Answer to Question #202555 in Abstract Algebra for Maheen Fatima

Solution:

Proof:

Suppose K has characteristic "b" .

If K has a transcendental element "a" , then "\\mathbf{F}_{b}(a) \\subseteq K" is countably infinite, being isomorphic to the rational function field "\\mathbf{F}_{p}(x)" .

Otherwise, "K \\subseteq \\overline{\\mathbf{F}}_{b}" which is countable, so it can be just taken K itself to be the countably infinite subfield. Thus, the rational numbers is a smallest infinite field