Question

A relation R in a set A is said to be an

R is reflexive, symmetric and

transitive

relation if

1) Equivalence 2) onto 3) constant 4) one to one​

Answer 1

Answer

It is clearly evident that R is a reflexive relation and also a transitive relation ,

but it is not symmetric as (1,3) is present in R but (3,1) is not present in R .

So, To make R an equivalence relation we can simply add (3,1) to R which will also not disturb transitivity and reflexivity .

Step-by-step explanation: