Answer:
The equation that represents the population after T years is
[tex]P_{t} = 7,632,819,325 [1 +\frac{1.09}{100} ]^{T}[/tex]
Step-by-step explanation:
Population in the year 2018 ( P )= 7,632,819,325
Rate of increase R = 1.09 %
The population after T years is given by the formula
[tex]P_{t} = P [1 +\frac{R}{100} ]^{T}[/tex] -------- (1)
Where P = population in 2018
R = rate of increase
T = time period
Put the values of P & R in above equation we get
[tex]P_{t} = 7,632,819,325 [1 +\frac{1.09}{100} ]^{T}[/tex]
This is the equation that represents the population after T years.
