Question

For a non-empty set A, A relation R defined on the set A is said to be a Reflexive Relation if *
1 point
a).(,)∈ ∀ ∈.
b).(,)∈⇒(,)∈ ,∈.
c).(,)∈ (,)∈⟹(,)∈ ,,∈

Answer 1

Answer:

Explanation:

In order that a relation R defined on a non – empty set A is an equivalence relation, it is sufficient, if R. A relation is said to be an equivalence relation if it is reflexive, symmetric and transitive in nature.