A relation R is defined on the set of in...

A relation R is defined on the set of integers `Z Z` as follows
R= {(x,y) :x,y `inZ Z` and (x-y) is even }
show that R is an equivalence relation on `Z Z`.

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A relation R is defined on the set of integers `Z Z` as follows
R= {(x,y) :x,y `inZ Z` and (x-y) is even }
show that R is an equivalence relation on `Z Z`.