In this introductory chapter some mathematical notions are presented rapidly


Download 50.42 Kb.
bet10/11
Sana11.01.2023
Hajmi50.42 Kb.
#1088373
1   2   3   4   5   6   7   8   9   10   11
Bog'liq
kitob

Definition 1.2 Let a and b be real numbers such that .
The closed interval with end-points is the set

If b, one defines open interval with end-points the set

An equivalent notation is
If one includes only one end-point, then the interval with end-points

is half-open on the right, while

is half-open on the left.


rasm
Figure 1.6. Geometric representation of the closed interval (left) and of the open
interval (right)
1.3 Sets of numbers 15

,,,,,,,
Example 1.3


Describe the set A of elements x G M such that
2 < |x| < 5.
Because of (1.2) and (1.3), we easily have
A = (-5,-2]U[2,5). D
Intervals defined by a single inequality are useful, too. Define
and
The symbols — CXD and +oo do not indicate real numbers; they allow to extend
the ordering of the reals with the convention that — oo < x and x < +oo for all
X E M. Otherwise said, the condition a < x is the same as a < x < +co, so the
notation [a, +oo) is consistent with the one used for real end-points. Sometimes it
is convenient to set
(-oo,+oo) =R.
In general one says that an interval / is closed if it contains its end-points, open
if the end-points are not included. All points of an interval, apart from the endpoints,
are called interior points.
Bounded sets. Let us now discuss the notion of boundedness of a set.
[a, -hoo) ^
(-00,6]
= {x € R 1 a < x},
= {x G E 1 X < 6},
(a, -hoc) = {x G E 1 a < x},
(-00,6) = {x G E 1 X < 6}.
Definition lA A subset A of R is called bounded from above if there
exists a real number b such that
X
Any b with this property is called an upper bound of A.
The set A is bounded from below if there is a real number a with
a < x^ for all x £ A.
Every a satisfying this relation is said a lower bound of A.
At last, one calls A bounded if it is bounded from above and below.
In terms of intervals, a set is bounded from above if it is contained in an interval
of the sort (—00, 6] with 6 G E, and bounded if it is contained in an interval [a, b]
for some a, 6 G E. It is not difficult to show that A is bounded if and only if there
exists a real c > 0 such that
Ixl < c, for all X e A.
16 1 Basic notions
Examples 1.5
i) The set N is bounded from below (each number a < 0 is a lower bound), but
not from above: in fact, the so-called Archimedean property holds: for any
real b > 0, there exists a natural number n with
n>b. (1.5)
ii) The interval (—oo, 1] is bounded from above, not from below. The interval
(—5,12) is bounded.
iii) The set
n
is bounded, in fact 0 < < 1 for any n G N.
n + 1
iv) The set 5 = {x G Q I x^ < 2} is bounded. Taking x such that \x\ > | for
example, then x^ > | > 2, so x 0 5 . Thus 5 C [-§, §]. •

Download 50.42 Kb.

Do'stlaringiz bilan baham:
1   2   3   4   5   6   7   8   9   10   11




Ma'lumotlar bazasi mualliflik huquqi bilan himoyalangan ©fayllar.org 2024
ma'muriyatiga murojaat qiling