SOLUTION: A country's population (in millions) t years after the year 2000 is given by: P(t)= 6*2^x/50. Find the country's population in 1900.
* x/50 is the exponent and 2 is the base***
Algebra.Com
Question 1022135: A country's population (in millions) t years after the year 2000 is given by: P(t)= 6*2^x/50. Find the country's population in 1900.
* x/50 is the exponent and 2 is the base***
Answer by josgarithmetic(39620) (Show Source): You can put this solution on YOUR website!
Like this: but decide if you want t or x; you will have either or .
Year 1900 is 100 years LESS than year 2000, so let your independent variable be . Evaluate P.
RELATED QUESTIONS
Solve the problem.
In 1998, the population of a given country was 37 million, and the... (answered by stanbon)
The population (in millions) of a certain country t years after 1900 is given by the... (answered by josmiceli)
suppose P(t), the population in millions of a country in a year t, is defined by the... (answered by stanbon)
The population of a country is about 1.24 billion people. Assume that the population of... (answered by josgarithmetic)
Directions: The exponential models describe the population of the indicated country, A,... (answered by Theo)
The exponential model describes the population, A, of a country in millions, t... (answered by greenestamps)
PLEASE HELP!In 1998, the population of Country C was 26 million, and the exponential... (answered by nerdybill)
Directions: The exponential models describe the population of the indicated country, A,... (answered by Theo)
A. In 2000, the population of a country was approximately 5.85 million and by 2015 it is... (answered by josgarithmetic)