Homework SourseLet F lessthanorequalto K be field extension and let a1 a2 e
Let F lessthanorequalto K be field extension and let a_1, a_2, ellipsis, a_n in K be algebraic over F. Show that F[a_1, a_2, ellipsis, a_n] is a subfield of K and F lessthanorequalto F[a_1, ellipsis, a_n] is finite.![Let F lessthanorequalto K be field extension and let a_1, a_2, ellipsis, a_n in K be algebraic over F. Show that F[a_1, a_2, ellipsis, a_n] is a subfield of K](/WebImages/35/let-f-lessthanorequalto-k-be-field-extension-and-let-a1-a2-e-1104539-1761584308-0.webp "Let F lessthanorequalto K be field extension and let a_1, a_2, ellipsis, a_n in K be algebraic over F. Show that F[a_1, a_2, ellipsis, a_n] is a subfield of K")
Solution
Since ai is algebraic over F,
it is algebraic over F(a1, a2, . . . , ai1).
Thus [F(a1, a2, . . . , ai) : F(a1, a2, . . . , ai1)] is finite for all i. Therefore the field F(a1, a2, . . . , an) is a finite extension of F. Hence it is algebraic.
Also if a, b K be algebraic over F. Then F(a, b) is a finite extension of F. Hence all elements of F(a, b) are algebraic over F. In particular, a ± b, ab and a/b if b 6= 0, are all algebraic over F.
