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does the following integer arithmetic property hold?

(m/n)/l == m/(n*l)

At first I thought I knew answer (does not hold), but now am not sure. Does it hold for all numbers or only for certain conditions, i.e. n > l?

the question pertains to computer arithmetic, namely q = n/m, q*m != n, ignoring overflow.

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4 Answers 4

up vote 9 down vote accepted
case1 assume m = kn+b (b<n)
left = (m/n)/l = k/l
right = (kn+b)/(n*l) = k/l + b/(n*l) = k/l (because b<n)

case2 assume m = kn...obviously correct
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Not true if n*l overflows the bound of the integer type. –  mtrw Apr 14 '10 at 3:15
    
@mtrw to be fair, that goes without saying –  Anycorn Apr 14 '10 at 3:21
    
@ziang, @aaa - I downvoted this thinking that overflow was an important part of the question. Now my downvote is too old to undo. Sorry ziang. –  mtrw Apr 14 '10 at 3:29
    
@mtrw, not a problem at all. We learn and discuss things here, who cares about the votes :) –  zsong Apr 14 '10 at 3:50
    
@mtrw: we'll just make sure to upvote it to compensate :) –  Matthieu M. Apr 14 '10 at 14:02

Are you talking about mathematical integers? Or fixed-width integers within a programming language?

The two equations are identical with mathematical integers, but the two functions have different overflow behaviors if you are using fixed-width integers.

For example, suppose integers are 32-bit

(1310720000/65536)/65537 = 20000/65537 = 0

However, 65536 * 65537 will overflow a 32-bit integer, and will equal 65536, so

1310720000/(65536*65537) = 1310720000/65536 = 20000
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+1 for beating me to it. And if I could, another +1 for apparently being the only responder to catch the word integer! –  mtrw Apr 14 '10 at 3:14

It holds in all cases where it's defined, namely any time when n and l do not equal zero. It's more readable in LaTeX:

MathBin: Divison Equalities

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Your proof uses rational division but the question was about integer division –  Bruno Martinez Apr 23 '13 at 18:07

It holds in all cases, they're equivalent

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do you know how to prove it? I tried myself, but my number theory is weak. This is not homework by the way –  Anycorn Apr 14 '10 at 2:48
    
It's kind of...self-evident, isn't it? You could rewrite both sides as m * (1/n) * (1/l) if that helps –  Michael Mrozek Apr 14 '10 at 2:59
    
ugh, I was referring to computer integer arithmetic (with truncation) –  Anycorn Apr 14 '10 at 3:02
    
Oh. Specifying that helps –  Michael Mrozek Apr 14 '10 at 3:18
    
I assumed integer was understood to be computer related. Down vote is not from me btw –  Anycorn Apr 14 '10 at 3:23

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