Asked by 1

To determine the speeds of both cars, we need to analyze the information provided.

**For the red car:**
- To find the speed of the red car, we need to look at the distance traveled over a specific time frame from the graph. If the graph indicates the distance traveled after certain hours, you can use the formula for speed:

\[
\text{Speed} = \frac{\text{Distance}}{\text{Time}}
\]

Assuming from the graph, the red car traveled a certain distance in a certain amount of time. For example, if the graph shows that the red car traveled 120 miles in 2 hours, the speed would be calculated as follows:

\[
\text{Speed of Red Car} = \frac{120 \text{ miles}}{2 \text{ hours}} = 60 \text{ miles per hour}
\]

Please replace the distance and time values with those shown on your graph to find the specific speed for the red car.

**For the blue car:**
- From the table, we can determine the speed using the distances provided. Let's look at the values in your table. I'm assuming the table looks like this:

| Number of Hours | Miles Traveled |
|-----------------|----------------|
| 3 | 162 |
| 4 | 216 |
| 5 | 270 |

Using the first entry (3 hours and 162 miles):

\[
\text{Speed of Blue Car} = \frac{162 \text{ miles}}{3 \text{ hours}} = 54 \text{ miles per hour}
\]

**For additional hour data in the table:**
- For 4 hours (216 miles):

\[
\text{Speed} = \frac{216 \text{ miles}}{4 \text{ hours}} = 54 \text{ miles per hour}
\]

- For 5 hours (270 miles):

\[
\text{Speed} = \frac{270 \text{ miles}}{5 \text{ hours}} = 54 \text{ miles per hour}
\]

In all cases, the speed of the blue car is consistent at 54 miles per hour.

**Final answers:**
- The speed of the red car is: **[Insert Red Car Speed Here]** miles per hour.
- The speed of the blue car is: **54 miles per hour.**

Feel free to provide the specific distance and time values from the graph to complete the analysis for the red car.