A conditional is a kind of statement that is made out of two others. The normal form of the statement is "If P then Q." P is the antecendt and Q the consequent. "If P, Q" and "Q, if P" are stylistic variations of "If P then Q".
One thing seems quite clear about conditionals:
If the antecedent is true, and the consequent
false, then the conditional as a whole is false. If
Susan comes to the party, and Michael doesn't
bring the salad, then all of the examples preceding
are false. This is the basis for two clearly valid
rules
of inference:
Modus ponens: From If P, then Q and P, infer Q.
Modus tollens: From If P, then Q and not-Q,
infer not-P.
In symbolic logic a defined symbol (often "R") is
called the conditional. The conditions under which
conditional statements that involve this symbol are
true are stipulated by logicians as follows:
1. Antecedent true, consequent true, conditional
true
2. Antecedent true, consequent false, conditional
false
3. Antecedent false, consequent true, conditional
true
4. Antecedent false, consequent false, conditional
true.
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