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
It cannot even compile for me... –  herohuyongtao Jan 13 at 13:36

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