SOLUTION: Following the function P(t)=1+ke^0.08t where k is a constant and t is the time in years. If the current population is 37,000 in how many years is the population expected to be 92,
Algebra.Com
Question 1010020: Following the function P(t)=1+ke^0.08t where k is a constant and t is the time in years. If the current population is 37,000 in how many years is the population expected to be 92,500?
Answer by MathLover1(20849) (Show Source): You can put this solution on YOUR website!
is a constant and is the time in years.
find:
........take a natural log of both sides
-----
->= years
RELATED QUESTIONS
The population of a particular city is increasing at a rate proportional to its size. It... (answered by nyc_function)
The population of a particular city is increasing at a rate proportional to its size. It... (answered by drk,stanbon)
The population of a particular city is increasing at a rate proportional to its size. It... (answered by jsmallt9)
Animal populations are not capable of unrestricted growth because of limited habitat and... (answered by Theo)
The population of a particular city is increasing at a rate proportional to its size. It... (answered by greenestamps,math_tutor2020)
Solve the problem.
When interest is compounded continuously, the balance in an account (answered by KMST)
The population P of a city grows exponentially according to the function
P(t) =... (answered by MathLover1)
Please Help!!!
The population P of fish, in thousands, in a certain pond at time t years (answered by KMST)
The population of a city is given by P=5000e^kt where t is time in years, with t=0... (answered by stanbon)