The substituion `y=z^(alpha)` transforms the differential equation `(x^(2)y^(2)-1)dy+2xy^(3)dx=0` into a homogeneous differential equation for

Find the real value of m for which the substitution y=u^m will transform the differential equation 2x^4y(dy)/(dx)+y^4=4x^6 in to a homogeneous equation.

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

The differential equation x(dy)/(dx)+(3)/((dy)/(dx))=y^(2)

Solve the differential equation (tan^(-1)y - x)dy = ( 1 + y^(2))dx .

Solve the differential equation (dy)/(dx)=(x+2y-1)/(x+2y+1).

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

Solve the differential equation (dy)/(dx)=(2y-6x-4)/(y-3x+3).

Integrating factor of the differential equation y dx - ( x-2y^(2) ) dy=0 is …..

Solution of the differential equation (1+e^(x/y))dx + e^(x/y)(1-x/y)dy=0 is

The solution of the differential equation (dy)/(dx) = 1/(xy[x^(2)siny^(2)+1]) is