We study the existence of solutions for degenerate nonlinear elliptic equations using nonsmooth mountain pass arguments both with and without symmetry, where the weak slope is taken to define critical points. First we consider a class of problems where the leading elliptic term A(x,Du) satisfies usual p-growth conditions (for p > 1) but A is merely convex and not necessarily differentiable in the gradient. Secondly, we show the existence of a sequence of solutions for a class of problems involving the highly singular 1-Laplacian as leading term. The results demonstrate that differentiablility of the leading term is not needed for typical results of elliptic problems.