Boolean Function Output

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zawminoo

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For 1 input(X) = 4 output (X,X_bar, 1 ,0)
For 2 input(X,Y) = 16 output (X,.....,X+Y,......,XY,.....)
For 3 input (X,Y,Z) = 256 output
I would like to know this 256 output..
Please help me.
 

Code:
(NIL) (A) (B) (C)
( A B ) ( A C ) ( B C )
( A (B)) ( A (C)) ( B (C)) (B (A)) (C (A)) (C (B))
((A)(B)) ((A)(C)) ((B)(C))
( A=B ) ( A=C ) ( B=C )
(A  B C ) (A  B (C)) (A  C (B)) ( B C (A))
(A (B)(C)) (B (A)(C)) (C (A)(B)) ((A)(B)(C))
( A ( B C )) ( B ( A C )) ( C ( A B ))
( A ( B (C))) ( B ( A (C))) ( C ( A (B)))
( A ( C (B))) ( B ( C (A))) ( C ( B (A)))
( A ((B)(C))) ( B ((A)(C))) ( C ((A)(B)))
( A   B=C ) ( B   A=C ) ( C   A=B )
( A   (B=C) ) ( B   (A=C) ) ( C   (A=B) )
((A)( B C )) ((B)( A C )) ((C)( A B ))
((A)( B (C))) ((B)( A (C))) ((C)( A (B)))
((A)( C (B))) ((B)( C (A))) ((C)( B (A)))
((A)((B)(C))) ((B)((A)(C))) ((C)((A)(B)))
((A)   B=C ) ((B)   A=C ) ((C)   A=B )
((A) (B=C) ) ((B) (A=C) ) ((C) (A=B) )
((A (B)) ( C (A))) ((B (A)) ( C (B))) ((C (A)) ((B)(C)))
((A (B)) ((A)(C))) ((B (A)) ((B)(C))) ((C (B)) ((A)(C)))
((A (C)) ( B (A))) ((B (C)) ( C (A)))
((A (C)) ( C (B))) ((B (C)) ((A)(B)))
((A (C)) ((A)(B)))
(( A B ) (C (A)(B))) (( A B ) ((A)(B)(C)))
(( A (B)) (B C (A))) (( A (B)) ( B (A)(C)))
(( B (A)) (A C (B))) (( B (A)) ( A (B)(C)))
(((A)(B)) (A B C )) (((A)(B)) ( A B (C)))
(( A C ) (B (A)(C))) (( A C ) ((A)(B)(C)))
(( A (C)) (B C (A))) (( A (C)) ( C (A)(B)))
(( C (A)) (A B (C))) (( C (A)) ( A (B)(C)))
(((A)(C)) (A B C )) (((A)(C)) ( A C (B)))
(( B C ) (A (B)(C))) (( B C ) ((A)(B)(C)))
(( B (C)) (A C (B))) (( B (C)) ( C (A)(B)))
(((B)(C)) (A B C )) (((B)(C)) ( B C (A)))
(( C (B)) (A B (C))) (( C (B)) ( B (A)(C)))
((A (B)) (A (C)) ( B (C))) ((B (A)) (B (C)) ((A)(C)))
((A (B)) (A (C)) ((B)(C))) ((C (A)) (C (B)) ((A)(B)))
((A B C ) ((A)(B)(C))) ((A B (C)) (C (A)(B)))
((A C (B)) ( B (A)(C))) ((A (B)(C)) (B C (A)))
((A B (C)) ( C (A B ))) ((A C (B)) ( B (A C ))) ((B C (A)) ( A (B C )))
((A B (C)) ((A)(B (C)))) ((A C (B)) ((A)(C (B)))) ((B C (A)) ((B)(C (A))))
((A B (C)) ((B)(A (C)))) ((A C (B)) ((C)(A (B)))) ((B C (A)) ((C)(B (A))))
((A (B)(C)) ((A)((B)(C))))
((B (A)(C)) ((B)((A)(C))))
((C (A)(B)) ((C)((A)(B))))
(((B)(C)) (B (A)(C)) (C (A)(B)))
((A B C) (A (B)(C)) (B (A)(C))) ((A B (C)) (A C (B)) (B C (A)))
((A B C) (A (B)(C)) (C (A)(B))) ((A B (C)) (A C (B)) ((A)(B)(C)))
((A B C) (B (A)(C)) (C (A)(B))) ((A B (C)) (B C (A)) ((A)(B)(C)))
((A C (B)) (B C (A)) ((A)(B)(C))) ((A (B)(C)) (B (A)(C)) (C (A)(B)))
((A B (C)) (A C (B)) (B C (A)) ((A)(B)(C)))
NOTE: The symmetries of these 128 forms have not been developed rigorously
in the above display.

2 variable and 3 variable boolean functions
 
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