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Proof:
 
Proof:
  
We claim that the ideal <x,2> subset Z[x] is not principal. Suppose, to the contrary, that <x,2> =
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<nowiki>We claim that the ideal <x,2> subset Z[x] is not principal. Suppose, to the contrary, that <x,2> = <p(x)> for some p(x) in Z[x].  p(x) cannot be a constant polynomial, because this constant would have to be even, and then x is not in <p(x)>.  Furthermore, p(x) has a nonzero constant term, since otherwise 2 is not in <p(x)>.  
<p(x)> for some p(x) in Z[x].  p(x) cannot be a constant polynomial, because this constant would have to be even,  
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and then x is not in <p(x)>.  Furthermore, p(x) has a nonzero constant term, since otherwise 2 is
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Since x is in <p(x)>, there exists a polynomial q(x) in Z[x] such that x = q(x)p(x), and since the constant term of q(x)p(x) is zero, q(x) has degree at least 1. But this means x = q(x)p(x) has degree at least 2, a contradiction.</nowiki>
not in <p(x)>.  Since x is in <p(x)>, there exists a polynomial q(x) in Z[x] such that x = q(x)p(x), and since
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the constant term of q(x)p(x) is zero, q(x) has degree at least 1. But this means x = q(x)p(x) has
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Hey thanks, this helped a lot, whoever you are...
degree at least 2, a contradiction.
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-Tim
 
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MATH IS SO FUN.
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Latest revision as of 21:11, 5 November 2008

Proof:

We claim that the ideal <x,2> subset Z[x] is not principal. Suppose, to the contrary, that <x,2> = <p(x)> for some p(x) in Z[x]. p(x) cannot be a constant polynomial, because this constant would have to be even, and then x is not in <p(x)>. Furthermore, p(x) has a nonzero constant term, since otherwise 2 is not in <p(x)>. Since x is in <p(x)>, there exists a polynomial q(x) in Z[x] such that x = q(x)p(x), and since the constant term of q(x)p(x) is zero, q(x) has degree at least 1. But this means x = q(x)p(x) has degree at least 2, a contradiction.


Hey thanks, this helped a lot, whoever you are... -Tim

Alumni Liaison

Correspondence Chess Grandmaster and Purdue Alumni

Prof. Dan Fleetwood