Here's something I've been thinking about: suppose you have a number, x, that can be infinitely large, and you have to find out what it is. All you know is if another number, y, is larger or smaller than x. What would be the fastest/best way to find x?

An evil adversary chooses a really large number somehow ... say:

```
int x = 9^9^9^9^9^9^9^9^9^9^9^9^9^9^9
```

and provides `isX`

, `isBiggerThanX`

, and `isSmallerThanx`

functions. Example code might look something like this:

```
int c = 2
int y = 2
while(true)
if isX(y) return true
if(isBiggerThanX(y)) fn()
else y = y^c
```

where `fn()`

is a function that, once a number y has been found (that's bigger than x) does something to determine x (like divide the number in half and compare that, then repeat). The thing is, since x is arbitrarily large, it seems like a bad idea to me to use a constant to increase y.

This is just something that I've been wondering about for a while now, I'd like to hear what other people think

`y`

equal to`x`

:`y = x`

. It's not really clear what you mean by "determine x". Where is its value coming from? Why do you need`y`

to be greater than`x`

before you start dividing`x`

? – Josh Caswell Apr 2 '12 at 2:52`binary search algorithm`

. Also, SO is not about infinitely large numbers, it's about programming. There are no infinitely large numbers in programming. – suddnely_me Apr 2 '12 at 2:53