The Bounce Test Maybe you know the bounce test in which you push downwards, for a short time, on the body of a car and then see how the body reacts to this push. Figure 1: Bounce Test http://www.chamsocotokiengiang.com/tin-tuc/chi-tiet/cac-buoc-kiem-tra-va-phat-hien-loi-he-thong-treo-tren-xe-o-to/134 Bounce test: https://www.youtube.com/watch?v=Lo_5ibeSQDc https://www.youtube.com/watch?v=J86hrRi7jmQ https://www.youtube.com/watch?v=BPI9beSabdI The suspension has to be in good condition to assure good driving behaviour Some worn shock absorbers: https://www.youtube.com/watch?v=W8dComhoRhs https://www.youtube.com/watch?v=Q5r64v4Yr2M https://www.youtube.com/watch?v=5NHTLEGOgU4 Let’s analyse what is going on when this type of test is performed When you push down, you apply a force on the mass of the car. The spring (with a certain spring constant “k”) will be compressed by this force and reacts with a counter force. Also the damper (with a certain damper constant “c”) will react with a counter force because of the velocity of the body. The best way to analyse such a physical system is to make a model of it, using mathematical equations. First we have to establish the equation of motion for this system. In general we can say that the sum of all forces is equal to zero. ๏ฟฝ ๐น๐นโ = 0 We use Newton’s second law of motion for describing the position of the mass. ๐น๐นโ = ๐๐ ∗ ๐๐โ ๐๐ is a scalar quantity and ๐น๐นโ & ๐๐โ are vector quantity’s, meaning having a direction. Let’s analyse what is going on by using a simplified schematic drawing as shown in Figure 2. Because we only look at one suspension system, “m” is โ โ of the mass of the car with unit [kg]. “k” is the spring constant with unit [N/m] and “c” is the damper constant with unit [N/(m/s)] or [Ns/m] We assume that the wheel and tire is a stiff object and for simplicity we say that gravity plays no role. Further we assume that the force F(t) is positive in the upwards direction and negative in the downwards direction. Also the position x(t) is positive when its above x0 and negative when its below x0. Figure 2: Mass-Spring-Damper System https://commons.wikimedia.org/wiki/File:Mass_spring_damper.svg The equation of motion for this system will be: ๐น๐น(๐ก๐ก) − ๐น๐น๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ − ๐น๐น๐๐๐๐๐๐๐๐๐๐๐๐ = ๐๐ ∗ ๐๐ ๐น๐น(๐ก๐ก) − ๐๐ ∗ ๐ฅ๐ฅ − ๐๐ ∗ ๐ฅ๐ฅฬ = ๐๐ ∗ ๐ฅ๐ฅฬ → → Now we can calculate the acceleration: ๐น๐น(๐ก๐ก) − ๐๐ ∗ ๐ฅ๐ฅ − ๐๐ ∗ ๐ฃ๐ฃ = ๐๐ ∗ ๐๐ ๐น๐น(๐ก๐ก) − ๐๐ ∗ ๐ฅ๐ฅ − ๐๐ ∗ ๐๐ 2 ๐ฅ๐ฅ ๐๐๐ก๐ก 2 ๐๐๐๐ ๐๐2 ๐ฅ๐ฅ = ๐๐ ∗ 2 ๐๐๐๐ ๐๐๐ก๐ก = ๏ฟฝ๐น๐น(๐ก๐ก) − ๐๐ ∗ ๐ฅ๐ฅ − ๐๐ ∗ ๐๐๐๐ 1 ๏ฟฝ∗ ๐๐๐๐ ๐๐ This equation will be used for modelling in Matlab/Simulink with basic blocks. ๐๐(๐ ๐ ) To retrieve the transfer function ๐ป๐ป(๐ ๐ ) = ๐น๐น(๐ ๐ ) we have to reorder the equation ๐น๐น(๐ก๐ก) − ๐๐ ∗ ๐ฅ๐ฅ − ๐๐ ∗ ๐๐๐๐ ๐๐2 ๐ฅ๐ฅ = ๐๐ ∗ 2 ๐๐๐๐ ๐๐๐ก๐ก → ๐น๐น(๐ก๐ก) = ๐๐ ∗ And then perform the Laplace transform, where ๐น๐น(๐๐) = ๐๐ ๐ ๐ 2 ๐๐(๐ ๐ ) + ๐๐ ๐ ๐ ๐๐(๐ ๐ ) + ๐๐ ๐๐(๐ ๐ ) ๐๐(๐ ๐ ) → The transfer function will be: ๐ป๐ป(๐ ๐ ) = ๐น๐น(๐ ๐ ) = ๐๐ 2 ๐๐๐ก๐ก 2 ๐๐2 ๐ฅ๐ฅ ๐๐๐ฅ๐ฅ + ๐๐ ∗ + ๐๐ ∗ ๐ฅ๐ฅ 2 ๐๐๐๐ ๐๐๐ก๐ก = ๐ ๐ 2 and ๐๐ ๐๐๐๐ = ๐ ๐ . ๐น๐น(๐๐) = (๐๐ ๐ ๐ 2 + ๐๐ ๐ ๐ + ๐๐) ๐๐(๐ ๐ ) 1 ๐๐ ๐ ๐ 2 + ๐๐ ๐ ๐ + ๐๐
