Answer:
The average rate of change for this sequence is 1
Step-by-step explanation:
The average rate of change is calculated as the slope of the line joining the end points of the sequence.
In this case the end points are;
(-.5, 2.5) and (1,4)
We simply calculate the slope using the gradient formula;
Change in y / change in x
(4 - 2.5)/(1 - -0.5) = 1
Answer:
1
Step-by-step explanation:
We are given the following sequence below and we are to find out the average rate of change for it:
(-.5, 2.5), (0,3, 0.5), (1,4)
We can find the average rate of change for this by taking any two points from this sequence and finding its slope.
Slope = [tex] \frac { 4 - 2.5 } { 1 - ( -0.5 ) } = 1 [/tex]
Therefore, the average rate of change for this sequence is 1.
