The solution of `(dy)/(dx)+yf'(x)-f(x).f'(x)=0,y!=f(x)` is

dy/dx+y f\'(x)-f(x)f\'(x)=0

The solution of the D.E (dy)/(dx)=(y*f'(x)-y^(2))/(f(x)) equal to

General solution of differential equation of f (x) (dy)/(dx) =f ^(2) (x)+yf(x) +f'(x)y is: (c being arbitary constant.)

Solve (dy)/(dx) = yf^(')(x) = f(x) f^(')(x) , where f(x) is a given integrable function of x .

General solution of differential equation of f(x) (dy)/(dx) = f^(2) (x ) + f(x) y + f'(x) y is : ( c being arbitrary constant ) .

Solution of differential equation f(x)(dy)/(dx)=(f(x))^(2)+f(x)y+f(x)'*y is :(1)y=f(x)+ce^(x)(2)y=-f(x)+ce^(x)(3)y=-f(x)+ce^(x)f(x)(4)y=cf(x)+e^(x)

Solve: (dy)/(dx)+y*f'(x)=f(x)*f'(x), where f(x) is a given function.

Solve: (dy)/(dx) = (yf^(')(x)-y^(2))/(f(x))

If f(x) is differentiable, then the solution of dy+f\'(x)(y-f(x))dx=0 is (A) yf(x)=Ce^(-f(f(x))^2) (B) y+1=f(x)+Ce^(-f(x)) (C) f(x)=Cye^(-y^2/2) (D) none of these