# Can someone explain this floating-point behavior?

Inspired by this question, I was trying to find out what exactly happens there (my answer was more intuitive, but I cannot exactly understand the why of it).

I believe it comes down to this (running 64 bit Python):

``````>>> sys.maxint
9223372036854775807
>>> float(sys.maxint)
9.2233720368547758e+18
``````

Python uses the IEEE 754 floating-point representation, which effectively has 53 bits for the significant. However, as far as I understand it, the significant in the above example would require 57 bits (56 if you drop the implied leading 1) to be represented. Can someone explain this discrepancy?

-
Remember, floating point numbers in Python are stored in binary, not decimal. –  Gabe Mar 25 '11 at 11:38
@Gabe. Exactly: what you see is not what you get. float(sys.maxint) is a float, stored in binary internally, whose value is exactly 2**63, or sys.maxint + 1, or to be exact, 9223372036854775808.0. What's displayed when you type `float(sys.maxint)` is merely a decimal approximation to that floating-point value. Python never prints more than 17 significant digits for the `repr` of a floating-point value; to print the exact value here would require 19 significant digits. –  Mark Dickinson Mar 25 '11 at 14:40

Perhaps the following will help clear things up:

``````>>> hex(int(float(sys.maxint)))
'0x8000000000000000L'
``````

This shows that `float(sys.maxint)` is in fact a power of 2. Therefore, in binary its mantissa is exactly `1`. In IEEE 754 the leading `1.` is implied, so in the machine representation this number's mantissa consists of all zero bits.

In fact, the IEEE bit pattern representing this number is as follows:

``````0x43E0000000000000
``````

Observe that only the first three nibbles (the sign and the exponent) are non-zero. The significand consists entirely of zeroes. As such it doesn't require 56 (nor indeed 53) bits to be represented.

-

You're wrong. It requires 1 bit.

``````>>> (9.2233720368547758e+18).hex()
'0x1.0000000000000p+63'
``````
-
Very funny. That single 1 bit isn't much use without all the other zeros. –  David Heffernan Mar 25 '11 at 11:11
@David: Sure, but they're all zeros, and can remain so as far as the horizon and until the end of time. –  Ignacio Vazquez-Abrams Mar 25 '11 at 11:12
@David: What's the difference between `1` and `1.000000000000000`? –  Tim Pietzcker Mar 25 '11 at 11:12
Hmm, I guess this is a case where less precision would be better - using fewer bits would erase the discrepancy. Not very practical, though. –  Tom Zych Mar 25 '11 at 11:13