A pathogen affects 1 person out of every 100 people. Suppose you come into contact with...

Suppose that the fraction of infected people in a city is p = 0.01. 100 people...

Suppose that the fraction of infected people in a city is p = 0.01. 100 people from the city board a small cruise. You can assume that the people are unrelated to each other and randomly chosen so that each person is infected independently with probability p. You can also ignore the possibility that they infect each other while boarding. Suppose that the virus test gives negative when the person has the virus with probability 0.2, and gives negative when...

Suppose that the fraction of infected people in a city is p = 0.01. 100 people...

Suppose that the fraction of infected people in a city is p = 0.01. 100 people from the city board a small cruise. You can assume that the people are unrelated to each other and randomly chosen so that each person is infected independently with probability p. You can also ignore the possibility that they infect each other while boarding. Suppose that the virus test gives negative when the person has the virus with probability 0.2, and gives negative when...

Suppose that 1 out of every 5 drivers come to a complete stop at an intersection...

Suppose that 1 out of every 5 drivers come to a complete stop at an intersection having flashing red lights in all directions when no other cars are visible. 15 drivers approaching an intersection under these conditions will be randomly selected. Let Y be the count of these selected drivers that come to a complete stop. Y has a binomial distribution where n = _____ and p = _____. The possible values of Y are whole numbers from _____ to...

a. It is determined that one out of every 11 people is left-handed. If 8 people...

a. It is determined that one out of every 11 people is left-handed. If 8 people are randomly selected, what is the probability that at most 1 is left-handed? b. A test given to detect the HIV Aids virus in a person produces a false positive 1 out of every 500 times, which means a person who does not have the virus has test results they say they do. If 50 people are tested, what is the probability that 1...

1. IQ tests are normally distributed with a mean of 100 and a standard deviation of...

1. IQ tests are normally distributed with a mean of 100 and a standard deviation of 15. Find the following probabilities: A) If a person is randomly selected, what is the probability that the person had an IQ greater than125? _________________ b) If a person is randomly selected what is the probability that the person has an IQ below 92? c) If 40 people are randomly selected, what is the probability that their mean IQ is between 98 and 108?

3. The flu virus infects 1 in every 250 people. The test used to detect the...

3. The flu virus infects 1 in every 250 people. The test used to detect the flu shows a positive result 70% of the time when the person actually has the flu and shows a positive result 15% of the time when a person does not have the flu. Event A will be a “person who is infected”. Event B will be a “person who tests positive.” Hint: Use a tree diagram. (a) Given that a person tests positive, what...

You wish to determine if the height of a person affects how they are perceived by...

You wish to determine if the height of a person affects how they are perceived by others. You ask 35 people to look at full length pictures of several people and give each person an “honesty score”. In other words how honest do you think this person is on a scale of 1-100? Within the group of pictures is one tall and one short person you selected for your experiment (the other pictures are used as distracters to mask your...

Suppose we assume that 5% of people are drug users. If a person is a drug...

Suppose we assume that 5% of people are drug users. If a person is a drug user, the result of the test is positive 95% of the time, and if the person is not a drug user, the result is negative 90% of the time. A person is randomly selected. What is the probability that he tests positive for drugs?

2. Suppose in a city of 10 million people, fifty percent have been infected with the...

2. Suppose in a city of 10 million people, fifty percent have been infected with the new corona virus. (i) If a sample of 204 people is selected without replacement, what is the probability that at least 105 will be infected? Give an exact expression for your answer. Do not simplify. (ii) Repeat Part (i) except assume that the sampling is with replacement. Do not simplify. (iii) Suppose that you test the 204 people one-by-one with replacement. Consider the event...

A crowd of people is in a room. One person from the room is selected randomly....

A crowd of people is in a room. One person from the room is selected randomly. Suppose that we know that 1/5 of the people are over six feet tall. 1/8 of the people have green eyes. The probability that we select someone with either green eyes or who is over six feet tall is given by P(T union G) = 0.25 a. Find the probability that the person selected has green eyes and is taller than six feet. b....