If `y_1` and `y_2` are two solutions to the differential equation `(dy)/(dx)+P(x)y=Q(x)` . Then prove that `y=y_1+c(y_1-y_2)` is the general solution to the equation where `c` is any constant.

If (y_(1),y_(2)) are two solutions of the differential (dy)/(dx)+p(x).y=Q(x) Then prove that y=y_(1)+C(y_(1)-y_(2)) is the genral solution of the equation where C is any constant. For what relation between the constant alpha,beta will the linear combination alphay_(1)+betay_(2) also be a Solution.

If (y_(1),y_(2)) are two solutions of the differential (dy)/(dx)+p(x).y=Q(x) Then prove that y=y_(1)+C(y_(1)-y_(2)) is the genral solution of the equation where C is any constant. For what relation between the constant alpha,beta will the linear combination alphay_(1)+betay_(2) also be a Solution.

If (y_(1),y_(2)) are two solutions of the differential (dy)/(dx)+p(x).y=Q(x) Then prove that y=y_(1)+C(y_(1)-y_(2)) is the genral solution of the equation where C is any constant. For what relation between the constant alpha,beta will the linear combination alphay_(1)+betay_(2) also be a Solution.

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

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

The general solution of the differential equation (dy)/(dx)=(x+y+1)/(2x+2y+1) is

The solution of the differential equation log((dy)/(dx))=4x-2y-2,y=1, where x=1 is

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

Find the general solution of the differential equation (dy)/(dx)=(x+1)/(2-y),(y!=2)

Find the general solution of the differential equation (dy)/(dx)=(x+1)/(2-y),(y!=2)