In the ring R[x] of polynomials over R, is there any kind of analogous theorem to...

In the ring R[x] of polynomials with real coefficients, show that A = {f 2 R[x]...

In the ring R[x] of polynomials with real coefficients, show that A = {f 2 R[x] : f(0) = f(1) = 0} is an ideal.

Let R[x] be the set of all polynomials (in the variable x) with real coefficients. Show...

Let R[x] be the set of all polynomials (in the variable x) with real coefficients. Show that this is a ring under ordinary addition and multiplication of polynomials. What are the units of R[x] ? I need a legible, detailed explaination

Let Z[x] be the ring of polynomials with integer coefficients. Find U(Z[x]), the set of all...

Let Z[x] be the ring of polynomials with integer coefficients. Find U(Z[x]), the set of all units of Z[x].

View Z as a module over the ring R=Z[x,y] where x and y act by 0....

View Z as a module over the ring R=Z[x,y] where x and y act by 0. fond a free resolution of Z over R.

Let Z_2 [x] be the ring of all polynomials with coefficients in Z_2. List the elements...

Let Z_2 [x] be the ring of all polynomials with coefficients in Z_2. List the elements of the field Z_2 [x]/〈x^2+x+1〉, and make an addition and multiplication table for the field. For simplicity, denote the coset f(x)+〈x^2+x+1〉 by (f(x)) ̅.

Prove the division algorithm for R[x]. Where R[x] is the set of real polynomials.

Prove the division algorithm for R[x]. Where R[x] is the set of real polynomials.

Let I be an ideal of the ring R. Prove that the reduction map R[x] →...

Let I be an ideal of the ring R. Prove that the reduction map R[x] → (R/I)[x] is a ring homomorphism.

Let R be a ring. Show that R[x] is a finitely generated R[x]-module if and only...

Let R be a ring. Show that R[x] is a finitely generated R[x]-module if and only if R={0}. Show that Q is not a finitely generated Z-module.

Let R be a commutative ring with unity. Prove that the principal ideal generated by x...

Let R be a commutative ring with unity. Prove that the principal ideal generated by x in the polynomial ring R[x] is a prime ideal iff R is an integral domain.

Consider the ring R = Q[x]/<x^2>. (a) Is R an integral domain? Justify your answer. (b)...

Consider the ring R = Q[x]/<x^2>. (a) Is R an integral domain? Justify your answer. (b) IS [x+1] a unit in R? If it is, find its multiplicative inverse.