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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
1.000000e+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?

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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)
'1.e1000'

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;-).

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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)
    '1.234e+1003'
    >>> sci_notation(10**1000 // 2, prec=1)
    '5.0e+999'
    """
    base = 10
    exponent = ilog(n, base)
    mantissa = n / base**exponent
    return '{0:.{1}f}e{2:+d}'.format(mantissa, prec, exponent)
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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

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