Let be a complex number such that . If , then the maximum distance of from the circle is:
- A
- B
- C
- D
Let be a complex number such that . If , then the maximum distance of from the circle is:
Correct answer:A
Standard Method
Given: and
Find: The maximum distance of from the circle .
Since , we use
Cross-multiplying the given equation,
Expanding the right-hand side,
Using ,
Cancelling from both sides,
So,
Now the point represented by is
The circle has center
and radius
Distance from to the center is
Therefore,
The maximum distance from a point to a circle equals distance from the center plus the radius:
Therefore, the correct option is A, and the maximum distance is .
Geometric Shortcut
Given: and the relation involving .
Find: The farthest distance of from the circle .
Use the identity directly in the simplified equation from the solution working to get
Hence the point is
The circle has center and radius . So the center-to-point distance is
Thus the farthest point on the circle is one radius farther along the same line, giving
Therefore, the correct option is A.
Using the question equation alone as and trying to solve directly for . The extracted solution actually uses together with . Follow the relation shown in the solution working to determine .
Taking the maximum distance from a point to a circle as . That gives the minimum distance when the point lies outside the circle. For maximum distance, use .
Substituting into incorrectly as . The imaginary part is , so the point is .
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