Answer:
1.No
2.No
3.Transitive
Step-by-step explanation:
We are given that a relation
[tex]R_3=[/tex]{(0,0),(0,1),(0,2),(1,2)}
If a relation is reflexive then (a,a) belongs to relation for each a belongs to given set.
A relation is symmetric
If (a,b)[tex]\in R[/tex] then, [tex](b,a)\in R[/tex]
A relation is transitive
(a,b) and (b,c)[tex]\in R[/tex] then, (a,c)[tex]\in R[/tex]
1.The relation is not reflexive because (1,1) does not belongs to [tex]R_3[/tex]
2.The relation is not symmetric because (2,0)[tex]in R_3[/tex]
3.It is transitive because (0,1) and (1,2)[tex]\in R_3[/tex] then (0,2)[tex\in R_3[/tex]
