Question

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

Answer 1

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

Explanation:

Differentiate the equation through term by term. Remember you are differentiating with respect to `x` so when differentiating `x` we get:

`x -> 1`

but when differentiating with respect to `y` we get:

`y -> (dy)/(dx)`.

So:

`1=3x+2x^2y^2`

Differentiating gives:

`0=3+4xy^2 + 4x^2y (dy)/(dx)`

which we obtain using the chain and product rule on the `2x^2y^2` term. So we now re-arrange to get `(dy)/(dx)`:

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