Answer:
(a) [tex]y = 83 (1.048)^x[/tex]
(b) 2020
Step-by-step explanation:
(a) Let the exponential equation that shows the population in thousand after x years,
[tex]y = ab^x[/tex]
Also, suppose the population is estimated since 2010,
So, x = 0, y = 83 thousands,
[tex]83 = ab^0[/tex]
[tex]\implies a = 83[/tex]
Again by 2015 the population had grown to 105 thousand,
i.e. y = 105, if x = 5,
[tex]\implies 105 = ab^5[/tex]
[tex]\implies 105 = 83 b^5[/tex]
[tex]\implies b = (\frac{105}{83})^\frac{1}{5}=1.0481471103\approx 1.048[/tex]
Hence, the required function,
[tex]y = 83 (1.048)^x[/tex]
(b) if y = 135,
[tex]135 = 83(1.048)^x[/tex]
[tex]\implies x = 10.375\approx 10[/tex]
Hence, after approximately 10 years since 2010 i.e. in 2020 the population would be 135.
