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| | #REDIRECT [[Template:WebNotes/Weibull%2B%2BStandard_Folio_Data_1P-Weibull]] |
| {{WeibullSideBar|Weibull++ Standard Folio <br> Weibull One Parameter|
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| <math> f(T)={ \frac{C}{\eta }}\left( {\frac{T}{\eta }}\right) ^{C-1}e^{-\left( {\frac{T}{ \eta }}\right) ^{C}} \,\!</math>
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| }}
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| * Only the scale parameter (eta) is estimated from data. You will be prompted to specify the shape parameter value.
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| * With the one-parameter Weibull, we assume that the shape parameter is Constant and known ''a priori''. The advantage of doing this is that data sets with few or no failures can be analyzed.
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| * See [http://www.reliawiki.com/index.php/The_Weibull_Distribution The Weibull Distribution]
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