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Suppose I have the field $ \mathbb Q[\sqrt d] $ where d is some square free positive integer.

How can I prove that a polynomial with integer coefficients is irreducible over this field?

And what if the field is something like $ \mathbb Q[\sqrt d_1, \sqrt d_2]$ both $ d_1, d_2$ square free.?

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    Do you have any specific polynomial in mind?2011-10-29
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    Yeah. Suppose $x^2 - 7$. But I would also like to know some general techniques.2011-10-29
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    Yeah.I know. But Eisenstein's crterion is to prove irreducibility over $\mathbb Z$. How do I use it to prove irreducibility over $\mathbb Q[\sqrt d]$?2011-10-29
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    I sincerely advice you to read its generalizations present under section [here](http://en.wikipedia.org/wiki/Eisenstein%27s_criterion#Generalization) and also [this](http://mathoverflow.net/questions/15460/variants-of-eisenstein-irreducibility)2011-10-29

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