Final answer:
The general solution to the differential equation y' = x^3y^3 - 4x^3y^2 is y = -4c*e^(3/(4x^4)), where c is a constant.
Step-by-step explanation:
The general solution to the differential equation y' = x^3y^3 - 4x^3y^2 is given by y = -4c*e^(3/(4x^4)), where c is a constant. This general solution includes several variations that can be obtained by changing the value of c.
For example, if c = 1, then the solution becomes y = -4e^(3/(4x^4)). If c = 2, then the solution becomes y = -4e^(6/(4x^4)). And so on.
Therefore, the general solution to the differential equation is y = -4c*e^(3/(4x^4)), where c can be any real number.