9 ANGULAR MOMENTUM 9.3 Angular momentum of an extended object
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× · ×9.3 Angular momentum of an extended object
Consider a rigid object rotating about some fixed axis with angular velocity ω.
Let us model this object as a swarm of N particles. Suppose that the ith particle
has mass mi, position vector ri, and velocity vi. Incidentally, it is assumed that
the object’s axis of rotation passes through the origin of our coordinate system.
The total angular momentum of the object, L, is simply the vector sum of the
angular momenta of the N particles from which it is made up. Hence,
L =
i=1,Nmi ri × vi. (9.10)Now, for a rigidly rotating object we can write (see Sect. 8.4)
vi = ω × ri. (9.11)Let
ω = ω k, (9.12)where k is a unit vector pointing along the object’s axis of rotation (in the sense
given by the right-hand grip rule). It follows that
L = ω
i=1,Nmi ri × (k × ri). (9.13)Let us calculate the component of L along the object’s rotation axis—i.e., thecomponent along the k axis. We can write
Lk = L k = ω
i=1,Nmi k · ri × (k × ri). (9.14)However, since a · b × c = a × b · c, the above expression can be rewritten
Now,
Lk = ω
i=1,Nmi (k ri) (k ri) = ω
i=1,Nmi |k × ri|^2. (9.15)iX=1,N mi^ |k^ ×^ ri|(^2) = Ik, (9.16)