Rayleigh Distribution for the Probability Distribution Calculator
- Density Function
- The Rayleigh distribution has the probability density function:
f(x) = x/b2 * e^[-(x2/2b2)], for 0 <= x < ∞, b > 0
where
- Distribution Function
- The cumulative distribution function (the term was first introduced by Wilks, 1943) for the Rayleigh distribution is:
F(x) = 1 - e^[-(x2/2b2)]
- R
- This field displays the current variate value for the Rayleigh distribution. When you edit this value (either manually or with the microscrolls), Statistica computes the associated p-value for the specified scale parameter.
- p
- This field displays the p-value computed from the specified variate value and scale parameter or you can enter a desired p-value (either manually or edit the existing value with the microscrolls) and compute the critical value of the distribution for the specified parameter.
- Scale
- Specify here the scale parameter of the distribution, b. If this parameter is changed, then the p-value will be recomputed based on the respective variate value.
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