Use the image to answer the question.
A coordinate plane has an increasing solid curve and a dotted straight line plotted on it, corresponding to two functions.
Given that the graph f(x)
is linear and the graph g(x)
is exponential solve the following problem:
Consider the graph of Function #1 and Function #2. How do the growth rates of the two functions compare?
(1 point)
Responses
The growth rate of Function #1 is always greater than the growth rate of Function #2.
The growth rate of Function #1 is always greater than the growth rate of Function #2.
Initially, Function #2 has the greater growth rate. After x=32, the growth rate of Function #1 surpasses the growth rate of Function #2.
Initially, Function #2 has the greater growth rate. After x equals 32 , the growth rate of Function #1 surpasses the growth rate of Function #2.
The growth rate of Function #2 is always greater than the growth rate of Function #1.
The growth rate of Function #2 is always greater than the growth rate of Function #1.
Initially, Function #1 has the greater growth rate. After x=32, the growth rate of Function #2 surpasses the growth rate of Function #1.
Initially, Function #1 has the greater growth rate. After x equals 32 , the growth rate of Function #2 surpasses the growth rate of Function #1.
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