[To understand the material of this page, I assume the reader have a firm understanding of Newtonian Kinematics. Knowledge of rotational mechanics is also needed in this page.]
When I was little, I watched quite a lot of cartoons. I remember that there was a cartoon about fantasy car racing. The cars in the cartoon always behave like this: under hard acceleration, the front wheels get off the ground and the car leans backward; under hard braking, the rear wheels get off the ground and the car leans forward. I always wonder why the cartoon is drawn this way because I never saw any real car running like this on the road. (Well, later I see them on some drag race video tape...)
Now I am a grown-up with a car. I had all kinds of experience regarding hard acceleration and hard braking. I realize that the cartoons, while exaggerated, do have basis on the reality. When I accelerate my car fanatically, I feel like I was pulled to the back of the seat. When I brake my car desperately, if not for the constraint of the seat belt, I think I've already hit the driving wheel.
Why cars behave like this? After some research, I discovered that it is all due to magic of rotational mechanics.
The weight of a car is supported by the four wheels. Depending on the weight distribution of a car, each wheel share part of the load. From Newton's Third Law, we know that there is a reaction force acting on the tires from the ground. This is illustrated by the following picture:
When the car is at rest:
We know that:
So the load on each wheel is:
When a car accelerates, there is a force acting on the road from the driving wheel. This force is acting to where the car is going.
Now in addition to the load of the car, we also have the acceleration force. From the picture, we learn that the load on the rear wheel is acting clockwisely around the center of gravity whereas the load on the front wheel and the acceleration force is acting counter-clockwisely around the center of gravity.
The laws of physics dictate that if those rotational forces do not balance out each other, the car will rotate about its center of gravity. When we accelerate a car, we apply forces on the ground. To prevent rotation, the weights on the tires change to maintain the following equality:
By using the fact that Wf* + Wr* = mg:
This result underscores why weight distribution changes during acceleration. Doing similar math with the acceleration forces acting in the opposite direction, you can get a picture of weight transfer during braking. Okay, now it is time to use our Skyline for an example. How about running it at the peak torque in the first gear?
Skyline is a front engine four wheel drive car, so there is a weight bias on the front. Its weight distribution is 57:43. That means with a total weight of 1550kg×9.8ms-2 = 15190N, Wf is 8658.3N and Wr is 6531.7N. According to the equality: LrWr = LfWf and the wheelbase L (Lr+Lf) of the car is 2.665m, we can deduce that:
This effectively tells us Lf is the weight percentage on the rear times the wheelbase, ie 0.43×2.665 = 1.146m. The corresponding Lr is 1.519m.
As for h, we assume the center of gravity happens at 25% of the height of the car. This is somewhat reasonable as the top half of the car is mostly empty space. Given the car height is 1.36m, h is 0.34m.
Skyline attains peak torque at 4400rpm. This corresponds to running at 11.092ms-1. At this point, the engine produces 392Nm of torque that should reach the four tires for a total of 16283.38N in force. At the speed of 11.092ms-1, the air resistance is 65.5N. As a result, we can deduce the new weight distribution as:
| 1550×9.8×1.519 - 0.34×(16283.38-65.5) | ||
| Wf* | = | ------------------------------------------------------ |
| 2.665 | ||
| = | 6588.94N |
| 1550×9.8×1.146 + 0.34×(16283.38-65.5) | ||
| Wr* | = | ------------------------------------------------------ |
| 2.665 | ||
| = | 8601.06N |
From the result we can see that there are about 2000N being transferred from the front tires to the rear tires. This is quite a significant change. According to the Road Resistance page, changes in the weight distribution change the static resistance on the tires and hence affect the handling of the car.
How come the cars in cartoons lift up the front during acceleration? According to our math, this won't happen unless mgLr < h(Ff + Fr). This makes the load on the front tire goes to negative. Since the front tires are now up in the air, Ff can't be transferred to the ground and thus no longer has effect. To keep the front tires up, the engine now needs to apply a torque to the rear tires such that mgLr < hFr. If our engine continues to generate this much of torque to the rear tires, there will be net torque running in the clockwise direction that can rollover the car unless you lift off the gas pedal (you can brake as well but for cars that only has brakes for the front wheels, This is not useful.).
For our example, the condition for the initial lift off (ie the lift off that occurs when both wheels are still on the ground) is Ff+Fr > 23073.61N. Our Skyline is a four-wheel drive car. Let's assume it gives 50% of its torque to the front tires and 50% of the torque to the rear tires. So now, what should the peak torque become when it can do the initial lift-off?
| Γ(ω)Ggk | 1 | mgLr | ||||
| -------------- | − | --- | cdρAv2 | = | --------- | |
| r | 2 | h | ||||
| r(mgLr / h + 0.5cdρAv2) | ||||||
| Γ | = | -------------------------------------- | ||||
| Ggk | ||||||
| 0.3266×(1550×9.8×1.519 / 0.34 + 65.5) | ||||||
| Γ | = | ---------------------------------------------- | ||||
| 3.545×3.827 | ||||||
| Γ | = | 1635.30Nm |
For the second lift off (ie, the lift off after the front wheels no longer apply force to the ground), since only 50% of the torque goes to the rear tires, the torque needs to double, this gives us 3270.60Nm at 4400rpm. This value is way larger than the 392Nm our Skyline has. No wonder we have a hard time to see the kind of lift off depicted in cartoons.
From the first glance, it really doesn't mean much. But after you understand the concept of traction circle, then you will understand that the dynamic of weight transfer will change the shape of the traction circle and there changes the road holding capabilities of your car. So read on!
First Draft: November 18th, 2000
1.0 Published: October 30th, 2003
1.1 Updated: February 19th, 2006 (Thanks Li Xiang for pointing out an error in the lift off equation)
Yee Man Chan