assume field F(2^3). irreducible polynomial is: x^3 + x + 1. generator for field is g...

True or False, explain: 1. Any polynomial f in Q[x] with deg(f)=3 and no roots in...

True or False, explain: 1. Any polynomial f in Q[x] with deg(f)=3 and no roots in Q is irreducible. 2. Any polynomial f in Q[x] with deg(f)-4 and no roots in Q is irreducible. 3. Zx40 is isomorphic to Zx5 x Zx8 4. If G is a finite group and H<G, then [G:H] = |G||H| 5. If [G:H]=2, then H is normal in G. 6. If G is a finite group and G<S28, then there is a subgroup of G...

Let p(x) be an irreducible polynomial of degree n over a finite field K. Show that...

Let p(x) be an irreducible polynomial of degree n over a finite field K. Show that its Galois group over K is cyclic of order n and then show how the Galois group of x3 − 1 over Q is cyclic of order 2.

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.

Is f(x)=x^5+√6 x^4+2x^2-(3/2)x irreducible in R[x], why or why not? Is g(x)=x^3+x+1 irreducible in Z5[x] why...

Is f(x)=x^5+√6 x^4+2x^2-(3/2)x irreducible in R[x], why or why not? Is g(x)=x^3+x+1 irreducible in Z5[x] why or why not?

Let a1, a2, ..., an be distinct n (≥ 2) integers. Consider the polynomial f(x) =...

Let a1, a2, ..., an be distinct n (≥ 2) integers. Consider the polynomial f(x) = (x−a1)(x−a2)···(x−an)−1 in Q[x] (1) Prove that if then f(x) = g(x)h(x) for some g(x), h(x) ∈ Z[x], g(ai) + h(ai) = 0 for all i = 1, 2, ..., n (2) Prove that f(x) is irreducible over Q

Q7) Factorise the polynomial f(x) = x3 − 2x2 + 2x − 1 into irreducible polynomials...

Q7) Factorise the polynomial f(x) = x3 − 2x2 + 2x − 1 into irreducible polynomials in Z5[x], i.e. represent f(x) as a product of irreducible polynomials in Z5[x]. Demonstrate that the polynomials you obtained are irreducible. I think i manged to factorise this polynomial. I found a factor to be 1 so i divided the polynomial by (x-1) as its a linear factor. So i get the form (x3 − 2x2 + 2x − 1) = (x2-x+1)*(x-1) which is...

Abstract Algebra: Prove that the polynomial f(X) = X4 + X + 1 is irreducible on...

Abstract Algebra: Prove that the polynomial f(X) = X4 + X + 1 is irreducible on F7[X].

Given x^5 + x^2 + 1 is irreducible over F2, let F32 = F2[X]/(X^5 + X^2...

Given x^5 + x^2 + 1 is irreducible over F2, let F32 = F2[X]/(X^5 + X^2 + 1) with f = [X]. Please represent any element g where g = a4*f^4 + a3*f^3 + a2*f^2 + a1*f + a0 1. If g1 = f^4 + f^2 and g2 = f^2 + f + 1, compute g1*g2 2. Compute f^11 3. Is the polynomial x5 + x2 + 1 primitive? Please explain your answer

Determine whether or not x^2+x+1 is irreducible or not over the following fields. If the polynomial...

Determine whether or not x^2+x+1 is irreducible or not over the following fields. If the polynomial is reducible, factor it. a. Z2 b. Z3 c. Z5 d. Z7

Consider the polynomial f(x) = x ^4 + x ^3 + x ^2 + x +...

Consider the polynomial f(x) = x ^4 + x ^3 + x ^2 + x + 1 with roots in GF(256). Let b be a root of f(x), i.e., f(b) = 0. The other roots are b^ 2 , b^4 , b^8 . e) Write b 4 as a combination of smaller powers of b. Prove that b 5 = 1. f) Given that b 5 = 1 and the factorization of 255, determine r such that b = α...