The population of deer is represented by the function A(t)=201(1.14)^t, where t is the given in years. To the nearest whole number, what will the herd population be after 9 years? To the nearest whole number?
To find the population of deer after 9 years, we need to substitute t=9 into the function A(t)=201(1.14)^t and evaluate it:
A(9) = 201(1.14)^9 ≈ 201(2.98) ≈ 600
Therefore, the herd population will be approximately 600 deer after 9 years, rounded to the nearest whole number.
To find the population of the deer after 9 years, we need to substitute t = 9 into the function A(t) = 201(1.14)^t and round the answer to the nearest whole number.
A(t) = 201(1.14)^t
A(9) = 201(1.14)^9
Calculating this:
A(9) ≈ 201(1.14)^9
A(9) ≈ 201(2.01602)
Rounding to the nearest whole number:
A(9) ≈ 404
Therefore, the herd population will be approximately 404 after 9 years.