Share
Explore BrainMass

Transpositions and Cycles : Let H be a subgroup of Sp (the permutation group), where p is prime. Show that if H contains a transposition and a cycle of length p, then H = Sp.

Let H be a subgroup of Sp (the permutation group), where p is prime. Show that if H contains a transposition and a cycle of length p, then H = Sp.

Attachments

Solution Summary

Transpositions and Cycles are investigated. The solution is detailed and well presented.

$2.19