Question

How do you find the derivative of `g(x)=2csc^8(4x)`?

Answer 1

`dy/dx=-64cot(4x)csc^8(4x)`

Explanation:

Chain rule:
`y=2u^8`
`u=csc(v)`
`v=4x`

`dy/dx=dy/(du)\*(du)/(dv)\*(dv)/(dx)`

`dy/dx=(16u^7)\*(-csc(v)cot(v))\*(4)`

Now we replace every `v` with `4x` and every `u` with `csc(v)\rightarrow csc(4x)`:

`dy/dx=(16csc(4x)^7)\*(-csc(4x)cot(4x))\*(4)`

and rearrange:

`dy/dx=-64csc(4x)cot(4x)csc^7(4x)`

and one more thing to clean up:

`dy/dx=-64cot(4x)csc^8(4x)`