Two wheels which are rotated by some external source with constant angular velocity in opposite directions as shown in figure. A uniform plank of mass M is placed on it symmetrically. The friction co-efficient between each wheel and the plank is mu. find the frequency of oscillations, when plank is slightly displaced along its length and released.

Two wheels which are rotated by some external source with constant ang

1.	Two wheels which are rotated by some external source with constant angular velocity in opposite directions as shown in figure. A uniform plank of mass M is placed on it symmetrically. The friction co-efficient between each wheel and the plank is mu. find the frequency of oscillations, when plank is slightly displaced along its length and released.
Answer» Solution :If plank is displaced by `X` toward RIGHT then Let `N_(1), N_(2)` and `f_(1), f_(2)` are Normal and friction force at Point `A` and `B` by force balance `N_(1) + N_(2) = Mg_(1)` amd Torque balance `Mg (l + X) = N_(2) xx 2l__(2)` by equation `(1)` and `(2)` `N_(1) = (Mg)/(2) - (MGX)/(2l), N_(2) = (Mg)/(2) + (Mgx)/(2l)` So `f_(1) = MU((Mg)/(2) - (Mgx)/(2l))` and `f_(2) = mu((Mg)/(2) + (Mgx)/(2l))` `F.B.D` of `M` `f_(2) - f_(1) = Ma` `mu. (2Mgx)/(2l) = Ma = -(d^(2)x)/(dt^(2)).M` `rArr (d^(2)x)/(dt^(2)) = (-mugx)/(l)` TIME period `= 2pisqrt((l)/(mug))`

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