Hyperbolic Cotangent

On this page the hyperbolic cotangent to an angle is calculated. To calculate, enter the angle at which the hyperbolic cotangent should be calculated, then click on the 'Calculate' button.

The unit of measurement for the angle can be switched between degrees and radians

Description

The function Coth calculates the hyperbolic cotangent of an angle. The hyperbolic cotangent (coth) is a mathematical function found in the family of hyperbolic functions.

Input

The angle is given in degrees (full circle = 360°) or radians (full circle = 2 · π). The unit of measurement used is set using the Degrees or Radians menu.

Definition

The hyperbolic cotangent can be expressed by the following formula:

\(\displaystyle \coth (x) = \frac{\cosh (x)}{\sinh (x)} \)

The hyperbolic cotangent can be expressed by the following formula:

\(\displaystyle \coth(x) = \frac{e^x + e^{-x}}{e^x - e^{-x}} = \frac{e^{2x} + 1}{e ^{2x} - 1} = 1 + \frac{2}{e^{2x} - 1} \)

Where x is the value of the angle, which is given as radians.