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

Let f be a continuous function on the real line. Suppose f is uniformly continuous on...

Let f be a continuous function on the real line. Suppose f is uniformly continuous on the set of all rationals. Prove that f is uniformly continuous on the real line.

Let (X, d) be a compact metric space and let A ⊆ X. Suppose that A...

Let (X, d) be a compact metric space and let A ⊆ X. Suppose that A is not compact. Prove that there exists a continuous function f : A → R, from (A, d) to (R, d|·|), which is not uniformly continuous.

Please prove the following theorem: Suppose (X,p) and (Y,b) are metric spaces, X is compact, and...

Please prove the following theorem: Suppose (X,p) and (Y,b) are metric spaces, X is compact, and f:X→Y is continuous. Then f is uniformly continuous.

show that if f is a bounded increasing continuous function on (a,b), then f is uniformly...

show that if f is a bounded increasing continuous function on (a,b), then f is uniformly continuous. Hint: Extend the function to [a,b].

let F : R to R be a continuous function a) prove that the set {x...

let F : R to R be a continuous function a) prove that the set {x in R:, f(x)>4} is open b) prove the set {f(x), 1<x<=5} is connected c) give an example of a function F that {x in r, f(x)>4} is disconnected

Prove that a continuous real-valued function on a compact metric space assumes its maximum value. I...

Prove that a continuous real-valued function on a compact metric space assumes its maximum value. I want to show this. Pleas explain step by step

We know that any continuous function f : [a, b] → R is uniformly continuous on...

We know that any continuous function f : [a, b] → R is uniformly continuous on the finite closed interval [a, b]. (i) What is the definition of f being uniformly continuous on its domain? (This definition is meaningful for functions f : J → R defined on any interval J ⊂ R.) (ii) Given a differentiable function f : R → R, prove that if the derivative f ′ is a bounded function on R, then f is uniformly...

A function f : A −→ R is uniformly continuous and its domain A ⊂ R...

A function f : A −→ R is uniformly continuous and its domain A ⊂ R is bounded. Prove that f is a bounded function. Can this conclusion hold if we replace the "uniform continuity" by just "continuity"?

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

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

Prove that the function f(x) = x2 is uniformly continuous on the interval (0,1).

Prove that the function f(x) = x2 is uniformly continuous on the interval (0,1).