inverse hyperbolic cotangent
inverse of the hyperbolic cotangent function
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inverse hyperbolic cotangent
Summary
inverse hyperbolic cotangent is an inverse hyperbolic function[1]. It draws 2 Wikipedia views per month (inverse_hyperbolic_function category, ranking #3 of 5).[2]
Key Facts
- inverse hyperbolic cotangent's image is recorded as Inverse Hyperbolic Cotangent.svg[3].
- inverse hyperbolic cotangent's instance of is recorded as inverse hyperbolic function[4].
- inverse hyperbolic cotangent's described by source is recorded as ISO 80000-2:2019 Quantities and units — Part 2: Mathematics[5].
- inverse hyperbolic cotangent's defining formula is recorded as \operatorname{arcoth} x = \frac{1}{2} \left( \ln \left( 1 + \frac{1}{x} \right) - \ln \left( 1 - \frac{1}{x} \right) \right)[6].
- inverse hyperbolic cotangent's defining formula is recorded as y = \operatorname{arcoth} x \Leftrightarrow x = \coth y, y \neq 0[7].
- inverse hyperbolic cotangent's Google Knowledge Graph ID is recorded as /g/122840j1[8].
- inverse hyperbolic cotangent's MathWorld ID is recorded as InverseHyperbolicCotangent[9].
- inverse hyperbolic cotangent's maintained by WikiProject is recorded as WikiProject Mathematics[10].
- inverse hyperbolic cotangent's in defining formula is recorded as \operatorname{arcoth} x[11].
- inverse hyperbolic cotangent's in defining formula is recorded as \ln x[12].
- inverse hyperbolic cotangent's in defining formula is recorded as \coth x[13].
- inverse hyperbolic cotangent's mathematical inverse is recorded as hyperbolic cotangent[14].
- inverse hyperbolic cotangent's Lexikon der Mathematik entry ID is recorded as 266[15].
Why It Matters
inverse hyperbolic cotangent draws 2 Wikipedia views per month (inverse_hyperbolic_function category, ranking #3 of 5).[2] It is known by 12 alternative names across languages and contexts.[16]