Math 100 test scores are normally distributed with a mean of 75 and a standard deviation...
Assume math scores on the SAT are normally distributed with a mean of 500 and a standard deviation of 100. a. What is the probability that one randomly selected individual taking the sat will have a Math score of more than 530? b. What is the probability that one randomly selected individual taking the SAT will have a Math score between 450 and 600?c. Find the 60th percentile of these scores.
Scores on a test are normally distributed with a mean of 70 and standard deviation of 10. Applying the Empirical Rule, we would expect the middle 95% of scores to fall between what two values? 40 and 100 50 and 90 55 and 85 60 and 80 65 and 75
1) The Math 100 test grades are normally distributed with a mean of O and a standard deviation of 1. Find the probability of selecting a student having a grade: a. Less than 1.25 b. Between - 1.0 and 1.59 c. Greater than 1.35 d. Find Pro the test score that is the 70 percentile
5. Suppose a set of math test scores is normally distributed with a mean of 100 (you do not need to know the standard deviation to answer this question, but you may find it helpful to plug in a standard deviation of your choice). If you randomly select a sample of scores from this distribution, which of the following probabilities is higher? Explain your answer. • The probability of the sample mean falling between 100 and 105 with a sample...
all questions. Do not round answers 1. IQ scores are normally distributed with a mean of 100 and a standard deviation of 15. a. What percentage of scores is between 55 and i 15? b. In a group of 20,000 randomly selected individuals, how many have an IQ score of 130 or more? 2. A Honda Civic has its gas mileage (in miles per gallon, or mpg) normally distributed, with a mean of 33 mpg and a standard deviation of...
A 100-item test has a mean of 75 and standard deviation of 10. Assuming the scores are normally distributed determine the raw score (rounded to the nearest integer) corresponding to the 25th percentile. (Fill in the corresponding blanks)
Scores on an exam are normally distributed with a mean of 65 and a standard deviation of 9. Find the percent of the scores that satisfies the following: (a) Less than 54 (b) At least 80 (c) Between 70 and 86
The mean and standard deviation of SAT math exam scores were 527 and 120, respectively, in 2017. Assume that the scores are normally distributed and answer the following questions. a. Find the 30th percentile. b. If your score is 700, what percentage of the students got higher scores than you in 2017? c. What percentage of students got SAT math scores from 400 to 600? d. If your score is 650, what is the percentile of your score?
14. SAT scores are normally distributed with mean = 500 and standard deviation - 100. (Provide your answer and show your steps) (.) What is the SAT score of the 85 percentile? (5 points) What is the probability to score between 430 and 530? (6 points)
Scores on a test are normally distributed with a mean of 65 and a standard deviation of 10. Find the score to the nearest whole number which separates the bottom 81% from the top 19%. A. 88 B. 68 C. 56 D 74