The relation R : A `to` B where A = {2,3,4,5,6,7,} and B={1,4,} is defined by R ={ (x,y) : x `gt y, x in` A, y `in` B}

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

A relation R from the set A = {3, 4, 5, 6} to the set B = {2, 6, 7, 10} is defined as follows: (x,y) inR rArrx is relatively prime to Y Find R and R^-1 as sets of ordered pairs.

Let A={1,2,3,5} and B={4,6,9} let R =R={(x,y):abs(x-y) is odd x in A,y in B} write R in the roster form

If set A and B are defined as A = {(x,y)|y = 1/x, 0 ne x in R}, B = {(x,y)|y = -x , x in R,} . Then

A =(1, 2, 3, 5) and B= {4, 6, 9). Define a relation R from A to B by R= {(x, y): the difference between x and y is odd, x in A, y in B} . Write R in roster form.

Let X = {1,2,3,4,5} and Y = { 1,3,5,7,9}. (i) If R_(1) = { (x,y) : y =x+2, x in X ,y in Y} then R_(1) is a relation from X to Y because

Let R be the relation on the set A of first eight natural numbers defined by, {R=(x,y) , x in A y in Aand 2x +y= 12 then the domain of R^(-1) is-

A relation R is defined from A={1,2,4,5}" to "B={1,2,3,4} in such a way that, (x,y)inRimpliesxgty Express R as a set of ordered pairs.

A relation R on the set of integers Z is defined as follows : (x,y) in R rArr x in Z, |x| lt 4 and y=|x|