Asked by Help
Two equations are written to express how far a car can go when driving on different roads. On Road 1, the car can go 60 miles in 2 hours. On Road 2, the car can go 90 miles in 4 hours. While an equation where is the distance in miles and a is the time in hours to represent the motion of the faster car. (1 point)
Answers
Answered by
GPT 3.5
The equation for Road 1 can be written as: distance = 60 miles / 2 hours
Simplifying, we get: distance = 30 miles/hour * a hours
Similarly, the equation for Road 2 can be written as: distance = 90 miles / 4 hours
Simplifying, we get: distance = 22.5 miles/hour * a hours
Since the car on Road 2 is faster, we can use the equation distance = 22.5 miles/hour * a hours to represent the motion of the faster car.
Simplifying, we get: distance = 30 miles/hour * a hours
Similarly, the equation for Road 2 can be written as: distance = 90 miles / 4 hours
Simplifying, we get: distance = 22.5 miles/hour * a hours
Since the car on Road 2 is faster, we can use the equation distance = 22.5 miles/hour * a hours to represent the motion of the faster car.
Answered by
GPT 3.5
The equation that represents the motion of the faster car is:
distance = 22.5 miles/hour * a hours
distance = 22.5 miles/hour * a hours
Answered by
GPT 3.5
I apologize for the confusion. Based on the given information, the faster car is the one on Road 2, which can go 90 miles in 4 hours. The correct equation to represent the motion of the faster car is:
distance = (90 miles / 4 hours) * a hours
Simplifying further, we get:
distance = 22.5 miles/hour * a hours
distance = (90 miles / 4 hours) * a hours
Simplifying further, we get:
distance = 22.5 miles/hour * a hours
Answered by
GPT 3.5
I apologize for the confusion. Let's re-evaluate the given information.
On Road 1, the car can go 60 miles in 2 hours. This implies a speed of 60 miles / 2 hours = 30 miles/hour.
On Road 2, the car can go 90 miles in 4 hours. This implies a speed of 90 miles / 4 hours = 22.5 miles/hour.
Since the faster car is on Road 1 with a speed of 30 miles/hour, the equation to represent its motion is:
distance = 30 miles/hour * a hours
On Road 1, the car can go 60 miles in 2 hours. This implies a speed of 60 miles / 2 hours = 30 miles/hour.
On Road 2, the car can go 90 miles in 4 hours. This implies a speed of 90 miles / 4 hours = 22.5 miles/hour.
Since the faster car is on Road 1 with a speed of 30 miles/hour, the equation to represent its motion is:
distance = 30 miles/hour * a hours
Answered by
GPT 3.5
Apologies for the confusion. Let's reevaluate the information given:
On Road 1, the car can go 60 miles in 2 hours. This implies a speed of 60 miles / 2 hours = 30 miles/hour.
On Road 2, the car can go 90 miles in 4 hours. This implies a speed of 90 miles / 4 hours = 22.5 miles/hour.
Since the car on Road 1 is faster, we can use the equation:
distance = 30 miles/hour * a hours
This equation represents the motion of the faster car.
On Road 1, the car can go 60 miles in 2 hours. This implies a speed of 60 miles / 2 hours = 30 miles/hour.
On Road 2, the car can go 90 miles in 4 hours. This implies a speed of 90 miles / 4 hours = 22.5 miles/hour.
Since the car on Road 1 is faster, we can use the equation:
distance = 30 miles/hour * a hours
This equation represents the motion of the faster car.
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