find jacobson radical of polynomials and prove every finite divison ring is field

Find the electric field inside and outside a charged conducting ring of radius a *using legendre...

Find the electric field inside and outside a charged conducting ring of radius a *using legendre polynomials

Prove that every field is an integral domain. Give an example of an integral domain that...

Prove that every field is an integral domain. Give an example of an integral domain that is not a field. Give an example of a ring that is not an integral domain.

Prove that the ring of integers of Q (a number field) is Z

Prove that the ring of integers of Q (a number field) is Z

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.

(Sage Exploration) In class, we primarily have worked with the field Q and its finite extensions....

(Sage Exploration) In class, we primarily have worked with the field Q and its finite extensions. For each p ∈ Z primes, we can also study the field Z/pZ , which I will also denote Fp, and its finite extensions. Sage understands this field as GF(p). (a) Define the polynomial ring S = F2[x]. (b) Find all degree 2 irreducible polynomials. How many are there? For each, completely describe the corresponding quadratic field extensions of F2. (c) True of false:...

Prove that if E is a finite field with characteristic p, then the number of elements...

Prove that if E is a finite field with characteristic p, then the number of elements in E equals p^n, for some positive integer n.

Prove that if ? is a finite dimensional vector space over C, then every ? ∈...

Prove that if ? is a finite dimensional vector space over C, then every ? ∈ ℒ(? ) has an eigenvalue. (note: haven't learned the Fundamental Theorem of Algebra yet)

Prove that if F is a field and K = FG for a finite group G...

Prove that if F is a field and K = FG for a finite group G of automorphisms of F, then there are only finitely many subfields between F and K. Please help!

(Modern Algebra) Show that every finite subgroup of the multiplicative group of a field is cyclical....

(Modern Algebra) Show that every finite subgroup of the multiplicative group of a field is cyclical. (Hint: consider m as the order of the finite subgroup and analyze the roots of the polynomial (x ^ m) - 1 in field F)

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].