45% of patients admitted to a clinic are due to causes of high blood pressure. The probability of a patient knowing that they have high blood pressure is 20%. 1. What is the probability that the randomly selected patient is hyperlipidemic and has high blood pressure? 2. What is the probability that the randomly selected patient is not hyperlipidemic and has high blood pressure?
Problem #3: Let A and B be two events on the sample space S. Then show that a. P(B) P(AOB)+P(AnB) b. If Bc A, then show that P(A)2 P(B) Show that P(A| B)=1-P(A|B) C. P(A) d. If A and B are mutually exclusive events then show that P(A| AUB) = PA)+P(B) Problem 4: If A and B are independent events then show that A and B are independent. If A and B are independent then show that A and B...
Sean A y B eventos tal que P(A o B) = 0.76, P(A) = 0.65 y P(A y B) = 0.20 a) P(B) b) P(ANB) c) P(Äy B) 0.65 Check Las probabilidades de tres eventos A. By C se distribuyen en el siguiente diagrama de Venn. B с 0.25 0.02 0.2 0.05 0.1 0.15 0.21 А 1. P(A) = 0.51 2. P(ANC) = 3. P(BUC) = 4. P(B) = 5. PLĀNBOC) =
1) Let A, B and C be three events with P(A) = 94%, P(B) = 11%, and P(C) = 4%. Answer the following questions if B and C are disjoint and P(ANC) = 3%, and P(ANB) = 8%. a. Fill the Venn diagram with probabilities of each area. Find the probability that event C does not happen on its own? (That is, either C does not happen, or it happens with other events.) c. Find the probability that at least...
1 Let A and B be independent events with P(A) and P(B) = FICE Find P(ANB) and P(AUB). 8 P(ANB) = P(AUB) =
2. a) Let A and B be two events such that P(A) 4, P(B) .5 and P(AnB) 3 Find P(AUB). b) Let A and B be two events such that P(A)-5, P(B) 3 and P(AUB) .6. Find P(An B)
The probability that a randomly selected person has high blood pressure (the event H) is P(H) 0.3 and the probability that a randomly selected person is a runner (the event R) is P® 0.3 The probability that a randomly selected person has high blood pressure and is a runner iso.. Find the probability that a randomly selected person has high blood pressure and is not a runner. a 0.2 b) 0.6 c0.3 d) 0.7 e 0.4 fONone of the above
Let A and B be events with probabilities P(A)-3/4 and P(B)-1/3 (a) Show that 12 3' (b) Let P(AnB) - find PA n Bc).
2. Let A and B be events in a sample space such that P(A) -0.5. P(ANB) -0.3 and PLAUB)=0.8. Calculate: 1) P(AB): ii) P(BA): iii) PIBIA B): be independent of A and such that B and Care Let the event C in mutually exclusive. Calculate: iv) P(AC); v) PIANBNC). (8 Marks)
4. The United States government collects data about the causes of death for its citizens. The data show that the probability is 0.33 that a randomly chosen death was due to cardiovascular disease, 0.21 that is was due to high blood pressure, and 0.08 that is was due to cardiovascular disease and high blood pressure. What is the probability a randomly selected US citizen's death was due to cardiovascular disease or high blood pressure? a) 46% b) 62% c) 15%...