COPE-01 Digital Logic.indd
14
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e
.g
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(a
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“1
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an
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“
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rg
an
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&
P
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E
xe
cu
ti
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2
02
1
15
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ch
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!
12
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2
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L
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9
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2
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im
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o
f
4
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ch
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1
:
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L
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gi
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u
p
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9
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R
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fo
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av
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16
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ch
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L
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u
p
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9
6
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im
m
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ty
p
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1
3
o
f
4
8
1
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ch
ap
te
r
1
:
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L
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u
p
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9
6
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M
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b
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10
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2
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2
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w
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Z
im
m
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h
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A
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U
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f
4
8
1
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ch
ap
te
r
1
:
“D
ig
it
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L
o
gi
c”
u
p
t
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ag
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9
6
)
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s
ta
rt
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w
it
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a
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gh
t
…
A
n
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p
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2
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o
f
4
8
1
(
ch
ap
te
r
1
:
“D
ig
it
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L
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gi
c”
u
p
t
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p
ag
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9
6
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C
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m
b
in
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Fu
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ci
b
le
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q
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to
p
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re
f
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s:
t
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a
re
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fo
r
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b
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in
p
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ts
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o
gi
c
Fu
n
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L
o
g
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ci
b
le
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q
u
iv
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n
t
to
p
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re
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u
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ct
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n
s:
t
h
e
re
a
re
n
o
s
ta
te
s!
IF
t
h
e
f
u
n
ct
io
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i
s
co
m
b
in
at
io
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al
t
h
e
n
t
h
e
re
i
s
o
n
ly
o
n
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o
u
tp
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t
fo
r
an
y
co
m
b
in
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io
n
o
f
in
p
u
ts
,
e
.g
. t
h
e
f
u
n
ct
io
n
c
an
b
e
w
ri
tt
e
n
o
u
t
as
a
t
ru
th
t
ab
le
:
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b
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u
tp
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19
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2
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2
1
U
w
e
R
.
Z
im
m
er
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h
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A
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st
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li
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N
at
io
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n
iv
er
si
ty
p
ag
e
1
9
o
f
4
8
1
(
ch
ap
te
r
1
:
“D
ig
it
al
L
o
gi
c”
u
p
t
o
p
ag
e
9
6
)
C
o
m
b
in
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Fu
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re
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ci
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u
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h
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a
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n
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s
ta
te
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IF
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h
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f
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i
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f
in
p
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,
e
.g
. t
h
e
f
u
n
ct
io
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c
an
b
e
w
ri
tt
e
n
o
u
t
as
a
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le
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b
c
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u
tp
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m
in
te
rm
s
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b
c
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/
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b
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32
D
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L
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2
0
2
1
U
w
e
R
.
Z
im
m
er
, T
h
e
A
u
st
ra
li
an
N
at
io
n
al
U
n
iv
er
si
ty
p
ag
e
3
2
o
f
4
8
1
(
ch
ap
te
r
1
:
“D
ig
it
al
L
o
gi
c”
u
p
t
o
p
ag
e
9
6
)
En
co
d
in
g
A
ss
u
m
in
g
a
t
yp
e
c
an
h
av
e
7
d
if
fe
re
n
t
va
lu
e
s,
m
an
y
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rm
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o
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a
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u
m
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1-
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it
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b
it
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it
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ra
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e
Ev
e
n
p
ar
it
y
H
am
m
in
g
(7
,4
)
H
am
m
in
g
(3
,1
)
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in
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1
S
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.
29
D
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L
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g
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©
2
0
2
1
U
w
e
R
.
Z
im
m
er
, T
h
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A
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st
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li
an
N
at
io
n
al
U
n
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er
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ty
p
ag
e
2
9
o
f
4
8
1
(
ch
ap
te
r
1
:
“D
ig
it
al
L
o
gi
c”
u
p
t
o
p
ag
e
9
6
)
C
o
m
b
in
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io
n
al
L
o
gi
c
Fu
n
ct
io
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s
T
h
e
l
o
g
ic
e
q
u
iv
al
e
n
t
to
p
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f
u
n
ct
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n
s:
t
h
e
re
a
re
n
o
s
ta
te
s!
IF
t
h
e
f
u
n
ct
io
n
i
s
co
m
b
in
at
io
n
al
t
h
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n
t
h
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re
i
s
o
n
ly
o
n
e
o
u
tp
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t
fo
r
an
y
co
m
b
in
at
io
n
o
f
in
p
u
ts
,
e
.g
. t
h
e
f
u
n
ct
io
n
c
an
b
e
w
ri
tt
e
n
o
u
t
as
a
t
ru
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le
:
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im
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h
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to
m
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b
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in
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26
D
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it
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L
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©
2
0
2
1
U
w
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R
.
Z
im
m
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, T
h
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A
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N
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p
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6
o
f
4
8
1
(
ch
ap
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r
1
:
“D
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it
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L
o
gi
c”
u
p
t
o
p
ag
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9
6
)
D
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33
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2
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1
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.
Z
im
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3
3
o
f
4
8
1
(
ch
ap
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r
1
:
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it
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L
o
gi
c”
u
p
t
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p
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9
6
)
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30
D
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ch
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r
1
:
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27
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8
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ch
ap
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:
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L
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c”
u
p
t
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9
6
)
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m
b
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ic
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s
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f
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ct
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s
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f
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e
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. t
h
e
f
u
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ct
io
n
c
an
b
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w
ri
tt
e
n
o
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t
as
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:
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p
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g
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34
D
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L
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g
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©
2
0
2
1
U
w
e
R
.
Z
im
m
er
, T
h
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A
u
st
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li
an
N
at
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U
n
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er
si
ty
p
ag
e
3
4
o
f
4
8
1
(
ch
ap
te
r
1
:
“D
ig
it
al
L
o
gi
c”
u
p
t
o
p
ag
e
9
6
)
B
in
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en
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E
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