Provide an example of a probability space and three events A, B, C such that P(A∪B∪C)=P(A)+P(B)+P(C)−1/2.

Consider two events, A and B, of a sample space such that P(A) = P(B) =...

Consider two events, A and B, of a sample space such that P(A) = P(B) = 0.7 a).Is it possible that the events A and B are mutually exclusive? Explain. b).If the events A and B are independent, find the probability that the two events occur together. c).If A and B are independent, find the probability that at least one of the two events will occur. d).Suppose P(B|A) = 0.5, in this case are A and B independent or dependent?...

Problem 1) Let A, B and C be events from a common sample space such that:...

Problem 1) Let A, B and C be events from a common sample space such that: P(A) = 0.7, P(B) = 0.68, P(C) = 0.50, P(A∩B) = 0.42, P(A∩C) = 0.35, P(B∩C) = 0.34 (2 points) (i) Find P((A ∪ B) 0 ). (1 point) (ii) Find P(A|B). (2 points) (iii) Find P(A ∩ B ∩ C). (1 point) (iv) Are the events B and C independent? Justify your answer.

Probability Conceptional Questions: 1. A intersection B^c= A-B? 2. can two independent events occur conditional probability...

Probability Conceptional Questions: 1. A intersection B^c= A-B? 2. can two independent events occur conditional probability 3. Three couples sit randomly in a row what is the probability that no husband sits beside his wife. (hint: use inclusion-exclusion formula and you have to use noation P(A),P(B), P(AUB), P(A intersection B) rather than just give out the number)

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 )

MC0402: Suppose there are two events, A and B. The probability of event A is P(A)...

MC0402: Suppose there are two events, A and B. The probability of event A is P(A) = 0.3. The probability of event B is P(B) = 0.4. The probability of event A and B (both occurring) is P(A and B) = 0. Events A and B are: a. 40% b. 44% c. 56% d. 60% e. None of these a. Complementary events b. The entire sample space c. Independent events d. Mutually exclusive events e. None of these MC0802: Functional...

Events A, B, and C are independent. P(A) = 0.15 P(B) = 0.3 P(C) = 0.4...

Events A, B, and C are independent. P(A) = 0.15 P(B) = 0.3 P(C) = 0.4 a) probability that all events occur b) Probability that at least one occurs c) Probability that none occurs d) Probability that exactly one event occurs

Suppose that A and B are two events in a sample space S with P(B)=0.04, P(A...

Suppose that A and B are two events in a sample space S with P(B)=0.04, P(A n B)=0.03 and P(A u B) =0.46 a) what is P(B) complement b)what is P(A) c)what is P( AUB) complement d)what is P(A/B) e)what is P(A complement n B) f)Are two events A and B independent? justify your answer. g) Are two events A and B mutually exclusive? Justify your answer.

1. Suppose that A, B are two independent events, with P(A) = 0.3 and P(B) =...

1. Suppose that A, B are two independent events, with P(A) = 0.3 and P(B) = 0.4. Find P(A and B) a. 0.12 b. 0.3 c. 0.4 d. 0.70 2. Experiment: choosing a single ball from a bag which has equal number of red, green, blue, and white ball and then rolling a fair 6-sided die. a.) List the sample space. b.) What is the probability of drawing a green ball and even number? 2.

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.

Let A and B be two events in a sample space for which P{A}=0.59,P{B}=0.25 P{A}=0.59,P{B}=0.25 and...

Let A and B be two events in a sample space for which P{A}=0.59,P{B}=0.25 P{A}=0.59,P{B}=0.25 and P{A∩B}=0.09 P{A∩B}=0.09 . What is the probability A or B occurs, but not both? Round your answer to 4 decimal places.