P(B) = 0.6, P(C) = 0.15, P(B ∩ Cc) = 0.55, and P(A ∩ Bc ∩ Cc) = 0.05. Find P(Ac ∩ Bc ∩ Cc).
Scenario 1: Suppose P(A|B)= 0.45, P(A|BC) = 0.55 and P(BC) =0.90. Using scenario 1, what is P(B)? A.10 B.41 C.50 D.61
3. If P(A) = 0.6, P(B) = 0.55 and P() = 0.2, find P ( (A U B) \ () ). Please show using diagrams, and what does the symbol " \ " mean? We were unable to transcribe this imageWe were unable to transcribe this image
х 0 1 P(x) 0.15 0.05 0.25 0.55 2 3 Find the standard deviation of this probability distribution. Give your answer to at least 2 decimal places Submit Question
.If P(B/A)-1, P(B)-0.5, and P(A)-0.3, what is P(A'/B)? (A' is A complement) 0.15 0.6 0.85 0.4
let A and B be any 2 events with p(A)=0.2; P(AUB)=0.35; P(A and B)= 0.15 find P(A|B) QUESTION 25 Let A and B be any 2 events with p(A) 0.2; P(AUB) 0.35; P(A and B) 0.15 a.0.25 Find P(A|B) b.0.5 c.0.6 d.0.4
2. If P(AB) 0.8 and P(AnB)-0.6, what is the PAcnB)? A) 0.75 B) 0.20C1.33D) 0.15
1. If P(A) = 0.4, P(B) = 0.6, P(C) = 0.3, P = 0.24, P = 0.15 and P(A U C) = 0.82. Which of the events A, B and C are independent? Give reasons for your answers. (A B) We were unable to transcribe this image
Given the points AC - 5,2, – 3), B( - 1, - 9,2), and CC - 4, 3, 4), find (a) the angle between AB and AC, (b) the angle between BA and BC, and (c) the angle between CA and CB. (a) ZBAC = (b) ZABC = (c) ZACB =
2. Suppose A, B, and C are events of strictly positive probability in some probability space. If PAC) 〉 P(BC) and P(A|Cc) 〉 P(BİC"), is it true that P(A) 〉 P(B)? If P(AC) > PlAIC") and P(BIC) > P(BIC"), is it true that P(An BC) > P(An BIC)? 2. Suppose A, B, and C are events of strictly positive probability in some probability space. If PAC) 〉 P(BC) and P(A|Cc) 〉 P(BİC"), is it true that P(A) 〉 P(B)? If...
X P(x) 0 0.1 | 1 0.15 [2] 0.2 | 3 0.55 Find the standard deviation of this probability distribution. Give your answer to at least 2 decimal places Preview