How to prove sinh(-x)=- sinh x? Asked by Frosty Adam Report in progress 15 11 Answers 105 views Leave a reply to Frosty Adam : prove sinh(-x)=- sinh x Name* Comment* Answers ( 11 ) Dogfish Harry Hyperbolic Trigonometry Identity Proof: cosh(x+y) = cosh(x)cosh(y) + sinh(x)sinh(y) : Ratings : 54 % Maxwell Derivatives of Hyperbolic Trigonometry: sinh(x) : Ratings : 60 % Red Robert Hyperbolic Functions - tanh(x), sinh(x), cosh(x) - Introduction : Ratings : 67 % Melisa Prove a Property of Hyperbolic Functions: (sinh(x))^2 - (cosh(x))^2 = 1 : Ratings : 11 % Cosh Inverse Hyperbolic Functions - Inverse sinh(x), cosh(x), tanh(x) : Ratings : 14 % Steven Prove a Property of Hyperbolic Functions: sinh(x+y)=sinh(x)cosh(y)+cosh(x)sinh(y) : Ratings : 50 % Georgia Calculus I - Derivative of Hyperbolic Sine Function sinh(x) - Proof : Ratings : 54 % Alison Hyperbolic Trigonometry Identity Proof: cosh^2(x) - sinh^2(x) = 1 : Ratings : 30 % Yohanna Hyperbolic Trigonometry Identity Proof: sinh(-x) = -sinh(x) & cosh(-x) = cosh(x) : Ratings : 43 % Christopher Hyperbolic Trigonometry Identity Proof: sinh(x+y) = sinh(x)cosh(y) + cosh(x)sinh(y) : Ratings : 36 % Voodoo Francis Prove a Property of Hyperbolic Functions: (sinh(x))^2=(-1+cosh(2x))/2 : Ratings : 68 % Related questions to prove sinh(-x)=- sinh x sinh cosh hyperbolic
Hyperbolic Trigonometry Identity Proof: cosh(x+y) = cosh(x)cosh(y) + sinh(x)sinh(y) :
Ratings : 54 %
Derivatives of Hyperbolic Trigonometry: sinh(x) :
Ratings : 60 %
Hyperbolic Functions - tanh(x), sinh(x), cosh(x) - Introduction :
Ratings : 67 %
Prove a Property of Hyperbolic Functions: (sinh(x))^2 - (cosh(x))^2 = 1 :
Ratings : 11 %
Inverse Hyperbolic Functions - Inverse sinh(x), cosh(x), tanh(x) :
Ratings : 14 %
Prove a Property of Hyperbolic Functions: sinh(x+y)=sinh(x)cosh(y)+cosh(x)sinh(y) :
Ratings : 50 %
Calculus I - Derivative of Hyperbolic Sine Function sinh(x) - Proof :
Ratings : 54 %
Hyperbolic Trigonometry Identity Proof: cosh^2(x) - sinh^2(x) = 1 :
Ratings : 30 %
Hyperbolic Trigonometry Identity Proof: sinh(-x) = -sinh(x) & cosh(-x) = cosh(x) :
Ratings : 43 %
Hyperbolic Trigonometry Identity Proof: sinh(x+y) = sinh(x)cosh(y) + cosh(x)sinh(y) :
Ratings : 36 %
Prove a Property of Hyperbolic Functions: (sinh(x))^2=(-1+cosh(2x))/2 :
Ratings : 68 %