The number of numbers, strictly between and , that can be formed using the digits without repetition, is:
- A
- B
- C
- D
The number of numbers, strictly between and , that can be formed using the digits without repetition, is:
Correct answer:D
Standard Method
Given: We need four-digit numbers strictly between and , formed from the digits without repetition.
Find: The total number of such numbers.
To be greater than , the first digit must be , , or . So, the first place has choices.
After choosing the first digit, digits remain for the second place, then for the third place, and for the fourth place.
Thus, the total number of numbers is
Therefore, the number of such numbers is . The correct option is D.

Direct Counting Pattern
Given: The number must lie between and and use digits without repetition.
Find: The number of valid arrangements.
A quick way is to count position-wise. The thousand's place must be one of the allowed digits at least , so it has choices: . Then arrange any of the remaining digits in order:
Hence,
Therefore, the required count is .
Taking the first digit as having choices is wrong because numbers must be strictly greater than . The first digit can only be , not or .
Including repeated digits is incorrect because the question explicitly says without repetition. After each choice, the number of available digits decreases.
Counting itself as valid is wrong. The number must be formed using digits from without repetition, so cannot be formed and is not in the count.
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