List the cyclic subgrous of U(30).
To do this, I listed each possible subgroup of U(30) and then tested whether they are cyclic. A problem I ran into, though, is that <13> appears to be cyclic and <23> does, but the answer in the back of the book does not include them.
Has anyone else encountered this problem or know the solution? I will try to ask during office hours....
--A. Cadwallader
I think they aren't in the back of the book because <13> is the same as <7> and <23> is the same as <17>.
--S. Rosenberger
Is <13> = <7> and <23> = 17 because they have the same elements or the same order. What I'm asking is if cyclic groups of the same order equal to each other.
--R. Kersey
