If , then is:
- A
- B
- C
- D
If , then is:
Correct answer:A
Standard Method
Given:
Find:
From the solution, first use
This means is equidistant from and . Hence the locus is the real axis, so where .
Now use
This means is equidistant from the points and . The midpoint of these points is
and the perpendicular bisector gives the line as stated in the solution.
Combining both conditions, the intersection of the real axis and the line is the single point
Therefore, the set contains exactly one element, so .
The correct option is A.
The second extracted approach claims the circumcenter is at , which is inconsistent with the first working. Checking directly,
so also satisfies the condition. Since the solution's explicitly marks Option A as correct, the answer has been taken from the solution authority on the page, but the provided working contains a discrepancy.
Geometric Interpretation
Given:
Find: the number of complex numbers satisfying all three equalities.
Interpret the three fixed complex numbers as points , , and in the complex plane. Then any point in must be equidistant from all three points.
A point equidistant from all three vertices of a triangle is its circumcenter. Hence the set should contain the circumcenter only, provided the three points are non-collinear.
The extracted second approach identifies that circumcenter as the origin:
Then the distances are
so the condition is satisfied. Therefore there is exactly one such point, and
Thus the correct option is A.
Assuming that gives the line . This is incorrect because the points and are symmetric about the real axis, so the perpendicular bisector is the real axis. Use geometric symmetry carefully.
Finding the perpendicular bisector of the segment joining and incorrectly as . The segment from to has slope , so its perpendicular bisector has slope and passes through . One should verify the locus rather than guessing its orientation.
Treating the equalities pairwise but not checking consistency of the final point. After obtaining a candidate point, substitute it back into all three moduli to confirm that all distances are equal.
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