Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

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!


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]


Correct = 8283518.0991650000000000000
Wrong   = 8283510.5860060000000000000
share|improve this question
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

     @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

share|improve this answer
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

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.