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Types of Relations - Transitive and Equivalence
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This lesson explains the transitive and equivalence types of relations

## Vineet Loomba is teaching live on Unacademy Plus

Vineet Loomba
💥IITian | Top Educator 💥All Maths Chapters Complete & FREE 💥10+ Years Experience 💥Youtube: Maths Wallah 💥DPPs @ vineetloomba.com

U
thank you mam.....it's so easy to understand
yes, void relation is transitive relation
3:10 in first side transitive functions R2 You wrote (2,2) is missing! There we can also say (3,3) is missing instead of (2,2)
Vineet Loomba
a year ago
yes definitely we can say tht...u jusy need to give one example
yes void is transitive
Vineet Loomba
a year ago
Excellent !! Dont forget to rate 5 stars to the course :)
done sir
yes it is transitive
1. BOARDS PREPARATIONS MADE EASY RELATIONS AND BINARY OPERATIONS CBSE AND STATE BOARDS CLASS 12 PREPARED BY: ER. VINEET LOOMBA IITIAN IIT-IEE MENTOr

2. 100% SUCCESS IN CLASS 12 BOARD EXAMS ABOUT ME B. Tech. From IIT Roorkee IIT-JEE Mentor Since 2010. Youtube, Founder @ vi neetloomba.com unacademy & Many of my students have scored 100/100 & Currently running my own Coaching Institute for JEE Main and Advanced Search vineet loomba unacadem "on G00GLE

3. BOARDS PREPARATIONS MADE EASY RELATIONS AND BINARY OPERATIONS CBSE AND STATE BOARDS CLASS 12 PREPARED BY: ER. VINEET LOOMBA IITIAN IIT-IEE MENTOr

4. Trauive Relation 2- (2,3), (3,2), x2 Thausitvc Thomsi-H ve ..Co condlition cant be check ed Condliton hould be cherked nd it shauld be Non- Thansitive

5. Reflek ve-

6. 100% SUCCESS IN CLASS 12 BOARD EXAMS EXAMPLE: Let T be the set of all triangles in a plane with R a relation in T given by R = {(T1, T): T1 is congruent to Tz). Show that R is an equivalence relation. R is reflexive, since every is congruent to itself. (T1T2)E R similarly (T2T1) E R > since T1-T2 (TiT2) e R, and (T2,T3) e R (T1T3) E R Since three triangles are congruent to each other. SUCCESS IN MATHEMATICS CLASS 12 BOARDS ER. VINEET LOOMBA (IIT ROORKEE)

7. 100% SUCCESS IN CLASS 12 BOARD EXAMS EXAMPLE: Let L be the set of all lines in plane and R be the relation in L define if R = {(11, L2 ): L1 is to L2). Show that R is symmetric but neither reflexive nor transitive. R is not reflexive, as a line L1 cannot be to itself i.e (L1,L) E R 3 2 Then L1 can never be to L3 in fact Lil L3 ie (L1,L2) E R, (L2,L) E R. But (L1, L3)E R SUCCESS IN MATHEMATICS CLASS 12 BOARDS ER. VINEET LOOMBA (IIT ROORKEE)

8. 100% SUCCESS IN CLASS 12 BOARD EXAMS EXAMPLE: Show that the relation R in the set Z of integers given by R- ((a, b) : 2 divides a-b). R is reflexive, as 2 divide a-a 0 ((a,b)e R,(a-b) is divide by 2 > (b-a) is divide by 2 Hence (b,a) e R hence symmetric. Let a,b,c E Z If (a,b) ER And (b,c) e PR Then a-b and b-c is divided by 2 a-b +b-c is even (a-c is even (a,c) e R Hence it is transitive. SUCCESS IN MATHEMATICS CLASS 12 BOARDS ER. VINEET LOOMBA (IIT ROORKEE)

9. 100% SUCCESS IN CLASS 12 BOARD EXAMS EXAMPLE: Check whether the relation R defined in the set {1, 2, 3, 4, 5, 6) as R-((a, b): b a+1 is reflexive, symmetric or transitive Symmetric or transitive R is not reflective, because (1,1) e R R is not symmetric because (1,2)e R but (2,1) R (1,2) e Rand (2,3) E R But (1,3) R Hence it is not transitive SUCCESS IN MATHEMATICS CLASS 12 BOARDS ER. VINEET LOOMBA (IIT ROORKEE)

10. 100% SUCCESS IN CLASS 12 BOARD EXAMS EXAMPLE: Let L be the set of all lines in Xy plane and R be the relation in L define as R = {(Li, L2): L1 ll L2} Show then R is on equivalence relation. Find the set of all lines related to the line Y=2x+4. We know the L1IL2 and L21IL3 Then L1|| L3 LIIL1 l.e (L1,L) ER Hence reflexive Lill L2 then L2 L i.e (LIL2)E R (L2L)e R Hence symmetric Hence Transitive. y = 2x +K When K is real number SUCCESS IN MATHEMATICS CLASS 12 BOARDS ER. VINEET LOOMBA (IIT ROORKEE)