Bitwise operation for add

Could you please help me figure out why the following expression is true: x + y = x ^ y + (x & y) << 1

I am looking for some rules from the bitwise logic to explain this mathematical equivalent.

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Do the bitwise operations on paper for some known values, to see what happens. –  Joachim Pileborg Jan 13 at 13:06
Google for "full adder". –  Oli Charlesworth Jan 13 at 13:08
It cannot even compile for me... –  herohuyongtao Jan 13 at 13:36
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2 Answers

It's like solving an ordinary base 10 addition problem `955 + 445`, by first adding all the columns individually and throwing away carried `1`s:

``````    955
445
-----
390
``````

Then finding all the columns where there should be a carried `1`:

``````    955
445
-----
101
``````

Shifting this and adding it to the original result:

``````   390
+ 1010
------
1400
``````

So basically you're doing addition but ignoring all the carried `1`s, and then adding in the carried ones after, as a separate step.

In base 2, XOR (`^`) correctly performs addition when either of the bits is a `0`. When both bits are `1`, it performs addition without carry, just like we did in the first step above.

`x ^ y` correctly adds all the bits where `x` and `y` are not both `1`:

``````   1110111011
^  0110111101
-------------
1000000110      (x ^ y)
``````

`x & y` gives us a `1` in all the columns where both bits are a 1. These are exactly the columns where we missed a carry:

``````   1110111011
&  0110111101
-------------
0110111001      (x & y)
``````

Of course when you carry a `1` when doing addition you shift it left one place, just like when you add in base 10.

``````   1000000110      (x ^ y)
+ 01101110010    + (x & y) << 1
-------------
10101111000
``````
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`x + y` is not equivalent to `x ^ y + (x & y) << 1`

However, your expression above will evaluate to true for most values since `=` means assignment and non-zero values mean true. `==` will test for equality.

EDIT
`x ^ y + ((x & y) << 1)` is correct with parentheses. The AND finds where a carry would happen and the shift carries it. The XOR finds where and addition would happen with no carry. Adding the two together unifies the result.

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You're actually right. It should be `(x ^ y) + ((x & y) << 1)`. The parens matter. –  harold Jan 13 at 16:39
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