The solution of differential equation (1+xy)x dy +(1-xy)ydx=0

The solution of the differential equation (1+xy)xdy+(1-xy)ydx=0 is

The solution of differential equation x^(2)(x dy + y dx) = (xy - 1)^(2) dx is (where c is an arbitrary constant)

The solution of the differential equation ydx-xdy+xy^(2)dx=0, is

The solution of differential equation (1-xy + x^(2) y^(2))dx = x^(2) dy is

The solution of the differential equation (ydx-xdy)/(xy)=xdx+ydy is (where, C is an arbitrary constant)

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

The solution of differential equation y'(1+x^(2))=2xy is :

The solution of differential equation ydx=(y^(3)-x)dy is :

The solution of the differential equation (xy^4 + y) dx-x dy = 0, is

The solution of the differential equation (xy^4 + y) dx-x dy = 0, is