Answer:
Yes
Step-by-step explanation:
Given that a relation R is defined on the set Z by "a R b if a - b is divisible by 5
for a, b in the set of integers.
Reflexive:
We have
for any a, [tex]a-a=0 = 5(0)[/tex]
i.e. (a,a) is related. Hence reflexive
ii) Symmetric:
If a-b is divisible by 5, then b-a is also divisible by 5. Hence symmetric
iii) Transitive
If [tex]a-b = 5m and\\ b-c = 5l[/tex]
adding we get
[tex]a-c=5(m+l)[/tex]
Hence R is transitive
It follows that R is an equivalence relation on Z
