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- Transformation_(combinatorics) abstract "In combinatorial mathematics, the notion of transformation is used with several slightly different meanings. Informally, a transformation of a set of N values is an arrangement of those values into a particular order, where values may be repeated, but the ordered list is N elements in length. Thus, there are 27 transformations of the set {1,2,3}, namely [1,1,1], [1,1,2], [1,1,3], [1,2,1], [1,2,2], [1,2,3], [1,3,1],[1,3,2], [1,3,3], [2,1,1], [2,1,2],[2,1,3],[2,2,1], [2,2,2], [2,2,3], [2,3,1], [2,3,2], [2,3,3], [3,1,1], [3,1,2], [3,1,3], [3,2,1], [3,2,2], [3,2,3], [3,3,1], [3,3,2], and [3,3,3]. In general there are NN transformations for a set of N elements.Analogous to a permutation group having elements that are permutations, a transformation semigroup has elements that are transformations. For N > 1, the set of permutations on N values is a proper subset of the set of transformations on N values.".
- Transformation_(combinatorics) wikiPageID "26743819".
- Transformation_(combinatorics) wikiPageRevisionID "495838977".
- Transformation_(combinatorics) hasPhotoCollection Transformation_(combinatorics).
- Transformation_(combinatorics) subject Category:Combinatorics.
- Transformation_(combinatorics) comment "In combinatorial mathematics, the notion of transformation is used with several slightly different meanings. Informally, a transformation of a set of N values is an arrangement of those values into a particular order, where values may be repeated, but the ordered list is N elements in length.".
- Transformation_(combinatorics) label "Transformation (combinatorics)".
- Transformation_(combinatorics) sameAs m.0bmgc44.
- Transformation_(combinatorics) sameAs Q7834076.
- Transformation_(combinatorics) sameAs Q7834076.
- Transformation_(combinatorics) wasDerivedFrom Transformation_(combinatorics)?oldid=495838977.
- Transformation_(combinatorics) isPrimaryTopicOf Transformation_(combinatorics).