Let AB be a chord of the circle $x^{2} + y^{2} = r^{2}$ subtending a right angle at the center. Then, the locus of the centroid of triangle PAB as P moves on the circle is

a parabola

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a circle

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an ellipse

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a pair of straight lines

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Solution

The correct option is B a circle
$x^{2} + y^{2} = r^{2}$ is a circle with centre at (0, 0) and radius r units.

Any arbitrary point P on it is $(r c o s θ, r s i n θ)$ choosing
A and B as (-r, 0) and (0, -r), respectively.
For the locus of the centroid of $Δ A B P$ ,
$(\frac{r c o s θ - r}{3}, \frac{r s i n θ - r}{3}) \equiv (x, y) ∴ r c o s θ - r = 3 x a n d r s i n θ - r = 3 y o r r c o s θ = 3 x + r a n d r s i n θ = 3 y + r$
Squaring and adding, we get $(3 x + r)^{2} + (3 y + r)^{2} = r^{2}$ , which is a circle.

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