Difference between revisions of "Symmetric group"

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The '''symmetric group''' <math>S_{n}</math> is defined to be the group of all permutations of <math>n</math> objects.  Knowledge of the general symmetric group $S_{n} is crucial in such areas as [[Galois Theory]], including proving that equations of degree 5 and higher are unsolvable through the use of elementary arithmetic and root extractions.
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The '''symmetric group''' <math>S_{n}</math> is defined to be the group of all permutations of <math>n</math> objects.  Knowledge of the general symmetric group <math>S_{n}</math> is crucial in such areas as [[Galois Theory]], including proving that equations of degree 5 and higher are unsolvable through the use of elementary arithmetic and root extractions.

Revision as of 19:43, 13 March 2008

The symmetric group $S_{n}$ is defined to be the group of all permutations of $n$ objects. Knowledge of the general symmetric group $S_{n}$ is crucial in such areas as Galois Theory, including proving that equations of degree 5 and higher are unsolvable through the use of elementary arithmetic and root extractions.