A particular variable measured on the US population is approximately normally distributed with a mean of...

The diameter of a brand of tennis balls is approximately normally​ distributed, with a mean of...

The diameter of a brand of tennis balls is approximately normally​ distributed, with a mean of 2.55 inches and a standard deviation of 0.06 inch. A random sample of 12 tennis balls is selected. Complete parts​ (a) through​ (d) below. a. What is the sampling distribution of the​ mean? A. Because the population diameter of tennis balls is approximately normally​ distributed, the sampling distribution of samples of size 12 will be the uniform distribution. B. Because the population diameter of...

The central limit theorem states that: Populations with more than 30 observations are approximately normally distributed....

The central limit theorem states that: Populations with more than 30 observations are approximately normally distributed. As the sample size increase, a sampling distribution will look more and more like the population. As long as the sample size collected is at least 30, the variable of interest will always be approximately normally distributed. A skewed-left population can never be a sampling distribution that is approximately normally distributed. For sufficiently large random samples, the sampling distribution of the sample mean is...

The diameter of a brand of tennis balls is approximately normally distributed, with a mean of...

The diameter of a brand of tennis balls is approximately normally distributed, with a mean of 2.73 inches and a standard deviation of 0.03 inch. A random sample of 12 tennis balls is selected. Complete parts (a) through (d) below a. what is the sampling distribution of the mean= because the population diameter of tennis balls is approximately normally distributed, the sampling distribution of samples of size 12 will also be approximately normal. b. what is the probability that the...

A particular population, for which the frequency curve is bell-shaped (normal), has a mean of μ=100...

A particular population, for which the frequency curve is bell-shaped (normal), has a mean of μ=100 and a standard deviation of σ=18. For samples of size n=36 consider the sampling distribution of the sample mean ("xbar"). Note that 18 36=3 and that 100±(1)(3)⟹97 to 103 100±(2)(3)⟹94 to 106 100±(3)(3)⟹91 to 109 According to the empirical rule, approximately _____ percent of samples of size 36 will produce a sample mean between 97 and 103. Group of answer choices 90 95 99.7...

A random variable is not normally distributed, but it is mound shaped. It has a mean...

A random variable is not normally distributed, but it is mound shaped. It has a mean of 17 and a standard deviation of 5. If you take a sample of size 13, can you say what the shape of the sampling distribution for the sample mean is? Why? If the sample size is 13, then you can't say anything about the sampling distribution of the sample mean, since the population of the random variable is not normally distributed and the...

A simple random sample of size n is drawn from a population that is normally distributed....

A simple random sample of size n is drawn from a population that is normally distributed. The sample mean x bar is found to be 109, and the sample standard​ deviation, s, is found to be 10. a. Construct 95% confidence interval about miu, if the sample size n is 28. Find lower and upper bound. ​b. Construct 95% confidence interval about miu, if the sample size n is 17. Find lower and upper bound. c.Construct 80% confidence interval about...

The diameter of a brand of tennis balls is approximately normally distributed, with a mean of...

The diameter of a brand of tennis balls is approximately normally distributed, with a mean of 2.73 inches and a standard deviation of 0.03 inch. A random sample of 12 tennis balls is selected. Complete parts (a) through (d) below The probability is 69% that the sample mean will be between what two values symmetrically distributed around the population mean? The lower bound is inches. The upper bound is inches

The diameter of a brand of tennis balls is approximately normally​ distributed, with a mean of...

The diameter of a brand of tennis balls is approximately normally​ distributed, with a mean of 2.57 inches and a standard deviation of 0.05 inch. A random sample of 10 tennis balls is selected. What is the probability that the sample mean is less than 2.56 inches?= 0.2643 What is the probability that the sample mean is between 2.55 and 2.58 inches?= 0.6319 The probability is 65% that the sample mean will be between what two values symmetrically distributed around...

True or False? The sampling distribution of the sample mean of a non-normally distributed population will...

True or False? The sampling distribution of the sample mean of a non-normally distributed population will also be normally distributed as long as the sample size is greater than 10. The sampling distribution of the sample mean of a normally distributed population will not be normally distributed if sample size is less than 30.

The annual salary for one particular occupation is normally​ distributed, with a mean of about ​$127,000...

The annual salary for one particular occupation is normally​ distributed, with a mean of about ​$127,000 and a standard deviation of about ​$17,000. Random samples of 38 are drawn from this​ population, and the mean of each sample is determined. Find the mean and standard deviation of the sampling distribution of these sample means.​ Then, sketch a graph of the sampling distribution.