# Two's complement binary multiplication

I'm confused about where I'm going wrong in the following problem using binary multiplication with two's complement.

I am trying to multiply `12 * -6`.

We know that `12 = 01100` and `-6 = 11010`, and sign-extended we get `00000 01100 * 11111 11010`. I tried multiplying these two numbers as follows:

``````     1111111010
x 0000001100
------------
0000000000
0000000000
1111111010
+ 1111111010
---------------
10111110111000
``````

This is definitely not `-72`, so what am I doing wrong?

-
You gotta keep extending the sign. – Hot Licks Feb 3 '14 at 3:03
Ie, you should end up with 11111110111000 – Hot Licks Feb 3 '14 at 3:04
So there is sign extension that takes place on the product even after the multiplicand and multiplier were sign extended? – Kvass Feb 3 '14 at 3:08
@user2485710 This is 2's complement, not sign magnitude. – Kvass Feb 3 '14 at 3:10
Technically, you should end up with a result that is twice as long as the incoming operands (though I'm thinking that one bit of significance isn't used). (I haven't thought much about this stuff since 1974, when I did the multiply/divide algorithms for an RCA/NASA computer.) – Hot Licks Feb 3 '14 at 3:46

Drop the digits from the left that don't fit in the data type:

``````10111110111000
``````

truncates to

``````1110111000
``````

You'll find that this is indeed `-72`.

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Aha. Got it, thanks! – Kvass Feb 3 '14 at 3:09