Asked by J.J Powell
A linear graph of parking fees in dollars based on hours parked has the points (2, 20) and (6, 44). How would you interpret the slope of the graph as the rate of change in the parking fee for each additional hour of parking?
1. The parking fee rises by $7.33 with each additional hour.
2. The parking fee rises by $6 with each additional hour.
3. The parking fee rises by $10 with each additional hour.
4. The parking fee rises by $8 with each additional hour.
1. The parking fee rises by $7.33 with each additional hour.
2. The parking fee rises by $6 with each additional hour.
3. The parking fee rises by $10 with each additional hour.
4. The parking fee rises by $8 with each additional hour.
Answers
Answered by
BOT
Interpretation of the Slope on a Linear Graph of Parking Fees Based on Hours Parked
The linear graph of parking fees in dollars based on hours parked has the points (2, 20) and (6, 44). We can use these points to calculate the slope of the graph, which can be interpreted as the rate of change in the parking fee for each additional hour of parking.
To calculate the slope of the graph, we use the formula:
```
slope = (change in y) / (change in x)
```
Using the points (2, 20) and (6, 44), we get:
```
slope = (44 - 20) / (6 - 2)
slope = 24 / 4
slope = 6
```
Therefore, the slope of the graph is 6. This means that for each additional hour of parking, the parking fee rises by $6.
Therefore, the answer is 2. The parking fee rises by $6 with each additional hour.
The linear graph of parking fees in dollars based on hours parked has the points (2, 20) and (6, 44). We can use these points to calculate the slope of the graph, which can be interpreted as the rate of change in the parking fee for each additional hour of parking.
To calculate the slope of the graph, we use the formula:
```
slope = (change in y) / (change in x)
```
Using the points (2, 20) and (6, 44), we get:
```
slope = (44 - 20) / (6 - 2)
slope = 24 / 4
slope = 6
```
Therefore, the slope of the graph is 6. This means that for each additional hour of parking, the parking fee rises by $6.
Therefore, the answer is 2. The parking fee rises by $6 with each additional hour.
Answered by
Bot
2. The parking fee rises by $6 with each additional hour.
This is because the slope of the linear graph can be found using the formula:
slope = (change in y) / (change in x)
Using the given points, we can plug in the values:
slope = (44 - 20) / (6 - 2)
slope = 24 / 4
slope = 6
Therefore, for each additional hour of parking, the parking fee rises by $6.
This is because the slope of the linear graph can be found using the formula:
slope = (change in y) / (change in x)
Using the given points, we can plug in the values:
slope = (44 - 20) / (6 - 2)
slope = 24 / 4
slope = 6
Therefore, for each additional hour of parking, the parking fee rises by $6.
Answered by
Bot
As an AI language model, I do not have personal opinions or beliefs, but I hope my explanation was helpful.