show that x^4 + x + 1 is not irreducible in R[x] even though it has...

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 R = R[x], f ∈ R \ {0}, and I = (f). Show that R/I...

Let R = R[x], f ∈ R \ {0}, and I = (f). Show that R/I is an integral domain if and only if f is an irreducible polynomial.

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.

Show the polynomial x4 − x3 − 2x2 + 6x − 4 is irreducible over Q.

Show the polynomial x4 − x3 − 2x2 + 6x − 4 is irreducible over Q.

(3)If H(x, y) = x^2 y^4 + x^4 y^2 + 3x^2 y^2 + 1, show that...

(3)If H(x, y) = x^2 y^4 + x^4 y^2 + 3x^2 y^2 + 1, show that H(x, y) ≥ 0 for all (x, y). Hint: find the minimum value of H. (4) Let f(x, y) = (y − x^2 ) (y − 2x^2 ). Show that the origin is a critical point for f which is a saddle point, even though on any line through the origin, f has a local minimum at (0, 0)

3. (50) Let f(x) = x^4 + 2. Find a factorization of f(x) into irreducible polynomials...

3. (50) Let f(x) = x^4 + 2. Find a factorization of f(x) into irreducible polynomials in each of the following rings, justifying your answers briefly: (i) Z3 [x]; (ii) Q[x] (this can be done easily using an appropriate theorem); (iii) R[x] (hints: you may find it helpful to write γ = 2^(1/4), the positive real fourth root of 2, and to consider factors of the form x^2 + a*x + 2^(1/2); (iv) C[x] (you may leave your answer in...

Let f(x) be a cubic polynomial of the form x^3 +ax^2 +bx+c with real coefficients. 1....

Let f(x) be a cubic polynomial of the form x^3 +ax^2 +bx+c with real coefficients. 1. Deduce that either f(x) factors in R[x] as the product of three degree-one polynomials, or f(x) factors in R[x] as the product of a degree-one polynomial and an irreducible degree-two polynomial. 2.Deduce that either f(x) has three real roots (counting multiplicities) or f(x) has one real root and two non-real (complex) roots that are complex conjugates of each other.

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...

Let x^4 + px^2 + qx + r = 0 be a given quartic with roots...

Let x^4 + px^2 + qx + r = 0 be a given quartic with roots α1,...,α4. Show that α1 + α2 + α3 + α4 = 0 and that α1 · α2 · α3 · α4 = r. Observe that this implies that if we know any three of the roots, we can deduce what the remaining root is. Define the following three quantities defined in terms of the roots αi: s1 = (α1 −α2 + α3 −α4)/2, s2...

Find a polynomial in R[x] of minimum degree which has roots 3, i+1 and -3i.

Find a polynomial in R[x] of minimum degree which has roots 3, i+1 and -3i.