EJEMPLO TABLA DE VERDAD
1.
¬ (p ^ q)
2.
(p à q) ^ p
3.
(p ßà p) v q
4.
(p ^ q) v q
5.
(p ^ q v r)
Análisis
2n=2 = 22 = 4
1. ¬ (p ^ q)
|
p
|
q
|
p ^ q
|
¬ (p ^ q)
|
|
0
0
1
1
|
0
1
0
1
|
0
0
0
1
|
1
1
1
0
|
2. (p à q) ^ p
|
p
|
q
|
(p à q)
|
(p à q) ^ p
|
|
0
0
1
1
|
0
1
0
1
|
1
1
0
1
|
0
0
0
1
|
3. (p ßà p) v q
|
p
|
q
|
(p ßà p)
|
(p ßà p) v p
|
|
0
0
1
1
|
0
1
0
1
|
1
1
1
1
|
1
1
1
1
|
*Este es un ejemplo de tautología, es decir que, es una
verdad total o verdad absoluta.
4. (p ^ q) v q
|
p
|
q
|
(p ^ q)
|
(p ^ q) v q
|
|
0
0
1
1
|
0
1
0
1
|
0
0
0
1
|
0
1
0
1
|
Análisis
2n=3 = 23 = 8
5. (p ^ q v r)
|
p
|
q
|
r
|
p ^ q
|
(p ^ q) v r
|
|
0
0
0
0
1
1
1
1
|
0
0
1
1
0
0
1
1
|
0
1
0
1
0
1
0
1
|
0
0
0
0
0
0
1
1
|
0
1
0
1
0
1
0
1
|
EJERCICIO
1.
(a ^ b v ¬ c)
2.
¬ (a ^ ¬ a)
3.
¬ (a v b)
4.
(a ßà b) v (aßà b)
5.
(a XOR b) à a
1. (a ^ b v ¬ c)
|
a
|
b
|
c
|
¬c
|
a ^ b
|
(a ^ b v ¬ c)
|
|
0
0
0
0
1
1
1
1
|
0
0
1
1
0
0
1
1
|
0
1
0
1
0
1
0
1
|
1
0
1
0
1
0
1
0
|
0
0
0
0
0
0
1
1
|
1
0
1
0
1
0
1
1
|
2. ¬ (a ^ ¬ a)
|
a
|
¬a
|
(a ^ ¬ a)
|
¬ (a ^ ¬ a)
|
|
0
1
|
1
0
|
0
0
|
1
1
|
3. ¬ (a v b)
|
a
|
b
|
(a v b)
|
¬ (a v b)
|
|
0
0
1
1
|
0
1
0
1
|
0
1
1
1
|
1
0
0
0
|
4. (a ßà b) v (a ßà b)
|
a
|
b
|
(a ßà b)
|
(aßàb)v(a ßàb)
|
|
0
0
1
1
|
0
1
0
1
|
1
0
0
1
|
1
0
0
1
|
5. (a XOR b) à a
|
a
|
b
|
(a v b)
|
(a v b) à a
|
|
0
0
1
1
|
0
1
0
1
|
0
1
1
0
|
1
0
1
1
|
