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

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

Find the general solution of the differential equation (dy)/(dx) = (1 + y^(2))/(1 + x^(2)) .

Show that the general solution of the differential equation (dy)/(dx) + (y^(2) + y + 1)/(x^(2) + x + 1) = 0 is given by ( x + y + 1) = A(1 - x - y - 2xy) , where A is parameter.

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

Find the general solution of the differential equation x (dy)/(dx) + 2y = x^(2)(x ne 0) .

The solution of the differential equation (dy)/(dx)=(siny+x)/(sin2y-xcosy) is (a) sin^(2) y= xsiny+(x^(2))/(2)+C (b) sin^(2) y= xsiny-(x^(2))/(2)+C ( c ) sin^(2) y= x+siny+(x^(2))/(2)+C (d) sin^(2) y= x-siny+(x^(2))/(2)+C

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

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

Find the particular solution of the differential equation (dy)/(dx) = - 4xy^(2) given that y = 1, when x = 0.

Find the general solution of the differential equation (dy)/(dx) + sqrt((1 - y^(2))/(1 - x^(2))) = 0 .