# Floating point comparison precision

Given 3 IEEE-754 floats a, b, c that are not +/-INF and not NaN and a < b, is it safe to assume that a - c < b - c? Or, can you give an example when this is incorrect?

Suppose a is approximately 0.00000000000000001, b is approximately 0.00000000000000002, and c is 1. Then ac and bc will both equal −1.

(That's assuming double-precision, a.k.a. 64-bit, values. For higher-precision values, you'll need to add some more zeroes.)

• @EricPostpischil: Thanks. I wrote my explanation too quickly, and there are some other things not-quite-right with it aside from what you point out. (For example, I went with a sort of "logical" sign of `1` or `-1` and a "logical" exponent that's a signed integer, but it might have made more sense to go with the actual sign bit of `0` or `1` and a bitwise exponent that you have to subtract `1023` from.) Ah, well. I think it's good enough for the purposes of this question, but I'll put some thought into how it might be made more accurate. (Or, feel free to edit it yourself.) Nov 18, 2012 at 16:20