What is the solution of `y'=1+x+y^(2)+xy^(2),y(0)=0`?

The solution of y' =2 +2 x + 2y^2 +2 xy ^2 , y (0) =0 is :

The solution of dy/dx+(1+y^3)/xy^2(1+x^2)=0

Find the general solution of y^(2)dx+(x^(2)-xy+y^(2))dy=0

The solution of e^(x((y^(2)-1))/(y)){xy^(2)dy+y^(3)dx}+{ydx-xdy}=0 , is

y^2dx+(x^2-xy+y^2)dy=0

Solve the differential equation (dy)/(dx)=1+x+y^(2)+xy^(2) , when y=0 and x=0.

The solution of the equation (x^2y+x^2)dx+y^2(x-1)dy=0 is given by

For the differential equation (x^2+y^2)dx-2xy dy=0 , which of the following are true. (A) solution is x^2+y^2=cx (B) x^2-y^2=cx (C) x^2-y^2=x+c (D) y(0)=0

The solution of dy/dx = (x^2+y^2+1)/(2xy) satisfying y(1)=0 is given by A. a hyperbola B. a circle C. y^2 = (1+x ) -10 D. None

Equation of curve passing through (1,1) & satisfyng the differential equation (xy^(2)+y^(2)+x^(2)y+2xy)dx+(2xy+x^(2))dy=0 is