Optimizing Race Kinematics: Solving for the Fastest Time

AI Thread Summary
The discussion revolves around calculating the optimal time to complete a 1 km race with specific acceleration and deceleration parameters for a car. The car accelerates at 8 m/s² and decelerates at 5 m/s², requiring the use of kinematic equations to determine the distances covered during acceleration and deceleration. Participants emphasize the importance of breaking the problem into two segments: acceleration to a maximum speed and then deceleration to a stop. It is concluded that completing the race in 9 seconds is impossible, as calculations suggest a minimum time of around 16 seconds due to the required braking distance. The conversation highlights the challenge of managing multiple variables while solving the equations.
student1ds
Messages
5
Reaction score
0
Hi, I am unable to figure this question. Could someone help please ? A new type of race has been proposed. The object of the race is to complete the course and stop on the finish line in the minimum amount of time. The race is exactly 1 km long. The car can accelerate at 8m/s^2 and decelerate at 5m/s^2 when the brakes are applied. What is the best possible time to complete the race?
 
Physics news on Phys.org


I tried using the kinematics equations but the deceleration bit is throwing me off each time.
 


hello person from Corsini's class.

... I don't get the question either. u__u;
 


Yes, its all in the kinematic equations and the fact that the car accelerates at 8 m/s/s over a distance d1, then decelerates over a distance d2 at 5 m/s/s, where d1 + d2 =1000 m. Hint: the car accelerates from 0 to some maximum speed, then decelerates from that same max speed to 0 at the finish line.
 


I think I got an answer but to me it doesn't make sense. Is it possible to complete a 1 km race in 9 seconds ?
 


PhanthomJay said:
Yes, its all in the kinematic equations and the fact that the car accelerates at 8 m/s/s over a distance d1, then decelerates over a distance d2 at 5 m/s/s, where d1 + d2 =1000 m. Hint: the car accelerates from 0 to some maximum speed, then decelerates from that same max speed to 0 at the finish line.

I think I'm on the right track... but I always seem to end up with more variables than equations. :/
 


student1ds said:
I think I got an answer but to me it doesn't make sense. Is it possible to complete a 1 km race in 9 seconds ?
Not at an acceleration of 8m/s/s. Even if the car were to cross the finish line without applying the brakes before then, the time would be determined from d=1/2(a)(t)^2, solve t = almost 16 seconds...so since the car is braking well before the finish line in order to stop and have no velocity at the finish line, the total time must be greater than 16 seconds.
 


qswdefrg said:
I think I'm on the right track... but I always seem to end up with more variables than equations. :/
One equation is d1 +d2 =1000; you'll then need a couple of the kinematic equations for each portion of the trip (d1 and d2, respectively), to solve for the time of each portion.
 

Similar threads

B Death Rally: an intricate probability problem?
Replies
8
Views
2K
Drag Racing Acceleration Question
Replies
10
Views
5K
Optimizing Rally Race Time with Maximum Acceleration and Deceleration
Replies
1
Views
1K
How Do You Calculate Race Car Acceleration and Power Output?
Replies
20
Views
2K
Race Car Scenario: Who will win?
Replies
11
Views
5K
Am I setting up this kinematic equation properly?
Replies
3
Views
1K
Who Wins the Drag Race Based on Constant Acceleration?
Replies
5
Views
2K
V0 = 0 m/s Vf = ?? m/s A = ?? m/s2 Solve Acceleration Problem: 1600m in 5min
Replies
1
Views
1K
Motion in One Dimension: The Tortoise and The Hare Race
Replies
10
Views
7K
Minimum deceleration to prevent a collision
Replies
33
Views
4K

Hot Threads

Recent Insights

Back
Top