The curve amongst the family of curves, represented by the differential equation `(x^2-y^2)dx+2xydy=0` which passes through (1,1) is

Solve (x^(2)-3y^(2))dx+2xydy=0

Find the differential equation corresponding to the family of curves represented by the equation y=Ae^(8x)+Be^(-8x) , where A and B are arbitrary constants.

The curve passing through the point (1,1) satisfies the differential equation (dy)/(dx)+(sqrt((x^2-1)(y^2-1)))/(x y)=0 . If the curve passes through the point (sqrt(2),k), then the value of [k] is (where [.] represents greatest integer function)_____

Solution of the differential equation {1/x-(y^2)/((x-y)^2)}dx+{(x^2)/((x-y)^2)-1/y}dy=0 is

A curve passing through (2,3) and satisfying the differential equation int_0^x ty(t)dt=x^2y(x),(x >0) is

The differential equation of the curve x/(c-1)+y/(c+1)=1 is

Find the equation of the normal to the curve x^(2) = 4y which passes through the point (1, 2).

The differential equation for the family of curves y = c\ sinx can be given by

Find the equation of the curve passing through the point (1,-1) whose differential equation is xdy=(2x^(2)-1)dx, where xne0 .