Let A={1,2,3,4,5,6} A relation R is defined on A as R={(x,y):x is a multiple of 2}.Then
R is not reflexive,symmetric,not transitive
R is not reflexive,not symmetric,transitive
R is not reflexive,not symmetric,not transitive
R is reflexive,not symmetric,not transitive

The relation R is such that a Rb o*|a|>=|b Reflexive,not symmetric,transitive Reflexive, symmetric,transitive Reflexive,not symmetric,not transitive none of above

6.In the set A={1,2,3,4,5), a relation R is defined by R={(x,y):x, ye Aand rlty }. Then R is (a) reflexive (b) symmetric (c) transitive (d) none of these

Let w denote the words in the english dictionary. Define the relation R by: R = {(x,y) in W xx W | words x and y have at least one letter in common}. Then R is: (1) reflexive, symmetric and not transitive (2) reflexive, symmetric and transitive (3) reflexive, not symmetric and transitive (4) not reflexive, symmetric and transitive

Let R be a relation defined by R={(a,b):a>=b,a,b in R}. The relation R is (a) reflexive,symmetric and transitive (b) reflexive,transitive but not symmetric ( d) symmetric,transitive but not reflexive (d) neither transitive nor reflexive but symmetric

The relation S is defined on set A={1,2,4,8} as S={(1,1)(2,2)(4,4)(8,8),(1,2),(1,4),(4,8)} then [A] S is reflexive and symmetric but not transitive [B] S is not reflexive,not symmetric,no transitive [C] S is not symmetric and transitive but reflexive [D] S is equivalance

Every relation which is symmetric and transitive is also reflexive.

Give an example of a relation which is reflexive and symmetric but not transitive.

In a set of real numbers a relation R is defined as xRy such that |x|+|y|<=1 then relation R is reflexive and symmetric but not transitive symmetric but not transitive and reflexive transitive but not symmetric and reflexive (4) none of reflexive,symmetric and transitive

Let R be the relation on the set of all real numbers defined by aRb iff |a-b|<=1 .Then R is Reflexive and transitive but not symmetric Reflexive symmetric and transitive Symmetric and transitive but not reflexive Reflexive symmetric but not transitive

Let R be the relation on the set of all real numbers defined by aRb iff |a-b|<=1 .Then R is O Reflexive and transitive but not symmetric O Reflexive symmetric and transitive O Symmetric and transitive but not reflexive O Reflexive symmetric but not transitive