XOR operation in C++

How does the XOR logical operator work on more than two values?

For instance, in an operation such as `1 ^ 3 ^ 7`?

``````0 0 0 1 // 1

0 0 1 1 // 3

0 1 1 1 // 7

__

0 1 0 1 // 5
``````

for some reason yields 0 1 0 1, where as it should have, as I thought, yielded: 0 1 0 0, since XOR is only true when strictly one of the operands is true.

• There's no "logical XOR" operator, only bitwise XOR.
– jrok
Sep 28, 2013 at 13:07
• "How does the XOR logical operator works on more than two values?" - the bitwise XOR operator is left-associative.
– user529758
Sep 28, 2013 at 13:11

Because of the operator precedence and because the `xor` is a binary operator, which in this case is left-to-right.

First `1 ^ 3` is evaluated

``````0 0 0 1 // 1

0 0 1 1 // 3
-------
0 0 1 0 // 2
``````

The result is 2, then this number is the first operand of the last xor operation (`2 ^ 7`)

``````0 0 1 0 // 2

0 1 1 1 // 7
-------
0 1 0 1 // 5
``````

The result is 5.

`1 ^ 3 ^ 7` is not a function of three arguments, it is: `(1 ^ 3) ^ 7` which equals `2 ^ 7` which equals `5`.

Though actually this `^` operator is associative: each bit in the result will be set if and only if an odd number of the operands had the bit set.

1. XOR works bitwise, XORing each position separately
2. XOR is commutative, so a^b = b^a
3. XOR is associative, so (a^b)^c = a^(b^c)

Using this, a human can count the number of ones in a given position and the result bit is set exactly for an odd number of ones in the given position of the operands.

Counting ones yields (0101)binary=5

• You may want to explain what each of those actually means and the implications thereof. Sep 28, 2013 at 13:10
• I don't think in the context of C++ (with operator overloading) XOR can be counted on to be associative, or commutative. Sep 29, 2013 at 15:19

The expression is parsed as `(1 ^ 3) ^ 7` so you first get

`````` 0001 ^ 0011
``````

which is `0010`. The rest is

`````` 0010 ^ 0111
``````

which is `0101`

^ is a binary operator. It doesn't work on all three numbers at once, i.e. it's (1^3)^7, which is:

1 ^ 3 == 2

2 ^ 7 == 5