In an examination, students have been allotted their seats as per their roll numbers. The number of ways, in which none of the students sit on the allotted seat, is:
- A
- B
- C
- D
In an examination, students have been allotted their seats as per their roll numbers. The number of ways, in which none of the students sit on the allotted seat, is:
Correct answer:A
Standard Method
Given: There are students and allotted seats. Find: The number of arrangements in which no student sits on the allotted seat.
This is a problem of derangements, where no object appears in its original position. The formula for the number of derangements of objects is
For ,
Now simplify:
Therefore, the number of ways is . The correct option is A.
Using Derangement Formula
Given: None of the students should occupy the seat corresponding to the original roll-number arrangement. Find: Total such permutations.
A derangement counts permutations with no fixed point. So we directly use the derangement count for objects.
Hence, the required number of arrangements is .
Using as the answer is incorrect because counts all seat arrangements, including those where one or more students sit on their allotted seats. Use derangements, not total permutations.
Confusing this with a circular permutation is wrong because the seats are already fixed and allotted by roll numbers. Treat it as a permutation with restricted positions.
Applying the derangement formula incorrectly by stopping the alternating series too early gives a wrong value. Include all terms up to for .
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