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Please have a look at the code below and explain to me why there is a deviance in the final results. Note that the difference is the introduction of the brackets in the second calculation. Thanks!

Code:

DECLARE  @A decimal(38,19) = 7958011.98
DECLARE  @B decimal(38,19) = 10409029441
DECLARE  @C decimal(38,19) = 10000000000

DECLARE  @Z1 decimal(38,19)
DECLARE  @Z2 decimal(38,19)


SET @Z1 = @A * @B / @C
SET @Z2 = @A * (@B / @C)

SELECT  @Z1 AS [Correct], 
        @Z2 AS [Wrong]

Results:

Correct = 8283518.0991650000000000000
Wrong   = 8283510.5860060000000000000
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And the result of (@A * @B) / @C? –  Oded Jan 7 '13 at 13:26
    
Possible duplicate of T-SQL Decimal Division Accuracy. This is very well documented on MSDN: msdn.microsoft.com/en-us/library/ms190476.aspx. –  gbn Jan 7 '13 at 13:27
    
@Oded: It will be the same as Z1. –  Daniel Hilgarth Jan 7 '13 at 13:27
    
@DanielHilgarth - Yes. Trying to get the OP to think a bit. –  Oded Jan 7 '13 at 13:28
    
@Oded: I don't follow. Mathematically, they are the same. Furthermore, (B / C) has less than 19 decimal digits, so that shouldn't be an issue either. The answer to this question is not obvious. –  Daniel Hilgarth Jan 7 '13 at 13:31

1 Answer 1

The intermediate datatypes are different because of this MSDN article

That is, (@B / @C) evaluated first, follows rules like this. The intermediate datatype then affects the multiplication by @A

You can see the intermediate and final types here (before assigning to a decimal(38,19) type

SELECT
     @A * @B,        -- decimal (x, 6)
     @A * @B / @C,   -- decimal (x, 6)
     (@B / @C),      -- decimal (x, 6)
     @A * (@B / @C)  -- decimal (x, 6)

So, instead of 1.0409029441 you get 1.040902 for your 2nd math

Note, your 1st is wrong too. It is actually 8283518.099165070318

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What would be the intermediate datatype in this concrete case? If I understand the MSDN article correctly, it should be something like DECIMAL(96, 58), way enought to hold the result. –  Daniel Hilgarth Jan 7 '13 at 13:35
    
@DanielHilgarth: added –  gbn Jan 7 '13 at 13:36
    
Thanks. How do you reach these values? the scale for divisions is max(6, s1 + p2 + 1) - in our case max(6, 38 + 19 + 1) => max(6, 58) => 58 –  Daniel Hilgarth Jan 7 '13 at 13:38
    
@DanielHilgarth: (96,58) will be scaled back to (38,0). However, SQL Server seems to ensure a minimum scale of 6. Will look for reference, but this is implied by the max(6,...) bit. Edit: blogs.msdn.com/b/sqlprogrammability/archive/2006/03/29/… –  gbn Jan 7 '13 at 13:49
    
Ah, so when the scale or precision is above the allowed maximum, it won't be scaled back to the allowed maximum but to zero (or 6, via the max)? Pretty counterintuitive. –  Daniel Hilgarth Jan 7 '13 at 13:51

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