`R_2={(a ,\ a)}` is defined on set `A={a ,\ b ,\ c}` . Find whether or not it is (i) reflexive (ii) symmetric (iii) transitive.

R={(b , c)} is defined on set A={a ,\ b ,\ c} . Find whether or not it is (i) reflexive (ii) symmetric (iii) transitive.

R_1={(a ,\ a),\ (a ,\ b),\ (a ,\ c),\ (b ,\ b),\ (b ,\ c),\ (c ,\ a),\ (c ,\ b),\ (c ,\ c)} is defined on set A={a ,\ b ,\ c} . Find whether or not it is (i) reflexive (ii) symmetric (iii) transitive.

R_(3)={(b,c)} is defined on set A={a,b,c}. Find whether or not it is (i) reflexive (ii) symmetric (iii) transitive.

R_(1)={(a,a),(a,b),(a,c),(b,b),(b,c),(c,a),(c,b),(c,c)} is defined on set A={a,b,c}. Find whether or not it is (i) reflexive (ii) symmetric (iii) transitive.

Find whether or not R_(3)={(1,3),(3,3)} on A={1,2,3} is (i) reflexive (ii) symmetric (iii) transitive.

Test whether, R_2 on Z defined by (a ,\ b) in R_2 |a-b|lt=5 is (i) reflexive (ii) symmetric and (iii) transitive.

Find whether or not R_3={(1,\ 3),\ (3,\ 3)} , on A={1,\ 2,\ 3} is (i) reflexive (ii) symmetric (iii) transitive.

a R b iff 1+a b >0 is defined on the set of real numbers, find whether it is reflexive, symmetric or transitive.

a R b if |a|lt=b is defined on the set of real numbers, find whether it is reflexive, symmetric or transitive.

On the set of natural numbers let R be the relation defined by aRb if 2a+3b = 30 . Check whether it is (i) reflexive (ii) symmetric (iii) transitive (iv) equivalence