Vierergruppe]]26 bytes (2 words) - 11:06, 30 July 2009
- Auto-populated based on [[Special:WhatLinksHere/Vierergruppe]]. Needs checking by a human.433 bytes (55 words) - 21:30, 11 January 2010
- In [[group theory]], a branch of [[mathematics]], the '''Vierergruppe''' (German, meaning group of four) is the smallest [[cyclic group|non-cycli The classic example of a Vierergruppe, first given by Klein, is the set of rotations over 180° around three orth3 KB (395 words) - 11:25, 30 July 2009
- ===Klein's Vierergruppe in ''S''<sub>4</sub>=== ...ur permutations is a subgroup and has the structure of [[Felix Klein]]'s [[Vierergruppe]]:5 KB (785 words) - 09:22, 30 July 2009