The differential equation for which `sin^(-1)x+sin^(-1)y=C` is given by

The differential equation for which y = a cos x + b sin x is

d/dx {cos^(-1)x + sin^(-1)x}=

The general solution of the differential equation dy/dx + (1+ cos 2y)/(1- cos 2x) = 0 is given by

The general solution of the differential equation (dy)/(dx)+(1-cos2x)/(1+cos2y)=0 is given by

Solution of differential equation : dy-sinx sin y dx =0 is :

Show that the differential equation [x sin^(2)((y)/(x)) - y]dx+x dy = 0 is homogeneous. Find the particular solution of this differential equation, given that y = (pi)/(4) when x = 1.

Find the particular solution of the differential equation x.(dy)/(dx) - y + sin((y)/(x)) = 0 , given that when x = 2, y = pi .

The differential equation which represents the family of curves y=c_1e^(c_2x) where c_1 and c_2 are arbitrary constants , is :