For a symmetrical bell-shaped curve, - the probability of a data point being within +/- one standard deviation is 68%. - the probability of a data point being within +/- two standard
SOLVED: The Empirical Rule says that for bell-shaped symmetric distributions, approximately 68% of the data fall within one standard deviation away from the mean. Where is this number 68% coming from? For
The empirical rules states that: a. .% of data in symmetrical distribution will fall within one standard deviation of the mean. b. .% of data in symmetrical distribution will fall within two
SOLVED: The Empirical Rule says that for bell-shaped symmetric distributions, approximately 68% of the data fall within one standard deviation away from the mean. Where is this number 68% coming from? For
1. The Empirical Rule applies only to approximately normal or bell-shaped distributions. 2. The Empirical Rule states that approximately 65% of the data lies within one standard deviation of the mean, 98%
The shape of this distribution is ______. a. symmetric b. bimodal c. right skewed d. left skewed e. normal
SOLVED: The Empirical Rule says that for bell-shaped symmetric distributions, approximately 68% of the data fall within one standard deviation away from the mean. Where is this number 68% coming from? For
SOLVED: The Empirical Rule says that for bell-shaped symmetric distributions, approximately 68% of the data fall within one standard deviation away from the mean. Where is this number 68% coming from? For
What is the shape of the distribution for the following set of data?, X, f, 5, 1, 4, 1, 3, 2, 2, 4, 1, 5 A)Symmetrical B)Positively skewed C)Negatively skewed D)Normal
IQ scores have a bell-shaped distribution with a mean of 100 and a standard deviation of 15. Draw the distribution.