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Question

Two cylinders with radii r1 and r2 and rotational inertia I1 and I2 are supported on their horizontal axles. The first one is set in rotation with angular velocity ω. The axle of the other cylinder (smaller) is moved until it touches the large cylinder and is caused to rotate by the frictional forces between the two. Find the angular velocity of the two cylinders when slipping ceases finally because of the frictional forces between them.


A
ω1=I1r22ωI1r22+I2r21
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B
ω1=I1r22ωI1r22I2r21
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C
ω2=I1ωr1I1r2I2r1
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D
ω2=I1ωr2I1r2I2r1
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Solution

The correct option is A ω1=I1r22ωI1r22+I2r21
In this case, due to presence of forces at axle some unbalanced torque will always exist on system hence principle of conservation of angular momentum can not be applied.

When we move the axles and the cylinders touch each other, then frictional force (f) acts on the cylinder (1) and cylinder (2) as shown in figure.


Due to the frictional force(f), cylinder (1) and cylinder (2) attain angular velocity ω1 & ω2 at the instant when slipping between them ceases.

Hence, velocity of cylinders at contact point will be same.
v1=v2
r1ω1=r2ω2
ω2=r1ω1r2(i)
Applying the equation of angular impulse for both cylinders, considering the anticlockwise sense of rotation as +ve direction.
τ=LfLi
fr1dt=I1ω1(I1ω)
fr1dt=I1ω1+I1ω ....(ii)
Similarly for cylinder 2,
fr2dt=I2ω20=I2ω2 ....(iii)
On dividing Eq.(ii) & (iii),
I1ω1+I1ωI2ω2=r1r2
I1ω1+I1ω=I2ω2r1r2
I1ω1r2+I1ωr2=I2ω2r1
Substituting ω2=ω1r1r2 in above equation we get,
I1ω1r22+I1ωr22=I2r21ω1
ω1(I1r22+I2r21)=I1ωr22
ω1=I1ωr22I1r22+I2r21

& ω2=ω1r1r2
ω2=I1ωr1r2I1r22+I2r21
(a) is the only correct option.

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