Model: P=2,320(1.2)∆~£ the model is used to estimate the deer population in a region where the x is the number of years after the year2009 using the model estimate the deer population in the year2018 the model on top is the subject I'm studying online for my ged is math and I don't know nothing about it
I don't see a question.
Since 2018 is 9 years after 2009, just plug in x=9 and use your formula.
Read up on exponential growth models.
To estimate the deer population in the year 2018 using the given model, we need to substitute the value of ∆ (the number of years after 2009) with 9 (since 2018 is 9 years after 2009) in the provided equation:
P = 2,320(1.2)∆
Now, substitute ∆ with 9:
P = 2,320(1.2)9
Next, calculate the value inside the parenthesis:
(1.2)9 = 2.856
Now, substitute this value into the equation:
P = 2,320 * 2.856
Multiply the two values to find the estimated population:
P ≈ 6,621.12
Therefore, the estimated deer population in the year 2018, based on the given model, is approximately 6,621.12.
To estimate the deer population in the year 2018 using the given model, we need to substitute the value of ∆~£ into the equation. The value of x represents the number of years after 2009.
Given:
Model: P = 2,320(1.2)∆~£
x = number of years after 2009
To find the deer population in the year 2018 (9 years after 2009):
x = 9
Substitute x = 9 into the equation:
P = 2,320(1.2)^9
Now, let's calculate the estimated deer population in the year 2018 using a calculator:
P ≈ 2,320(1.2)^9
P ≈ 2,320(2.48832)
P ≈ 5,791.09
Therefore, the estimated deer population in the year 2018, according to the given model, is approximately 5,791 deer.