The distance traveled by the blue car is represented by the graph below. Click Here for Help Video.
The distance traveled by the red car was monitored by a table. Click Here for Help Video.
Number of Hours
Miles Traveled
3
3
201
201
4
4
268
268
5
5
335
335
The speed of the blue car is
miles per hour.
The speed of the red car is
miles per hour.
Unfortunately, as a text-based AI, I can't view or click graphics or links, so I am unable to see the graph representing the blue car's distance. In order to determine the speed of the blue car, you would need to provide me with information about the distance it traveled over a certain period of time, similar to the table you've provided for the red car.
The speed of the red car, however, can be calculated using the information you've provided in the table. To find the speed of the red car, you can take two points and divide the difference in distance by the difference in time:
Using the table:
Time: 3 hours, Distance: 201 miles
Time: 4 hours, Distance: 268 miles
We can calculate the speed as:
Speed = (Distance at 4 hrs - Distance at 3 hrs) / (Time at 4 hrs - Time at 3 hrs)
Speed = (268 miles - 201 miles) / (4 hours - 3 hours)
Speed = 67 miles / 1 hour
Speed = 67 miles per hour
Therefore, the speed of the red car is 67 miles per hour.
If you provide similar data for the blue car, a calculation of its speed can also be performed.
the speed of the blue car is?
As an AI, I am not able to view image data, such as a graph, that might be present in your query. To calculate the speed of the blue car, I would need numerical data indicating the distance traveled over a certain time frame.
Please provide the distance traveled by the blue car and the corresponding time to determine the speed, or describe the key points from the graph that would allow me to assist in the calculation.
For example, if you could provide similar information as given for the red car, like:
- The blue car traveled X miles in Y hours, and Z miles in W hours.
With this information, I could calculate the average speed of the blue car over that period by taking the difference in distance and dividing it by the difference in time:
Speed = (Distance at W hours - Distance at Y hours) / (Time at W hours - Time at Y hours)
Once I have the appropriate data, I can help you compute the blue car's speed.
The distance traveled by the blue car is represented by
�
=
26
�
y=26x .
The distance traveled by the red car was monitored by a table. Click Here for Help Video.
Number of Hours
Miles Traveled
6
6
126
126
7
7
147
147
8
8
168
168
The speed of the blue car is
miles per hour.
The speed of the red car is
miles per hour.
Given the equation y = 26x for the blue car, this indicates the car travels at a constant rate. The "y" represents the distance traveled in miles, and "x" represents the time in hours. The coefficient "26" is the rate of speed in miles per hour (mph). Therefore, the speed of the blue car is 26 mph.
For the red car, you have provided a table with distances traveled at various hour marks:
- At 6 hours, the red car has traveled 126 miles.
- At 7 hours, the red car has traveled 147 miles.
- At 8 hours, the red car has traveled 168 miles.
The red car travels 21 miles every hour (from 126 to 147, and 147 to 168, it increases by 21 each time). This is calculated by taking the distance at a later time and subtracting the distance at an earlier time, then dividing by the time difference:
Speed of red car between 6 and 7 hours:
Speed = (Distance at 7 hours - Distance at 6 hours) / (Time at 7 hours - Time at 6 hours)
Speed = (147 miles - 126 miles) / (7 hours - 6 hours)
Speed = 21 miles / 1 hour
Speed = 21 mph
To confirm this is a constant speed, we can check the speed between 7 and 8 hours as well:
Speed of red car between 7 and 8 hours:
Speed = (Distance at 8 hours - Distance at 7 hours) / (Time at 8 hours - Time at 7 hours)
Speed = (168 miles - 147 miles) / (8 hours - 7 hours)
Speed = 21 miles / 1 hour
Speed = 21 mph
Since both calculations return the same speed, the red car also travels at a constant speed of 21 mph.
In summary:
- The speed of the blue car is 26 mph.
- The speed of the red car is 21 mph.
The distance traveled by the blue car is represented by the graph below. Click Here for Help Video.
The distance traveled by the red car was monitored by a table. Click Here for Help Video.
Number of Hours
Miles Traveled
3
3
162
162
4
4
216
216
5
5
270
270
The speed of the blue car is
miles per hour.
The speed of the red car is
miles per hour.
We are once again presented with a scenario where the speed of the blue car cannot be calculated directly due to the lack of provided data. Since I can't view images or click on links to help videos, I need the numerical data or equation that represents the blue car's distance traveled over time to calculate its speed.
However, we do have enough information to calculate the speed of the red car based on the data in the table you provided:
Number of Hours | Miles Traveled
3 | 162
4 | 216
5 | 270
We can calculate the red car's speed by finding how much distance it covers in one hour. We can use any of the hourly intervals but let's use the interval between 3 and 4 hours to determine the speed:
Speed of red car = (Distance at 4 hours - Distance at 3 hours) / (Time at 4 hours - Time at 3 hours)
Speed of red car = (216 miles - 162 miles) / (4 hours - 3 hours)
Speed of red car = 54 miles / 1 hour
Speed of red car = 54 miles per hour (mph)
To ensure consistency, let's check the interval between 4 and 5 hours:
Speed of red car = (Distance at 5 hours - Distance at 4 hours) / (Time at 5 hours - Time at 4 hours)
Speed of red car = (270 miles - 216 miles) / (5 hours - 4 hours)
Speed of red car = 54 miles / 1 hour
Speed of red car = 54 mph
The calculations for both intervals give us the same speed, so we can conclude the red car's speed is consistent at 54 mph.
If you provide an equation or key data points from the graph for the blue car, I would be able to calculate its speed as well. Otherwise, the speed of the blue car remains unknown with the information currently available.