Prove the following: The intersection of two open sets is compact if and only if it...

Prove that the union of two compact sets is compact using the fact that every open...

Prove that the union of two compact sets is compact using the fact that every open cover has a finite subcover.

Prove the following for the plane. a.) The intersection of two closed sets is closed. b.)...

Prove the following for the plane. a.) The intersection of two closed sets is closed. b.) The intersection of two open sets is open.

Prove whether or not the intersection and union of two uncountable sets must be uncountable

Prove whether or not the intersection and union of two uncountable sets must be uncountable

Prove: Two lines can have only one point of intersection.

Prove: Two lines can have only one point of intersection.

a) Prove that the union between two countably infinite sets is a countably infinite set. b)...

a) Prove that the union between two countably infinite sets is a countably infinite set. b) Would the statement above hold if we instead started with an infinite amount of countably infinite sets? _________________________________________________ Thank you in advance!

Given two sets A and B, the intersection of these sets, denoted A ∩ B, is...

Given two sets A and B, the intersection of these sets, denoted A ∩ B, is the set containing the elements that are in both A and B. That is, A ∩ B = {x : x ∈ A and x ∈ B}. Two sets A and B are disjoint if they have no elements in common. That is, if A ∩ B = ∅. Given two sets A and B, the union of these sets, denoted A ∪ B,...

Prove the union of two infinite countable sets is countable.

Prove the union of two infinite countable sets is countable.

Let A be a non-empty set and f: A ? A be a function. (a) Prove...

Let A be a non-empty set and f: A ? A be a function. (a) Prove that, if f is injective but not surjective (which means that the set A is infinite), then f has at least two different left inverses.

(a) If G is an open set and K is a compact set with K ⊆...

(a) If G is an open set and K is a compact set with K ⊆ G, show that there exists a δ > 0 such that {x|dist(x, K) < δ} ⊆ G. (b) Find an example of an open subset G in a metric space X and a closed, non compact subset F of G such that there is no δ > 0 with {x|dist(x, F) < δ} ⊆ G

Heine-Borel Theorem. a. State the Heine-Borel Theorem b. Assume A ⊆ R and B ⊆ R...

Heine-Borel Theorem. a. State the Heine-Borel Theorem b. Assume A ⊆ R and B ⊆ R . Prove using only the definition of an open set that if A and B are open sets then A∩ B is an open set. c. Assume C ⊆ R and D ⊆ R . Prove that if C and D are compact then C ∪ D is compact. There are two methods: Using the definition of compact or a proof that uses parts...