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I am trying to find the modulo of an expression. All I know is that

(a+b) mod N = ((a mod N) + (b mod N)) mod N

How do I use it to simplify the following modulo operation?

(a - 2*b + 1) mod N

There must be some way to simplify it by considering it as

(a - b - b + 1) mod N ?

EDIT:

I have stumbled upon the following property too:

ab mod N = ((a mod N) (b mod N)) mod N

Will this be helpful somehow?

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really should be (b*-2 + a + 1) % n to avoid confusion –  watson Oct 8 '13 at 19:27

2 Answers 2

up vote 1 down vote accepted

If: (a+b) mod N = ((a mod N) + (b mod N)) mod N

then:

(a - 2*b + 1) mod N = ((a mod N) - (b mod N) - (b mod N) + (1 mod N)) mod N

It is simpler with large values of a and b and a small value for N.

For example: a=85773, b = 77733340, N=5: which would you rather solve

(85773 - 77733340 - 77733340 + 1) mod 5

or

((85773 mod 5) - (77733340 mod 5) - (77733340 mod 5) + (1 mod 5)) mod 5

for the second one i get (3 - 0 - 0 + 1) % 5 = 4

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Exactly what I was looking for! Thanks. –  Born Again Oct 8 '13 at 19:57

There is no way to simplify (b*-2 + a + 1) % n unfortunately.

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Can it not be simplified by considering it as (a -b -b +1) mod N ? –  Born Again Oct 8 '13 at 19:29
    
Let (a - 2*b + 1) mod N = (((a-2*b) mod N) + (1 mod N)) mod N 1 mod N = 0, so that simplifies to (((a-2*b) mod N) mod N) I don't know that that's "simpler", but shouldn't that work? –  Kyle Travis Oct 8 '13 at 19:30
    
if you consider that to be simpler, then yes it can –  watson Oct 8 '13 at 19:30
    
Fair enough. It uses the stated property, but It's definitely no cleaner, and uses the same number of operations. –  Kyle Travis Oct 8 '13 at 19:32
    
@KyleTravis Why is 1 mod N = 0? –  Born Again Oct 8 '13 at 19:40

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