Let L denote the set of all straight lines in a plane. Let a relation R be defined by a R `b hArr a bot b, AA a, b in L`. Then, R is

Let L denote the set of all straight lines in a plane.Let a relation R be defined by alpha R beta alpha _|_ beta,alpha,beta in L .Then R is

Let L denote the set of all straight lines in a plane. Let a relation R be defined by l\ R\ m iff l is perpendicular to m for all, l ,\ m in L . Then, R is (a) reflexive (b) symmetric (c) transitive (d) none of these

Let S be the set of all real numbers and Let R be a relations on s defined by A R B hArr |a|le b. then ,R is

Let the relation R be defined in N by aRb , if 2a + 3b = 30 . Then R = …… .

Let the relation R be defined in N by aRb, if 2a + 3b = 30. Then R = …… .

If R is a relation on the set T of all triangles drawn in a plane defined by a R b iff a is congruent to b for all, a, b in T, then R is

Let T be the set of all triangles in the Euclidean plane, and let a relation R on T be defined as a\ R\ b if a is congruent to b for all a ,\ b in T . Then, R is (a) reflexive but not symmetric (b) transitive but not symmetric (c) equivalence (d) none of these

Let L be the set of all straight lines drawn in a plane, prove that the relation 'is perpendicular to' on L is not transitive.

Let R_(1) be a relation defined by R_(1)={(a,b)|agtb,a,b in R} . Then R_(1) , is

Let N be the set of all natural numbers. Let R be a relation on N xx N , defined by (a,b) R (c,c) rArr ad= bc, Show that R is an equivalence relation on N xx N .