Difference between revisions of "Manuals/calci/ACOSH"

Revision as of 03:46, 6 November 2013

ACOSH(z)

This function gives the Inverse Hyperbolic Cosine of a number.
Here 'z' is any positive real number i.e, $z\geq 1$ .
Inverse Hyperbolic sine of a number is defined by $Acosh(z)=loge(z+{\sqrt {z^{2}-1}}$
ACOSH(-2)=NAN , since z<1

ACOSH(z)

@@ Line 5: / Line 5: @@
 *This function gives the Inverse Hyperbolic Cosine of a number.
 *Here 'z' is  any positive real number i.e, <math>z \ge 1</math>.
-*Inverse Hyperbolic sine of a number is defined by <math>Acosh(z)=log e(z+\sqrt(z^2-1)</math>
+*Inverse Hyperbolic sine of a number is defined by <math>Acosh(z)=log e(z+\sqrt{z^2-1}</math>
 *ACOSH(-2)=NAN , since z<1