Simplifying 4 NAND Gates Into 1 XOR Gate Boolean Algebra?

I am trying to understand with boolean algebra how using 4 NAND Gates can be equivalen to 1 XOR gate.

If we look at this picture from wikipedia http://en.wikipedia.org/wiki/XOR_gate#Alternatives

There is a schematic of the gate.

This is the large expression I came up with to express the schematic. Perhaps it is wrong and that may be my issue? But still I cannot see how to transform the equation into the XOR expression I expect.

I have: `!X!Y + X(!X!Y) + Y(!X!Y) + XY(!X!Y)`

I know XOR logic looks like this: `X!Y + !XY`.

Can anyone clear up my confusion?

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Your input does not look correct to me. How did you come up with that - can you show the steps you took from the wiki drawing to your function? – 500 - Internal Server Error Feb 21 '13 at 19:50
Okay where did the ors come from? – Tony Hopkinson Feb 21 '13 at 20:10

Your translation of the schematic on Wikipedia is a little bit off. I translated it into

``````!(!(A!(AB))!(B!(AB)))
``````

Notice that !(XY) and !X!Y are different and that the schematic does not have any or gates (so no `+` operators). From there we can simplify using various boolean logic:

``````(!(!(A!(AB))) + !(!(B!(AB))))
(A!(AB) + B!(AB))
(A(!A + !B) + B(!A + !B))
(A!B + B!A)
``````
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