Category:Definitions/Inverse Hyperbolic Tangent
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This category contains definitions related to Inverse Hyperbolic Tangent.
Related results can be found in Category:Inverse Hyperbolic Tangent.
The inverse hyperbolic tangent is a multifunction defined on $S$ as:
- $\forall z \in S: \map {\tanh^{-1} } z := \set {w \in \C: z = \map \tanh w}$
where $\map \tanh w$ is the hyperbolic tangent function.
Also see
Pages in category "Definitions/Inverse Hyperbolic Tangent"
The following 22 pages are in this category, out of 22 total.
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- Definition:Inverse Hyperbolic Tangent
- Definition:Inverse Hyperbolic Tangent/Also known as
- Definition:Inverse Hyperbolic Tangent/Complex
- Definition:Inverse Hyperbolic Tangent/Complex/Definition 1
- Definition:Inverse Hyperbolic Tangent/Complex/Definition 2
- Definition:Inverse Hyperbolic Tangent/Complex/Principal Branch
- Definition:Inverse Hyperbolic Tangent/Real
- Definition:Inverse Hyperbolic Tangent/Real/Definition 1
- Definition:Inverse Hyperbolic Tangent/Real/Definition 2