Answer:
Step-by-step explanation:
b = 5655
r = 1.4% = 1.4/100 = 0.014
Therefore, the equation would be
y = 5655(1 + 0.014)^t
y = 5655(1.014)^t
b) in 2022, t = 2022 - 2010 = 12 years
y = 5655(1.014)^12
y = 6682
(a) The equation that estimated the population t years after 2010 is [tex]y = 5655 \times (1.014)^t[/tex].
b) The population of the town in the year 2022 is 6,682.
Given that,
Based on the above information, the calculation is as follows:
(a) The equation is
[tex]y = 5655 \times (1 + 0.014)^t[/tex]
(b) Now the population of the town in the year 2022 is
Here t = 2022 - 2010 = 12 years
So,
y = 6682
Therefore we can conclude that
(a) The equation that estimated the population t years after 2010 is [tex]y = 5655 \times (1.014)^t[/tex].
b) The population of the town in the year 2022 is 6,682.
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