# Use MATLAB to plot a response of a closed-loop system to a step input or unit ramp?

Im not sure if I can ask such question here, since this has to do with control and design..

Anyway, im trying to plot a response of closed-loop system to a unit ramp and step input using matlab, but im not sure how to get this done ..

My transfer function is : G= 13/(s*(s+3)*(s+1)) and K=8

Any ideas ?

thanks !

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Assuming you have the control system toolbox. Lets do it for G(s) = 1 / (s + 1) .

``````G = tf(1, [1 1]);
CL = feedback(G, 1);
step(CL) % Step response
t = 0:.01:5;
lsim(CL,t,t) % Ramp response
``````

For your example, all you need to change is the defininition of G (help tf for the details), and maybe adjust the time vector t to the time range you want.

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Thank you very much for replying !! – NLed Nov 24 '10 at 0:34
Hmm I asked the lecturer today, and he said that using lsim is the correct way. He said that G/(1+KG) is incorrect because the forward path must include GK, so I better use feedback(GK,1) and then step that response instead ... Thanks Alejandro ! – NLed Nov 24 '10 at 15:19
Apologies for misleading you; I'd assumed when you supplied G and K separately that K was in the feedback path without asking. :) Of course, CL=(GK/(1+GK)) will still work! – kwantam Nov 24 '10 at 23:13
Sorry for the double comment. Regarding ramp response using step vs lsim, both will give you the same answer. Try plotting lsim(CL,t,t) versus step(CL/s); you may have to supply a time vector to step to get it to use the same axes as lsim, but you will get identical answers. – kwantam Nov 24 '10 at 23:20

The control system toolbox is even more convenient than Alejandro has led you to believe!

``````s = tf('s');
K = 8;
G = 13/(s*(s+3)*(s+1));
CL = G/(1+K*G);
step(CL); % step response
step(CL/s); % ramp response
``````

Remember that the ramp response is the integral of the step response. Thus, you can multiply the step response by 1/s and you get the ramp.

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This is exactly what I needed, thank you !! – NLed Nov 24 '10 at 0:33
Thanks for the extra explanation as well :) – NLed Nov 24 '10 at 0:35