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

is about metric spaces: Let X be a metric discret space show that a sequence x_n...

is about metric spaces: Let X be a metric discret space show that a sequence x_n in X converge to l in X iff x_n is constant exept for a finite number of points.

Suppose {xn} is a sequence of real numbers that converges to +infinity, and suppose that {bn}...

Suppose {xn} is a sequence of real numbers that converges to +infinity, and suppose that {bn} is a sequence of real numbers that converges. Prove that {xn+bn} converges to +infinity.

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...

Suppose d and d 0 are both metrics on X and that the metric spaces (X,...

Suppose d and d 0 are both metrics on X and that the metric spaces (X, d) and (X, d0 ) have the same open sets. Show, the sequence (an) from X converges in (X, d) if and only if it converges in (X, d0 ) and then to the same limit.

Prove: If x is a sequence of real numbers that converges to L, then any subsequence...

Prove: If x is a sequence of real numbers that converges to L, then any subsequence of x converges to L.

let Xn be a sequence in a metric space X . If Xn -> x in...

let Xn be a sequence in a metric space X . If Xn -> x in X iff every neighbourhood of x contains all but finitely many points of the terms of {Xn}

Suppose X is a normed linear space with a norm || · ||. Show X is...

Suppose X is a normed linear space with a norm || · ||. Show X is a metric space.

Suppose X and Y are connected subsets of metric space X, the X intersection Y is...

Suppose X and Y are connected subsets of metric space X, the X intersection Y is not empty. show Y union X is connected.

Show that if sequence (an) converges, then all the rearrangement of (an) converges, and converge to...

Show that if sequence (an) converges, then all the rearrangement of (an) converges, and converge to the same limit

Exercise 1. Suppose (a_n) is a sequence and f : N --> N is a bijection....

Exercise 1. Suppose (a_n) is a sequence and f : N --> N is a bijection. Let (b_n) be the sequence where b_n = a_f(n) for all n contained in N. Prove that if a_n converges to L, then b_n also converges to L.