suppose 13​% of the population are 64 or​ over, 30​% of those 64 or over have​...

Suppose that in a certain population, 18% have green eyes and 25% have blonde hair. In...

Suppose that in a certain population, 18% have green eyes and 25% have blonde hair. In addition, 11% of people have green eyes and blonde hair. Let G represent the event that a person has green eyes, and B represent the event that a person has blonde hair. In each part of this question, you must first express each probability in terms of the events G and B and justify any computation through the use of a formula. (a) Express...

Of all people in one population, 21% have high blood pressure and 36% are overweight. In...

Of all people in one population, 21% have high blood pressure and 36% are overweight. In addition, 42% of people who are overweight also have high blood pressure. Let H represent the event that a person has high blood pressure, and O represent the event that a person is overweight. In each part of this question, you must first express each probability in terms of the events H and O and justify any computation through the use of a formula....

4. Suppose that we randomly select one American Adult. Let A be the event that the...

4. Suppose that we randomly select one American Adult. Let A be the event that the individuals annual income $100,000 and let B be the event that the individual has at least a bachelors degree. a. Without knowing any of the actual probabilities involved, would you expect the events A and B to be independent or not? Clearly explain in a few words. According to a Census Bureau, P(A)= 0.20, P(B)= 0.35, P(A ∩ B)= 0.14 b. What is the...

MC0402: Suppose there are two events, A and B. The probability of event A is P(A)...

MC0402: Suppose there are two events, A and B. The probability of event A is P(A) = 0.3. The probability of event B is P(B) = 0.4. The probability of event A and B (both occurring) is P(A and B) = 0. Events A and B are: a. 40% b. 44% c. 56% d. 60% e. None of these a. Complementary events b. The entire sample space c. Independent events d. Mutually exclusive events e. None of these MC0802: Functional...

(a) Suppose that out of all students, 40% have a bicycle, 25% have a motorbike and...

(a) Suppose that out of all students, 40% have a bicycle, 25% have a motorbike and 10% have both. Let A be the event that a randomly-chosen student has a bicycle and let B be the event that he/she has a motorbike (i) Find the proportion of bicycle owners who have a motorbike.Write [2] this as a conditional probability and interpret it. (ii) Find the proportion of motorbike owners who have a bicycle. Write [2] this as a conditional probability...

Consider the experiment of randomly selecting an adult American. Let A be the event that a...

Consider the experiment of randomly selecting an adult American. Let A be the event that a person has the disease and let B be the event that a person tests positive for the disease. (a) There are three probabilities given above. Give each of them in terms of the events A and B. (b) In terms of the events A and B, what probability is it that we wish to compute? Give the correct “formula” for computing that probability (c)...

Given an employee is under 40 years of age, they have a 28% chance of having...

Given an employee is under 40 years of age, they have a 28% chance of having an individual retirement plan (IRA). If an employee is 40 or older, they have a 43% chance of having an individual retirement plan (IRA). Currently the workforce is composed of 56% of people who are under 40 years of age. Let A be the event that an employee is under 40 and B be the event that an employee has an IRA. If you...

Suppose someone wants to accumulate ​$55, for a college fund over the next 15 years. Determine...

Suppose someone wants to accumulate ​$55, for a college fund over the next 15 years. Determine whether the following investment plans will allow the person to reach the goal. Assume the compounding and payment periods are the same. The person deposits ​$130 per month into an account with an APR of 5​%. Will the person meet the​ goal? Select the correct choice below and fill in the answer box to complete your choice. ​(Round the final answer to the nearest...

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...