The growth in the number (in millions) of Internet users in a certain country between 1990 and 2015 can be approximated by a logistic function with k=0.0016 where t is the number of years since 1990. In 1990 (when t=0), the number of users was about 44 million, and the number is expected to level out around 220 million. (a) Find the growth function G(t) for the number of Internet users in the country. Estimate the number of Internet users in the country and the rate of growth for the following years. (b) 1994 (c) 2001 (d) 2010 (e) What happens to the rate of growth over time? (a) G(t)equals=(INSERT ANSWER HERE)
The growth in the number (in millions) of Internet users in a certain country between 1990 and 2015 can be approximated by a logistic function with k=0.0016 where t is the number of years since 1990. In 1990 (when t=0), the number of users was about 44 million, and the number is expected to level out around 220 million. (a) Find the growth function G(t) for the number of Internet users in the country. Estimate the number of Internet users in the country and the rate of growth for the following years. (b) 1994 (c) 2001 (d) 2010 (e) What happens to the rate of growth over time? (a) G(t)equals=(INSERT ANSWER HERE)
Chapter6: Exponential And Logarithmic Functions
Section6.8: Fitting Exponential Models To Data
Problem 1TI: Table 2 shows a recent graduate’s credit card balance each month after graduation. a. Use...
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The growth in the number (in millions) of Internet users in a certain country between 1990 and 2015 can be approximated by a logistic function with
k=0.0016
where t is the number of years since 1990. In 1990 (when
t=0),
the number of users was about
44
million, and the number is expected to level out around
220
million.
(a) Find the growth function G(t) for the number of Internet users in the country.
|
|||
Estimate the number of Internet users in the country and the rate of growth for the following years.
|
|||
(b) 1994
|
(c) 2001
|
(d) 2010
|
|
(e) What happens to the rate of growth over time?
|
(a)
G(t)equals=(INSERT ANSWER HERE)
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