how to make input to the system time variable?

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Min Khant
Min Khant on 31 Oct 2023
Commented: Min Khant on 3 Nov 2023
I would like to make an input that is time varying.
I have attached a photo that describe the time varying input I want.
Im a beginner. I hope someone can help me with this. Thank you
Im open to all suggestions or references that can help me learn.
  1 Comment
Rik
Rik on 31 Oct 2023
I have some difficulty understanding what you actually want to achieve in terms of Matlab code. It seems like there are a few steps missing.
Have a read here and here. It will greatly improve your chances of getting an answer.

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Accepted Answer

Sam Chak
Sam Chak on 31 Oct 2023
Edited: Sam Chak on 31 Oct 2023
Ran in:
Okay @Min Khant, the problem is incomplete. However, you can learn by yourself using this example for tracking the desired trajectory . Change the tau number as you wish to observe the time response of .
tspan = linspace(0, 20, 3001); % can set tspan from 0 to π
y0 = [0; 0]; % initial values
[t, y] = ode45(@odefcn, tspan, y0);
yd = pi/2 - pi/4*cos(t); % desired trajectory
% Plots
plot(t, yd), hold on
plot(t, y(:,1)), grid on
title('Time response of \theta(t) in tracking \theta_{d}', 'fontsize', 10)
xlabel('t', 'fontsize', 10), ylabel('\theta', 'fontsize', 10)
legend('\theta_{d}', '\theta(t)', 'location', 'best', 'fontsize', 10)
% Simplified Robt dynamics
function dydt = odefcn(t, y)
dydt = zeros(2, 1);
% parameters
M = 1;
b = 1;
m = 1;
g = 1;
r = 0.16; % true value
rmeas = 0.08; % measured
kp = 1;
kd = 2;
% desired trajectory
yd = pi/2 - pi/4*cos(t);
dyd = 1/4*pi*sin(t);
ddyd = 1/4*pi*cos(t);
% tau input (3 variants)
tau1 = M*ddyd + b*dyd + m*g*rmeas*cos(yd); % so-called feedforward control
tau2 = M*ddyd + M*kd*dyd + M*kp*yd - M*kd*y(2) - M*kp*y(1) + b*y(2) + m*g*r*cos(y(1)); % perfect r
tau3 = M*ddyd + M*kd*dyd + M*kp*yd - M*kd*y(2) - M*kp*y(1) + b*y(2) + m*g*rmeas*cos(y(1)); % imperfect r
dydt(1) = y(2);
dydt(2) = (- b*y(2) - m*g*r*cos(y(1)) + tau3)/M; % <-- change the tau number
end
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Sam Chak
Sam Chak on 31 Oct 2023
Hi @Min Khant
Good to hear that you like Simulink. This following approach is generally more accurate than applying the differentiation block twice to get . If you find the solution helpful, please consider clicking 'Accept' ✔ on the answer and voting 👍 for it.
Min Khant
Min Khant on 3 Nov 2023
May I know how to use derivative block consecutively? sir
as i tried , it does not function properly

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More Answers (1)

Aquatris
Aquatris on 31 Oct 2023
You can create your own numeric integration to solve the equation and provide the desired input in each time step.
Here is an example (the accepted answer) which you can modify for your need.

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