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This is a homework question.

I need to calculate 45^60 mod 61. I want to know of any fast method to get the result either programmatically or manually whichever is faster.

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programmatically will be faster i think. you can use C POW function and % operator to get the job done. –  Tobias Mar 18 '11 at 5:58
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manually? you don't have to write any code? then ask wolfram alpha wolframalpha.com/input/?i=45^60+mod+61 –  Mark Mar 18 '11 at 6:07
    
@Tobias: that definitely will not work. 45^60 has somewhere around 320 bits, a lot more than any double or even long double. –  R.. Mar 18 '11 at 13:04

5 Answers 5

The result would be 1 because of Fermat's little theorem

enter image description here

if p is prime.

61 is a prime number so ap-1 when divided by p would give 1 as the remainder.

However if p is non-prime the usual trick is repeated-squaring.

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+1, but a is an integer coprime to p should follow after if p is prime. –  Sanjeevakumar Hiremath Mar 18 '11 at 19:54
    
There are also other theorems than can be used for speeding a^b mod p when p is not prime and b is big. –  ypercube Mar 21 '11 at 0:39
45^60 =
2025^30 = (33*61 + 12)^30 = 12^30 =
144^15 = (2*61 + 22)^15 = 22^15 =
10648^5 = ( 174*61 + 34)^5 = 34^5 =
45435424 = 744843 * 61 + 1 = 1

Here equality means = (mod 61)

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I would say your best bet would be to use Fermat's Little Theorem.

Fermat's Little Theorem

where p = 61 and p-1 = 60.

Hope that helps

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45^2         = 2025 = 12
45^4  = 12^2 = 144  = 22
45^8  = 22^2 = 484  = 57
45^16 = 57^2 = 3249 = 16
45^32 = 16^2 = 256  = 12

45^60 = 45^(4+8+16+32) = 22 * 57 * 16 * 12 = 1
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Wolfram Alpha

Always have Wolfram Alpha at hand :D

enter image description here

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