It is known that 18% of people in a certain population are blood group A. Consider...

It’s known that 3 % of people in a certain population have the disease. A blood...

It’s known that 3 % of people in a certain population have the disease. A blood test gives a positive result (indicating the presence of disease) for 90% of people who have the disease, and it is also positive for 5% of healthy people One person is tested and the test gives positive result If the test result is positive for the person, then the probability that this person actually has a disease is _________ If the test result is...

A group of five people are randomly selected from an office of five men and nine...

A group of five people are randomly selected from an office of five men and nine women. The random variable X denotes the number of women in the group selected. What is the probability mass function and expected value of X?

A group of five people are randomly selected from an office of five men and nine...

A group of five people are randomly selected from an office of five men and nine women. The random variable X denotes the number of women in the group selected. What is the probability mass function and expected value of X?

It is known that about 13% of people are left-handed. If we select 11 people at...

It is known that about 13% of people are left-handed. If we select 11 people at random, let Y count the number that are left-handed. Round the following probabilities to the nearest 0.0001. a. Explain why this random variable Y fits all four requirements for a binomial random variable. Include each requirement and how this situation satisfies each one. b. Compute the probability that exactly 5 of the people in the sample are RIGHT handed. c. Compute the probability that...

In a certain large population of people, the proportion that are Rh positive (their blood has...

In a certain large population of people, the proportion that are Rh positive (their blood has the rhesus protein) is approximately 0.82. Suppose 14 people are randomly selected from this population. What is the probability that no more than 12 are Rh positive?

It is known that a group of people is susceptible to a disease according to a...

It is known that a group of people is susceptible to a disease according to a binomial process. Ten people are observed—let X denote the number who are found to be susceptible. We would like to distinguish between the possible cases pi = 10% and pi = 20%.   Using Excel: If four people are found to be susceptible, which is the more likely value of pi? Find a decision rule for distinguishing between the two values of pi based on...

Each of n people (whom we label 1, 2, . . . , n) are randomly...

Each of n people (whom we label 1, 2, . . . , n) are randomly and independently assigned a number from the set {1, 2, 3, . . . , 365} according to the uniform distribution. We will call this number their birthday. (a) Describe a sample space Ω for this scenario. Let j and k be distinct labels (between 1 and n) and let Ajk denote the event that the corresponding people share a birthday. Let Xjk denote...

Assume a normal population with known variance σ2, a random sample (n< 30) is selected. Let...

Assume a normal population with known variance σ2, a random sample (n< 30) is selected. Let x¯,s represent the sample mean and sample deviation. (1)write down the formula: 98% one-sided confidence interval with upper bound for the population mean. (2) show how to derive the confidence interval formula in (1).

Assume a normal population with known variance σ2σ2, a random sample (n<n< 30) is selected. Let...

Assume a normal population with known variance σ2σ2, a random sample (n<n< 30) is selected. Let x¯,sx¯,s represent the sample mean and sample deviation. (1)(2pts) write down the formula: 98% one-sided confidence interval with upper bound for the population mean. (2)(6pts) show how to derive the confidence interval formula in 1

A certain industrial process is brought down for recalibration whenever the quality of the items falls...

A certain industrial process is brought down for recalibration whenever the quality of the items falls below specifications. The random variable X represents the number of the times the process is recalibrated during a week with the following probability mass function. X 0 1 2 3 4 P(X) 0.35 0.25 0.20 ??? 0.05 (a). Find the mean and variance of X (b) Graph the PMF and CDF of X. (c) What is the probability that X is more than one...