Classifying & Comparing: Statements
Gig Φ Philosophy
(at-a-glance overviews of philosophical concepts)
Published October, 2022
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Classifying Statements
Constructing a truth table for compound statements not only helps us to determine the possible truth values of that statement, but can also tell us something about the statement's logical structure.
What is more, a truth table for compound statements reveals whether the truth of the statement depends on the specific truth values of its components or the logical form or structure of the entire statement.
We can classify even the most complex compound statements in the following ways (Notice in the examples below that the determination of classification depends solely upon the truth values under the main logical operator):
TAUTOLOGY
All TRUE
SELF-CONTRADICTORY
All FALSE
CONTINGENT
≥1 TRUE & ≥1 FALSE
Comparing Statements
Similarly, truth tables may also be used to determine the relationship between multiple statements.
This is valuable when considering the strength of an argument and how well various parts of the argument work to support one another.
We can compare statements to one another in the following ways:
LOGICAL EQUIVALENCE
SAME values on each line
CONTRADICTION
OPPOSITE values on each line
CONSISTENT
≥1 line both TRUE
INCONSISTENT
0 lines both TRUE
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