# Is doing a square root once slower than squaring n times? [closed]

I was just looking at some algorithms for prime numbers and came across this:

``````for(int i=2;i*i <= n;i++)
{/*assume no operations here*/}
``````

I was just wondering if the above loop will be faster than the following or not?

``````int x=sqrt(n);
for(int i=2;i<=x;i++)
{/*nop*/}
``````
-

## closed as not constructive by Luchian Grigore, Marc B, K-ballo, Fanael, Lightning Racis in ObritJan 28 '13 at 14:57

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why don't you time it? –  CyberSpock Jan 28 '13 at 14:43
What's the point of the second loop? It's equivalent to `i = x + 1`. –  Adam Wright Jan 28 '13 at 14:44
Depends - for small `n`, it probably will - but in most cases, it won't. –  Luchian Grigore Jan 28 '13 at 14:44
I would like some explanation to it as well. Also if there exists a particular n above which one becomes faster than the other. –  sleeping_dragon Jan 28 '13 at 14:44
@sleeping_dragon: then time it. run both methods, sequentially increase the 'space' you're testing, and graph the results. sqrt() has pretty fixed large overhead, but at some point the savings on the testing loop will start paying off. –  Marc B Jan 28 '13 at 14:45

It depends on the value of `n`, of course. Anyway, `sqrt()` is not guaranteed to give you the right result: due to rounding reasons, you might end up with a value of `x` which is one less than expected and ruin the algorithm. Rather than going for a micro-optimisation, I would stick to correctness here and use the original version, which is guaranteed to give correct results.