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Given a Decimal number in python how can I find the number of digits past the decimal point?

assert digits(Decimal('1.2345')) == 4
assert digits(Decimal('1000'))   == 0
assert digits(Decimal('1.00'))   == 2
assert digits(Decimal('1E+5'))   == 0
assert digits(Decimal('1.2E+5')) == 0
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What if it have infinite digits after decimal point? such as 0.3333... –  Jiaming Lu May 28 '13 at 14:38
I'm not sure infinite digits after a decimal point is possible with the Decimal class. –  BlackVegetable May 28 '13 at 14:40
Decimal(1) / 3 == Decimal('0.3333333333333333333333333333'). There will be many digits but that does not mean anything., –  Jiaming Lu May 28 '13 at 14:41
I thought the precision limit would force the issue, is that not true? –  BlackVegetable May 28 '13 at 14:42
OK, even if not the infinite case, Decimal(1.2) will result in Decimal('1.1999999999999999555910790149937383830547332763671875') –  Jiaming Lu May 28 '13 at 14:43

2 Answers 2

I'll just outline a possible algorithm, assuming you start with a string.

  • Starting from the left, find decimal point. Count digits between it and either an 'E' or the end of the string. If there is no decimal point, the count is zero.
  • Parse out the value following 'E' and convert to integer. If there is no 'E', that's zero.
  • Subtract the second from the first of the two above values; the maximum of that and zero is the result. So '2E-2' would have two decimal places, '1.2E+5' would have none, and the rather silly '0.02E2' would have none.
  • As a degenerate case, zero itself would probably have zero decimal positions. As for infinity and any other special values, I don't have a strong opinion whether that's zero decimal places or not.
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Seems like this would work, but it feels "hacky". Also, I am starting with Decimal not a string, so I would have to convert it to a string just to count the digits. –  user27478 May 28 '13 at 15:00
A legitimate point. I'm not an expert with the Decimal API, but my fear is that any evaluation you might do on the object itself would be about as time-expensive as just converting to string and then counting digits... and far more labor-expensive up front. –  wberry May 28 '13 at 15:15
Also, I think this algorithm doesn't work for '1.2E+5'. Wouldn't we get, 5-1 = 4 or am I misunderstanding something? –  user27478 May 28 '13 at 15:20
You got it backwards. It would be 1 - 5 = -4. You should add one more step to the algorithm: if the answer is negative, return 0. –  morningstar May 28 '13 at 15:30
@morningstar Thank you, fixed final step. –  wberry May 28 '13 at 15:33
up vote 2 down vote accepted

After a bit of experimentation, this seems to work correctly:

def digits(n):
    return max(0,-n.as_tuple().exponent)
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What about NaN, +Infinity, -Infinity, subnormal decimals? –  J.F. Sebastian May 28 '13 at 16:40
NaN, +Infinity, -Infinity and other special values raise an exception. This wasn't by design, but it makes sense as the number of fractional digits is undefined in these cases. –  user27478 May 29 '13 at 6:20
subnormal value has an integer exponent. It seems your method works as is with subnormal values. To be consistent with the decimal module, you could return zero on TypeError (for NaN, etc) depending on how you use the result later. btw, this should be the accepted answer (the tick on the left). –  J.F. Sebastian May 29 '13 at 11:35

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