The combined SAT scores for students taking the SAT-I test are normally distributed with a mean of 982 and a standard deviation of 192. Explain specifically why we could use the Central Limit Theorem to find the probability that a randomly selected sample of 9 students who took the SAT-I has a mean score between 800-1150 even though the same size is less than 30
The combined SAT scores for students taking the SAT-I test are normally distributed with a mean...
The combineD SAT scores for students taking the SAT-I are normally distributed with a mean of equals 982 and a standard deviation of equals 192 how large of a sample would need to be taken to reduce the standard deviation of the sample mean to 24 give the exact sample size
8. Assume that SAT scores are normally distributed with mean 1518 and standard deviation 325. ROUND YOUR ANSWERS TO 4 DECIMAL PLACES a. If 100 SAT scores are randomly selected, find the probability that they have a mean less than 1500.___________ b. If 64 SAT scores are randomly selected, find the probability that they have a mean greater than 1600 c. If 25 SAT scores are randomly selected, find the probability that they have a mean between 1550 and 1575...
Scores for the verbal portion of the SAT-I test are normally distributed with a mean of 509 and a standard deviation of 112. Randomly selected men are given the Columbia Review Course before taking the SAT test. Assume that the course has no effect. a) If 16 students are randomly selected, find the sample mean and the sample standard deviation.
The combined math and verbal scores for females taking the SAT-I test are normally distributed with a mean of 900 and a standard deviation of 200. If a college includes a minimum score of 850 among its requirements, what percentage of females do not satisfy that requirement?
The combined math and verbal scores for females taking the SAT-I test are normally distributed with a mean of 998 and a standard deviation of 202 (based on date from the College Board). If a college includes a minimum score of 850 among its requirements, what percentage of females do not satisfy that requirement?
the sat scores for males on the critical reading portion of the sat are normally distributed with a mean of 498 and standard deviation of 116. a. fund the probability that a randomly selected person scores higher than 700. b. Find the probability that a randomly selected person score's Less than 600. c. random samples of size n=20 are drawn from the population of male critical reading sat scores, And The mean of each sample is determined. use the central...
18. Scores this year on the SAT mathematics test (SAT-M) for students taking the test for the first time are believed to be Normally distributed with mean 4. For students taking the test for the second time, this year's scores are also believed to be Normally distributed but with a possibly different mean 42. We wish to estimate the difference - A random sample of the SAT-M scores of 100 students who took the test for the first time this...
(1 point) Scores for men on the verbal portion of the SAT-I test are normally distributed with a mean of 509 and a standard deviation of 112. (a) If 1 man is randomly selected, find the probability that his score is at least 582.5. (b) If 12 men are randomly selected, find the probability that their mean score is at least 582.5. 12 randomly selected men were given a review course before taking the SAT test. If their mean score...
(1 point) Scores for men on the verbal portion of the SAT-I test are normally distributed with a mean of 509 and a standard deviation of 112. (a) If 1 man is randomly selected, find the probability that his score is at least 576.5. (b) If 16 men are randomly selected, find the probability that their mean score is at least 576.5. 16 randomly selected men were given a review course before taking the SAT test. If their mean score...
The combined SAT scores for the students at a local high school are normally distributed with a mean of 1541 and a standard deviation of 301. The local college includes a minimum score of 789 in its admission requirements. What percentage of students from this school earn scores that fail to satisfy the admission requirement? P(X < 789) = %