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So that equations in Math(like p * 1/p = 1) will always hold in computers?

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Depends on what you're doing. If p is a rational number, there are ways to represent that, e.g. the fractions module in Python. If p is an arbitrary expression, you can use a symbolic math package. You need to define your question more precisely. –  Tom Zych Mar 25 '11 at 3:12

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Use a arbitrary precision arithmetic library such as the GNU GMP to get "infinite precision" numbers. The library is available at:


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'arbitrary' is not 'infinite', although I'm going to assume you know that since you quoted the offending term :-) I also have a hard time recommending GMP for any robust code since it has the (what I consider fatal for a general purpose library) flaw of just exiting (pulling the rug from underneath you) when it runs out of memory. Granted, that's only likely in the most extreme of cases but, since that's where GMP would be used anyway, I'm not a big fan of it. But it's a viable option for code where you don't mind that sort of behaviour which may well be the case here. –  paxdiablo Mar 25 '11 at 3:23
And, though is is personal experience only, I've always found the MPIR (a GMP fork) folks a lot more amenable to discussion and assistance. YMMV. They also do native Windows as well. –  paxdiablo Mar 25 '11 at 3:27

If you store your number as a numerator/denominator pair then, yes, you can make it lossless.

By that, I mean the number 10, when divided by 3, is stored not as 3.3333333 but instead as the pair {10,3}. This means that, when you multiply it by 3 again, it will become 10.

Of course, that may not work in all edge cases. You still won't be able to represent irrational numbers like PI or the square root of 2, since they can neither be represented as a finite decimal sequence nor a ratio.

But, for division only (using rational numbers), I can't conceive of an edge case where it wouldn't work.

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