Let R be the relation over the set of all straight lines in a plane such that `l_(1) Rl_(2) hArr l_(1)bot l_(2)`. Then R is

Discuss the relations for reflexivity, symmetricity and transitivity : Let P denote the set of all straight lines in a plane. The relation R defined by " lRm if I is perpendicular to m ".

Let T be the set of all triangles in a plane with R a relation in T given by R ={(T _(1) , T _(2)): T _(1) is congruent to T _(2) } Show that R is an equivalence relation.

Let L be the set of all lines in a plane and R be the relation in L defined as R = {(L _(1), L _(2)) : L _(1) is perpendicular to L _(2) }. Show that R is symmetric but neither reflexive nor transitive.

Show that the relation R defined in the set A of all triangles as R={(T_(1),T_(2)):T_(1) is similar to T_(2) }, is equivalence relation.

Let f be the fundamental frequency of the string . If the string is divided into three segments l_(1) , l_(2) and l_(3) such that the fundamental frequencies of each segments be f_(1) , f_(2) and f_(3) , respectively . Show that (1)/(f) = (1)/(f_(1)) + (1)/(f_(2)) + (1)/(f_(3))

Let P be the set of all triangles in a plane and R be the relation defined on P as a Rb if a is similar to b. Prove that R is an equivalence relation .

Let l be the line belonging to the family of straight lines (a + 2b)x+ (a - 3b)y +a-8b = 0, a, b in R , which is farthest from the point (2, 2), then area enclosed by the line L and the coordinate axes is