FInd the function root
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Ani Asoyan
on 22 May 2020
Commented: Ani Asoyan
on 26 May 2020
How can I find the root of function without initial point?
I have a parametrized function, with one variable, N
a=@(N)(something)
How can I find the values of N without initial point , where a=0 ? ... I've tried fzero but apparently it works only with initial value. Please help
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Accepted Answer
Cristian Garcia Milan
on 22 May 2020
Edited: darova
on 22 May 2020
You have to use a initial value (it can be 0). The fzero function uses a combination of bisection, secant, and inverse quadratic interpolation methods, but have to look around a point.
Actually, it doesn't really matter how precisse you are, but the problem could be that the function reaches it maximum number of iterations (which you can modify) before it get you the root value.
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More Answers (1)
Abdolkarim Mohammadi
on 22 May 2020
Edited: Abdolkarim Mohammadi
on 22 May 2020
Finding values of inputs that minimizes or maximizes an objective function is an optimizaiton problem. I don't know about your function, but If your function is linear, then you run the following code and optimize your function:
[x, fval] = linprog (u_g, [], []);
If your function is unimodal and relatively smooth, then you run the following code and optimize your function:
[x, fval] = fmincon (u_g, x0, [], []);
Be aware that fmincon uses an initial point x0. If the landscape of your function is unknown, i.e., you don't know whether it is linear, nonlinear, multi-modal, non-smooth, etc, then you run the following code and optimize your function:
[x, fval] = ga (u_g, nvars);
Where nvars i the number of variables. You can refer to the documentation of each solver for more information. Finding the roots of a function is translated into an optimization problem as f(x) = 0; so you need to provide this as a constraint to the solvers mentioned above or any other solvers.
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Abdolkarim Mohammadi
on 22 May 2020
Edited: Abdolkarim Mohammadi
on 22 May 2020
In terms of an optimization problem, your objective function to be minimized is the differnence of the value of your function from zero. Your objective function would be something like this: "Min |f(x)-0|". You can also define your problem as a feasiblity problem (you can take a look at this comment). This way you have "Min 0; subject to f(x)==0". However, each run of the optimization problem gives you one of possibly many zeros of the function or might never give you some of the zeros.
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