The area is given by the integral
[tex]\displaystyle2\pi\int_5^{10}x\sqrt{1+(y'(x))^2}\,\mathrm dx=2\pi\int_5^{10}x\sqrt{1+36x^2}\,\mathrm dx[/tex]
Let [tex]u=1+36x^2\implies\mathrm du=72x\,\mathrm dx[/tex], then the area is
[tex]\displaystyle\frac{2\pi}{72}\int_{1+36\cdot5^2}^{1+36\cdot10^2}\sqrt u\,\mathrm du=\frac\pi{36}\int_{901}^{3601}u^{1/2}\,\mathrm du[/tex]
Since [tex]\left(\frac23u^{3/2}\right)'=u^{1/2}[/tex], the integral is equal to
[tex]\dfrac{2\pi}{3\cdot36}u^{3/2}\bigg|_{901}^{3601}=\boxed{\dfrac{\left(3601^{3/2}-901^{3/2}\right)\pi}{54}}[/tex]
