The differential equation of the family of curves y2=4a(x+a), where a is an arbitrary constant, is
y[1+(dydx)2]=2xdydx
y[1−(dydx)2]=2xdydx
d2ydx2+2dydx=0
(dydx)3+3dydx+y=0
Given y2=4a(x+a). Differentiating, 2y(dydx)=4a Eliminating a from (i) and (ii), required equation is y[1−(dydx)2]=2xdydx