Answer : (i) Reflexivity: Let a є Z, a – a = 0 є Z which is also even.
Thus, (a, a) є R for all a є Z. Hence, it is reflexive
- Symmetry: Let (a, b) є R (a, b) є R è a – b is even
-(b – a) is even (b – a) is even (b, a) є R
Thus, it is symmetric
(iii) Transitivity: Let (a, b) є R and (b, c) є R
Then, (a – b) is even and (b – c) is even. [(a – b) + (b – c)] is even
(a – c) is even.
Thus (a, c) є R.
Hence, it is transitive.
Since, the given relation possesses the properties of reflexivity, symmetry and transitivity, it is an equivalence relation.