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 the ceil of a high precision Decimal in python?

>>> import decimal;
>>> decimal.Decimal(800000000000000000001)/100000000000000000000
Decimal('8.00000000000000000001')
>>> math.ceil(decimal.Decimal(800000000000000000001)/100000000000000000000)
8.0

math rounds the value and returns non precise value

share|improve this question
    
I'm new to python, just started out yesterday in fact. Stumbled upon this problem in my second practice program (the first was of course the obligatory "print 'Hello, World!';"). so, I'm finding it difficult to judge the best answer to this. The decimal.Context solution by Matthew Flaschen worked in my particular case. But I'd like others to upvote the best solution (also would be helpful for newbies like me if you can explain why a certain approach works better) and I'll come back and accept. –  Gunjan May 10 '10 at 8:50
add comment

7 Answers 7

up vote 4 down vote accepted
x = decimal.Decimal('8.00000000000000000000001')
with decimal.localcontext() as ctx:
    ctx.prec=100000000000000000
    ctx.rounding=decimal.ROUND_CEILING
    y = x.to_integral_exact()
share|improve this answer
1  
This is good, but there's no need to change the context precision here. to_integral_exact also takes a rounding argument, so you can avoid messing with the context altogether. –  Mark Dickinson May 9 '10 at 10:04
add comment

The most direct way to take the ceiling of a Decimal instance x is to use x.to_integral_exact(rounding=ROUND_CEILING). There's no need to mess with the context here. Note that this sets the Inexact and Rounded flags where appropriate; if you don't want the flags touched, use x.to_integral_value(rounding=ROUND_CEILING) instead. Example:

>>> from decimal import Decimal, ROUND_CEILING
>>> x = Decimal('-123.456')
>>> x.to_integral_exact(rounding=ROUND_CEILING)
Decimal('-123')

Unlike most of the Decimal methods, the to_integral_exact and to_integral_value methods aren't affected by the precision of the current context, so you don't have to worry about changing precision:

>>> from decimal import getcontext
>>> getcontext().prec = 2
>>> x.to_integral_exact(rounding=ROUND_CEILING)
Decimal('-123')

By the way, in Python 3.x, math.ceil works exactly as you want it to, except that it returns an int rather than a Decimal instance.

share|improve this answer
add comment

You can do this using the precision and rounding mode option of the Context constructor.

ctx = decimal.Context(prec=1, rounding=decimal.ROUND_CEILING)
ctx.divide(decimal.Decimal(800000000000000000001), decimal.Decimal(100000000000000000000))

EDIT: You should consider changing the accepted answer.. Although the prec can be increased as needed, to_integral_exact is a simpler solution.

share|improve this answer
    
perfect :) --- completing character limit --- –  Gunjan May 8 '10 at 23:01
2  
@Gunjan, if it's perfect, why not accept it?! –  Alex Martelli May 9 '10 at 5:09
    
@Alex sorry had to leave before 6 minute timeout. Thanks for the reminder –  Gunjan May 9 '10 at 9:45
    
-1. This doesn't generalize well; it only happens to work in this case because the result is in the range [1, 10]. Try the same calculation with Decimal(123)/Decimal(10), for example, and you'll get a result of Decimal('2E+1'). –  Mark Dickinson May 9 '10 at 10:14
add comment
>>> decimal.Context(rounding=decimal.ROUND_CEILING).quantize(
...   decimal.Decimal(800000000000000000001)/100000000000000000000, 0)
Decimal('9')
share|improve this answer
    
Note that this solution has problems for Decimal instances with large value: e.g., if you try c.quantize(decimal.Decimal('1e100'), 1) with your context c, you'll get an InvalidOperation exception. –  Mark Dickinson May 9 '10 at 10:34
add comment
def decimal_ceil(x):
    int_x = int(x)
    if x - int_x == 0:
        return int_x
    return int_x + 1
share|improve this answer
add comment

I'm sure there are library functions to do this (as Ignacio Vazquez-Abrams points out), but since you haven't accepted any answer, I got the impression that you wanted to see how it's done - your own version of ceil. So here is one possible solution:

def ceil(d):
    return [eval("int(d) + [0,1][int(bool(d-int(d)))]"), eval("int(d)")][int(d<0)]

Hope this helps

share|improve this answer
    
int() and bool() are not library functions?? A simpler a priori explanation for not accepting any answer is that the OP has been on SO for only 13 days and this is the first question (and so may need telling/reminding to accept answers) and it was asked only 5 hours ago and the OP may be waiting for those in other TZs to reply or may now be asleep and will check answers at breakfast-time ... a fortiori however the OP commented "Perfect" to Matthew's answer (the first answer) which was rather nuts'n'boltsy so I'd be inferring that he's already seen "how it's done". –  John Machin May 9 '10 at 5:17
    
This fails for negative numbers: ceil(-2.3) --> -1. –  Mark Dickinson May 9 '10 at 10:37
add comment

Just use potency to make this. import math

def lo_ceil(num, potency=0): # Use 0 for multiples of 1, 1 for multiples of 10, 2 for 100 ...
      n = num / (10.0 ** potency)
      c = math.ceil(n)
      return c * (10.0 ** potency)

lo_ceil(8.0000001, 1) # return 10
share|improve this answer
add comment

Your Answer

 
discard

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.