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Can someone please explain to me how to calculate the complexity of the following recursive code:

long bigmod(long b ,long p, long m)
{
if(p == 0)
    return 1;
else if(p % 2 == 0)
    return square(bigmod(b,p/2,m)) % m;
else    
    return ((b%m) * bigmod(b,p-1,m)) % m;
}
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4 Answers 4

up vote 2 down vote accepted

this is O(log(n)) cause your diving by 2 every time or subtracting one than diving by two, so worse case it would really take O(2* log(n)) - one for the division and one for the subtraction of one.

notes that in this example the worse case and average case should be the same complexity

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If you want to be more formal about it then you can write a recurrence relation and use the Master theorem to solve it. http://en.wikipedia.org/wiki/Master_theorem

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It runs in O(log n)

There are no expensive operations (by that i more expensive than squaring or modding. no looping, etc) inside the function, so we can pretty much just count the function calls.

Best case is a power of two, we will need exactly log(n) calls.

Worst case we get an odd number on every other call. This can do no more than double our calls. Multiplication by a constant factor, no worse asymptotically. 2*f(x) is still O(f(x))

O(logn)

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if the number is negative you subtract 1 from it , it becomes positive than divides by 2, so it cant be log(n) even in worse case. –  Abraham Adam Apr 19 '11 at 4:48
    
i didnt follow that, can you try again? If which number is negative? I take our answers as saying pretty much the same thing, i dont see the difference –  jon_darkstar Apr 19 '11 at 4:52
    
so p is either positive than we divide by 2, or negative than we subtract one and have to divide by two right after. –  Abraham Adam Apr 19 '11 at 4:55
    
if p is even we divide by two. if p is odd we subtract by one. positive/negative? –  jon_darkstar Apr 19 '11 at 4:57
    
ya the main idea of why it cant be O(n) is that you cant keep subtracting by 1 without going to a positive number. worse case is really negative take 1 way >> positive >> divide by 2 >> back to negative >> take another one away etc. –  Abraham Adam Apr 19 '11 at 5:02

It is o(log(N)) base 2, because the division by 2

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I think you should add an explanation why this is so. –  Micha Wiedenmann Mar 12 '13 at 20:05
    
Would you be able to show how you came up with the answer? –  Ian O'Brien Mar 12 '13 at 20:05

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