Let Then is equal to
- A
- B
- C
- D
Let Then is equal to
Correct answer:B
Standard Method
Given:
Find:
Write
where .
Substitute into the given equation:
Equating real and imaginary parts,
and
Now solve the two cases.
Case 1:
So,
Hence,
Case 2: Substitute in the real-part equation:
Thus,
Now compute for each solution:
Therefore,
The correct option is B.
Casewise Breakdown
Given:
Find: the sum of over all solutions.
For equations involving both and , express in terms of real and imaginary parts and then compare components.
Let . Then .
After substitution,
A complex number is zero only when both its real and imaginary parts are zero. So we get:
From , either or .
If , then the real equation becomes
which gives or .
If , then
which simplifies to
So .
Hence the solutions are:
Now their squared moduli are:
The two non-real roots contribute the same value, so the total is
Therefore, the required sum is .
Taking as instead of is incorrect because conjugation changes the sign of the imaginary part. Always write and before substituting.
After obtaining , choosing only one branch and ignoring the other loses valid solutions. Solve both cases: and .
While summing , counting only one of the conjugate roots gives a smaller total. Both are distinct elements of and both must be included.
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