SIMPLY SUPPORTED BEAMS 59
Hence, taking moments aboutPin Figure 5.3,
F 2 ×b=the clockwise moment, and
F 1 ×a=the anticlockwise, or
counter-clockwise, moment
Thus for equilibrium: F 1 a=F 2 b
Problem 3. A system of forces is as shown
in Figure 5.4
F
P
d
5 N 7 N
140 mm
200 mm
Figure 5.4
(a) If the system is in equilibrium find the
distanced.
(b) If the point of application of the 5 N
force is moved to pointP, distance
200 mm from the support, and the 5 N
force is replaced by an unknown force
F, find the value ofF for the system to
be in equilibrium.
(a) From above, the clockwise momentM 1 is due
to a force of 7 N acting at a distancedfrom
the support; the support is called thefulcrum,
i.e.
M 1 =7N×d
The anticlockwise momentM 2 is due to a force
of 5 N acting at a distance of 140 mm from the
fulcrum, i.e.
M 2 =5N×140 mm
Applying the principle of moments, for the
system to be in equilibrium about the fulcrum:
clockwise moment=anticlockwise moment
i.e. 7 N×d= 5 ×140 N mm
Hence, distance,d=
5 ×140 N mm
7N
=100 mm
(b) When the 5 N force is replaced by forceF
at a distance of 200 mm from the fulcrum,
the new value of the anticlockwise moment is
F×200. For the system to be in equilibrium:
clockwise moment = anticlockwise moment
i.e.
( 7 × 100 )Nmm=F×200 mm
Hence,new value of force,
F=
700 N mm
200 mm
= 3 .5N
Problem 4. A beam is supported on its
fulcrum at the pointA, which is at mid-span,
and forces act as shown in Figure 5.5.
Calculate (a) forceFfor the beam to be in
equilibrium, (b) the new position of the 23 N
force whenF is decreased to 21 N, if
equilibrium is to be maintained.
12 N F 23 N
20 mm
80 mm
100 mm
d
A
Figure 5.5
(a) The clockwise moment,M 1 , is due to the 23 N
force acting at a distance of 100 mm from the
fulcrum, i.e.
M 1 = 23 × 100 =2300 N mm
There are two forces giving the anticlockwise
momentM 2. One is the forceF acting at a
distance of 20 mm from the fulcrum and the
other a force of 12 N acting at a distance of
80 mm. Thus
M 2 =(F× 20 )+( 12 × 80 )Nmm
Applying the principle of moments about the
fulcrum:
clockwise moment=anticlockwise moments
i.e. 2300 =(F× 20 )+( 12 × 80 )
Hence F× 20 = 2300 − 960