Template:Two parameter exp distribution: Difference between revisions

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(Created page with '===The Two-Parameter Exponential Distribution=== The two-parameter exponential ''pdf'' is given by: ::<math>f(T)=\lambda {{e}^{-\lambda (T-\gamma )}},f(T)\ge 0,\lambda >0,T\ge 0…')
 
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===The Two-Parameter Exponential Distribution===
#REDIRECT [[The Exponential Distribution]]
The two-parameter exponential ''pdf'' is given by:
 
::<math>f(T)=\lambda {{e}^{-\lambda (T-\gamma )}},f(T)\ge 0,\lambda >0,T\ge 0\text{ or }\gamma </math>
 
where <math>\gamma </math> is the location parameter.
Some of the characteristics of the two-parameter exponential distribution are [19]:
#The location parameter, <math>\gamma </math>, if positive, shifts the beginning of the distribution by a distance of <math>\gamma </math> to the right of the origin, signifying that the chance failures start to occur only after <math>\gamma </math> hours of operation, and cannot occur before.
#The scale parameter is <math>\tfrac{1}{\lambda }=\bar{T}-\gamma =m-\gamma </math>.
#The exponential <math>pdf</math> has no shape parameter, as it has only one shape.
#The distribution starts at <math>T=\gamma </math> at the level of <math>f(T=\gamma )=\lambda </math> and decreases thereafter exponentially and monotonically as <math>T</math> increases beyond <math>\gamma </math> and is convex.
#As <math>T\to \infty </math>, <math>f(T)\to 0</math>.
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{{one parameter exp distribution}}

Latest revision as of 10:10, 9 August 2012

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