Speed-time and velocity-time graphs
Speed-time graphs show speed on the vertical axis and time on the horizontal axis.
The gradient of a speed-time graph represents acceleration because
\(gradient = \frac{change~in~y}{change~in~x} = \frac{change~in~speed}{change~in~time} =\)
\(\frac{change~in~metres~per~second}{change~in~seconds} = metres~per~second\)
Metres per second per second can be written as \(m/s^2\) or \(ms^{-2}\)
A negative gradient shows the rate of 鈥渟lowing down鈥 or deceleration.
Velocity-time graphs show velocity on the vertical axis.
Acceleration is still represented by the gradient.
The area under a speed-time graph represents the distance travelled.
Likewise, the area under a velocity-time graph represents the Quantity describing the distance from the start of the journey to the end in a straight line with a described direction, eg 50 km due north of the original position. of the moving object. If the velocity is always positive, then the displacement will be the same as the distance.
Example
Describe what is happening in this journey.
Between 0 and 4 seconds:
The object is accelerating at \(\frac{8}{4} = 2~m/s^2\). It travels \(\frac{1}{2} \times 4 \times 8 = 16~m\).
Between 4 and 7 seconds:
the object is travelling at a constant velocity of 8 m/s. It travels \(3 \times 8 = 24~m\).
Between 7 and 10 seconds:
the object is accelerating at \(\frac{-8}{3} = -2\frac{2}{3}~m/s^2\). This means it is slowing down or decelerating at a rate of \(2\frac{2}{3}~m/s^2\). It travels \(\frac{1}{2} \times 3 \times 8 = 12~m.\)