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.
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.
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
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
