Logical reasoning
Informally, two kinds of logical reasoning can be distinguished in addition to formal deduction: induction and abduction. Given a precondition or premise, a conclusion or logical consequence and a rule or material conditional that implies the conclusion given the precondition, one can explain that:
- Deductive reasoning determines whether the truth of a conclusion can be determined for that rule, based solely on the truth of the premises. Example: "When it rains, things outside get wet. The grass is outside, therefore: when it rains, the grass gets wet." Mathematical logic and philosophical logic are commonly associated with this type of reasoning.
- Inductive reasoning attempts to support a determination of the rule. It hypothesizes a rule after numerous examples are taken to be a conclusion that follows from a precondition in terms of such a rule. Example: "The grass got wet numerous times when it rained, therefore: the grass always gets wet when it rains." While they may be persuasive, these arguments are not deductively valid, see the problem of induction. Science is associated with this type of reasoning.
- Inductive-creative reasoning this term has been coined by D. Iosif to combine the specificity of the observation set from the inductive arena and the creativity (and intuition) element from the abductive arena therefore providing a cogent view of the future. This methodology will result in grounded creative thinking and can be used in strategy planning to generate future as-yet unobserved phenomena. One example would be: "we observed a large number of white swans on all continents and hypothesize that we need to protect by law all swans that are white but also black (in existence but unobserved) and red (possibly to be re-engineered in a distant future)". While inductive reasoning cannot yield an absolutely certain conclusion, it can actually increase human knowledge (it is ampliative).
- Abductive reasoning, aka inference to the best explanation, selects a cogent set of preconditions. Given a true conclusion and a rule, it attempts to select some possible premises that, if true also, can support the conclusion, though not uniquely. Example: "When it rains, the grass gets wet. The grass is wet. Therefore, it might have rained." This kind of reasoning can be used to develop a hypothesis, which in turn can be tested by additional reasoning or data. Diagnosticians, detectives, and scientists often use this type of reasoning.
See also
References
- Menzies, T. Applications of Abduction: Knowledge-Level Modeling. November 1996
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