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Discrete Mathematics Homework 12: Relation Basics and Equivalence Relations, Slides of Discrete Mathematics

Shoolini University of Biotechnology and Management Sciences Discrete Mathematics

Cs173 discrete mathematical structures spring 2006 homework #12, focusing on relation basics and equivalence relations. Students are required to determine reflexivity, symmetry, and transitivity of various relations, as well as their transitive closures. Additionally, they must prove that a relation is an equivalence relation and find the number of equivalence classes. The document also covers poset and hasse diagrams.

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CS173: Discrete Mathematical Structures

Spring 2006

Homework #12

Due 04/30/06, 8am

Relation Basics

1. Determine the reflexivity, symmetry, and transitivity of the following relations:

a. R=∅on set {0,1,2,4,6}S=.

b. {(0,1),(1,0),(2,4),(4,2),(4,6),(6,4)}R=on set {0,1,2,4,6}S

=

i. Determine its reflexivity, symmetry, and transitivity

ii. What is its transitive closure?

c.

x

Ry x y

↔

−is a multiple of 3 on setS

=



d. ||||

x

R

y

x

y

↔

≠on set {1,2,3,4,5,6,7,8,9}S

=

e. 11 2 2 1 21 2

(, )( , ) ,

xy

Rx

y

xx

yy

↔≤ ≥on set S

=

×

2. 1

R

and 2

R

are two relations on a set S.

a. If 1

R

and 2

R

are reflexive, is 12

R

R∩reflexive? Is 12

R

R∪reflexive? Explain

your answer.

b. If 1

R

and 2

R

are transitive, is 12

R

R∩transitive? Is 12

R

R∪transitive? Explain

your answer.

c. Can 1

R

be symmetric and antisymmetric at the same time? Why or why

not?

d. Can 1

Rbe neither symmetric nor antisymmetric? Why or why not?

Equivalence Relations

3.

a. Prove that a relation R defined as (,) (, )abRcd a d b c

↔

+=+is an

equivalence relation on

×



.

b. Determine the number of equivalence classes for R under set

{0, 1, 2 , , } {0, 1, 2, , }nn⋅⋅⋅ × ⋅⋅⋅ .

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CS173: Discrete Mathematical Structures

Spring 2006

Homework

Due 04/30/06, 8am

Relation Basics 1. Determine the reflexivity, symmetry, and transitivity of the following relations: a. (^) R = ∅ on set S = {0,1, 2, 4, 6}. b. R = {(0,1), (1, 0), (2, 4), (4, 2), (4, 6), (6, 4)}on set S ={0,1, 2, 4, 6} i. Determine its reflexivity, symmetry, and transitivity ii. What is its transitive closure? c. xRy ↔ x − y is a multiple of 3 on set S = ] d. xRy ↔| x | |≠ y |on set S ={1, 2,3, 4,5, 6, 7,8,9} e. ( x 1 (^) , y 1 (^) ) R x ( 2 (^) , y 2 (^) ) ↔ x 1 (^) ≤ x 2 (^) , y 1 (^) ≥ y 2 on set S = ×

R 1 and R 2 are two relations on a set S. a. If R 1 and R 2 are reflexive, is R 1 (^) ∩ R 2 reflexive? Is R 1 (^) ∪ R 2 reflexive? Explain your answer. b. If R 1 and R 2 are transitive, is R 1 (^) ∩ R 2 transitive? Is R 1 (^) ∪ R 2 transitive? Explain your answer. c. Can R 1 be symmetric and antisymmetric at the same time? Why or why not? d. Can R 1 be neither symmetric nor antisymmetric? Why or why not?

Equivalence Relations 3. a. Prove that a relation R defined as ( , a b R c d ) ( , )↔ a + d = b + c is an equivalence relation on ] ×]. b. Determine the number of equivalence classes for R under set {0,1, 2, ⋅⋅⋅, } n ×{0,1, 2, ⋅⋅⋅, } n.

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POSET and Hasse Diagram 4. Consider the POSET P = ({∅ ,{ },{{ }},{ , a a a ∅},{{ , a ∅}, ∅},{ ,{ }, a a ∅}}, ⊆) a. Draw the Hasse diagram for this POSET. b. What are the maximal elements? Is there a greatest element? If yes, whatis it? c. What is(are) the lower bound(s) of {{{ , a ∅}, ∅},{ ,{ }, a a ∅}}? What is the greatest lower bound of {{{ }}} a?

Discrete Mathematics Homework 12: Relation Basics and Equivalence Relations, Slides of Discrete Mathematics

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Partial preview of the text

Download Discrete Mathematics Homework 12: Relation Basics and Equivalence Relations and more Slides Discrete Mathematics in PDF only on Docsity!

CS173: Discrete Mathematical Structures

Spring 2006

Homework

Due 04/30/06, 8am

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