A stone was dropped from the top of a cliff and the distance that it fell was measured at the intervals of time as given in the table below - Junior Cycle Science - Question a - 2011

From the graph, locate the value corresponding to 3.5 seconds on the time axis. Draw a horizontal line to intersect the curve. In this case, the distance shown is approximately 60 m. Thus, the stone had fallen 60 m in 3.5 s.

To find the average speed between the second and fourth seconds:

1. The distance fallen at 2 seconds is 20 m.
2. The distance fallen at 4 seconds is 80 m.
3. Average speed is calculated using the formula: $ext{Average Speed} = \frac{\text{Distance}_{final} - \text{Distance}_{initial}}{\text{Time}_{final} - \text{Time}_{initial}}$ Therefore: $\text{Average Speed} = \frac{80 m - 20 m}{4 s - 2 s} = \frac{60 m}{2 s} = 30 m/s$

In this experiment, distance fallen is not directly proportional to time. This can be observed by the shape of the graph. If the relationship were directly proportional, the graph would be a straight line, indicating a constant speed. However, the graph is curved, suggesting that the stone is accelerating due to gravity as it falls, therefore demonstrating a non-linear relationship.