Let 'n' be a fixed positive integer. A relation `R` on `I` is defined as `a R b hArr n|(a-b)`. Then `R` is `(n|(a-b)` means `(a-b)`, divisible by `n` with remainder 0)

Let n be a fixed positive integer.Define a relation R on the set Z of integers by,aRb hArr n|a-b. Then,R is not

Let n be a fixed positive integer. Define a relation R on the set Z of integers by, a R b iff n | a - b . Then, R is not

Let n be a fixed positive integer. Define a relation R on Z as follows for all a, b in Z, aRb, if and only if a-bis divisible by n. Show that R is an equivalence relation.

Let n be a fixed positive integer. Defiene a relation R in Z as follows : AA a, b in Z , aRb if and only if a - b divisible by n. Show that R is equivalance relation.

Let n be a fixed positive integer. Define a relation R on Z as follows: (a ,\ b) in RhArra-b is divisible by ndot Show that R is an equivalence relation on Zdot

Let n be a fixed positive integer. Define a relation R on Z as follows: (a ,\ b) in RhArra-b is divisible by ndot Show that R is an equivalence relation on Zdot

Let n be a fixed positive integer. Define a relation R on Z as follows: (a ,\ b) in RhArra-b is divisible by ndot Show that R is an equivalence relation on Zdot

Let n be a fixed positive integer. Define a relation R on Z as follows: (a ,\ b) in RhArra-b is divisible by ndot Show that R is an equivalence relation on Zdot