# What is the best approach to calculating function limits?

I am planning to develop an application that can calculate the limit of an expression (function) given by the user.

I already have a functional expression evaluator, which will definitely come in handy. My idea is to calculate it like this: I give the parameter a few values that get closer and closer to the point, but doesn't reach the point. At the end, I see if the difference between two consecutive results gets smaller or bigger closer or further from 0. If it gets smaller closer, this means that the limit is finite, infinite otherwise. After that, it's easy to approximate a result.

Is there a better approach to this? Or should I go with this one?

The application will accept functions that contain these mathematical operators: `+,-,*,/,%,^`, functions (like floor, logarithms, trigonometry), and 3 condition functions (abs, min, max). So, for example a function which has a specific value for integer values, and another value for non-integer values is not accepted.

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This is generally impossible. Are you putting constraints on what type of function can be entered by the users? –  Deestan Mar 20 '12 at 14:35
@sch You are right... It gets closer to 0, not smaller. And I'm not putting any constraints... I think this is going to work. –  Tibi Mar 20 '12 at 14:39
write a web service that call www.wolframalpha.com :-) –  Alessandro Teruzzi Mar 20 '12 at 14:43
Fraught with peril. What is the limit of `x^x` as `x -> 0`? –  Mr E Mar 20 '12 at 14:49
What is the limit of 1/(1+2^(1/(x-1))) at x=1? –  ipc Mar 20 '12 at 14:50

mathematically you could use the Differential calculus. Like that you just have to implement the differential rules and you dont have to use brute force

but the comment you got with wolframalpha is great: example: thats exactly what you need

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That seems pretty difficult to me... or am I wrong? –  Tibi Mar 20 '12 at 14:44
there are not so many rules but to have all well done it gonna be difficult yes :-) –  fix_likes_coding Mar 20 '12 at 14:49
@Tibi It is difficult. I'm not trying to be snide or sarcastic, but if you realized that just now, you do not have the necessary math-fu to pull this off. –  Deestan Mar 20 '12 at 14:52
I'm not sure... at maths class, I learned about derivatives and integrals, and the latest thing I learned was how to calculate surfaces and volumes using the integral. I don't really know anything about differentials, what they are, etc... –  Tibi Mar 20 '12 at 14:59

This answer is more mathematics than programming, but it shows you why you can't do what you are looking for (unless you add more information about the functions).

We define `f` as follows:

• `f(x) = 0` if `x` is a rational number
• `f(x) = 1` if `x` is not a rational number

This function doesn't even have a limit at any point, but if you use the method you specified, then for what ever float (or double) number you use, `f(x)` will be `0`, so the difference will be `0`.

Your method will say that the limit of `f` at the point `5` for example is `0`, but `f` doesn't have a limit at all.

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You are right, but this is impossible to write without an if clause. And in programming it's hard (if not impossible) to make the difference between a rational and irrational number. So this would be a constraint, no conditional clauses. –  Tibi Mar 20 '12 at 14:53
What kind of functions do you want your program to accept? Can you edit your question and at least provide some examples. –  sch Mar 20 '12 at 14:56

I was just going to write a brief comment, but the more I thought about it, the more I came to the conclusion that the answer to your question is that you should not go with your suggestion. There is a circularity in your proposal: to find the limit of a function you propose to provide your system with a series of inputs whose evaluation tends towards the (supposed) limit of the function. How would you start without having an idea of what the limit is ? Or do you want to implement a program which finds the limits of functions that you already know ? A sort of artificial idiot who will always know less than you ?

As to what you should do, first realise that this is actually quite a tricky function to implement and that there will be no general solution that works for all functions, not even for all the nice, well-behaved functions. You may find it instructive to see how Sage (http://www.sagemath.org/), or any other open-source computer algebra system you know about, does this.

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