Template:2ndhalfofWB: Difference between revisions
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<br> | <br>'''Note''' that this is not the same as the so called WeiBayes model. The so called WeiBayes model is really a one-parameter Weibull distribution. It assumes a fixed value (constant) for the shape parameter and solves for the scale parameter. The Weibull-Bayesian model in Weibull++ is actually a true WeiBayes model and offers an alternative to the one-parameter Weibull by including the variation and uncertainty that is present in the prior estimation of the shape parameter. <br> | ||
'''Note''' that this is not the same as the so called WeiBayes model. | |||
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The Weibull-Bayesian distribution and its characteristics are presented in | The Weibull-Bayesian distribution and its characteristics are presented in detail in the [[Weibull-Bayesian Analysis]] section in [[The Weibull Distribution|Chapter 8]]. | ||
Revision as of 20:06, 11 March 2012
Note that this is not the same as the so called WeiBayes model. The so called WeiBayes model is really a one-parameter Weibull distribution. It assumes a fixed value (constant) for the shape parameter and solves for the scale parameter. The Weibull-Bayesian model in Weibull++ is actually a true WeiBayes model and offers an alternative to the one-parameter Weibull by including the variation and uncertainty that is present in the prior estimation of the shape parameter.
The Weibull-Bayesian distribution and its characteristics are presented in detail in the Weibull-Bayesian Analysis section in Chapter 8.