Sabtu, 01 September 2012
Irabeka: sifat aljabar boolean
Irabeka: sifat aljabar boolean: Komutatif a + b = b + a a x b = b x a Ditributif a + (b x c) = (a + b) x (a + c) a x (b + c) = (a x b) + (a x c) Identitas a + 0 = a a x ...
sifat aljabar boolean
- Komutatif
a + b = b + a
a x b = b x a - Ditributif
a + (b x c) = (a + b) x (a + c)
a x (b + c) = (a x b) + (a x c) - Identitas
a + 0 = a
a x 1 = a - Komplemen
a + a' = 1
a x a' = 0 - Idempoten
a + a = a
a x a = a - Boundednes
a x 0 = 0
a + 1 = 1 - Absorbsi
a + (a x b) = a
a x (a + b) = a - Involusi
(a')' = a
0' = 1
1' = 0 - Asosiatif
(a + b) + c = a + (b + c)
(a x b) x c = a x (b x c) - De Morgan
(a + b)' = a' x b'
(a x b)' = a' + b'
sifat aljabar boolean
- Komutatif
a + b = b + a
a x b = b x a - Ditributif
a + (b x c) = (a + b) x (a + c)
a x (b + c) = (a x b) + (a x c) - Identitas
a + 0 = a
a x 1 = a - Komplemen
a + a' = 1
a x a' = 0 - Idempoten
a + a = a
a x a = a - Boundednes
a x 0 = 0
a + 1 = 1 - Absorbsi
a + (a x b) = a
a x (a + b) = a - Involusi
(a')' = a
0' = 1
1' = 0 - Asosiatif
(a + b) + c = a + (b + c)
(a x b) x c = a x (b x c) - De Morgan
(a + b)' = a' x b'
(a x b)' = a' + b'
sifat aljabar boolean
- Komutatif
a + b = b + a
a x b = b x a - Ditributif
a + (b x c) = (a + b) x (a + c)
a x (b + c) = (a x b) + (a x c) - Identitas
a + 0 = a
a x 1 = a - Komplemen
a + a' = 1
a x a' = 0 - Idempoten
a + a = a
a x a = a - Boundednes
a x 0 = 0
a + 1 = 1 - Absorbsi
a + (a x b) = a
a x (a + b) = a - Involusi
(a')' = a
0' = 1
1' = 0 - Asosiatif
(a + b) + c = a + (b + c)
(a x b) x c = a x (b x c) - De Morgan
(a + b)' = a' x b'
(a x b)' = a' + b'
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