# Does XNOR of three variable equals XOR of same three variables

I came across following excerpt:

$(x'y'+xy)'z'+(x'y'+xy)z=x\oplus y\oplus z$

What I see is left hand side is XNOR of $x,y$ and on right, $z$ and I get XOR of of $x,y$ and $z$ !!! In other word,

$XNOR(XNOR(x,y),z)=XOR(XOR(x,y),z)$

Somehow I am surprised by the result, as I didnt came across this earlier, no text stated this explicitly and was unexpected. It was unexpected because, I knew some other equalities and inequalities stated below, so was never thought of existence of above equality.

$XNOR(x,y)=NOT(XOR(x,y))$ $NAND(NAND(x,y),z)\neq AND(AND(x,y),z)$ $NOR(NOR(x,y),z)\neq AND(OR(x,y),z)$

Q1. Am I interpreting it correct as XNORs of three variables equals XOR of same three variables?
Q2. If yes, can someone shed more light about why such relationship is not true for other gates? Is just that their definition does not permit such relationship? Or Is it beacause ExOR is not basic gate, while AND and OR are?

PS: Sorry for naive, possibly stupid question.

The full excerpt:

$(x'y'+xy)'z'+(x'y'+xy)z$
$(x'y')'(xy)'z'+x'y'z+xyz$
$(x+y)(x'+y')z'+x'y'z+xyz$
$xy'z'+x'yz'+x'y'z+xyz$
$=x\oplus y\oplus z$

XOR is addition modulo 2, and XNOR computes the sum modulo 2 of its inputs and 1. Since $$(x+y+1)+z+1 \equiv x+y+z \pmod{2},$$ We see that XORing three variables is the same as XNORing them. The same holds for any odd number of variables. When XNORing an even number of variables, you get the negation of their XOR.