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...

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

Prove that the set of real numbers of the form e^n,n= 0,=+-1,+-2,... is countable.

Prove that the set of real numbers of the form e^n,n= 0,=+-1,+-2,... is countable.

Consider numbers of the form a + b*sqrt(c), where a,b, and c are all rational numbers....

Consider numbers of the form a + b*sqrt(c), where a,b, and c are all rational numbers. express sqrt(a + b*sqrt(c)) in the same form, (i.e. as d + e*sqrt(c)). For which values of c can this be done?

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

Prove that the set of all the roots of polynomials with rational coefficients must also be countable. (Note: this set is known as the set of Algebraic numbers.)

1. A) Show that the set of all m by n matrices of integers is countable...

1. A) Show that the set of all m by n matrices of integers is countable where m,n ≥ 1 are some fixed positive integers.

Show by induction that 1+3+5+...+(2n-1) = n^2 for all n in the set of Natural Numbers

Show by induction that 1+3+5+...+(2n-1) = n^2 for all n in the set of Natural Numbers

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.

Give a sequence of rational numbers that converges to √5 (i.e. converges to L where L^2=5)....

Give a sequence of rational numbers that converges to √5 (i.e. converges to L where L^2=5). No proof needed.

Let p and q be irrational numbers. Is p−q rational or irrational? Show all proof.

Let p and q be irrational numbers. Is p−q rational or irrational? Show all proof.