# Find the number of digits in the fractional part of a Decimal number in python

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

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

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