Answer:
Part 1) [tex]y=80,000(1.035)^{x}[/tex]
Part 2) The table in the attached figure
Part 3) The graph in the attached figure
Step-by-step explanation:
Part 1) Find the population function
In this problem we have a exponential function of the form
[tex]y=a(b)^{x}[/tex]
where
y ----> is the population
x ----> the time in years
a is the initial value (a=80,000 people)
b is the base (b=100%+3.5%=103.5%=1.035)
substitute
[tex]y=80,000(1.035)^{x}[/tex]
Part 2) Construct the table
For x=0 years
substitute in the function equation
[tex]y=80,000(1.035)^{0}=80,000\ people[/tex]
For x=10 years
substitute in the function equation
[tex]y=80,000(1.035)^{10}=112.848\ people[/tex]
For x=20 years
substitute in the function equation
[tex]y=80,000(1.035)^{20}=159,183\ people[/tex]
For x=40 years
substitute in the function equation
[tex]y=80,000(1.035)^{40}=316,741\ people[/tex]
For x=50 years
substitute in the function equation
[tex]y=80,000(1.035)^{50}=446,794\ people[/tex]
For x=75 years
substitute in the function equation
[tex]y=80,000(1.035)^{75}=1,055,884\ people[/tex]
For x=100 years
substitute in the function equation
[tex]y=80,000(1.035)^{100}=2,495,313\ people[/tex]
Part 3) The graph in the attached figure
