Rule of thumb: if the unknown is both outside and inside trig/log/exp functions, there is no closed form inverse (unless in terms of purpose-defined special functions). So no... just looking at your ...

The handout is in error. It should say \sinh(-x)=-\sinh x as you suggest. You may be interested to know that there is a relationship between circular and hyperbolic functions. It is true that \sin( \pm ix )= \pm i\sinh x. ...

Hint . One may observe that \frac{e^x+e^{-x}}2-1=\frac{(e^{x/2}-e^{-x/2})^2}2\ge0 then one may recall that \cos x \le1.

\frac{e^x}{\sinh x} = \frac{e^x}{\frac{e^x-e^{-x}}{2}} = \frac{2e^x}{e^x-e^{-x}} = \frac{2}{1-e^{-2x}} Now when x\to \infty , e^{-2x}\to 0 and we get by arithmetic of limits that the ...

Let f(x)=\cos x+\cosh x. Then f(0)=2 and if x\ne0 we have: f(x)=2+2\sum_{k=1}^\infty\frac{x^{4k}}{(4k)!}>2. On the other hand f'(x)=-\sin x+\sinh x. We have f'(0)=0 and f'(x)<0 if x<0 ...

Use parity to extend the domain of integration from -\infty to \infty. Shift the contour of integration down by \frac{i\pi}{2} to avoid pole x=0. Then compute separately four integrals ...