Answer:
decay factor = 0.46
unit percent change = 0.54
Initial value = 456.52
Function: p(m) = 456.52(0.54)^m
Step-by-step explanation:
To find the decay factor, we need to find the proportion of two consecutive values in the table. So:
96.6/210 = 0.46
44.436/96.6 = 0.46
Since both values are equal, we can say that the decay factor is 0.46
Then, the decay factor is equal to 1 - r. Where us the unit percent change. So, we can solve for r as follows:
0.46 = 1 - r
0.46 + r = 1 - r + r
0.46 + r = 1
0.46 + r - 0.46 = 1 - 0.46
r = 0.54
Therefore, the unit percent change is 0.54
On the other hand, we can calculate the initial value dividing p(1) = 210 by the decay factor. So, the initial value P(0) is:
P(0) = 210/0.46 = 456.52
Finally, the function has the form:
p(m) = 456.52(0.46)^m
Where 456.52 is the initial value and 0.46 is the decay factor.
So, the answers are:
decay factor = 0.46
unit percent change = 0.54
Initial value = 456.52
Function: p(m) = 456.52(0.54)^m