y = 3/(1+x) , y = 0 , x =3 Find the volume of the solid generated by revolving the region bounded by the graphs of the equations about the line y = 4

For the region bounded by y=3/(1+x) , y=0 , and x=3 revolved  about the line x=4 , we may apply Washer method for the integral application for the volume of a solid. Note: We consider a region bounded at the first quadrant.
 The formula for the Washer Method  is:
V = pi int_a^b [(f(x))^2-(g(x))^2]dx
or
V = pi int_a^b [(f(y))^2-(g(y))^2]dy
where f as function of the outer radius 
         g as a function of the inner radius
 To determine which form we use, we consider the vertical rectangular strip representation that is perpendicular to the axis of rotation as shown on the attached image. The given strip will have a thickness of "dx " which is our clue to use the formula:
V = pi int_a^b [(f(x))^2-(g(x))^2]dx
For each radius, we follow the y_(above)-y_(below) . 
For the inner radius, we have: g(x) = 4-3/(1+x)
For the outer radius, we have: f(x) = 4-0 =4
Then the boundary values of x  is  a=0 and b =3 .
The integral will be:
V = pi int_0^3 [4^2 -(4-3/(1+x))^2]dx
Expand using the FOIL method on:(4-3/(1+x))^2= 9/(x + 1)^2 - 24/(x + 1) + 16 and 4^2 =16 .
The integral becomes: 
V = pi int_0^3 [16 -(9/(x + 1)^2 - 24/(x + 1) + 16)]dx
V = pi int_0^3 [16 -9/(x + 1)^2 + 24/(x + 1) -16]dx
Simplify: V = pi int_0^3 [-9/(x + 1)^2+ 24/(x + 1) ]dx or
V = pi int_0^3 [ 24/(x + 1) -9/(x + 1)^2 ]dx
Apply basic integration property:
int (u-v)dx = int (u)dx-int (v)dx.
V = pi [int_0^3 24/(x + 1)dx -int_0^3 9/(x + 1)^2dx ]
For the indefinite integral, may apply u-substitution by letting:  u=x+1 then du=dx
V = pi [int 24/(u)du -int 9/(u)^2du]
For the integral of int 24/(u)du , we follow the integration formula for logarithm:
int 24/(u)du= 24ln|u|
For the integral of int 9/(u)^2du , we follow the Law of Exponent: 1/x^n = x^-n and Power rule for integration formula : int x^n dx =x^(n+1)/(n+1) .
int 9/(u)^2du =int 9u^(-2)du
                  = 9u^(-2+1)/(-2+1)
                  = 9 u^(-1)/(-1)
                  = -9/u
 Then, the integral becomes:
V = pi [int 24/(u)du -int 9/(u)^2du]
V = pi [ 24ln|u| -(-9/u)]
V = pi [ 24ln|u| +9/u]
 Plug-in u=x+1 on V = pi [ 24ln|u| +9/u] , we get:
V = pi [ 24ln|(x+1)| +9/(x+1)]|_0^3
Apply the definite integral formula: int _a^b f(x) dx = F(b) - F(a) .
V = pi [ 24ln|(3+1)| +9/(3+1)] -pi [ 24ln|(0+1)| +9/(0+1)]
V = pi [ 24ln|4| +9/4] -pi [ 24ln|(1)| +9/(1)]
V = pi [ 24ln|4| +9/4] -pi [ 24*0 +9]
V = pi [ 24ln|4| +9/4 -9]
V = pi [ 24ln|4| -27/4 ]