1. Which topics and theorems do you think are the most important out of those we have studied?
Groups, subgroups, ideals, rings, and subrings. Knowing the properties and examples of these are going to be the most important.
2. What kinds of questions do you expect to see on the exam?
I expect to see questions about examples of different groups and ideals and such that we have talked about. I also expect to see a couple of proofs, maybe one or two we have done in class, and then a couple that we haven't done exactly but are similar -- like proving if something is a group, subgroup, finding ideals, kernels, etc.
3. What do you need to work on understanding better before the exam? Come up with a mathematical question you would like to see answered or a problem you would like to see worked out in class on Monday.
I would like to review ideals. I have forgotten a lot of chapter 6, and that would be the best thing because other earlier principles build on newer stuff, but ideals would be something good to go over because I am still confused. I would like to see a problem of listing off all the big examples of groups, subgroups, etc.
No comments:
Post a Comment