Classical Mechanics - Rotational Kinetic Energy



Three equal masses m are rigidly connected to each other by massless rods of length l forming an equilateral triangle. The assembly is to be given an angular velocity ω about an axis perpendicular to the triangle. For fixed ω, the ratio of the kinetic energy of the assembly for an axis through B compared with that for an axis through A is equal to

A. 3
B. 2
C. 1
D. 1/2
E. 1/3
(GR9677 #32)
Solution:

KE = ½Iω2

For fix ω, the ratio KEB/KEIB/IA

I = ∑miri2

From A:
m1mmm
x1xxl/√3 (see notes)

I= m1x1m2x2m3x32
= 3ml/√3)ml2

From B:
Im1x1m2x2
mlml2 = 2ml2

KEA/KE= 2ml2/ml= 2

Answer: B

Notes:


Cos 30o = ½x
Cos 30o = ½√3
½x= ½√3
x= xxl/√3 

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