Which topics and theorems do you think are important out of those we have studied?
I think Legrange's Theorem, the remainder theorem, and the first Isomorphism theorem are the most important theorems we have studied. Some of the topics I think are important are the properties of groups and how the groups and rings are isomorphic to other groups and rings.
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.
I think one of the hardest things to do is finding a function to create an isomorphism between two groups or rings. One example of this is problem 15 on the homework review. Another concept I am struggling with is proving that a group is cyclic, like problem 8, 14, and 18. I would really like to go over problem 1 in class though, with An being a normal subgroup, and also problem 12 would be good since I am don't have the best understanding of automorphisms.
How do you think the things you learned in this course might be useful to you in the future?
Throughout this semester, I have realized that there are things in our every day life that we may be able to consider a group, and since we know so many things about groups now, it seems like I could understand those everyday things better, like the rubiks cube, or the equivalence classes when painting the sides of a cube (i am in combinatorics and we discussed this idea).
Tuesday, April 10, 2012
Sunday, April 8, 2012
Section 9.4, Due April 9
Part I: What was the most difficult part of the material for you?
I don't really understand why [a,b] + [c,d] = [ad+bc, bd] in this section because in my mind, I would think it should be [a,b] + [c,d] + [a+c, b+d] but it is not even close to that. So why not?
Part II: Write something reflective about the reading.
I see how the field F and the integral domain R relate to the rationals and the reals, but I am wondering how any of this stuff came up. Why would someone want to find something that is isomorphic to the rationals and reals when we have them already? I know I probably can't get an answer unless I studied more math, but it is something I am thinking about.
I don't really understand why [a,b] + [c,d] = [ad+bc, bd] in this section because in my mind, I would think it should be [a,b] + [c,d] + [a+c, b+d] but it is not even close to that. So why not?
Part II: Write something reflective about the reading.
I see how the field F and the integral domain R relate to the rationals and the reals, but I am wondering how any of this stuff came up. Why would someone want to find something that is isomorphic to the rationals and reals when we have them already? I know I probably can't get an answer unless I studied more math, but it is something I am thinking about.
Thursday, April 5, 2012
Section 8.4 & 8.5, Due April 6
Part I: What was the most difficult part of the material for you?
I am stuck on theorem 8.21 because I am having a hard time seeing how the number of distinct conjugates of a are related to [G:C(a)]. The proof really confused me because I don't really know why they are doing what they are doing and what it is accomplishing. The example kind of makes sense, but the proof is way to confusing for me to see that clear connection.
Part II: Write something reflective about the reading.
I thought it was interesting to learn about conjugates and conjugacy classes. At first, I didn't like thinking of another kind of class, but I can see how this class is similar to congruence classes with modular arithmetic, it is just a computation and a set of elements with that computation. At least, that is how I kind of think about it.
I am stuck on theorem 8.21 because I am having a hard time seeing how the number of distinct conjugates of a are related to [G:C(a)]. The proof really confused me because I don't really know why they are doing what they are doing and what it is accomplishing. The example kind of makes sense, but the proof is way to confusing for me to see that clear connection.
Part II: Write something reflective about the reading.
I thought it was interesting to learn about conjugates and conjugacy classes. At first, I didn't like thinking of another kind of class, but I can see how this class is similar to congruence classes with modular arithmetic, it is just a computation and a set of elements with that computation. At least, that is how I kind of think about it.
Tuesday, April 3, 2012
Section 8.2, Due April 4
Part I: What was the most difficult part of the material for you?
I was most confused once Theorem 8.15 was introduced. I don't really understand the x^-1Kx and why that is needed for this section. I think it would be more helpful with an example because most of the other theorems have examples but theorem 8.15 doesn't have any, so I am confused.
Part II: Write something reflective about the reading.
Most of this chapter I have been really confused, but the First Sylow Theorem actually made sense and seemed like an interesting extension idea with groups. So I am glad that this section is making a little more sense.
I was most confused once Theorem 8.15 was introduced. I don't really understand the x^-1Kx and why that is needed for this section. I think it would be more helpful with an example because most of the other theorems have examples but theorem 8.15 doesn't have any, so I am confused.
Part II: Write something reflective about the reading.
Most of this chapter I have been really confused, but the First Sylow Theorem actually made sense and seemed like an interesting extension idea with groups. So I am glad that this section is making a little more sense.
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