Template:Weibull reliable life: Difference between revisions

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::<math> T_{R}=\gamma +\eta \cdot \left\{ -\ln ( R ) \right\} ^{ \frac{1}{\beta }} </math>  
::<math> T_{R}=\gamma +\eta \cdot \left\{ -\ln ( R ) \right\} ^{ \frac{1}{\beta }} </math>  


This is the life for which the unit/item will be functioning successfully with a reliability of <math> R \,\!</math>. If ''R''=0.50, then <math> T_{R}=\breve{T} </math>, the median life, or the life by which half of the units will survive.
This is the life for which the unit/item will be functioning successfully with a reliability of ''R''. If ''R''=0.50, then <math> T_{R}=\breve{T} </math>, the median life, or the life by which half of the units will survive.

Revision as of 21:34, 9 February 2012

The Weibull Reliable Life

The reliable life, [math]\displaystyle{ T_{R} \,\! }[/math], of a unit for a specified reliability, R, starting the mission at age zero, is given by:

[math]\displaystyle{ T_{R}=\gamma +\eta \cdot \left\{ -\ln ( R ) \right\} ^{ \frac{1}{\beta }} }[/math]

This is the life for which the unit/item will be functioning successfully with a reliability of R. If R=0.50, then [math]\displaystyle{ T_{R}=\breve{T} }[/math], the median life, or the life by which half of the units will survive.