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**Suppose I have a set of points xi = {x0,x1,x2,...xn} and corresponding function values fi = f(xi) = {f0,f1,f2,...,fn}, where f(x) is, in general, an unknown function.** (In some situations, we might know

*f*(

*x*) ahead of time, but we want to do this generally, since we often

*don't*know

*f*(

*x*) in advance.)

**What's a good way to approximate the derivative of**That is, how can I estimate values of

*f*(*x*) at each point*xi*?*dfi*== d/d

*x*

*fi*== d

*f*(

*xi*)/d

*x*at each of the points

*xi*?

Unfortunately, MATLAB doesn't have a very good general-purpose, numerical differentiation routine. Part of the reason for this is probably because choosing a good routine can be difficult!

So what kinds of methods are there? What routines exist? How can we choose a good routine for a particular problem?

**There are several considerations when choosing how to differentiate in MATLAB:**

- Do you have a symbolic function or a set of points?
- Is your grid evenly or unevenly spaced?
- Is your domain periodic? Can you assume periodic boundary conditions?
- What level of accuracy are you looking for? Do you need to compute the derivatives within a given tolerance?
- Does it matter to you that your derivative is evaluated on the same points as your function is defined?
- Do you need to calculate multiple orders of derivatives?

What's the best way to proceed?

best waywill highly depend on the situation. – knedlsepp Apr 6 '15 at 21:09