Category:Symmetric Group on 3 Letters
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This category contains results about Symmetric Group on 3 Letters.
Let $S_3$ denote the set of permutations on $3$ letters.
The symmetric group on $3$ letters is the algebraic structure:
- $\struct {S_3, \circ}$
where $\circ$ denotes composition of mappings.
Subcategories
This category has only the following subcategory.
S
Pages in category "Symmetric Group on 3 Letters"
The following 26 pages are in this category, out of 26 total.
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I
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- Sets of Operations on Set of 3 Elements
- Subgroups of Symmetric Group on 3 Letters
- Symmetric Group on 3 Letters
- Symmetric Group on 3 Letters is Isomorphic to Dihedral Group D3
- Symmetric Group on 3 Letters/Cayley Table
- Symmetric Group on 3 Letters/Center
- Symmetric Group on 3 Letters/Centralizers
- Symmetric Group on 3 Letters/Conjugacy Classes
- Symmetric Group on 3 Letters/Cycle Notation
- Symmetric Group on 3 Letters/Generators
- Symmetric Group on 3 Letters/Group Presentation
- Symmetric Group on 3 Letters/Normal Subgroups
- Symmetric Group on 3 Letters/Normal Subgroups/Cayley table of Quotient Group
- Symmetric Group on 3 Letters/Normalizers
- Symmetric Group on 3 Letters/Order of Elements
- Symmetric Group on 3 Letters/Subgroups
- Symmetric Group on 3 Letters/Subgroups/Examples
- Symmetric Group on 3 Letters/Subgroups/Examples/Non-Subgroup
- Symmetry Group of Equilateral Triangle is Symmetric Group