Conditionals and Biconditionals
Logic is the hygiene the mathematician
practices to keep his ideas healthy and strong.
—Hermann Weyl (1885–1955)
Definitions. Given propositions p and q, represents the conditional proposition "If
p, then q." or "p
implies q." The proposition p is called the antecedent and the proposition q is called the consequent. The conditional has the truth table
|
p |
q |
|
|
T |
T |
T |
|
T |
F |
F |
|
F |
T |
T |
|
F |
F |
T |
Many people have problems understanding the truth values for the conditional. The following example will help illustrate the truth values for the conditional.
A person makes the promise: "If I find a $20 bill, then I will take you to a movie." Now we consider when the person has broken the promise.
(1) The person finds
a $20 bill and takes you to a movie.
is true, since the person did not break the
promise. Note p and q are both true.
(2) The person finds
a $20 bill and does not take you to a movie.
is false, since the person broke the
promise. Note p is true, but q is false.
(3) The person did
not find a $20 bill, but took you to a movie anyway.
is true, since the person did not break the
promise. Note p is false,
but q is true. (This is the case
with which many people have trouble understanding.)
(4) The person did not find a $20 bill and did not take you to a movie.
is
true, since the person did not break the promise. Note p and q
are both false.
Examples of true statements.
(a) If x is an odd integer, then x +
1 is an even integer.
(b) If f is differentiable at a and has a relative extremum at a, then f '(a) = 0.
(c) If two lines are perpendicular to
the same line, then the two lines are parallel. (True in neutral geometry, but false in elliptical geometry.)
(d) If 3 < 2, then 9 < 4.
(e) If 2 < 3, then 4 < 9.
(f) If 3 < 2, then 4 < 9.
Examples
of false statements.
(a) If x is an odd integer, then x
+ 2 is an even integer.
(b) If 2 < 3, then 9 < 4.
Definitions.
The converse of is
.
The inverse of is
.
The contrapositive of is
.
Examples.
conditional: If a polygon is a square, then it has four sides of equal length.
converse: If a
polygon has four sides of equal length, then it is a square.
inverse: If a polygon is not a square,
then it does not have four sides of equal length.
contrapositive: If a polygon does not
have four sides of equal length, then it is not a square.
conditional: If f is differentiable at a and has a relative extremum at a, then f '(a) = 0.
converse: If f '(a) = 0, then f is differentiable at a and has a relative extremum at a.
inverse: If f is not differentiable at a or does not have a relative extremum
at a, then
contrapositive: If then f is not differentiable at a or does not have a relative extremum at a.
A conditional and its contrapositive are equivalent.
|
p |
q |
|
|
p |
q |
~q |
~p |
|
|
T |
T |
T |
|
T |
T |
F |
F |
T |
|
T |
F |
F |
|
T |
F |
T |
F |
F |
|
F |
T |
T |
|
F |
T |
F |
T |
T |
|
F |
F |
T |
|
F |
F |
T |
T |
T |
A conditional is not equivalent to either its inverse or its
converse. Note that the inverse of a conditional is the contrapositive of the
converse.
Definition. p if and
only if q is a biconditional statement and is
denoted by and often written as p iff q. A biconditional is true only when p and q have the same
truth value. The truth table for the biconditional is
|
p |
q |
|
|
T |
T |
T |
|
T |
F |
F |
|
F |
T |
F |
|
F |
F |
T |
Note that is equivalent to
Biconditional statements occur frequently in mathematics. Definitions are usually biconditionals.
Examples.
(a) A quadrilateral is a
rectangle if and only if it has four right angles.
Theorem 1. For propositions p, q and r:
(a)
is logically equivalent to
(b)
is logically equivalent to
.(DeMorgan's)
(c)
is logically equivalent to
.
(DeMorgan's)
(d)
is logically equivalent to
.
(e)
is logically equivalent to
.
(f)
is logically equivalent to
.
(g)
is logically equivalent to
.
(h)
is logically equivalent to
.
Examples.
(a) "It is false that the
transformation is an isometry and the transformation is a dilation." is
equivalent to "The transformation is not an isometry or the transformation
is not a dilation."
(b) "It is not the case that if John is 16 years old, then John has a driver's license." is equivalent to "John is 16 years old and does not have a driver's license."
Definitions.
Conditionals are often written in forms other than
if-then. The terms necessary (only if) and sufficient (if) are often used
when stating conditionals. The antecedent is the sufficient condition; the
consequent is the necessary condition.
Examples
that are equivalent forms of the same conditional.
"For f to be an isometry it is sufficient that f is a rotation."
"If f is a rotation, then f is an isometry."
"For f to be a rotation, it is necessary that f is an isometry."
"f is a rotation only if f is an isometry."
" For two triangles to be perspective from a point, it is necessary for the triangles to be perspective from a line."
"Two triangles are perspective from a point only if the
two triangles are perspective from a line."
"If two triangles are perspective from a point, then they are perspective
from a line."
"For two triangles to be perspective from a line, it is sufficient that the
two triangles are perspective from a point."