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Question

A circular plate of uniform thickness has a radius, a=10 cm. A circular portion of radius, b=1 cm is removed from the plate as shown in figure. Find the position of center of mass of the remaining part of the circular plate. (Take O to be the origin)


A
(0,111)
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B
(0,988)
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C
(0,899)
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D
(0,1099)
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Solution

The correct option is C (0,899)
Due to symmetry, Xcom of the remaining part will be zero.
Let ρ be the mass per unit area of circular plate.

Let m1 be the mass of circular plate of radius a=10 cm and m2 be the mass of the removed part of circular plate. b=1 cm.
m1=ρ(πa2)=ρ(π×(10)2)
=100 ρπ
m2=ρ(πb2)=ρ(π(1)2)=ρπ
(Mass of removed plate).

Let O be the reference point.
y1 Centre of mass of circular plate of mass m1
y2 Centre of mass of removed plate.
Then, y1=0, y2=8
(from the diagram)

Centre of mass of remaining part of circular plate :
Ycom=M1y1M2y2M1M2
=100ρπ×(0)ρπ(8)100 ρπρπ
=ρπ(8)99pπ
Ycom=899
(Xcom,Ycom)=(0,899)

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