EZ Study

Actuarial Biology Chemistry Economics Calculators Confucius Engineer

Graduate Algebra Study Notes II-(13)

Key Words: Fields, Galois Theory, Spitting Fields, Algebraic Closure, Normality

Problem: (9) F is an algebraic closure of K if and only if F is algebraic over K and for every algebraic extension E of K there exists a K-monomorphism E-->F.
Solution step by step: Click to download printable solution

Related solutions you might be intersted:
Continue to 14. Proof of algebraic extension, isomorphism, monomorphism   Algebra Tutorial   Mathematics Analysis Tutorial
Back to : 12. Proof of Spitting Fields, irreducible, degree