For the size of the baseball stadium, assume that we know that the mean size is...

For the size of the baseball stadium, assume that we know that the mean size is...

For the size of the baseball stadium, assume that we know that the mean size is 45000 and the population standard deviation to be 5800. What is the probability that the stadium size is within 1000 of the mean? Select one: a. 50.00% b. 23.38% c. 65.50% d. 43.45%

The attendance at baseball games at a certain stadium is normally distributed, with a mean of...

The attendance at baseball games at a certain stadium is normally distributed, with a mean of 30,000 and a standard deviation of 1500. For any given game: A) What is the probability that attendance is greater than 27,300? B) What is the probability that attendance will be 30,000 or more? C) What is the probability of attendance between 27,000 and 32,000? D) What must the attendance be at the game, for that game's attendance to be in the top 5%...

Suppose that we do not know the mean and the standard deviation, and that we have...

Suppose that we do not know the mean and the standard deviation, and that we have calculated the sample mean and that we have calculated the sample mean and sample standard deviation of the compressive strength based on 10 samples to be 6000kg/cm^2 and 100 kg/cm^2. (a) What is the probability that a sample’s strength is greater than 5800 Kg/cm2? (b) What is the probability that a sample’s strength is between 5800 Kg/cm2 and 5950 Kg/cm2? (c) What strength is...

Assume that you want to test the hypothesis that the mean weight of the male student...

Assume that you want to test the hypothesis that the mean weight of the male student population is 160 lbs. If we assume that the standard deviation has a known value of 12 lbs and we want to test with a confidence level of 95% a. What sample size should we use if we want one to have a probability of making a type II error of no more than 5% in the test when the actual mean is 162...

1. A sample size of 49 drawn from a population with a mean of 36 and...

1. A sample size of 49 drawn from a population with a mean of 36 and a standard deviation of 15 for the size of an English class. What is the probability the class will have greater than 40 a. .9693 b. .4693 c. .0808 d. .0307 2. A sample size of 49 drawn from a population with a mean of 36 and a standard deviation of 15 for the size of an English class. What is the probability the...

A random sample of size 36 is taken from a population with mean µ = 17...

A random sample of size 36 is taken from a population with mean µ = 17 and standard deviation σ = 4. The probability that the sample mean is greater than 18 is ________. a. 0.8413 b. 0.0668 c. 0.1587 d. 0.9332

A population has a mean of 161.2 and a standard deviation of 9.6. A sample of...

A population has a mean of 161.2 and a standard deviation of 9.6. A sample of size 13 is taken from this population. What is the standard deviation of the sampling distribution of the mean?  Enter your answer to 3 decimal places. We have two random variables, A and B. A has a mean of 89.6 and a standard deviation of 37.7. B has a mean of 23.6 and a standard deviation of 15.1. If we create a new random variable...

Frequency follows a Poisson Distribution with mean 7. We know that 40% of losses are of...

Frequency follows a Poisson Distribution with mean 7. We know that 40% of losses are of size greater than $50,000. Frequency and severity are independent. Let N be the number of losses of size greater than $50,000. What is the probability that N=3?

In a population of interest, we know that, 77% drink coffee, and 23% drink tea. Assume...

In a population of interest, we know that, 77% drink coffee, and 23% drink tea. Assume that drinking coffee and tea are disjoint events in this population. We also know coffee drinkers have a 30% chance of smoking. There is a 13% chance of smoking for those who drink tea. a. (2 points) Five individuals are randomly chosen from this population. What is the probability that four of them drink coffee? b. (2 points) Five individuals are randomly chosen from...

A population is normally distributed. To test that its population mean is less than 70, we...

A population is normally distributed. To test that its population mean is less than 70, we collect a random sample of size 27 with mean 68 and standard deviation 7. What is the value of the critical value at the level of significance 10%? Select one: a. None of the other answers is true. b. 1.31 c. -1.48 d. -1.31 e. 1.48