A set of students took a test in statistics and the Principal decided that the top 30% of the class will be awarded. The scores are recorded to the nearest whole number and approximately normally distributed with a mean of 75 and a standard deviation of 10.
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Suppose scores of students on a test are approximately normally distributed with a mean score of 65 points and a standard deviation of 8 points. It is decided to give A's to 10 percent of the students. Obtain the threshold score that will result in an A.
The following information corresponds to students who Took Test 4. The mean score was 59.98 points and the standard deviation was 13.18. Assume scores for Test 4 are normally distributed. If 10 students are randomly selected, find the probability that the mean of their test score is greater than 56.
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...
Scores this year for students taking the SAT Math test for the first time are believed to be Normally distributed with mean Mi. 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 M2. We wish to estimate the difference M2 - Mi. A random sample of the SAT Math scores of 100 students who took the test for the first time this year was...
3. (4 points) The scores on a test are normally distributed with a mean of 75 and a standard deviation of 8. a) Find the proportion of students having scores greater than 85. b) If the bottom 3% of students will fail the course, what is the lowest score that a student can have and still be awarded a passing grade? Please round up to the nearest integer.
An English professor assigns letter grades on a test according to the following scheme. A: Top 9% of scores B: Scores below the top 9% and above the bottom 61% C: Scores below the top 39% and above the bottom 25% D: Scores below the top 75% and above the bottom 10% F: Bottom 10% of scores Scores on the test are normally distributed with a mean of 72.3 and a standard deviation of 8 . Find the minimum score...
if statistics test scores were normally distributed with a mean of 81 and a standard deviation of 4, a) what is the probability that a randomly selected student scored less than 70? b) what percentage of students had a B on the exam? c) the top 10% of the class had what grades?
urgent please QUESTION 17 Thirty-six randomly selected students took a Statistics test. If the sample mean was 72 and the sample standard deviation was 12, what will the the margin of error when constructing 95% confidence interval for the mean score of all students assuming that the population is normally distributed 4.00 5.15
A principal claims the students in his school have above-average test scores for a particular standardized test. A sample of 50 students from his school were found to have an average test score of 77.2. The population mean for test scores for this particular test is 75, with a standard deviation of 9 (so we can assume that the population test score is normally distributed). Set up a hypothesis test to determine whether this principal’s claim is correct (use alpha...
Descriptive analysis revealed that the mean Test 3 score of all 63 students in Dr. Kilman's statistics courses was an 80. Similarly, the standard deviation for all students' Test 3 scores was found to be 16. Assume the Test 3 scores are approximately normally distributed. Next, suppose a random sample of 36 students is drawn. Let be the mean Test 3 score of such a sample. 8. Assume the mean of one such sample is 94.25. Find the sampling error...