Answer :
Answer:
Step-by-step explanation:
dx/dt = 3xt²
Divide both sides by x
(dx/dt)/x = 3t²
Integrate with respect to t
Int (dx/dt)/x dt = int 3t^2 dt
ln x = t^3
x = Ae^(t^3) where A is a constant
Answer:
Step-by-step explanation:
dx/dt = 3xt²
Divide both sides by x
(dx/dt)/x = 3t²
Integrate with respect to t
Int (dx/dt)/x dt = int 3t^2 dt
ln x = t^3
x = Ae^(t^3) where A is a constant