Sr Examen
Expresión cb∨¬(¬bc⇒b∨c)⇔c
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Solución
Ha introducido
[src]
c⇔((b∧c)∨(¬((c∧(¬b))⇒(b∨c))))
$$c ⇔ \left(\left(b \wedge c\right) \vee \left(c \wedge \neg b\right) \not\Rightarrow \left(b \vee c\right)\right)$$
Solución detallada
$$\left(c \wedge \neg b\right) \Rightarrow \left(b \vee c\right) = 1$$
$$\left(c \wedge \neg b\right) \not\Rightarrow \left(b \vee c\right) = \text{False}$$
$$\left(b \wedge c\right) \vee \left(c \wedge \neg b\right) \not\Rightarrow \left(b \vee c\right) = b \wedge c$$
$$c ⇔ \left(\left(b \wedge c\right) \vee \left(c \wedge \neg b\right) \not\Rightarrow \left(b \vee c\right)\right) = b \vee \neg c$$
$$\left(c \wedge \neg b\right) \not\Rightarrow \left(b \vee c\right) = \text{False}$$
$$\left(b \wedge c\right) \vee \left(c \wedge \neg b\right) \not\Rightarrow \left(b \vee c\right) = b \wedge c$$
$$c ⇔ \left(\left(b \wedge c\right) \vee \left(c \wedge \neg b\right) \not\Rightarrow \left(b \vee c\right)\right) = b \vee \neg c$$
Tabla de verdad
+---+---+--------+ | b | c | result | +===+===+========+ | 0 | 0 | 1 | +---+---+--------+ | 0 | 1 | 0 | +---+---+--------+ | 1 | 0 | 1 | +---+---+--------+ | 1 | 1 | 1 | +---+---+--------+