# Are there any Bitwise Operator Laws?

Thinking in terms of Algebraic laws, I was wondering if there are any official guide lines which exist in the realm of bit manipulations, similar to Algebra.

Algebraic Example

`a - b =/= b - a`

Let `a = 7` and `b = 5`

• `a - b = 2`
• `b - a = -2`

Let `a = 10` and `b = 3`

• `a - b = 7`
• `b - a = -7`

Thus `if a > b`, `b - a` will be the negative equivalent to `a - b`. Because of this, we can say

`|a - b| = |b - a|`.

Where `|x|` denotes the absolute value of `x`.

Bitwise Example

`a | b =/= a + b`

``````      00001010 = 10
OR  00000101 = 5
-----------------
00001111 = 15
``````

Note the unsigned byte manipulation: `10 | 5 = 15`, which is synonymous with `10 + 5 = 15`

However, if both `a` and `b` equal 5 and we `OR` them, the result would be 5, because `a = b`, which means we're just comparing the same exact bits with each other, thus resulting in nothing new.

Likewise, if `b = 7`, `a = 10` and we `OR` them we'll have 15. This is because

``````    00001010 = 10
OR 00000111 = 7
-----------------
00001111 = 15
``````

So, we can effectively conclude that `a | b =/= a + b`.

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This one is a must have: books.google.ch/… –  Macmade Oct 6 '12 at 23:11
This contains most of the useful things you can do with bitwise operators: graphics.stanford.edu/~seander/bithacks.html –  copy Oct 6 '12 at 23:15
Thank you. If either of you post an answer I'll gladly accept :) –  zeboidlund Oct 7 '12 at 18:13
hacker's delight, is a great book to have also –  Mhd.Tahawi Oct 1 '13 at 21:29