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From Conservapedia - Reading time: 1 min

The hyperbolic trigonometric functions, also referred to as simply "hyperbolic functions," are analogous to the standard trigonometric functions using a hyperbola as the defining conic section rather than a circle.^[1] This has the effect of removing any i's that appear in the complex definition of the standard trigonometric functions. As such, they tend to differentiate in an analogous way to standard trigonometric functions, up to perhaps a negative sign. They are defined as:

Hyperbolic sine: $\text{[math]}$
Hyperbolic cosine: $\text{[math]}$
Hyperbolic tangent: $\text{[math]}$
Hyperbolic cosecant: $\text{[math]}$
Hyperbolic secant: $\text{[math]}$
Hyperbolic cotangent: $\text{[math]}$

1 Graphs
2 Identities
3 References
4 See also

Graphs[edit]


sinh and cosh	tanh and coth

Identities[edit]

The hyperbolic trigonometric functions have many identities that are similar to those of trigonometric functions. These can be remembered by replacing instances of $\text{[math]}$ with $\text{[math]}$ . For example, the trigonometric identity,