The functions given by the formulas:
\begin{equation}
\sinh x = \frac{e^x-e^{-x}}{2},
\end{equation}
the hyperbolic sine; and
\begin{equation}
\cosh x = \frac{e^x+e^{-x}}{2},
\end{equation}
the hyperbolic cosine. The hyperbolic tangent
\begin{equation}
\tanh x = \frac{\sinh x}{\cosh x},
\end{equation}
is also sometimes considered. Other notations include: $\operatorname{sh} x$, $\operatorname{Sh} x$, $\operatorname{ch} x$, $\operatorname{Ch} x$, $\operatorname{tgh} x$, $\operatorname{th} x$, $\operatorname{Th} x$. The graphs of these functions are shown in Fig. a.
Figure: h048250a
The principal relations are:
Figure: h048250b
The geometrical interpretation of hyperbolic functions is similar to that of the trigonometric functions (Fig. b). The parametric equations of hyperbolas
make it possible to interpret the abscissa
and the ordinate
of a point
on the equilateral hyperbola
as the hyperbolic sine and cosine; the hyperbolic tangent is the segment
. The parameter
of the point
equals twice the area of the sector
, where
is the arc of the hyperbola. The parameter
is negative for a point
(for
).
The inverse hyperbolic functions are defined by the formulas
The derivatives and basic integrals of the hyperbolic functions are:
The hyperbolic functions
and
may also be defined by the series
in the entire complex
-plane, so that
![](https://www.encyclopediaofmath.org/legacyimages/h/h048/h048250/h04825044.png) | (3) |
Extensive tabulated values of hyperbolic functions are available. The values of the hyperbolic functions may also be obtained from tables giving
and
.
References
[1] | E. Jahnke, F. Emde, F. Lösch, "Tafeln höheren Funktionen" , Teubner (1966) |
[2] | , Tables of circular and hyperbolic sines and cosines in radial angle measure , Moscow (1968) (In Russian) |
[3] | , Tables of and , Moscow (1955) (In Russian) |
The right-hand sides of the defining relations (1), (2) allow analytic continuation to the whole complex plane. After this, using the Euler formulas one sees that (3) holds, from which the series expansions are readily derived.
References
[a1] | A. Segun, M. Abramowitz, "Handbook of mathematical functions" , Appl. Math. Ser. , 55 , Nat. Bur. Standards (1970) |
[a2] | H.B. Dwight, "Tables of integrals and other mathematical data" , Macmillan (1963) |
How to Cite This Entry:
Hyperbolic functions. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hyperbolic_functions&oldid=29142
This article was adapted from an original article by V.I. Bityutskov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098.
See original article