Difference between revisions of "Speed=Distance/Time"
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[[File:sdtTriangle.png|right|300px|thumb|This equation triangle shows how to rearrange the equation to find speed, distance or time. To find speed cover over the s to find it is d/t. To find distance cover over the d to find it is s x t. To find time cover over t to find it is d/s.]] | [[File:sdtTriangle.png|right|300px|thumb|This equation triangle shows how to rearrange the equation to find speed, distance or time. To find speed cover over the s to find it is d/t. To find distance cover over the d to find it is s x t. To find time cover over t to find it is d/s.]] | ||
| − | :<math>Speed = {\ | + | :<math>Speed = {\frac{distance}{time}} </math> is an equation which can be used to calculate the [[speed]] of an [[object]] given the [[distance]] traveled and the [[time]] taken to travel that [[distance]]. |
===About Speed=Distance/Time=== | ===About Speed=Distance/Time=== | ||
Revision as of 21:39, 6 December 2018
Key Stage 3
Meaning
\[Speed = {\frac{distance}{time}} \] is an equation which can be used to calculate the speed of an object given the distance traveled and the time taken to travel that distance.
About Speed=Distance/Time
- The standard scientific units for measuring speed are metres per second (m/s).
- The units of speed are given by the units of distance used and the units of time used in the calculation.
\[Speed = {\frac{distance}{time}} \]
\[Speed = {\frac{metres}{seconds}} \]
\[Speed = {\frac{m}{s}} \]
\[Speed = m/s \]
Example Calculations
| A person jogs 300 metres in 120 seconds. Calculate the speed of the jogger. | A racing car travels 500 metres in 10 seconds. Calculate the speed of the racing car. |
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distance = 300m time = 120s \(Speed = {\tfrac{distance}{time}} \) \(Speed = {\tfrac{300}{120}} \) \(Speed = 2.5m/s \) |
distance = 500m time = 10s \(Speed = {\tfrac{distance}{time}} \) \(Speed = {\tfrac{500}{10}} \) \(Speed = 50m/s \) |
| A horse takes 20 minutes to trot 2.4 kilometres. Calculate the speed of the horse in metres per second. | The International Space Station takes 92 minutes to orbit the Earth once travelling 42,000 kilometres. Calculate the speed of the ISS. |
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\(Speed = {\tfrac{distance}{time}} \) \(Speed = {\tfrac{2400}{1200}} \) \(Speed = 2m/s \) |
distance = 42,000km = 42,000,000m \(Speed = {\tfrac{distance}{time}} \) \(Speed = {\tfrac{42000000}{5400}} \) \(Speed = 7608.7m/s \) \(Speed \approx 7600m/s \) |