Suppose you have two numbers, both signed integers, and you want to sum them but can't use your language's conventional + and  operators. How would you do that?
Not mine, but cute



Using Bitwise operations just like Adder Circuits 


Since



Cringe. Nobody builds an adder from 1bit adders anymore.
Of course, arithmetic here is assumed to be unsigned modulo 2^{n} or twoscomplement. It's only guaranteed to work in C if you convert to unsigned, perform the calculation unsigned, and then convert back to signed. 


Using bitwise logic:



Here's something different than what's been posted already. Use the facts that:
So:
So just find Of course this is just theoretical, in practice this is going to be inefficient and most likely inexact too. 


If we're obeying the letter of the rules:
Otherwise http://www.geekinterview.com/question_details/67647 has a pretty complete list. 


This version has a restriction on the number range:
This also counts under the "letter of the rules" category. 


Simple example in Python, complete with a simple test:



In Common Lisp:
That's taking the bitwiseand of the numbers, which figures out which bits need to carry, and, if there are no bits that require shifting, returns the bitwiseor of the operands. Otherwise, it shifts the carried bits one to the left and combines them again with the bitwiseexclusiveor of the numbers, which sums all the bits that don't need to carry, until no more carrying is necessary. Here's an iterative alternative to the recursive form above:
Note that the function needs another concession to overcome Common Lisp's reluctance to employ fixedwidth two's complement arithmetic—normally an immeasurable asset—but I'd rather not cloud the form of the function with that accidental complexity. If you need more detail on why that works, please ask a more detailed question to probe the topic. 


Not very creative, I know, but in Python: sum([a,b]) 


[esoteric]
tag... :) – corsiKa Mar 11 '11 at 23:50