If p is a limit point of a set A is a first countable space X,...

Let A be a set and x a number. Show that x is a limit-point of...

Let A be a set and x a number. Show that x is a limit-point of A if and only if there exists a sequence x1 , x2 , . . . of distinct points in A that converges to x.

TOPOLOGY Prove that a subspace of a first countable space is first countable and that countable...

TOPOLOGY Prove that a subspace of a first countable space is first countable and that countable product (product topology) of first countable spaces is first countable.

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

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

Let (X,d) be a metric space which contains an infinite countable set Ewith the property x,y...

Let (X,d) be a metric space which contains an infinite countable set Ewith the property x,y ∈ E ⇒ d(x,y) = 1. (a) Show E is a closed and bounded subset of X. (b) Show E is not compact. (c) Explain why E cannot be a subset of Rn for any n.

Find the point-wise limit and find out if the sequence converges uniformly on [0,1] to its...

Find the point-wise limit and find out if the sequence converges uniformly on [0,1] to its point-wise limit 1) (X^n)/(n) 2) (X^n)/(1-X^n)

Suppose K is a nonempty compact subset of a metric space X and x∈X. Show, there...

Suppose K is a nonempty compact subset of a metric space X and x∈X. Show, there is a nearest point p∈K to x; that is, there is a point p∈K such that, for all other q∈K, d(p,x)≤d(q,x). [Suggestion: As a start, let S={d(x,y):y∈K} and show there is a sequence (qn) from K such that the numerical sequence (d(x,qn)) converges to inf(S).] Let X=R^2 and T={(x,y):x^2+y^2=1}. Show, there is a point z∈X and distinct points a,b∈T that are nearest points to...

Prove that if a sequence converges to a limit x then very subsequence converges to x.

Prove that if a sequence converges to a limit x then very subsequence converges to x.

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.

Suppose (an), a sequence in a metric space X, converges to L ∈ X. Show, if...

Suppose (an), a sequence in a metric space X, converges to L ∈ X. Show, if σ : N → N is one-one, then the sequence (bn = aσ(n))n also converges to L.

A sample space is discrete if it consists of a finite or countable infinite set of...

A sample space is discrete if it consists of a finite or countable infinite set of outcomes. Consider the number of work operations at a site the sample space. If the site has 3 departments and each department has 5 separate work operations, how many work operations are in the sample space? If the departments are assembly, packaging, and distribution. How many outcomes are in the event assembly (that is within the entire sample space)? Consider the same example, and...