The solution of the differential equa...

The solution of the differential equation `(dy)/(dx)=(x+y)/x` satisfying the condition `y""(1)""=""1` is (1) `y""="ln"x""+""x` (2) `y""=""x"ln"x""+""x^2` (3) `y""=""x e(x-1)` (4) `y""=""x"ln"x""+""x`

Similar Questions

Explore conceptually related problems

The solution of the differential equaton (dy)/(dx)=(x log x^(2)+x)/(sin y+ycos y) , is

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

Solve the differential equation x(dy)/(dx)=y(log y - log x +1) .

The general solution of the equation, x((dy)/(dx)) = y ln (y/x) is

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

The solution of the differential equation x(dy)/(dx)=y ln ((y^(2))/(x^(2))) is (where, c is an arbitrary constant)

The solution of the differential equation {1/x-y^(2)/(x-y)^(2)}dx+{x^(2)/(x-y)^(2)-1/y}dy=0 is

The integrating factor of the differential equation (dy)/(dx)(x(log)_e x)+y=2(log)_e x is given by

Find the integrating factor of the differential equation: x log x (dy)/(dx)+y=(2)/(x)logx, x gt 1