Speed Conversion (km/h ↔ m/s)

GCSE Measures speed units

\( \text{m/s}=\tfrac{\text{km/h}}{3.6},\qquad \text{km/h}=3.6\times\text{m/s} \)

Statement

Speed can be expressed in different units depending on context. Everyday travel often uses kilometres per hour (km/h), while physics calculations usually use metres per second (m/s). The two are related by the factor 3.6:

\[ \text{m/s} = \frac{\text{km/h}}{3.6}, \quad \text{km/h} = 3.6 \times \text{m/s} \]

Why it’s true

1 kilometre = 1000 metres.
1 hour = 3600 seconds.
So, \(1 \,\text{km/h} = \tfrac{1000}{3600} \,\text{m/s} = \tfrac{1}{3.6}\,\text{m/s}\).
Reversing gives \(1 \,\text{m/s} = 3.6 \,\text{km/h}\).

Recipe (how to use it)

To convert from km/h to m/s, divide by 3.6.
To convert from m/s to km/h, multiply by 3.6.
Always check the units in the question: physics formulae (e.g. \( v = d/t \)) usually expect m/s.

Spotting it

Look for word problems where speeds are mixed with distances in metres or times in seconds. Unit consistency is essential for correct answers.

Common pairings

Formulae for speed, distance, and time (\(v = d/t\)).
Kinematics equations in physics.
Car speed limits and running paces in real-life problems.

Mini examples

Given: Convert 72 km/h to m/s. Answer: \(72 \div 3.6 = 20\) m/s.
Given: Convert 15 m/s to km/h. Answer: \(15 \times 3.6 = 54\) km/h.

Pitfalls

Forgetting whether to divide or multiply by 3.6.
Mixing up km and m, or hours and seconds.
Rounding too early instead of keeping exact decimals until the end.
Leaving the answer without units.

Exam strategy

Underline the units in the question.
Write down the conversion formula before substituting.
Check the reasonableness of your answer: 100 km/h is about 28 m/s, so answers far off this scale are suspect.

Summary

Converting between km/h and m/s is a straightforward calculation using the factor 3.6. Divide by 3.6 to go to m/s, multiply by 3.6 to go to km/h. This skill is critical for accuracy in GCSE physics and applied maths problems involving motion.