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?

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

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

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.

Find the absolute extrema of the given function on the indicated closed and bounded set R....

Find the absolute extrema of the given function on the indicated closed and bounded set R. (Order your answers from smallest to largest x, then from smallest to largest y.) f(x, y) = x2 + y2 − 2y + 1  on  R = {(x, y)|x2 + y2 ≤ 81}

Find the absolute extrema of the given function on the indicated closed and bounded set R....

Find the absolute extrema of the given function on the indicated closed and bounded set R. (Order your answers from smallest to largest x, then from smallest to largest y.) f(x, y) = x3 − 9xy − y3  on  R = {(x, y): −4 ≤ x ≤ 4, −4 ≤ y ≤ 4}