Question

How do you differentiate `f(x)=sin(1/(2x)^3)` using the chain rule?

Answer 1

`f'(x) = -(3cos((2x)^(-3)))/(8x^4)`

Explanation:

The derivative of `f, (df)/dx,` can be found using the chain rule:

`(df)/dx = (df)/(dg) xx (dg)/(dx)`

Let `f(x) = sing` where `g=g(x) = 1/(2x)^3= (2x)^-3=1/8x^-3`

`(df)/(dg) = cosg = cos((2x)^-3)`

`(dg)/dx = -3/8x^-4= -3/(8x^4)`

`(df)/dx = cosg xx -3/(8x^4)`

`= -(3cos((2x^-3)))/(8x^4)`