WeibullCDF
Contents
Function
\[y=\begin{cases} y_0+A_1\int_{0}^{x}ba^{-b}t^{b-1}e^{-\left (\frac{t}{a}\right)^b}dt=y_0+A_1\left ( 1- e^{-\left (\frac{x}{a}\right)^b}\right )&x>0\\ y_0 & x\leq 0 \end{cases}\]
Brief Description
Weibull cumulative distribution function
Sample Curve
Parameters
Number: 4
Names: y0, A1, a, b
Meanings: y0 = offset, A1 = Amplitude, a = Scale, b = Shape
Lower Bounds: A1 > 0.0, a > 0.0, b> 0.0
Upper Bounds: none
Derived Parameters
Mean: mu=a*gamma(1+1/b)
Standard Deviation: sigma=a*sqrt( gamma(1+2/b)-(gamma(1+1/b))^2 )
Script Access
wblcdf(x, a, b)
Function File
FITFUNC\WeibullCDF.fdf
Category
Statistics