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21 votes
21 votes
If f(x) is an exponential function where f(-1.5) 26 and

f(5.5) = 7, then find the value of f(10), to the nearest hundredth.

User Yuri Aps
by
2.5k points

1 Answer

15 votes
15 votes

Answer:


f(10) = 1147.25

Explanation:

Given


f(-1.5) = 26


f(5.5) = 7

Required

f(10)

An exponential function is represented as:


f(x) = ab^x


f(-1.5) = 26 impleies that:


26 = ab^(-1.5) --- (1)


f(5.5) = 7 implies that


7 = ab^(5.5) --- (2)

Divide (2) by (1)


26/7 = ab^(-1.5)/ab^(5.5)


3.71429 = b^(-1.5+5.5)


3.71429 = b^(4)

Take 4th root


b = 1.39

Substitute
b = 1.39 in
26 = ab^(-1.5)


26 = a * 1.39^(-1.5)


26 = a * 0.6102

Solve for (a)


a = 26/0.6102


a = 42.61

f(10) is calculated as:


f(10) = ab^(10)


f(10) = 42.61 * 1.39^(10)


f(10) = 1147.25

User David Aguilar
by
3.1k points