03-Boolean Algebra & Logic Design

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Transcript 03-Boolean Algebra & Logic Design

IKI10201
03b-Logic Gates
Bobby Nazief
Semester-I 2005 - 2006
The materials on these slides are adopted from those in
CS231’s Lecture Notes at UIUC, which is derived from
Howard Huang’s work and developed by Jeff Carlyle.
Road Map
3
Boolean Algebra
Finite-State
Machines
Logic Gates & 3
Flip-flops
6
2
Binary Systems
& Data Represent.
8
Generalized FSM
Logic Design
Techniques
4
Combinatorial 5
Components
6
Sequential Design
Techniques
Storage
Components
7
8
Register-Transfer
Design
Processor
Components
9
2
The Modest Switch
•
•
Digital systems are basically built from an extremely simple component:
– A controllable switch
The usual Electrical switch we use every day
– The electric switch we use turns current on and off
– But we need to turn it on and off by hand
– The result of turning the switch on?
• The “top end” in the figure becomes
• raised to a high voltage
• Which makes the current flow through the bulb
•The Controllable Switch
• No hands
•Voltage controls if the switch is on or off
•High voltage at input: switch on
•Otherwise it is off
3
Using the switch
Input
Output is high (voltage) if and only if
the input is high
Output
Now we can make one circuit control
another switch…
Neat!
This is getting
boring..
4
Lets use them creatively
Output is high if both the inputs
input1 AND input2 are high
Input1
Output
If either of the inputs is low, the
output is low.
This is called an AND gate
Input2
Now, can you make an OR gate with
switches?
5
OR Gate
Input1
Output
Input2
Output is low iff both inputs are low
I.e. Output is high if either of the inputs (or both) are
high (input1 OR input2)
6
How to make switches?
•
•
•
•
•
Use mechanical power
Use hydraulic pressure
Use electromechanical switches (electromagnet turns the switch on)
Current technology:
– Semiconductor transistors
• A transistor can be made to conduct electricity depending on the
input on the 3rd input
– CMOS “gates” (actually, switches)
We can now manufacture millions of transistors on a single silicon chip!
So, switches and Gates are not magic.
We know they can be built.
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Digital Logic Gates
8
Basic logic gates
•
Each of our basic operations can be implemented in hardware using a
basic logic gate.
– Symbols for each of the logic gates are shown below.
– These gates output the product, sum or complement of their inputs.
Operation:
Expression:
AND (product)
of two inputs
xy, or xy
OR (sum) of
two inputs
x+y
NOT
(complement)
on one input
x’
Logic gate:
9
Expressions and circuits
• Any Boolean expression can be converted into a circuit by combining
•
•
basic gates in a relatively straightforward way.
The diagram below shows the inputs and outputs of each gate.
The precedence is explicit in a circuit. Clearly, we have to make sure
that the hardware does operations in the right order!
(x + y’)z + x’
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Exercises
•
Implement the following functions using 2-level gates (Sum of Product)
– assume complemented literal (x’) is already available
– a gate can only have 2 inputs
•
F1(x,y,z) = xy + yz + x’z’
•
F2(x,y,z) = (x + y’)z + x’
•
F3(x,y,z) = (x’ + y’)’ + xyz
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Additional logic gates
Operation:
Expressions:
NAND
(NOT-AND)
(xy)’ = x’ + y’
NOR
(NOT-OR)
XOR
(eXclusive OR)
(x + y)’ = x’ y’
x  y = x’y + xy’
Logic gates:
•
•
NAND/NOR gates are used extensively and far more popular than
AND/OR gates, simply because their implementation requires only 4
transistors (AND/OR uses 6 transistors).
NAND/NOR are faster than AND/OR
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NAND gates
•
The NAND gate is universal: it can replace all other gates!
– NOT
–
–
(xx)’ = x’
[ because xx = x ]
((xy)’ (xy)’)’ = xy
[ from NOT above ]
((xx)’ (yy)’)’ = (x’ y’)’
=x+y
[ xx = x, and yy = y ]
[ DeMorgan’s law ]
AND
OR
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Making NAND circuits
•
•
The easiest way to make a NAND circuit is to start with a regular,
primitive gate-based diagram.
Two-level circuits are trivial to convert, so here is a slightly more
complex random example.
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Converting to a NAND circuit
•
Step 1: Convert all AND gates to NAND gates using AND-NOT symbols,
and convert all OR gates to NAND gates using NOT-OR symbols.
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Converting to NAND, concluded
•
Step 2: Make sure you added bubbles along lines in pairs ((x’)’ = x). If
not, then either add inverters or complement the input variables.
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NOR gates
•
•
•
The NOR operation is the dual of the NAND.
NOR gates are also universal.
We can convert arbitrary circuits to NOR diagrams by following a
procedure similar to the one just shown:
– Step 1:
Convert all OR gates to NOR gates (OR-NOT), and all AND gates to
NOR gates (NOT-AND).
– Step 2:
Make sure that you added bubbles along lines in pairs. If not, then
either add inverters or complement input variables.
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XOR gates
•
•
•
A two-input XOR gate outputs true when exactly one of its inputs is
true:
x
y
xy
0
0
0
0
1
1
1
0
1
1
1
0
x  y = x’ y + x y’
XOR corresponds more closely to typical English usage of “or,” as in
“eat your vegetables or you won’t get any pudding.”
Several fascinating properties of the XOR operation:
x0=x
xx=0
x  (y  z) = (x  y)  z
xy=yx
x  1 = x’
x  x’ = 1
[ Associative ]
[ Commutative ]
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XNOR gates
•
•
Finally, the complement of the XOR function is the XNOR function.
A two-input XNOR gate is true when its inputs are equal:
x
y (xy)’
0
0
1
0
1
0
1
0
0
1
1
1
(x  y)’ = x’y’ + xy
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Extension to Multiple Inputs & Multiple Operators
•
Any gate can be extended to have multiple inputs as long as the binary
operation it implements is commutative and associative.
– AND(x,y,z,...) = (xyz...) = x  y  z  ...
– OR(x,y,z,...) = (x + y + z + ...) = x + y + z + ...
– XOR(x,y,z,...) = (x  y  z  ...) = x  y  z  ...
– XNOR(x,y,z,...) = (x  y  N z  ...) = x  y  N z  ...
•
But,
– NAND(x,y,z,...) = (xyz...)’  x  y  z  ...
– NOR(x,y,z,...) = (x + y + z + ...)’  x  y  z  ...
•
Multiple gates will lower the cost (smaller number of transistors) and
faster circuit (smaller delay)
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Multiple inputs gates
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Multiple operators gates
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Gate implementations
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Logic levels
•
•
•
2 voltage levels:
– High (H): 5 Volts (3.3 or 1.8 Volts in some systems)
– Low (L): 0 Volts
Logic gate will generate output voltage whose value represent the
logical value (1  H or 0  L)
Logic gate will interpret its inputs based the input voltage
(L  0 or H  1)
+5
Logic 1
H
V
Logic 0
L
0
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Noise margins
Output voltage
range
VCC(5)
Input voltage
range
H
VOH(2.4)
H
VIH(2.0)
High noise
margin
Low noise
margin
VOL(0.4)
VIL(0.8)
L
GND(0)
VCC(5.0)
L
GND(0)
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Propagation delay
•
Circuits made up of gates:
– If you change the inputs, and wait for a while, the correct outputs
show up.
• Why? Capacitive loading:
– “fill up the water level” analogy.
•
We can use a timing diagram to show gate delays graphically.
x
x’
gate delays
•
In a circuit, when gates are connected in series, the delay will add up 
propagation delay
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Fan-out
•
•
Using the same “fill up the water level” analogy, a single output cannot
drive too many inputs:
– will be too slow to “fill them up”
– may not have enough power
Fan-out specifies the number of subsequent gates that can be driven by
each gate, while providing voltage levels in the guaranteed range
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Power dissipation
•
Each gate generates power dissipation during its operation; the average
power dissipation is:
– PTTL = Vcc  (ICCH + ICCL) / 2
[for TTL]
– PCMOS = Vcc  ICCT
[for CMOS]
– PCMOS << PTTL
•
Power dissipation is proportional to the heat generated by the chip
– excessive heat dissipation may cause gate circuitry to drift out of
its normal operating range
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Gate technology
•
•
Bipolar
– Transistor-transistor logic (TTL)
– Emitter couple logic (ECL)
– technology of the old days
MOS (metal oxide silicon)
– Complementary MOS (CMOS)
– low power dissipation
– high fan-out
– simple fabrication
– higher density (number of gates per area of silicon)
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Integrated Circuit (IC) technology
•
•
•
•
Small-scale integration (SSI)
– 10 gates/package
Medium-scale integration (MSI)
– 10 – 100 gates/package
Large-scale integration (LSI)
– 100 – 1000 gates/package
Very large-scale integration (VLSI)
– 1000+ gates/package (systems on a chip)
– Custom design (standard cells)
– Gate arrays (Gas)
– Field-programmable gate arrays (FPGAs)
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Effect of gate’s delay on circuit’s performance
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Full-adder design using XOR gates
Xi
Yi
Ci
Ci+1
Si
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
1
0
1
1
1
0
1
1
0
1
0
0
1
si = xi’yi’ci + xi’yici’ + xiyi’ci’ + xiyici
= (xi’yi + xiyi’) ci’ + (xi’yi’ + xiyi)ci
= (xi  yi)ci’ + (xi  yi)ci
= (xi  yi)ci’ + (xi  yi)’ci
= (xi  yi)  ci
ci+1 = xi’yici + xiyi’ci + xiyici’ + xiyici
= ci(xi’yi + xiyi’) + xiyi(ci’ + ci)
= ci(xi  yi) + xiyi
longest delay = 9.0
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Full-adder design using fast gates
si = (xi  yi)ci’ + (xi  yi)ci
= (xi  yi)’ci’ + (xi  yi)ci
= (xi  yi)  ci
xi  yi = xiyi + xi’yi’
= ((xiyi)’  (xi’yi’)’)’
= ((xiyi)’  (xi + yi))’
ci+1 = xi’yici + xiyi’ci + xiyici’ + xiyici
= xiyi + xici + yici
= xiyi + (xi + yi)ci
= ((xiyi)’  ((xi + yi)ci)’)’
longest delay = 7.6
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Full-adder design using multiple-inputs gates
si = xi’yi’ci + xi’yici’ + xiyi’ci’ + xiyici = ((xi’yi’ci + xi’yici’)’  (xiyi’ci’ + xiyici)’)’
= ((xi’yi’ci)’  (xi’yici’)’  (xiyi’ci’ )’  (xiyici)’)’
ci+1 = xiyi + xici + yici
= ((xiyi)’  (xici )’  (yici )’)’
longest delay = 4.0
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