5. Let E be a normal extension of Q, and let Fi, F CE be two normal subex- tensionsnAssume also that Fin F2 Prove that...
5. Let V-Pi(R), and, for p(x) E V, define f, f2 E V by 2 fi (p(x))p(t) dt and f2(p(xp(t) dt 0 0 Prove that (fi, f2) is a basis for V", and find a basis for V for which it is the dual basis
Let k C F = kla) be a simple algebraic extension. Prove that F is normal over k if and only if for every algebraic extension FC K and every o E Autk(K),(F) = F.
Please help with the abstract algebra question detaily. Thanks. 1. Suppose r E Q. Let β cos(m). Prove that β is algebraic over Q. Let E-Q(3). Prove that Q(3) is a normal extension of Q and that Gal(E/Q) is an abelian group. 1. Suppose r E Q. Let β cos(m). Prove that β is algebraic over Q. Let E-Q(3). Prove that Q(3) is a normal extension of Q and that Gal(E/Q) is an abelian group.
9. Let E be an extension field of a field F. (1) What does it mean for an element z EE being algebraic over F? (2) What does it mean for an element z E E being transcendental over F? (3) Can you find any element r e C such that r is transcendental over Q? (4) Can you prove that if a E E is algebraic over F then (F(a): F] is finite? (5) Can you prove that if...
Let fi and f2 be functions such that lim e s f1 (2) = + and such that the limit L2 = lim a s f2 (x) exists. Which one of the following is NOT correct? O limas (f1f2)(x) = 0 if L2 = 0. limas (fi + f2)(x) = too if L2 = -0. Olim as (f1f2) (x) = too if 0 <L2 5+co. lim a s (f1f2)(x) = - it L2 = -. Which one of the following...
Q 5. Let F be a field and consider the polynomial ring l (a) State the Division Algorithm for polynomials in Plrl. b) Let a e F. Prove that -a divides f(x) in Fix] if and only if (a)- (c) Prove that z-37 divides 42-1 in F43[z]. Q 5. Let F be a field and consider the polynomial ring l (a) State the Division Algorithm for polynomials in Plrl. b) Let a e F. Prove that -a divides f(x) in...
- Let F be a field. Prove: For all (o), 9(a), (x) € F2, if f(x) and (w) are relatively prime and (a)/(x), then (a) and f(a) are relatively prime.
Q.3 Determine the two forces Fi and F2 so that the particle F is in equilibrium. F, 40 20° F 60 1b tv. Q.3 Determine the two forces Fi and F2 so that the particle F is in equilibrium. F, 40 20° F 60 1b tv.
4. Let G be the Galois group of a finite field extension E of F. Let H and H, be subgroups of G, and let Ki and K2 be intermediate fields between F and E. For any o EG, prove that K2 = OK if and only if H2 = oHo-1,
2u-5 8. Let w be a root of f(x) = r +2r - 6 over the field Q. Consider z E Q(w). Find a, b, c, d e Q us + w-2 such that : a + bu + cu2 + du 9. Let E be an extension field of a field F. (1) What does it mean for an element z E E being algebraic over F? (2) What does it mean for an element z EF being transcendental...