Answer:
(a) As time increases, the amount of water in the pool increases.
11 gallons per minute
(b) 65 gallons
Step-by-step explanation:
From inspection of the table, we can see that as time increases, the amount of water in the pool increases.
We are told that Ann adds water at a constant rate. Therefore, this can be modeled as a linear function.
The rate at which the water is increasing is the rate of change (which is also the slope of a linear function).
Choose 2 ordered pairs from the table:
[tex]\textsf{let}\:(x_1,y_1)=(8, 153)[/tex]
[tex]\textsf{let}\:(x_2,y_2)=(12,197)[/tex]
Input these into the slope formula:
[tex]\textsf{slope}\:(m)=\dfrac{y_2-y_1}{x_2-x_1}=\dfrac{197-153}{12-8}=\dfrac{44}{4}=11[/tex]
Therefore, the rate at which the water in the pool is increasing is:
11 gallons per minute
To find the amount of water that was already in the pool when Ann started adding water, we need to create a linear equation using the found slope and one of the ordered pairs with the point-slope formula:
[tex]y-y_1=m(x-x_1)[/tex]
[tex]\implies y-153=11(x-8)[/tex]
[tex]\implies y-153=11x-88[/tex]
[tex]\implies y=11x-88+153[/tex]
[tex]\implies y=11x+65[/tex]
When Ann had added no water, x = 0. Therefore,
[tex]y=11(0)+65[/tex]
[tex]y=65[/tex]
So there was 65 gallons of water in the pool before Ann starting adding water.
