to Help Country A has a growth rate of 3.7% per year. The population is currently...
1) Please write clearly. Country A has a growth rate of 3.2% per year. The population is currently 5,147,000, and the land area of Country A is 36,000,000,000 square yards. Assuming this growth rate continues and is exponential, after how long will there be one person for every square yard of land? This will happen in year(s). (Round to the nearest integer.)
In 2020, the population of a country is about 100 million, and the exponential growth rate is 1% per year. a) Find the exponential growth function. b) Estimate the population in 2030. c) After how long will the population be double what it is in 2020?
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...
Complete the following table Population Growth Rate, k Doubling Time, T Country A 2.6% per year Country B 26 years Population Growth Rate, k Doubling Time Country A 2.6% per year !years Country B % per year 26 years Round doubling time to the nearest whole number and round growth rate to the nearest tenth.)
Country A: Growth rate is 1.4% per year Country B: Growth rate is 2.1% per year Both countries start with 1,000 After a century, Which country will have more GDP per person? How much more? A. Country A; 2,000 more B. Country A; 4,000 more C. Country B; 2,000 more D. Country B; 4,000 more
this exercise uses the population growth model. The population of a country has SPRECALC7 4.6.007.MI. MY NOTES This exercise uses the population growth model. The population of a country has a relative growth rate of 39 per year. The government is trying to reduce the growth rate to 2%. The population in 2011 was approximately 120 million. Find the projected population for the year 2038 for the following conditions. (Round your answers to the nearest million) (a) The relative growth...
(1 point) A population doubles every 17 years. Assuming exponential growth find the following: (a) The annual growth rate is * %. help (numbers) (b) The continuous growth rate is ! % per year. help (numbers)
In the year 2000, the population of a certain country was 278 million with an estimated growth rate of 0.5% per year. Based on these figures, find the doubling time and project the population in 2100. Let y(t) be the population of the country, in millions, t years after the year 2000. Give the exponential growth function for this country's population. y(t) = 1 (Use integers or decimals for any numbers in the expression. Round to four decimal places as...
The fox population in a certain region has a continuous growth rate of 9 percent per year. It is estimated that the population in the year 2000 was 8300. (a) Find a function that models the population t years after 2000 (t = 0 for 2000). Hint: Use an exponential function with base e. Your answer is P(t) = (b) Use the function from part(a) to estimate the fox population in the year 2008. Your answer is the answer must...
Solve the problem. 7) If a population has a growth rate of 6% per year, how long to the nearest tenth of a year will it take the population to double? 8) Let P(t) be the quantity of strontium-90 remaining after t years. Suppose the half-life of strontium-90 is 28 years. Which of the following equations expresses the half-life information?