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Nächste Seite: /media/sda-magnetic/david/Dokumente-15/fernuni-hagen/cs-i-ii/old-cs-2-03/fsm-21-06-09/automat13.txt Aufwärts: elektrotechnik 02/11/2026 Vorherige Seite: /media/sda-magnetic/david/Dokumente-15/fernuni-hagen/cs-i-ii/old-cs-2-03/fsm-21-06-09/automat11.txt

/media/sda-magnetic/david/Dokumente-15/fernuni-hagen/cs-i-ii/old-cs-2-03/fsm-21-06-09/automat12.txt 


        b a x   b a y
0       0 0 0   0 0 1
1       0 0 1   0 1 0
2       0 1 0   1 1 1
3       0 1 1   0 0 1
4       1 0 0   1 1 0
5       1 0 1   1 0 0
6       1 1 0   1 0 1
7       1 1 1   0 1 0


        b a x   b
0       0 0 0   0
1       0 0 1   0
2       0 1 0   1
3       0 1 1   0
4       1 0 0   1
5       1 0 1   1
6       1 1 0   1
7       1 1 1   0

        b a x   a
0       0 0 0   0
1       0 0 1   1
2       0 1 0   1
3       0 1 1   0
4       1 0 0   1
5       1 0 1   0
6       1 1 0   0
7       1 1 1   1

        b a x   y
0       0 0 0   1
1       0 0 1   0
2       0 1 0   1
3       0 1 1   1
4       1 0 0   0
5       1 0 1   0
6       1 1 0   1
7       1 1 1   0




        b a x   b
2       0 1 0   1
4       1 0 0   1
5       1 0 1   1
6       1 1 0   1

        b a x   a
1       0 0 1   1
2       0 1 0   1
4       1 0 0   1
7       1 1 1   1

        b a x   y
0       0 0 0   1
2       0 1 0   1
3       0 1 1   1
6       1 1 0   1




        b a x   b
Gruppe 1
2       0 1 0   1
4       1 0 0   1
Gruppe 2
5       1 0 1   1
6       1 1 0   1

        b a x   a
Gruppe 1
1       0 0 1   1
2       0 1 0   1
4       1 0 0   1
Gruppe 2
7       1 1 1   1

        b a x   y
Gruppe 0
0       0 0 0   1
Gruppe 1
2       0 1 0   1
Gruppe 2
3       0 1 1   1
6       1 1 0   1




        b a x   b
Gruppe 1
2       0 1 0   1
4       1 0 0   1
Gruppe 2
5       1 0 1   1
6       1 1 0   1


2;6     - 1 0
4;5     1 - 0

b := (a and not x) or (b and not x)

        b a x   a
Gruppe 1
1       0 0 1   1
2       0 1 0   1
4       1 0 0   1
Gruppe 2
7       1 1 1   1

a := (not b and not a and x) or (not b and a and not x) or (b and not a and not x) or (b and a and x)

        b a x   y
Gruppe 0
0       0 0 0   1
Gruppe 1
2       0 1 0   1
Gruppe 2
3       0 1 1   1
6       1 1 0   1

0;2     0 - 0
2;3     0 1 -
2;6     - 1 0

y := (not b and not x) or (not b and a) or (a and not x)



b := (a and not x) or (b and not x)
a := (not b and not a and x) or (not b and a and not x) or (b and not a and not x) or (b and a and 
x)
y := (not b and not x) or (not b and a) or (a and not x)