If is the number of ways five different employees can sit into four indistinguishable offices where any office may have any number of persons including zero, then is equal to:
- A
- B
- C
- D
If is the number of ways five different employees can sit into four indistinguishable offices where any office may have any number of persons including zero, then is equal to:
Correct answer:C
Standard Method
Given: different employees and indistinguishable offices, with empty offices allowed.
Find: The number of ways, , to distribute the employees.
Since the offices are indistinguishable, we count partitions of distinct employees into at most non-empty unlabeled groups.
Using Stirling numbers of the second kind:
Therefore,
Alternatively, from the partition listing shown:
Adding these,
Therefore, the correct option is C.
Bell Number View
Given: distinct employees and indistinguishable offices.
Find: The value of .
The total number of partitions of distinct elements is the Bell number .
From the solution,
The case corresponds to all employees sitting separately, which would require non-empty offices. That is not possible because only offices are available.
So,
Therefore, the number of ways is , so the correct option is C.
Treating the offices as distinguishable. That would count arrangements for labeled offices and greatly overcount the answer. Since the offices are indistinguishable, only unlabeled groupings of employees should be counted.
Using stars and bars. That method distributes identical objects into boxes, but here the employees are distinct. The correct approach is set partitioning or casewise counting by group sizes.
Including the partition into singleton groups. That case needs non-empty offices, which is impossible when only offices are available. Count only partitions into at most groups.
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