There Were 324 Adults Surveyed. Among The Participants, The Mean Number Of Hours Of Sleep Each Night Was 7.5, And The Standard Deviation Was 1.6.Calculate The Margin Of Error, Assuming A $95 \%$ Confidence Level. Provide Your Answer To The

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Introduction

Margin of error is a crucial concept in statistics that helps us understand the reliability of a survey or experiment. It represents the maximum amount by which the sample mean may differ from the true population mean. In this article, we will calculate the margin of error for a survey on the number of hours of sleep each night, assuming a 95% confidence level.

Background

A survey of 324 adults was conducted to determine the average number of hours of sleep each night. The mean number of hours of sleep was found to be 7.5, with a standard deviation of 1.6. The objective of this article is to calculate the margin of error for this survey, which will provide us with an estimate of the maximum difference between the sample mean and the true population mean.

Margin of Error Formula

The margin of error (ME) can be calculated using the following formula:

ME = (Z * σ) / √n

where:

  • ME is the margin of error
  • Z is the Z-score corresponding to the desired confidence level
  • σ is the standard deviation of the population
  • n is the sample size

Confidence Level and Z-Score

The confidence level is a measure of the reliability of the survey. A 95% confidence level means that there is a 95% probability that the sample mean is within the margin of error of the true population mean. The Z-score corresponding to a 95% confidence level is 1.96.

Margin of Error Calculation

Now, let's calculate the margin of error using the formula:

ME = (1.96 * 1.6) / √324 ME = 3.136 / 17.9 ME = 0.175

Discussion

The margin of error for this survey is 0.175 hours of sleep. This means that there is a 95% probability that the true population mean is within 0.175 hours of the sample mean of 7.5 hours of sleep. In other words, we can be 95% confident that the true average number of hours of sleep each night is between 7.325 and 7.675 hours.

Implications

The margin of error has important implications for the interpretation of survey results. It provides a measure of the reliability of the survey and helps us understand the potential range of values for the true population mean. In this case, the margin of error suggests that the true average number of hours of sleep each night may be slightly higher or lower than the sample mean of 7.5 hours.

Conclusion

In conclusion, the margin of error for this survey is 0.175 hours of sleep, assuming a 95% confidence level. This means that we can be 95% confident that the true average number of hours of sleep each night is between 7.325 and 7.675 hours. The margin of error provides a useful measure of the reliability of the survey and helps us understand the potential range of values for the true population mean.

References

  • [1] Moore, D. S., & McCabe, G. P. (2017). Introduction to the practice of statistics. W.H. Freeman and Company.
  • [2] Larson, R. J., & Farber, B. A. (2017). Elementary statistics: Picturing the world. McGraw-Hill Education.

Additional Resources

  • [1] Margin of Error Calculator: A useful online tool for calculating the margin of error.
  • [2] Confidence Interval Calculator: A useful online tool for calculating the confidence interval.

Tags

  • Margin of error
  • Confidence level
  • Z-score
  • Standard deviation
  • Sample size
  • Survey statistics
  • Statistical analysis

Introduction

In our previous article, we discussed the concept of margin of error and how to calculate it for a survey on the number of hours of sleep each night. However, we understand that there may be many questions and concerns regarding the margin of error. In this article, we will address some of the most frequently asked questions about margin of error.

Q: What is the margin of error, and why is it important?

A: The margin of error is a measure of the maximum amount by which the sample mean may differ from the true population mean. It is an important concept in statistics because it helps us understand the reliability of a survey or experiment. A small margin of error indicates that the sample mean is a reliable estimate of the true population mean.

Q: How do I calculate the margin of error?

A: The margin of error can be calculated using the following formula:

ME = (Z * σ) / √n

where:

  • ME is the margin of error
  • Z is the Z-score corresponding to the desired confidence level
  • σ is the standard deviation of the population
  • n is the sample size

Q: What is the Z-score, and how do I find it?

A: The Z-score is a measure of how many standard deviations an observation is from the mean. It is used to determine the confidence level of a survey. The Z-score corresponding to a 95% confidence level is 1.96.

Q: What is the difference between a 95% confidence level and a 99% confidence level?

A: A 95% confidence level means that there is a 95% probability that the sample mean is within the margin of error of the true population mean. A 99% confidence level means that there is a 99% probability that the sample mean is within the margin of error of the true population mean. In general, a higher confidence level means a larger margin of error.

Q: Can I use the margin of error to make predictions about the population?

A: The margin of error can be used to make predictions about the population, but it is not a guarantee. The margin of error provides a measure of the reliability of the survey, but it does not account for other factors that may affect the population.

Q: How does the sample size affect the margin of error?

A: The sample size affects the margin of error in that a larger sample size results in a smaller margin of error. This is because a larger sample size provides a more accurate estimate of the population mean.

Q: Can I use the margin of error to compare two or more samples?

A: Yes, the margin of error can be used to compare two or more samples. However, it is essential to consider the confidence level and the sample size when making comparisons.

Q: What are some common mistakes to avoid when calculating the margin of error?

A: Some common mistakes to avoid when calculating the margin of error include:

  • Using the wrong Z-score or confidence level
  • Failing to account for the sample size
  • Using the wrong standard deviation or population mean
  • Failing to consider the reliability of the survey

Conclusion

In conclusion, the margin of error is a crucial concept in statistics that helps us understand the reliability of a survey or experiment. By understanding the margin of error, we can make more informed decisions and predictions about the population. We hope that this Q&A article has provided you with a better understanding of the margin of error and how to calculate it.

References

  • [1] Moore, D. S., & McCabe, G. P. (2017). Introduction to the practice of statistics. W.H. Freeman and Company.
  • [2] Larson, R. J., & Farber, B. A. (2017). Elementary statistics: Picturing the world. McGraw-Hill Education.

Additional Resources

  • [1] Margin of Error Calculator: A useful online tool for calculating the margin of error.
  • [2] Confidence Interval Calculator: A useful online tool for calculating the confidence interval.

Tags

  • Margin of error
  • Confidence level
  • Z-score
  • Standard deviation
  • Sample size
  • Survey statistics
  • Statistical analysis
  • Q&A