Solutions of the differential equations `(dy)/(dx) + (y)/(x) = sin x ` is : a)` x(y+cos x ) = sin x+ c` b)` x(y-cos x ) = sin x+c` c)` x( y cos x ) = sin x +c` d)` x(y-cos x) = cos x+ c`

Solutions of the differential equations (dy)/(dx) tan y= sin (x+y) +sin (x-y) is

The solution of the differential equation log x (dy)/(dx) + (y)/(x) = sin 2x is a) y log | x | = C - (1)/(2) cos x b) y log |x| = C + (1)/(2) cos 2x c) y log | x| = C - (1)/(2) cos 2x d) xy log | x | = C - (1)/(2) cos 2x

Solve the differential equation (x d y-y d x) y sin (y/x)=(y d x+x d y) x cos (y/x)

An integrating factor of the differential equation sin x (dy)/(dx) + 2 y cos x =1 is

x (dy)/(dx)-y+x sin (y/x)=0

The solution of the differential equation (dy)/(dx) + 1 = e^(x+y) is a) x + e^(x+y) = c b) x-e^(x+y) = c c) x + e^(-(x+y)) = c d) x-e^(-(x+y))=c

Show that the differential equation x cos(y/x) (dy)/(dx) = y cos(y/x) + x is homogeneous and solve it.

The solution of the differential equation (dy)/(dx) = (3e^(2x) + 3e^(4x) )/( e^(x) + e^(-x) ) is a) y= e^(3x) + C b) y=2e^(2x) + C c) y= e^(x) + C d) y= e^(4x) + C

If y= tan ^(-1) ((a cos x- b sin x )/(b cos x + a sin x ) ) , then (dy)/(dx) is :