# Operation of algorithm using while loop with third power conditioning

could somebody please shed some light on what this piece of code is actually doing? I think it should be fairly straightforward but I am stuck at the moment, so any help would be greatly appreciated!

`````` read n;
i := 1;
while (i * i * i) <= n do
i := i + 1;
output (i-1)
``````

Also how could one calculate the complexity of this? Thank you in advance!

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It increments `i` until `i³` is greater than `n`. Therefore `i-1` will be `floor(cube_root(n))`, and that's what's returned.

The running time is proportional to the cube root of `n`, since that's how many iterations of the loop are performed.

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Thanks, so I suppose this is a pretty efficient algorithm having O(n^1/3).. Would perhaps a recursive analogous be more efficient? – user113478 Jun 23 '13 at 19:17
It's possible to do much better with an iterative method such as Newton's or Halley's. As it says you need to take care in choosing your initial guess, but it should be a lot faster. – Imre Kerr Jun 23 '13 at 19:20