# Find min/max of a float/double that has the same internal representation

Refreshing on floating points (also PDF), IEEE-754 and taking part in this discussion on floating point rounding when converting to strings, brought me to tinker: how can I get the maximum and minimum value for a given floating point number whose binary representations are equal.

Disclaimer: for this discussion, I like to stick to 32 bit and 64 bit floating point as described by IEEE-754. I'm not interested in extended floating point (80-bits) or quads (128 bits IEEE-754-2008) or any other standard (IEEE-854).

Background: Computers are bad at representing `0.1` in binary representation. In C#, a float represents this as `3DCCCCCD` internally (C# uses round-to-nearest) and a double as `3FB999999999999A`. The same bit patterns are used for decimal `0.100000005` (float) and `0.1000000000000000124` (double), but not for `0.1000000000000000144` (double).

For convenience, the following C# code gives these internal representations:

``````string GetHex(float f)
{
return BitConverter.ToUInt32(BitConverter.GetBytes(f), 0).ToString("X");
}

string GetHex(double d)
{
return BitConverter.ToUInt64(BitConverter.GetBytes(d), 0).ToString("X");
}

// float
Console.WriteLine(GetHex(0.1F));

// double
Console.WriteLine(GetHex(0.1));
``````

In the case of `0.1`, there is no lower decimal number that is represented with the same bit pattern, any `0.99...99` will yield a different bit representation (i.e., float for `0.999999937` yields `3F7FFFFF` internally).

My question is simple: how can I find the lowest and highest decimal value for a given float (or double) that is internally stored in the same binary representation.

Why: (I know you'll ask) to find the error in rounding in .NET when it converts to a string and when it converts from a string, to find the internal exact value and to understand my own rounding errors better.

My guess is something like: take the mantissa, remove the rest, get its exact value, get one (mantissa-bit) higher, and calculate the mean: anything below that will yield the same bit pattern. My main problem is: how to get the fractional part as integer (bit manipulation it not my strongest asset). Jon Skeet's DoubleConverter class may be helpful.

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One way to get at your question is to find the size of an ULP, or Unit in the Last Place, of your floating-point number. Simplifying a little bit, this is the distance between a given floating-point number and the next larger number. Again, simplifying a little bit, given a representable floating-point value x, any decimal string whose value is between (x - 1/2 ulp) and (x + 1/2 ulp) will be rounded to x when converted to a floating-point value.

The trick is that (x +/- 1/2 ulp) is not a representable floating-point number, so actually calculating its value requires that you use a wider floating-point type (if one is available) or an arbitrary width big decimal or similar type to do the computation.

How do you find the size of an ulp? One relatively easy way is roughly what you suggested, written here is C-ish pseudocode because I don't know C#:

``````float absX = absoluteValue(x);
uint32_t bitPattern = getRepresentationOfFloat(absx);
bitPattern++;
float nextFloatNumber = getFloatFromRepresentation(bitPattern);
float ulpOfX = (nextFloatNumber - absX);
``````

This works because adding one to the bit pattern of x exactly corresponds to adding one ulp to the value of x. No floating-point rounding occurs in the subtraction because the values involved are so close (in particular, there is a theorem of ieee-754 floating-point arithmetic that if two numbers x and y satisfy y/2 <= x <= 2y, then `x - y` is computed exactly). The only caveats here are:

1. if x happens to be the largest finite floating point number, this won't work (it will return `inf`, which is clearly wrong).
2. if your platform does not correctly support gradual underflow (say an embedded device running in flush-to-zero mode), this won't work for very small values of x.

It sounds like you're not likely to be in either of those situations, so this should work just fine for your purposes.

Now that you know what an ulp of x is, you can find the interval of values that rounds to x. You can compute ulp(x)/2 exactly in floating-point, because floating-point division by 2 is exact (again, barring underflow). Then you need only compute the value of x +/- ulp(x)/2 suitable larger floating-point type (`double` will work if you're interested in `float`) or in a Big Decimal type, and you have your interval.

I made a few simplifying assumptions through this explanation. If you need this to really be spelled out exactly, leave a comment and I'll expand on the sections that are a bit fuzzy when I get the chance.

One other note the following statement in your question:

In the case of 0.1, there is no lower decimal number that is represented with the same bit pattern

is incorrect. You just happened to be looking at the wrong values (0.999999... instead of 0.099999... -- an easy typo to make).

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Excellent answer, seems like the info I was looking for. I'll try to work it out in C# and get back here if I need some more help on the tidbits. I noticed you've worked with the IEEE-754 team to build the standard? I'm honored :). And you're so right about that typo! I was so surprised that I couldn't find a lower value, but I took it for granted and wrote it down, errors and all, lol! – Abel Nov 3 '09 at 17:36
PS: I don't mind the simplification, I should roughly know what I'm doing (let's hope so). You've assessed that I'm on the right track and apparently I don't need to twiddle with the significand-bits only (which makes sense). The challenge is to find how rounding down and rounding up from this half-ulp goes (easy enough to get an exact "representation" of +0.5 ulp, but will that match the machine or implementation internals?) – Abel Nov 3 '09 at 17:44
It took a while, as researching this wasn't core business but more a side-project of my own. Accepting now because your answer was more then sufficient in the end. Thanks! – Abel Jan 14 '10 at 16:21

Python 3.1 just implemented something like this: see the changelog (scroll down a bit), bug report.

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