The minimum number of elements that must be added to the relation on the set so that it is an equivalence relation, is:
JEE Mathematics 2023 Question with Solution
Answer
Correct answer:13
Step-by-step solution
Standard Method
Given: on the set .
Find: The minimum number of ordered pairs that must be added so that becomes an equivalence relation.
An equivalence relation must be reflexive, symmetric, and transitive.
For reflexivity, the pairs
must be present.
For symmetry, since
we must also add
so that each ordered pair has its reverse.
For transitivity, the required additional pairs are
.
Thus, the total number of pairs to be added is
.
Therefore, the minimum number of elements to be added is .
Count by equivalence class completion
Given: on .
Find: How many more ordered pairs are needed to make it an equivalence relation.
Because is related to , is related to , and is related to , all four elements must lie in the same equivalence class after completion. Hence the final equivalence relation on must contain all possible ordered pairs of this class, namely pairs.
The relation already contains pairs:
.
So the number of new pairs required is
.
Therefore, the minimum number of elements to be added is .
Common mistakes
Adding only reflexive pairs and stopping there. An equivalence relation must satisfy all three properties: reflexive, symmetric, and transitive. After adding self-pairs, you must still check reverse pairs and transitive consequences.
Checking symmetry for the original pairs but forgetting that newly added symmetric pairs can create further transitive requirements. After adding reverse pairs, recheck transitivity on the enlarged relation.
Counting distinct elements instead of ordered pairs. In a relation, and are different ordered pairs, so both must be counted separately when required.
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