Let S be a sample space and E and F be events associated with S. Suppose...

Let S be a sample space and E and F be events associated with S. Suppose...

Let S be a sample space and E and F be events associated with S. Suppose that Pr left parenthesis Upper E right parenthesis equals 0.6Pr(E)=0.6​, Pr left parenthesis Upper F right parenthesis equals 0.2Pr(F)=0.2 and Pr left parenthesis Upper E intersect Upper F right parenthesis equals 0.1Pr(E∩F)=0.1. Calculate the following probabilities. ​(a) Pr left parenthesis E|F right parenthesisPr(E|F) ​(b) Pr left parenthesis F|E right parenthesisPr(F|E) ​(c) Pr left parenthesis E| Upper F prime right parenthesisPrE|F′ ​(d) Pr left parenthesis...

Rework problem 5 from section 3.1 of your text, involving events E, F, and G in...

Rework problem 5 from section 3.1 of your text, involving events E, F, and G in a sample space S. Assume that Pr[E]=0.4, Pr[F]=0.45, Pr[G]=0.5, Pr[E∩F]=0.15, Pr[E∩G]=0.2, and Pr[F∩G]=0.25. Find the following probabilities: (1) Pr[E∪F]= equation editorEquation Editor (2) Pr[F′∩G]= equation editorEquation Editor (3) Pr[E′∩G′]= equation editorEquation Editor

Let E and F be two events within sample space S.  Given P(E) = .7 and P(F)...

Let E and F be two events within sample space S.  Given P(E) = .7 and P(F) = .4, are the events E and F mutually exclusive? Explain why or why not.

Let A, B and C be events in a sample space, S. Suppose that S =...

Let A, B and C be events in a sample space, S. Suppose that S = A ∪ B ∪ C, and that the following hold: A ∩ C = ∅, B ∩ C = ∅. Let P(A) = 0.3, P(B) = 0.5 and P(C) = 0.5. Find P(A ∩ B).

Let A, B be events of a sample space S with probabilities P(A) = 0.25, P(B)...

Let A, B be events of a sample space S with probabilities P(A) = 0.25, P(B) = 0.35 and P(A∪B) = 0.4. Calculate (i) P(A|B) ,(ii) P(B|A), (iii) P(A∩B), (iv) P(A|B).

Rework problem 6 from section 3.2 of your text, about events E and F in a...

Rework problem 6 from section 3.2 of your text, about events E and F in a sample space S, but assume that Pr[E]=0.45, Pr[F]=0.6, and Pr[E′∩F]=0.35. Compute the following conditional probabilities: (1) Pr[E|F]= (2) Pr[F|E]=

1) Let S = {H, T} be the sample space associated to the fair coin-flipping. Is...

1) Let S = {H, T} be the sample space associated to the fair coin-flipping. Is {H} independent from {T}? 2) Let S = {HH, HT, TH, T T} be the sample space associated to flipping fair coin twice. Consider two events A = {HH, HT} and B = {HT, T H}. Are they independent? 3) Suppose now we have a biased coin that will give us head with probability 2/3 and tail with probability 1/3. Let S = {HH,...

Let A and B be two events from the sample space S. Given P(A)=0.3, P(B)=0.4 and...

Let A and B be two events from the sample space S. Given P(A)=0.3, P(B)=0.4 and P(A or B)=0.6 Find: a) P(A and B) b) P(not A) c) P(not B) d) P(not(A and B)) e) P(not(A or B))

Rework problem 7 from section 3.1 of your text, involving events E, F, and G in...

Rework problem 7 from section 3.1 of your text, involving events E, F, and G in a sample space S. Assume that Pr[E]=0.6, Pr[F]=0.55, Pr[G]=0.5, Pr[E∪F]=0.8, Pr[E∪G]=0.8, and Pr[F∪G]=0.8. Find the following probabilities: (1) Pr[E′∪F]= equation editorEquation Editor (2) Pr[F′∩G]= equation editorEquation Editor (3) Pr[E∩G]= equation editorEquation Editor

Let A and B be two independent events in the sample space S. Which of the...

Let A and B be two independent events in the sample space S. Which of the following statements is/are true? Circle all that apply. [3 marks] (a) The events A and Bc are independent. (b) The events Ac and Bc are independent. (c) The events (A \ B) and (Ac \ Bc) are independent. (d) None of the above.