Prove that the set of all the roots of polynomials with rational coefficients must also be...

Use the fact that “countable union of disjoint countable sets is countable" to prove “the set...

Use the fact that “countable union of disjoint countable sets is countable" to prove “the set of all polynomials with rational coefficients must be countable.”

prove that the family of set of {x: x>a, a rational} or {x:x<a, a rational} forms...

prove that the family of set of {x: x>a, a rational} or {x:x<a, a rational} forms a subbasis of the standard topology on the real numbers. prove that the standard topology generated by this basis is countable.

For n in natural number, let A_n be the subset of all those real numbers that...

For n in natural number, let A_n be the subset of all those real numbers that are roots of some polynomial of degree n with rational coefficients. Prove: for every n in natural number, A_n is countable.

Show that the set of all rational numbers of the form n/5, where n is an...

Show that the set of all rational numbers of the form n/5, where n is an integer, is countable?

Show that the set of all rational numbers of the form n/5, where n is an...

Show that the set of all rational numbers of the form n/5, where n is an integer, is countable?

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].

Prove that the singleton set {0} is a vector subspace of the space P4(R) of all...

Prove that the singleton set {0} is a vector subspace of the space P4(R) of all polynomials of degree at most 3 with real coefficients.

Let P be the vector space of all polynomials in x with real coefficients. Does P...

Let P be the vector space of all polynomials in x with real coefficients. Does P have a basis? Prove your answer.

Write a proof that the set of linear functions f(x) = mx + b with rational...

Write a proof that the set of linear functions f(x) = mx + b with rational slope (m) and rational y-intercept (b) is countable. (Suggestion: establish a bijection with a certain cartesian product already known to be countable by earlier results)