388]
NOTE ON THE COMPOSITION OF INFINITESIMAL ROTATIONS.
25
where l, m, n, p, q, r are constants depending on the infinitesimal motion of the
body.
Hence, first, for a system of rotations
®i about the line (a 1} b lt c 1} f u g lt hfi,
>> » (^2? b 2 , C-2) f%> p2> h 2 ),
&C.
solid
the displacements of the point (x, y, z), are
8x = . yXeco — zXbco + S/ft),
8y = — x'Zcw . + z%a 0) + 2#ft),
8z = xXbw + ylZaco . + 2/ift);
and when the rotations are in equilibrium, the displacements (fix, 8y, 8z) of any point
(x, y, z) whatever must each of them vanish; that is, we must have
2ft)tt = 0, Sft)6= 0, S«c = 0, Sft)/ = 0, ’Swg = 0, Hwh — 0,
which are therefore the conditions for the equilibrium of the rotations co 1 , <w 2 , &c.
Secondly, for a system of forces
Pi along the line (oq, b lt c ly /, g x , hfi
P 2 „ „ (a 2 , b 2 , c 2 , /0, g 2 , h 2 ),
&c.
the condition of equilibrium as given by the principle of virtual velocities is
2P (al + bin + cn+fip + gq + hr) = 0 ;
or, what is the same thing, we must have
2Pa = 0, tPb = 0, tPc = 0, SP/= 0, XPg = 0, SPh = 0,
which are therefore the conditions for the equilibrium of the forces Pi, P 2 , &c.
Comparing the two results we see that the conditions for the equilibrium of the
rotations «!, tw 2 , &c. are the same as those for the equilibrium of the forces P 1} P 2 , &c.;
and since, for rotations and forces respectively, we pass at once from the theory of
equilibrium to that of composition; the rules of composition are the same in each case.
Demonstration of Lemma 1.
Assuming for a moment that the axis of rotation passes through the origin, then
for the point P, coordinates (x, y, z), the square of the perpendicular distance from
the axis is
= ( . — y cos 7 + £ cos /3) 2
+ ( x cos 7 . — z cos a ) 2
+ (- x cos /3 + y cos a . ) 2 ,
C. VI.
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