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How to know the repeating decimal in a fraction?

Is there a way to tell if a decimal is terminating or repeating?

Example: I have fraction: 1/3 and it's repeating decimal - 0.33333333333333333333 I have fraction 1/2 and it's terminating decimal - 0.5

I don't have any idea how i can do it.

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marked as duplicate by John Saunders, Andrew Whitaker, Damien_The_Unbeliever, Nix, CoolBeans Jan 23 '13 at 17:31

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

    
Related: stackoverflow.com/questions/8946310/… –  Oded Jan 23 '13 at 13:38
    
what do you mean by "repeating" ? irrational numbers ? any number that can't be acuratly represented by a float ? by a double ? –  Oren Jan 23 '13 at 13:39
    
Thanks, i search on stackoverflow, but i didn't see that. –  Yozer Jan 23 '13 at 13:40
    
When you say " I have fraction: 1/3", in what form do you 'have' it? As the pair of integers 1 and 3, or something else? –  AakashM Jan 23 '13 at 13:41
    
There is no built in way to do this but if you are willing to put in some effort you might be able to follow @MichaelAnderson's guide in this post: stackoverflow.com/questions/12098461/… –  Animal Jan 23 '13 at 13:42

1 Answer 1

According to Wikipedia, A fraction is terminating if it can be represented in the form of k/(2^n * 5^m), where k, n, and m are integers.

#assumes that the fraction is already fully reduced
#e.g. numerator and denominator are coprime
function isTerminating(numerator, denominator):
    while denominator % 2 == 0:
        denominator /= 2
    while denominator % 5 == 0:
        denominator /= 5
    return denominator == 1

If you have the fraction in an IEEE float, then it always terminates, as long as it is not NaN or +/- infinity. Finite numbers in floats are represented as c * b^q. The terms may be rearranged to be c / (b^-q). b is always 2 or 10, so the number fits the k/(2^n * 5^m) format and is therefore a terminating fraction.

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