# Difference between revisions of "InverseWeibull Command"

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− | <noinclude>{{Manual Page|version= | + | <noinclude>{{Manual Page|version=5.0}}</noinclude>{{command|probability}} |

− | {{command|probability}} | + | ;InverseWeibull( <Shape>, <Scale>, <Probability> ) |

− | ;InverseWeibull | + | :Computes the inverse of cumulative distribution function of [[w:Weibull distribution|Weibull distribution]] at ''p'', where the Weibull distribution is given by shape parameter ''k'' and scale parameter ''λ''.<br> In other words, finds ''t'' such that ''P(X ≤ t) = p'', where ''X'' is random variable with Weibull distribution. <br>Probability ''p'' must be from [0,1]. |

− | :Computes the inverse of cumulative distribution function of [[w:Weibull distribution|Weibull distribution]] at ''p'', where the Weibull distribution is given by shape parameter ''k'' and scale parameter ''λ''. In other words, finds ''t'' such that ''P(X ≤ t) = p'', where ''X'' is random variable with Weibull distribution. Probability ''p'' must be from [0,1]. |

## Latest revision as of 17:15, 7 October 2017

- InverseWeibull( <Shape>, <Scale>, <Probability> )
- Computes the inverse of cumulative distribution function of Weibull distribution at
*p*, where the Weibull distribution is given by shape parameter*k*and scale parameter*λ*.

In other words, finds*t*such that*P(X ≤ t) = p*, where*X*is random variable with Weibull distribution.

Probability*p*must be from [0,1].