On the set R of real numbers we define xPy if and only if `xy ge0`. Then the relation P is

A relation rho on the set of real number R is defined as follows: xrhoy if and only if xy gt 0 Then which of the following is /are true?

A relation rho on the set of real number R is defined as follows : xrhoy if and only if xygt0 . Then which of the following is/are true?

Let R be the relation on the set R of all real numbers defined by aRb iff |a-b| le 1. Then, R is

rho is such a relation on the set real numbers RR where x rho y if and xy gt 0 . Then which of the following is / are true ?

For any two real number a and b ,we define a R b if and only if sin^2a + cos^2b = 1 . The relation R is

On R, a relation p is defined by xpy if and only if x-y is zero or irrational. Then

On the set R of real numbers, the relation rho is defined by x rho y, (x, y) in R .

Show that the relation R in the set R of real numbers, defined as R = {(a,b) : a le b ^(2)} is neither reflexive nor symmetric nor transitive.

For any two real numbers a and b , we define aRb if and only if sin ^(2) a +cos ^(2) b=1 , the relation R is -