If the center and radius of the circle are respectively and , then is equal to:
- A
- B
- C
- D
If the center and radius of the circle are respectively and , then is equal to:
Correct answer:D
Standard Method
Given:
Find: The value of where the center is and radius is .
Let . Then
Squaring both sides,
Dividing by ,
Comparing with the standard form of a circle,
Also,
Therefore,
The correct option is D. The first solution labels option A, but its working concludes the value is , which matches option D.
Direct Comparison
Given:
Find: .
Use the direct distance form:
Substitute and write distances from the points and :
This immediately gives the circle
Hence center and radius
So,
Thus the correct option is D.
Using with the wrong sign convention. For , the radius is , not with a plus sign before .
Comparing the coefficient of incorrectly. From , one gets , so the center is , not .
Trusting the listed options label without checking the working. The solution text says option A, but the derivation gives the value , which corresponds to option D. Always verify from the algebra.
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