Answer: Hello there!
We knot that the model is of the form A(t) = A*e^(kt)
We also know that in 2004 the population was 6.3 billion and that in the next 100 years the population needs to be less than 25 billion. We want to find the maximum acceptable annual rate of growth.
Let's define t = 0 at 2004, this means that
A(0) = 6.3 billions = A*e^(k*0) = A
then A = 6.3 billions
and for finding the maximum k, we need to do the next step:
A(100) = 25 billion = (6.3 billion)*e^(k*100)
now we need to solve it for k:
25 billion = (6.3 billion)*e^(k*100)
25 = 6.3*e^(k*100)
e^(k*100) = 25/6.3
now we can aply the natural logaritm in both sides:
k*100 = ln(25/6.3)
k = ln(25/6.3)/100 = 0.014
So we know that if he population must stay below 25 billion during the next 100 years, then we need to use k < 0.014
Answer:
I would say that C is the correct answer.
Hope this helps!
I believe the answer would be False.
Hope that helps! :)
Answer:
To prepare the audience for the end of the speech, present any final appeals, summarize your main idea of your text and close it, end with a clincher.
Explanation:
im sorry but what do you mean by lines?