Radial & Tangential Acceleration for Non Uniform Circular Motion
A spinning to...
Question
A spinning top has an angular retardation of α=kω2 (in rad/s2), where ω is angular velocity of the top and k=1rad −1. At θ0=0rad, if ω0=120rad/s, then the relation between angular displacement (θ) and angular velocity is
A
ω=120e−θ
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B
ω=120eθ
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C
ω=60e−θ
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D
ω=60eθ
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Solution
The correct option is Aω=120e−θ Initial angular velocity (ω0)=120rad/s Angular acceleration, α=kω2=ω2 (k=1) To find relation between ω and θ, we use α=−ωdωdθ (negative sign due to retardation) ⇒−ωdωdθ=ω2 ⇒−dωω=dθ Integrating on both sides ∫ωω0dωω=−∫θθ0dθ ⇒lnω|ωω0=−(θ−θ0) ⇒ln(ωω0)=−(θ−θ0) ⇒ω=ω0e−(θ−θ0) ⇒ω=ω0e−θ=120e−θ (because θ0=0)