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i want to understand this: i have a dump of a table (a sql script file) from a database that use float 9,2 as default type for numbers. In the backup file i have a value like '4172.08'. I restore this file in a new database and i convert the float to decimal 20,5. Now the value in the field is 4172.08008 ...where come from the 008?? tnx at all

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Which version do you use ? –  iddqd Oct 17 '10 at 17:27
    
5.1.x (i have made some try with 3 different version and the 'mistake' is the same) –  Giovanni Bismondo Oct 17 '10 at 17:29

2 Answers 2

up vote 1 down vote accepted

This is the difference between float and decimal. Float is a binary type, and can't represent that value exactly. So when you convert to decimal (as expected, a decimal type), its not exactly the original value.

See http://floating-point-gui.de/ for some more information.

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Ok i understand the difference of the types ...but please, explain me how the conversion from float to decimal produce more information (the 008) then the origin (4172.08) –  Giovanni Bismondo Oct 17 '10 at 17:33
    
It's not the conversion from float to decimal that produces the false precision. It's the conversion from string ('4172.08') to float. –  Matthew Flaschen Oct 17 '10 at 17:47
    
If you do, e.g. SELECT float_col * 1.000000000000000 (where float_col is the float value), you can see this. –  Matthew Flaschen Oct 17 '10 at 17:50
    
ok i understand the problem in finish, thank you guys very much! –  Giovanni Bismondo Oct 17 '10 at 17:53

where come from the 008??

Short answer:

In order to avoid the float inherent precision error, cast first to decimal(9,2), then to decimal(20,5).

Long answer:

Floating point numbers are prone to rounding errors in digital computers. It is a little hard to explain without throwing up a lot of math, but lets try: the same way 1/3 represented in decimal requires an infinite number of digits (it is 1.3333333...), some numbers that are "round" in decimal notation have infinite number of digits in binary. Because this format is stored in binary and has finite precision, there is an implicit rounding error and you may experience funny things like getting 0.30000000000000004 as the result of 1.1 + 1.2.

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nice solutions ;) –  Giovanni Bismondo Oct 17 '10 at 17:53

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