Example 2: Let A, B, C be events, A = {serum cholesterol of given patient is...

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.

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.

Let A, B and C be three events. With set notation, denote the following events (a)...

Let A, B and C be three events. With set notation, denote the following events (a) - (e). (a) A happens and neither B or C happens. (b) Both A and B happen but C does not. (c) At least one of A, B, C happens. (d) None of A, B, C happens. (e) Out of events A, B and C, at most one event happens. (f) In words, what is event (A ∪ C) c ∪ B?. (g) In...

Example 1: Among females in the US in a given age cohort, a diastolic blood pressure...

Example 1: Among females in the US in a given age cohort, a diastolic blood pressure is normally distributed with mean µ = 95 mm Hg and standard deviation σ = 15 mm Hg. a) What is the probability that a randomly selected woman has a diastolic blood pressure less than 90 mm Hg? b) What is the probability that she has a diastolic blood pressure greater than 95 mm Hg? c) What is the probability that she has a...

Let A be the event that a given patient of a health clinic has coronavirus. Let...

Let A be the event that a given patient of a health clinic has coronavirus. Let B be the event that a given patient of that some health clinic has a fever, and let C be the event that a given patient of that same health clinic has a cough. Assume that 5% of the patients of the clinic have coronavirus and that of those patients, 90% have a fever, 85% have a cough and 97% have either a cough...

Let A be the event that a given patient of a health clinic has coronavirus. Let...

Let A be the event that a given patient of a health clinic has coronavirus. Let B be the event that a given patient of that some health clinic has a fever, and let C be the event that a given patient of that same health clinic has a cough. Assume that 5% of the patients of the clinic have coronavirus and that of those patients, 90% have a fever, 85% have a cough and 97% have either a cough...

Let A be the event that a given patient of a health clinic has the flu....

Let A be the event that a given patient of a health clinic has the flu. Let B be the event that a given patient of that same health clinic has a fever, and let C be the event that a given patient of that same health clinic has a cough. Assume that 5% of the patients of the clinic have the flu and that of those patients, 90% have a fever, 85% have a cough, and 97% have either...

13. Assume A and B are independent events with P(A)= 0.2 and P(B)= 0.3. let C...

13. Assume A and B are independent events with P(A)= 0.2 and P(B)= 0.3. let C be the event that none of the events A and B occurs, let D be the event that exactly one of the events A and B occurs. Find P(A given D)?

2. (25pts) The decrease in cholesterol level after eating a certain brand of oatmeal for breakfast...

2. (25pts) The decrease in cholesterol level after eating a certain brand of oatmeal for breakfast for one month in people with cholesterol levels is Normally distributed. A random sample of 25 adults was selected and mean 8.5 and standard deviation 3. The brand advertises that eating its oatmeal for breakfast daily for one month will produce a mean decrease in cholesterol of more than 10 units for people with cholesterol levels. (α= 0.05) a. Is there enough evidence to...

1，Let A and B be two events. Given that P(A)= 0.31, P(B)=0.72 and P(A and B)=0.18,...

1，Let A and B be two events. Given that P(A)= 0.31, P(B)=0.72 and P(A and B)=0.18, the probability of P(\bar{A} and \bar{B}) is （(please give your answer to two decimal places).） 2，Recent data has shown that 40 percent of householders have a Netflix subscription. If 20 households are randomly selected, the probability that 5 of them have Netflix is Answer (please provide your answer to 4 decimal places).

Q.3. (a) Let an experiment consist of tossing two standard dice. Define the events, A =...

Q.3. (a) Let an experiment consist of tossing two standard dice. Define the events, A = {doubles appear} (That is (1, 1), (2, 2) etc..) B = {the sum is bigger than or equal to 7 but less than or equal to 10} C = {the sum is 2, 7 or 8} (i) Find P (A), P (B), P (C) and P (A ∩ B ∩ C). (ii) Are events A, B and C independent? (b) Let the sample space...