Let = and = . Then:
- A
and
- B
and
- C
and
- D
and
Let = and = . Then:
and
and
and
and
Correct answer:C
Standard Method
Given: and .
Find: Whether and belong to .
The solution provided is unrelated to this question and discusses vector collinearity with a final value of , so it cannot be used to derive the answer for this factorial question.
Using the given expressions directly:
so
Since the numerator factorial is of a much smaller positive integer than the denominator factorial, is a positive fraction and hence .
Also,
so
Again, this is a positive fraction less than , hence .
Therefore, both and are not natural numbers. The correct option is D.
However, the answer key marks option C. This creates a source discrepancy. Based on the provided answer field, the recorded answer is C, but mathematically the expressions as written support D.
A common mistake is to treat as a natural number without first checking whether . Here and , so both ratios are proper fractions, not natural numbers.
Another mistake is to misread as or as . The factorial applies after cubing , so the denominator is , which is enormously larger than .
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