Consider the differential equation `(dy)/(dx)=(y^3)/(2(x y^2-x^2))` Statement 1: The substitution `z=y^2` transforms the above equation into first order homogeneous differential equation Statement 2: The solution of this differential equation is `y^2 e^((-y^2)/(x))=C.`

Consider the differential equation (dy)/(dx)=(y^(3))/(2(xy^(2)-x^(2))): Statement-1 : The substitution z=y^(2) transforms the above equation into a first order homogeneous differential equation. Statement-2 : The solution of this differential equation is y^(2)e^(-y^(2)//x)=C .

The solution of the differential equation (x+2y^3)((dy)/(dx))=y is

The solution of the differential equation ((x+2y^3)dy)/(dx)=y is

The solution of the differential equation (x+2y^3)(dy)/(dx)=y is

The solution of the differential equation ((x+2y^(3))dy)/(dx)=y is

The solution of the differential equation (x+2y^(2))(dy)/(dx)=y , is

The solution of the differential equation (x+2y^(3))(dy)/(dx)=y is -

Solution of the differential equation y dx+(x-y^(2))dy=0 is

The solution of the differential equation x+y(dy)/(dx)=2y is