E is a certain event if and only if P(E) = 1.

The biconditional sentence above compactly states the following four conditional sentences:

• if E is a certain event, then P(E) = 1.
• if P(E) = 1, then E is a certain event.
• if E is NOT a certain event, then P(E) ≠ 1.
• if P(E) ≠ 1, then E is NOT a certain event.

If "P" represents one statement and "Q" represents another statement, then "If P then Q" is called a conditional sentence symbolized as "P → Q"

The following four conditional sentences can be considered:

The biconditional sentence P if and only if Q states that the conditional sentence, its converse, inverse and contrapositive are all true.

The biconditional sentence of this example can be broken up into the two parts below:

P: E is a certain event

Q: P(E) = 1

P if and only if Q [i.e. P ↔ Q] results in the following:

• (Conditional sentence: "If P then Q" [P → Q]) if E is a certain event, then P(E) = 1.
• (Converse: "If Q then P" [P ← Q]) if P(E) = 1, then E is a certain event.
• (Inverse: "If ~P then ~Q" [~P → ~Q]) if E is NOT a certain event, then P(E) ≠ 1.
• (Contrapositive: "If ~Q then ~P" [~P ← ~Q]) if P(E) ≠ 1, then E is NOT a certain event.