Let R={(3,3),(5,5),(9,9),(12,12),(5,12), (3,9),(3,12),(3,5)} be a relation on set A={3,5,9,12} Clearly, every element of A is related to itself. Therefore, it is a reflexive. Now, R is not symmetry because 3 is related to 5 but 5 is not related to 3 . Also R is transitive relation because it satisfies the property that if aRb and bRc then aRc.