# How can I get a distribution with the same mean and variance but different skewness?

1. I have the mean, variance and skewness of skew-normal distributed random numbers.
2. I have the mean variance and skewness of any distribution of random numbers.

How can I have same mean and variance but different skewness?

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If your question is "how is it possible" to get different skewness:

As the first variable is a normal distribution, which is a symmetric one, while the other could be anything (e.g.: beta distribution), it is possible, that the second variable is assymetric, which makes the skewness differ of course, which measures the asymmetry of a variable.

If your question is "how can it be done" to get different skewness:

Generate an assymetric distribution with given mean and variance, so you will get a variable with the same mean and variance, but with different skewness. E.g. generate a beta distribution with and shapes in mind that the mean and variance of the generated variable will be around:

Of course any other assymetric distribution will work.

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we have skew normal distribution with location=0, scale =1 and shape =0 then it is same as standard normal distribution with mean 0 and variance 1.but if we change the shape parameter say shape=5 then mean and variance also changes.how can we fix mean and variance with different values of shape parameter? –  Amber Jan 11 '11 at 10:47
@Amber: I suppose skew normal distribution also have the corresponding formulas to compute mean and variance (to be obviuos and simple: en.wikipedia.org/wiki/Skew_normal_distribution). With those, as I suggested, you could manage to find the parameters you are interested in with given mean and variance. Well, three unknown parameter is bit harder to compute from 2 equations :) Better to use the beta or gamma distribution suggested by @John D. Cook. –  daroczig Jan 11 '11 at 21:46