Abstract
In traditional propositional logic, many replacement and inference rules were involved to ascertain if the truth of several antecedents implied the truth of a particular consequent. This research described a powerful technique called the Modern Syllogistic Method (MSM), which ferreted out from a set of premises all that can be concluded from it and casted the resulting conclusions in the simplest and most compact form. We observed that all replacement rules were explicitly and inherently integrated within the MSM and proved that all inference rules were simply limited special cases of it. This meant that the MSM constituted a complete method of logic deduction. We also showed how to use the MSM in determining whether inconsistencies existed within a given set of premises and also in detecting formal logical fallacies. We demonstrated the applicability of the method in diverse fields via four examples that illustrated its mathematical details and exhibited the nature of conclusions it can come up with. In fact, these examples demonstrated the possibility of extracting deductions that were not so obvious and even surprising. The examples also showed how logic can be misused and how logic misuse can be avoided or detected.
Highlights
Propositional logic, called sentential logic, has a long history of more than 2000 years
We show that the Modern Syllogistic Method (MSM) is a complete method of logic deduction since it includes all rules of propositional logic as special cases of it
We show that the MSM has a built-in capability of deducting the existence of inconsistency within a given set of premises and of demonstrating that inconsistent premises validly yield any conclusion whatsoever, no matter how irrelevant
Summary
Propositional logic, called sentential logic, has a long history of more than 2000 years. To test the truth of any claimed conclusion based on a given set of premises, one just needs to cast this conclusion in the form of a disjunction of terms equated to 0 and check to see if each of these terms subsumes (at least) one of the prime implicants in CS (f) derived for the set of premises.
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