Find the order of the differential equation `y'''+xy''+2y(y')^(2)+xy=0`
a.1. b.4 c.3 d.2

Verify that y^(2) = 4(1-x^(2)) is a solution of the differential equation xy y' + x(y')^(2) - y y' = 0

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

Find the order of the differential equation (d^(3)y)/(dx^(3)) + 2((d^(2)y)/(dx^(2)))^(2) + (dy)/(dx) + y = 0

The solution of the differential equation ( 3xy +y^(2)) dx + (x^(2) +xy)dy = 0 is

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

Solve the following differential equation: (3xy+y^(2))dx+(x^(2)+xy)dy=0

Solve the differential equations (i) (dy)/(dx)+(3xy+y^(2))/(x^(2)+xy)=0

The solution of differential equation (xy^(5)+2y)dx-xdy =0, is

Find the particular solution of the differential equation (3xy+y^(2))dx+(x^(2)=xy)dy=0;f or x=1,y=1