The
Process of making a new sets from two or more given sets applying some special
rules is known as set operations.
If we are given two sets , then there are three standard ways to construct new
sets from them. The three operations are called binary set operations , which
are as following:
Union:
A
set that contains all the elements contained by first set (A) and second set
(B) is known as union of the two sets (A and B).
We
denote union of two sets (A and B) by symbol A ∪ B.
For
example: if A={1,2,3} and B={3,4,5} Then,
A ∪
B={1,2,3,4,5}
Intersection:
A
set whose elements are the common elements of two sets (A and B) is known as
the intersection of the sets(A and B). The intersection of two sets (A
and B) is denoted by the symbol A ∩ B.
For
example: If A={1,2,3} and B={2,3,4} Then A∩B={2,3}
Complement:
A
set whose elements are all the elements of universal set except a set (A)is
known as the complement of the set (A). The complement of a set (A)
is denoted by symbol  and read as “A complement”
For
example: If A={1,2,3} , B={3,4,5} and C={4,5,6,7} Then , Â={4,5,6,7}
Difference:
The
difference of set A and B is the set formed by a set with all elements of set A
that does not belongs to set B. We denote the difference of set A and B by A-B
and difference if set B and A by B-A.
For
example: If As={1,2,3,4} and B={3,4,5,6}
then,
A-B={1,2}
, B-A={5,6} , A-A= φ and B-B= φ
Above
set operations are shown below as graphical representation in Venn diagram.
Union:
In
the following figures A∪B is shown as shaded region:
Intersection:
In
the following figures A∩B is shown as shaded region , in second figure no region is
shaded because in the figure A∩B=Φ
Complement:
In
the folowing figure  is shown by shaded region:
Difference:
In
the first figure below A-B is shown as shaded region and in second figure A-A
is shown and no region as shaded as A-A is Φ
The concept of modern
mathematics is started with set. Set appears in all branches of mathematics.
The main developers of set theory is George Cantor (1845-1915 AD) and presented
by zakayo Mong’ateko .
George Cantor zakayo
Mong’ateko
The word set is
synonym with “Collection” , “Class” or “Aggregate”. Basically set is a
collection or organization of similar objects (an object may be material or
conceptual). and the objects by which a set is made of are called
elements or member of the set. Some example of set are:
1> The countries of Europe.
2>The solar
system.
3>The peoples
living in my house.
4>Vowels of the
English alphabets. etc.
Notation:
Sets are usually
denoted by capital letters and the elements of set are denoted by small
letters. For example : Set A={a,b,c,d} The symbol 
denotes
set membership and symbol 
denotes
non membership. For example in set A above, a A but e A , Which means
the element “a” belongs to set “A” but the “e” doesn’t.
Specification:
A set can be denoted
or membership of a set may be indicated in several ways. Two common ways among
them are:
a> Listing
or Tebulation. In this method elements of set are listed , sperated by
commas and enclosed inside a bracket. For example: V={a,e,i,o,u} My family={me
, my son , my spouse}
b>Description
or Rule. In this method a set is specified by enclosing in brackets a
descriptive phrase or a rule. For example: V={the vowels of the English
alphabet.} N={x:x is a natural number} A={x:x^2-3x=0} In last two examples the
respective set is a group of element x , where each value of element x is
defined by the respective rule.
Finite
and Infinite set:
If a set have a
finite numbers of elements then a set is called finite set else the set is
called infinite set. For example: D={0,2,4,6,8} A={a,e,i,o,u} The above two
sets are finite set while the following sets are infinite one. The set of stars
in Universe. D={set of natural numbers}
Null
Set:
A set which has no
element is called Null set. A Null set is also called Empty set or Void set. It
is denoted by symbol ø For example: A={x:x is a man who gave birth
to a child) N={x:xis a natural number , x>0 and x<1 }
To learn more about
set theory please browse through our site
Relation between sets.
If , in any condition
two or more sets appears in discussion they might have some special relation
between each other. There are many types or relation that might occur between
two or more sets. Those relations are:
Subset:
If one set (A) contains
all the elements that another set (B) contains then the second set (B) is
called to be the subset of first set (A) , or set B contains set A.
In symbol we write
A ⊂ B
(A is contained in B) , B ⊃ A (B contains A)
Both symbols above
means that set A is a subset of set B.
A set may have two or
more subsets.
For example: If set
A={1,2,3,4} Then {1} , {2,3} , {4,1} etc. are the subsets of set A.
Note:
*The number of
elements a set contains is known as its cardinal number.
*The number of
possible subset a set can have is given by the formula 2^s , Where “s” is the
cardinal number of set A.
*If a set contains
all other set that are currently being discussed then the set is called
universal set.
Equal
set:
Two sets are said to
be equal if every element contained by first set is contained by second set and
also every elements contained by second set is contained by first set.
equal sets are
sub set of each other.
For example:
If set A={a,b,c,d}
and set B={d,a,b,c} Then set A and set B are equal set.
Proper
Subset:
If A ⊂
B and A ≠ B(A is not equal to B) then set A is said to be a proper subset of
set B. In other words , A set is said to proper subset of another set if every
elements contains by the set in contained by another also but the another one
also contains some elements not contained in the first set.
For Example: If
A={1,2,3} and B={1,2,3,4} then set A is a proper subset of set B.
Power
set:
A set of all subsets
of any set is known as power set. It is denoted by “2^s”.
For example: If
S={a,b} then all possible subsets of set S are : ø , {a} , {b} ,{a,b}
So , 2^s of set S is
[ø , {a} , {b} ,{a,b}]
As told on the note
above the cardinal number of power set is given by formula 2^s where “s”
is the cardinal number of any set.
Disjoint
sets:
Two sets are said to
be Disjoint if they dont have any common element.
For example: The set
of boys and the set of girls is disjoint , If set A={1,2} and set B={3,4} then
set A and B are disjoint.
Intersecting
sets:
Two sets are said to
be intersecting if some of elements they have are common in both.
For example: If set
A={1,2,3} and set B={3,4,5} then set A and set b are intersecting sets.
Definition:
Given two sets A and B, the intersection is the
set that contains elements or objects that belong to A and to B at the same
time
We write A Ç B
Basically, we find A Ç B
by looking for all the elements A and B have in common. We next illustrate with
examples
Example #1.
To make it easy, notice that what they have in
common is in bold
Let A = {1 orange, 1 pinapple, 1 banana, 1 apple} and B = { 1 spoon, 1 orange, 1 knife, 1 fork, 1 apple}
A Ç B = {1 orange, 1 apple}
Example #2.
Find the intersection of A and B and then make a
Venn diagrams.
A = {b, 1, 2, 4, 6} and B =
{ 4, a, b, c, d, f}
A Ç B = {4, b}
Example #3.
A = { x / x is a number bigger than 4 and
smaller than 8}
B = { x / x is a positive number smaller than 7}
A = { 5, 6,
7} and B = { 1, 2, 3, 4, 5, 6}
A Ç B = {5, 6}
Or A Ç B = { x / x is a number
bigger than 4 and smaller than 7}
Example #4.
A = { x / x is a country in Asia}
B = { x / x is a country in Africa}
Since no countries in Asia and Africa are the
same, the intersection is empty
A Ç B = { }
Example #5.
A
= {#, %, &, *, $ }
B = { }
This example is subtle! Since the empty set is
included in any set, it is also included in A although you don't see it
Therefore, the empty set is the only thing set A
and set B have in common
A Ç B = { }
In fact, since the empty set is included in any
set, the intersection of the empty set with any set is the empty set.
Definition of the union of three sets:
Given three sets A, B, and C the intersection is
the set that contains elements or objects that belong to A, B, and to C at the
same time
We write A Ç B Ç C
Basically, we find A Ç B Ç C
by looking for all the elements A, B, and C have in common.
A = {#, 1, 2, 4, 6}, B = {#, a, b, 4, c,} and C = A = {#, %,
&, *,
$, 4 }
A Ç B Ç C
= {4 , # }
The graph below shows the shaded region for the
intersection of two sets
The
graph below shows the shaded region for the intersection of three sets
This
ends the lesson about intersection of sets. If you have any questions about t
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Mwl. Zakayo
Mong’ateko-
