JacobiSC
JacobiSC[u,m]
gives the Jacobi elliptic function 
.
Details
- Mathematical function, suitable for both symbolic and numerical manipulation.
, where 
. 
is a doubly periodic function in 
with periods 
and 
, where 
is the elliptic integral EllipticK.- JacobiSC is a meromorphic function in both arguments.
- For certain special arguments, JacobiSC automatically evaluates to exact values.
- JacobiSC can be evaluated to arbitrary numerical precision.
- JacobiSC automatically threads over lists.
Examples
open allclose allBasic Examples (4)
Scope (34)
Numerical Evaluation (5)
Evaluate numerically to high precision:
The precision of the output tracks the precision of the input:
Evaluate for complex arguments:
Evaluate JacobiSC efficiently at high precision:
Compute average case statistical intervals using Around:
Compute the elementwise values of an array:
Or compute the matrix JacobiSC function using MatrixFunction:
Specific Values (3)
![(d)/(dx)TemplateBox[{x, {1, /, 3}}, JacobiSC]=0](Files/JacobiSC.en/9.png "(d)/(dx)TemplateBox[{x, {1, /, 3}}, JacobiSC]=0"){kind=small}
Visualization (3)
![TemplateBox[{z, {1, /, 2}}, JacobiSC]](Files/JacobiSC.en/11.png "TemplateBox[{z, {1, /, 2}}, JacobiSC]"){kind=small}
![TemplateBox[{z, {1, /, 2}}, JacobiSC]](Files/JacobiSC.en/12.png "TemplateBox[{z, {1, /, 2}}, JacobiSC]"){kind=small}
Function Properties (8)
JacobiSC is ![2TemplateBox[{m}, EllipticK]](Files/JacobiSC.en/13.png "2TemplateBox[{m}, EllipticK]"){kind=small}
-periodic along the real axis:
JacobiSC is ![4ⅈTemplateBox[{{1, -, m}}, EllipticK]](Files/JacobiSC.en/14.png "4ⅈTemplateBox[{{1, -, m}}, EllipticK]"){kind=small}
-periodic along the imaginary axis:
JacobiSC is an odd function in its first argument:
![TemplateBox[{x, m}, JacobiSC]](Files/JacobiSC.en/15.png "TemplateBox[{x, m}, JacobiSC]"){kind=small}
is an analytic function of 
for 
:
It is not, in general, analytic:
It has both singularities and discontinuities for 
:
![TemplateBox[{x, 3}, JacobiSC]](Files/JacobiSC.en/19.png "TemplateBox[{x, 3}, JacobiSC]"){kind=small}
is neither nondecreasing nor nonincreasing:
JacobiSC is not injective for any fixed 
![TemplateBox[{x, m}, JacobiSC]](Files/JacobiSC.en/22.png "TemplateBox[{x, m}, JacobiSC]"){kind=small}
JacobiSC is neither non-negative nor non-positive:
JacobiSC is neither convex nor concave:
Differentiation (3)
Series Expansions (3)
![TemplateBox[{x, {1, /, 3}}, JacobiSC]](Files/JacobiSC.en/27.png "TemplateBox[{x, {1, /, 3}}, JacobiSC]"){kind=small}
Plot the first three approximations for ![TemplateBox[{x, {1, /, 3}}, JacobiSC]](Files/JacobiSC.en/28.png "TemplateBox[{x, {1, /, 3}}, JacobiSC]"){kind=small}
around 
:
![TemplateBox[{1, m}, JacobiSC]](Files/JacobiSC.en/30.png "TemplateBox[{1, m}, JacobiSC]"){kind=small}
Plot the first three approximations for ![TemplateBox[{1, m}, JacobiSC]](Files/JacobiSC.en/31.png "TemplateBox[{1, m}, JacobiSC]"){kind=small}
around 
:
JacobiSC can be applied to a power series:
Function Identities and Simplifications (3)
Parity transformation and periodicity relations are automatically applied:
Identity involving JacobiNC:
Function Representations (3)
Representation in terms of Tan of JacobiAmplitude:
Relation to other Jacobi elliptic functions:
TraditionalForm formatting:
Applications (3)
Properties & Relations (3)
Compose with inverse functions:
Use PowerExpand to disregard multivaluedness of the inverse function:
Solve a transcendental equation:
JacobiSC can be represented with related elliptic functions:
Text
Wolfram Research (1988), JacobiSC, Wolfram Language function, https://reference.wolfram.com/language/ref/JacobiSC.html.
CMS
Wolfram Language. 1988. "JacobiSC." Wolfram Language & System Documentation Center. Wolfram Research. https://reference.wolfram.com/language/ref/JacobiSC.html.
APA
Wolfram Language. (1988). JacobiSC. Wolfram Language & System Documentation Center. Retrieved from https://reference.wolfram.com/language/ref/JacobiSC.html