# Why is sys.maxint < (sys.maxint - 100 + 0.01) in Python?

Why is sys.maxint < (sys.maxint - 100 + 0.01) in Python?

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On a system with 64-bit longs, sys.maxint is:

9223372036854775807      0x7fffffffffffffff

So sys.maxint - 100 is:

9223372036854775707      0x7fffffffffffff9b

Adding 0.01 forces this value to be rounded to double-precision floating point before the addition. The two closest values that are representable in double-precision are:

9223372036854774784      0x7ffffffffffffc00
9223372036854775808      0x8000000000000000

Because sys.maxint - 100 is closer to the second (larger) value, it rounds up. Adding 0.01 gives:

9223372036854775808.01   0x8000000000000000.028f5c28f5c...

which is not representable in double-precision, so it is rounded again, to:

9223372036854775808      0x8000000000000000

So the value of sys.maxint - 100 + 0.01 is actually larger than the value of sys.maxint. However, in many modern languages, comparison between an integer and a float forces the integer value to be converted to floating point before the comparison takes place; if this were the case in python, sys.maxint would be rounded up to the same value, and they would compare equal. It seems that this is not the case in Python. I'm not familiar with the details of python numerics, but this is an interesting curiosity of the language.

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You are right, assert float(sys.maxint) > (sys.maxint - 100 + 0.01) –  satoru Mar 26 '11 at 1:02
You're correct: Python goes out of its way to give correct results for mixed-type comparisons. Without this, Python containers (sets, dicts) would be in trouble, since the == relation is used to determine container membership. –  Mark Dickinson Mar 26 '11 at 10:16

This is probably due to loss of precision for very large floating point values. (the adding of 0.01 converts the right-hand-side to float).

Edit: I have tried to come up with an exact explanation of what happens here, but to no avail. So I posted a question about it.

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Precisely. See also the output of int(sys.maxint - 100 + 0.01) on 64-bit: 9223372036854775808L (instead of ...807L) –  Nicholas Knight Mar 25 '11 at 8:19
Except for Windows 64 bit machines where sys.maxint always is 2**32/2-1 because the long type is only 32 bits signed. –  Björn Lindqvist Mar 25 '11 at 8:25
@Space_C0wb0y, what do you mean by loose 11 bits of precision, are those 11 bits set to zero or some random bit string? –  satoru Mar 25 '11 at 9:48
@Saturo: I am not exactly sure (my explanation is more of a guess), but since the bits are just truncated, it is as if they were 0, so the result is lower than the actual number. –  Björn Pollex Mar 25 '11 at 9:51
@Satoru Logic: He meant lose, not loose. Those 11 bits can't be "set" to anything, they don't exist. You have 64 precision passengers to fit on a approx-53 precision-passenger bus. 11 passengers miss out. Those 11 bit positions in a float (still a 64-seat bus) are used for the exponent and sign bit. Note that the leading precision bit in a float is 1 by definition and thus doesn't need a seat. –  John Machin Mar 25 '11 at 10:01