Question

How do you find `dy/dx` given `x=3y^(1/3)+2y`?

Answer 1

`dy/dx=y^(2/3)/(1+2y^(2/3))`

Explanation:

We are differentiating with respect to `x`. This means that `d/dxx=1`, but `d/dxy=dy/dx`.

This will be recurrent throughout this problem: differentiating anything with `y`, since it's a function that's not `x`, will take the chain rule.

Thus, the derivative with respect to `x` of `y^2` is not just `2y`, but `2ydy/dx`.

Now proceeding my differentiating:

`d/dxx=3d/dxy^(1/3)+2d/dxy`

`1=y^(-2/3)dy/dx+2dy/dx`

Factoring:

`dy/dx(y^(-2/3)+2)=1`

`dy/dx=1/(y^(-2/3)+2)`

`dy/dx=y^(2/3)/(1+2y^(2/3))`