We can parameterize this part of the cylinder using
[tex]\mathbf s(u,v)=\langleu,3\cos v,3\sin v\rangle[/tex]
with [tex]0\le u\le4[/tex] and [tex]\cos^{-1}\dfrac23\le v\le\dfrac\pi2[/tex]. Then the surface element is
[tex]\mathrm d\mathbf S=\|\mathbf s_u\times\mathbf s_v\|\,\mathrm du\,\mathrm dv[/tex]
[tex]\mathrm d\mathbf S=3\,\mathrm du\,\mathrm dv[/tex]
so the area is given by the surface integral, where [tex]D[/tex] denotes the part of the cylinder in question,
[tex]\displaystyle\iint_D\mathrm d\mathbf S=3\int_{v=\cos^{-1}(2/3)}^{v=\pi/2}\int_{u=0}^{u=4}\mathrm du\,\mathrm dv=6\pi[/tex]
Probably less work would involve a simpler geometric approach, but it doesn't hurt to practice setting up a proper surface integral.
