A Classical Approach of Newtonian Mechanics

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10 STATICS 10.4 Rods and cables


10.4 Rods and cables


Consider a uniform rod of mass M and length l which is suspended horizontally
via two vertical cables. Let the points of attachment of the two cables be located


distances x 1 and x 2 from one of the ends of the rod, labeled A. It is assumed that


x 2 > x 1. See Fig. 91. What are the tensions, T 1 and T 2 , in the cables?


Let us first locate the centre of mass of the rod, which is situated at the rod’s

mid-point, a distance l/2 from reference point A (see Fig. 91 ). There are three
forces acting on the rod: the gravitational force, M g, and the two tension forces,


T 1 and T 2. Each of these forces is directed vertically. Thus, the condition that zero


net force acts on the system reduces to the condition that the net vertical force is


zero, which yields


T 1 + T 2 − M g = 0. (10.15)

Consider the torques exerted by the three above-mentioned forces about point

A. Each of these torques attempts to twist the rod about an axis perpendicular
to the plane of the diagram. Hence, the condition that zero net torque acts on


the system reduces to the condition that the net torque at point A, about an
axis perpendicular to the plane of the diagram, is zero. The contribution of each
force to this torque is simply the product of the magnitude of the force and the
length of the associated lever arm. In each case, the length of the lever arm is


equivalent to the distance of the point of action of the force from A, measured
along the length of the rod. Hence, setting the net torque to zero, we obtain


l
x 1 T 1 + x 2 T 2 − M^ g^ =^ 0.^ (10.16)^
2

Note that the torque associated with the gravitational force, M g, has a minus sign
in front, because this torque obviously attempts to twist the rod in the opposite
direction to the torques associated with the tensions in the cables.


The previous two equations can be solved to give

T =

x 2 − l/2
M g, (10.17)

(^1) x 2 − x 1

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