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Does a/b mod m = (a mod m)/(b mod m)?

I am trying to find nCr mod m for very large numbers. If a/b mod m = (a mod m)/(b mod m) then think I will have solved my problem.

It is for Project Euler. I am using the nCr formula using factorials.

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closed as off topic by nbrooks, David, vstm, Bobrovsky, bluefeet Oct 7 '12 at 19:48

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If b = m, then you'll have a divide by zero. –  poke Jan 2 '12 at 3:45
I don't think so. All you need is one counter-example to prove it wrong, so try a few different sets of numbers, like 19, 9, and 4. –  Hot Licks Jan 2 '12 at 3:47
Are a and b relatively prime with m ? –  ypercube Jan 2 '12 at 20:54
If this belongs anywhere, it is stackexchange maths –  The Unfun Cat Oct 6 '12 at 20:46
math.stackexchange.com –  nbrooks Oct 7 '12 at 10:55

3 Answers 3


If you have a=8, b=2, m=2 then you have a/b mod m = 8/2 mod 2 = 4 mod 2 = 0
and (a mod m)/(b mod m) = (8 mod 2)/(2 mod 2) = 0/0 = NaN
NaN is not equal to 0.

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This identity does not hold. Here is a counter-example:

Let a = 21, b = 7, m = 7.
Then (21/7) = 3 and 3 mod 7 = 3
Alternately, 21 mod 7 = 0 and 7 mod 7 = 0.
But 0 / 0 is undefined (and certainly not 3).

Thus your identity does not hold. However, I am almost certain that it will hold if m and b are relatively prime.

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Indeed. If b and m are relatively prime, there is a c such that b*c mod m = 1. Then (a/b) mod m == (a/b)*(c*b) mod m == (a*c) mod m == (a mod m) * c mod m and similarly for b mod m. –  Daniel Fischer Jan 2 '12 at 15:07

You can use the following link to evaluate (a/b)mod m..... http://mathworld.wolfram.com/Congruence.html

The answer for evaluating is given at the end..

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This is helpful but this should be a comment as it does not directly answer his question. –  Austin Henley Oct 6 '12 at 20:45

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