The discussion centers around the significance of the standard deviation in the exponential distribution, particularly in comparison to the standard deviation in the normal distribution. Participants explore the implications of the standard deviation being equal to the mean in the context of probability and distribution characteristics.
Participants express varying views on the implications of the standard deviation in different distributions, with some agreeing on its significance while others question the concept of 'standard distributions' due to differing probabilities. The discussion remains unresolved regarding the interpretation of these differences.
Participants reference the '68-95-99.7' rule specific to the normal distribution, highlighting the lack of similar exact probabilities for the exponential distribution. There is also mention of the need for clarity on what constitutes a 'standard distribution' given the variability in probabilities across different distributions.
Yes.oneamp said:Thank you. Additionally, is it true that the standard deviation for an exponential distribution is the same as the mean?
Yes, 0<X<2u would be the range of X that represents "within one standard deviation of the mean". The probabilities are quite different from the '68-95-99.7' rule of the normal distribution. For the exponential, the probability of 0<X<2u is 1-e^-2 = 0.865, not 0.68. The probabilities of 1, 2, and 3 standard deviations from the mean are 0.865, 0.95, and 0.98, respectively.Does this imply that the first standard deviation for an exponential distribution is, on either side of the mean 'u', 0 - u, and u - 2u?