Physics A Level
Chapter 5: Work, energy and power 5.1 Doing work, transferring energy
Physics A Level
Chapter 5: Work, energy and power 5.1 Doing work, transferring energy
THE IDEA OF ENERGY
The Industrial Revolution started in the late $18th$ century in Britain. Today, many other countries have become or are becoming industrialised (Figure 5.1). Industrialisation is the development of new machines capable of doing the work of hundreds of craftsmen and labourers. At first, people used water and wind to power machines. Water stored behind a dam was used to turn a wheel, which turned many machines. Steam engines were developed, initially for pumping water out of mines. Steam engines use a fuel such as coal; there is much more energy stored in $1 kg$ of coal than in $1 kg$ of water held behind a dam.
Nowadays, most factories rely on electrical power, generated by burning coal or gas at a power station.
High-pressure steam is generated, and this turns a turbine that turns a generator. Even in the most efficient coal-fired power station, only about $40\% $ of the energy from the fuel is transferred to the electrical energy that the station supplies to the electricity grid.
Engineers worked hard to develop machines that made the most efficient use of the energy supplied to them. At the same time, scientists were working out the basic ideas of energy transfer and energy transformations. The idea of energy itself had to be developed; it was not obvious at first that heat, light, electrical energy were all forms of the same thing: energy. What is the history of your country in developing the use of machines, generating electrical power and increasing efficiency?
The earliest steam engines had very low efficiencies–many converted less than 1% of the energy supplied to them into useful work. The understanding of the relationship between work and energy led to many clever ways of making the most of the energy supplied by fuel.
The weight-lifter shown in Figure 5.3 has powerful muscles. They can provide the force needed to lift a large weight above her head – about $2 m$ above the ground. The force exerted by the weight-lifter transfers energy from her to the weights. We know that the weights have gained energy because, when the athlete releases them, they come crashing down to the ground.
As the athlete lifts the weights and transfers energy to them, we say that her lifting force is doing work.
‘Doing work’ is a way of transferring energy from one object to another. In fact, if you want to know the scientific meaning of the word ‘energy’, we have to say it is ‘that which is transferred when a force moves through a distance’. So, work and energy are two closely linked concepts.
| Not doing work | Doing work |
| Pushing a car but it does not budge: no energy is transferred, because your force does not move it. The car’s kinetic energy does not change. |
Pushing a car to start it moving: your force transfers energy to the car. The car’s kinetic energy (that is, ‘movement energy’) increases. |
| Holding weights above your head: you are not doing work on the weights (even though you may find it tiring) because the force you apply is not moving them. The gravitational potential energy of the weights is not changing. | Lifting weights: you are doing work as the weights move upwards. The gravitational potential energy of the weights increases. |
| The Moon orbiting the Earth: the force of gravity is not doing work. The Moon’s kinetic energy is not changing. | A falling stone: the force of gravity is doing work. The stone’s kinetic energy is increasing. |
| Reading an essay: this may seem like ‘hard work’, but no force is involved, so you are not doing any work. | Writing an essay: you are doing work because you need a force to move your pen across the page, or to press the keys on the keyboard. |
Table 5.1 describes some situations that illustrate the meaning of doing work in physics.
It is important to understand that our bodies sometimes mislead us. If you hold a heavy weight above your head for some time, your muscles will get tired. However, you are not doing any work on the weights, because you are not transferring energy to the weights once they are above your head. Your muscles get tired because they are constantly relaxing and contracting, and this uses energy, but none of the energy is being transferred to the weights.
Calculating work done
Because doing work defines what we mean by energy, we start this chapter by considering how to calculate work done.
There is no doubt that you do work if you push a car along the road. A force transfers energy from you to the car. But how much work do you do? Figure 5.4 shows the two factors involved:
the size of the force F – the bigger the force, the greater the amount of work you do the distance s you push the car – the further you push it, the greater the amount of work done.
So, the bigger the force, and the further it moves, the greater the amount of work done.
The work done by a force is defined as the product of the force and the distance moved in the direction of the force:
$W = F \times s$
where s is the distance moved in the direction of the force.
In the example shown in Figure 5.4, $F = 300 N$ and $s = 5.0 m$, so:
work done $W = F \times s = 300 \times 5.0 = 1500J$
Energy transferred
Doing work is a way of transferring energy. For both energy and work the correct SI unit is the joule (J).
The amount of work done, calculated using $W = F \times s$, shows the amount of energy transferred:
work done = energy transferred
Newtons, metres and joules
From the equation $W = Fs$ we can see how the unit of force (the newton), the unit of distance (the metre) and the unit of work or energy (the joule) are related.
The joule is defined as the amount of work done when a force of 1 newton moves a distance of 1 metre in the direction of the force. Since work done = energy transferred, it follows that a joule is also the amount of energy transferred when a force of 1 newton moves a distance of 1 metre in the direction of the force.
Force, distance and direction
It is important to understand that, for a force to do work, there must be movement in the direction of the force. Both the force F and the distance s moved in the direction of the force are vector quantities, so you should know that their directions are likely to be important. To illustrate this, we will consider three examples involving gravity (Figure 5.5). In the equation for work done, $W = F \times s$, the distance moved s is the displacement in the direction of the force.
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| 3) A satellite orbite the Earth at a constant height and at a constant speed. The weight of the satellite at this height is $500N$. | 2) A stone weighing $5.0 N$ rolls $50 m$ down a slope. | 1) A stone weighing $5.0 N$ is dropped from the top of a $50 m$ high cliff. |
| What is the work done by the force of gravity? | What is the work done by the force of gravity? | What is the work done by the force of gravity? |
| force on satellite F=pull of gravity = weight of satellite = $500 N$ toward center of Earth | force on stone F=pull of gravity = weight of stone = $5.0 N$ verically downwards | force on stone F=pull of gravity weight of stone = $5.0 N$ verically downwards |
| distance moved by satellitetoward center of aeth (that is, in the direction of force) $s=0$. The satellite remains at a constant distance from the Earth. It does not move in the direction of F. | distance moved by stone down slope = $50 m$,but distance moved in direction of force $s=30m$ | distance moved by stone in direction of force $s = 50 m$ verically downwards |
| $\begin{array}{l} Work\,done = F \times s\\ = 500\, \times \,0\\ = 0\,J \end{array}$ |
$\begin{array}{l} Work\,done = F \times s\\ = 5.0\, \times \,30\\ = 150\,J \end{array}$ |
$\begin{array}{l} Work\,done = F \times s\\ = 5.0\, \times \,50\\ = 250\,J \end{array}$ |
Questions
1) In each of the following examples, explain whether or not any work is done by the force mentioned.
a: You pull a heavy sack along rough ground.
b: The force of gravity pulls you downwards when you fall off a wall.
c: The tension in a string pulls on a stone when you whirl it around in a circle at a steady speed.
d: The contact force of the bedroom floor stops you from falling into the room below.
2) A man of mass $70 kg$ climbs stairs of vertical height $2.5 m$. Calculate the work done against the force of gravity. (Take $g = 9.8\,m\,{s^{ - 2}}$.)
3) A stone of weight $10 N$ falls from the top of a $250 m$ high cliff.
Calculate how much work is done by the force of gravity in pulling the stone to the foot of the cliff.
How much energy is transferred to the stone if air resistance is ignored?
Suppose that the force F moves through a distance s that is at an angle $\theta $ to F, as shown in Figure 5.6.
To determine the work done by the force, it is simplest to determine the component of F in the direction of s. This component is $F\,\cos \,\theta $, and so we have:
moves.
or simply:
$work\,down\, = \,Fs\,\cos \theta $
Worked example 1 shows how to use this.
WORKED EXAMPLE
1) A man pulls a box along horizontal ground using a rope (Figure 5.7). The force provided by the rope is $200 N$, at an angle of ${30^ \circ }$ to the horizontal.
Calculate the work done if the box moves $5.0 m$ along the ground.
Step 1: Calculate the component of the force in the direction in which the box moves. This is the horizontal component of the force:
$horizontal\,component\,of\,the\,force\, = \,200\,\cos {30^ \circ }\, \approx \,173N$
Hint: F cos θ is the component of the force at an angle θto the direction of motion.
Step 2: Now calculate the work done:
$\begin{array}{l}
work\,done\, = \,force\, \times \,dis\tan ce\,moved\\
= 173\, \times 5.0 = 865J
\end{array}$
Hint: Note that we could have used the equation work done $ = Fs\,\cos \theta \,$ to combine the two
steps into one.
Questions
4) The crane shown in Figure 5.8 lifts its $500 N$ load to the top of the building from A to B. Distances are as shown on the diagram. Calculate how much work is done by the crane.
5) Figure 5.9 shows the forces acting on a box that is being pushed up a slope. Calculate the work done by each force if the box moves $0.50 m$ up the slope.
