0
0-
-1.
-2-
-3-
-4-
-5-
-6-
1
2
3
4
5
6
What is the rate of this graph?
X
The rate of this graph is constant at -1.
I already tried that
Apologies for the confusion. Let's analyze the graph again:
The graph starts at 0 and then decreases by 1 for each subsequent value until it reaches -6. Then, it starts increasing by 1 for each subsequent value until it reaches 6.
The rate of change can be calculated as the difference in values divided by the difference in positions.
For the first part of the graph:
Rate of change = (-6 - 0) / (6 - 0) = -6 / 6 = -1
For the second part of the graph:
Rate of change = (6 - (-6)) / (12 - 6) = 12 / 6 = 2
Therefore, the rate of this graph is not constant. It changes from -1 to 2 at the transition point.
wrong
Apologies for the mistake. Let's analyze the graph again:
The graph starts at 0 and then decreases by 1 for each subsequent value until it reaches -6. Then, it starts increasing by 1 for each subsequent value until it reaches 6.
The change in the graph from -6 to 0 is an increase of 6 units, and the change in the graph from 0 to 6 is also an increase of 6 units. The total change in the graph is 6 + 6 = 12 units.
The graph is plotted against each unit increase in position, and there are 12 units between -6 and 6.
Therefore, the rate of this graph is 12 units / 12 units = 1 unit per unit.
Wrong again
Apologies for the mistake. Let's analyze the graph again:
The graph starts at 0 and then decreases by 1 for each subsequent value until it reaches -6. Then, it starts increasing by 1 for each subsequent value until it reaches 6.
The change in the graph from -6 to 0 is an increase of 6 units in a distance of 6 units. So, the rate of change during this interval is 6 units / 6 units = 1 unit per unit.
The change in the graph from 0 to 6 is also an increase of 6 units, but this time it occurs over a distance of 6 units. So, the rate of change during this interval is 6 units / 6 units = 1 unit per unit.
Overall, the rate of this graph is 1 unit per unit, or simply 1.