Show that if a topological space X has a countable sub-base, then X is second countable

Let X be a topological space and A a subset of X. Show that there exists...

Let X be a topological space and A a subset of X. Show that there exists in X a neighbourhood Ox of each point x ∈ A such that A∩Ox is closed in Ox, if and only if A is an intersection of a closed set with an open set.

Prove that if a topological space X has the fixed point property, then X is connected

Prove that if a topological space X has the fixed point property, then X is connected

Show that a norm on a vector space X is a sub linear functional on X.

Show that a norm on a vector space X is a sub linear functional on X.

A topological space is totally disconnected if the connected components are all singletons. Prove that any...

A topological space is totally disconnected if the connected components are all singletons. Prove that any countable metric space is totally disconnected.

If X is a topological space, and A ⊆ X, define the subspace topology on A...

If X is a topological space, and A ⊆ X, define the subspace topology on A inherited from X.

Let f be a continuous from a topological space X to the reals. Let a be...

Let f be a continuous from a topological space X to the reals. Let a be in the reals and let A = {x in X : f(x)=a} Show that A is closed inX.

Show by counterexample that a connected component of a topological space is not necessarily open.

Show by counterexample that a connected component of a topological space is not necessarily open.

Give an example of a topological space X that is Hausdorff, but not regular. Prove that...

Give an example of a topological space X that is Hausdorff, but not regular. Prove that the space X you chose is Hausdorff. Prove that the space X you chose is not regular.

Prove or provide a counterexample Let (X,T) be a topological space, and let A⊆X. Then A...

Prove or provide a counterexample Let (X,T) be a topological space, and let A⊆X. Then A is dense iff Ext(A) =∅.

Prove: A discrete metric space X is separable if and only if X is countable.

Prove: A discrete metric space X is separable if and only if X is countable.