Wolfram Researchfunctions.wolfram.comOther Wolfram Sites
Search Site
Function CategoriesGraphics GalleryNotationsGeneral IdentitiesAbout This Site ContributeEmail CommentsSign the Guestbook

View Related Information In
The Documentation Center
MathWorld

Download All Formulas For This Function
Mathematica Notebook
PDF File

Download All Introductions For This Function
Mathematica Notebook
PDF File

 

Developed with Mathematica -- Download a Free Trial Version
 











Csch






Mathematica Notation

Traditional Notation









Elementary Functions > Csch[z] > Introduction to the Hyperbolic Cosecant Function in Mathematica





Automatic evaluations and transformations

Evaluation for exact and machine-number values of arguments

For the exact argument , Mathematica returns an exact result.

For a machine‐number argument (numerical argument with a decimal point), a machine number is also returned.

The following inputs calculate 100‐digit approximations at and .

It is possible to calculate thousands of digits for the hyperbolic cosecant function in less than a second. The next input calculates 10000 digits for and analyzes the frequency of the digit in the resulting decimal number.

Here is a 50‐digit approximation to the hyperbolic cosecant function at the complex argument .

Mathematica automatically evaluates mathematical functions with machine precision, if the arguments of the function are numerical values and include machine‐number elements. Typically, only six digits after the decimal point are shown in the results. The remaining digits are suppressed, but can be displayed using the function InputForm.

Simplification of the argument

Mathematica knows the symmetry and periodicity of the the hyperbolic cosecant function. Here are some examples.

Mathematica automatically simplifies the composition of the direct and the inverse hyperbolic cosecant functions into its inner argument.

Mathematica also automatically simplifies the composition of the direct and any of the inverse hyperbolic functions into algebraic functions of the argument.

In cases where the argument has the structure or , and or with integer , the hyperbolic cosecant function can be automatically transformed into hyperbolic or trigonometric cosecant or secant functions.

Simplification of combinations of hyperbolic cosecant functions

Sometimes simple arithmetic operations containing the hyperbolic cosecant function can automatically generate other equal hyperbolic functions.

The hyperbolic cosecant function arising as special cases from more general functions

The hyperbolic cosecant function can be treated as a particular case of some more general special functions. For example, appears automatically from Bessel, Struve, Mathieu, Jacobi, hypergeometric, and Meijer functions or their reciprocals for appropriate parameters.





© 1998-2014 Wolfram Research, Inc.