Let N be the set of all natural numbers and let R be a relation on `NxN` , defined by `(a , b)R(c , d) iff a d=b c` for all `(a , b),(c , d) in NxNdot`

Let N be the set of all natural numbers and let R be a relation on N×N , defined by (a , b)R(c , d) iff a d=b c for all (a , b),(c , d) in N × Ndot . Show that R is an equivalence relation on N × N .

Let N be the set of all natural numbers and let R be a relation on N×N , defined by (a , b)R(c , d) iff a d=b c for all (a , b),(c , d) in N × Ndot . Show that R is an equivalence relation on N × N .

Let N be the set of all natural numbers and let R be a relation on NxxN , defined by (a ,\ b)R\ (c ,\ d) a d=b c for all (a ,\ b),\ (c ,\ d) in NxxN . Show that R is an equivalence relation on NxxN

Let N be the set of all natural numbers and let R be a relation on N xx N, defined by (a,b)R(c,d)ad=bc for all (a,b),(c,d)in N xx N. Show that R is an equivalence relation on N xx N. Also,find the equivalence class [(2,6)].

Let N be the set of natural number and R be the relation in NxxN defined by : (a,b) R (c,d) iff ad = bc, for all (a,b), (c,d) in NxxN Show that R is an equivalence relation.

Let N denote the set of all natural numbers and R be the relation on NxxN defined by (a,b)R (c,d) if ad(b+c)=bc(a+d) then R is

If R is a relation on NxxN defined by (a,b) R (c,d) iff a+d=b+c, then

Let N N be the set of natural numbers and R be a relation on N NxxN N defined by, (a,b) R (c,d) to a+d=b+c, for all (a,b) and (c,d) iN N NxxN N . prove that R is an equivalence relation on N NxxN N .

Let N N be the set of natural numbers and R be a relation on N NxxN N defined by, (a,b) R (c,d) to ad =bc , for all (a,b) and (c,d) iN N NxxN N . Show that R is an equivalence relation on N NxxN N .

N is the set of natural numbers and R is a relation on N xx N defined by (a, b)R(c, d) if an only if a+d=b+c then R is