Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Is there a way to get python to print extremely large longs in scientific notation? I am talking about numbers on the order of 10^1000 or larger, at this size the standard print "%e" % num fails.

For example:

Python 2.6.2 (release26-maint, Apr 19 2009, 01:56:41) 
[GCC 4.3.3] on linux2
Type "help", "copyright", "credits" or "license" for more information.
>>> print "%e" % 10**100
>>> print "%e" % 10**1000
Traceback (most recent call last):
  File "", line 1, in 
TypeError: float argument required, not long

It appears that python is trying to convert the long to a float and then print it, is it possible to get python to just print the long in scientific notation without converting it to a float?

share|improve this question

2 Answers 2

up vote 13 down vote accepted

gmpy to the rescue...:

>>> import gmpy
>>> x = gmpy.mpf(10**1000)
>>> x.digits(10, 0, -1, 1)

I'm biased, of course, as the original author and still a committer of gmpy, but I do think it eases tasks such as this one that can be quite a chore without it (I don't know a simple way to do it without some add-on, and gmpy's definitely the add-on I'd choose here;-).

share|improve this answer
Not that it matter, in practical terms, but to push the understanding, do you have an insight into why the implicit conversion [to float] is not attempted on longs that are too long but does take place for the ones that fit in a float ? –  mjv Oct 7 '09 at 5:18
In principle, convert to string and do some slicing etc, probably not that evil - but evil enough, certainly. –  Steve314 Oct 7 '09 at 5:19
@mjv - Python tries to treat numbers as numbers rather than as various distinct types - ie treating them as much the same as possible. It's part of a trend over a number of versions. In some respects, it's something I personally disagree with - particularly WRT changes in the behaviour of the division operator. –  Steve314 Oct 7 '09 at 5:24
@mjv, Python's floats respect (to the extent the underlying platform does;-) the IEEE standard for floating point; in particular, there's a limit on their magnitude, and 10**1000 is larger than the limit. @Steve314, the OP's problem here is exactly the reverse: longs are unlimited-size, floats aren't, so they're not "all numbers"; gmpy does offer (inter alia) unbounded-size (and unbounded-prespecified-precision) binary floating point numbers (Python's stdlib decimal module also does, for decimal floating point numbers, btw). –  Alex Martelli Oct 7 '09 at 5:30
Thanks Alex! I wish I didn't have to download a third-party module just to do this. Then again, GMPy looks interesting, are standard longs not implemented with GMP? I wonder if it might speed up my algorithms which produce these large numbers. Maybe I'll try it out. –  sligocki Oct 7 '09 at 6:13

No need to use a third party library. Here's a solution in Python3, that works for large integers.

def ilog(n, base):
    Find the integer log of n with respect to the base.

    >>> import math
    >>> for base in range(2, 16 + 1):
    ...     for n in range(1, 1000):
    ...         assert ilog(n, base) == int(math.log(n, base) + 1e-10), '%s %s' % (n, base)
    count = 0
    while n >= base:
        count += 1
        n //= base
    return count

def sci_notation(n, prec=3):
    Represent n in scientific notation, with the specified precision.

    >>> sci_notation(1234 * 10**1000)
    >>> sci_notation(10**1000 // 2, prec=1)
    base = 10
    exponent = ilog(n, base)
    mantissa = n / base**exponent
    return '{0:.{1}f}e{2:+d}'.format(mantissa, prec, exponent)
share|improve this answer
It doesn't seem to work for negative numbers. –  Theo Belaire Jun 5 '13 at 14:45
Add if n < 0: return "-" + sci_notation(-n, prec=prec) after the """ line. –  JoshDM Jun 5 '13 at 14:54

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.