Let `L` be the set of all straight lines in the Euclidean plane. Two line `l_(1)` and `l_(2)` are said to be related by the relation`R` of `l_(1)` is parallel to `l_(2)`, Then `R` is

Let L be the set of all straight lines in the Euclidean plane. Two lines l_(1) and l_(2) are said to be related by the relation R iff l_(1) is parallel to l_(2) . Then, the relation R is not

Straight Lines L1

Straight Line L1

Straight Line L2

Let L be the set of all straight lines in a plane.I_(1) and I_(2) are two lines in the set.R_(1),R_(2) and R_(3) are defined relations

Let L be the set of all straight lines in plane. l_(1) and l_(2) are two lines in the set. R_(1), R_(2) and R_(3) are defined relations. (i) l_(1)R_(1)l_(2) : l_(1) is parallel to l_(2) (ii) l_(1)R_(2)l_(2) : l_(1) is perpendicular to l_(2) (iii) l_(1) R_(3)l_(2) : l_(1) intersects l_(2) Then which of the following is true ?

Let R be the relation over the set of all straight lines in a plane such that l_(1) R l_(2) iff l_(1) _|_ l_(2) . Then, R is

Choose the correct relation between l_(1) and l_(2) ?

Choose the correct relation between l_(1) and l_(2) ?

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