A Population Has A Mean { \mu = 90$}$ And A Standard Deviation { \sigma = 18$}$. Find The Mean And Standard Deviation Of A Sampling Distribution Of Sample Means With Sample Size { N = 36$}$.(Simplify Your Answer.)

Mar 8, 2025 by ADMIN 214 views

$A population has a mean ${$\mu = 90\$}$ and a standard deviation ${$\sigma = 18\$}$. Find the mean and standard deviation of a sampling distribution of sample means with sample size ${$n = 36\$}$.$

The Central Limit Theorem and Sampling Distribution

The Central Limit Theorem (CLT) is a fundamental concept in statistics that describes the behavior of the sampling distribution of sample means. According to the CLT, the sampling distribution of sample means will be approximately normally distributed, regardless of the shape of the population distribution, as long as the sample size is sufficiently large. The mean of the sampling distribution of sample means is equal to the population mean, and the standard deviation of the sampling distribution of sample means is equal to the population standard deviation divided by the square root of the sample size.

Calculating the Mean of the Sampling Distribution

The mean of the sampling distribution of sample means is equal to the population mean. In this case, the population mean is ${$ \mu = 90$}$. Therefore, the mean of the sampling distribution of sample means is also ${$ \mu = 90$}$.

Calculating the Standard Deviation of the Sampling Distribution

The standard deviation of the sampling distribution of sample means is equal to the population standard deviation divided by the square root of the sample size. In this case, the population standard deviation is ${$ \sigma = 18$}$ and the sample size is ${$ n = 36$}$. Therefore, the standard deviation of the sampling distribution of sample means is:

\frac{\sigma}{\sqrt{n}} = \frac{18}{\sqrt{36}} = \frac{18}{6} = 3

Conclusion

In conclusion, the mean of the sampling distribution of sample means is ${$ \mu = 90$}$ and the standard deviation of the sampling distribution of sample means is ${$ \sigma = 3$}$. This is a fundamental concept in statistics that is used to make inferences about a population based on a sample of data.

The Importance of the Central Limit Theorem

The Central Limit Theorem is a powerful tool in statistics that allows us to make inferences about a population based on a sample of data. It is used in a wide range of applications, including hypothesis testing, confidence intervals, and regression analysis. The CLT is a fundamental concept in statistics that is used to make predictions about a population based on a sample of data.

The Sampling Distribution of Sample Means

The sampling distribution of sample means is a probability distribution of sample means that is obtained by taking multiple samples from a population and calculating the mean of each sample. The sampling distribution of sample means is a key concept in statistics that is used to make inferences about a population based on a sample of data.

The Properties of the Sampling Distribution of Sample Means

The sampling distribution of sample means has several important properties, including:

The mean of the sampling distribution of sample means is equal to the population mean.
The standard deviation of the sampling distribution of sample means is equal to the population standard deviation divided by the square root of the sample size.
The sampling distribution of sample means is approximately normally distributed, regardless of the shape of the population distribution, as long as the sample size is sufficiently large.

The Applications of the Central Limit Theorem

The Central Limit Theorem has a wide range of applications in statistics, including:

Hypothesis testing: The CLT is used to make inferences about a population based on a sample of data.
Confidence intervals: The CLT is used to construct confidence intervals for the population mean.
Regression analysis: The CLT is used to make predictions about a population based on a sample of data.

The Limitations of the Central Limit Theorem

The Central Limit Theorem has several limitations, including:

The CLT assumes that the sample size is sufficiently large. If the sample size is too small, the CLT may not hold.
The CLT assumes that the population distribution is not too skewed. If the population distribution is too skewed, the CLT may not hold.
The CLT assumes that the sample is randomly selected from the population. If the sample is not randomly selected, the CLT may not hold.

Conclusion

In conclusion, the Central Limit Theorem is a fundamental concept in statistics that is used to make inferences about a population based on a sample of data. The CLT is a powerful tool that is used in a wide range of applications, including hypothesis testing, confidence intervals, and regression analysis. However, the CLT has several limitations, including the assumption of a sufficiently large sample size, a non-skewed population distribution, and a randomly selected sample.

References

Moore, D. S., & McCabe, G. P. (2013). Introduction to the practice of statistics. W.H. Freeman and Company.
Larson, R. E., & Farber, B. A. (2018). Elementary statistics: Picturing the world. Cengage Learning.
Freund, J. E., & Wilson, W. J. (2016). Statistics: A first course. Pearson Education Limited.

Q: What is the Central Limit Theorem (CLT)?

A: The Central Limit Theorem (CLT) is a fundamental concept in statistics that describes the behavior of the sampling distribution of sample means. According to the CLT, the sampling distribution of sample means will be approximately normally distributed, regardless of the shape of the population distribution, as long as the sample size is sufficiently large.

Q: What is the mean of the sampling distribution of sample means?

A: The mean of the sampling distribution of sample means is equal to the population mean. In this case, the population mean is ${$ \mu = 90$}$. Therefore, the mean of the sampling distribution of sample means is also ${$ \mu = 90$}$.

Q: What is the standard deviation of the sampling distribution of sample means?

A: The standard deviation of the sampling distribution of sample means is equal to the population standard deviation divided by the square root of the sample size. In this case, the population standard deviation is ${$ \sigma = 18$}$ and the sample size is ${$ n = 36$}$. Therefore, the standard deviation of the sampling distribution of sample means is:

\frac{\sigma}{\sqrt{n}} = \frac{18}{\sqrt{36}} = \frac{18}{6} = 3

Q: What are the assumptions of the Central Limit Theorem?

A: The Central Limit Theorem assumes that the sample size is sufficiently large, the population distribution is not too skewed, and the sample is randomly selected from the population.

Q: What are the limitations of the Central Limit Theorem?

A: The Central Limit Theorem has several limitations, including the assumption of a sufficiently large sample size, a non-skewed population distribution, and a randomly selected sample.

Q: What are the applications of the Central Limit Theorem?

A: The Central Limit Theorem has a wide range of applications in statistics, including hypothesis testing, confidence intervals, and regression analysis.

Q: What is the sampling distribution of sample means?

A: The sampling distribution of sample means is a probability distribution of sample means that is obtained by taking multiple samples from a population and calculating the mean of each sample.

Q: What are the properties of the sampling distribution of sample means?

A: The sampling distribution of sample means has several important properties, including:

The mean of the sampling distribution of sample means is equal to the population mean.
The standard deviation of the sampling distribution of sample means is equal to the population standard deviation divided by the square root of the sample size.
The sampling distribution of sample means is approximately normally distributed, regardless of the shape of the population distribution, as long as the sample size is sufficiently large.

Q: How is the Central Limit Theorem used in hypothesis testing?

A: The Central Limit Theorem is used in hypothesis testing to make inferences about a population based on a sample of data. The CLT is used to calculate the probability of observing a sample mean that is as extreme or more extreme than the one observed, assuming that the null hypothesis is true.

Q: How is the Central Limit Theorem used in confidence intervals?

A: The Central Limit Theorem is used in confidence intervals to construct a range of values within which the population mean is likely to lie. The CLT is used to calculate the margin of error, which is the maximum amount by which the sample mean is likely to differ from the population mean.

Q: How is the Central Limit Theorem used in regression analysis?

A: The Central Limit Theorem is used in regression analysis to make predictions about a population based on a sample of data. The CLT is used to calculate the standard error of the regression coefficients, which is a measure of the variability of the regression coefficients.

Q: What is the importance of the Central Limit Theorem in statistics?

A: The Central Limit Theorem is a fundamental concept in statistics that is used to make inferences about a population based on a sample of data. The CLT is a powerful tool that is used in a wide range of applications, including hypothesis testing, confidence intervals, and regression analysis.

Q: What are the implications of the Central Limit Theorem for statistical inference?

A: The Central Limit Theorem has several implications for statistical inference, including:

The sampling distribution of sample means is approximately normally distributed, regardless of the shape of the population distribution, as long as the sample size is sufficiently large.
The mean of the sampling distribution of sample means is equal to the population mean.
The standard deviation of the sampling distribution of sample means is equal to the population standard deviation divided by the square root of the sample size.

Q: What are the future directions for research on the Central Limit Theorem?

A: There are several future directions for research on the Central Limit Theorem, including:

Developing new methods for testing the assumptions of the CLT.
Investigating the robustness of the CLT to non-normality and non-constant variance.
Developing new applications of the CLT in fields such as medicine, economics, and social sciences.

Q: What are the challenges in applying the Central Limit Theorem in practice?

A: There are several challenges in applying the Central Limit Theorem in practice, including:

Ensuring that the sample size is sufficiently large.
Ensuring that the population distribution is not too skewed.
Ensuring that the sample is randomly selected from the population.

Q: What are the benefits of using the Central Limit Theorem in practice?

A: There are several benefits of using the Central Limit Theorem in practice, including:

Making inferences about a population based on a sample of data.
Constructing confidence intervals for the population mean.
Making predictions about a population based on a sample of data.

Q: What are the limitations of the Central Limit Theorem in practice?

A: There are several limitations of the Central Limit Theorem in practice, including:

The assumption of a sufficiently large sample size.
The assumption of a non-skewed population distribution.
The assumption of a randomly selected sample.

Q: What are the future implications of the Central Limit Theorem for statistical inference?

A: The Central Limit Theorem has several future implications for statistical inference, including:

The development of new methods for testing the assumptions of the CLT.
The investigation of the robustness of the CLT to non-normality and non-constant variance.
The development of new applications of the CLT in fields such as medicine, economics, and social sciences.