Prove that in R^n with the usual topology, if a set is closed and bounded then...

Prove that, as a subspace of R with its usual topology, Z has the discrete topology.

Prove that, as a subspace of R with its usual topology, Z has the discrete topology.

Prove that a closed set in the Zariski topology on K1 is either the empty set,...

Prove that a closed set in the Zariski topology on K1 is either the empty set, a finite collection of points, or K1 itself.

Prove the conjecture or provide a counterexample: Let U ∈ in the usual topology, and let...

Prove the conjecture or provide a counterexample: Let U ∈ in the usual topology, and let F be a finite set. Then (U−F) ∈ in the usual topology.

Prove Corollary 4.22: A set of real numbers E is closed and bounded if and only...

Prove Corollary 4.22: A set of real numbers E is closed and bounded if and only if every infinite subset of E has a point of accumulation that belongs to E. Use Theorem 4.21: [Bolzano-Weierstrass Property] A set of real numbers is closed and bounded if and only if every sequence of points chosen from the set has a subsequence that converges to a point that belongs to E. Must use Theorem 4.21 to prove Corollary 4.22 and there should...

Problem 1. Suppose E is a given set, and On, for n ∈ N, is the...

Problem 1. Suppose E is a given set, and On, for n ∈ N, is the set defined by On = {x ∈ Rd : d(x, E) < 1/n }. (a) Prove that On is open. (b) Prove that if E is compact, then m(E) = limn →∞ m(On). (c) Would the above be true for E closed and unbounded set? (d) Would the above be true for E open and bounded set?

topology: Provide an example of a fully bounded MS that is not compact. Provide an example...

topology: Provide an example of a fully bounded MS that is not compact. Provide an example of a complete MS that is not compact

prove that a compact set is closed using the Heine - Borel theorem

prove that a compact set is closed using the Heine - Borel theorem

Prove that The set P of all prime numbers is a closed subset of R but...

Prove that The set P of all prime numbers is a closed subset of R but not an open subset of R.

Suppose A is bounded and not compact. Prove that there is a function that is continuous...

Suppose A is bounded and not compact. Prove that there is a function that is continuous on A, but not uniformly continuous. Give an example of a set that is not compact, but every function continuous on that set is uniformly continuous.

Let the set N of natural numbers be endowed with the cofinite topology (in which a...

Let the set N of natural numbers be endowed with the cofinite topology (in which a set is open if and only if it is empty or its complement is finite). (a) Is N connected? Justify your answer. (b) Is N compact? Justify your answer. (c) Explain why the function f : N → N, n→ n ^3 is continuous. (d) Exhibit a function g : N → N which is not continuous.