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). 
Filename:  jacobi.zip 
ID:  8718 
Author:  Salvo MiccichÃ© (salvomic) 
Downloaded file size:  2,169 bytes 
Size on calculator:  2 KB 
Platforms:  Prime 
User rating:  10/10 with 1 vote (you must be logged in to vote) 
Primary category:  Math 
Languages:  ENG 
File date:  2017/11/02 21:53:06 
Creation date:  2017/11/02 
Source code:  Included 
Download count:  333 
Related files:  Elliptic Integrals

Version history:  2017/11/02: Added to site

Archive contents:  Length Date Time Name
   
3794 20171102 21:50 jacobi.html
2054 20171102 21:52 jacobi_fn.hpprgm
 
5848 2 files 

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