We can parameterize this part of a cone by
[tex]\mathbf s(u,v)=\left\langle u\cos v,u\sin v,\dfrac hau\right\rangle[/tex]
with [tex]0\le u\le a[/tex] and [tex]0\le v\le2\pi[/tex]. Then
[tex]\mathrm dS=\|\mathbf s_u\times\mathbf s_v\|\,\mathrm du\,\mathrm dv=\sqrt{1+\dfrac{h^2}{a^2}}u\,\mathrm du\,\mathrm dv[/tex]
The area of this surface (call it [tex]\mathcal S[/tex]) is then
[tex]\displaystyle\iint_{\mathcal S}\mathrm dS=\sqrt{1+\frac{h^2}{a^2}}\int_{v=0}^{v=2\pi}\int_{u=0}^{u=a}u\,\mathrm du\,\mathrm dv=a^2\sqrt{1+\frac{h^2}{a^2}}\pi=a\sqrt{a^2+h^2}\pi[/tex]
