Let A and B be two independent events with P(A) > P(B), P(AUB) = .626, and P(An B) = .144, determine the values of P(A) and P(B).
Q: Suppose that A, B are two events such that P(A) = 0.7, P (B) = 0.55 and P (A / B) = 0.6 Find P (A…
A:
Q: Judy applied to ten colleges. Each college can either accept (A) or reject (R) her application.…
A: Given that: Success probability, p=0.40 Sample size, n=10
Q: Q: A bag contains 12 balls out of which x are white. (i) If one ball is drawn at random, what is the…
A: i): Total balls in bag=12 White balls=x P(drawing a white ball)=x12
Q: he events A and B are independent such that P(A) =0.4 and P(A UB)= 0.88. Find P(B)
A: As per bartleby guideline expert have to answer first three subpart only dear student please upload…
Q: Let A and B be events with P(A) = 0.5 and P(AnB) = 0.4. For what value of P(B) will A and B be…
A:
Q: If the P(A) = 0.43, P( A or B) = 0.87, given that events A and B are mutually exclusive events then…
A: Given, P(A) = 0.43 P( A or B) = 0.87 Since events, A and B are mutually exclusive events P(A and B)…
Q: Consider two independent events A and B such that P(A) = 0.5 and P(B) = 0.6, what is P(AUB)? %3D
A: Given that A and B are independent events. Thus, P(A n B) = P(A)P(B) = 0.5*0.6 = 0.3
Q: Every customer in a restaurant is served water. I represents a randomly selected customer that…
A: Given events; I: a randomly selected customer that has water with ice. L: a randomly selected…
Q: Use the table to find the probabilities for a juice chosen from the shelf at random. P(less than…
A:
Q: If A and B are independent events with P(A)=0.24 and P(B)=0.73 Calculate and find…
A:
Q: Suppose that A and B are independent events such that P(B) = 0.70 and P (B)=0.20. Find P(An B) and P…
A: Given thatA and B are independent events.such that
Q: Evie was doing an experiment for her biology class. She determined that if she randomly selected a…
A: Given that, Probability ( Brown hair), P(BH)= 0.5 Probability (Blue eyes), P(BE)= 0.57 And…
Q: Recall the multiplication rule for conditional probabilities given events A and B. P(ANB) = P(A)P(B…
A: According to the given information, we have P(A1)=0.80P(B|A1)=0.25P(A2)=0.20P(B|A2)=0.10
Q: An experiment consists of three fair, different coloured dice being rolled (the dice are 6-sided and…
A:
Q: Based on a survey, assume that 42% of consumers are comfortable having drones delivetheir purchases.…
A: In two events, A and B are independent of each other, then the probability of happening of both the…
Q: Suppose that E and F are two events and that N(E and F)=360 and N(E)=590 what is P(FIE)
A: Answer: From the given data, E and F are two events where N(E and F) = 360 N(E) = 590
Q: Let A, B be independent events such that p(A) 0.4 and p(B) = 0.6. Find p(A – B) %3D Select one: а. 1…
A: GivenP(A)=0.4P(B)=0.6A,B are independent events Then P(A∩B)=0
Q: For two events a and b it is given p(a)=0.30 P(b)=0.65and p(a or b)=0.74 Calculate P(a and b)
A: Solution - Given that a and b are two events such that P(a)=0.30 P(b)=0.65 And. P(a or b)=0.74…
Q: Find the probability a randomly selected z-score is between -1 and 1.2.
A: Probability that the randomly selected Z-score is between -1 and 1.2 P(-1<z<1.2) We know…
Q: Which of the following events are equal? а. А%3D (1,3}; b. B = {x|x is a number on a die}; c. C=…
A: Given that Which of the following events are equal? a. A = {1, 3}; = {1,3} b. B = {x| x is a…
Q: Find the probability P(E or F) if E and F are independent events, P(E)=0.54, and P(F)=0.37.
A: Given : P (E) = 0.54 P (F) = 0.37
Q: at irsc the probability that a student is a male is 0.52, that a student is a business major is…
A: Let A denote the student is a male, and B denote the student is a business major. At IRSC the…
Q: Consider, If A and B are independent events, P(A)=0.26 and P(B)=.76, Find: 1. P(A N B) 2. Р (A| B)…
A: Given , Consider, If A and B are independent events, Then , P(A) . P(B) = P ( A ∩ B ) Also , P (…
Q: Two events A and B are such that P(A) =0.1, P(B)=0.4 and P(AUB)=0.3. Find the value of P(AUB). 0.2…
A: Given:PA=0.1, PB=0.4 and PA∪B=0.3 Then,PA∩B=PA+PB-PA∪B=0.1+0.4-0.3=0.2
Q: Find the probability of the indicated event if P(E)=0.25 and P(F)=0.55. Find P(E and F) if P(E…
A: Here we need to find P(E and F).
Q: you are givin the information that P(A) = 30 and P(B) = 0.40. Do you have enough information to…
A:
Q: ven P(A) = and P(B) = ³ Find P(A or B), if A and B are mutually clusive events.
A:
Q: Suppose that A and B are two events. P(A) =0.32, p(B) = 0.41 and P(A and B )= 0.22 Calculate…
A: Answer: From the given data, Suppose that A and B are two events, P(A) = 0.32 P(B) = 0.41 P(A and B)…
Q: Let A and B be independent events with P(A) = 0.2 and P(B) = 0.3. Find: (a) P(ANB) and P(AUB) (b)…
A: A and B be independent eventsP(A)=0.2P(B)=0.3
Q: The Cardinals have a 0.44 probability of getting to the World Series. If the Cardinals are their…
A:
Q: Let A and B be two events such that P(A) = 1/6 While P(A or B) = 1/2. Let P(B) = P. For what values…
A: P(A or B)= P(A)+P(B)-P(A and B) For A and B to be independent P(A and B)=P(A).P(B) Therefore, P(A or…
Q: Find the indicated Probability given P(A)=0.4 P(B)=0.6 P(A and B)=0.2 P(A or B)
A:
Q: ppose that E and F are two events and that P(E and F) = 0.5 and P(E) = 0.8. What is P(F|E)? FIE) =…
A:
Q: < 400ml 2 400ml total Low sugar available No low sugar 45 35 80 15 105 120 Total 60 140 200
A: We use the given contingency table to find the required probability.
Q: Q4: what is the probability of choosing randomly (a) a boy, and (b) a girl from a group of people…
A: Probability is a measure of the likelihood of the occurrence of an event and the probability value…
Q: Suppose that A and B are independent events such that P(A) =0.70 and P(B) = 0.20. %3D Find P(AN B)…
A: Solution-: Given: P(A¯)=0.70 , P(B)=0.20 and P(B) =0.20 (A and B are independent event) We want to…
Q: Suppose that A and B are independent events such that P(4)=0.70 and P(B)= 0.20. Find P(An B) and P(A…
A: We have to find given probabilty.
Q: In the 1950s, a study of 544 adult Americans who died of lung cancer found that 537 were smokers.…
A: In the 1950s, a study of 544 adult Americans who died of lung cancer found that 537 were smokers.…
Step by step
Solved in 3 steps with 3 images
- Q3: b) Ahmed is taking Mathematics and Geology. His probabilities for getting grade of 90 (consider A = are P(grade of A in Mathematics %3D class) = 0.70. P(grade of A in Geology class) =0.60. P(grade of A in both Mathematics and Geology classes) = 0.50. Consider using the addition rule for two events to find the probability that Ahmed will get at least one A between his two classes. (Write your answer in a fraction form X.X) Your answerSuppose that A and B are independent events such that P (A) = 0.10 and P(B) = 0.50. Find P(An B) and P (AUB). (a) P(An B) 0 (b) P(AUB) = XFind the probability of the indicated event if P(E) = 0.20 and P(F) = 0.45. Find P(E or F) if P(E and F) = 0.05. P(E or F) = (Simplify your answer.)
- Assume the following probabilities for two events, A and B: P(A) = 0.50, P(B) = 0.70, P(A u B) = 0.85 Are the events, A and B, independent in this situation? You must provide reasoning for your answer.In a certain year, the probability that a stock was in the Information Technology sector was 0.1302. The probability that the stock had a dividend yield of 2.00% or higher given that it was in the Information Technology sector was 0.2985. The probability that a stock had a dividend yield of 2.00% or higher given that it was not in the Information Technology sector was 0.4414. Find the probability that the stock was in the Information Technology sector given that it had a dividend yield of 2.00% or higher. ..... Let F be the event that a stock was in the Information Technology sector and E be the event that a stock had a dividend yield of 2.00% or higher. P(F) = .1302 and P (F') = .8698 The probability that the stock was in the Information Technology sector given that it had a dividend yield of 2.00% or higher is (Do not round until the final answer. Then round to four decimal places as needed.)K Research has shown that approximately 1 woman in 500 carries a mutation of a particular gene. About 69% of women with this mutation develop skin cancer. Find the probability that a randomly selected woman will carry the mutation of this gene and will develop skin cancer. The probability that a randomly selected woman will carry the gene mutation and develop skin cancer is (Round to four decimal places as needed.) Sample Space: Women Women with mutated gene Women who develop skin cancer
- Choose the correct optionConsider, If A and B are independent events, P(A)=0.26 and P(B)=0.76, Find: 1. P(A n B) 2. P(A| B) 3. P(A U B)A recent survey examined the use of social media platforms. Suppose the survey found that there is a 0.63 probability that a randomly selected person will use Facebook and a 0.28 probability that a randomly selected person will use LinkedIn. In addition, suppose there is a 0.18 probability that a randomly selected person will use both Facebook and LinkedIn. What is the probability that a randomly selected person will not use either social media platform? Your answer should be expressed as a number between 0 and 1, and it has to contain 2 decimal places
- Find the probability of the indicated event if P(E)=0.25 and P(F)=0.45. Find P(E or F) if P(E andF)=0.10. P(E or F)=If A and B are independent events P(A)= 0.25 and P(AuB) = 0.67 then Find P(B)Suppose that you would like to decrease the probability that you win the game where you propose the same number of red tokens (22 red tokens) and green tokens (18 green tokens) to be used but with a new total number of purple tokens. You would like your probability of winning the game to be at most 0.10 (i.e. P(R1 and G2) ≤ 0.10). Use Excel to calculate the smallest number of purple tokens needed to achieve this? What is
