Let α be a complex number with α^2 = √3 − √5. Prove that Q(α)/Q is...

Let α = 4√ 3 (∈ R), and consider the homomorphism ψα : Q[x] → R...

Let α = 4√ 3 (∈ R), and consider the homomorphism ψα : Q[x] → R f(x) → f(α). (a) Prove that irr(α, Q) = x^4 −3 (b) Prove that Ker(ψα) = <x^4 −3> (c) By applying the Fundamental Homomorphism Theorem to ψα, prove that L ={a0+a1α+a2α2+a3α3 | a0, a1, a2, a3 ∈ Q }is the smallest subfield of R containing α.

Let G be a graph or order n with independence number α(G) = 2. (a) Prove...

Let G be a graph or order n with independence number α(G) = 2. (a) Prove that if G is disconnected, then G contains K⌈ n/2 ⌉ as a subgraph. (b) Prove that if G is connected, then G contains a path (u, v, w) such that uw /∈ E(G) and every vertex in G − {u, v, w} is adjacent to either u or w (or both).

Let w be a non-real complex number. Show that every complex number z can be written...

Let w be a non-real complex number. Show that every complex number z can be written in the form ? = ? + ?? (?, ? ∈ ?) Furthermore, prove that a and b are uniquely determined by w and z.

3. Assume √2 ∈R. Let S = { rational numbers q : q < √2 }....

3. Assume √2 ∈R. Let S = { rational numbers q : q < √2 }. (a)(i) Show that S is nonempty. (ii) Prove that S is bounded from above, but is not bounded from below. (b) Prove that supS = √2.

) Let α be a fixed positive real number, α > 0. For a sequence {xn},...

) Let α be a fixed positive real number, α > 0. For a sequence {xn}, let x1 > √ α, and define x2, x3, x4, · · · by the following recurrence relation xn+1 = 1 2 xn + α xn (a) Prove that {xn} decreases monotonically (in other words, xn+1 − xn ≤ 0 for all n). (b) Prove that {xn} is bounded from below. (Hint: use proof by induction to show xn > √ α for all...

For a formula α ∈ WFF we let l(α) denote the number of symbols in α...

For a formula α ∈ WFF we let l(α) denote the number of symbols in α that are left brackets ‘(’, let d(α) the number of variable symbols, and m(α) the number of symbols that are the corner symbol ‘¬’. For example in ((p1 → p2) ∧ ((¬p1) → p2)) we have l(α) = 4, d(α) = 4 and m(α) = 1. Prove by induction that he following property holds for all well formed formulas: l(α) = d(α) + m(α)...

Let p be an odd prime. Let f(x) ∈ Q(x) be an irreducible polynomial of degree...

Let p be an odd prime. Let f(x) ∈ Q(x) be an irreducible polynomial of degree p whose Galois group is the dihedral group D_2p of a regular p-gon. Prove that f (x) has either all real roots or precisely one real root.

Problem 2: (i) Let a be an integer. Prove that 2|a if and only if 2|a3....

Problem 2: (i) Let a be an integer. Prove that 2|a if and only if 2|a3. (ii) Prove that 3√2 (cube root) is irrational. Problem 3: Let p and q be prime numbers. (i) Prove by contradiction that if p+q is prime, then p = 2 or q = 2 (ii) Prove using the method of subsection 2.2.3 in our book that if p+q is prime, then p = 2 or q = 2 Proposition 2.2.3. For all n ∈...

Structural Induction on WFF For a formula α ∈ WFF we let `(α) denote the number...

Structural Induction on WFF For a formula α ∈ WFF we let `(α) denote the number of symbols in α that are left brackets ‘(’, let v(α) the number of variable symbols, and c(α) the number of symbols that are the corner symbol ‘¬’. For example in ((p1 → p2) ∧ ((¬p1) → p2)) we have l(α) = 4, v(α) = 4 and c(α) = 1. Prove by induction that he following property holds for all well formed formulas: •...

Let E/F be a finite Galois extension such that Gal(E/F) is abelian. Prove that for every...

Let E/F be a finite Galois extension such that Gal(E/F) is abelian. Prove that for every intermediate field K, the extension K/F is Galois.