Speed, Distance and Time

Have you ever wondered how fast your school bus goes or how quickly you can run in a race? In our daily life, we see moving vehicles, running people, and flying birds—all travelling different distances in different amounts of time.

To compare how quickly things move, we use the idea of speed. Speed tells us how fast or slow something is moving. It is measured by how much distance an object covers in a certain amount of time. For example, when a car travels 60 kilometres in one hour, we say its speed is 60 kilometres per hour.

Speed = `"Distance" / "Time"` 

Distance = Speed × Time 

Time = `"Distance" / "Speed"`

• Distance: meters (m), kilometers (km)

• Time: seconds (s), minutes (min), hours (h)

• Speed: meters per second (m/s), kilometers per hour (km/h)

Tip:

• To change minutes to hours, divide by 60.

• To change hours to minutes, multiply by 60.

A bus travels 60 km in 2 hours. What is the speed?

• Distance = 60 km

• Time = 2 h

• Speed = `"Distance" / "Time"` 

• Speed = 60 ÷ 2 = 30 km/h

Problem: a boy covers a distance of 1.2 km in 40 minutes. Find his speed in
(i) km per hour (km h⁻¹)
(ii) metre per second (m s⁻¹)

Solution:

(i) In order to get speed in km per hour, the distance covered must be in km
and the time taken must be in hours. 
Given: distance = 1.2km and time = 40 min = `40/60` h = `2/3` h

∴ Speed = `"Distance" / "Time"`

              = `"1.2 km" / "2/3 h"`

             = 1.2  × `3/2 ` km h⁻¹

              =  1.8 km h⁻¹   
(ii) In order to get speed in metres per second, the distance covered must be in metres, and the time taken must be in seconds. 
Given: distance = 1.2 km = 1.2 × 1000 m = 1200 m

And, time = 40 min = 40 × 60 sec = 2400 sec

∴ Speed = `"Distance" / "Time"`

              = `"1200 m" / "2400 sec"`

              = `"1" / "2"` m s⁻¹ = 0·5 m s⁻¹ 

• Speed measures “how fast”

• Always make sure units match before calculating