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I'm currently having some issues with the math.floor() function in python. I am attempting to compute the following value:


This is producing the answer


Which I know is not right. I think this has something to do with Python's ability to do arithmetic with very large numbers -- can anyone help out?


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4 Answers 4

up vote 1 down vote accepted

Avoid using floating point numbers. Python only uses 53 bits of precision for floating point numbers, but integers can grow arbitrarily large:

>>> int((3710402416420168191 + 3710402416420167681) / 2)
>>> (3710402416420168191 + 3710402416420167681) // 2

// is floor division, so it'll return the integral part of the result without resorting to floats (which is what math.floor returns).

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perhaps point OP towards the decimal-module‌​? –  Fredrik Pihl Jun 12 '13 at 22:38

I can't reproduce your results, in my machine this:


Is returning this, which is correct for the given precision:


Maybe the error happens when you try to print the above result? which clearly has lost some precision, because math.floor() returns a float, not an integer.

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Python can perform integer arithmetic with arbitrary precision, but is limited in the number of significant digits with which to represent the floating point average. If the two numbers are close enough together, you may have better luck with

x = 3710402416420168191
y = 3710402416420167681
math.floor( x - (x-y)/2.0 )

Far fewer significant digits are necessary to hold the difference of x and y than their sum.

UPDATE: on closer inspection, the problem is not with the math, but with converting the resulting large integer to a float, which cannot represent the integer precisely. The integer result


is correct, but passing that value to math.floor results in the poorly rounded value.

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The mean of those two numbers is larger than the number of decimal digits that can be faithfully represented by a float:

 import sys
 print sys.float_info


 sys.float_info(max=1.7976931348623157e+308, max_exp=1024, max_10_exp=308, min=2.2250738585072014e-308, min_exp=-1021, min_10_exp=-307, dig=15, mant_dig=53, epsilon=2.220446049250313e-16, radix=2, rounds=1)

dig=15 means that only 15 significant digits can be reliably represented in a float. See the docs here for more info.

As others have pointed out, there is no such problem if you use integers and floor division:



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