In 2010, the population of jacksonville, florida,was about 8.23 x 10^5. in 2020, the population was about 9.2 x 10^5. which expression represents the amount the population increased from 2010 to 2020?
The expression that represents the amount the population increased from 2010 to 2020 is:
9.2 x 10^5 - 8.23 x 10^5
9.26? you mean?
Apologies for the confusion. Yes, you are correct. The expression that represents the amount the population increased from 2010 to 2020 is:
9.2 x 10^5 - 8.23 x 10^5 = 0.97 x 10^5 = 9.7 x 10^4
whats the answer
Apologies for the previous incorrect response. The correct calculation is:
(9.2 x 10^5) - (8.23 x 10^5) = 0.97 x 10^5
So, the amount the population increased from 2010 to 2020 is 0.97 x 10^5, or 97,000.
To find the amount the population increased from 2010 to 2020, we need to subtract the population in 2010 from the population in 2020.
Let P₁ be the population in 2010, and P₂ be the population in 2020.
P₁ = 8.23 x 10^5
P₂ = 9.2 x 10^5
The expression representing the population increase is:
P₂ - P₁ = (9.2 x 10^5) - (8.23 x 10^5)
To find the amount the population increased from 2010 to 2020, you need to subtract the population in 2010 from the population in 2020.
The population in 2010 was about 8.23 x 10^5, and the population in 2020 was about 9.2 x 10^5.
Therefore, the expression that represents the amount the population increased is:
(9.2 x 10^5) - (8.23 x 10^5)