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Sets | Mathematics for NDA PDF Download

Important Points

  • Union of the sets A and B, denoted A ∪ B, is the set of all objects that are a member of A, or B, or both. The union of {1, 2, 3} and {2, 3, 4} is the set {1, 2, 3, 4}.
  • Intersection of the sets A and B, denoted A ∩ B, is the set of all objects that are members of both A and B. The intersection of {1, 2, 3} and {2, 3, 4} is the set {2, 3}.
  • Set difference of U and A, denoted U \ A, is the set of all members of U that are not members of A. The set difference {1,2,3} \ {2,3,4} is {1}, while, conversely, the set difference {2,3,4} \ {1,2,3} is {4}. When A is a subset of U, the set difference U \ A is also called the complement of A in U. In this case, if the choice of U is clear from the context, the notation Ac is sometimes used instead of U \ A, particularly if U is a universal set as in the study of Venn diagrams.
  • Symmetric difference of sets A and B, denoted A △ B or A ⊖ B, is the set of all objects that are a member of exactly one of A and B (elements which are in one of the sets, but not in both). For instance, for the sets {1,2,3} and {2,3,4}, the symmetric difference set is {1,4}. It is the set difference of the union and the intersection, (A ∪ B) \ (A ∩ B) or(A \ B) ∪ (B \ A).
  • Cartesian product of A and B, denoted A × B, is the set whose members are all possible ordered pairs (a,b) where ais a member of A and b is a member of B. The cartesian product of {1, 2} and {red, white} is {(1, red), (1, white), (2, red), (2, white)}.
  • Power set of a set A is the set whose members are all possible subsets of A. For example, the power set of {1, 2} is{{}, {1}, {2}, {1,2}}.

Set Theory Formulas (Notations) 

For a group of two sets: 

  • De Morgan’s laws: De Morgan’s laws are a pair of transformation rules relating the set operators “union” and “intersection” in terms of each other by means of negation.
  • Demorgan’s First Law: (A ∪ B)’ = (A)’ ∩ (B)’
  • The first law states that the complement of the union of two sets is the intersection of the complements
  • Demorgan’s Second Law: (A ∩ B)’ = (A)’ ∪ (B)’
  • The second law states that the complement of the intersection of two sets is the union of the complements.
  • Cartesian product and relation:
    Cartesian product: If A and B are sets, the Cartesian product of A and B is the set
    A × B = {(a, b):(a ∈ A) and (b ∈ B)}.
  • The following points are worth special attention: The Cartesian product of two sets is a set, and the elements of that set are ordered pairs. In each ordered pair, the first component is an element of A, and the second component is an element of B.
  • Relation: A relation from a set A to a set B is a subset of A×B. A (binary) relation on A is a subset of A × A.
  • Equivalence relation: A given binary relation ‘~’ on a set X is said to be an equivalence relation if and only if it is reflexive, symmetric and transitive.
    Equivalently, for all a, b and c in X:
    a ~ a. (Reflexivity);
    if a ~ b then b ~ a. (Symmetry);
    if a ~ b and b ~ c then a ~ c. (Transitivity)
  • Representation of real numbers on a line: 
    Real numbers (R): Every number, which is either rational or irrational, is called a real number. In other words, a set of real numbers is the union of set of rational numbers and set of irrational numbers.
    Rational numbers: Any number which can be expressed in the form of a/b, where a and b both are integers and b is not equal to zero, is a rational number. Irrational numbers: The numbers which are not rational, are called irrational numbers.
The document Sets | Mathematics for NDA is a part of the NDA Course Mathematics for NDA.
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FAQs on Sets - Mathematics for NDA

1. What are some commonly used notations in set theory formulas?
Ans. Commonly used notations in set theory formulas include symbols such as ∈ (element of), ∪ (union), ∩ (intersection), and ⊆ (subset).
2. How can sets be represented in set theory?
Ans. Sets in set theory can be represented using roster notation (listing elements), set-builder notation (defining properties of elements), or Venn diagrams.
3. What is the significance of set theory in mathematics?
Ans. Set theory serves as the foundation of mathematics by providing a framework for defining and studying collections of objects, which are essential in various mathematical concepts and proofs.
4. How are operations such as union and intersection of sets performed in set theory?
Ans. The union of two sets A and B is denoted by A ∪ B and contains all elements that are in A, B, or both. The intersection of A and B is denoted by A ∩ B and contains elements that are in both A and B.
5. Can you give an example of applying set theory in real-life situations?
Ans. Set theory can be applied in various real-life scenarios, such as organizing data, classifying objects, and analyzing relationships between different groups of items.
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