Show that connected components of the space X form a partition of X.

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.

A topological space is totally disconnected if the connected components are all singletons. Prove that any...

A topological space is totally disconnected if the connected components are all singletons. Prove that any countable metric space is totally disconnected.

A, B and C are events that form a partition of sample space S. P(A)=0.45, and...

A, B and C are events that form a partition of sample space S. P(A)=0.45, and P(B)=0.30. D is another event. P(D|A)= 0.32. P(D|B)= 0.48, and P(D|C)= 0.64. Find these probabilities: Find P ( A u B u D )

Prove that if X is a connected Hausdorff space and X has more than one point,...

Prove that if X is a connected Hausdorff space and X has more than one point, then X is infinite. Please show all work and write clear I am stupid

Show by counterexample that a connected component of a topological space is not necessarily open.

Show by counterexample that a connected component of a topological space is not necessarily open.

1.- Prove the intermediate value theorem: let (X, τ) be a connected topological space, f: X...

1.- Prove the intermediate value theorem: let (X, τ) be a connected topological space, f: X - → Y a continuous transformation and x1, x2 ∈ X with a1 = f (x1), a2 = f (x2) ( a1 different a2). Then for all c∈ (a1, a2) there is x∈ such that f (x) = c. 2.- Let f: X - → Y be a continuous and suprajective transformation. Show that if X is connected, then Y too.

Prove that if a topological space X has the fixed point property, then X is connected

Prove that if a topological space X has the fixed point property, then X is connected

(a)Show that the digital line can be obtained as a quotient space that results from a...

(a)Show that the digital line can be obtained as a quotient space that results from a partition of R in the standard topology. (b) Show that the digital plane, introduced in Section 1.4, can be obtained as a quotient space that results from a partition of R2 in the standard topology.

(a) This exercise will give an example of a connected space which is not locally connected....

(a) This exercise will give an example of a connected space which is not locally connected. In the plane R2 , let X0 = [0, 1] × {0}, Y0 = {0} × [0, 1], and for each n ∈ N, let Yn = {1/n} × [0,1]. Let Y = X0 ∪ (S∞ n=0 Yn). as a subspace of R 2 with its usual topology. Prove that Y is connected but not locally connected. (Note that this example also shows that...

Let A1, . . . , An be a partition of the sample space Ω. Let...

Let A1, . . . , An be a partition of the sample space Ω. Let X be a random variable. What is the formula for E(X) in terms of the conditional expected values E(X|A1), . . . , E(X|An)? (b) Two coins are tossed. Then cards are drawn from a standard deck, with replacement, until the number of “face” cards drawn (a “face” card is a jack, queen, or king) equals the number of heads tossed. Let X =...