On 12 Mar 2004 at 13:40, Veera wrote: The right place to look for this things are "Handbook of mathematical Functions", Milton Abramowitz and Irene A. Stegun. (which indeed has it)
Kjetil Halvorsen > > Hi, > Does anyone know if there is a accurate analytic approximation to the > Standard Normal CDF. I am looking to evaluate an expression > analytically and need an approximation of the CDF (or possible the > error function). > > Any help or pointers to the references is highly appreciated. > > thanks, > -Veera > > . > . > ================================================================= > Instructions for joining and leaving this list, remarks about the > problem of INAPPROPRIATE MESSAGES, and archives are available at: . > http://jse.stat.ncsu.edu/ . > ================================================================= . . ================================================================= Instructions for joining and leaving this list, remarks about the problem of INAPPROPRIATE MESSAGES, and archives are available at: . http://jse.stat.ncsu.edu/ . =================================================================
