Show that: There are continuum many pairwise disjoint subsets of R each similar to R.

Let A, B, and C be disjoint subsets of the sample space. For each one of...

Let A, B, and C be disjoint subsets of the sample space. For each one of the following statements, determine whether it is true or false. Note:"False" means "not guaranteed to be true." P(A) + P(Ac) + P(B) = P(A U Ac U B)

There is an uncountable ordered set which is similar to each of its uncountable subsets.

There is an uncountable ordered set which is similar to each of its uncountable subsets.

Show that an intersection of finitely many open subsets of X is open.

Show that an intersection of finitely many open subsets of X is open.

Show that the following collections τ of subsets of X form a topology in the given...

Show that the following collections τ of subsets of X form a topology in the given space. a) Let X = R with τ consisting of all subsets B of R such that R\B contains finitely many elements or is all of R. b) Let X = {a, b, c} and τ = {∅, {c}, {a, c}, {b, c}, {a, b, c}}.

Prove for each of the following: a. Exercise A union of finitely many or countably many...

Prove for each of the following: a. Exercise A union of finitely many or countably many countable sets is countable. (Hint: Similar) b. Theorem: (Cantor 1874, 1891) R is uncountable. c. Theorem: We write |R| = c the “continuum”. Then c = |P(N)| = 2א0 d. Prove the set I of irrational number is uncountable. (Hint: Contradiction.)

Let matrices A,B∈Mn×n(R). Show that if A and B are each similar to some diagonal matrix,...

Let matrices A,B∈Mn×n(R). Show that if A and B are each similar to some diagonal matrix, and also have the same eigenvectors (but not necessarily the same eigenvalues), then  AB=BA.

Show that the completion of the Borel σ-algebra gives the collection of Lebesgue measurable subsets of...

Show that the completion of the Borel σ-algebra gives the collection of Lebesgue measurable subsets of R (with respect to Lebesgue measure)

Show that each non-empty open interval in R contains uncountably many irrational numbers

Show that each non-empty open interval in R contains uncountably many irrational numbers

Let S and T be nonempty subsets of R with the following property: s ≤ t...

Let S and T be nonempty subsets of R with the following property: s ≤ t for all s ∈ S and t ∈ T. (a) Show that S is bounded above and T is bounded below. (b) Prove supS ≤ inf T . (c) Given an example of such sets S and T where S ∩ T is nonempty. (d) Give an example of sets S and T where supS = infT and S ∩T is the empty set....

For each of the following sets X and collections T of open subsets decide whether the...

For each of the following sets X and collections T of open subsets decide whether the pair X, T satisfies the axioms of a topological space. If it does, determine the connected components of X. If it is not a topological space then exhibit one axiom that fails. (a) X = {1, 2, 3, 4} and T = {∅, {1}, {1, 2}, {2, 3}, {1, 2, 3}, {1, 2, 3, 4}}. (b) X = {1, 2, 3, 4} and T...