A disc is purely rolling down an inclined plane of length ‘l’ & angle θ. What is the value of friction acting on it? Let the mass of the disc be M & radius be R.(a) (Mgsinθ)/3(b) 0(c) (4Mgsinθ)/3(d) (2Mgsinθ)/3I have been asked this question in homework.This interesting question is from Rolling Motion topic in portion System of Particles and Rotational Motion of Physics – Class 11

A disc is purely rolling down an inclined plane of length ‘l’ & an

1.	A disc is purely rolling down an inclined plane of length ‘l’ & angle θ. What is the value of friction acting on it? Let the mass of the disc be M & radius be R.(a) (Mgsinθ)/3(b) 0(c) (4Mgsinθ)/3(d) (2Mgsinθ)/3I have been asked this question in homework.This interesting question is from Rolling Motion topic in portion System of Particles and Rotational Motion of Physics – Class 11
Answer» The correct option is (a) (Mgsinθ)/3 To elaborate: Let the angular ACCELERATION of the disc be ‘α’. And the linear acceleration along the incline be ‘a’. For pure rolling, a = Rα.Mgsinθ – F = Ma———-(1), where f is the friction. fR = Iα————–(2), where I is the MOMENT of inertia = MR^2/2. fR = Ia/R, we substitute the value of a into the first equation, Mgsinθ – f = (MfR^2)/( MR^2/2) = 2f ∴ Mgsinθ – f = 2f Or f = (Mgsinθ)/3.

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