Answer: IT IS ASYMMETRIC.
Step-by-step explanation:
Here we will consider all options to determine which of our options holds true.
Given set A;
А - {0, 1, 2}
R {(0,0), (0, 1), (0, 2), (1,2))
Let us not fail to keep the conditions given in the question at heart;
To Check for intransitive;
This condition holds true for all x, y, z belonging to A has -
(1) (x, y)and (y, z) but not (x, z) in R5OR
(2) don't have (x, y) in R5 OR
(3) (x, y)but don't have (y, z) in R5,
for 0, 1, 2 we have (0, 1) and (1, 2) but also have (0, 2) in R5 .
Condition failed here so, no need to check ahead.
⇒ So, It is NOT Intransitive.
To Check for irreflexivity;
This condition holds true for all x belonging to A -
(1) don't have (x, x) in R5,
for 0 we have (0, 0) in R5 so the condition is failed right here So, no need to check further for irreflexivity.
⇒ So, It is NOT Irreflexive.
Now let's Check for asymmetric,
This condition holds true for all x, y belonging to A has -
(1) (x, y) in R5 but not (y, x) OR
(2) don't have (x, y) in R5,
for 0, 1 we have (0, 1) in R5 but do not have (1, 0),
for 1, 0 we don't have (1, 0) in R5
for 1, 2 we have (1, 2) but not (2, 1) in R5
for 2, 1 we don't have (2, 1) in R5
for 0, 2 we have (0, 2) in R5 but not (2, 0)
finally for 2, 0 we don't have (2, 0) in R5
So, Condition satisfied for every г.уеА
⇒ IT IS ASYMMETRIC.
cheers i hope this helps
