# Why is two's complement used to represent negative numbers?

I'm just curious if there's a reason why in order to represent -1 in binary, two's complement is used: flipping the bits and adding 1?

-1 is represented by 11111111 (two's complement) rather than (to me more intuitive) 10000001 which is binary 1 with first bit as negative flag.

Disclaimer: I don't rely on binary arithmetic for my job!

-
ITT — hivemind. –  Anton Tykhyy Jul 14 '09 at 13:23
FWIW, your "intuitive" method of using a sign-bit is ocassionally used -- for example, most computers use a sign-bit when representing floating point numbers. –  Adisak Oct 21 '09 at 18:59
@Adisak It's called signed magnitude –  Cole Johnson Mar 23 '13 at 3:08
I've always associated sign-and-magnitude representation with integers since Floating Point numbers contain three components: a sign, an exponent, and a mantissa (often with an implicit '1'). But I guess it's easy enough to treat the exponent and mantissa as magnitude as long as one realizes they are not strictly linear. –  Adisak Apr 2 '13 at 15:30

It's done so that addition doesn't need to have any special logic for dealing with negative numbers. Check out the article on Wikipedia.

Say you have two numbers, 2 and -1. In your "intuitive" way of representing numbers, they would be `0010` and `1001`, respectively (I'm sticking to 4 bits for size). In the two's complement way, they are `0010` and `1111`. Now, let's say I want to add them.

Two's complement addition is very simple. You add numbers normally and any carry bit at the end is discarded. So they're added as follows:

``````  0010
+ 1111
=10001
``````

`0001` is 1, which is what we expected the result of "2+(-1)" to be.

``````  0010
+ 1001
= 1011
``````

Which is -3, right? Simple addition doesn't work in this case. You need to note that one of the numbers is negative and use a different algorithm if that's the case.

For this "intuitive" storage method, subtraction is a different operation than addition, requiring additional checks on the numbers before they can be added. Since you want the most basic operations (addition, subtraction, etc) to be as fast as possible, you need to store numbers in a way that lets you use the simplest algorithms possible.

Additionally, in the "intuitive" storage method, there are two zeroes:

``````0000  "zero"
1000  "negative zero"
``````

Which are intuitively the same number but have two different values when stored. Every application will need to take extra steps to make sure that non-zero values are also not negative zero.

There's another bonus with storing ints this way, and that's when you need to extend the width of the register the value is being stored in. With two's complement, storing a 4-bit number in a 8-bit register is a matter of repeating its most significant bit:

``````    0001 (one, in four bits)
00000001 (one, in eight bits)
1110 (negative two, in four bits)
11111110 (negative two, in eight bits)
``````

It's just a matter of looking at the sign bit of the smaller word and repeating it until it pads the width of the bigger word.

With your method you would need to clear the existing bit, which is an extra operation in addition to padding:

``````    0001 (one, in four bits)
00000001 (one, in eight bits)
1010 (negative two, in four bits)
10000010 (negative two, in eight bits)
``````

You still need to set those extra 4 bits in both cases, but in the "intuitive" case you need to clear the 5th bit as well. It's one tiny extra step in one of the most fundamental and common operations present in every application.

-
cool thanks. that's been bugging me for a while –  Ray Jul 14 '09 at 13:22
Did you actually type this up in two minutes?? The original question was asked 8 minutes ago, and this answer was posted 6 minutes ago. Are you truly the Fastest Gun in the West? –  Nathan Fellman Jul 14 '09 at 13:25
@Nathan Fellman: Two's complement math isn't hard. I wrote most of it within my 5-minute edit window. –  Welbog Jul 14 '09 at 13:29
I agree. 2's complement works. But how did we arrive at it in the first place? If suppose I need to arrive at this notation, what would the thought process be. I think arriving at 2's complement has to be more than just luck, isn't it? –  Lazer Apr 18 '10 at 17:15
Also, why is there no 2's complement counterpart for floats? –  Lazer Apr 18 '10 at 17:26

Wikipedia says it all:

The two's-complement system has the advantage of not requiring that the addition and subtraction circuitry examine the signs of the operands to determine whether to add or subtract. This property makes the system both simpler to implement and capable of easily handling higher precision arithmetic. Also, zero has only a single representation, obviating the subtleties associated with negative zero, which exists in ones'-complement systems.

In other words, adding is the same, wether or not the number is negative.

-

Two's complement allows addition and subtraction to be done in the normal way (like you wound for unsigned numbers). It also prevents -0 (a separate way to represent 0 that would not be equal to 0 with the normal bit-by-bit method of comparing numbers).

-

this is to simplify sums and differences of numbers. a sum of a negative number and a positive one codified in 2's complements is the same as summing them up in the normal way.

-

Two's complement allows negative and positive numbers to be added together without any special logic.

10000001 (-1)
+00000001 (1)
you get
10000010 (-2)

11111111 (-1)
+00000001 (1) you get
00000000 (0)

The same is true for subtraction.

Also, if you try to subtract 4 from 6 (two positive numbers) you can 2's complement 4 and add the two together 6 + (-4) = 6 - 4 = 2

This means that subtraction and addition of both positive and negative numbers can all be done by the same circuit in the cpu.

-

The usual implementation of the operation is "flip the bits and add 1", but there's another way of defining it that probably makes the rationale clearer. 2's complement is the form you get if you take the usual unsigned representation where each bit controls the next power of 2, and just make the most significant term negative.

Taking an 8-bit value a7 a6 a5 a4 a3 a2 a1 a0

The usual unsigned binary interpretation is:
27a7 + 26a6 + > 25a5 + 24a4 + 23a3 +22a2 + 21a1 + 20a0
11111111 = 128 + 64 + 32 + 16 + 8 + 4 + 2 + 1 = 255

The two's complement interpretation is:
-27a7 + 26a6 + > 25a5 + 24a4 + 23a3 +22a2 + 21a1 + 20a0
11111111 = -128 + 64 + 32 + 16 + 8 + 4 + 2 + 1 = -1

None of the other bits change meaning at all, and carrying into a7 is "overflow" and not expected to work, so pretty much all of the arithmetic operations work without modification (as others have noted). Sign-magnitude generally inspect the sign bit and use different logic.

-

In two's complement

• Subtracting doesn't change too
• Multiplication too!

Division does require a different mechanism.

All these are true because two's complement is just normal modular arithmetic, where we choose to look at some numbers as negative by subtracting the modulo.

-

You can watch Professor Jerry Cain from Stanford explaining the two's complement, in the second lecture (the explanation regarding the 2's complement starts around 13:00) in the series of lectures called Programming Paradigms available to watch from Standford's YouTube channel. Here's the link to the lecture series: http://www.youtube.com/view_play_list?p=9D558D49CA734A02.

-

Two's complement is used because it is simpler to implement in circuitry and also does not allow a negative zero.

If there are x bits, two's complement will range from +(2^x/2+1) to -(2^x/2). One's complement will run from +(2^x/2) to -(2^x/2), but will permit a negative zero (0000 is equal to 1000 in a 4 bit 1's complement system).

-

Well, your intent is not really to reverse all bits of your binary number. It is actually to subtract each its digit from 1. It's just a fortunate coincidence that subtracting 1 from 1 results in 0 and subtracting 0 from 1 results in 1. So flipping bits is effectively carrying out this subtraction.

But why are you finding each digit's difference from 1? Well, you're not. Your actual intent is to compute the given binary number's difference from another binary number which has the same number of digits but contains only 1's. For example if your number is 10110001, when you flip all those bits, you're effectively computing (11111111 - 10110001).

This explains the first step in the computation of Two's Complement. Now let's include the second step -- adding 1 -- also in the picture.

Add 1 to the above binary equation:

11111111 - 10110001 + 1

What do you get? This:

100000000 - 10110001

This is the final equation. And by carrying out those two steps you're trying to find this, final difference: the binary number subtracted from another binary number with one extra digit and containing zeros except at the most signification bit position.

But why are we hankerin' after this difference really? Well, from here on, I guess it would be better if you read the Wikipedia article.

-

We perform only addition operation for both addition and subtraction. We add the second operand to the first operand for addition. For subtraction we add the 2's complement of the second operand to the first operand.

With a 2's complement representation we do not need separate digital components for subtraction—only adders and complementers are used.

-