Given a integer number and its reresentation in some arbitrary number system. The purpose is to find the base of the number system. For example, number is 10 and representation is 000010, then the base should be 10. Another example: number 21 representation is 0010101 then base is 2. One more example is: number is 6 and representation os 10100 then base is sqrt(2). Does anyone have any idea how to solve such problem?
An algorithm like this should find the base if it is an integer, and should at least narrow down the choices for a noninteger base:
It's a bruteforce method, but it should work. You may also be able to speed it up a bit by incrementing Something else that might help speed things up, particularly in the case of a noninteger base: Remember that as several people have mentioned, a number in an arbitrary base can be expanded as a polynomial like
When evaluating potential bases, you don't need to convert the entire number. Start by converting only the largest term, Also, there is another quick way to eliminate a potential base. Notice that you can rearrange the above polynomial expression and get
or
You know the values of 


You know Whether solving this equation is simple or complex is left as an exercise. 


I do not think that an answer can be given for every case. And I actually have a reason to think so! =) Given a number x, with representation
This cannot be done generally, as shown by Abel and Ruffini. You might be luckier with shorter numbers, but if more than four digits are involved, the formulas are increasingly ugly. There are quite a lot good approximation algorithms, though. See here. 


For integers only, it's not that difficult (we can enumerate). Let's look at
Let's generate the numbers for some bases:
More generally, we have
In the case of an integer base, or if you have a list of known possible bases, I doubt they'll be many possibilities, so we can just try them out. Note that it may be faster to actually take the If you really don't have any idea (trying to find a floating base)... well it's a bit more difficult I guess, but you can always refine the inequality (including one or two more terms) following the same property. 


Im not sure if this is efficiently solvable. I would just try to pick a random base, see if given the base the result is smaller, larger or equal to the number. In case its smaller, pick a larger base, in case its larger pick a smaller base, otherwise you have the correct base. 


This should give you a starting point: Create an equation from the number and representation, number 42 and represenation "0010203" becomes:
Now you solve the equation to get the value of 


I'm thinking you will need try and check different bases. To be efficient, your starting base could be max(digit) + 1 as you know it won't be less than that. If that's too small double until you exceed, and then use binary search to narrow it down. This way your algorithm should run in O(log n) for normal situations. 


Several of the other posts suggest that the solution might be found by finding the roots of the polynomial the number represents. These will, of course, generally work, though they will have a tendency to produce negative and complex bases as well as positive integers. Another approach would be to cast this as an integer programming problem and solve using branchandbound. But I suspect that the suggestion of guessingandtesting will be quicker than any of the cleverer proposals. 


I
,base^I > ∑(i in [0, I[)(digit[i] * base^i)
. This property makes it much easier, I've illustrated it in an answer because I lacked the place for equations here but it does considerably simplify the problem at hand. – Matthieu M. Apr 8 '10 at 14:30