Use cosets to show that a finite group with an order that is a prime number can
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Use cosets to show that a finite group with an order that is a prime number can have no proper subgroups. Show that a finite group with order equal to a prime number is isomorphic to a cyclic group. Hint: Show that the group has a cyclic subgroup.
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Related Book For
Symmetry Broken Symmetry And Topology In Modern Physics A First Course
ISBN: 9781316518618
1st Edition
Authors: Mike Guidry, Yang Sun
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