In the expansion of , , if the ratio of term from the beginning to the term from the end is , then the value of is:
- A
- B
- C
- D
In the expansion of , , if the ratio of term from the beginning to the term from the end is , then the value of is:
Correct answer:C
Standard Method
Given: The expansion is and the ratio of the term from the beginning to the term from the end is .
Find: The value of .
Using the binomial theorem, the general term is
The term from the beginning is
The term from the end is the term from the beginning, so
Now,
So,
From the extracted the solution, the worked result leads to , and hence
Therefore, the correct option is C.
Detailed Solution Working
Given: We need the ratio of the term from the beginning to the term from the end in the expansion.
Find: .
The solution states the term formula
Here,
were used in the alternate approach shown on the page, and it computes:
Thus,
Given that this ratio is ,
Now evaluate
Therefore, the required value is and the correct option is C.
Note: The solution contains inconsistent intermediate expressions across its two approaches, but both conclude with the same final answer , matching option C.
Using the term from the end as again. This is wrong because the term from the end is the term from the beginning. Convert the position correctly before forming the ratio.
Writing the general term incorrectly as without tracking which factor is and which is . This changes the exponents and gives a wrong ratio. Use carefully.
Cancelling the binomial coefficients incorrectly after choosing mismatched terms. The coefficients cancel only when the corresponding terms are correctly identified. First fix the term numbers, then simplify the ratio.
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