Question

Suppose that we will randomly select a sample of 126 measurements from a population having a mean equal to 18 and a standard deviation equal to 7. (a) Describe the shape of the sampling distribution of the sample mean x?. Do we need to make any assumptions about the shape of the population? Why or why not? (Click to select) ; (Click to select) , because the sample size is (Click to select) . (b) Find the mean and the standard deviation of the sampling distribution of the sample mean x?. (Round your ?x? answer to 1 decimal place.) ?x? ?x? (c) Calculate the probability that we will obtain a sample mean greater than 20; that is, calculate P(x? > 20). Hint: Find the z value corresponding to 20 by using ?x? and ?x? because we wish to calculate a probability about x?. (Use the rounded standard error to compute the rounded Z-score used to find the probability. Round your answer to 4 decimal places. Round z-scores to 2 decimal places.) P(x? > 20) (d) Calculate the probability that we will obtain a sample mean less than 17.356; that is, calculate P(x? < 17.356) (Use the rounded standard error to compute the rounded Z-score used to find the probability. Round your answer to 4 decimal places. Round z-scores to 2 decimal places.) P(x? < 17.356)

          Suppose that we will randomly select a sample of 126 measurements from a population having a mean equal to 18 and a standard deviation equal to 7.

(a) Describe the shape of the sampling distribution of the sample mean x?. Do we need to make any assumptions about the shape of the population? Why or why not?
(Click to select) ; (Click to select) , because the sample size is (Click to select) .

(b) Find the mean and the standard deviation of the sampling distribution of the sample mean x?. (Round your ?x? answer to 1 decimal place.)
?x?
?x?

(c) Calculate the probability that we will obtain a sample mean greater than 20; that is, calculate P(x? > 20). Hint: Find the z value corresponding to 20 by using ?x? and ?x? because we wish to calculate a probability about x?. (Use the rounded standard error to compute the rounded Z-score used to find the probability. Round your answer to 4 decimal places. Round z-scores to 2 decimal places.)
P(x? > 20)

(d) Calculate the probability that we will obtain a sample mean less than 17.356; that is, calculate P(x? < 17.356) (Use the rounded standard error to compute the rounded Z-score used to find the probability. Round your answer to 4 decimal places. Round z-scores to 2 decimal places.)
P(x? < 17.356)

Suppose that we will randomly select a sample of 126 measurements from a population having a mean equal to 18 and a standard deviation equal to 7.

(a) Describe the shape of the sampling distribution of the sample mean x?. Do we need to make any assumptions about the shape of the population? Why or why not?
(Click to select) ; (Click to select) , because the sample size is (Click to select) .

(b) Find the mean and the standard deviation of the sampling distribution of the sample mean x?. (Round your ?x? answer to 1 decimal place.)
?x?
?x?

(c) Calculate the probability that we will obtain a sample mean greater than 20; that is, calculate P(x? > 20). Hint: Find the z value corresponding to 20 by using ?x? and ?x? because we wish to calculate a probability about x?. (Use the rounded standard error to compute the rounded Z-score used to find the probability. Round your answer to 4 decimal places. Round z-scores to 2 decimal places.)
P(x? > 20)

(d) Calculate the probability that we will obtain a sample mean less than 17.356; that is, calculate P(x? < 17.356) (Use the rounded standard error to compute the rounded Z-score used to find the probability. Round your answer to 4 decimal places. Round z-scores to 2 decimal places.)
P(x? < 17.356)

Added by Nicholas V.

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