This dissertation combines formal verification techniques in an attempt to reduce the human effort required to verify large systems formally. One method to reduce the human effort required by formal verification is to modify general-purpose theorem proving techniques to increase the number of lemma instances considered automatically. Such a modification to the forward chaining proof technique within the ACL2 theorem prover is described. This dissertation identifies a decidable subclass of the ACL2 logic, the Subclass of Unrollable List Formulas in ACL2 (SUFLA). SUFLA is shown to be decidable, i.e., there exists an algorithm that decides whether any SUFLA formula is valid. Theorems from first-order logic can be proven through a methodology t...