Let be the circumcenter of a triangle with vertices , , and . Let denote the circumradius, the area, and the perimeter of the triangle. Then is:
- A
- B
- C
- D
Let be the circumcenter of a triangle with vertices , , and . Let denote the circumradius, the area, and the perimeter of the triangle. Then is:
Correct answer:B
Standard Method
Given: The triangle has vertices , and , and its circumcenter is .
Find: , where is the circumradius, is the area, and is the perimeter.
Since the circumcenter is equidistant from the vertices, use
That gives
So,
which gives
and hence
Using triangle dimensions
Now the vertices become
So the triangle is right-angled at because is vertical and is horizontal.
The side lengths are
Therefore, the perimeter is
Right triangle shortcut
For a right triangle, the circumcenter is the midpoint of the hypotenuse, so the circumradius is half the hypotenuse. Here,
Also, the area is
Hence,
Therefore, the correct option is B.
The first approach in the solution contains inconsistent numerical work, but the final answer and the second approach agree with the correct computation above.
Equating the wrong pair of distances from the circumcenter can lead to an incorrect value of . First use the fact that the circumcenter is equidistant from vertices, then solve carefully from or any valid equal pair.
Missing that is vertical and is horizontal may hide the right angle at . Once the triangle is identified as right-angled, use the hypotenuse property for the circumradius instead of a longer distance calculation.
Using an incorrect coordinate for after substituting is a common source of error. Since , it becomes , not any other point.
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