The normal distribution is symmetrical, so that 50% of the scores are above the mean and 50% of the scores are below the mean. Question 3 options: a) True b) False
The normal distribution is symmetrical, so that 50% of the scores are above the mean and...
In the normal distribution the area to the right of the mean is always 50%. True False
Which of the following statements cannot be true for a distribution of scores? 60% of the scores are above the mean. 60% of the scores are above the median. 60% of the scores are above the mode. All of the other options are false statements.
Use the normal distribution of IQ scores, which has a mean of 105 and a standard deviation of 13, and the following table with the standard scores and percentiles for a normal distribution to find the indicated quantity. Percentage of scores greater than 105 is _____ (Round to two decimal places as needed.) Standard score Percent -3 0.13 -2.5 0.62 -2 2.28 -1.5 6.68 -1 15.87 -0.9 18.41 -0.5 30.85 -0.1 46.02 0 50 0.1 53.98 0.5 69.15 0.9 81.59...
Question 7 1 pts The scores on Quiz 2 follows the normal distribution with a mean of 8 and a standard deviation of 0.5. (Round your answers to two decimal places).What is the probability that a randomly selected student has a score below 8? 0.95 0.05 O.50 0.45
1. A normal distribution of scores has a standard deviation of 10. Find the z-scores corresponding to each of the following values: a. A score that is 20 points above the mean. b. A score that is 10 points below the mean. c. A score that is 15 points above the mean. d. A score that is 30 points below the mean.
3. A normal distribution of BMCC MATSI scores has a standard deviation of 1.5. Find the z-scores corresponding to each of the following values: a. A score that is 3 points above the mean. b. A score that is 1.5 points below the mean. c. A score that is 2.25 points above the mean 4. Scores on BMCC fall 2017 MATI50.5 department final exam form a normal distribution with a mean of 70 and a standard deviation of 8. What...
Hello I have a couple questions A distribution of raw scores with respect to x has a mean (x̅ x) of 55 and a standard deviation (sx) of 4. Convert a raw score (x) of 50 into a z score from this distribution. zx = a. 1 b. -1.25 c. 1.25 d. -2.50 e. 2.50 2. With respect to any distribution of standard scores (a non-normal or a normal distribution of z scores), the mean of the distribution is equal...
Use the normal distribution of IQ scores, which has a mean of 125 and a standard deviation of 11,and the following table with the standard scores and percentiles for a normal distribution to find the indicated quantity. Percentage of scores greater than 152.5 is ___ % Standard score Percent -3 0.13 -2.5 0.62 -2 2.28 -1.5 6.68 -1 15.87 -0.9 18.41 -0.5 30.85 -0.1 46.02 0 50 0.1 53.98 0.5 69.15 0.9 81.59 1 84.13 1.5 93.32 2 97.72 2.5...
6. Area under the normal distribution The following figure shows the normal distribution with the proportion of the area under the normal curve contained within one, two, and three standard deviations of the mean. The last proportion on each side, 0.13%, depicts the remaining area under the curve. Specifically, 0.13% of the area under the standard normal distribution is located above z-score values greater than the mean (u) plus three standard deviations (+30). Also, because the normal distribution is symmetrical,...
Question 9 1 pts The scores on Quiz 2 follows the normal distribution with a mean of 8 and a standard deviation of 0.5. What is the probability that a randomly selected student has a score between 8 and 10? 0.95 0.96 ..50 0.99