I think the most important theorems are the named ones and the other one that we are expected to be able to state and prove. It'll also be important to know all the axioms for rings and groups-how to prove something is a group. I expect the types of questions to be similar to that of the first test: one or two proofs and then computational (although I'm not entirely sure what computational problems will look like for these sections). One thing I am only starting to grasp is the idea of cosets, I can't visualize them at all which is really putting a block on my understanding. Any problem/extra explanation regarding section 9.4 would be helpful for me since that section didn't really fit with the rest of what we did around that time.
No comments:
Post a Comment