Types of Relations | Reflexive, Symmetric, Transitive and Anti-symmetric Relation | mathematicaATD 

Could you please tell me what is the difference between asymmetric and antisymmetric relation sir?

I can say.. in symmetric relation ( a, b) belongs to R and (b, a) belongs to R here a and b may or may not be equal but in anti symmetric relation it is compulsory

I am studying in 9th class (GNAPIKA).

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Example on equalence relation is T is the set all triangles in a plane .for (x,y) belongs to T, the relation R is relation,x is congruent to y. Then R is an equivalence relation

If A={1,2,3} then R={(1,1),(2,2),(3,3),(1,2),(2,1),(1,3),(3,1),(2,3),(3,2)} is an equivalence relation.

@@dola.kesavarao9917 I think 'parallel to' is also an equivalence relation..... Do you think so??

@@duicyjohn3760 Yes, the "parallel to" is also an equivalence relation. (a1||a2||a3).

A relation on the empty set is both symmetric and anti-symmetric

Your example is symmetric since the ordered pairs (2,1) belongs to R and (1,2) also belongs to R. But it's not antisymmetric since 2 ≠ 1.

all needs to be reflexive

Transitive relation.

An example for transitive relation is If 5 divides 10 and 10 divides 100, then 5 divides 100. If triangle A is congruent to triangle B and triangle B is congruent to triangle C, then triangle A is congruent to triangle C . Last example: If A={1,2,3} and we consider a=1, b=2. , c=3, then R={(1,2),(2,3),(1,3)} is a transitive relation.