Question

How do you differentiate `f(x) = (3x-2)^4` using the chain rule?

Answer 1

`f'(x)=12(3x-2)^3`

Explanation:

According to the Chain Rule:

`f'(x)=4(3x-2)^3*d/dx[3x-2]`

`f'(x)=4(3x-2)^3*3`

`f'(x)=12(3x-2)^3`

Answer 2

`dy/dx=12(3x-2)^3`

Explanation:

Given -

`y=(3x-2)^4`

Let `U=3x-2`
Then-

`y= U^4`
`dy/(dU)=4U^3`

`(dU)/dx=3`

`dy/d=dy/(dU).(dU)/dx`

`dy/dx=4(U)^3(3)`

`dy/dx=4(3x-2)^3(3)`

`dy/dx=12(3x-2)^3`