Let R be the relation defined on the set `NN` of natural number as `R={(x,y)|4x+5y=50,x,y in NN}`. Express `RandR^(-1)` as set of ordered pairs.

Let R be the relation defined on the set N of natural numbers as R = {(x,y)|4x+5y=50,x,y in N} .Express R and R^-1 as set of ordered pairs

Let R be the relation defined on the set of natural numbers N as R {(x,y):x in N , y in N , 2x + y = 41) whether R is

Let R be the relation on the set A of first twelve natural numbers defined by, R={(x,y):x+2y=12 and x, y in A} Find R as the set of ordered pairs. Also find its domain and range.

Let R be the relation defined on the set of natural numbers NN by, (x,y) in R rArr2x+3y=20and x,y in NN Find R and R^-1 , the inverse relation of R, as sets of ordered pairs.

If R be the relation on the set A of first twelve natural numbers defined by R={(x,y):x+2y=12, and x,y in A} find R as the set of ordered pairs also find its range.

A relation R defined on the set of natural no as follows R={(x,y),x+5y=20,x, y in N }.Find in domain and range of R.

The relation R defined on the set N N of natural numbers by xRy iff 2x^(2) -3xy +y^(2) =0 is

The relation R is defined on the set of natural numbers N as x is a factor of y where x, y in N. Then R is -

A relation R on the set of natural numbers NN is defined as follows: R={(x,y),x+5y=20,x,y in NN}, find the domain and range of R.

A relation R is defined on the set of natural numbers N as follows: R={(x,y)}|x,y in N and 2x+y=41} show that R is neither reflexive nor symmetric nor transitive.