find dy/dx (implicit differentiation) 3xy^2+y^3=8

To find the derivative of the given equation implicitly with respect to x, follow these steps:

1. Differentiate both sides of the equation with respect to x:

d/dx (3xy^2) + d/dx (y^3) = d/dx (8)

2. Apply the product rule to the first term:

d/dx(3xy^2) = 3y^2 * d/dx(x) + 3x * d/dx(y^2)

The product rule states that if you have a function f(x) = g(x) * h(x), then the derivative, f'(x) = g'(x) * h(x) + g(x) * h'(x).

3. Apply the chain rule to d/dx(y^2):

d/dx(y^2) = 2y * dy/dx

The chain rule states that if you have a function y(x), then the derivative of y^n is n * y^(n-1) * dy/dx.

4. Continue differentiating the other terms:

d/dx(y^3) = 3y^2 * dy/dx

d/dx(8) = 0

Now put all the pieces together:

3y^2 * d/dx(x) + 3x * (2y * dy/dx) + 3y^2 * dy/dx = 0

5. Simplify the equation:

3y^2 + 6xy * dy/dx + 3y^2 * dy/dx = 0

6. Solve for dy/dx:

dy/dx * (6xy + 3y^2) = -3y^2

dy/dx = (-3y^2) / (6xy + 3y^2)

7. Simplify the expression:

dy/dx = -y^2 / (2x + y^2)

The derivative dy/dx is:

dy/dx = -y^2 / (2x + y^2)