A modal solution of the full-wave Method of Moments (MoM) based on a quasi-static eigenvalue problem is presented. The resulting modal current solutions have to be determined only once and serve as a global basis and test functions. Since only the resonant modes within the frequency bandwidth of interest are required, the system order can be significantly reduced. It is shown how the contribution of the remaining modes can be determined by a single quasi-static calculation. In addition, by extracting the divergence-free modes, the typical low-frequency breakdown of the MoM is eliminated. Furthermore, the modal solution provides also a physical insight into the system behavior.