(4, y) y= 100
(x, 10) x= 0
y=25x fill in the missing x-value and y-value.
(4, y) y=
(x, 10) x
7 answers
(x, 10) x=
(x, 10) x= any real number.
The distance traveled by the blue car is represented by
�
=
74
�
y=74x .
The distance traveled by the red car was monitored by a table. Click Here for Help Video.
Number of Hours
Miles Traveled
6
6
456
456
7
7
532
532
8
8
608
608
The speed of the blue car is
miles per hour.
The speed of the red car is
miles per hour.
The
car is faster.
�
=
74
�
y=74x .
The distance traveled by the red car was monitored by a table. Click Here for Help Video.
Number of Hours
Miles Traveled
6
6
456
456
7
7
532
532
8
8
608
608
The speed of the blue car is
miles per hour.
The speed of the red car is
miles per hour.
The
car is faster.
To find the speed of the blue car, we need to divide the distance traveled by the time taken. From the information given, we assume the time taken for the blue car to travel 74 miles is 1 hour.
Therefore, the speed of the blue car is 74 miles per hour.
To find the speed of the red car, we can observe the table and calculate the distances traveled in 1 hour for each time interval.
For the red car:
- At 6 hours, it traveled 456 miles.
- At 7 hours, it traveled 532 miles.
- At 8 hours, it traveled 608 miles.
To find the speed, we need the change in distance traveled divided by the change in time taken.
For the change in distance:
- Between 6 and 7 hours: 532 - 456 = 76 miles.
- Between 7 and 8 hours: 608 - 532 = 76 miles.
For the change in time: 1 hour.
Therefore, the speed of the red car is 76 miles per hour.
Comparing the speeds, we can see that the red car (76 mph) is faster than the blue car (74 mph).
Therefore, the speed of the blue car is 74 miles per hour.
To find the speed of the red car, we can observe the table and calculate the distances traveled in 1 hour for each time interval.
For the red car:
- At 6 hours, it traveled 456 miles.
- At 7 hours, it traveled 532 miles.
- At 8 hours, it traveled 608 miles.
To find the speed, we need the change in distance traveled divided by the change in time taken.
For the change in distance:
- Between 6 and 7 hours: 532 - 456 = 76 miles.
- Between 7 and 8 hours: 608 - 532 = 76 miles.
For the change in time: 1 hour.
Therefore, the speed of the red car is 76 miles per hour.
Comparing the speeds, we can see that the red car (76 mph) is faster than the blue car (74 mph).
The distance traveled by the red car is represented by the graph below. Click Here for Help Video.
The distance traveled by the blue car was monitored by a table.
Number of Hours
Miles Traveled
4
4
268
268
5
5
335
335
6
6
402
402
The speed of the red car is
miles per hour.
The speed of the blue car is
miles per hour.
The
car is faster.
The distance traveled by the blue car was monitored by a table.
Number of Hours
Miles Traveled
4
4
268
268
5
5
335
335
6
6
402
402
The speed of the red car is
miles per hour.
The speed of the blue car is
miles per hour.
The
car is faster.
To find the speed of the red car, we can observe the graph and calculate the slope, which represents the speed. The slope is calculated by dividing the change in distance by the change in time.
For the red car:
- At 4 hours, it traveled 268 miles.
- At 6 hours, it traveled 402 miles.
To find the change in distance:
- Between 4 and 6 hours: 402 - 268 = 134 miles.
To find the change in time: 6 - 4 = 2 hours.
Therefore, the speed of the red car is 134 miles / 2 hours = 67 miles per hour.
To find the speed of the blue car, we can refer to the table given.
- At 4 hours, it traveled 268 miles.
- At 5 hours, it traveled 335 miles.
To find the change in distance:
- Between 4 and 5 hours: 335 - 268 = 67 miles.
To find the change in time: 5 - 4 = 1 hour.
Therefore, the speed of the blue car is 67 miles / 1 hour = 67 miles per hour.
Both the red car and the blue car have the same speed of 67 miles per hour. Neither car is faster than the other.
For the red car:
- At 4 hours, it traveled 268 miles.
- At 6 hours, it traveled 402 miles.
To find the change in distance:
- Between 4 and 6 hours: 402 - 268 = 134 miles.
To find the change in time: 6 - 4 = 2 hours.
Therefore, the speed of the red car is 134 miles / 2 hours = 67 miles per hour.
To find the speed of the blue car, we can refer to the table given.
- At 4 hours, it traveled 268 miles.
- At 5 hours, it traveled 335 miles.
To find the change in distance:
- Between 4 and 5 hours: 335 - 268 = 67 miles.
To find the change in time: 5 - 4 = 1 hour.
Therefore, the speed of the blue car is 67 miles / 1 hour = 67 miles per hour.
Both the red car and the blue car have the same speed of 67 miles per hour. Neither car is faster than the other.
0 answers