Answer
$ \pi \ln (5)$
Work Step by Step
Our aim is to compute the volume of the given curve when it is revolved around $y$-axis by using the shell method.
Shell method for computing the volume of the curve: Let us consider two functions $f(x)$ and $g(x)$ (both are continuous functions) with $f(x) \geq g(x)$ on the interval $[m, n]$ and $R$ defines the region which revolves about the y-axis and is known as the region bounded by the curves $y=f(x)$ and $y=g(x)$ between the lines $x=m$ and $x=n$. Then, the volume of the solid can be expressed as:
$Volume, V=\int_m^n 2 \pi x [f(x)-g(x)] \ dx$
Here, $2\pi x=\text{Shell Circumference}$ and $[f(x)-g(x)] =\text {Height of the shell}$
We are given that $y=(1+x^2)^{-1}; y=0$ on $[0, 2]$
Thus, $V=\int_m^n 2 \pi x [f(x)-g(x)] \ dx=2 \pi \int_0^2 \dfrac{x}{1+x^2} \ dx$
or, $= \pi \int_0^2 \dfrac{2x}{1+x^2} \ dx$
or, $= \pi [ \ln |1+x^2|]_0^2$
or, $= \pi [ \ln |1+(2)^2|-\ln |1+0|]$
or, $= \pi \ln (5)$