A simple random sample of size n= 79 is obtained from a population with u = 56 and o = 8. Does the population need to be normally distributed for the sampling distribution of x to be approximately normally distributed? Why? What is the sampling distribution of x? Does the population need to be normally distributed for the sampling distribution of x to be approximately normally distributed? Why? O A. No because the Central Limit Theorem states that regardless of the shape of the underlying population, the sampling distribution of x becomes approximately normal as the sample size, n, increases. O B. No because the Central Limit Theorem states that only if the shape of the underlying population is normal or uniform does the sampling distribution of x become approximately normal as the sample size, n, increases. O C. Yes because the Central Limit Theorem states that only for underlying populations that are normal is the shape of the sampling distribution of x normal, regardless of the sample size, n. O D. Yes because the Central Limit Theorem states that the sampling variability of nonnormal populations will increase as the sample size increases. What is the sampling distribution of x? Select the correct choice below and fill in the answer boxes within your choice. (Type integers or decimals rounded to three decimal places as needed.) O A. The sampling distribution of x is normal or approximately normal with u; = 56| and o; = O B. The sampling distribution of x is skewed left with H; = and o; = O C. The sampling distribution of x is uniform with p = and o = O D. The sampling distribution of x follows Student's t-distribution with p; = and o; =

MATLAB: An Introduction with Applications
6th Edition
ISBN:9781119256830
Author:Amos Gilat
Publisher:Amos Gilat
Chapter1: Starting With Matlab
Section: Chapter Questions
Problem 1P
icon
Related questions
Question
100%
A simple random sample of size n= 79 is obtained from a population with u = 56 and o = 8. Does the population need to be normally distributed for the sampling
distribution of x to be approximately normally distributed? Why? What is the sampling distribution of x?
Does the population need to be normally distributed for the sampling distribution of x to be approximately normally distributed? Why?
O A. No because the Central Limit Theorem states that regardless of the shape of the underlying population, the sampling distribution of x becomes approximately
normal as the sample size, n, increases.
O B. No because the Central Limit Theorem states that only if the shape of the underlying population is normal or uniform does the sampling distribution of x
become approximately normal as the sample size, n, increases.
O C. Yes because the Central Limit Theorem states that only for underlying populations that are normal is the shape of the sampling distribution of x normal,
regardless of the sample size, n.
O D. Yes because the Central Limit Theorem states that the sampling variability of nonnormal populations will increase as the sample size increases.
What is the sampling distribution of x? Select the correct choice below and fill in the answer boxes within your choice.
(Type integers or decimals rounded to three decimal places as needed.)
O A. The sampling distribution of x is normal or approximately normal with u; = 56| and o; =
O B. The sampling distribution of x is skewed left with H; =
and o;
=
O C. The sampling distribution of x is uniform with p =
and o =
O D. The sampling distribution of x follows Student's t-distribution with p; =
and o; =
Transcribed Image Text:A simple random sample of size n= 79 is obtained from a population with u = 56 and o = 8. Does the population need to be normally distributed for the sampling distribution of x to be approximately normally distributed? Why? What is the sampling distribution of x? Does the population need to be normally distributed for the sampling distribution of x to be approximately normally distributed? Why? O A. No because the Central Limit Theorem states that regardless of the shape of the underlying population, the sampling distribution of x becomes approximately normal as the sample size, n, increases. O B. No because the Central Limit Theorem states that only if the shape of the underlying population is normal or uniform does the sampling distribution of x become approximately normal as the sample size, n, increases. O C. Yes because the Central Limit Theorem states that only for underlying populations that are normal is the shape of the sampling distribution of x normal, regardless of the sample size, n. O D. Yes because the Central Limit Theorem states that the sampling variability of nonnormal populations will increase as the sample size increases. What is the sampling distribution of x? Select the correct choice below and fill in the answer boxes within your choice. (Type integers or decimals rounded to three decimal places as needed.) O A. The sampling distribution of x is normal or approximately normal with u; = 56| and o; = O B. The sampling distribution of x is skewed left with H; = and o; = O C. The sampling distribution of x is uniform with p = and o = O D. The sampling distribution of x follows Student's t-distribution with p; = and o; =
Expert Solution
trending now

Trending now

This is a popular solution!

steps

Step by step

Solved in 2 steps with 2 images

Blurred answer
Similar questions
Recommended textbooks for you
MATLAB: An Introduction with Applications
MATLAB: An Introduction with Applications
Statistics
ISBN:
9781119256830
Author:
Amos Gilat
Publisher:
John Wiley & Sons Inc
Probability and Statistics for Engineering and th…
Probability and Statistics for Engineering and th…
Statistics
ISBN:
9781305251809
Author:
Jay L. Devore
Publisher:
Cengage Learning
Statistics for The Behavioral Sciences (MindTap C…
Statistics for The Behavioral Sciences (MindTap C…
Statistics
ISBN:
9781305504912
Author:
Frederick J Gravetter, Larry B. Wallnau
Publisher:
Cengage Learning
Elementary Statistics: Picturing the World (7th E…
Elementary Statistics: Picturing the World (7th E…
Statistics
ISBN:
9780134683416
Author:
Ron Larson, Betsy Farber
Publisher:
PEARSON
The Basic Practice of Statistics
The Basic Practice of Statistics
Statistics
ISBN:
9781319042578
Author:
David S. Moore, William I. Notz, Michael A. Fligner
Publisher:
W. H. Freeman
Introduction to the Practice of Statistics
Introduction to the Practice of Statistics
Statistics
ISBN:
9781319013387
Author:
David S. Moore, George P. McCabe, Bruce A. Craig
Publisher:
W. H. Freeman