Show that an intersection of finitely many open subsets of X is open.

PROVE THE UNION OF FINITELY MANY CLOSED SUBSETS OF R1 IS CLOSED. * PLEASE Include a...

PROVE THE UNION OF FINITELY MANY CLOSED SUBSETS OF R1 IS CLOSED. * PLEASE Include a thorough and complete explanation/ proof. (include "...by definition of..." etc.)

Show that the following collections τ of subsets of X form a topology in the given...

Show that the following collections τ of subsets of X form a topology in the given space. a) Let X = R with τ consisting of all subsets B of R such that R\B contains finitely many elements or is all of R. b) Let X = {a, b, c} and τ = {∅, {c}, {a, c}, {b, c}, {a, b, c}}.

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.

If A and B are closed subsets of a metric space X, whose union and intersection...

If A and B are closed subsets of a metric space X, whose union and intersection are connected, show that A and B themselves are connected. Give an example showing that the assumption of closedness is essential.

Let R be a ring. Show that R[x] is a finitely generated R[x]-module if and only...

Let R be a ring. Show that R[x] is a finitely generated R[x]-module if and only if R={0}. Show that Q is not a finitely generated Z-module.

Show (prove) that the set of sequences of 0s and 1s with only finitely many nonzero...

Show (prove) that the set of sequences of 0s and 1s with only finitely many nonzero terms should be countable. Will rate a thumbs up. Thank you.

Let S be a collection of subsets of [n] such that any two subsets in S...

Let S be a collection of subsets of [n] such that any two subsets in S have a non-empty intersection. Show that |S| ≤ 2^(n−1).

Show that: There are continuum many pairwise disjoint subsets of R each similar to R.

Show that: There are continuum many pairwise disjoint subsets of R each similar to R.

Show that the intersection of a family of topologies of X is a topology for X.

Show that the intersection of a family of topologies of X is a topology for X.

Let X be a set and let (An)n∈N be a sequence of subsets of X. Show...

Let X be a set and let (An)n∈N be a sequence of subsets of X. Show that: (a) If (An)n∈N is increasing, then liminf An = limsupAn =S∞ n=1 An. (b) If (An)n∈N is decreasing, then liminf An = limsupAn =T∞ n=1 An.