...one of the most highly
regarded and expertly designed C++ library projects in the
world.

— Herb Sutter and Andrei
Alexandrescu, C++
Coding Standards

The exponential funtion is defined, for all objects for which this makes
sense, as the power series ,
with * n! = 1x2x3x4x5...xn* (and

`0! = 1`

`n`

Graph of exp on R

Real and Imaginary parts of exp on C

The hyperbolic functions are defined as power series which can be computed (for reals, complex, quaternions and octonions) as:

Hyperbolic cosine:

Hyperbolic sine:

Hyperbolic tangent:

Trigonometric functions on R (cos: purple; sin: red; tan: blue)

Hyperbolic functions on r (cosh: purple; sinh: red; tanh: blue)

The hyperbolic sine is one to one on the set of real numbers, with range
the full set of reals, while the hyperbolic tangent is also one to one
on the set of real numbers but with range `[0;+∞[`

, and
therefore both have inverses. The hyperbolic cosine is one to one from
`]-∞;+1[`

onto `]-∞;-1[`

(and from `]+1;+∞[`

onto `]-∞;-1[`

); the inverse function we use here is defined
on `]-∞;-1[`

with range `]-∞;+1[`

.

The inverse of the hyperbolic tangent is called the Argument hyperbolic tangent, and can be computed as .

The inverse of the hyperbolic sine is called the Argument hyperbolic sine,
and can be computed (for `[-1;-1+ε[`

) as .

The inverse of the hyperbolic cosine is called the Argument hyperbolic cosine, and can be computed as .