[tex]\vec F(x,y,z)=x\,\vec\imath+y\,\vec\jmath+8\,\vec k\implies\nabla\cdot\vec F(x,y,z)=2[/tex]
so that by the divergence theorem,
[tex]\displaystyle\iint_S\vec F\cdot\mathrm d\vec S=2\iiint_R\mathrm dV[/tex]
where [tex]R[/tex] is the interior of [tex]S[/tex]. In cylindrical coordinates, the integral is
[tex]\displaystyle2\iiint_R\mathrm dV=2\int_0^{2\pi}\int_0^1\int_0^{6-r\cos\theta}r\,\mathrm dy\,\mathrm dr\,\mathrm d\theta=\boxed{12\pi}[/tex]
where we set
[tex]\begin{cases}x=r\cos\theta\\y=y\\z=r\sin\theta\end{cases}[/tex]
