# Maximise value of (X^Y)%M

I know to calculate (X^Y)%M .Now my question is suppose we need to maximise (X^i)%M where i can vary between 0 to Y and M=10^9 + 7.What can i say about i.I mean when it will be maximum?

Input will consist of X and Y which can go upto 10^100 which i can handle by using BigIntegers of JAVA or using modular arithmetic in c++.

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It will be maximum when the expression equals `M-1`. In fact, that expression can never go beyond `M-1`. –  mcleod_ideafix Mar 2 '14 at 17:06
@mcleod_ideafix By expression u mean X^I VALUE ? –  user132263 Mar 2 '14 at 17:07
I mean `(X^Y)%M` –  mcleod_ideafix Mar 2 '14 at 17:07
@mcleod_ideafix means if it go beyond M-1 Then answer will always be M-1 ? –  user132263 Mar 2 '14 at 17:08
The modulus operation can never return a value equal or greater than its second operand, in your case, `M`. If `(X^Y)` goes beyond `M-1`, the maximum value will always be `M-1` –  mcleod_ideafix Mar 2 '14 at 17:10

The first thing you should do, is to transfer

``````X=X%M
Y=Y%M
``````

Notice, 109+7 is much less than 10100. So, you won't need numbers larger than `long`. Long you will need, for the in-between results.

You should count the Xi sequentally:

``````power[0]=X;
long i;
for(i=1; i<Y; i++){
power[i]=(power[i-1]*X)%M;
if (power[i] is in power[0..i-1]) {
i--;
break;
}
}
find max power[0..i];
``````

Because they will be repeating often.

But I don't know if 109+7 is prime or not. If it is, there will be no repeating until all numbers under 109+7 will be reached. The only change will be that every X under 109+7 will set its own unique recombination of numbers 1..109+7.

In this case the max for every Y above 109+7 will be 109+7-1. As for smaller Y's you have to check sequentally, only without the check for the repetition.

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`Y=Y%M` – shouldn't it be `Y=Y%(M-1)`? –  user3290797 Mar 5 '14 at 2:07
@user3290797 no –  Gangnus Mar 5 '14 at 9:19