Rotational kinetic energy is given by E=21Iω2, here, I is moment of inertia of rod about an axis through its centre and perpendicular to it.
So, E=2112ml2ω2
⇒E=2112dAl3ω2(∵mass=density×volume)
⇒E=24dA(2)3ω2
⇒ω=dA3E
Thus, the value of α=3.
A thin uniform rod of length 2m, cross sectional area A and density d is rotated about an axis passing through the centre and perpendicular to its length with angular velocity ω. If value of ω in terms of its rotational kinetic energy E is AdαE, then the value of α is ______.
Held on 30 Jan 2023 · Verified 6 Jul 2026.
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