We apply Borcherds' methods for constructing automorphic forms to embed the moduli space \( \mathcal{M} \) of marked complex cubic surfaces into \( \mathbb{C}P^9 \). Specifically, we construct 270 automorphic forms on the complex 4-ball \( \mathcal{B}_4 \), automorphic with respect to a particular discrete group \( \Gamma \). We use the identification from [ACT2] of \( \mathcal{M} \) with the Baily-Borel compactification of \( \mathcal{B}_4 / \Gamma \). Our forms span a 10-dimensional space, and we exhibit the image of \( \mathcal{M} \) in \( \mathbb{C}P^9 \) as the intersection of 270 cubic hypersurfaces. Finally, we interpret the pairwise ratios of our forms as the original invariants of cubic surfaces, the cross-ratios introduced by Cayley. It turns out that this model of \( \mathcal{M} \) was found by Coble [C] in an entirely different way; see [vG].