ics (4242 COZ1)
5.3 Homework
Use proportions to solve the following problem.
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Question 15, 6.3.43
Part 1 of 2
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The water rate for a city in North Carolina is [tex]$1.33 per 749 gallons of water used.
a) What is the water bill if a resident of that city uses 40,000 gallons?
b) How many gallons of water can a customer use if the water bill is not to exceed $[/tex]130?
a) The water bill for using 40,000 gallons of water is
(Type an integer or a decimal. Round to the nearest cent as needed.)



Answer :

Let's break down the problem step by step.

### Part (a):
Question: What is the water bill if a resident of that city uses 40,000 gallons?

1. We know the rate is [tex]$1.33 for 749 gallons. 2. To find out how much it costs for 40,000 gallons, we use a proportion. Let’s set up our proportion: \[ \frac{\text{Cost}}{749 \text{ gallons}} = \frac{X}{40000 \text{ gallons}} \] 3. Rearrange to solve for \(X\): \[ X = \frac{40000 \text{ gallons}}{749 \text{ gallons}} \times 1.33 \text{ dollars} \] 4. Perform the multiplication and division steps: \[ X = \frac{40000}{749} \times 1.33 \] This calculation gives us the water bill: \[ X \approx 71.03 \] So, the water bill for using 40,000 gallons of water is approximately $[/tex]71.03.

### Part (b):
Question: How many gallons of water can a customer use if the water bill is not to exceed [tex]$130? 1. Again, we use the rate $[/tex]1.33 for 749 gallons.
2. We need to find the maximum gallons [tex]\(G\)[/tex] such that the cost does not exceed [tex]$130. Set up the proportion: \[ \frac{1.33 \text{ dollars}}{749 \text{ gallons}} = \frac{130 \text{ dollars}}{G \text{ gallons}} \] 3. Rearrange to solve for \(G\): \[ G = \frac{130 \text{ dollars}}{1.33 \text{ dollars}} \times 749 \text{ gallons} \] 4. Perform the division and multiplication steps: \[ G \approx \frac{130}{1.33} \times 749 \] This calculation gives: \[ G \approx 73211 \] So, a customer can use a maximum of approximately 73,211 gallons of water without exceeding a bill of $[/tex]130.