Chapter 7
conjuction
a compound statement that has two distinct statements (called conjuncts) connected by the dot symbols
exclusive disjunction
an exclusive disjunction is where both disjuncts cannot be true at the same time
simple statement
one that does not have any other statements as a component
non-contingent statements
statements such that the truth values in the main operator column do not depend on the truth values of the component parts
contingent statements
statements that are neither necessarily true nor necessarily false (they are sometimes true, sometimes false)
biconditonal
a compound statement consisting of two conditionals- one indicated by the word "if" and the other indicated by the phrase "only if." The triple bare symbol is used to translate a bi-conditional statement
disjunction
a compound statement that has two distinct statements (called disjuncts) connected by the wedge symbol
compound statement
a statement that has at least one simple statement as a component
self-contradiction
a statement that is necessarily false
tautology
a statement that is necessarily true
inclusive disjunction
an inclusive disjunction is where both disjuncts can be true at the same time
conditional
in ordinary language, the word "if" typically precedes the antecedent of a conditional. The horseshoe symbol is used to translate a conditional statement
logical operators
special symbols that can be used as part of ordinary language statement translations
propositional logic
the basic components in propositional logic are statements
main operator
the operator that has in its range the largest component or components in a compound statement
truth function
the truth value of a truth-functional compound proposition is determined by the truth value of its components and the definitions of the logical operators involved. Any truth-functional compound proposition that can be determined in this manner is said to be a truth function
negation
the word "not" and the phrase "it is not the case that" are used to deny the statement that follows them, and we refer to their use as negation
inconsistent statements
two (or more) statements that do not have even one line on their respective truth tables where the main operator are true (but they can be false) at the same time
consistent statements
two (or more) statements that have at least one line on their respective truth tables where the main operators are true
contradictory statements
two statements that have opposite truth values on every line of their respective truth tables
logically equivalent
two truth-functional statements may appear different but have identical truth tables. When this occurs, they are logically equivalent
