The largest such that divides is:
- A
- B
- C
- D
The largest such that divides is:
Correct answer:B
Standard Method
Given: We need the largest such that divides .
Find: The highest power of in .
Use Legendre's formula for the exponent of a prime in :
For and ,
Now calculate each term:
So the total exponent is
Therefore, the largest such that divides is . The correct option is B.
Legendre Formula Expansion
Given: We are asked to find the largest natural number such that divides .
Find: The exponent of the prime in the prime factorization of .
Concept Used: By Legendre's Formula, the exponent of a prime in is
Here, and . So,
Evaluate term by term:
This counts multiples of up to .
This counts multiples of , contributing one extra factor of .
This counts multiples of , contributing yet another factor of .
Since the term for is , all later terms are also .
Hence,
Thus, is the highest power of dividing . Therefore, the largest is and the correct option is B.
A common mistake is counting only multiples of and stopping at . This is wrong because multiples of contribute extra factors of . Use Legendre's formula and keep adding higher-power terms until the quotient becomes .
Another mistake is using ordinary division instead of the floor function. Values like must be taken as , not rounded to . Always apply the greatest integer function at every step.
Students may stop at and forget the term. This misses one additional factor of . Continue the series for all powers .
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