Numerically derive a continous, non-symbolic function

fi
26 Nov. 2019
1 Antwort
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Aktualisiert 27 Nov. 2019
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I have a function defined via
function y = f(x)
% ...
end
. I now want to numerically calculate the value of it's derivative at a given point. As in, what should be in the following function's body?
function y = derivative_of_f(x)
% Calculate derivative of f at position x here
end
Is there any way to do this, without having to implement numerical differentiation myself?

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darova
darova am 26 Nov. 2019
Bearbeitet: darova am 27 Nov. 2019

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Derivative is (if you have numerical data)
dy = (y(i)-y(i-1)) / (t(i)-t(i-1));
Maybe diff (if you have a function) ?
syms x
diff(f(x))

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fi
fi am 26 Nov. 2019
My function is not discretized yet, but continuous! This means I would first have to choose a precice enough discretization to use your method. That all is of course possible, but I was wondering whether there is an easier (built-in?) method where I don't have to reinvent the wheel. Kind of like the fzero function to find roots.
darova
darova am 26 Nov. 2019
Maybe diff?
syms x
diff(f(x))
fi
fi am 26 Nov. 2019
Bearbeitet: fi am 26 Nov. 2019
I don't think that will work here, since my function is not symbolic. For example, as soon as a function contains a case switch like this:
function y = f(x)
if (x > 0)
y = x^2;
else
y = x;
end
end
...diff doesn't work anymore, throwing this error: Conversion to logical from sym is not possible.
Also, I don't want the analytical derivative, but just it's numerical approximation for a single given position.
darova
darova am 26 Nov. 2019
Another method
dx = 0.001;
dy = (f(x)-f(x+dx))/dx;
fi
fi am 27 Nov. 2019
Yeah, that's seems like the easisest way.
I just wanted to know if there is a preferred, maybe built-in way where I don't have to take care of precision. Anyway, thanks alot!
darova
darova am 27 Nov. 2019
Can you accept the answer please
fi
fi am 27 Nov. 2019
Well, the answer is currently in your comment and there is no accept button for that :(
Could you maybe edit you original answer?
darova
darova am 27 Nov. 2019
yes please

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fi
fi
am 26 Nov. 2019

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darova
darova
am 27 Nov. 2019

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