Logical Implication

From Department of Mathematics at UTSA
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A logical implication is a relationship between two statements. If a statement Q is always true when another statement P is true, then we say that "P implies Q", which is denoted symbolically as . Note that if P is false, Q does not necessarily have to be false. For example, if x > 10, then x is also greater than 0, so we can say that "". However, if x is less than 10, it doesn't necessarily mean that x isn't greater than 0. That is, does NOT mean that . The truth table for logical implication is as follows:

T T T
T F F
F T T
F F T

Note that while the inverse of (that is, ) does not necessarily have the same truth value as , the contrapositive () does. For example, and its contrapositive, , are both true or both false at the same time for all values of x.

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