(New page: I found that they are not isomorphic because they are not "onto" (1 to 1). Did anyone else come to that conclusions? I used Cayley tables...they were big and it took some work. I'm sure...)
 
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I found that they are not isomorphic because they are not "onto" (1 to 1).  Did anyone else come to that conclusions?  I used Cayley tables...they were big and it took some work.  I'm sure there's a quicker way...
 
I found that they are not isomorphic because they are not "onto" (1 to 1).  Did anyone else come to that conclusions?  I used Cayley tables...they were big and it took some work.  I'm sure there's a quicker way...
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----
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I also found that they are not isomorphic. However, I used the fact that two groups must preserve order to be isomorphic. So first looking at the number of elements in each group we see that: <br>
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U(20) = {1,3,7,9,11,13,17,19} and U(24) = {1,5,7,11,13,17,19,23}.<br>
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For U(20):<br>
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|1|= 1 <br>
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|3|= 4 <br>
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|7|= 4 <br>
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|9|= 2 <br>
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|11|= 2 <br>
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|13|= 4 <br>
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|17|= 4 <br>
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|19|= 2 <br>
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<br>
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For U(24): <br>
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|1|= 1 <br>
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|5|= 2 <br>
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|7|= 2 <br>
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|11|= 2 <br>
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|13|= 2 <br>
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|17|= 2 <br>
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|19|= 2 <br>
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|23|= 2 <br>
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<br>
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So even though both groups have the same number of elements, we can see that the order of the elements is not equivalent. Therefore, order is not preserved and the two groups cannot be isomorphic. -Jesse

Revision as of 12:18, 24 September 2008

I found that they are not isomorphic because they are not "onto" (1 to 1). Did anyone else come to that conclusions? I used Cayley tables...they were big and it took some work. I'm sure there's a quicker way...


I also found that they are not isomorphic. However, I used the fact that two groups must preserve order to be isomorphic. So first looking at the number of elements in each group we see that:
U(20) = {1,3,7,9,11,13,17,19} and U(24) = {1,5,7,11,13,17,19,23}.
For U(20):
|1|= 1
|3|= 4
|7|= 4
|9|= 2
|11|= 2
|13|= 4
|17|= 4
|19|= 2

For U(24):
|1|= 1
|5|= 2
|7|= 2
|11|= 2
|13|= 2
|17|= 2
|19|= 2
|23|= 2

So even though both groups have the same number of elements, we can see that the order of the elements is not equivalent. Therefore, order is not preserved and the two groups cannot be isomorphic. -Jesse

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Abstract algebra continues the conceptual developments of linear algebra, on an even grander scale.

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