A uniform square sheet has a side length of 2R. A circular plate of radius (R2) is cut off from the square sheet as shown in the figure. Find the center of mass of the remaining portion when R=8cm.
A
4.6cm
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B
5.8cm
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C
3.95cm
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D
0.97cm
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Solution
The correct option is D0.97cm Let A1→ mass of the square plate. A2→ mass of the removed circular plate. A1=(2R)2=4R2 A2=π(R22)=πR24
Taking origin at centre of square plate,
x coordinate of COM of square plate x1=0 and
x coordinate of COM of circular plate x2=R2
x coordinate of COM of remaining portion:- XCOM=A1x1−A2x2A1−A2 =(4R2)(0)−(πR24)(R2)4R2−πR24 =−πR2(16−π)
Putting R=8cm (given) XCOM=−π×82(16−π)=−0.97cm. YCOM will be zero due to symmetry.
COM of the remaining portion will be 0.97cm left of the center of the square.