suppose X ,Y are T2 spaces ...prove that X x Y are t2 spaces

Please prove the following theorem: Suppose (X,p) and (Y,b) are metric spaces, X is compact, and...

Please prove the following theorem: Suppose (X,p) and (Y,b) are metric spaces, X is compact, and f:X→Y is continuous. Then f is uniformly continuous.

If X and Y are discrete topological spaces, how do I prove X x Y is...

If X and Y are discrete topological spaces, how do I prove X x Y is also discrete? How would I prove the converse is true, could I ? Very interested. Please explain. Like to please break down into steps that would make sense. Not sure if I have to use facts of product topology and discrete topology and how to use them.

If X, Y are topological spaces and f : X → Y we call the graph...

If X, Y are topological spaces and f : X → Y we call the graph of f the set Γf = {(x, f(x)); x ∈ X} which is a subset of X × Y. If X and Y are metric spaces and f is a continuous function prove that the graph of f is a closed set.

Suppose that f : X  → Y and g: X  → Y are continuous maps between topological spaces...

Suppose that f : X  → Y and g: X  → Y are continuous maps between topological spaces and that Y is Hausdorff. Show that the set A = {x ∈ X : f(x) = g(x)} is closed in X.

Let (X, dX) and (Y, dY ) be metric spaces and let f : X →...

Let (X, dX) and (Y, dY ) be metric spaces and let f : X → Y be a continuous bijection. Prove that if (X, dX) is compact, then f is a homeomorphism

Solve the linear system x' - 4x + y" = t2 x' + x + y'...

Solve the linear system x' - 4x + y" = t2 x' + x + y' = 0

Let X, Y be metric spaces, with Y complete. Let S ⊂ X and let f...

Let X, Y be metric spaces, with Y complete. Let S ⊂ X and let f : S → Y be uniformly continuous. (a) Suppose p ∈ S closure and (pn) is a sequence in S with pn → p. Show that (f(pn)) converges in y to some point yp.

Suppose f(x,y) is a function for which ∇f(15,2) = <6, -3>. Suppose g(t) = f(t2-1, sqrt(t))....

Suppose f(x,y) is a function for which ∇f(15,2) = <6, -3>. Suppose g(t) = f(t2-1, sqrt(t)). Find g'(4).

Assume that (X, dX) and (Y, dY ) are complete spaces, and give X × Y...

Assume that (X, dX) and (Y, dY ) are complete spaces, and give X × Y the metric d defined by d((x1, y1),(x2, y2)) = dX(x1, x2) + dY (y1, y2) Show that (X × Y, d) is complete.

Suppose X,Y are discrete random variables, each taking only two distinct values. Prove that if E(XY)=E(X)E(Y)...

Suppose X,Y are discrete random variables, each taking only two distinct values. Prove that if E(XY)=E(X)E(Y) then X,Y are independent (Be aware that you have to prove E(XY) =E(X)E(Y) -> X,Y independent and NOT the converse)