How quarter car modeling on MATLAB?

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Mustafa Furkan el 22 de Dic. de 2022

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Editada: KARTHIK el 15 de Nov. de 2023

I am trying to model the quarter suspension model in Inman's engineering vibration book in MATLAB, but I have not made any progress. The vehicle will move on the sinusoidal path as in the figure and the height of the road is 5 cm.

I want to plot the largest vibration amplitude of the vehicle for the speed range v=[0 200] km/h and the total vibration for r=0.3 for the time interval t=[0 20] s. The average vehicle weight will be M=1000 kg. I predict the spring stiffness to be K=140 kN/m, damping coefficient c=900 Ns/m.

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Image Analyst el 22 de Dic. de 2022

Do you have any formulas at all? The Crystal Ball Toolbox is still under development so I cannot currently see your engineering vibration book.

Mustafa Furkan el 22 de Dic. de 2022

@Image Analyst Although the values are different, if I want to solve this problem analytically, it will be a solution like the image above.

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Answer 1

Sam Chak el 23 de Dic. de 2022

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Editada: Sam Chak el 23 de Dic. de 2022

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Hi @Mustafa Furkan,

I prefer the simulation-based numerical solution over the formula-based analytical solution in the example because there is no graph provided in your image.

By Newton's 2nd law, we should get

where the disturbance force

caused by the wavy road surface is given by

.

Thus, the model can be rewritten as

,

where the road surface is given by

. I believe you can use calculus to find

.

The following is based on the info in Example 2.4.2 (provided by you).

tspan = linspace(0, 20, 20001);

x0 = [0 0]; % initial rest condition

[t, x] = ode45(@quarterCar, tspan, x0);

plot(t, x(:,1)), grid on, xlabel('Time, [seconds]'), ylabel('Deflection, [meter]')

title('Deflection experienced by the car')

% Maximum deflection experienced by the car (same as in Example 2.4.2)

dmax = max(x(:,1)) - min(x(:,1))

dmax = 0.0320

% Quarter Car suspension model

function xdot = quarterCar(t, x)

xdot = zeros(2, 1);

% Example 2.4.2

m = 1007; % mass of car

c = 2000; % damping coefficient

k = 4e4; % stiffness coefficient

h = 1; % road height in cm

v = 20; % car velocity (fixed speed)

% Original Problem

% m = 1000; % mass of car

% c = 900; % damping coefficient

% k = 140e3; % stiffness coefficient

% h = 5; % road height in cm

% v = (200/20)*t; % car velocity ramp up from 0 to 200 km/h in 20 seconds

% Standard formulas and state-space model (1st-order ODE form)

wb = 0.2909*v; % formula given in Example 2.4.2

a = (h/2)/100; % sinusoidal amplitude in m

d = k*a*sin(wb*t) + c*a*wb*cos(wb*t); % disturbance due to wavy road surface

A = [0 1; -k/m -c/m]; % state matrix

B = [0; 1/m]; % input matrix

xdot = A*x + B*d;

end

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KARTHIK el 15 de Nov. de 2023

Editada: Sam Chak el 15 de Nov. de 2023

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when i try this code, automatically more that 20 plots are genreating. because of that I am getting pop-up window, which I could not able to close. please guide.

For ref;

tspan  = linspace(0, 20, 20001);
x0     = [0 0];                     % initial rest condition
[t, x] = ode45(@quarterCar, tspan, x0);
plot(t, x(:,1)), grid on, xlabel('Time, [seconds]'), ylabel('Deflection, [meter]')
title('Deflection experienced by the car')
% Maximum deflection experienced by the car (same as in Example 2.4.2)
dmax = max(x(:,1)) - min(x(:,1))
% Quarter Car suspension model
function xdot = quarterCar(t, x)
    xdot = zeros(2, 1);	
    % Example 2.4.2
    m    = 1007;                % mass of car
    c    = 2000;                % damping coefficient
    k    = 4e4;                 % stiffness coefficient
    h    = 1;                   % road height in cm
    v    = 20;                  % car velocity (fixed speed)
    
    % Original Problem
    %     m    = 1000;                % mass of car
    %     c    = 900;                 % damping coefficient 
    %     k    = 140e3;               % stiffness coefficient 
    %     h    = 5;                   % road height in cm
    %     v    = (200/20)*t;          % car velocity ramp up from 0 to 200 km/h in 20 seconds
    
    % Standard formulas and state-space model (1st-order ODE form)
    wb   = 0.2909*v;            % formula given in Example 2.4.2
    a    = (h/2)/100;           % sinusoidal amplitude in m
    d    = k*a*sin(wb*t) + c*a*wb*cos(wb*t);    % disturbance due to wavy road surface
    A    = [0 1; -k/m -c/m];    % state matrix
    B    = [0; 1/m];            % input matrix
    xdot = A*x + B*d;
    
    %% ----- I inserted these inside the function quarterCar() -----
    r   = 0:0.01:10;
    ksi = 0.038;
    X   = 0.025*sqrt((1 + (2*ksi*r).^2)./((1 - r.^2).^2 + (2*ksi*r).^2));
    plot(r, X), grid on
    xlabel('r'), ylabel('X')
    %% -------------------------------------------------------------
end

Sam Chak el 15 de Nov. de 2023

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Hi @KARTHIK

Your code generated multiple plots because you incorrectly inserted the plotting lines into the quarterCar() function and then called the ode45() solver to perform internal integration in the quarterCar(). The following code fixes your issue. Follow the steps as guided.

%% Step 2 of 5: Call ode45 to solve quarterCar()

tspan = linspace(0, 20, 20001);

x0 = [0 0]; % initial rest condition

[t, x] = ode45(@quarterCar, tspan, x0);

%% Step 3 of 5: Plot deflection in Figure 1

figure(1)

plot(t, x(:,1)), grid on, xlabel('Time, [seconds]'), ylabel('Deflection, [meter]')

title('Deflection experienced by the car')

%% Step 4 of 5: Find the Maximum deflection experienced by the car

dmax = max(x(:,1)) - min(x(:,1))

dmax = 0.0320

%% Step 5 of 5: Plot the Frequency response in Figure 2

r = 0:0.01:10;

ksi = 0.038;

X = 0.025*sqrt((1 + (2*ksi*r).^2)./((1 - r.^2).^2 + (2*ksi*r).^2));

figure(2)

plot(r, X), grid on

xlabel('r'), ylabel('X')

title('Frequency response by the car')

%% Step 1 of 4: Write the code for the Quarter Car suspension model

function xdot = quarterCar(t, x)

xdot = zeros(2, 1);

% Example 2.4.2

m = 1007; % mass of car

c = 2000; % damping coefficient

k = 4e4; % stiffness coefficient

h = 1; % road height in cm

v = 20; % car velocity (fixed speed)

% Original Problem

% m = 1000; % mass of car

% c = 900; % damping coefficient

% k = 140e3; % stiffness coefficient

% h = 5; % road height in cm

% v = (200/20)*t; % car velocity ramp up from 0 to 200 km/h in 20 seconds

% Standard formulas and state-space model (1st-order ODE form)

wb = 0.2909*v; % formula given in Example 2.4.2

a = (h/2)/100; % sinusoidal amplitude in m

d = k*a*sin(wb*t) + c*a*wb*cos(wb*t); % disturbance due to wavy road surface

A = [0 1; -k/m -c/m]; % state matrix

B = [0; 1/m]; % input matrix

xdot = A*x + B*d;

end

KARTHIK el 15 de Nov. de 2023

Thank you @Sam Chak. Code is working fine

KARTHIK el 15 de Nov. de 2023

Editada: KARTHIK el 15 de Nov. de 2023

@Sam Chak Sir, Please guide me for this problem by ode45

I tried with above provided code, I couldnot able to feed this function.

I need to plot amplitude vs velocity

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Answer 2

Sulaymon Eshkabilov el 23 de Dic. de 2022

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Hi,

Your system equation is: M*ddx+C*dx+K*x = F(t) and you are studying a forced vibration.

There are a few different ways how to model and solve this spring-mass-damper system.

(1) To obtain an analytical solution, use a symbolic math function: dsolve()

(2) To obtain an analytical solution, use symbolic math functions: laplace(), ilaplace()

(3) To obtain a numerical solution, use ode solvers: ode45, ode23, ode113, etc

(4) To obtain a numerical solution, use Simulink modelling: ode45, ode23, ode113, etc

(5) To obtain a numerical solution, write a code using Euler, Runge-Kutta and other methods

(6) To obtain a numerical solution, use control toolbox functions: tf(), lsim()

There are a few nice sources how to model and solve this spring-mass-damper system.

(4) https://www.mathworks.com/matlabcentral/fileexchange/94585-mass-spring-damper-systems

(6) https://www.mathworks.com/matlabcentral/fileexchange/95288-mass-spring-damper-1-dof

(6) https://www.instructables.com/How-to-Model-a-Simple-Spring-mass-damper-Dynamic-S/

Nice sim demo: https://www.mathworks.com/matlabcentral/fileexchange/94585-mass-spring-damper-systems

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Mustafa Furkan el 23 de Dic. de 2022

Thank you. I've reviewed all of your examples before. I'm new to MATLAB so I'm having trouble implementing it. I don't know how to apply range values or draw related graphs.

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