J. A. Reneke has shown that the linear Stieltjes-Volterra integral equations studied by D. B. Hinton can be transformed into Stieltjes integral equations of the type studied by J. S. Mac Nerney. By taking advantage of the nonlinear nature of Mac Nerney’s results, Reneke was able to extend Hinton’s existence theorem to a nonlinear setting. In this paper, we use Reneke’s embedding technique to generalize several other of Hinton’s results, and we characterize completely, in the linear case, the range of Reneke’s embedding transformation.