Answer:
w = vR/3
Explanation:
The centre of mass of the loop to bullet system is given by D / 4 from centre of loop, which is equivalent to R / 2 from its centre.
From the principle of conservation of linear momentum , we have
m*v = 2*m* Vcm
Where v = velocity of bullet, Vcm = velocity of wood
Hence, we have
Vcm = v2
Also, from the conservation of angular momentum about the centre of mass.
M*V*(R/2) = Ic*w - equation (I)
where Ic = moment of inertia and w = angular velocity
Ic for a ring is given by [tex] mr^2 + m(r/2)^2 [/tex]
Ic of a bullet is given by [tex] m(r/2)^2 [/tex]
Hence, the moment of inertia of the system is given by the summation of the two moments of inertia Ic(ring) + Ic(bullet) which gives
Ic(system) = [tex] 3*m*R^2/2 [/tex]
Substituting back into equation (I), we have
[tex] m*v*R^2=3*m*R^2*w/2 [/tex]
Hence, we obtain w =vR/3
w=v3R
