In 2012, the population of a district was 25,300. With an annual growth rate of approximately...
QUESTIONS PONT 2012 the population of a district was 26,300. With a continuous annual growth rate of approximately 4%, what population ben 2023 according to the exponential growth function? Round the answer to the ne e answer to the nearest whole number Step shing 0 6 6 F9 & q F10 7 511 000 &
Question 19 In 2000 the population of a small village was 2,400. With an annual growth rate of approximately 1.68%, compounded continuously, what will the population be in 2020 according to the exponential growth function? Round your answer to the nearest whole number, and do not include the units in your answer. Provide your answer below: P FEEDBACK
In 2012, the population of a city was 5.82 million. The exponential growth rate was 2.28% per year. a) Find the exponential growth function. b) Estimate the population of the city in 2018. c) When will the population of the city be 8 million? d) Find the doubling time. a) The exponential growth function is P(t) = , where t is in terms of the number of years since 2012 and P(t) is the population in millions. (Type exponential notation...
In 2012, the population of a city was 5.42 million. The exponential growth rate was 1.75% per year. a) Find the exponential growth function. b) Estimate the population of the city in 2018 c) When will the population of the city be 9 million? d) Find the doựbling time a) The exponential growth function is (t) = where t is in terms of the number of years since 2012 and P(t) is the population in millions (Type exponential notation with...
In 2012, the population of a city was 629 million. The exponential growth rate was 3.41% per year. a) Find the exponential growth function. b) Estimate the population of the city in 2018 c) When will the population of the city be 8 million? d) Find the doubling time a) The exponential growth function is P(t)wher t is in terms of the number of years since 2012 and P() is the population in millions. (Type exponential notation with positive exponents....
In the year 2000, the population of a certain country was 276 million with an estimated growth rate of 0.5% per year a. Based on these figures, find the doubling time and project the population in 2120 b Suppose the actual growth rates are ust 0.2 percentage points lower and higher than 0.5% per year 0.3% and 0.7%). What are the resulting doubling times and projected 2120 population? a. Let y(t) be the population of the country, in millions, t...
the population of a city was 5 45 million. The exponential growth rate was 2 64% per year. a Find the exponential growth function b Estimate the population of the city in 2018 c) When will the population of the city be 7 million? d) Find the doubling time. a) The exponential growth function is P(t)# where t is in terms of the number of years since 2012 and Type exponential notation with positive exponents Do not simplity Use integers...
An economy grows at an annual rate of 3%. It will take approximately years for GDP to double. (Round your answer to the nearest whole number.) An economy grows at an annual rate of 10%. It will take approximately years for GDP to double. (Round your answer to the nearest whole number.)
a in in 2000, the population of a country was approximately 5.51 milion and by 2050 it is projected to grow to 10 milion. Use the exponential growth model A.Ap which is the number of years after 2000 and is in millions, to find an exponential growth function that models the data. By which year will the population be 13 million? b. 2000 6,510,00 1950 1970 1900 2010 2030 2050 a. The exponential growth function that models the data is...
1) Please write clearly.
In 2012, the population of a city was 5.97 million. The exponential growth rate was 1.66% per year. a) Find the exponential growth function. b) Estimate the population of the city in 2018. c) When will the population of the city be 10 million? d) Find the doubling time. a) The exponential growth function is P(t) = 1, where t is in terms of the number of years since 2012 and P(t) is the population in...