• If a person is dead (the stronger reason), then one can, with equal or greater certainty, argue
a fortiori that the person is not
breathing. "Being dead" trumps other arguments that might be made to show that the person is dead, such as "he is no longer breathing"; therefore, "he is no longer breathing" is an extrapolation from his being dead and is a derivation of this strong argument. • If it is known that a person is dead on a certain date, it may be inferred
a fortiori that he is exempted from the suspect list for a murder that took place on a later date,
viz. "Allen died on 2 April, therefore,
a fortiori, Allen did not murder Joe on 3 April". • If driving 10 km over the speed limit is punishable by a fine of $50, it can be inferred
a fortiori that driving 20 km over the speed limit is also punishable by a fine of at least $50. • If a teacher refuses to add 5 points to a student's grade because the student does not deserve an additional 5 points, it can be inferred
a fortiori that the teacher will also refuse to raise the student's grade by 10 points. • If married couples are forbidden from sharing a room, for example in a hotel, it can be inferred
a fortiori that unmarried couples will also be unable to share a room.
In mathematics Consider the case where there is a single
necessary and sufficient condition required to satisfy some
axiom. Given some theorem with an additional restriction imposed upon this axiom, an "a fortiori" proof will always hold. To demonstrate this, consider the following case: • For any
set A, there does not exist a
function mapping A onto its
powerset P(A). (Even if A were empty, the powerset would still contain the empty set.) • There cannot exist a
one-to-one correspondence between A and P(A). Because bijections are a special case of onto functions, it automatically follows that if (1) holds, then (2) will also hold. Therefore, any
proof of (1) also suffices as a proof of (2). Thus, (2) is an "a fortiori" argument. ==Types==