# Time complexity of the simple java code

How to determine time complexity of this code ? I guess that modPow method is the most "expensive ".

``````import java.math.BigInteger;
public class FermatOne
{
public static void main(String[] args)
{
BigInteger a = new BigInteger ("2");
BigInteger k = new BigInteger ("15");
BigInteger c = new BigInteger ("1");
int b = 332192810;
BigInteger n = new BigInteger ("2");
BigInteger power;
power = a.pow(b);
BigInteger exponent;
exponent = k.multiply(power);
BigInteger mod;
BigInteger result = n.modPow(exponent,mod);
System.out.println("Result is  ==> " + result);
}
}
``````
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Using `BigInteger.ONE.shiftLeft(b)` is much much faster than `a.pow(b);` –  Peter Lawrey Dec 6 '11 at 17:42
possible duplicate of Big O, how do you calculate/approximate it? –  Woot4Moo Dec 6 '11 at 18:06

Well this particular code deterministically runs in `O(1)`.

However, in more general terms for arbitrary variables, `multiply()` will run in `O(nlog n)` where `n` is the number of bits.

`pow()` method will run in `O(log b)` for small `a` and `b`. This is achieved by exponentiation by squaring. For larger values, the number of bits gets large (linearly) and so the multiplication takes more time. I'll leave it up to you to figure out the exact analysis.

I'm not 100% about the details about `modPow()`, but I suspect it runs similarly to `pow()` except with the extra `mod` at each step in the exponentiation by squaring. So it'll still be `O(log b)` multiplications with the added benefit that the number of bits is bounded by `log m` where `m` is the mod.

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are you serious or joking? –  DarthVader Dec 6 '11 at 17:36
It will run the same amount of time, each time it is run. –  Peter Lawrey Dec 6 '11 at 17:37
No that looks serious. The reasons for it are a little over my head, but some code that runs in `O(1)` would still in in `O(1)` but it may call code that runs in a different time complexity. –  Freiheit Dec 6 '11 at 17:38
@tskuzzy,And what about modPow method ? –  pedja Dec 6 '11 at 17:44
@pedja perhaps try it yourself? –  Woot4Moo Dec 6 '11 at 18:06