The scores on a statistics exam had an approximately normal distribution, with a mean of 73 and standard deviation of 7.2. If a single student is chosen at random, what is the probability their score is less than 74?
The scores on a statistics exam had an approximately normal distribution, with a mean of 73...
Suppose that scores on a statistics exam are normally distributed with a mean of 77 and a standard deviation of 4. Find the probability of a student scoring less than 80 on the exam using the following steps. (a) What region of the normal distribution are you looking to find the area of? (to the left of a zscore, to the right of a z-score, between two z-scores, or to the left of one z-score and to the right of...
Statistics exam scores follow a standard normal distribution with mean 0 and standard deviation 1. Find each of the following probabilities of the given scores. (a)Less than 2.71 (b)Greater than -0.96 (c)Less than -2.18 (c)Between -1.30 and 0.45 (d)Find the 75th percentile of these Statistics exam scores. (e) Find the Statistics exam scores that can be used as cutoff values separating the most extreme (high and low) 2% of all scores.
Student scores on Professor Combs' Stats final exam are normally distributed with a mean of 72 and a standard deviation of 7.2 Find the probability of the following: (use 4 decimal places) a) The probability that one student chosen at random scores above an 77 b) The probability that 10 students chosen at random have a mean score above an 77 c) The probability that one student chosen at random scores between a 67 and an 77 d) The probability...
Scores on an exam follow an approximately Normal distribution with a mean of 76.4 and a standard deviation of 6.1 points. What percent of students scored below 70 points?
The midterm scores for undergraduate statistics students were distributed as a normal distribution and they had the following statistics: a mean of 88 and a standard deviation of 4. If 2 extra points were added to each student's score, the mean is _____ and the standard deviation is _____. If all scores were increased by 25%, the mean is _____ and the standard deviation is _____.
The final exam scores in a statistics class were normally distributed with a mean of 70 and a standard deviation of 2. If you select a student at random, what is the probability that he scored between a 66 and a 74? A.2.5% B.50% C. 68% C. 95% D. none of the above
Example 3 The scores on a midterm exam follow a normal distribution with an average of 80.4% and a standard deviation of 10.9%. Let X represent the score of a given student on this midterm exam. 1. What is the probability that a randomly selected student scores above a 90%? 2. What is the probability that a randomly selected student scores between 80% and 90%? 3. What is the 60th percentile score for this midterm exam?
Statistics Question... (10 pts) If the mean exam score of a class was 75%, with a standard deviation of 15%, what percent of students would be expected score at or higher than 92%? Assume that the distribution of the scores is normal and the variable is random 7.
Assume that verbal scores on the SAT exam have a normal distribution with a population mean of 500 points and a population standard deviation of 100. 8. What is the probability that a randomly chosen makes at least 510 but no more than 620? a. 0.2145 b. 0.2422 c. 0.2850 d. 0.3451 e. 0.4247
The distribution of scores for the 1,000 final exams in a statistics course has a population mean of 74 and a population standard deviation of 15. A random sample of 36 exam papers is selected. What is the probability that the sample mean is higher than 77? (a) 0.1100 (b) 0.2151 (c) 1131 (d)1151