Template:Effect of beta on the cdf: Difference between revisions

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[[Image:WB.8 effect of weibull.png|center|400px| Effect on <math>\beta</math> on the <math>cdf</math> on the Weibull probability plot with a fixed value of <math>\eta</math> ]]
[[Image:WB.8 effect of weibull.png|center|300px| Effect on <math>\beta</math> on the <math>cdf</math> on the Weibull probability plot with a fixed value of <math>\eta</math> ]]
   
   
The above figure shows the effect of the value of <span class="texhtml">β</span> on the <math>cdf</math>, as manifested in the Weibull probability plot. It is easy to see why this parameter is sometimes referred to as the slope. Note that the models represented by the three lines all have the same value of <span class="texhtml">η</span>. The following figure shows the effects of these varied values of <span class="texhtml">β</span> on the reliability plot, which is a linear analog of the probability plot.
The above figure shows the effect of the value of <span class="texhtml">β</span> on the <math>cdf</math>, as manifested in the Weibull probability plot. It is easy to see why this parameter is sometimes referred to as the slope. Note that the models represented by the three lines all have the same value of <span class="texhtml">η</span>. The following figure shows the effects of these varied values of <span class="texhtml">β</span> on the reliability plot, which is a linear analog of the probability plot.


[[Image:WB.8 weibull reliability.png|center|400px| The effect of values of <math>\beta</math> on the Weibull reliability plot. ]]
[[Image:WB.8 weibull reliability.png|center|250px| The effect of values of <math>\beta</math> on the Weibull reliability plot. ]]
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Revision as of 18:01, 25 April 2012

The Effect of β on the [math]\displaystyle{ cdf }[/math] and Reliability Function


Effect on [math]\displaystyle{ \beta }[/math] on the [math]\displaystyle{ cdf }[/math] on the Weibull probability plot with a fixed value of [math]\displaystyle{ \eta }[/math]

The above figure shows the effect of the value of β on the [math]\displaystyle{ cdf }[/math], as manifested in the Weibull probability plot. It is easy to see why this parameter is sometimes referred to as the slope. Note that the models represented by the three lines all have the same value of η. The following figure shows the effects of these varied values of β on the reliability plot, which is a linear analog of the probability plot.

The effect of values of [math]\displaystyle{ \beta }[/math] on the Weibull reliability plot.


  • R(t) decreases sharply and monotonically for 0 < β < 1 and is convex.
  • For β = 1, R(t) decreases monotonically but less sharply than for 0 < β < 1 and is convex.
  • For β > 1, R(t) decreases as increases. As wear-out sets in, the curve goes through an inflection point and decreases sharply.