FORCE, MASS AND ACCELERATION 147Now try the following exercise
Exercise 63 Further problems on New-
ton’s laws of motion(Takegas 9.81 m/s^2 , and express answers to
three significant figure accuracy)- A car initially at rest accelerates uni-
formly to a speed of 55 km/h in 14 s.
Determine the accelerating force required
if the mass of the car is 800 kg.
[873 N] - The brakes are applied on the car in ques-
tion 1 when travelling at 55 km/h and it
comes to rest uniformly in a distance of
50 m. Calculate the braking force and the
time for the car to come to rest
[1.87 kN, 6.55 s] - The tension in a rope lifting a crate ver-
tically upwards is 2.8 kN. Determine its
acceleration if the mass of the crate is
270 kg. [0.560 m/s^2 ] - A ship is travelling at 18 km/h when it
stops its engines. It drifts for a distance
of 0.6 km and its speed is then 14 km/h.
Determine the value of the forces oppos-
ing the motion of the ship, assuming the
reduction in speed is uniform and the
mass of the ship is 2000 t. [16.5 kN] - A cage having a mass of 2 t is being
lowered down a mineshaft. It moves from
rest with an acceleration of 4 m/s^2 , until
it is travelling at 15 m/s. It then travels
at constant speed for 700 m and finally
comes to rest in 6 s. Calculate the ten-
sion in the cable supporting the cage dur-
ing (a) the initial period of acceleration,
(b) the period of constant speed travel,
(c) the final retardation period.
[(a) 11.6 kN (b) 19.6 kN (c) 24.kN]- A miner having a mass of 80 kg is stand-
ing in the cage of problem 5. Determine
the reaction force between the man and
the floor of the cage during (a) the initial
period of acceleration, (b) the period of
constant speed travel, and (c) the final
retardation period.
[(a) 464.8 N (b) 784.8 N (c) 984.8 N]- During an experiment, masses of 4 kg
and 5 kg are attached to a thread and the
thread is passed over a pulley so that both
masses hang vertically downwards and
are at the same height. When the system
is released, find (a) the acceleration of
the system, and (b) the tension in the
thread, assuming no losses in the system.
[(a) 1.09 m/s^2 (b) 43.6 N]13.3 Centripetal acceleration
When an object moves in a circular path at con-
stant speed, its direction of motion is continually
changing and hence its velocity (which depends on
both magnitude and direction) is also continually
changing. Since acceleration is the (change in veloc-
ity)/(time taken) the object has an acceleration.
Let the object be moving with a constant angular
velocity ofωand a tangential velocity of magnitude
vand let the change of velocity for a small change of
angle ofθ(=ωt)beV(see Figure 13.3(a)). Then,
v 2 −v 1 =V.v
2
V- v 1 v 2
(b)q
2v 2v 1q = ωtrr(a)Figure 13.3The vector diagram is shown in Figure 13.3(b) and
since the magnitudes ofv 1 andv 2 are the same, i.e.
v, the vector diagram is also an isosceles triangle.
Bisecting the angle betweenv 2 andv 1 gives:sinθ
2=V/ 2
v 2=V
2 vi.e. V= 2 vsinθ
2( 13. 1 )