E' is the complimentary event of E
Hence P(E) + P(E') = 1
Given
P(E) = 0.42
P(E') = 1 - P(E)
= 1 - 0.42 = 0.58
P(E') = 0.58
Let E be an event such that P(E) 0.420 and D be the event such that...
Let E be the event that a randomly chosen person exercises. Let D be the event that a randomly chosen person is on a diet. Identify the answer which expresses the following with correct notation: Of all the people who exercise, the probability that a randomly chosen person is on a diet. Select the correct answer below: P(D) AND P(E) P(E AND D) P(E|D) P(D|E)
Let E be the event that a randomly chosen person exercises let D be the event that a randomly chosen person is on a diet. Identify the answer which expresses the following with correct notation: of all the people who exercise, the probability that a randomly chosen person is on diet
Let D be the outcome ofa 6sided die, and let E be the event thatD is a prime number(2,3and5). Find two events about D that are both independent of event E
The sample space of a random experiment is {a,b,c,d,e,g,h}.
Let A denote the event {a,b,c,d,e,g,h}, and let B denote the event
{c,d,e,g}
The sample space of a random experiment is (a, b, c, d, e, g, h). Let A denote the event(a, b, c, e, g, h), and let B denote the event {c, d, e, g). (25 points) 3. Determine the following: (a) B, (c) A (d) AUB' (e) AnB (n A'nB'
Let P(E)= 0.37, P(EF)= 0.19, and P(EF^c)= 0.89. Find P(F|E^C).
You roll two fair dice. Let E be the event that an even total shows on the dice. Let F be the event that a three shows on at least one of the dice. Find P(F) and P(F | E).A. P(F)=1/3, P(F | E)=5/18B. P(F)=11/36, P(F | E)=5/18C. P(F)=1/3, P(F | E)=1/13D. P(F)=11/36, P(F | E)=7/18
7. Let C represent the event that a person has cancer. Let D represent the event that a person is diagnosed with cancer. In a certain region of the country it is known from pasit experience that the probability of selecting an adult over 40 years of age with cancer is 0.08. The probability of a doctor correctly diagnosing a person with cancer as having the disease is P(D C) 0.84, and the probability of incorrectly diagnosing a person without...
Given events A and B, (a) let C be the event that A will occur and B will not occur. Express C in terms of A and B. Let D be the event that B will occur and A will not occur. Express D in terms of A and B. (b) let E be the event that exactly one of the events A or B will occur. Express E in terms of A and B. (c) Use the result in...
7. Let C represent the event that a person has cancer. Let D represent the event that a person is diagnosed with cancer. In a certain region of the country it is known from past experience that the probability of selecting an adult over 40 years of age with cancer is 0.08. The probability of a doctor correctly diagnosing a person with cancer as having the disease is P(D C) 0.84, and the probability of incorrectly diagnosing a person without...
Let D be the event that a randomly chosen person has seen a dermatologist. Let S be the event that a randomly chosen person has had surgery for skin cancer. Identify the answer which expresses the following with correct notation: The probability that a randomly chosen person has had surgery for skin cancer, given that the person has seen a dermatologist. Select the correct answer below: P(D|S) P(D AND S) P(S) AND P(D) P(S|D)