Jersey Tom, Giblet, et al-
Interesting discussion about braking stability. Here is a Ben Bolby quote on the car in question:
"What we discovered," Bowlby explains, "was that if we had the weight more rearwards in a straightline competition we can out-accelerate the current car because more of our weight is on the two rear tires that are powered and that gives us greater acceleration capabilities. Under braking we discovered that we had created a unique condition--in racing car terms--where more than fifty percent of the braking came from behind the center of gravity. Normally, more than fifty percent of the braking comes from in front of the center of gravity and that is an unstable condition where you have to be terribly careful not to lock the rear brakes."
http://gordonkirby.com/categories/colum ... no222.html
I think there is some logic to what he says.
Imagine a car with 70% rear static weight and freely rotating casters (yes, shopping cart casters) for the front wheels. The front wheels provide no lateral influence. If the brake bias is 100% rear then this car will be stable during braking because the C.G. inertia will pull the car straight anytime there is a slight disturbance that would start to rotate the car in yaw. This continues to be true even if the rear brakes are locked.
Now lets keep the 70% static rear weight but put normal front tires on and assume the driver holds the steering straight during braking (or at least can't correct fast enough to matter). Now the front end has the potential to generate lateral force. If the brake bias is still 100% rear and we lock the rears then the car will have the same previous natural stability under braking but the front wheels will now have a lot of potential to rotate the car in yaw if they start to get even a little sideways. Bowlby's natural stability is now fighting against the instability from the front lateral capacity. Not sure which is stronger, it would depend on the front tire lateral gain at low slip angles and various car geometry, etc. It's entirely plausible that the natural stability wins.
Here's where I don't understand. The Bowlby car will in fact have brake bias that is very rearward, but it also has a very rearward C.G. If the front and rear tires have grip capacity that is roughly proportional to the static weight distribution then under braking the optimum brake bias will always be in front of the C.G. due to forward load transfer. Let's assume Bowlby's car has 70% static rear weight and 60% rear brake bias. Therefore, according to my understanding, the Bowlby natural stability is gone because the brake bias is forward of the C.G. In contrast to my understanding, Bowlby implies that the natural stability is still there because the rear bias is greater than 50%.
I could ramble on but I'll stop here and request feedback.
