Question

How do you find the derivative of the function `y=cosh^-1((sqrt(x))`?

Answer 1

The answer is `=1/(2sqrtxsqrt(x-1))`

Explanation:

We need

`(sqrtx)'=1/(2sqrtx)`

`(coshx)'=sinhx`

`cosh^2x-sinh^2x=1`

Here, we have

`y=cosh^(-1)(sqrtx)`

Therefore,

`coshy=sqrtx`

Taking the derivatives on both sides

`(coshy)'=(sqrtx)'`

`sinhydy/dx=1/(2sqrtx)`

`dy/dx=1/(2sqrtxsinhy)`

`cosh^2y-sinh^2y=1`

`sinh^2y=cos^2y-1`

`sinh^2y=x-1`

`sinhy=sqrt(x-1)`

Therefore,

`dy/dx=1/(2sqrtxsqrt(x-1))`