79 Views

For a, b R define aRb to mean that |a b| < 5. Prove or disprove each of the following: 1. The relation R is reflexive. 2. The relation R is symmetric. 3. The relation R is transitive.


Akash Girde 7th Nov, 2020
Answers (2)
Ayush 12th Dec, 2020

Hi Candidate,

Reflexive relation on set is a binary element in which every element is related to itself. ... Consider, for example, a set A = {p, q, r, s}. The relation R1 = {(p, p), (p, r), (q, q), (r, r), (r, s), (s, s)} in A is reflexive, since every element in A is R1-related to itself. Since, here the relationship for reflexive relation is satisfied for |ab|<5.

Hope that this answer helps you!!

Anuj More 8th Nov, 2020

Dear Candidate,

Kindly know it is not possible for us to prove a mathematical sum here on this platform from starting to end. We are limited by our answering options. You can search the following query on internet & you will find various portals which will help you understand in better way, which is step by step.


Thanks.

Related Questions

UPES Integrated LLB Admission...
Apply
Ranked #28 amongst Institutions in India by NIRF | Ranked #1 in India for Academic Reputation by QS University Rankings | 16.6 LPA Highest CTC
SLAT 2025 - The Symbiosis Law...
Apply
Conducted by Symbiosis International (Deemed University) | Ranked #5 in Law by NIRF | Ranked #2 among best Pvt Universities by QS World Rankings
Jindal Global Law School Admi...
Apply
Ranked #1 Law School in India & South Asia by QS- World University Rankings | Merit cum means scholarships
Symbiosis Law School Pune Adm...
Apply
NAAC A++ Accredited | Ranked #5 by NIRF
Nirma University Law Admissio...
Apply
Grade 'A+' accredited by NAAC
ISBR Business School PGDM Adm...
Apply
180+ Companies | Highest CTC 15 LPA | Average CTC 7.5 LPA | Ranked as Platinum Institute by AICTE for 6 years in a row | Awarded Best Business Scho...
View All Application Forms

Download the Careers360 App on your Android phone

Regular exam updates, QnA, Predictors, College Applications & E-books now on your Mobile

150M+ Students
30,000+ Colleges
500+ Exams
1500+ E-books