Tag Archives: cyclic

MaBloWriMo 30: Cyclic subgroups

Posted on December 1, 2015 by Brent

Today, to wrap things up, we will use Lagrange’s Theorem to prove that if is an element of the group , the order of evenly divides the order of . So we have a group and an element . In … Continue reading →

Posted in algebra, group theory, proof | Tagged cyclic, groups, Lagrange, MaBloWriMo, proof, subgroups | 6 Comments

Tag Archives: cyclic

MaBloWriMo 30: Cyclic subgroups

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