Difference between revisions of "Manuals/calci/ACOSH"

From ZCubes Wiki
Jump to navigation Jump to search
Line 6: Line 6:
 
*Here 'z' is  any positive real number i.e, <math>z \ge 1</math>.  
 
*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>2
+
*ACOSH(-2)=NAN , since z<1
  
 
== Examples ==
 
== Examples ==

Revision as of 03:45, 6 November 2013

ACOSH(z)


  • where z is any real number

Description

  • This function gives the Inverse Hyperbolic Cosine of a number.
  • Here 'z' is any positive real number i.e, .
  • Inverse Hyperbolic sine of a number is defined by
  • ACOSH(-2)=NAN , since z<1

Examples

ACOSH(z)

  • z is any real number.
ACOSH(z) Value(Radian)
ACOSH(1) 0
ACOSH(30) 4.0940666863209
ACOSH(90) 5.192925985263806

See Also

References