A transfer function out of a complex function

5 Jun 2013
2 Answers
14 Views (30 days)

0 votes

Hi everyone, got this problem when trying to design a PID controler, so the function is here:
L=(4*exp(-t)+4*t+6)/10
i just can't get it right with all this num and den coefficients since this is a combination of ordinary function and an exponential fucntion. the question is: how do i turn it to a transfer function? got lost really.
Thanks, Sydney.

2 Comments
Show None Hide None

Sydney Flowers
Sydney Flowers on 5 Jun 2013
Edited: Sydney Flowers on 5 Jun 2013
L is a function which indicates the change of the location of the rotor in time - Z-axis vibration. The function in question is a simplified law, out of which the sin(omega) was taken away and replaced by 1, for i had no idea how to make it in tf, and c and b coefficients were made numeric constants.

Sign in to comment.

Sign in to answer this question.

Answers (2)

David Sanchez
David Sanchez on 5 Jun 2013

1 vote

substitute in your L function:
exp(x) = 1 + x + (x^2)/4 % Taylor expansion
Operate until you obtain your num and den, then:
my_sys = tf( num, den )

2 Comments
Show None Hide None

Azzi Abdelmalek
Azzi Abdelmalek on 5 Jun 2013
what are num and den?
Sydney Flowers
Sydney Flowers on 5 Jun 2013
numerator and denumenator - coefficient vectors that make up a transfer fucntion.

Sign in to comment.

Azzi Abdelmalek
Azzi Abdelmalek on 5 Jun 2013

1 vote

If L is your impulse response, Maybe L is
%L(t)=0.1(4exp(-t)-4t+6)u(t) % u(t) is a step function
The transfer function of your system is the Laplace transform of your impulse response
%L(p)=0.1*(4*1/(p+1)-4*1/p^2+6/p)
%L(p)=0.4/(p+1)-0.4/p^2+0.6/p=(p^2+0.2p-0.4)/(p^3+p^2)
num=[1 0.2 -0.4]
den=[1 1 0 0]
H=tf(num,den)

11 Comments
Show 9 older comments Hide 9 older comments

Sydney Flowers
Sydney Flowers on 5 Jun 2013
so the transfer function i get is basically equal to what i had?
Sydney Flowers
Sydney Flowers on 5 Jun 2013
Does it look this way: my function L -> Laplace transform -> L(p)?
Azzi Abdelmalek
Azzi Abdelmalek on 5 Jun 2013
Please explain clearly, you've posted a function L(t) which is a temporal function, can you specify if L(t) is a pulse response or a transfer function, and what t represent?
Sydney Flowers
Sydney Flowers on 5 Jun 2013
L(t) is a function which describes the law according to which the rotor moves in Z-axis. It is the law of the change of the gap between a bearing and a rotor. It was obtained out of the math model, the solution to a differential equasion. Now the goal is to control the gap by means of PID, which i was trying to design in matlab, but faced a problem with turning the function into the transfer function.
Azzi Abdelmalek
Azzi Abdelmalek on 5 Jun 2013
You did not answer my question, is L(t) a pulse response or what? if not you should explain how this function describe your system, because in your function, there is no neither input signal, neither output.
Sydney Flowers
Sydney Flowers on 5 Jun 2013
the system is a Z axis one mass attached to the ground with a spring and damper. L(t) is not a pulse response. Again, its a solution to a differential equasion from mx''-c-kx=F(which is a sin-like disturbance)-bx'. Thats it.
Azzi Abdelmalek
Azzi Abdelmalek on 5 Jun 2013
Ok, in your equation can you specify what represent each parameter or signal
Sydney Flowers
Sydney Flowers on 5 Jun 2013
having the differential equasion as follows: m*h''-c-k*h=F-b*h', where h is the value of the gap, i obtained the function h(t) = (4*exp(-t)+4*t+6)/10, which is the simplified solution of the equasion. coefficients C of the stiffness of the spring and B of the damper are turned into numeric constants, so they do not appear in the function. that makes h - the gap value and t - time.
Azzi Abdelmalek
Azzi Abdelmalek on 5 Jun 2013
Do you mean
h: your output signal
m,c,k and F are constant
What about your input signal?
Sydney Flowers
Sydney Flowers on 5 Jun 2013
F is a disturbing force, so, if i get you right, the input is initial value of the gap h, and omega, on which the F depends. and output is a new value of the gap.

Sign in to comment.

Categories

Find more on Dynamic System Models in Help Center and File Exchange

Products

Tags

Asked:

Sydney Flowers
Sydney Flowers
on 5 Jun 2013

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!