1 / 38

Sampling Distributions and Statistical Estimation Busstat 207

Sampling Distributions and Statistical Estimation Busstat 207. Shannon – Spring 2002. Sampling Error Concepts. Exam Scores : Population. Sorted Population. Parameters:. Population Distribution. Select Random Sample; n = 5. Sampling error =. = 68.8 – 71.435. Select Random Sample; n = 5.

basil-sandoval
Download Presentation

Sampling Distributions and Statistical Estimation Busstat 207

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Sampling Distributions and Statistical EstimationBusstat 207 Shannon – Spring 2002

  2. Sampling Error Concepts Exam Scores : Population

  3. Sorted Population Parameters:

  4. Population Distribution

  5. Select Random Sample; n = 5 Sampling error = = 68.8 – 71.435

  6. Select Random Sample; n = 5 Sampling error =

  7. Select Random Sample; n = 5 Sampling error =

  8. 200 Sample Means for n = 5

  9. Sampling Error (200 samples, n = 5) Average Sampling Error = .50 Standard Deviation for Sampling Error = 7.83

  10. Population Distribution

  11. Select Random Sample; n = 10 Sampling error =

  12. 200 Sample Means for n = 10

  13. Sampling Error (200 samples, n = 10) Average Sampling Error = .32 Standard Deviation for Sampling Error = 5.16

  14. Estimating Population Values • Point Estimation • Interval Estimation Darts and Horseshoes – the analogy

  15. Confidence Intervals Lower Confidence Limit Upper Confidence Limit Point Estimate

  16. 95% Confidence Intervals 0.95 z.025= -1.96 z.025= 1.96

  17. Confidence Interval- General Format - Point Estimate  (Critical Value)(Standard Error)

  18. Confidence Intervals The confidence level refers to a percentage greater than 50 and less than 100 that corresponds to the percentage of all possible confidence intervals, based on a given size sample, that will contain the true population value.

  19. Confidence Intervals The confidence coefficient refers to the confidence level divided by 100% -- i.e., the decimal equivalent of a confidence level.

  20. Confidence Interval- General Format:  known - Point Estimate  z (Standard Error)

  21. Confidence Interval Estimates CONFIDENCE INTERVAL ESTIMATE FOR  ( KNOWN) where: z = Critical value from standard normal table  = Population standard deviation n = Sample size

  22. Examples of a Confidence Interval Estimate for 

  23. Special Message about Interpreting Confidence Intervals Once a confidence interval has been constructed, it will either contain the population mean or it will not. For a 95% confidence interval, if you were to produce all the possible confidence intervals using each possible sample mean from the population, 95% of these intervals would contain the population mean.

  24. Margin of Error MARGIN OF ERROR (ESTIMATE FOR  WITH  KNOWN) where: e = Margin of error z = Critical value = Standard error of the sampling distribution

  25. Confidence Interval Estimates CONFIDENCE INTERVAL ( UNKNOWN) where: t = Critical value from t-distribution with n-1 degrees of freedom = Sample mean s = Sample standard deviation n = Sample size

  26. Confidence Interval Estimates CONFIDENCE INTERVAL-LARGE SAMPLE WITH  UNKNOWN where: z =Value from the standard normal distribution = Sample mean s = Sample standard deviation n = Sample size

  27. Determining the Appropriate Sample Size SAMPLE SIZE REQUIREMENT - ESTIMATING  WITH  KNOWN where: z = Critical value for the specified confidence interval e = Desired margin of error  = Population standard deviation

  28. Estimating A Population Proportion SAMPLE PROPORTION where: x = Number of occurrences n = Sample size

  29. Estimating a Population Proportion STANDARD ERROR FOR p where:  =Population proportion n = Sample size

  30. Confidence Interval Estimates for Proportions CONFIDENCE INTERVAL FOR  where: p = Sample proportion n = Sample size z = Critical value from the standard normal distribution

  31. Examples of Confidence Interval for Proportion

  32. Determining the Required Sample Size MARGIN OF ERROR FOR ESTIMATING where:  = Population proportion z = Critical value from standard normal distribution n = Sample size

  33. Determining the Required Sample Size SAMPLE SIZE FOR ESTIMATING where:  = Value used to represent the population proportion e = Desired margin of error z = Critical value from the standard normal table

  34. Confidence Coefficient Confidence Interval Confidence Level Degrees of Freedom Margin of Error Pilot Sample Point Estimate Sampling Error Student’s t-distribution Key Terms

More Related