Where $R$ is the real number field.
I am having trouble proving this statement, honestly i don't even have an idea where to start. Any help would be appreciated.
2026-03-28 06:10:18.1774678218
finite Galois extension of K/$Q$ of index $>2$ prove that there exists field L s.t .$Q$ ⊊ L ⊆ $R$ ∩ K
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