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I am a bit confused about a 2-digit decimal gaining an extra 0.000000000000000001 (or so) after going into and out of a database.

This is what I've done: (Rails 3.2.8)

Created a migration:

class CreateItems < ActiveRecord::Migration
  def change
    create_table :items do |t|
      t.column :price, :decimal, :precision => 16, :scale => 2
    end
  end
end

Created a model:

class Item < ActiveRecord::Base
end

Then:

$ rails c
>> i = Item.new
>> i.price = 9.46
>> i.save
>> Item.first.price
=> #<BigDecimal:46b3768,'0.9460000000 000001E1',27(45)>

It's a SQLite database, and it all looks ok in there:

$ rails db
>> select * from items;
1|9.46

Note that the only number I've noticed this happening with is 9.46. Where has the extra 0.00000000000001 come from?


Edit I understand that floating point representations of some numbers are not possible without small errors. But why does Item.first.price not equal BigDecimal.new('9.46')? Is SQLite storing a float as opposed to an integer and a number of times it should be divided by 10 (that's what I'd expect from a decimal column)? Or is there some gotcha in ActiveRecord I'm not aware of with retrieving the value from the DB? See below:

$ rails c
>> decimal = BigDecimal.new('9.46')
>> Item.first.price == decimal
=> false
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Floating point does stuff like that. Read this: docs.oracle.com/cd/E19957-01/806-3568/ncg_goldberg.html –  Qsario Oct 9 '12 at 22:05
    
I suppose my assumption that the Ruby BigDecimal type didn't use floating point arithmetic was false (which I probably should have been able to work out on my own, actually) –  hdgarrood Oct 9 '12 at 22:21
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3 Answers 3

up vote 1 down vote accepted

I am not very familiar with ruby but İnstead of using

i.price = 9.46

Try using

i.price = BigDecimal.new('9.46')
share|improve this answer
    
But the float 9.46 will surely have been converted to a decimal when it was saved to the database? –  hdgarrood Oct 9 '12 at 22:16
    
Yes, but since the conversion will be from a float value, it will not be exactly 9.46 –  alikox Oct 9 '12 at 22:27
    
Surely it's not possible to store 9.460000000000001 in the price column in the DB, which has been defined to hold two digits? –  hdgarrood Oct 9 '12 at 22:29
    
That really depends on the datastore implementation. –  alikox Oct 9 '12 at 22:38
    
Using i.price = BigDecimal.new('9.46') has the same effect as i.price = 9.46 if the object is saved and then retrieved from the DB –  hdgarrood Oct 9 '12 at 22:53
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9.46 is not exactly representable as an IEEE double-precision floating point number. This has a great many consequences, but means here that you're getting the value that is exactly representable and which is closest to what you put in.

If it's vital you get '9.46' out, store it in a column with TEXT affinity (and be aware that you're storing a string then, not a “number”).

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I also hear on the grapevine that SQLite4 may have decimal arithmetic to lessen the effect of this class of problem, but it won't affect this exact one, as that's caused by the fact that it takes an infinite number of binary floating point digits to represent 9.46 exactly (just as it takes an infinite number of decimal digits to represent ⅓ exactly). –  Donal Fellows Oct 9 '12 at 22:13
    
Does SQLite3 not have decimal columns then? –  hdgarrood Oct 9 '12 at 22:18
    
I'm unaccepting as I've now realised what the question I want to ask is and edited accordingly; I hope that's not bad SE etiquette. –  hdgarrood Oct 9 '12 at 22:50
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I would recommend reading this article: What Every Computer Scientist Should Know About Floating Arithmetic

The tl;dr version of the article...

Squeezing infinitely many real numbers into a finite number of bits requires an approximate representation. Although there are infinitely many integers, in most programs the result of integer computations can be stored in 32 bits. In contrast, given any fixed number of bits, most calculations with real numbers will produce quantities that cannot be exactly represented using that many bits. Therefore the result of a floating-point calculation must often be rounded in order to fit back into its finite representation. This rounding error is the characteristic feature of floating-point computation.

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Seen links to that a few times; i suppose it's time I actually do read it. Thanks –  hdgarrood Oct 9 '12 at 22:24
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