{0,1} is closed but not open. Prove that it is closed and that it is not...

a) Prove that (0,1)~(0,1] b) Prove that (0,1)~[0,1]

a) Prove that (0,1)~(0,1] b) Prove that (0,1)~[0,1]

coding theory problem prove that there is no largest rational number in the open interval (0,1)

coding theory problem prove that there is no largest rational number in the open interval (0,1)

Prove the following in the plane. a.) The complement of a closed set is open. b.)...

Prove the following in the plane. a.) The complement of a closed set is open. b.) The complement of an open set is closed.

To prove that no two of the intervals [0,1], (0,1), and [0,1) are homeomorphic, prove each...

To prove that no two of the intervals [0,1], (0,1), and [0,1) are homeomorphic, prove each of the following: [0, 1) and (0, 1) are not homeomorphic.

To prove that no two of the intervals [0,1], (0,1), and [0,1) are homeomorphic, prove each...

To prove that no two of the intervals [0,1], (0,1), and [0,1) are homeomorphic, prove each of the following: [0, 1] and [0, 1) are not homeomorphic

Prove the following for the plane. a.) The intersection of two closed sets is closed. b.)...

Prove the following for the plane. a.) The intersection of two closed sets is closed. b.) The intersection of two open sets is open.

Prove that |R^2| = |R| by showing |(0,1) x (0,1)| = |(0,1)| through cardinality.

Prove that |R^2| = |R| by showing |(0,1) x (0,1)| = |(0,1)| through cardinality.

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.

Consider the function ?:[0,1] → ℝ defined by ?(?) = 0 if ? ∈ [0,1] ∖...

Consider the function ?:[0,1] → ℝ defined by ?(?) = 0 if ? ∈ [0,1] ∖ ℚ and ?(?) = 1/? if ? = ?/? in lowest terms 1. Prove that ? is discontinuous at every ? ∈ ℚ ∩ [0,1]. 2. Prove that ? is continuous at every ? ∈ [0,1] ∖ ℚ

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).