. Show that the relation R in the set A = { , , , , } given by R = {( a , b ) : | a – b | is even}, is an equivalence relation. Show that all the elements of { , , } are related to each other and all the elements of { , } are related to each other. But no element of { , , } is related to any element of { , }.
. Show that each of the relation R in the set A = { x ∈ Z : ≤ x ≤ }, given by (i) R = {( a , b ) : | a – b | is a multiple of } (ii) R = {( a , b ) : a = b } is an equivalence relation. Find the set of all elements related to in each case. .
Give an example of a relation. Which is (i) Symmetric but neither reflexive nor transitive. (ii) Transitive but neither reflexive nor symmetric. (iii) Reflexive and symmetric but not transitive.
(iv) Reflexive and transitive but not symmetric. (v) Symmetric and transitive but not reflexive. . Show that the relation R in the set A of points in a plane given by R = {(P, Q) : distance of the point P from the origin is same as the distance of the point Q from the origin}, is an equivalence relation.
Further, show that the set of all points related to a point P ≠ ( , ) is the circle passing through P with origin as centre. . Show that the relation R defined in the set A of all triangles as R = {(T , T ) : T is similar to T }, is equivalence relation. Consider three right angle triangles T with sides , , , T with sides , , and T with sides , , .
Which triangles among T , T and T are related? . Show that the relation R defined in