Respuesta :
Answer:
Population in 1998 year = 6.22 billion
Step-by-step explanation:
Given:-
- The population in year 1987, Po = 5 billion
- Growth rate, r = 2%
- World population follows an exponential growth model
Find:-
The projected world population in 1998.
Solution:-
- The exponential growth model is mathematically expressed as:
Population in x year = Po* ( 1 + r/100)^( x - xo )
Where, xo: The base year.
- Plug in the values and solve for the projected population in year 1998:
Population in 1998 year = 5,000,000,000* ( 1 + 2/100)^( 1998 - 1987 )
Population in 1998 year = 5,000,000,000* ( 1 + 0.02)^( 11 )
= 5,000,000,000* ( 1.02 )^( 11 )
= 6.22 billion
Answer:
The projected world population in 1998 is 6,216,871,541.95
Step-by-step explanation:
Here we have the formula for exponential growth given by
A = P(1 + r)^t
Where:
A = Population at the end of the time period
P = Population at the start of the time period
r = Rate percent of population growth
t = Time period of interest
Therefore, given r = 2% = 2/100 = 0.02, P = 5,000,000,000;
t = year 1998 - year 1987 = 11 years
We have
A = 5,000,000,000 ×[tex](1+0.02)^{11}[/tex]= 6,216,871,541.95
≈ 6.2 billion.
