Difference between revisions of "Manuals/calci/ASINH"
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*Here 'z' is any real number. | *Here 'z' is any real number. | ||
*Inverse Hyperbolic Sine of a number is defined as <math> Asinh(z) = \log_e(z +\sqrt{z^2 + 1})</math> | *Inverse Hyperbolic Sine of a number is defined as <math> Asinh(z) = \log_e(z +\sqrt{z^2 + 1})</math> | ||
| − | *Also <math> | + | *Also <math>ASinh(Sinh(z))=z</math> |
*ASINH(-z) = -ASINH(z) | *ASINH(-z) = -ASINH(z) | ||
Revision as of 04:13, 7 November 2013
ASINH(z)
- where z is any real number
Description
- This function gives the Inverse Hyperbolic Sine of a number.
- Here 'z' is any real number.
- Inverse Hyperbolic Sine of a number is defined as
- Also
- ASINH(-z) = -ASINH(z)
Examples
ASINH(z)
- z is any real number.
| ASINH(z) | Value |
| ASINH(2) | 1.44363547517881 |
| ASINH(45) | 4.499933104264103 |
| ASINH(-90) | -5.192987713658952 |