Abstract: A group-theoretic method for constructing symmetric isometric embeddings is used to describe all possible four-dimensional surfaces in flat -dimensional space, whose induced metric is static and spherically symmetric. For such surfaces, we propose a classification related to the dimension of the elementary blocks forming the embedding function. All suitable 52 classes of embeddings are summarized in one table and analyzed for the unfolding property (which means that the surface does not belong locally to some subspace of the ambient space), as well as for the presence of smooth embeddings of the Minkowski metric. The obtained results are useful for the analysis of the equations of motion in the Regge–Teitelboim embedding gravity, where the presence of unfolded embeddings of the Minkowski metric is essential.