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I want to avoid dividing by zero so I have an if statement:

float number;
if (number > 0.000000000000001) 
  number = 1/number;

How small of a value can I safely use in place of 0.000000000000001?

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number != 0 ? – Nbr44 Aug 14 '13 at 14:21
@Nbr44 You should generally compare float/doubles against integers due to rounding errors. – bash.d Aug 14 '13 at 14:23
What are you trying to avoid? You won't get an exception for dividing by zero, just Inf. – ugoren Aug 14 '13 at 14:23
Why do you want to avoid the division by zero? In many platforms that will yield a Inf, which is a perfectly valid value and probably what you will get if you divide by a small enough number anyways. – David Rodríguez - dribeas Aug 14 '13 at 14:24
You're looking for the smallest double value: DBL_MIN – apnorton Aug 14 '13 at 14:24
up vote 5 down vote accepted

The number in the if condition depends on what you want to do with the result. In IEEE 754, which is used by (almost?) all C implementations, dividing by 0 is OK: you get positive or negative infinity.

If your goal is to avoid +/- Infinity, then the number in the if condition will depend upon the numerator. When the numerator is 1, you can use DBL_MIN or FLT_MIN from math.h.

If your goal is to avoid huge numbers after the division, you can do the division and then check if fabs(number) is bigger than certain value after the division, and then take whatever action as needed.

There is no single correct answer to your question.

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DBL_MIN is the wrong limit for whether 1/number produces infinity. E.g., 1 / (.75 * DBL_MIN) produces about 5.99231e307, not infinity. – Eric Postpischil Aug 14 '13 at 14:42
@EricPostpischil you're right. I forgot about denormal numbers while answering. Thanks! – Alok Singhal Aug 14 '13 at 16:34
@EricPostpischil seems like the correct answer is nextafter(1.0/DBL_MAX, 1) in this case. – Alok Singhal Aug 14 '13 at 16:40

Just use:

if(number > 0)
    number = 1/number;

Note the difference between > and >=. If number > 0, then it definitely is not 0.

If number can be negative you can also use:

if(number != 0)
    number = 1/number;

Note that, as others have mentioned in the comments, checking that number is not 0 will not prevent your result from being Inf or -Inf.

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let's say my number could be negative should compare it abs(number) !=0 wouldn't work for let's 0.35 *10^35 – Engine Aug 14 '13 at 14:38
@Engine That's because abs returns an int not a float/double in C. There is no need to use abs there. 0.35*10^35 is not equal to 0. Here's proof: ideone.com/18Yd8X – Paulpro Aug 14 '13 at 14:45
@Engine: What do you think the problem is .35*10^35 would be? Or .35*10^-35, if that is what you meant? If a number is not zero, then dividing by it does not produce division by zero. So this problem you are trying to solve, avoiding dividing by zero, is entirely solved by testing whether the divisor is zero. – Eric Postpischil Aug 14 '13 at 14:45
@EricPostpischil Hmm well I'm not sure what else could be the problem as 0.35e35 definitely doesn't compare as equal to 0. I'm quite certain that in C abs only works with int and in C++ it works with doubles. See here: ideone.com/by1uFr – Paulpro Aug 14 '13 at 14:47

You can simply check:

if (number > 0)  

I can't understand why you need the lower limit.

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Because if the number is close to 0, the result can still be INF. Trivially, in the case of DBL_MAX/0.5, 0.5 is already too close. – MSalters Aug 15 '13 at 7:55

For numeric type T std::numeric_limits gives you anything you need. For example you could do this to make sure that anything above min_invertible has finite reciprocal:

float max_float = std::numeric_limits<float>::max(); 
float min_float = std::numeric_limits<float>::min(); // or denorm_min()
float min_invertible = (max_float*min_float > 1.0f )? min_float : 1.0f/max_float;
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I really do like this answer especially for the max_float*min_float > 1.0f test. But might not max_float & min_float be so close to being logarithmic opposites and with various rounding modes that "max_float*min_float" is 1.0 and "1.0f/max_float" is 0.0. As a candidate alternative, how about (1.0f/max_float)? 1.0f/max_float : min_float? Maybe that suffers a similar edge condition. – chux Aug 23 '13 at 1:42

You can't decently check up front. DBL_MAX / 0.5 effectively is a division by zero; the result is the same infinity you'd get from any other division by (almost) zero.

There is a simple solution: just check the result. std::isinf(result) will tell you whether the result overflowed, and IEEE754 tells you that division cannot produce infinity in other cases. (Well, except for INF/x,. That's not really producing infinity but merely preserving it.)

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Your risk of producing an unhelpful result through overflow or underflow depends on both numerator and denominator.

A safety check which takes that into consideration is:

if (den == 0.0 || log2(num) - log2(den) >= log2(FLT_MAX))
    /* expect overflow */ ;
    return num / den;

but you might want to shave a small amount off log2(FLT_MAX) to leave wiggle-room for subsequent arithmetic and round-off.

You can do something similar with frexp, which would work for negative values as well:

int max;
int n, d;

frexp(FLT_MAX, &max);

frexp(num, &n);
frexp(den, &d);

if (den == 0.0 || n - d > max)
    /* might overflow */ ;
    return num / den;

This avoids the work of computing the logarithm, which might be more efficient if the compiler can find a suitable way of doing it, but it's not as accurate.

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With IEEE 32-bit floats, the smallest possible value greater than 0 is 2^-149.

If you're using IEEE 64-bit, the smallest possible value is 2^-1074.

That said, (x > 0) is probably the better test.

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For IEEE 754 double-precision, the smallest value is 2^-1074. It is smaller than 2^-1022 for the same reason that 2^-149, the smallest strictly positive single-precision value, is smaller than 2^-126. – Pascal Cuoq Aug 14 '13 at 14:38
You are both right. Edited to take this into account. – user2310967 Aug 14 '13 at 14:59

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