Suppose the national mean SAT score in mathematics was 510. In a random sample of 40...

Suppose the national mean SAT score in mathematics was 515. In a random sample of 40...

Suppose the national mean SAT score in mathematics was 515. In a random sample of 40 graduates from Stevens High, the mean SAT score in math was 507, with a standard deviation of 30. Test the claim that the mean SAT score for Stevens High graduates is the same as the national average. Test this claim at the 0.05 significance level. (a) What type of test is this? This is a left-tailed test. This is a right-tailed test.     This is...

Math SAT: Suppose the national mean SAT score in mathematics was 515. In a random sample...

Math SAT: Suppose the national mean SAT score in mathematics was 515. In a random sample of 40 graduates from Stevens High, the mean SAT score in math was 508, with a standard deviation of 35. Test the claim that the mean SAT score for Stevens High graduates is the same as the national average. Test this claim at the 0.10 significance level. (a) What type of test is this? This is a left-tailed test.This is a two-tailed test.     This is...

Math SAT: Suppose the national mean SAT score in mathematics was 505. In a random sample...

Math SAT: Suppose the national mean SAT score in mathematics was 505. In a random sample of 60 graduates from Stevens High, the mean SAT score in math was 510, with a standard deviation of 30. Test the claim that the mean SAT score for Stevens High graduates is the same as the national average. Test this claim at the 0.10 significance level. (a) What type of test is this? This is a left-tailed test.This is a two-tailed test.     This is...

Math SAT: Suppose the national mean SAT score in mathematics was 505. In a random sample...

Math SAT: Suppose the national mean SAT score in mathematics was 505. In a random sample of 40 graduates from Stevens High, the mean SAT score in math was 495, with a standard deviation of 30. Test the claim that the mean SAT score for Stevens High graduates is the same as the national average. Test this claim at the 0.01 significance level. (a) What type of test is this? This is a left-tailed test. This is a right-tailed test.    ...

Math SAT: Suppose the national mean SAT score in mathematics was 505. In a random sample...

Math SAT: Suppose the national mean SAT score in mathematics was 505. In a random sample of 50 graduates from Stevens High, the mean SAT score in math was 495, with a standard deviation of 30. Test the claim that the mean SAT score for Stevens High graduates is the same as the national average. Test this claim at the 0.05 significance level. (a) What type of test is this? This is a two-tailed test. This is a left-tailed test.    ...

Math SAT: The math SAT test was originally designed to have a mean of 500 and...

Math SAT: The math SAT test was originally designed to have a mean of 500 and a standard deviation of 100. The mean math SAT score last year was 515 but the standard deviation was not reported. You read in an article for an SAT prep course that states in a sample of 75 students, the mean math score was 546, but they did not disclose the standard deviation. Assume the population standard deviation (σ) for all prep course students...

Math SAT: The math SAT test was originally designed to have a mean of 500 and...

Math SAT: The math SAT test was originally designed to have a mean of 500 and a standard deviation of 100. The mean math SAT score last year was 515 but the standard deviation was not reported. You read in an article for an SAT prep course that states in a sample of 87 students, the mean math score was 534, but they did not disclose the standard deviation. Assume the population standard deviation (σ) for all prep course students...

Retaking the SAT: Many high school students take the SAT's twice; once in their Junior year...

Retaking the SAT: Many high school students take the SAT's twice; once in their Junior year and once in their Senior year. In a sample of 40 such students, the score on the second try was, on average, 29 points above the first try with a standard deviation of 14 points. Test the claim that retaking the SAT increases the score on average by more than 25 points. Test this claim at the 0.01 significance level. (a) The claim is...

Suppose that in the absence of special preparation SAT mathematics scores vary normally with a mean...

Suppose that in the absence of special preparation SAT mathematics scores vary normally with a mean of 475 and a population standard deviation of 100. One hundred students go through a rigorous training program designed to raise their SAT mathematics scores by improving theirmathematics skills. The students’ average score after the training program is 510.9. Test the claim that the training program improves students’ average SAT mathematics scores. Test at the 5% level of significance. a) State the null (H0)...

Retaking the SAT: Many high school students take the SAT's twice; once in their Junior year...

Retaking the SAT: Many high school students take the SAT's twice; once in their Junior year and once in their Senior year. In a sample of 55 such students, the score on the second try was, on average, 34 points above the first try with a standard deviation of 15 points. Test the claim that retaking the SAT increases the score on average by more than 30 points. Test this claim at the 0.10 significance level. (a) The claim is...