Question

The scores on the entrance test at a well-known, exclusive law school are normally distributed with...

The scores on the entrance test at a well-known, exclusive law school are normally distributed with a mean score of 203 and a standard deviation equal to 30. At what value should the lowest passing score be set if the school wishes only 2.5 percent of those taking the test to pass? (Round your answer to nearest whole number.)

Homework Answers

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
The scores on the entrance exam at a well-known, exclusive law school are normally distributed with...
The scores on the entrance exam at a well-known, exclusive law school are normally distributed with a mean score of 162 and a standard deviation equal to 89. At what value should the lowest passing score be set if the school wishes only 2.5 percent of those taking the test to pass? (Round your answer to nearest whole number.) Set lowest passing score to ____________ .
The Law School Admission Test (LSAT) is designed so that test scores are normally distributed. The...
The Law School Admission Test (LSAT) is designed so that test scores are normally distributed. The mean LSAT score for the population of all test-takers in 2005 was 154.35, with a standard deviation of 5.62. Calculate the value of the standard error of the mean for the sampling distribution for 100 samples. Round to the second decimal place.
scores on a college entrance test are normally distributed with a mean 300 and a standard...
scores on a college entrance test are normally distributed with a mean 300 and a standard deviation of 50 if a test score is picked at random what is the probability that the score is less than 215 or more than 345 b) find two test scores that divide the normal curve into a middle of 0.92 and two 0.04 areas
Suppose that scores of the entrance test of UMAC are normally distributed with mean 500 and...
Suppose that scores of the entrance test of UMAC are normally distributed with mean 500 and standard deviation 100. A class of 25 candidates, was invigilated by me last weekend for the entrance of UMAC 2021. Suppose that candidates in my class are randomly assigned, find the probability that the average score of that class will be no more than 535.
Recent test scores on the Law School Admission Test (LSAT) are normally distributed with a mean...
Recent test scores on the Law School Admission Test (LSAT) are normally distributed with a mean of 162.4 and a standard deviation of 15.9. What is the probability that the mean of 12 randomly selected scores is less than 161? 0.535 0.620 0.380 0.465
(CO 3) Recent test scores on the Law School Admission Test (LSAT) are normally distributed with...
(CO 3) Recent test scores on the Law School Admission Test (LSAT) are normally distributed with a mean of 162.4 and a standard deviation of 15.9. What is the probability that the mean of 8 randomly selected scores is less than 161?
Test scores in Mr. Smith's Stats class are normally distributed with a mean of 76 and...
Test scores in Mr. Smith's Stats class are normally distributed with a mean of 76 and a standard deviation of 10. Mr. Smith declared that 11.5% of his class didn't perform well on the test. What test score is at the upper limit of his test scores that didn't perform well on the test? (Meaning what is the test score that corresponds to the beginning bad grades on Mr. Smith's test.) Round to the nearest whole test grade.
AP High School entrance scores are Normally distributed with a mean of 75 and a standard...
AP High School entrance scores are Normally distributed with a mean of 75 and a standard deviation of 10. RV X ~ n(mean = 75, stdev = 10) 4b. What is the probability of getting an 80 or more on this exam? Please round probability to two decimal places, i.e., 0.xx.
Scores for an test are normally distributed with a mean of 275 and a standard deviation...
Scores for an test are normally distributed with a mean of 275 and a standard deviation of 60. How high must an individual score to be in the highest 10%? Please round to the nearest whole number.
7. The board of examiners that administers the real estate broker's examination in a certain state...
7. The board of examiners that administers the real estate broker's examination in a certain state found that the mean score on the test was 450 and the standard deviation was 75. If the board wants to set the passing score so that only the best 12% of all applicants pass, what is the passing score? Assume that the scores are normally distributed. Round to the nearest whole number.