Lời giải:
$(ABC)\cap (SBC)=BC$
$AM\perp BC$ do $ABC$ đều
$SA\perp BC; AM\perp BC\Rightarrow SM\perp BC$
$\Rightarrow ((SBC), (ABC))=\widehat{AMS}=30^0$
$\frac{SA}{AM}=\tan \widehat{AMS}=\tan 30^0$
$\Rightarrow AM=\frac{SA}{\tan 30^0}=\sqrt{3}a$
$BC=AM:\frac{\sqrt{3}}{2}=2a$
$S_{ABC}=\frac{AM.BC}{2}=\sqrt{3}a^2$
$V_{S.ABC}=\frac{1}{3}.SA.S_{ABC}=\frac{1}{3}.a.\sqrt{3}a^2=\frac{\sqrt{3}}{3}a^3$