Let S = \left\{ z = x + iy : \frac{2z - 3i}{4z + 2i} is a real number \right\} Then which of the following is NOT correct?
- A
- B
- C
- D
Let S = \left\{ z = x + iy : \frac{2z - 3i}{4z + 2i} is a real number \right\} Then which of the following is NOT correct?
Correct answer:B
Standard Method
Given: S = \left\{ z = x + iy : \frac{2z - 3i}{4z + 2i} is a real number \right\}
Find: Which statement is not correct.
Let
Then
For a quotient to be real, we need
Here,
So,
Hence,
Also, the denominator must be non-zero:
With and ,
So,
Thus the set is all points of the form
That means:
Therefore, the incorrect statement is option B.
Students often set the numerator imaginary part or denominator imaginary part separately to zero. That is wrong because a quotient of two complex numbers is real only after using the condition for . First convert to the standard form and then apply the real-number condition.
A common mistake is to find and stop there. This is incomplete because the denominator must also be non-zero. After getting , also check that .
Students may accept because it lies on . This is wrong since at that point the denominator becomes zero, so the expression is undefined. A point belongs to the set only when the given expression is defined.
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