Ask Question
14 November, 16:09

For sample sizes greater than 40, the results of hypothesis tests and confidence intervals using the t distribution are highly sensitive to non-normality of the population from which samples are taken

b. the use of the t distribution assumes that the population from which the sample is drawn is normally distributed

c. for small sample sizes, the t distribution should not be used for data that is highly skewed and/or contains extreme outliers

d. since the t distribution procedure is robust, it can be used even for small sample with strong skewness and extreme outliers

+3
Answers (1)
  1. 14 November, 16:31
    0
    We' supposed to indicate which statement is true/false.

    Note that, if a sample size is 40 or over, we can use the t distribution even with skewed data. So it's not highly sensitive to non-normality of the population from which samples are taken. So statement A is false.

    It's true that the t-distribution assumes that the population from which samples are drawn is normally distributed. So B is true.

    For skewed data or with extreme outliers, we can't use the t distribution. We only use t distribution as long as we believe that the population from which samples are drawn is closed to a bell-shape. So C is true.

    Lastly, statement D is against statement C. So D is false.
Know the Answer?
Not Sure About the Answer?
Find an answer to your question 👍 “For sample sizes greater than 40, the results of hypothesis tests and confidence intervals using the t distribution are highly sensitive to ...” in 📗 Mathematics if the answers seem to be not correct or there’s no answer. Try a smart search to find answers to similar questions.
Search for Other Answers