The most difficult part of this material for me was completely following all of the logic and reasoning involved in Theorem 7.30 especially how they came up with the six elements from Ne and Nb that are elements of G.
The most interesting part of this material was that every group of order p (where p is a positive prime integer) is cyclic and isomorphic to Zp. I thought that this seemed to be a pretty powerful statement considering there are infinitely many primes. Considering the special behavior of Zp, it makes me wonder if a group of order p has special structure and behavior as well because it is isomorphic.
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