SOLUTION: The population N(t) (in millions) of a country t years after 1980 may be approximated by the formula N(t) = 213e^(0.0101t).
When will the population be twice what it was in 198
Algebra.Com
Question 1148042: The population N(t) (in millions) of a country t years after 1980 may be approximated by the formula N(t) = 213e^(0.0101t).
When will the population be twice what it was in 1980? (Round your answer to one decimal place.)
Answer by josgarithmetic(39625) (Show Source): You can put this solution on YOUR website!
Use a calculator and do the rounding.
Add to 1980.
RELATED QUESTIONS
The population
N(t) (in millions)
of a country t years after 1980 may be approximated (answered by jim_thompson5910)
The population
N(t) (in millions)
of a country t years after 1980 may be approximated (answered by josgarithmetic)
The population N(t) (in millions) of India t years after 1985 may be approximated by the... (answered by jim_thompson5910)
Please help me. The answer I received was 38.
The population N(t) (in millions) of India (answered by jim_thompson5910,KMST)
A certain country's population P(t), in millions, t years after 1980 can be approximated... (answered by drk)
A certain country's population P(t), in millions, t years after 1980 can be approximated... (answered by Fombitz)
A certain country's population P(t), in millions, t years after 1980 can be approximated... (answered by nerdybill)
The exponential model A=993.9e^0.006 t describes the population A, of a country in... (answered by stanbon)
The exponential model describes the population, A, of a country in millions, t... (answered by greenestamps)