Part 11: Braking

physicist and member of

No Bucks Racing Club

P.O. Box 662

Burbank, CA 91503

©Copyright 1991

I was recently helping to crew Mark Thornton's effort at the Silver State Grand Prix in Nevada. Mark had built a beautiful car with a theoretical top speed of over 200 miles per hour for the 92 mile time trial from Lund to Hiko. Mark had no experience driving at these speeds and asked me as a physicist if I could predict what braking at 200 mph would be like. This month I report on the back-of-the-envelope calculations on braking I did there in the field.

There are a couple of ways of looking at this problem. Brakes work by
converting the energy of motion, kinetic energy, into the energy of heat in the
brakes. Converting energy from useful forms (motion, electrical, chemical, *etc.*)
to heat is generally called dissipating the energy, because there is no easy way
to get it back from heat. If we assume that brakes dissipate energy at a
constant rate, then we can immediately conclude that it takes four times as much
time to stop from 200 mph as from 100 mph. The reason is that kinetic energy
goes up as the square of the speed. Going at twice the speed means you have four
times the kinetic energy because 4 = 2^{2}. The exact formula
for kinetic energy is *½mv ^{2}*, where

That's pretty simple, but is it right? Do brakes dissipate energy at a constant rate? My guess as a physicist is "probably not." The efficiency of the braking process, dissipation, will depend on details of the friction interaction between the brake pads and disks. That interaction is likely to vary with temperature. Most brake pads are formulated to grip harder when hot, but only up to a point. Brake fade occurs when the pads and rotors are overheated. If you continue braking, heating the system even more, the brake fluid will eventually boil and there will be no braking at all. Brake fluid has the function of transmitting the pressure of your foot on the pedal to the brake pads by hydrostatics. If the fluid boils, then the pressure of your foot on the pedal goes into crushing little bubbles of gaseous brake fluid in the brake lines rather than into crushing the pads against the disks. Hence, no brakes.

We now arrive at the second way of looking at this problem. Let us assume that we have good brakes, so that the braking process is limited not by the interaction between the pads and disks but by the interaction between the tyres and the ground. In other words, let us assume that our brakes are better than our tyres. To keep things simple and back-of-the-envelope, assume that our tyres will give us a constant deceleration of

The time *t* required for braking from speed *v* can
be calculated from: *t* = *v* / *a*
which simply follows from the definition of constant acceleration. Given the
time for braking, we can calculate the distance *x*, again from the
definitions of acceleration and velocity:

Remembering to be careful about converting miles per hour to feet per second, we arrive at the numbers in Table 1.

Starting Speed (mph) | Starting Speed (fps) | Time to brake (sec) | Distance to brake (feet) | Distance to brake (yards) |
---|---|---|---|---|

30 | 44 | 1.37 | 30.16 | 10.05 |

60 | 88 | 2.74 | 120.62 | 40.21 |

90 | 132 | 4.11 | 271.40 | 90.47 |

120 | 176 | 5.48 | 482.49 | 160.83 |

150 | 220 | 6.85 | 753.89 | 251.30 |

180 | 264 | 8.22 | 1085.61 | 361.87 |

210 | 308 | 9.60 | 1477.63 | 492.54 |

Table 1: Times and Distances for barking to zero from various speeds

We can immediately see from this table (and, indeed, from the formulas) that
it is the *distance*, not the time, that varies as the square of the
starting speed *v*. The braking time only goes up linearly with
speed, that is, in simple proportion.

The numbers in the table are in the ballpark of the braking figures one reads in published tests of high performance cars, so I am inclined to believe that the second way of looking at the problem is the right way. In other words, the assumption that the brakes are better than the tyres, so long as they are not overheated, is probably right, and the assumption that brakes dissipate energy at a constant rate is probably wrong because it leads to the conclusion that braking takes more time than it actually does.

My final advice to Mark was to leave *lots of room*. You can see from
the table that stopping from 210 mph takes well over a quarter mile of very
hard, precise, threshold braking at 1*g*!