This is from Artin Algebra Sec 15.4:
I can't understand how did we conclude that $x^4-10x^2+1$ is irredducible over $\Bbb Q$ from the discussion of para above example 15.4.4.
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1See this post, or this one. The answers there prove the claim of Example $15.4.4$. – Dietrich Burde May 04 '19 at 11:36
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Well, $\gamma$ is a zero of $x^4-10x^2+1$ over the rationals and this is the lowest degree polynomial with this property. So it must be irreducible.
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