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

For x,y in I, the relation R is defined by xRy f and only if x<=y then R is

On R, the set of real numbers, a relation p is defined as ‘apb if and only if 1 + ab lt 0. Then

Let R be a relation on N defined by x+2y=8. The domain of R is

Let R be a relation defined as xRy if and only if 2x+3y = 20 , where x, y in N . How many elements of the form (x, y) are there in R?

Let A={1,2,3,...........,100} .Let R be a relation on A defined by (x,y)in R if and only if 2x=3y .Let R_(1) be a symmetric relation on A such that RsubR_(1) and the number of elements in R_(1) is n .Then, the minimum value of n is:

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

On the set R of real numbers we defined xPyi and only if xy<0. Then the relation P is Reflexive but not symmetric

In the set A={1,2,3,4,5}, a relation R is defined by R={(x,y)x,y in A and x

On R, the set of real numbers define a relation ~ as follows: a, b in R a~b if a-b=0 or irrational Then

Let Z be the set of all integers. A relation R is defined on Z by xRy to mean x-y is divisible by 5. Show that R is an equivalence relation on Z.