# How to calculate decimal digits of precision based on the number of bits?

I am learning about floating point formats (IEEE). In the single precision floating point format ,it is mentioned that the mantissa has 24 bits and so it has 6 1/2 decimal digits of precision (as the per the book "understanding the machine") , and 7.22 decimal digits of precision.

I don't understand how the decimal digits of precision is calculated. Can somebody please enlighten me ?

With 24 bits, assuming one bit is reserved for the sign, then the largest decimal number you can represent is 2^23-1=8388607. That is, you can get 6 digits and sometimes a 7th. This is often expressed as "6 1/2 digits". If the 24 bits are representing an unsigned number, then the maximum value you can store is 2^24-1=16,777,215, or 7 and a fraction digits.

When someone quotes you a number with explicit decimal places like 7.22 decimal digits, what they're doing is taking the log (base 10) of the maximum value. So log(16777115)=7.22.

In general, the number of decimal digits you'll get from a given number of bits is:

``````d=log[base 10](2^b)
``````

where b is the number of bits and d is the number of decimal digits. Then:

``````d=b * log(2)
d~=b * .3010
``````

So 24 bits gives 24 * .3010 = 7.224

• @jay, shoudnt this be log(16777215) instead of log(16777115) ? May 8, 2014 at 15:58
• @ShmilTheCat Yes. Typo.
– Jay
May 8, 2014 at 20:55
• I just wanted to add that your point about the sign bit is invalid. The mantissa is 24 bits and the sign bit is not part of the mantissa. Actually, it is [sign_bit, exponent, mantissa] if you look at the bits. See the standard here. The sign bit is always present as part of the IEEE 754 standard, so the number is always signed. In conclusion, all 24 bits are used to represent the mantissa, so log[10](2^24)=7.22 as mentioned in the question. Feb 6, 2015 at 6:03
• @westy92 I was speaking of integers. Yes, with floats some number of bits are allocated to the exponent. How many affects the range of numbers that we can record, but not the number of places of precision. For those unaware, the bits assigned to hold actual digits, as opposed to an exponent or sign, are called the "mantissa", and that's what matters for our purposes here.
– Jay
Feb 6, 2015 at 14:18
• @westy92 Oh, looking back I see that the question specifically asked about IEEE floats. So yes, the sign bit is not included in the 24.
– Jay
Feb 6, 2015 at 19:09