Requirement 1a. A. In​ 2000, the population of a country was approximately 5.63 million and by...

The population of Toledo, Ohio, in the year 2000 was approximately 490,000. Assume the population is...

The population of Toledo, Ohio, in the year 2000 was approximately 490,000. Assume the population is increasing at a rate of 4.6 % per year. a. Write the exponential function that relates the total population, P (t), as a function of t, the number of years since 2000. P(t) = b. Use part a. to determine the rate at which the population is increasing in t years. Use exact expressions. P '(t) = people per year c. Use part b....

The population of a country on January 1, 2000, is 16.8 million and on January 1,...

The population of a country on January 1, 2000, is 16.8 million and on January 1, 2010, it has risen to 18 million. Write a function of the form P(t) = P0e rt to model the population P(t) (in millions) t years after January 1, 2000. Then use the model to predict the population of the country on January 1, 2016. round to the nearest hundred thousand. A) P = 16.8e0.00690t; 86.5 million B) P = 16.8e0.00690t; 18.8 million C)...

The population of a region is growing exponentially. There were 35 million people in 1980 (when...

The population of a region is growing exponentially. There were 35 million people in 1980 (when t=0) and 70 million people in 1990. Find an exponential model for the population (in millions of people) at any time t, in years after 1980. P(t)= What population do you predict for the year 2000? Predicted population in the year 2000 = million people. What is the doubling time? Doubling time = years.

The population of a region is growing exponentially. There were 20 million people in 1980 (when...

The population of a region is growing exponentially. There were 20 million people in 1980 (when t=0) and 70 million people in 1990. Find an exponential model for the population (in millions of people) at any time tt, in years after 1980. P(t)= What population do you predict for the year 2000? Predicted population in the year 2000 = million people. What is the doubling time? Doubling time = years.

In 2000, the population of Montrose, GA was 153. By 2010, the population had increased to...

In 2000, the population of Montrose, GA was 153. By 2010, the population had increased to 215. (a) Find the linear model L(t) that gives the population of Montrose t years after 2000. (b) Find the exponential model E(t) that gives the population of Montrose t years after 2000. (c) What do each of the models predict that the population of Montrose will be by 2020?

Suppose an initial population of 33 million people increases at a continuous percent rate of 1.8%...

Suppose an initial population of 33 million people increases at a continuous percent rate of 1.8% per year since the beginning of 2000. Write a function ff that determines the population (in millions) in terms of the number of years tt since the beginning of 2000. f(t)=f(t)=    Determine the population (in millions) at the beginning of 2019. million people    What is the annual growth factor for the population?     If aa represents the population (in millions) at some point in...

According to the United States Census Bureau the population of Utah was 2.12 million people in...

According to the United States Census Bureau the population of Utah was 2.12 million people in 1997 and 2.53 million people 9 years later in 2006. Use an explicit exponential model to calculate the rate of growth of the population over this time period. Express the rate of growth as a percentage. Round to the nearest hundredth. r=

The fox population in a certain region has a continuous growth rate of 5 percent per...

The fox population in a certain region has a continuous growth rate of 5 percent per year. It is estimated that the population in the year 2000 was 23600. (a) Find a function that models the population t years after 2000 (t=0 for 2000) (b) Use the function from part (a) to estimate the fox population in the year 2008.

The population of a country is growing exponentially. The population in millions was 90 in 1970...

The population of a country is growing exponentially. The population in millions was 90 in 1970 and 140 in 1980. A. What is the population t years after 1970? B. How long does it take the population to double? C. When will the population be 400 million?

The number of asthma sufferers in the world was about 83 million in 1990 and has...

The number of asthma sufferers in the world was about 83 million in 1990 and has been increasing over the years at an approximate rate of 7% per year. Let N represent the number of asthma sufferers, in millions, worldwide t years after 1990. a) what is the yearly growth or decay factor. (answer complete sentence) b) write an exponential model to represent the number of asthma sufferers worldwide, N(t), in millions, as a function of t years since 1990....