|
One of the most notable developments in mathematics has
been that of Set
theory. Set theory is used to compare the different branches of
mathematics and make them as freely interchangeable as possible.
Set theory was developed by the German mathematician George
Cantor (1845-1918) as a very useful technique. It was devised to
give mathematics a clearer look at the internal logic of their
subject. By gaining an understanding of the ways sets operate,
children can learn the elements common to arithmetic, algebra
and geometry.
Instead of dealing with numbers alone, Set theory deals
with sets - well defined collection of things and instead of
addition, subtraction and multiplication that are performed on
numbers, the operations performed on sets are called unions,
intersections and complementation.
Sets are written in any one of following forms.
1.
Table form 2.
Roster form
3. Rule Form
4.
Description form
A set with a single element is called as a singleton set.
A set with finite number of elements is called as FINITE
SET.
A set
with infinite number of elements is called INFINITE SET.
For example, the set of natural numbers is infinite.
The number of distinct elements that a set contains is called
the cardinal number of that set.
The power set of a set is a set which contains all the subsets
of that set. If a set containsn number of elements, then its power set contains 2n
elements. If n(A) = n then n(P(A)) = 2n.
set
which does not contain any elements is called the empty set,
denoted by Φ. The empty set is a subset of every set.
|
Operations in set language
|
|
Operators
|
Meaning
|
|
U-
Union
|
Joins
two sets
|
|
∩
- intersection
|
Selects
the common elements
|
|
A
´
B
|
Cartesian
product of A ´ B
|
|
A-B
|
Selects
the elements of A which are not in B
|
The Venn diagram developed by John Venn is 1880 is often
used as an aid in visualizing sets.
The union of set A with set B (read “A union B” and
written as A U B) is represented by the region bounded by the
two circles. The region where they overlap, labeled C represents
the intersection of the two sets and is read “ A intersection
B” and is written as A ∩
B. It refers to what is common to both sets. The complement of A
U B is D and it represents what is not in AUB. Finally, the
union of A, B and D would be E, a set represented by the entire
rectangle.
FUNCTIONS:
Let
A and B be any two non empty sets. Let Fresh call denote some
rule which associates with each element of A, a unique element
of B. Then, we say f is a function or a mapping from A to B ; denoted by f: A < symbolà
B.
If
an ‘x’ and a ‘y’ can be related through an equation or
graph, they are called ‘variables’ : that is, one changes in
value as the other changes in value. The two have what is known
as a ‘functional relationship’. For example, the distance
covered by a car is a ‘function’ of the speed with which it
is driven, and the time taken to cover the distance.
Although
seemingly of remote concern to anyone but the mathematician, the
idea of variables and functions is of great importance. It has
emerged as a concept fundamental to all higher mathematics.
|
