QUESTION 36 Suppose the mean SAT score for a certain year was 1060 with a standard...

The mean verbal SAT score at a certain college is 450, with a standard deviation of...

The mean verbal SAT score at a certain college is 450, with a standard deviation of 87. Find the SAT score for the students who scored in the 99th percentile.

For a certain year, the mean math SAT score nationally was 527 with a standard deviation...

For a certain year, the mean math SAT score nationally was 527 with a standard deviation of 86. Scores were normally distributed. Which value below is closest to the highest math SAT score a person could get and still be in the lowest 30% for the population of all math SAT scores? A. 380 B. 680 C. 480 D. 580

Sagan scored 1200 on the SAT. The distribution of SAT scores in a reference population is...

Sagan scored 1200 on the SAT. The distribution of SAT scores in a reference population is normally distributed with mean 980 and standard deviation 100. Andrea scored 27 on the ACT. The distribution of ACT scores in a reference population is normally distributed with mean 20 and standard deviation 5. Who performed better on the standardized exams and why? a. Sagan scored higher than Andrea. Sagan's standardized score was 2.2, which is 2.2 standard deviations above the mean and Andrea's...

Suppose that SAT math scores are normally distributed with a mean of 516 and a standard...

Suppose that SAT math scores are normally distributed with a mean of 516 and a standard deviation of 115, while ACT math scores have a normal distribution with a mean of 22 and a standard deviation of 5. James scored 650 on the SAT math and Jacob scored 29 on the ACT math. Who did better in terms of the standardized z-score? Group of answer choices James Jacob They did relatively the same. Impossible to tell because of the scaling

Assume that in a given year the mean mathematics SAT score was 495, and the standard...

Assume that in a given year the mean mathematics SAT score was 495, and the standard deviation was 111. A sample of 61 scores is chosen. d.) Would it be unusual if the sample mean were greater than 520? Round to at least four decimal places. e.) Do you think it would be unusual for an individual to get a score greater than 520? Explain. Assume the variable is normally distributed. Round the answer to at least four decimal places....

In 2003, the mean SAT math score for college-bound seniors was 519 with a standard deviation...

In 2003, the mean SAT math score for college-bound seniors was 519 with a standard deviation of 115. If you scored a 740, you scored better than what percentage of college-bound seniors who took the exam? Express your answer as a decimal rounded to 4 places.

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 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 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 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.    ...