# How to use the modulus operator in division equations when the mod value is non-prime [closed]

I know that (a*b)%M = (a%M * b%M)%M

But what if the equation was :( (a*b)/c )%M ..I dont think I can use the above logic here also..And here M is a non-prime number ..You may assume that (a*b)/c will NEVER end up in a floating value..

``````For eg:
If a=10 b=9 and c=6,M=4 then (a*b)/c=15 and 15%4=3
but if I use the property as it is with multiplications then ((10%4*9%4)/(6%4))%4= (2*1)/2=1
``````

Please tell me how to solve this kind of problem??

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## closed as off topic by Michael Petrotta, BlueRaja - Danny Pflughoeft, Ali, rene, kapaAug 10 '12 at 8:46

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Maybe I'm just not smart enough, but I don't know what the question is. What problem are you trying to solve? –  Yusuf X Aug 10 '12 at 2:12
I second that, it would be nice to know what you are trying to achieve. Other than that, I think this queston belongs to math.stackexchange.com –  Ali Aug 10 '12 at 7:53

## 1 Answer

If c and M were relatively prime, you could multiply c^-1%M and the math should work. However, if GCD(c,M)>1, then c^-1%M doesn't exist, and there is no easy way to do it that I know of.

As far as what c^-1%M is, its the number such that c*c^-1%M=1. For example, if c=2 and M=9, 2*5%9=10%9=1, so c^-1%M=5.

You can calculate c^-1%M with the extended euclidean algorithm -- you get ac+bM=1, so ac=1+(-b)M and ac%M=1.

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Thanks ..And how will I store c^-1 in the program..It will require a double ..Or I dont need to do that and simply write (a%Mb%Mc^-1%M)%M?? –  Wayne Rooney Aug 10 '12 at 2:16
Its an integer -- see my edit. This is straying into discrete math (the sort used in cryptography). –  Retief Aug 10 '12 at 2:23