XI5.2 Discontinuities and Monotone Functions 241I I
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:JCxI 2)
X2 x
IncreasingFigure 5.4yI I
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:JCI x1) >
X2
DecreasingxExamples 5.2.16 (a) The greatest integer function^5 is defined by lxJ =
the greatest integer ::; x. (See Figure 5.5 (a).) It is monotone increasing on
( -oo, +oo), but is not strictly increasing there.
(b) The function f(x) = x^2 is strictly decreasing on (-oo,O] and strictly
increasing on [O, +oo).
y
-1- )
-1
-1
y = LxJx-1 x
~
(a) (b)Figure 5.50
An interesting fact about monotone functions is that they can have only
one type of discontinuity, which we establish in the following two theorems and
a corollary.
- This function is sometimes called the "bracket function" or the "integer floor function."