The sequence an = one third(3)n − 1 is graphed below: coordinate plane showing the points 2, 1; 3, 3; and 4, 9 Find the average rate of change between n = 3 and n = 4.

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asked Jan 22, 2019 104k views

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ManuBriot · Answer 1 · 2019-01-28T22:09:18+0000

The given sequence is:

a(n)= (1)/(3) (3)^(n-1)

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 =
(a(4)-a(3))/(4-3) = (9-3)/(1)=6

So the average rate of change for the given function from n = 3 to n = 4 is 6

The sequence an = one third(3)n − 1 is graphed below: coordinate plane showing the points 2, 1; 3, 3; and 4, 9 Find the average rate of change between n = 3 and n = 4.

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