Prof. Gersch knows that the amount of learning at YU is normally distributed with unknown mean...

He the collects a sample of 25 recent alumni and finds that the average amount invested...

He the collects a sample of 25 recent alumni and finds that the average amount invested is $5200 and and the sample standard deviation among these recent alumni is $400. a) Construct a 99% CI for the true (pop) mean amount invested by recent alumni. b) Had a business partner told the analyst, prior to his study, that the true (pop) mean amount invested is $5000, yet the analyst thought it was greater, state the appropriate hypotheses and conduct the...

1. You want to do a study to determine the mean amount of time, in hours,...

1. You want to do a study to determine the mean amount of time, in hours, an SMC student spends at a paid job each week. Initial studies indicate that there is a standard deviation of 4.6 hours. The result should be found to 95% confidence to within 0.5 hours. How many SMC students should you poll? a. 18 students b. 30 students c. 19 students d. 326 students e. 325 students 2. The Graduate Management Admission Test (GMAT) is...

18. The average loan debt for college seniors is $20,262. If the debt is normally distributed...

18. The average loan debt for college seniors is $20,262. If the debt is normally distributed with a standard deviation of $5100, find these probabilities: (3 points each) Find the probability that a randomly selected senior owes at least $21,000.   Find the probability that the mean debt from a sample of 20 seniors falls between $20,000 and $21,000. (3 points) The average weight of a package of rolled oats is supposed to be at least 18 ounces. A sample of...

Algebra scores in a school district are approximately normally distributed with mean μ = 72 and...

Algebra scores in a school district are approximately normally distributed with mean μ = 72 and standard deviation σ = 5. A new teaching-and-learning system, designed to increase average scores, is introduced to a random sample of 36 students, and in the first year the average was 73.5. (a) What is the probability that an average as high as 73.5 would have been obtained under the old system? (b) Is the test significant at the 0.05 level? What about the...

Algebra scores in a school district are approximately normally distributed with mean μ = 72 and...

Algebra scores in a school district are approximately normally distributed with mean μ = 72 and standard deviation σ = 5. A new teaching-and-learning system, designed to increase average scores, is introduced to a random sample of 36 students, and in the first year the average was 73.5. (a) What is the probability that an average as high as 73.5 would have been obtained under the old system? (b) Is the test significant at the 0.05 level? What about the...

Algebra scores in a school district are normally distributed with a mean of 74 and standard...

Algebra scores in a school district are normally distributed with a mean of 74 and standard deviation 6. A new teaching-and-learning system, intended to increase average scores, is introduced to a random sample of 30 students, and in the first year the average was 76. (a) What is the probability that an average as high as 76 would have been obtained under the old system? (b) What is the null hypothesis for testing the new system, and what is the...

2. The College Board reported that the mean SAT score in 2009 was 540 for all...

2. The College Board reported that the mean SAT score in 2009 was 540 for all US High School students that took the SAT. A teacher believes that the mean score for his students is greater than 540. He takes a random sample of 50 of his students and the sample mean score for the 25 students is 565 with a sample standard deviation of 100. Does he have evidence that his students, on average, do better than the national...

Scores for a common standardized college aptitude test are normally distributed with a mean of 492...

Scores for a common standardized college aptitude test are normally distributed with a mean of 492 and a standard deviation of 100. Randomly selected men are given a Test Prepartion Course before taking this test. Assume, for sake of argument, that the test has no effect. If 1 of the men is randomly selected, find the probability that his score is at least 533.3. P(X > 533.3) = ? Enter your answer as a number accurate to 4 decimal places....

Scores for a common standardized college aptitude test are normally distributed with a mean of 503...

Scores for a common standardized college aptitude test are normally distributed with a mean of 503 and a standard deviation of 110. Randomly selected men are given a Test Prepartion Course before taking this test. Assume, for sake of argument, that the test has no effect. If 1 of the men is randomly selected, find the probability that his score is at least 553.8. P(X > 553.8) = Enter your answer as a number accurate to 4 decimal places. NOTE:...

Scores for a common standardized college aptitude test are normally distributed with a mean of 510...

Scores for a common standardized college aptitude test are normally distributed with a mean of 510 and a standard deviation of 98. Randomly selected men are given a Test Preparation Course before taking this test. Assume, for sake of argument, that the preparation course has no effect. If 1 of the men is randomly selected, find the probability that his score is at least 588.4. P(X > 588.4) = If 9 of the men are randomly selected, find the probability...