Category:Separable Field Extensions
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This category contains results about Separable Field Extensions.
Let $K$ be a field.
Let $L/K$ be an algebraic field extension.
Then $L/K$ is a separable extension if and only if every $\alpha\in L$ is separable over $K$.
Pages in category "Separable Field Extensions"
The following 8 pages are in this category, out of 8 total.
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- Separable Degree is At Most Equal To Degree
- Separable Degree of Field Extensions is Multiplicative
- Definition:Separable Degree/Definition 1
- Definition:Separable Degree/Definition 2
- Definition:Separable Degree/Definition 3
- Separable Elements Form Field
- Subextensions of Separable Field Extension are Separable