Jacobi Elliptic Function

Description:Given Jacobi_fn(φ, m), where φ is the amplitude (φ=ASIN(x), where x is upper bound of Elliptic integral 1st kind expressed in other canonical form; the complete form has 0<=x<=1 or 0<=φ<=π/2); m=k^2 is the square of the eccentricity (0<=k<=1), this program returns a matrix where the first row present u (elliptic integral 1st kind in the sine integral –with φ– form), φ, m and the second row sn (amplitude sine), cn (amplitude cosine) and dn (delta amplitude).
Author:Salvo Micciché (salvomic)
Downloaded file size:2,169 bytes
Size on calculator:2 KB
User rating:10/10 with 1 vote (you must be logged in to vote)
Primary category:Math
File date:2017/11/02 21:53:06
Creation date:2017/11/02
Source code:Included
Download count:135
Related files:Elliptic Integrals
Version history:2017/11/02: Added to site
Archive contents:
  Length      Date    Time    Name
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     3794  2017-11-02 21:50   jacobi.html
     2054  2017-11-02 21:52   jacobi_fn.hpprgm
---------                     -------
     5848                     2 files
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