# T-SQL Decimal Multiplication

MSDN says about precision and scale of decimal multiplicatuion result:

• The result precision and scale have an absolute maximum of 38. When a result precision is greater than 38, the corresponding scale is reduced to prevent the integral part of a result from being truncated.

So when we execute this:

``````DECLARE @a DECIMAL(18,9)
DECLARE @b DECIMAL(19,9)

set @a = 1.123456789
set @b = 1

SELECT @a * @b
``````

the result is 1.12345689000000000 (9 zeros) and we see that it is not truncated because 18 + 19 + 1 = 38 (up limit).

When we raise precision of @a to 27 we lose all zeros and the result is just 1.123456789. Going futher we proceed with truncating and get the result being rounded. For example, raising precision of @a to 28 results in 1.12345679 (8 digits).

The interesting thing is that at some point, with precision equal to 30, we have 1.123457 and this result won't change any futher (it stops being truncated).

31, 32 and up to 38 results in the same. How could this be explained?

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I've just come up with a guess: maybe it's done in order to prevent users from losing their decimals (digits after a comma) completely when using sum() function. It always returns decimal(38, s) and wouldn't give any adequate result (in sense of getting non-integer value) after multipling on any decimal with the same non-zero s (or even s - 1 when s >= 2). But 6 digits being "reserved" for this case still look rather surprising. Maybe some documentation on this subject? –  Ilya Jul 8 '11 at 15:28