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We know that A3 is all even permutations of S3, which means that |A3| is exactly half of |S3| since there are an equal number of even and odd permutations. We also know that A3 is a subgroup in S3.
 
We know that A3 is all even permutations of S3, which means that |A3| is exactly half of |S3| since there are an equal number of even and odd permutations. We also know that A3 is a subgroup in S3.
  
Now refer back to the first problem from this assignment. Let H = A3, G = S3. By theorem 7.1, the index (distinct right/left cosets) of H in G is |H|/|G| = 2. We proved that any subgroup H in G with index = 2 is normal in G. Therefore, A3 is normal in S3.
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Now refer back to the first problem from this assignment. Let H = A3, G = S3. By theorem 7.1, the index (distinct right/left cosets) of H in G is |G|/|H| = 2. We proved that any subgroup H in G with index = 2 is normal in G. Therefore, A3 is normal in S3.
  
 
--[[Ysuo|Ysuo]]
 
--[[Ysuo|Ysuo]]
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Indeed.
 
Indeed.
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----
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Good, I'm not the only one that thought this question seemed a lot like the first problem.
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--[[User:Ambowser|Ambowser]]

Latest revision as of 14:38, 19 February 2009


prove that A_3 inside S_3 is normal.

Does anyone have a good idea of how to go about proving this?

I just used the fact that parity (even and oddness) is a homomorphism and respects products.

--Jzage 16:14, 18 February 2009 (UTC)


Here's an idea. I'll let you judge if it's good.

We know that A3 is all even permutations of S3, which means that |A3| is exactly half of |S3| since there are an equal number of even and odd permutations. We also know that A3 is a subgroup in S3.

Now refer back to the first problem from this assignment. Let H = A3, G = S3. By theorem 7.1, the index (distinct right/left cosets) of H in G is |G|/|H| = 2. We proved that any subgroup H in G with index = 2 is normal in G. Therefore, A3 is normal in S3.

--Ysuo


Yea I like that idea. Well done.

--Jniederh 23:09, 18 February 2009 (UTC)


Agreed, That's a brilliant finale to this assignment. --Bcaulkin 23:59, 18 February 2009 (UTC)



Indeed.


Good, I'm not the only one that thought this question seemed a lot like the first problem. --Ambowser

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