Seja a expressão: S = ( A + B + C ) . ( A ¯ + B ¯ + C ) {\displaystyle S=(A+B+C).({\bar {A}}+{\bar {B}}+C)}
Simplificação:
Lista de exercício álgebra booleana.
S 1 = ( A + B + C ) . ( A ¯ + B + C ¯ ) {\displaystyle S_{1}=(A+B+C).({\bar {A}}+B+{\bar {C}})}
S 2 = ( A C ¯ + B + D ¯ ) + C ( A C D ¯ ) {\displaystyle S_{2}=({\overline {{\overline {AC}}+B+D}})+C({\overline {ACD}})}
S 3 = ( ( A + B ) . C ¯ ) + ( D ( C + B ) ¯ ) {\displaystyle S_{3}=({\overline {(A+B).C}})+({\overline {D(C+B)}})}
S 4 = ( A ¯ + B ¯ + C ¯ ) . ( A + B + C ¯ ) {\displaystyle S_{4}=({\bar {A}}+{\bar {B}}+{\bar {C}}).(A+B+{\bar {C}})}
S 5 = A ¯ . B ¯ . C + A ¯ . B . C + A ¯ . B . C ¯ + A . B . C + A . B C ¯ {\displaystyle S_{5}={\bar {A}}.{\bar {B}}.C+{\bar {A}}.B.C+{\bar {A}}.B.{\bar {C}}+A.B.C+A.B{\bar {C}}}
S = ( A + B ¯ ) {\displaystyle S=({\overline {A+B}})}
S = A . B {\displaystyle S=A.B\,}
S = A ⊕ B {\displaystyle S=A\oplus B\,}
S = A ¯ {\displaystyle S={\bar {A}}\,}
S = A + B {\displaystyle S=A+B\,}
S = ( B ¯ + C ) . ( B + C ) {\displaystyle S=({\bar {B}}+C).(B+C)}
S = B ¯ C D + B ¯ C D ¯ + B C ¯ D ¯ + B C ¯ D {\displaystyle S={\bar {B}}CD+{\bar {B}}C{\bar {D}}+B{\bar {C}}{\bar {D}}+B{\bar {C}}D}
S = A ¯ B C D ¯ + A B C D + A B C D ¯ + A B ¯ C D ¯ + A B ¯ C D {\displaystyle S={\bar {A}}BC{\bar {D}}+ABCD+ABC{\bar {D}}+A{\bar {B}}C{\bar {D}}+A{\bar {B}}CD}
S = ( A B C ¯ ¯ ) . ( A + B ¯ ¯ ) {\displaystyle S=({\overline {AB{\bar {C}}}}).({\overline {A+{\bar {B}}}})}
S = ( ( A B C ¯ ) + ( A B ¯ C ) ¯ ) {\displaystyle S=({\overline {(AB{\bar {C}})+(A{\bar {B}}C)}})}
S = ( A ¯ + B ¯ ¯ ) + ( ( A + C ¯ ) . ( A ¯ + B ) ) ¯ {\displaystyle S=({\overline {{\bar {A}}+{\bar {B}}}})+({\overline {(A+{\bar {C}}).({\bar {A}}+B))}}}