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i mod n Z = r
 
i mod n Z = r
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Let a = i mod nZ, then a - i = nZ. This shows that Z divides a - i by n.
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We can also look at the formula as a = nZ + i which tells us that a is a product of Z and the remainder of it.

Revision as of 08:32, 14 September 2008

It's been a while since I've taken Discrete Math... How do you do i mod n Z?


I believe this is how you do it:

n = iq + r, where q is the quotient and r is the remainder.

i mod n Z = r



Let a = i mod nZ, then a - i = nZ. This shows that Z divides a - i by n. We can also look at the formula as a = nZ + i which tells us that a is a product of Z and the remainder of it.

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