Answer:
The average annual growth rate of a certain country's population for 1950, 1988, and 2010 are 2.398, 0.9985 and 0.2236 respectively.
Step-by-step explanation:
The given equation is
[tex]Y=-0.0000084x^3+0.00211x^2-0.205x+8.423[/tex]
Where Y is the annual growth rate of a certain country's population and x is the number of years after 1900.
Difference between 1950 and 1900 is 50.
Put x=50 in the given equation.
[tex]Y=-0.0000084(50)^3+0.00211(50)^2-0.205(50)+8.423[/tex]
[tex]Y=2.398[/tex]
Therefore the estimated average annual growth rate of the country's population for 1950 is 2.398.
Difference between 1988 and 1900 is 88.
Put x=88 in the given equation.
[tex]Y=-0.0000084(88)^3+0.00211(88)^2-0.205(88)+8.423[/tex]
[tex]Y=0.9984752\approx 0.9985[/tex]
Therefore the estimated average annual growth rate of the country's population for 1988 is 0.9985.
Difference between 2010 and 1900 is 110.
Put x=110 in the given equation.
[tex]Y=-0.0000084(110)^3+0.00211(110)^2-0.205(110)+8.423[/tex]
[tex]Y=0.2236[/tex]
Therefore the estimated average annual growth rate of the country's population for 2010 is 0.2236.
