# Calculating the nearest float value [duplicate]

Possible Duplicate:
How to convert floats to human-readable fractions?

I have a floating point value say `0.595781` which I would like to get as close to as possible using a quotient that uses only integer numerator and denominator values which are both limited in range from `0 to 1023 (10-bits)`.

The intuitive way to do this (at least to start off) would be use `595/1000` which provides `0.555` a fairly close match (the error is `0.040781`).

But there is a better match of `597/1002` which is `0.595808` (an error of `0.0000273`). There may be better matches also. I came to the second quotient by playing about with the numerator and denominator values close to their original values in an irrerative way.

I then wondered if there was a way given all the criteria to get the numerator and denominator integer values directly.

In case your wondering the two integer values are required to setup the baud rate generator for an `Infineon XE167G device`.

Any ideas would be appreciated. Regards

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## marked as duplicate by Daniel Fischer, Eric Postpischil, ЯegDwight, Baz, Alexey FrunzeSep 27 '12 at 22:07

why would 595/1000 be intuitive when simple rounding leads you to 596/1000 being closer? –  TJD Sep 27 '12 at 17:07
What you want is the best rational approximation for the denominator d=1024. This is answered in the duplicate linked by Borgleader. –  Douglas B. Staple Sep 27 '12 at 20:49
For best precision you use the highest demoninator available (for values from 0 to 1023 this is 512) which is a power of two. Then the first numerator is round(512*value). This guarantees a precision which is always less than 1/512 because the floating-point value is binary. To correct the denominator for better precision you calculate a correction term = (numerator/value)-denominator which is added to your denominator. –  Thorsten S. Sep 28 '12 at 11:09
To correct the denominator for better precision you calculate a correction term = (numerator/value)-denominator which is added to your denominator. Example: 0.595781*512 = 305. correction = (305/0.59..)-512 = -0.06 (no correction). So you get 305/512 which is 0.595703 which is only marginally worse than 0.595808 –  Thorsten S. Sep 28 '12 at 11:18
305/512 gives an approximation but 339/569 gives a closer one. The problem I am trying to solve is how to get the best approximation given the denominator and numerator range constraints. The reference to a previous post (that closed this thread) is not appropriate as it stands because it does not limit the numerator range. –  user1704021 Sep 28 '12 at 12:01
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If you are using `16-bit` integers, you could just have `numerator = 59578` and denominator just hold a power factor of `10`, for instance `5`. So the answer would be `59578/(10^5)`.
With this approach you would at least keep `4` places of precision. Just a thought...