What percent of scores in a normal distribution will fall between the mean and -1 standard deviation?
What percent of scores in a normal distribution will fall between the mean and -1 standard...
Question 3 1 pts Under the normal curve, approximately what percent of scores fall between and -1 to +1 standard deviations around the mean? 14% O 34% 68% 0 95% Question 7 1 pts If a distribution has a mean of 50 and a standard deviation of 5, what value would be -1 standard deviations from the mean? O O O O
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...
The distribution is normal, the mean is 300 and the standard deviation is 100. What percent of scores li e below 100? 47.72 2.28 0.0228 97.72
27. On a standardized test with a normal distribution, the mean was 64.3 and the standard deviation was 5.4. What is the best approximation of the percent of scores that fell between 61.6 and 75.1? 28. The mean of a normally distributed set of data is 52 and the standard deviation is 4. Approximately 95% of all the cases will lie between which measures? 29. Battery lifetime is normally distributed for large samples. The mean lifetime is 500 days and...
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...
The distribution is normal, the mean is 500 and the standard deviation is 100. What percent of counts will lie between 600 and 700? 97.72 13.59 0.9772 0.1359
A normal distribution of scores has a mean of 240 and a standard deviation of 40. 1. What score separates the top 40% of the scores from the rest? 2. What score corresponds to the 90th percentile?
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...
(1 point) The distribution of IQ scores can be modeled by a normal distribution with mean 100 and standard deviation 15. (a) Let x be a person's IQ score. Write the formula for the density function of IQ scores. p(x) = (b) Estimate the fraction of the population with IQ between 80 and 85. fraction =
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.