Presentation is loading. Please wait.

Presentation is loading. Please wait.

Sets.

Published byShanna Hancock Modified over 8 years ago

Similar presentations

Presentation on theme: "Sets."— Presentation transcript:

1 Sets

2 Definition A set is a well-defined collection of objects called its elements. A={1, 2, 3} 1 is in A, 4 is not in A, {3} is not in A

3 Subsets Set A is a subset of set B if any element in A is also an element in B NEGATION: Set A is not a subset of set B means there is an element in A that is not in B

4 Venn-Diagrams B A=B A A

5 Venn-Diagrams B B A A A B

6 Proper Subset A proper subset of a set is a subset that is not equal to its containing set. Thus B A

7 Standard Position A B

8 EXAMPLE 1 Let A = {1} and B = {1, {1}}. a. Is A  B?
b. If so, is A a proper subset of B?

9 EXERCISE (Proofs) Define sets A and B as follows: Is A  B ?
c. Is B  A ?

10 Equality of Sets To know that a set A equals a set B, you must know that A  B and you must also know that B  A.

11 Example Define sets A and B as follows: Is A = B?

12 Z, Q, R

13 Operations Between Sets

14 Shaded region represents A  B. Shaded region represents A  B. Shaded region represents B – A. Shaded region represents Ac.

15 EXAMPLE Let the universal set be the set U = {a, b, c, d, e, f, g}
and let A = {a, c, e, g} and B = {d, e, f, g}. Find A  B A  B B – A Ac.

16 There is a convenient notation for subsets of real numbers that are intervals.
Observe that the notation for the interval (a, b) is identical to the notation for the ordered pair (a, b). However, context makes it unlikely that the two will be confused.

17 EXAMPLE Let the universal set be the set R of all real numbers and let These sets are shown on the number lines below. Find A  B, A  B, B – A, and Ac.

18 THE EMPTY SET

19 Mutually Disjoint Sets
a. Let A1 = {3, 5}, A2 = {1, 4, 6}, and A3 = {2}. Are A1, A2, and A3 mutually disjoint? b. Let B1 = {2, 4, 6}, B2 = {3, 7}, and B3 = {4, 5}. Are B1, B2, and B3 mutually disjoint?

20 Partition of a Set Suppose A, A1, A2, A3, and A4 are the sets of points represented by the regions shown below. A1, A2, A3, and A4 are disjoint subsets of A, and A = A1 U A2 U A3 U A4.

21

22 Let A = {1, 2, 3, 4, 5, 6}, A1 = {1, 2}, A2 = {3, 4}, and A3 = {5, 6}. Is {A1, A2, A3} a partition of A? b. Let Z be the set of all integers and let Is {T0, T1, T2} a partition of Z?

23 Power Set of a Set Find the power set of the set {x, y}. That is, find

24 Ordered n-tuples

25 Cartesian Product

26 Exercise Let A1 = {x, y}, A2 = {1, 2, 3}, and A3 = {a, b}. a. b. c.

Download ppt "Sets."

Similar presentations

Introduction to Set Theory

Introduction to Set Theory
Equivalence Relations

Equivalence Relations
Discrete Structures Chapter 6: Set Theory

Discrete Structures Chapter 6: Set Theory
Discrete Mathematics I Lectures Chapter 6

Discrete Mathematics I Lectures Chapter 6
Discrete Mathematics Lecture 5 Alexander Bukharovich New York University.

Discrete Mathematics Lecture 5 Alexander Bukharovich New York University.
Week 21 Basic Set Theory A set is a collection of elements. Use capital letters, A, B, C to denotes sets and small letters a 1, a 2, … to denote the elements.

Week 21 Basic Set Theory A set is a collection of elements. Use capital letters, A, B, C to denotes sets and small letters a 1, a 2, … to denote the elements.
2.1 Sets. DEFINITION 1 A set is an unordered collection of objects. DEFINITION 2 The objects in a set are called the elements, or members, of the set.

2.1 Sets. DEFINITION 1 A set is an unordered collection of objects. DEFINITION 2 The objects in a set are called the elements, or members, of the set.
Denoting the beginning

Denoting the beginning
Sets Definition of a Set: NAME = {list of elements or description of elements} i.e. B = {1,2,3} or C = {x  Z + | -4 < x < 4} Axiom of Extension: A set.

Sets Definition of a Set: NAME = {list of elements or description of elements} i.e. B = {1,2,3} or C = {x  Z + | -4 < x < 4} Axiom of Extension: A set.
Discrete Structures Chapter 3 Set Theory Nurul Amelina Nasharuddin Multimedia Department.

Discrete Structures Chapter 3 Set Theory Nurul Amelina Nasharuddin Multimedia Department.
Sets 1.

Sets 1.
CSE115/ENGR160 Discrete Mathematics 02/10/11 Ming-Hsuan Yang UC Merced 1.

CSE115/ENGR160 Discrete Mathematics 02/10/11 Ming-Hsuan Yang UC Merced 1.
Sets 1.

Sets 1.
Sets. Copyright © Peter Cappello 20112 Definition Visualize a dictionary as a directed graph. Nodes represent words If word w is defined in terms of word.

Sets. Copyright © Peter Cappello Definition Visualize a dictionary as a directed graph. Nodes represent words If word w is defined in terms of word.
1 Set Theory. 2 Set Properties Commutative Laws: Associative Laws: Distributive Laws:

1 Set Theory. 2 Set Properties Commutative Laws: Associative Laws: Distributive Laws:
1 Set Theory. Notation S={a, b, c} refers to the set whose elements are a, b and c. a  S means “a is an element of set S”. d  S means “d is not an element.

1 Set Theory. Notation S={a, b, c} refers to the set whose elements are a, b and c. a  S means “a is an element of set S”. d  S means “d is not an element.
SET Miss.Namthip Meemag Wattanothaipayap School. Definition of Set Set is a collection of objects, things or symbols. There is no precise definition for.

SET Miss.Namthip Meemag Wattanothaipayap School. Definition of Set Set is a collection of objects, things or symbols. There is no precise definition for.
Sets.

Sets.
DP SL Studies Chapter 7 Sets and Venn Diagrams. DP Studies Chapter 7 Homework Section A: 1, 2, 4, 5, 7, 9 Section B: 2, 4 Section C: 1, 2, 4, 5 Section.

DP SL Studies Chapter 7 Sets and Venn Diagrams. DP Studies Chapter 7 Homework Section A: 1, 2, 4, 5, 7, 9 Section B: 2, 4 Section C: 1, 2, 4, 5 Section.
2.1 – Sets. Examples: Set-Builder Notation Using Set-Builder Notation to Make Domains Explicit Examples.

2.1 – Sets. Examples: Set-Builder Notation Using Set-Builder Notation to Make Domains Explicit Examples.

Similar presentations

Ads by Google