# Exclusive OR Associativity Boolean Algebra Proof [closed]

Prove `(A ⊕ B) ⊕ C = A ⊕ (B ⊕ C)` using boolean algebra. I made the truth tables and found the sum of products, but couldnt figure how to show their equal.

I then tried doing

``````(a xor b) xor c  (a' - is NOT(A)/inverse)
(a'b + ab') ⊕ C
c' (a'b + ab') + c[(a'b + ab')']
``````

Couldn't go from there,

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Put both sides into disjunctive normal form. –  Raymond Chen Oct 10 '12 at 2:29

## closed as off topic by Charlie Martin, Adrian Faciu, oers, Martijn Pieters, Aziz ShaikhOct 10 '12 at 8:28

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`A^B` = `(AB'+A'B)`

`(AB)'` = `(A'+B')`

`(A^B)^C`

= `(AB'+A'B)C' + (AB'+A'B)'C`

= `(AB'C'+A'BC')+((AB')'(A'B)')C`

= `(AB'C'+A'BC')+(A'+B)(A+B')C`

= `(AB'C'+A'BC')+(A'(A+B')+B(A+B'))C`

= `(AB'C'+A'BC')+(A'B' + AB)C`

= `(AB'C'+A'BC'+A'B'C + ABC)`

= `A(B'C'+BC)+A'(BC'+B'C)`

= `A(B'C'+BC)+A'(B^C)` (1)

`(B^C)'`

=`(BC'+B'C)'`

= `(BC')'(B'C)'`

= `(B'+C)(B+C')`

= `(B'C'+BC)` (2)

From `(2)`, the `(1)` = `A(BC'+B'C)' + A'(B^C)` = `A(B^C)' + A'(B^C)` = `A^(B^C)` #

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Makes sense except for (B^C)', where does the negation of the B ^ C come from? –  George Oct 10 '12 at 4:11
@Eric, look at `(1)`, now that we have A, we have A', we have (B^C), we need to find where is `(B^C)'`, it may be the `(B'C'+BC)`, but that is not very obvious, so why not just to expand `(B^C)'` to see what we'll get? –  Marcus Oct 10 '12 at 4:51

Firstly define `XOR` and `XNOR`:

``````  A^B   = AB' + A'B     ... (1)
(A^B)' = AB  + A'B'    ... (2)
``````

Now expand `(A^B)C` using (1) and (2):

`````` (A^B)C = (A^B)C' + (A^B)'C
= (AB' + A'B)C' + (AB + A'B')C
= AB'C' + A'BC' + ABC + A'B'C
``````

Collect terms and simplify:

``````        = A(B'C' + BC) + A'(BC' + B'C)
= A(B^C)' + A'(B^C)
= A^(B^C)
``````

QED

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