An equilateral triangle OAB is inscribed in the parabola with the vertex O at the vertex of the parabola. Then the minimum distance of the circle having AB as a diameter from the origin is
- A
- B
- C
- D
An equilateral triangle OAB is inscribed in the parabola with the vertex O at the vertex of the parabola. Then the minimum distance of the circle having AB as a diameter from the origin is
Correct answer:B
Standard Method
Given: An equilateral triangle is inscribed in the parabola with at the vertex.
Find: The minimum distance of the circle having as diameter from the origin.
Let the vertices be and . Due to symmetry, .
In equilateral , the line makes with the x-axis.
So, .
Therefore, the x-coordinate of and is
and the y-coordinate of is
Circle Geometry Step
The circle has diameter , so its center is the midpoint of , which is . The radius is half the length of , hence
The distance of the center from the origin is
So the minimum distance of the circle from the origin is
Therefore, the correct option is B.
Taking the slope condition incorrectly as instead of . The side makes with the x-axis in the symmetric equilateral configuration. Use .
Using the full length of as the radius of the circle. Since is the diameter, the radius is half of it. Here that gives , not .
Finding the distance from the center to the origin and stopping at . The question asks for the minimum distance from the circle to the origin, so subtract the radius: .
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