Function fisherCDFR
The Fisher distribution, its complement, and inverse.
double fisherCDFR
(
double x,
double df1,
double df2
);
The F density function (also known as Snedcor's density or the variance ratio density) is the density of x = (u1/df1)/(u2/df2), where u1 and u2 are random variables having χ,2 distributions with df1 and df2 degrees of freedom, respectively.
fisherCDF returns the area from zero to x under the F density function. The complementary function, fisherCDFR, returns the area from x to ∞ under the F density function.
The inverse of the complemented Fisher distribution, invFisherCDFR, finds the argument x such that the integral from x to infinity of the F density is equal to the given probability y.
Parameters
Name | Description |
---|---|
df1 | Degrees of freedom of the first variable. Must be >= 1 |
df2 | Degrees of freedom of the second variable. Must be >= 1 |
x | Must be >= 0 |