Number of functions , that assign to exactly one of the positive integers less than or equal to , is equal to:
JEE Mathematics 2025 Question with Solution
Answer
Correct answer:392
Step-by-step solution
Standard Method
Given: and exactly one of the positive integers less than or equal to is assigned the value .
Find: The number of such functions.
From the solution, exactly one element among must be mapped to .
Choose that element in
ways.
For the remaining elements among to , the value must be .
For and , each can independently be assigned either or , so the number of possibilities is
Therefore, the total number of functions is
Hence, the required number of functions is .
Discrepancy Noted from Extracted Working
Given: the solution contains two approaches.
Find: The correct numerical answer.
In Approach Solution - 1, the written reasoning first says there are choices and that the remaining values are fixed to , which would give . However, the conclusion there states , so that approach is internally inconsistent.
In Approach Solution - 2, the working explicitly states that exactly one among to is mapped to , while the values at and are free.
Thus,
and
So,
Since this is the complete and consistent working shown in the solution, the answer is taken as .
Common mistakes
Assuming that and must also be . This is wrong because the condition restricts only the positive integers less than or equal to . Instead, treat and as free choices, each with two possible values.
Counting only the choice of the element among to and stopping at . This misses the independent assignments for and . After choosing the unique element mapped to in the first positions, multiply by for the last two positions.
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