P Index Page
Keyword Index for the NAG Library Manual
NAG Library Manual

Keyword : Probability

G01EEF   Computes upper and lower tail probabilities and probability density function for the beta distribution
G01EMF   Computes probability for the Studentized range statistic
G01ERF   Computes probability for von Mises distribution
G01HAF   Computes probability for the bivariate Normal distribution
G01JCF   Computes probability for a positive linear combination of χ2 variables
G01JDF   Computes lower tail probability for a linear combination of (central) χ2 variables
G01KAF   Calculates the value for the probability density function of the Normal distribution at a chosen point
G01KFF   Calculates the value for the probability density function of the gamma distribution at a chosen point
G01KKF   Computes a vector of values for the probability density function of the gamma distribution
G01KQF   Computes a vector of values for the probability density function of the Normal distribution
G01LBF   Computes a vector of values for the probability density function of the multivariate Normal distribution
G01SAF   Computes a vector of probabilities for the standard Normal distribution
G01SBF   Computes a vector of probabilities for the Student's t-distribution
G01SCF   Computes a vector of probabilities for χ2 distribution
G01SDF   Computes a vector of probabilities for F-distribution
G01SEF   Computes a vector of probabilities for the beta distribution
G01SFF   Computes a vector of probabilities for the gamma distribution
G08CJF   Calculates the Anderson–Darling goodness-of-fit test statistic and its probability for the case of uniformly distributed data
G08CKF   Calculates the Anderson–Darling goodness-of-fit test statistic and its probability for the case of a fully-unspecified Normal distribution
G08CLF   Calculates the Anderson–Darling goodness-of-fit test statistic and its probability for the case of an unspecified exponential distribution

P Index Page
Keyword Index for the NAG Library Manual
NAG Library Manual

© The Numerical Algorithms Group Ltd, Oxford UK. 2013