For two non-zero complex numbers and , if and , then which of the following are possible? Choose the correct answer from the options given below:
- A
(A) and
- B
(B) and
- C
(C) and
- D
(D) and
For two non-zero complex numbers and , if and , then which of the following are possible? Choose the correct answer from the options given below:
(A) and
(B) and
(C) and
(D) and
Correct answer:A
Standard Method
Given: Two non-zero complex numbers and satisfy
and
Find: Which sign combinations of and are possible.
Let
where are real parts and are imaginary parts.
Now,
So,
which gives
Also,
so
Hence and are opposite in sign, therefore their product is negative when both are non-zero. Since
we get that must also be negative. Therefore and have opposite signs.
So the possible cases are:
Therefore, the correct options are B and C. The solution working supports option-set (2), although the solution incorrectly states option A.
Sign Analysis in Detail
Given:
Find: The valid sign pattern of the imaginary parts.
From
we write
Substitute into
Then
which gives
If , then
so and must be of opposite signs.
Thus both imaginary parts cannot be positive together, and both cannot be negative together. Only the mixed-sign cases remain valid.
Therefore, the correct answer is option-set (2): B and C.
Assuming that implies nothing about the sign of . This is wrong because opposite real parts give a non-positive product, and in the non-zero real-part case it is negative. Use carefully before comparing with .
Matching the answer to the solution 'The Correct Option is A' without checking the actual working. This is wrong because the algebra in the solution concludes that the imaginary parts must have opposite signs. Follow the derivation, not the inconsistent label.
Thinking that means one of the numbers must be purely imaginary. This is not required. The correct condition is , which is a relation between real and imaginary parts.
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