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hyperbolic function

noun

Mathematics.

  1. a function of an angle expressed as a relationship between the distances from a point on a hyperbola to the origin and to the coordinate axes, as hyperbolic sine or hyperbolic cosine: often expressed as combinations of exponential functions.

hyperbolic function

noun

  1. any of a group of functions of an angle expressed as a relationship between the distances of a point on a hyperbola to the origin and to the coordinate axes. The group includes sinh ( hyperbolic sine ), cosh ( hyperbolic cosine ), tanh ( hyperbolic tangent ), sech ( hyperbolic secant ), cosech ( hyperbolic cosecant ), and coth ( hyperbolic cotangent )

“Collins English Dictionary — Complete & Unabridged” 2012 Digital Edition © William Collins Sons & Co. Ltd. 1979, 1986 © HarperCollins Publishers 1998, 2000, 2003, 2005, 2006, 2007, 2009, 2012

hyperbolic function

  1. Any of a set of six functions related, for a real or complex variable x, to the hyperbola in a manner analogous to the relationship of the trigonometric functions to a circle, including:

    1. The hyperbolic sine, defined by the equation sinh x = 1/2 (e xe - x).

    2. The hyperbolic cosine, defined by the equation cosh x = 1/2 (e x + e - x).

    3. The hyperbolic tangent, defined by the equation tanh x = sinh x /cosh x.

    4. The hyperbolic cotangent, defined by the equation coth x = cosh x /sinh x.

    5. The hyperbolic secant, defined by the equation sech x = 1/cosh x.

    6. The hyperbolic cosecant, defined by the equation csch x = 1/sinh x.

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Word History and Origins

Origin of hyperbolic function1

First recorded in 1885–90

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hyperbolichyperbolic geometry

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