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→Description
==Description==
==Description==
*This function gives the Hyperbolic SIN of 'z'.
*This function gives the Hyperbolic Cosecant of 'z'.
*It's also called as Circular function.
*It's also called as Circular function.
*Here <math>SINH=\frac{e^z-e^{-z}}{2}</math> or <math>-iSIN(iz)</math>, where <math>i</math> is the imaginary unit and <math>i=\sqrt{-1}</math>
*Here <math>CSCH= sinh(z)^{-1}</math> ie, <math>\frac{2}{e^z-e^{-z}}</math> or <math>-Icsc(iz)</math>, where <math>i</math> is the imaginary unit and <math>i=\sqrt{-1}</math>
*The relation between Hyperbolic & Trigonometric function is <math>Sin(iz)=iSin(hz)</math> & <math>Sinh(iz)= iSin(z)</math>
*The relation between Hyperbolic & Trigonometric function is <math>CSC(iz) = -ICSCh(z)</math> & <math>Csch(iz)=-iCsc(z)</math>
*SINH(-z) = -SINH(z)
*CSCH(-z)=-CSCH(z)
== Examples ==
== Examples ==