The type double function is imsls_d_complementary_t_cdf.
Required Arguments
floatt (Input) Argument for which Pr(x > t) is to be evaluated.
floatdf (Input) Degrees of freedom. Argument df must be greater than or equal to 1.0.
Return Value
The probability that a Student’s t random variable takes a value greater than t.
Description
Function imsls_f_complementary_t_cdf evaluates one minus the distribution function of a Student’s t random variable with ν = df degrees of freedom. If t2≥ν, the following identity relating the complementary Student’s t cumulative distribution function, denoted by , to the incomplete beta ratio function is used:
where
and
If t2 < ν, the solution space is partitioned into four algorithms as follows: If ν≥ 64 and t2/ν≤ 0.1, a Cornish-Fisher expansion is used to evaluate the distribution function. If ν < 64 and an integer and |t| < 2.0, a trigonometric series is used (see Abramowitz and Stegun 1964, Equations 26.7.3 and 26.7.4 with some rearrangement). If ν < 64 and an integer and |t| ≥ 2.0, a series given by Hill (1970) that converges well for large values of t is used. For the remaining t2 < ν cases, is calculated using the identity:
where
This function provides higher right tail accuracy for the Student's t distribution.
Figure 11.20 — Plot of Ft(t, df)
Example
This example finds the 2-tail probability that a Student’s t random variable exceeds 2.447.