170 METHODS OF MATHEMATICAL PROOF, PART I Chapter 5
and x, be real numbers such that x, < x,. Then M = M(x, - x,)/(x, - x,) =
[M(x, - x,) + (B - B)]/(x, - x,) = [(Mx, + B) - (Mx, + B)]/(x, - x,) > 0, since
Mx, + B < Mx, + 6, by our assumption that f is increasing.
(c) FACT The subset S = [O,^11 u [2,^31 of R is not an interval.
Start of "Proof" Using the logical negation of the definition of "interval," as stated
in Example 2, it is sufficient to show that there exist real numbers a, b, and c such
thata<b<c,a~Sandc~Sbut ~ES.
(d) THEOREM For any subsets X and Y of a universal set U, if X c Y, then X u
Y = U.
Start of "Proof" Let X and Y be sets and let w be an arbitrarily chosen element of
X. We must prove WE Y....
(e) FACT [O, 21 is not a subset of [I, 31.
Start of "Proof" Let x be an arbitrary element of [O, 21. We must prove x#
[I, 31....5.3 Proof by Specialization and
Division into CasesProofs of theorems whose conclusion has the form (Vx)(p(x) -, q(x)),
such as those contained in the preceding article, can vary greatly accord-
ing to the specific problems encountered in adapting the assumption that
p(x) is valid, possibly together with some given hypotheses, toward the
desired conclusion q(x). In particular, consider these problems:EXAMPLE 1 Prove that if a subset C of R x R is symmetric with respect
to both the x axis and the origin, then C is symmetric with respect to
the y axis.EXAMPLE 2 Given sets A, B, and X, prove that if A n X G B n X and
A n X' G B n X', then A G B.Both these statements are of the type considered in Article 5.2, since the
conclusion of each (i.e., "C is symmetric with respect to the y axis" and
"A is a subset of B) has a definition of logical form (tlx)(p(x) + q(x)).
Thus in each case we should begin the proof by focusing on that con-
clusion and setting up the proof in terms of its definition.
Specifically, in Example 1, we start by assuming that the ordered pair
(x, y) is an element of C; we must prove that (- x, y) E C, using the given
hypotheses. In Example 2 we begin by letting x be an arbitrary element
of A. We must prove x E B. To accomplish this, we will somehow have
to make use of the two given hypotheses, involving a third set X. Before
reading on, think about these two examples. Can you determine how to
complete the proof of one or both of them? Take some time now to try