# Finding pow(a^b)modN for a range of a's

For a given `b` and `N` and a range of `a` say `(0...n)`,

I need to find `ans(0...n-1)` where,

`ans[i]` = no of `a's` for which `pow(a, b)modN == i`

What I am searching here is a possible repetition in `pow(a,b)modN` for a range of `a`, to reduce computation time.

Example:-

if `b = 2` `N = 3` and `n = 5`

``````for a in (0...4):
A[pow(a,b)modN]++;
``````

so that would be

``````pow(0,2)mod3 = 0
pow(1,2)mod3 = 1
pow(2,2)mod3 = 1
pow(3,2)mod3 = 0
pow(4,2)mod3 = 1
``````

so the final results would be:

`ans[0] = 2 // no of times we have found 0 as answer .`

`ans[1] = 3`

`...`

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Which coding contest this problem is from? –  Jayram Aug 4 '13 at 9:51
Please give an example so that we understand the problem. –  Uchia Itachi Aug 4 '13 at 9:59
@UchiaItachi updated .. –  Ninja420 Aug 4 '13 at 10:10
Not sure to understand your exemple. You wrote pow(3,2)mod3 = 2. But pow(3,2) = 9. And 9mod3 = 0. –  Gerard Walace Aug 4 '13 at 10:23
@GerardWalace oops .. updated. –  Ninja420 Aug 4 '13 at 10:28
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## 2 Answers

Your algorithm have a complexity of O(n). Meaning it take a lot of time when n gets bigger.

You could have the same result with an algorithm O(N). As N << n it will reduce your computation time.

Firts, two math facts :

``````pow(a,b) modulo N == pow (a modulo N,b) modulo N
``````

and

``````if (i < n modulo N)
ans[i] = (n div N) + 1
else if (i < N)
ans[i] = (n div N)
else
ans[i] = 0
``````

So a solution to your problem is to fill your result array with the following loop :

``````int nModN = n % N;
int nDivN = n / N;
for (int i = 0; i < N; i++)
{
if (i < nModN)
ans[pow(i,b) % N] += nDivN + 1;
else
ans[pow(i,b) % N] += nDivN;
}
``````
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Thanks a ton ! :D –  Ninja420 Aug 4 '13 at 11:31
`"Your algorithm has a complexity of O(n)"` - I'm not sure I'd consider `a^b` to be an `O(1)` operation. –  Dukeling Aug 4 '13 at 14:21
You're right. But it depends on your processor architecture. On x86, it's supposed to be a time constant operation for exemple. Nevermind, I must admit I may have over simplified my compexity calculation by not taking this into account as it affects both of the algorithms the same way. Thanks for the remarks. –  Gerard Walace Aug 4 '13 at 18:42
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You could calculate `pow` for primes only, and use `pow(a*b,n) == pow(a,n)*pow(b,n)`.

So if `pow(2,2) mod 3 == 1` and `pow(3,2) mod 3 == 2`, then `pow(6,2) mod 3 == 2`.

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