Let A={ (a,b,c} we define
R = { (a,b), (b,a), (b,b), (a,a)} then

State whether the statement is true or false ? If A= {a,b,c,d} and R={(a,c),(b,d),(b,c),(c,a),(d,b)} then R is a symmertric relation on A .

Let A ={a,b,c } and R ={b,b),(c,c), (a,b)} be a relation on A . Add a minimum and maximum number of ordered pairs to R so that the enlarged relations become equivalence relations on A.

Let S = {a,b,c,d,e} and R be a relation on S defined by, R={(b,a),(b,d),(d,b),(d,d),(e,b)} , find the inverse of R.

Let S = {a,b,c,d,e} and R be a relation on S defined by, R={(b,a),(b,d),(d,b),(d,d),(e,b)} , find the range.

Let S = {a,b,c,d,e} and R be a relation on S defined by, R={(b,a),(b,d),(d,b),(d,d),(e,b)} , find the domain

Let A={a,b,c,d} and f: A rarr A be defined by, f(a)=d, f(b)=a, f(c)=b and f(d)=c . State which of the following is equal to f^(-1)(b) ?

IR is a set of real number. If the realtion R over a set A is defined such that R= {(a,b):a-b< 3, a,b,inIR }, then relation R is

Let R be the relation on Z defined by R = {(a,b),a, b in Z,a^2 =b^2} Find R

Let R be the relation on Z defined by R = {(a,b),a, b in Z,a^2 =b^2} Find Domain of R

Let R be the relation on Z defined by R = {(a,b),a, b in Z,a^2 =b^2} Find Range of R.