Improving SAT scores. Refer to the Chance (Winter 2001) and National Education Longitudinal Survey (NELS) study of 265 students who paid a private tutor to help them improve their SAT scores, presented in Exercise. The changes in both the SAT-Mathematics and SAT-Verbal scores for these students are reproduced in the following table:
| SAT-Math | SAT-Verbal |
Mean change in score Standard deviation of score changes | 19 | 7 |
65 | 49 |
a. Construct and interpret a 95% confidence interval for the population mean change in SAT-Mathematics score for students who pay a private tutor.
b. Repeat part a for the population mean change in SATVerbal score.
c. Suppose the true population mean change in score on one of the SAT tests for all students who paid a private tutor is 15. Which of the two tests, SAT-Mathematics or SAT-Verbal, is most likely to have this mean change? Explain.
Improving SAT scores. The National Education Longitudinal Survey (NELS) tracks a nationally representative sample of U.S. students from eighth grade through high school and college. Research published in Chance (Winter 2001) examined the SAT scores of 265 NELS students who paid a private tutor to help them improve their scores. The table summarizes the changes in both the SATMathematics and SAT-Verbal scores for these students.
| SAT-Math | SAT-Verbal |
Mean change in score Standard deviation of score changes | 19 | 7 |
65 | 49 |
a. Suppose one of the 265 students who paid a private tutor is selected at random. Give an interval that is likely to contain the change in this student’s SAT-Math score.
b. Repeat part a for the SAT-Verbal score.
c. Suppose the selected student’s score increased on one of the SAT tests by 140 points. Which test, the SATMath or SAT-Verbal, is the one most likely to have had the 140-point increase? Explain.
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