Encyclopedia > Weibull distribution

  Article Content

Weibull distribution

In probability theory and statistics, the Weibull distribution (named after Wallodi Weibull[?]) is a continuous probability distribution with the probability density function

<math> f(x) = \frac{k x^{k-1}}{\lambda^k} e^{-(x/\lambda)^k} \qquad \mbox{for } x>0</math>

where k >0 is the shape parameter and λ > 0 is the scale parameter of the distribution.

The Exponential distribution (when k = 1) and Rayleigh distribution (when k = 2) are two special cases of the Weibull distribution.

Weibull distributions are often used to model the time until a given technical device fails. If the failure rate of the device decreases over time, one chooses k < 1 (resulting in a decreasing density f). If the failure rate of the device is constant over time, one chooses k = 1, again resulting in a decreasing function f. If the failure rate of the device increases over time, one chooses k > 1 and obtains a density f which increases towards a maximum and then decreases forever. Manufacturers will often supply the shape and scale parameters for the lifetime distribution of a particular device. The Weibull distribution can also be used to model the distribution of wind speeds at a given location on Earth. Again, every location is characterized by a particular shape and scale parameter.

The expected value and standard deviation of a Weibull random variable can be expressed in terms of the gamma function:

E(X) = λ Γ(1 + 1 / k) and

var(X) = λ2[Γ(1 + 2 / k) - Γ2(1 + 1 / k)]



All Wikipedia text is available under the terms of the GNU Free Documentation License

 
  Search Encyclopedia

Search over one million articles, find something about almost anything!
 
 
  
  Featured Article
Islandia, New York

... 0.13% Native American, 6.05% Asian, 0.03% Pacific Islander, 4.94% from other races, and 2.91% from two or more races. 19.10% of the population are Hispanic or Latino of any ...

 
 
 
This page was created in 22.1 ms