why is every countable subset a zero set? real analysis

[Q] Prove or disprove: a)every subset of an uncountable set is countable. b)every subset of a...

[Q] Prove or disprove: a)every subset of an uncountable set is countable. b)every subset of a countable set is countable. c)every superset of a countable set is countable.

true or false? every uncountable set has a countable subset. explain

true or false? every uncountable set has a countable subset. explain

Verify: any countable ordered set is similar to a subset of Q intersect (0,1).

Verify: any countable ordered set is similar to a subset of Q intersect (0,1).

Give an example or show that no such example exists! * A countable set of real...

Give an example or show that no such example exists! * A countable set of real numbers that does not have measure zero.

Must every linearly dependent set have a subset that is dependent and a subset that is...

Must every linearly dependent set have a subset that is dependent and a subset that is independent?

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.

prove A set of outer measure zero is mearsurable and had measure zero(from definition) real analysis...

prove A set of outer measure zero is mearsurable and had measure zero(from definition) real analysis by Royden

if A subset B is open then A is the countable union of bounded open intervals

if A subset B is open then A is the countable union of bounded open intervals

Give an counter example or explain why those are false a) every linearly independent subset of...

Give an counter example or explain why those are false a) every linearly independent subset of a vector space V is a basis for V b) If S is a finite set of vectors of a vector space V and v ⊄span{S}, then S U{v} is linearly independent c) Given two sets of vectors S1 and S2, if span(S1) =Span(S2), then S1=S2 d) Every linearly dependent set contains the zero vector

Is empty set a proper subset of a non-empty set? Why or why not?

Is empty set a proper subset of a non-empty set? Why or why not?