Skip to Content

Derivatives of Hyperbolic Functions

Home | Calculus 1 | Inverse and Hyperbolic Trig Derivatives | Derivatives of Hyperbolic Functions

Find the derivative of the following hyperbolic function

f(x)=sin(sinh(x))f(x) = \sin{(\sinh{(x)})}

SOLUTION MISSING: Unfortunately the author of this youtube video removed their content. You may be able to find a similar problem by checking the other problems in this subject. If you want to contribute, leave a comment with the link to your solution.
Posted by Ashley Oliver 8 months ago

Related Problems

Show that ddx(arcsinx)=x1x2\frac{d}{dx}(\arcsin{x}) = \frac{x^{\prime}}{\sqrt{1 - x^2}}

Determine the derivative of the following inverse trig function

f(x)=arctan(x)f(x) = \arctan{(\sqrt{x})}

Determine the derivative of the inverse trigonometric function

f(x)=sec1(5x)f(x) = \sec^{-1}{(5x)}

Find the derivative of f(x)=(sinh1(x))32f(x) = {(\sinh^{-1}(x))}^{\frac{3}{2}}