The population in the year 2020 is 4628
<h3>How to determine the population?</h3>
The given parameters are:
Initial, a = 12910
Rate, r = 5%
Since the population decreases, then we make use of an exponential decay function.
This is represented as:
f(n) = a * (1 - r)^n
So, we have:
f(n) = 12910 * (1 - 5%)^n
Evaluate the difference
f(n) = 12910 * 0.95^n
2020 is 20 years from 2000.
So, we have:
f(20) = 12910 * 0.95^20
Evaluate
f(20) = 4628
Hence, the population in the year 2020 is 4628
Read more about exponential functions at:
brainly.com/question/14355665
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Since all the variables cancel out and the coefficient equal to eachother, this system of equation has
<u>infinitely many solutions!</u>
Answer:
243 and 2 over 5
Multiply
(−243) and 2 over 5 . −486 over 5.
Move the negative in front of the fraction.
−486 over 5
Exact Form:
-486 over 5
Decimal Form:
-97.2
Mixed Number Form:
-97 and 1 over 5
Answer:
Uh where are the other expressions?
Step-by-step explanation:
590. Since 2 is under 5 you round it down
