Speed, distance and time
distanceNumerical description of how far apart two things are. For example, the distance from Edinburgh to Glasgow is approximately 50 miles. is how far an object moves. It does not include an associated direction, so distance is a scalarA physical quantity that has magnitude (size) only. Eg energy, temperature, mass, distance. quantity.
speedThe distance travelled in a fixed time period, usually one second. is the rate of changeThe ratio showing how the value of an amount varies in relation to another. of distance - it is the distance travelled per unit time. Like distance, speed also does not have an associated direction, so it is a scalar quantity.
Typical speeds
When people walk, run, or travel in a car their speed will change. They may speed up, slow down or pause for traffic. The speed at which a person can walk, run or cycle depends on many factors including:
- age
- terrain
- fitness
- distance travelled
Some typical values for speed in metres per second (m/s) include:
| Method of travel | Typical speed in m/s |
| Walking | 1.5 |
| Running | 3 |
| Cycling | 6 |
| Car | 13-30 |
| Train | 50 |
| Aeroplane | 250 |
| Method of travel | Walking |
|---|---|
| Typical speed in m/s | 1.5 |
| Method of travel | Running |
|---|---|
| Typical speed in m/s | 3 |
| Method of travel | Cycling |
|---|---|
| Typical speed in m/s | 6 |
| Method of travel | Car |
|---|---|
| Typical speed in m/s | 13-30 |
| Method of travel | Train |
|---|---|
| Typical speed in m/s | 50 |
| Method of travel | Aeroplane |
|---|---|
| Typical speed in m/s | 250 |
It is not only moving objects that have varying speed. The speed of the wind and the speed of sound also vary. A typical value for the speed of sound in air is about 330 m/s.
Learn more on displacement, distance and speed in this podcast
Listen to the full series on 大象传媒 Sounds.
Calculations involving speed, distance and time
The average speed of a moving object can be calculated using the equation:
\(average~speed = \frac{distance~travelled}{time}\)
\(v = \frac{s}{t}\)
This is when:
- average speed (v) is measured in metres per second (m/s)
- distance travelled (s) is measured in metres (m)
- time (t) is measured in seconds (s)
Example
A car travels 500 m in 50 s, then 1,500 m in 75 s. Calculate its average speed for the whole journey.
First calculate total distance travelled:
\(500 + 1,500 = 2,000~m\)
Then calculate total time taken:
\(50 + 75 = 125~s\)
Then use \(v = \frac{s}{t}\)
To find v:
\(v = \frac{s}{t}\)
\(v = \frac{2,000}{125}\)
\(v = 16~m/s\)
Converting units
It is important in motion calculations to be able to easily convert between units, in particular between metres and kilometres, and seconds and hours.
1 metre is equal to 0.001 kilometres so to convert from metres to kilometres - divide by 1,000.
1 kilometre is equal to 1,000 metres so to convert from kilometres to metres - multiply by 1,000.
1 hour is equal to 3,600 seconds so to convert from hours to seconds - multiply by 3,600.
For example:
Question
Convert the following into kilometres:
- 12,300 m
- 5,389 m
- 252 m
- 64 m
Answers
- 12,300 m = 12.3 km
- 5,389 m = 5.389 km
- 252 m = 0.252 km
- 64 m = 0.064 km
Question
Convert the following into seconds:
- 1.5 h
- 12 h
- 1.5 h = 5,400 s
- 12 h = 43,200 s
Question
Convert 1 m/s into km/h.
- 1 m/s = 3,600 m/h
- 3,600 m/h = 3.6 km/h