Let `A` be the set of all human beings in a town at a particular time. Determine whether Relation `R={(x ,\ y): x` is wife of `y` } is reflexive, symmetric and transitive:

Let A be the set of all human beings in a town at a particular time. Determine whether Relation R={(x ,\ y): x is father of y } is reflexive, symmetric and transitive:

Let A be the set of all human beings in a town at a particular time. Determine whether the relation R={(x, y):x" is wife of y",x,yinA} is reflecxive, symmetric and transitive.

Let A be the set of all human beings in a town at a particular time.Determine whether Relation R={(x,y):x is father of y} is reflexive,symmetric and transitive:

Let A be the set of all human beings in a town at a particular time. Determine whether Relation R={(x ,\ y): x and y work at the same place} is reflexive, symmetric and transitive:

Let A be the set of all human beings in a town at a particular time. Determine whether Relation R={(x ,\ y): x and y live in the same locality} is reflexive, symmetric and transitive:

Let A be the set of all human beings in a town at a particular time.Determine whether Relation R={(x,y):x and y work at the same place } is reflexive,symmetric and transitive:

Let A be the set of all human beings in a town at a particular time.Determine whether Relation R={(x,y):x and y live in the same locality } is reflexive,symmetric and transitive:

Let A be the set of human beings in a town at a particular time.A relation R on set A is defined as R = { (x,y): x is younger than y } . Then R is

Let A be the set of human beings living in a town at a particular time and R be the relation on A defined by R-{(x ,y) : x is exactly 7cm taller than y} Check whether the relation R is reflexive, symmetric or transitive on A.

Let A be the set of human beings living in a town at a particular time and R be the relation on A defined by R = (x,y) : x is exactly 7 cm taller than y). Check whether the relation R is reflexive, symmetric or transitive on A.