Let AB be a chord of the circle x2+y2=r2 subtending a right angle at the center. Then, the locus of the centroid of triangle PAB as P moves on the circle is
A
a parabola
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B
a circle
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C
an ellipse
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D
a pair of straight lines
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Solution
The correct option is B a circle x2+y2=r2 is a circle with centre at (0, 0) and radius r units.
Any arbitrary point P on it is (rcosθ,rsinθ) choosing A and B as (-r, 0) and (0, -r), respectively. For the locus of the centroid of ΔABP, (rcosθ−r3,rsinθ−r3)≡(x,y)∴rcosθ−r=3xandrsinθ−r=3yorrcosθ=3x+randrsinθ=3y+r Squaring and adding, we get (3x+r)2+(3y+r)2=r2, which is a circle.