# Why is decimal multiplication slightly inaccurate? [duplicate]

Why does this happen in Python:

``````>>>
>>> 483.6 * 3
1450.8000000000002
>>>
``````

I know this happens in other languages, and I'm not asking how to fix this. I know you can do:

``````>>>
>>> from decimal import Decimal
>>> Decimal('483.6') * 3
Decimal('1450.8')
>>>
``````

So what exactly causes this to happen? Why do decimals get slightly inaccurate when doing math like this?

Is there any specific reason the computer doesn't get this right?

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Obligatory link. I'll leave it to someone else to track down one of the many, many questions this is a duplicate to. –  Lattyware Jan 16 '13 at 22:17
@Lattyware nice link... –  nathan hayfield Jan 16 '13 at 22:18
See this explanation: effbot.org/pyfaq/… If you're doing things where you need accuracy (like in banking), you generally use two ints or two longs to represent the number. –  Erik Nedwidek Jan 16 '13 at 22:19
@Lattyware I sometimes wonder... How many of those that propagate the link have actually read through it? Further, how many of those have understood it? –  phant0m Jan 16 '13 at 22:29
Decimals don't. floating point numbers do. By definition they must have limited accuracy. –  gnibbler Jan 16 '13 at 22:30

## marked as duplicate by Aशwini चhaudhary, Zhenya, unutbu, phant0m, LattywareJan 16 '13 at 22:29

See the Python documentation on floating point numbers. Essentially when you create a floating point number you are using base 2 arithmetic. Just as 1/3 is .333.... on into infinity, so most floating point numbers cannot be exactly expressed in base 2. Hence your result.

The difference between the Python interpreter and some other languages is that others may not display these extra digits. It's not a bug in Python, just how the hardware computes using floating-point arithmetic.

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This suggests it wouldn't happen in base 10. That's simply not true. –  phant0m Jan 16 '13 at 22:31
@phant0m It does? He gives an example of it (1/3), so I don't really see the suggestion myself. –  Lattyware Jan 16 '13 at 22:33
@Lattyware I was judging from the second sentence: `Essentially when you create a floating point number you are using base 2 arithmetic.` It sounds like it's a peculiarity from base 2. That the base is 2 isn't really relevant to explain why there are certain numbers that can't be represented. –  phant0m Jan 16 '13 at 22:36

Computers can't represent every floating point number perfectly.

Basically, floating point numbers are represented in scientific notation, but in base 2. Now, try representing 1/3 (base 10) with scientific notation. You might try 3 * 10-1 or, better yet, 33333333 * 10-8. You could keep adding 3's, but you'd never have an exact value of 1/3. Now, try representing 1/10 in binary scientific notation, and you'll find that the same thing happens.

Computers store numbers as bits (in binary). Unfortunately, even with infinite memory, you cannot accurately represent some decimals in binary, for example `0.3`. The notion is a kin to trying to store `1/3` in decimal notation exactly.