y+(d)/(dx)(xy)=x(sin x+log x)

If y+d/(dx)(xy)=x(sinx+logx) , find y(x) .

Statement 1: The solution of differential equation y+(d(xy))/(x)=x(sin x+log x) is yx^(2)+x^(2)cos x=2x sin x+2cos x+(x^(3))/(3)log x-(x^(3))/(9) Statement 2: Differential equation is statement 1 is of linear form.

Solve the differential equation: y+d(xy)/(dx)=x(sinx+logx)

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 following differential equations (dy)/(dx)=(xy+y)/(xy+x)

Solve the following differential equations. (dy)/(dx)=(xy+y)/(xy+x)

Solve the following differential equations (dy)/(dx)=(xy+y)/(xy+x)

If (dy)/(dx)=(xy+y)/(xy+x), then the solution of the differential equation is (A) y=xe^(x)+c(B)y=e^(x)+c(C)y=Axe^(x-y)(D)y=x+A