# two's complement

As far as I know, the two's complement algo is:

1.Represent the decimal in binary.
2.Inverse all bits.
3.Add 1 to the last bit.

For the number `3`, which its representation is: `0000000000000011` the result of the two's complement would be `1111111111111101` which is `-3`.
So far so good. But for the number `2` which its representation is `0000000000000010` the result of the two's complement would be `1111111111111101`, which isn't 2 but -3.
What am I doing wrong?

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``````0...0010 // 2
1...1101 // Flip the bits
1...1110 // Add one
``````

It works for negative too:

``````1...1110 // -2
0...0001 // Flip the bits
0...0010 // Add one
``````
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Thank you, I had a mistake in the addition of the 1. –  Lior Dec 6 '12 at 1:31
@pst I don't know what you're saying –  James Dec 6 '12 at 1:32
I have another mini-question. What is the difference between my algorithm of negating a number and scanning the number from right to left and complementing all the bits after the first appearance of a 1? –  Lior Dec 6 '12 at 1:34
@Lior I'm not sure it would work but you could try it out with pen and paper. Even if it did I assume the circuitry required would be far more that a simple bit inversion and add, which is very quick. –  James Dec 6 '12 at 1:39
Ok, thank you :) If you want to read more about the "alternative conversion process" (as written in wikipedia) : en.wikipedia.org/wiki/Two%27s_complement –  Lior Dec 6 '12 at 1:44

For your code you might have needed to do 2's complement: i just wanted to throw this out there(a quicker way of getting a negative binary) :

2's complement is very useful for finding the value of a binary, however I thought of a much more concise way of solving such a problem(never seen anyone else publish it):

take a binary, for example: 1101 which is [assuming that space "1" is the sign] equal to -3.

using 2's complement we would do this...flip 1101 to 0010...add 0001 + 0010 ===> gives us 0011. 0011 in positive binary = 3. therefore 1101 = -3!

What I realized:

instead of all the flipping and adding, you can just do the basic method for solving for a positive binary(lets say 0101) is (23 * 0) + (22 * 1) + (21 * 0) + (20 * 1) = 5.

Do exactly the same concept with a negative!(with a small twist)

take 1101, for example:

for the first number instead of 23 * 1 = 8 , do -(23 * 1) = -8.

then continue as usual, doing -8 + (22 * 1) + (21 * 0) + (20 * 1) = -3

Hope that may help!

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What am I doing wrong?

Skipping step 3 for your second example (or misunderstanding it).

`1111111111111101` is ones' complement of `2` (i.e. result of step 1 and 2); you need to add 1 - not to the last bit (as in binary digit), but to the last result (as in, what you get from step 2).

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Thank you, I had a mistake in the addition of the 1. –  Lior Dec 6 '12 at 1:31