for the following data set, calculate the percentage
of data points that will fall within one standard deviation of the
mean, and compare the result to the expected percentage of a normal
distribution
(50,46,54,51,29,52,48,54,47,48)
TOPIC: Percentage of data that will fall within the one standard deviation of the mean.
for the following data set, calculate the percentage of data points that will fall within one...
Assuming a normal distribution, what percentage of measurements will fall within the range of the mean ± 2 σ, where refers to the population standard deviation?
15.When a distribution is bell-shaped, approximately what percentage of data values will fall within 1 standard deviation of the mean? a. 50% c. 95% b. 68% d. 99.7% 21. If the mode is to the left of the median and the mean is to the right of the median, then the distribution is _________ skewed.
For normally distributed data, what is the probability that a data point wil fall within one standard deviation of the mean? (i) 50% (ii) 68% 0 (iii) 95% (iv) 99.7% s save Submt Assignment For normally distributed data, what is the probability that a data point will fall within one standard deviation of the mean? 0 (i) 50% @ (u) 68% 0 (m) 95% (w) 99.7% Subme Assignment Quit& Save 6
For a standard normal distribution, find the percentage of data that are within 1.5 standard deviations from the mean. Group of answer choices Question 1 0.11 pts For a standard normal distribution, find the percentage of data that are within 1.5 standard deviations from the mean. 43.32% 86.64% 93.32% 6.68%
__________ can be used to determine the percentage of data values that must be within one, two, and three standard deviations of the mean for data having a bell-shaped distribution.
data valu es in a 7. The 68-95-99.7 rule for normal distributions states that 95% of the mally distributed data set will be within 2 standard deviations of the mear Generate numbers with a distribution that has fewer than 95% of the data values within 2 standard deviations of the mean. Can you generate a set that has many fewer than 95% of the data values within 2 standard deviations of the mean? How small can you make that percentage?...
Use Chebyshev's theorem to determine at least what percentage of data values fall between 13 and 99 for a distribution with a mean of 56 and a standard deviation of 24.
QUESTION 8 According to the Emprical Rule, what approximately what percentage of observations should lie within one standard deviation of the mean for a normal distribution? (3 points) 6596 6896 о 80% о 95% All or nearly all observations
A set of data has a normal distribution with a mean of 47 and a standard deviation of 9. Find the percent of data within the following interval. from 38 to 56 The percent of data within the given interval is»%. (Type an integer or a decimal.)
The Empirical Rule Based on Data Set 1" Body Data" in appendix B, blood platelet counts of women have a bell shaped distribution with a mean of 255.1 and a standard deviation of 65.4.(All units are 1000 cells/L.) Using the empirical rule: [Sketch the normal curve first] 1. idth ths 2 a. of women with platelet counts are within two standard deviation of the mean? The values are from ( b.- % of women with platelet counts are within one...