If `R_(1)={(x,y)|y=2x+7,` where `x in R` and `-5 le x le 5}` is a relation. Then find the domain and Range of `R_(1)`.

If R_(1)={(x,y)|y=2x+7, where x in R and -5lexle5} is a relation. Then, find the domain and range of R_(1)

If R_(2)={(x,y)|x and y are integers and x^(2)+y^(2)=64} is a relation.Then find R_(2).

If R={(x,y): x,y in W, x ^(2)+y^(2)=25} , then find the domain and range or R.

If A={1,2,3,4} and B={5,7,8,11,15}, are two sets and a relation R from A to B is defined as follows: ""_(x)R_(y) hArr 2x+3 , where x in A, y in B (i) Express R in Roaster form. (ii) Find the domain and range of R. (iii) Find R^(-1) . (iv) Represent R by arrow diagram.

If R={(x,y):x,y in W,2+y=8}. then write the domain and range of R.

If R = {( x,y ) : x,y,in Z , x^2 + 3y^2 le 8} is a relation on the set of integers Z, then the domain R^(-1) is :

Let A = {1,2,3,4,5,6,7,8} and R be the relation on A defined by : R = {(x,y) : x in A , y in A and x + 2y = 10 }. Find the domains and ranges of R and R^(-1) after expressing them as sets of ordered pairs.

A is a set of first 10 natural numbers and R is a relation from A to A defined as: (x,y) in R hArr x+2y=10 when x,y in A (i)Express R in the form of a set of ordered pairs. (ii) Find the domain and range of R. (iii) Find R^(-1) .

Let A={1,2,3,4,5,6} .Define a relation R on set A by R={(x,y):y=x+1} Depict this relation using an arrow diagram Write down the domain,co domain and range of R.