For the following event probabilities: P(A)=0.4020, P(B)=0.2480, P(C)=0.3530, P(AnB)=0.0420, P(AnC)=0.0350, P(BnC)=0.1350, P(AnBnC)=0.0120, P(AuB)=0.6080, P(AuC)=0.7200, P(BuC)=0.4660, P(AuBuC)=0.8030,...

For the following event probabilities: P(A)=0.9330, P(B)=0.9890, P(C)=0.4830, P(AnB)=0.9330, P(AnC)=0.4640, P(BnC)=0.4720, P(AnBnC)=0.4640, P(AuB)=0.9890, P(AuC)=0.9520, P(BuC)=1.0000, P(A|B)=0.9434,...

For the following event probabilities: P(A)=0.9330, P(B)=0.9890, P(C)=0.4830, P(AnB)=0.9330, P(AnC)=0.4640, P(BnC)=0.4720, P(AnBnC)=0.4640, P(AuB)=0.9890, P(AuC)=0.9520, P(BuC)=1.0000, P(A|B)=0.9434, P(A|C)=0.9607, P(B|C)=0.9772, find P(AuBuC).

suppose events A and B are such that p(A)=0.25,P(B) =0.3 and P(B|A)= 0.5 i) compute P(AnB)...

suppose events A and B are such that p(A)=0.25,P(B) =0.3 and P(B|A)= 0.5 i) compute P(AnB) and P(AuB) ii) Are events A and B independent? iii) Are events A and B mutually exclusive? b)if P(A)=0.6, P(B)= 0.15 and P(B|A')=0.25, find the following probabilities I)P(B|A), P(A|B),P(AuB)

1) P(A)=0.65, P(B)=0.37 and P(AUB)=0.65 a) Find P(A∩B). b) Find P(B|A). c) Are A and B...

1) P(A)=0.65, P(B)=0.37 and P(AUB)=0.65 a) Find P(A∩B). b) Find P(B|A). c) Are A and B independent, mutually exclusive, or dependent but not mutually exclusive?

There are 4 probabilities of an event occurring: P(A) = 0.5, P(B)= 0.1, P(C) = 0.3...

There are 4 probabilities of an event occurring: P(A) = 0.5, P(B)= 0.1, P(C) = 0.3 and P(D) = 0.1. Given A, P(T) = 0.3, given B, P(T) = 0.8, given C, P(T) = 0.2, and given D, P(T) =0.5. If event T occurs, what is the probability that event A or C happened?

Suppose events A, B, C have the following probabilities: P(A|B) = 1 ／3 , P(C|B) =...

Suppose events A, B, C have the following probabilities: P(A|B) = 1 ／3 , P(C|B) = 23 ／45 , P(A ∩ C|B) = 11 ／45 . Given that B has occurred, a) Find the probability that only C has occurred. b) Find the probability that only A or only C has occurred, but not both. c) Find the probability that A or C has occurred.

Find the following probabilities: a. P (z > 1.96) b. P (z > .96) c. P...

Find the following probabilities: a. P (z > 1.96) b. P (z > .96) c. P (z > 3.00) d. P (z < 1.96) e. P (z < .49)

events a,b, and c occur with respective probabilities 0.48, 0.46, and 0.24. event b is independent...

events a,b, and c occur with respective probabilities 0.48, 0.46, and 0.24. event b is independent of the events a and c. event b is also independent of the joint occurrence of a and c. if the probability of the event a∩c is 0.19, compute the probability of the event a ∪c U b.

Does P(A∩B|C)=P(A|C)P(B|C) imply that A and B are independent? Assume P(C)>0, so that the conditional probabilities...

Does P(A∩B|C)=P(A|C)P(B|C) imply that A and B are independent? Assume P(C)>0, so that the conditional probabilities are defined. - yes - no Please explain the answer

Consider the following probabilities: P(Ac) = 0.63, P(B) = 0.52, and P(A ∩ Bc) = 0.13....

Consider the following probabilities: P(Ac) = 0.63, P(B) = 0.52, and P(A ∩ Bc) = 0.13. a. Find P(A | Bc). (Do not round intermediate calculations. Round your answer to 2 decimal places.) P(A | Bc) _______ b. Find P(Bc | A). (Do not round intermediate calculations. Round your answer to 3 decimal places.) P(Bc | A) _______    c. Are A and B independent events? A. Yes because P(A | Bc) = P(A). B. Yes because P(A ∩ Bc)...

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 )