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Expresión (A⊕B^C)^(B^C⊕(B⊕C))

El profesor se sorprenderá mucho al ver tu solución correcta😉

    Solución

    Ha introducido [src]
    (a⊕(b∧c))∧(b⊕c⊕(b∧c))
    $$\left(a ⊕ \left(b \wedge c\right)\right) \wedge \left(b ⊕ c ⊕ \left(b \wedge c\right)\right)$$

    Вы использовали:
    - Сложение по модулю 2 (Исключающее или).
    Возможно вы имели ввиду символ - Дизъюнкция (ИЛИ)?
    Посмотреть с символом ∨
    Solución detallada
    $$a ⊕ \left(b \wedge c\right) = \left(a \wedge \neg b\right) \vee \left(a \wedge \neg c\right) \vee \left(b \wedge c \wedge \neg a\right)$$
    $$b ⊕ c ⊕ \left(b \wedge c\right) = b \vee c$$
    $$\left(a ⊕ \left(b \wedge c\right)\right) \wedge \left(b ⊕ c ⊕ \left(b \wedge c\right)\right) = \left(a \vee b\right) \wedge \left(a \vee c\right) \wedge \left(b \vee c\right) \wedge \left(\neg a \vee \neg b \vee \neg c\right)$$
    Simplificación [src]
    $$\left(a \vee b\right) \wedge \left(a \vee c\right) \wedge \left(b \vee c\right) \wedge \left(\neg a \vee \neg b \vee \neg c\right)$$
    (a∨b)∧(a∨c)∧(b∨c)∧((¬a)∨(¬b)∨(¬c))
    Tabla de verdad
    +---+---+---+--------+
    | a | b | c | result |
    +===+===+===+========+
    | 0 | 0 | 0 | 0      |
    +---+---+---+--------+
    | 0 | 0 | 1 | 0      |
    +---+---+---+--------+
    | 0 | 1 | 0 | 0      |
    +---+---+---+--------+
    | 0 | 1 | 1 | 1      |
    +---+---+---+--------+
    | 1 | 0 | 0 | 0      |
    +---+---+---+--------+
    | 1 | 0 | 1 | 1      |
    +---+---+---+--------+
    | 1 | 1 | 0 | 1      |
    +---+---+---+--------+
    | 1 | 1 | 1 | 0      |
    +---+---+---+--------+
    FNDP [src]
    $$\left(a \wedge b \wedge \neg c\right) \vee \left(a \wedge c \wedge \neg b\right) \vee \left(b \wedge c \wedge \neg a\right)$$
    (a∧b∧(¬c))∨(a∧c∧(¬b))∨(b∧c∧(¬a))
    FNCD [src]
    $$\left(a \vee b\right) \wedge \left(a \vee c\right) \wedge \left(b \vee c\right) \wedge \left(\neg a \vee \neg b \vee \neg c\right)$$
    (a∨b)∧(a∨c)∧(b∨c)∧((¬a)∨(¬b)∨(¬c))
    FNC [src]
    Ya está reducido a FNC
    $$\left(a \vee b\right) \wedge \left(a \vee c\right) \wedge \left(b \vee c\right) \wedge \left(\neg a \vee \neg b \vee \neg c\right)$$
    (a∨b)∧(a∨c)∧(b∨c)∧((¬a)∨(¬b)∨(¬c))
    FND [src]
    $$\left(a \wedge b \wedge \neg a\right) \vee \left(a \wedge b \wedge \neg b\right) \vee \left(a \wedge b \wedge \neg c\right) \vee \left(a \wedge c \wedge \neg a\right) \vee \left(a \wedge c \wedge \neg b\right) \vee \left(a \wedge c \wedge \neg c\right) \vee \left(b \wedge c \wedge \neg a\right) \vee \left(b \wedge c \wedge \neg b\right) \vee \left(b \wedge c \wedge \neg c\right) \vee \left(a \wedge b \wedge c \wedge \neg a\right) \vee \left(a \wedge b \wedge c \wedge \neg b\right) \vee \left(a \wedge b \wedge c \wedge \neg c\right)$$
    (a∧b∧(¬a))∨(a∧b∧(¬b))∨(a∧b∧(¬c))∨(a∧c∧(¬a))∨(a∧c∧(¬b))∨(a∧c∧(¬c))∨(b∧c∧(¬a))∨(b∧c∧(¬b))∨(b∧c∧(¬c))∨(a∧b∧c∧(¬a))∨(a∧b∧c∧(¬b))∨(a∧b∧c∧(¬c))