Difference between revisions of "Manuals/calci/SINH"

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*This function gives the hyperbolic sin of 'z'.
 
*This function gives the hyperbolic sin of 'z'.
*Also it is called as circular function.
+
*Also it is called as Circular function.
* Here SINH=(e^z-e^-z)/2 or -iSIN iz, where 'i' is the imginary unit and i=sqrt(-1).
+
* Here <Math>SINH=(e^z-e^-z)/2</Math> or -iSIN iz, where 'i' is the imginary unit and i=sqrt(-1).
 
*Also relation between hyperbolic & trigonometric function is sin(iz)=isinhz & sinh(iz)= isinz
 
*Also relation between hyperbolic & trigonometric function is sin(iz)=isinhz & sinh(iz)= isinz
 
*SINH(-Z)=-SINHZ
 
*SINH(-Z)=-SINHZ
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|- class="even"
 
|- class="even"
| SINH(10))
+
| SINH(10)
 
| 11013.23287
 
| 11013.23287
  
 
|- class="odd"
 
|- class="odd"
| SINH(-3))
+
| SINH(-3)
 
| -10.0178749274099
 
| -10.0178749274099
 
|}
 
|}
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==See Also==
 
==See Also==
  
*[[Manuals/calci/TAN | TAN]]
+
*[[Manuals/calci/SIN| SIN]]
  
*[[Manuals/calci/DTAN | DTAN]]
+
*[[Manuals/calci/COSH| COSH]]
  
 
*[[Manuals/calci/TANH | TANH]]
 
*[[Manuals/calci/TANH | TANH]]

Revision as of 06:37, 4 November 2013

SINH(z)


  • where z is any real number

Description

  • This function gives the hyperbolic sin of 'z'.
  • Also it is called as Circular function.
  • Here or -iSIN iz, where 'i' is the imginary unit and i=sqrt(-1).
  • Also relation between hyperbolic & trigonometric function is sin(iz)=isinhz & sinh(iz)= isinz
  • SINH(-Z)=-SINHZ

Examples

SINH(z)

  • z is any real number.
SINH(z) Value(Radian)
SINH(0) 0
SINH(10) 11013.23287
SINH(-3) -10.0178749274099

See Also

References