Weibull++ Standard Folio Data Gamma: Difference between revisions
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The gamma distribution is a flexible life distribution model that may offer a good fit to some sets of failure data. It is not, however, widely used as a life distribution model for common failure mechanisms. The gamma distribution does arise naturally as the time-to-first-fail distribution for a system with standby exponentially distributed backups, and is also a good fit for the sum of independent exponential random variables. The gamma distribution is sometimes called the Erlang distribution, which is used frequently in queuing theory applications. [32] | The gamma distribution is a flexible life distribution model that may offer a good fit to some sets of failure data. It is not, however, widely used as a life distribution model for common failure mechanisms. The gamma distribution does arise naturally as the time-to-first-fail distribution for a system with standby exponentially distributed backups, and is also a good fit for the sum of independent exponential random variables. The gamma distribution is sometimes called the Erlang distribution, which is used frequently in queuing theory applications. [32] | ||
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| align="center" valign="middle" | [http://reliawiki.com/index.php/Template:Gamma_weibull_distribution | | align="center" valign="middle" | [http://reliawiki.com/index.php/Template:Gamma_weibull_distribution Gamma Distribution] | ||
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| align="center" valign="middle" | [http://www.reliawiki.com/index.php/Template:Gamma_distribution_example See Examples...] | | align="center" valign="middle" | [http://www.reliawiki.com/index.php/Template:Gamma_distribution_example See Examples...] | ||
Revision as of 16:42, 24 January 2012
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Reliability Web Notes |
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| Standard Folio Gamma |
| Weibull++ |
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The gamma distribution is a flexible life distribution model that may offer a good fit to some sets of failure data. It is not, however, widely used as a life distribution model for common failure mechanisms. The gamma distribution does arise naturally as the time-to-first-fail distribution for a system with standby exponentially distributed backups, and is also a good fit for the sum of independent exponential random variables. The gamma distribution is sometimes called the Erlang distribution, which is used frequently in queuing theory applications. [32] |
| Gamma Distribution |
| See Examples... |
