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- Dicyclic_group abstract "In group theory, a dicyclic group (notation Dicn) is a member of a class of non-abelian groups of order 4n (n > 1). It is an extension of the cyclic group of order 2 by a cyclic group of order 2n, giving the name di-cyclic. In the notation of exact sequences of groups, this extension can be expressed as:More generally, given any finite abelian group with an order-2 element, one can define a dicyclic group.".
- Dicyclic_group wikiPageExternalLink books?id=9BY9AAAAIAAJ&pg=PA74.
- Dicyclic_group wikiPageID "154963".
- Dicyclic_group wikiPageRevisionID "581319128".
- Dicyclic_group hasPhotoCollection Dicyclic_group.
- Dicyclic_group subject Category:Finite_groups.
- Dicyclic_group subject Category:Quaternions.
- Dicyclic_group type Abstraction100002137.
- Dicyclic_group type DefiniteQuantity113576101.
- Dicyclic_group type Digit113741022.
- Dicyclic_group type FiniteGroups.
- Dicyclic_group type Four113744304.
- Dicyclic_group type Group100031264.
- Dicyclic_group type Integer113728499.
- Dicyclic_group type Measure100033615.
- Dicyclic_group type Number113582013.
- Dicyclic_group type Quaternions.
- Dicyclic_group comment "In group theory, a dicyclic group (notation Dicn) is a member of a class of non-abelian groups of order 4n (n > 1). It is an extension of the cyclic group of order 2 by a cyclic group of order 2n, giving the name di-cyclic. In the notation of exact sequences of groups, this extension can be expressed as:More generally, given any finite abelian group with an order-2 element, one can define a dicyclic group.".
- Dicyclic_group label "Dicyclic group".
- Dicyclic_group label "Dicyclische groep".
- Dicyclic_group label "Gruppo diciclico".
- Dicyclic_group sameAs Gruppo_diciclico.
- Dicyclic_group sameAs Dicyclische_groep.
- Dicyclic_group sameAs m.0148rx.
- Dicyclic_group sameAs Q3777914.
- Dicyclic_group sameAs Q3777914.
- Dicyclic_group sameAs Dicyclic_group.
- Dicyclic_group wasDerivedFrom Dicyclic_group?oldid=581319128.
- Dicyclic_group isPrimaryTopicOf Dicyclic_group.