If , , satisfies the equation , then is equal to:
- A
- B
- C
- D
If , , satisfies the equation , then is equal to:
Correct answer:B
Standard Method
Given: and the solution works with .
Find: .
From the solution:
and
So,
Separating real and imaginary parts,
Using the working shown, take
Now substitute into the real part as shown in the solution:
Hence,
Therefore, the correct option is B and .
Note: The solution consistently concludes option B, although it works with instead of the question text .
Detailed Solution Working
Given: .
Find: .
The solution states:
with
Then
and
Therefore,
Equating real and imaginary parts gives
and
The solution proceeds with
Substituting,
Now,
So the final answer reported on the solution is , i.e. option B.
Using the question text and the solution text as if they are identical. The solution works with , not plainly . Always verify the exact equation before separating real and imaginary parts.
Forgetting to separate real and imaginary parts correctly. In complex equations, both the real part and the imaginary part must independently be equal to . Do not solve only one of them.
Computing incorrectly as or . The correct expression is .
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