BASIC CONCEPT SET (ADVANCE MATH)
To know the basic concepts of sets let us understand from our
day to day life we often speak or hear about different types of collections.
Such as:
(i) a collection of pens
(ii) a collection of dolls
(iii) a collection of books, etc.
In the same way we have different types of groups made for
different activity such as:
(i) a group of boys playing cricket
(ii) a group of girls playing tennis
(iii) a group of friends
going for movie, etc.
In mathematics, a collection of particular things or group of particular objects is called a set. The theory of sets as developed George Cantor is being used in all branches of mathematics nowadays. According to him ‘A set is a well defined collection of distinct objects of our perception or of our thought, to be conceived as a whole’.
As in the case of the concepts of geometrical point, line and a plane, a rigid definition is not possible for a set also. Is the intuitive conception of a collection or assemblage of things, real or conceptual.
The examples of the basic concepts of sets are:
(i) a set of living cricketers in the Australia.
(ii) a set of the rules for the badminton game;
(iii) a set of integers with prescribed conditions;
(iv) a set of books in the library;
(v) a set of the states in America;
Thus, the basic concepts of sets is a well-defined collection of objects which are called members of the set or elements of the set. Objects belongs to the set must be well-distinguished.
Definition of set:
A set is a collection of well-defined objects.
Explanation of the term “Well-defined”:
Well-defined means, it must be absolutely clear that which object belongs to the set and which does not.
For example:
‘The collection of positive numbers less than 10’ is a set, because, given any numbers, we can always find out whether that number belongs to the collection or not. But ‘the collection of good students in your class’ is not a set as in this case no definite rule is supplied by the help of which you can determine whether a particular student of your class is good or not. Thus, ‘the collection of first five months of a year’ is a set, but ‘the collection of rich man in your town’ is not a set.
Now, to get basic concepts of sets about the meaning of well-defined the following examples are given below.
1. The collection of vowels in English alphabets. This set contains five elements, namely, a, e, i, o, u.
2. A group of “Singers with ages between 18 years and 25 years” is a set, because the range of ages of the singer is given and so it can easily be decided that which singer is to be included and which is to be excluded. Hence, the objects are well-defined.
3. A collection of “Red flowers” is a set, because every red flowers will be included in this set i.e., the objects of the set are well-defined.
4. The collection of past presidents of the United States union is a set.
5. A group of “Young dancers” is not a set, as the range of the ages of young dancers is not given and so it can’t be decided that which dancer is to be considered young i.e., the objects are not well-defined.
6. The collection of cricketers in the world who were out for 99 runs in a test mach is a set.
Thus, basic concepts of sets are explained with the various examples. To know more in details follow the following contents.
introduction to sets, methods for defining sets, element of set and use of set
notations.
Sets Theory: Brief description on set theory
and the important sets used in mathematics.
Objects Form a Set: State, whether the following objects form a set or not by giving reasons.
Elements of a Set: Learn how to find the elements of a
set with the help of various types of problems on the basic concepts of sets.
Properties of Sets: Using the basic properties to
represent a set learn to solve various basic types of problems on sets.
Representation of a Set: Definition with examples of
statement form, roster form or tabular form, set builder form cardinal number of a set and the standard sets of numbers.
Different Notations in Sets: Some of the familiar
notations used in sets which are generally required to solve various types of
problems on sets.
Standard Sets of Numbers: Learn to represent the
standard sets of numbers using the three methods i.e. statement form, roster
form and set builder form.
Types
of Sets: Definition with examples of empty set or null set, singleton
set, finite set, infinite set, cardinal
number of a set, equivalent set and equal sets.
Pairs
of Sets: Definition with examples of equal set, equivalent set, disjoint sets and
overlapping set.
Subset:
Definition with examples of subset and its types, super set, proper subset,
power set and universal set.
Subsets of a Given Set: How to find the number of
subsets of a given set and number of proper subsets of a given set.
Finite Sets and Infinite Sets: Learn how to
distinguish between finite set and infinite set with examples.
Power
Set: Explanation on power sets will help us to get the basic concepts if sets with examples.
Operations on Sets: Learn the meaning. What are
the four basic operations on sets? How the operations are carried out in union
of sets and intersection of sets?
Union
of Sets: Definition of union of sets with examples. Learn how to find the
union of two sets and worked-out examples.
Problems on Union of Sets: Learn how to find the union
of two or more sets and worked-out examples of operations on union of sets.
Intersection of Sets: Definition of intersection of
sets with examples. Learn how to find the intersection of two sets and
worked-out examples.
Problems on Intersection of Sets: Learn
how to find the intersection of two or more sets and worked-out examples of
operations on intersection of sets.
Difference of two Sets: Learn how to find the
difference between the two sets and worked-out examples.
Complement of a Set: Definition of complement of a
set and their properties with some worked-out examples.
Problems on Complement of a Set: Learn
how to find the complement of two or more sets and worked-out examples of
operations on complement of sets.
Problems on Operation on Sets: Learn how to find the
union and intersection of two or more sets and worked-out examples of the two
basic operations of sets.
Cardinal number of a set: Definition of a cardinal
number of a set, the symbol used for showing the cardinal number, worked-out
examples.
Cardinal Properties of Sets: Learn how to solve the
real-life word problems on set using the cardinal properties.
Word Problems on Sets: Apply set operations to solve word
problems involving the properties of union and intersection of sets.
Venn
Diagrams: Learn to represent the basic concepts of sets using Venn-diagram
in different situations.
Venn Diagrams in Different Situations: Learn how to use the Venn diagrams in
different situations to find the different sets.
Relationship in Sets using Venn Diagram: Learn
how to find the relationship of the union, intersection and difference of the
two sets using Venn-diagram.
Union of Sets using Venn Diagram: Diagrammatic representation to find
the union of two sets and their properties, worked-out examples.
Intersection of Sets using Venn Diagram: Diagrammatic representation to find
the intersection of two sets and their properties, worked-out examples.
Disjoint of Sets using Venn Diagram: Learn
how to represent the disjoint sets of union and intersection using
Venn-Diagram.
Difference of Sets using Venn Diagram: Learn how to represent the difference
between two sets using Venn-Diagram.
Symmetric
Difference using Venn Diagram: Learn how to represent the symmetric
difference between two sets using Venn-Diagram.
Complement
of a Set using Venn Diagram: Learn
how to find the complement of a sets using Venn-Diagram and their properties.
Examples on Venn Diagram: Learn how to use the basic concepts of sets for solving the different types of
problems on Venn diagram.
Laws
of Algebra of Sets: Here we will discuss about some fundamental laws of algebra of
sets.
Proof
of De Morgan’s Law: Learn how to proof De Morgan’s Law step-by-step along with the
examples.
Properties of Elements in Sets: Learn all the
important properties of elements in sets.
Reflexive Relation on Set: What is reflexive relation
on set? Learn step-by step to get the reflexive relation in the basic concepts of sets using solved examples.
Symmetric Relation on Set: What is symmetric relation on set?
Learn step-by step using solved examples.
Anti-symmetric
Relation on Set: What is anti-symmetric relation on set? Learn
step-by step using solved examples.
Transitive
Relation on Set: What is transitive
relation on set? Learn step-by step using solved examples.
Equivalence
Relation on Set: What is
equivalence relation on set? Learn step-by step to get the equivalence relation in the basic concepts of sets using solved examples.