Let and be the coefficients of respectively in the expansion of . If , , then equals:
- A
- B
- C
- D
Let and be the coefficients of respectively in the expansion of . If , , then equals:
Correct answer:D
Standard Method
Given:
Let .
Find: The value of when are the coefficients of respectively.
Using binomial expansion,
So,
Now expand:
and
Hence,
Therefore the required coefficients are
Now use the given equations:
From the first equation,
From the second equation,
Subtracting,
Then
So,
Therefore, the correct option is D.
Use cancellation of odd radical terms
Given:
Find: .
The two binomial expansions are identical except that terms containing odd powers of have opposite signs. Hence those terms cancel, and only even-power terms remain.
So the surviving terms are:
That is,
Now,
Therefore,
Read off coefficients:
Hence,
Simplifying,
Subtract the second from the first:
Then
Thus,
Therefore, the correct option is D.
The solution contains inconsistent intermediate work in one approach, but the algebra above matches the expression correctly and agrees with the stated final option.
Ignoring that odd powers of cancel when adding and . This is wrong because only even powers survive in the sum. Instead, keep only the terms.
Taking the coefficient of as positive. This is wrong because the term comes from , which contributes . Instead, expand carefully and track the sign from .
Expanding as if . This is wrong because squaring the radical changes the expression. Instead, set first and use only after selecting even powers.
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