The number of non-empty equivalence relations on the set is :
- A
- B
- C
- D
The number of non-empty equivalence relations on the set is :
Correct answer:C
Standard Method
Given: We need the number of non-empty equivalence relations on the set .
Find: The total number of such equivalence relations.
An equivalence relation on a set is in one-to-one correspondence with a partition of that set. So we count all partitions of .
The possible partitions are:
Thus, the total number of partitions is . Hence, the number of non-empty equivalence relations on the set is .
Therefore, the correct option is C.
Using Bell Number
Given: We need the number of equivalence relations on a -element set.
Find: The required count quickly.
Equivalence relations on a set are counted by the number of partitions of that set. The number of partitions of an -element set is the Bell number .
For a set with elements,
Therefore, the number of equivalence relations on is , so the correct option is C.
Counting only the partitions with two subsets is incorrect because equivalence relations also come from the single-block partition and the three-singleton partition. Count all partitions of the set.
Treating equivalence relations as arbitrary subsets of is wrong because an equivalence relation must satisfy reflexivity, symmetry, and transitivity. Use the partition correspondence instead.
Forgetting that each partition gives exactly one equivalence relation leads to overcounting or undercounting. First list distinct partitions, then map each partition to one relation.
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