From a circular disk of radius (R=50cm), a square is cut with one of its radii as the diagonal of the square (as shown in figure). The distance of the center of mass of the remaining part from the geometrical center of the disc is
A
7.5 cm
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B
9.4 cm
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C
6.8 cm
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D
4.73 cm
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Solution
The correct option is D4.73 cm
Consider a circular sheet with radius R and mass M. A square sheet with diagonal R and mass m is cut from it. Assuming center of mass of the disc to be the origin (x1,y1) =(0,0) Center of mass of square sheet will be (x2,y2)=(R2,0)
Side of square = R√2 ⇒ Area of square = R22 Assuming metal sheet is of uniform density, Mass of square m=MπR2×(R22)=M2π
Therefore, center of a mass of remaining sheet is given by Xcom=(M)×0−(M2π)×R2(M)−(M2π) i.e Xcom=−R2(2π−1)
Putting R=50cm (given) x=−502(2π−1)=−4.73cm
Ycom will be zero due to symmetry Hence, the center of mass of remaining part lies at a distance 4.73cm left of the center of the disc.