10 STATICS 10.6 Jointed rods
!l 1l 2coordinate system correspond to the pivot point. The centre of mass of the first
rod is situated at its mid-point, whose coordinates are
(x 1 , y 1 ) = (0, l 1 /2).Likewise, the centre of mass of the second rod is situated at its mid-point, whose
coordinates are
(x 2 , y 2 ) = (l 2 /2, l 1 ).It follows that the coordinates of the centre of mass of the whole system are given
by
and
xcm = m^1 x^1 +^ m^2 x^2
m 1 + m 2=1 m 2 l 2
2 m 1 + m 2=3.4 × 0.7
2 × 8.6= 0.138 m,ycm =^m 1 y 1 + m 2 y 2
m 1 + m 2=m 1 l 1 /2 + m 2 l 1
m 1 + m 2=5.2 × 1.3/2 + 3.4 × 1.3
8.6= 0.907 m.The angle θ subtended between the line joining the pivot point and the overall
centre of mass, and the first rod is simply
θ = tan−^1xcm
= tan−^1 0.152 = 8.65◦.
ycmWhen the system reaches a stable equilibrium state then its centre of mass is
aligned directly below the pivot point. This implies that the first rod subtends an
angle θ = 8.65◦ with the downward vertical.
pivot
xy