Speed, Distance and Time

Speed is the ratio between distance travelled as a function of time. It is used to describe the motion of an object.

The general equation used to calculate the speed is:

|v=\displaystyle \frac{\triangle x}{\triangle t}|

where

|v| stands for the speed |\text {(m/s)}|
|\triangle x| stands for the variation in position of the moving object |\left( x_{f} - x_{i} \right)| |\text {(m)}|
|\triangle t| stands for the variation of time |\left( t_{f} - t_{i} \right)| |\text {(s)}|

This formula is used to calculate the average speed or the instantaneous speed of an object at constant speed. For an object undergoing acceleration, a different type of motion must be taken into account, which is uniformly accelerated rectilinear motion (UARM).

What is the average speed of a car travelling at a distance of |\text {50 km}| in |\text {30 min}| ?

To convert a speed in metres per second to kilometres per hour, the procedure is as follows:

|\displaystyle \frac{\text {m}}{\text {s}} \times \frac {\text {1 km}}{\text {1 000 m}} \times \frac {\text {3 600 s}}{\text {1 h}}|

More simply, just calculate:

|\displaystyle \frac{\text {m}}{\text {s}} \times 3.6 = \frac{\text {km}}{\text {h}}|

It is also possible to convert a speed from kilometres per hour into metres per second:

|\displaystyle \frac{\small \text {km}}{\text {h}} \times \frac {\text {1 000 m}}{\text {km}} \times \frac {\text {1 h}}{\text {3 600 s}}|

More simply, just calculate:

|\displaystyle \frac{\text {km}}{\text {h}} \div 3.6 = \frac{\text {m}}{\text {s}}|