General correctness, which subsumes partial and total correctness, is defined for both weakest preconditions and strongest postconditions. Healthiness properties for general-correctness predicate transformers are more uniform and complete than those for partial-and-total-correctness systems. In fact, the healthiness properties for partial and total correctness are simple restrictions of those for general correctness. General correctness allows simple formulations of the connections between weakest and strongest postconditions and between the notions of weakest precondition under the "demonic" and "angelic" interpretations of nondeterminism. A problem that plagues $sp - sp(P, C)$ is undefined if execution of $C$ begun in some state ...