Answer :
The given sequence is:
[tex]a(n)= \frac{1}{3} (3)^{n-1} [/tex]
a(2)=1
a(3)=3
a(4)=9
We are to find the average rate of change between n=3 and n=4 for the given function.
Average rate of change = [tex] \frac{a(4)-a(3)}{4-3} = \frac{9-3}{1}=6 [/tex]
So the average rate of change for the given function from n = 3 to n = 4 is 6
[tex]a(n)= \frac{1}{3} (3)^{n-1} [/tex]
a(2)=1
a(3)=3
a(4)=9
We are to find the average rate of change between n=3 and n=4 for the given function.
Average rate of change = [tex] \frac{a(4)-a(3)}{4-3} = \frac{9-3}{1}=6 [/tex]
So the average rate of change for the given function from n = 3 to n = 4 is 6
Answer:
the average rate of change i s n = 3 to n = 4 is 6
Step-by-step explanation: