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EE2420 – Digital Logic
Summer II 2013
Set 13: Sequential Logic
Class Book: Chapter 7
Online Book: Chapter 10
Hassan Salamy
Ingram School of Engineering
Texas State University
Combinatorial Logic
2



Has a set output determined directly by the inputs
Used to implement direct digital logic functions
Is described by a truth table describing their function
Combinatorial Circuit examples
3






Direct combinations of Logic Functions
Adders
Encoders and Decoders
Multiplexers and Demultiplexers
Parity Circuits
Shifters
Storage elements
4



Previously, we have considered combinational
circuits where the output values depend only on the
values of signals applied to the inputs
Another class of logic circuits have the property that
the outputs depend not only on the current inputs,
but also on the past behavior of the circuit
Such circuits include storage elements that store the
values of logic signals
Sequential circuits
5




Contents of the storage elements represent the state
of the circuit
Input value changes may leave the circuit in the
same state or cause it to change to a new state
Over time, the circuit changes through a sequence of
states as a result of changes in the inputs
Circuits that exhibit this behavior are referred to as
sequential circuits
Sequential Logic Circuits
6

Latches

Flip-flops

Counters

Registers

Synchronous Sequential Logic Circuits
Alarm control system
7

Suppose we wish to construct an alarm circuit such that the output remains
active (on) even after the sensor output that triggered the alarm goes off


A typical car alarm is representative of this type of circuit
The circuit requires a memory element to remember that the alarm has to be
active until a reset signal arrives
Sensor
Reset
Set
Memory
element
On/Off’
Alarm
A simple memory element
8
A
B
Simple memory element: feedback path provides
basis for the ‘remembering’ of data.


For the circuit above B=A’ and A=B’
This leads to two possible stable states:
1.
A=0 and B=1
2.
A=1 and B=0

We cannot readily choose or change which state occurs.

We need a way to select the stored state.
Basic SR latch
9

A similar circuit, constructed with NOR gates can also be useful

Inputs, Set and Reset, provide the means to changing the state, Q, of the circuit

This circuit is referred to as a basic latch

The output state of a latch is controlled by the state of its’ inputs
Reset (R)
Set (S)
Q
Basic SR latch
10




R
S
When R=S=0 the circuit remains in its current state (either Qa=1 and Qb=0 or Qa=0
and Qb=1)
When S=1 and R=0, the latch is set into a state where Qa=1 and Qb=0
When S=0 and R=1, the latch is reset into a state where Qa=0 and Qb=1
Where S=1 and R=1, Qa=Qb=0 (there are actually problems with this state as we will
see)
Qa
Qb
S
R
Qa
Qb
0
0
0/1
1/0
0
1
0
1
1
0
1
0
1
1
0
0
(no change)
Basic SR latch timing diagram
11
t1
R
S
Qa
Qb
t2
t3
t4
t5
t6
t7
t8
t9
t10
1
0
1
0
1
0
1
0
?
?
Time
Basic SR latch timing diagram
12



If the propagation delays from Qa and Qb are
exactly the same, the oscillation at time t10 would
continue indefinitely
In a real circuit there would probably be some
(mostly insignificant) difference in the delays and
the latch would eventually settle into one of its two
stable states (but we don’t know which one it would
be)
Thus the S=R=1 combination is generally
considered an unallowed combination in the SR latch
Gated SR latch
13



The basic SR latch changes its state whenever its
inputs change
It may be desirable to add an enable signal to the
basic SR latch that allows us to control when the
circuit can change states
Such a circuit is referred to as a gated SR latch
Gated SR latch circuit
14
R
R*
Q
Clk
Q
S
S*
S
Q
clk
R Q
CLK
S
R
Q(t+1)
0
X
X
Q(t)
1
0
0
Q(t)
1
0
1
0
1
1
0
1
1
1
1
X
Q(t)=present state
Q(t+1)=next state
Gated SR latch timing diagram
15
Clk
R
S
Q
Q
1
0
1
0
1
0
1
?
0
1
?
0
Time
Gated SR latch with NAND gates
16
S
Q
Clk
Q
R
Gated D latch
17


Another useful latch has a single data input, D, and it stores the value of this
input under the control of a clock signal
This is referred to as a gated D latch

Useful in circuits where we want to store some value

The output of an adder/subtractor circuit would be one example
D
(Data)
S
Q
Clk
R
Q
Gated D latch
18
D
Q
clk Q
t1
t2
t3
CLK
D
Q(t+1)
0
X
Q(t)
1
0
0
1
1
1
t4
Clk
D
Q
Time
Level versus edge sensitivity
19

Since the output of the D latch is controlled by the
level (0 or 1) of the clock input, the latch is said to
be level sensitive
 All
of the latches we have seen have been level
sensitive


It is possible to design a storage element for which
the output only changes at the point in time when
the clock changes from one value to another
Such circuits are said to be edge triggered
Effects of propagation delays
20


Previously we have ignored the effects of propagation delay. In practical
circuits, it is essential to account for these delays
For the gated D latch (and others as well), it is important that the value of D not
change at the time the clock (clk) goes from 1 to 0



The designer must make sure the signal is stable when the critical change in the clock
takes place
The minimum time the D signal must remain stable prior to the negative edge
(1->0) of the clock signal is called the setup time (tsu)
The minimum time the D signal must remain stable after the negative edge of
clock is the hold time (th)

Typical CMOS values are: tsu=3ns and th=2ns
Setup and hold times
21
t
su
t
h
Clk
D
Q
Flip-flops
22



The gated latch circuits presented are level sensitive
and can change states more than once during the
‘active’ period of the clock signal
Circuits (storage elements) that can change their
state no more than once during a clock period are
also useful
Two types of circuits with such behavior
 Master-slave
flip-flip
 Edge-triggered flip-flop
Master-slave D flip-flop
23

Consists of 2 gated D latches
 The
first, master, changes its state while clock=1
 The second, slave, changes its state while clock=0
Master
D
Clock
D
Q
Clk Q
Q
Slave
m
D
Q
Clk Q
Qs
Q
Q
38 transistors
Master-slave D flip-flop
24

When clock=1, the master tracks the values of the D input signal and the slave
does not change





Thus Qm follows any changes in D and Qs remains constant
When the clock signal changes to 0, the master stage stops following the
changes in the D input signal
At the same time, the slave stage responds to the value of Qm and changes
states accordingly
Since Qm does not change when clock=0, the slave stage undergoes at most
one change of state during a clock cycle
From an output point of view, the circuit changes Qs (its output) at the negative
edge of the clock signal
Master-slave D flip-flop
25
Clock
D
Qm
Q = Qs
D
clock
Q
Q
Edge-triggered flip-flop
26

A circuit, similar in functionality to the master-slave D flip-flop, can be
constructed with 6 NAND gates
1
2
P3
P1
5
Clock
clock
3
D
D
Q
4
P2
P4
6
Q
Q
Q
Positive-edge-triggered
D type flip-flop
24 transistors
Edge-triggered flip-flop
27


The previous circuit responds on the positive edge
of the clock signal
A negative-edge triggered D flip-flop can be
constructed by replacing the NAND with NOR gates
D
clock
Q
Q
Positive-edge-triggered
D type flip-flop
D
clock
Q
Q
Negative-edge-triggered
D type flip-flop
Comparing D storage elements
28
D
clock
D
Q
Qa
clk Q
D
Q
clock
Qb
Qa
Q
D
Q
Q
D
Qc
Q
b
Q
c
Clear and preset inputs
29


It may be desirable to specifically set (Q=1) or clear (Q=0) a
flip-flop
Practical flip-flops often have preset and clear inputs
 Generally, these inputs are asynchronous (they do not
depend on the clock signal)
Preset’
D
clock
Clear’
Q
As long as Preset’=0, Q=1
Q
As long as Clear’=0, Q=0
T flip-flop
30


Another flip-flop type, the T flip-flop, can be derived from the basic D flip-flop
presented
Feedback connections make the input signal D equal to the value of Q or Q’
under control of a signal labeled T
D
T
Clock
Q
Q
Q
Q
T flip-flop
31

The name T derives from the behavior of the circuit, which
‘toggles’ its state when T=1
 This feature makes the T flip-flop a useful element when
constructing counter circuits
T
Q(t+1)
0
Q(t)
1
Q’(t)
Clock
T
Q
T
clock
Q
Q
Positive edge triggered
JK flip-flop
32

The JK flip-flop can also be derived from the basic
D flip-flop such that
D=JQ’+K’Q

The JK flip-flop combines aspects of the SR and the
T flip-flop
 It
behaves as the SR flip-flop (where J=S and K=R) for
all values except J=K=1
 For J=K=1, it toggles like the T flip-flop
JK flip-flop
33
J
D Q
K
Q
Q
Q
J
K
Q(t+1)
0
0
Q(t)
0
1
0
1
0
1
1
1
Q’(t)
Clock
J
Q
K
Q
clock
Positive edge triggered
JK flip-flop timing diagram
34
Complete the following timing diagram
Clk
K
J
Q
Q
1
0
1
0
1
0
1
0
1
0
Time
Registers
35


A flip-flop stores one bit of information
When a set of n flip-flops is used to store n bits of
data, we refer to these flip-flops as a register
 Common
register usages include
 Holding
a data value output from an arithmetic circuit
 Holding a count value in a counter circuit

A common clock signal is typically used for each
flip-flop in a register
Shift register
36

A register that provides the ability to shift its contents
by a single bit
 May
be to the right or left (or possibly both)
In
D Q
Clock
Q
Q
1
D Q
Q
2
D Q
Q
Shift right register
Q
Q
3
D Q
Q
Q
4
Out
Shift right register
37


Data is shifted to the right in a serial
fashion using the In input
Positive edge triggered


Contents of each flip-flop are
transferred to the next flip-flop at
each positive edge of the clock
Level sensitive devices would not be
appropriate for this circuit
In
Q1
Q2
Q3
Q4
t0
1
0
0
0
0
t1
0
1
0
0
0
t2
1
0
1
0
0
t3
1
1
0
1
0
t4
1
1
1
0
1
t5
0
1
1
1
0
t6
0
0
1
1
1
t7
0
0
0
1
1
Parallel-access shift register
38

Data transfer in computer systems is a common function



To transfer data serially, data is loaded into a register in parallel (in one
clock cycle) and then shifted out one bit at a time


If the transfer is n-bits at a time, the transfer is said to be in parallel
If the transfer is 1-bit at a time, the transfer is said to be serial
Parallel-to-serial data conversion
If bits are received serially, after n clock cycles the contents of a register
can be accessed in parallel as an n-bit item

Serial-to-parallel conversion
Parallel-access shift register
39
Parallel output Q3
Serial
input
Q
2
Q
1
Q
0
D Q
D Q
D Q
D Q
Q
Q
Q
Q
Shift/Load
Parallel input
Clock
Counters
40

Special purpose arithmetic circuits used for the
purpose of counting
 Design
circuits that can increment or decrement a count
by 1

Counter circuits serve many purposes
 Count
occurrences of certain events
 Generate timing intervals for controlling various tasks in
a digital system
 Track elapsed time between events

Often (but not always) built with T flip-flops
because the toggle feature is naturally suited for
implementing the counting operation
Up-counter with T flip-flops
41
1
T Q
T Q
T Q
Clock
Q
Q
Q
Q
0
Q
1
Q
2
Clock
Q
0
Q
1
Q
2
Count 0
1
2
3
4
5
6
7
0
Down counter with T flip-flops
42
1
T Q
T Q
T Q
Clock
Q
Q
Q
Q
0
Q
1
Q
2
Clock
Q
0
Q
1
Q
2
Count 0
7
6
5
4
3
2
1
0
Asynchronous counters
43

The previous counters are examples of
asynchronous counters. Also called ripple counters.
 Input
clock is only connected to one flip-flop
 Clocks for other flip-flops are (or are derived from) the
outputs of the previous flip-flops

This form of counter is slow because the cascaded
clocking scheme
 The
clock source ripples from stage-to-stage
 The ripple effect is similar to that of a ripple carry
adder circuit
Synchronous counters
44

Synchronous counters are built by
clocking all the flip-flops at the
same time (with a single clocking
source)


Faster response than asynchronous
counters
Synchronous counters with T flipflops



Least significant bit, Q0, changes
every clock cycle
Bit one, Q1, only changes when
Q0=1
Bit two, Q2, only changes when
Q0=Q1=1
Q2
Q1
Q0
0
0
0
0
1
0
0
1
2
0
1
0
3
0
1
1
4
1
0
0
5
1
0
1
6
1
1
0
7
1
1
1
8
0
0
0
Q1 changes
Q2 changes
T flip-flop synchronous counter
45
1
Clock
T
Q
Q
Q
0
T
Q
Q
Q
1
T
Q
Q
2
Q
4-bit synchronous up counter
T
Q
Q
Q
3
Enable and clear capability
46

It may be desirable to disable counting or clear the counter
 Include an enable control signal
 Use a flip-flop with asynchronous clear capability
Enable T Q
T Q
T Q
T Q
Q
Q
Q
Q
Clock
Clear
D flip-flop synchronous counter
47



A 4-bit up counter counts in the sequence
0,1,2,…,15,0,1…
The count is given by the flip-flop outputs
Q3Q2Q1Q0
The D inputs are given by:
D0=Q0Enable
D1=Q1Q0Enable
D2= Q2Q1Q0Enable
D3= Q3Q2Q1Q0Enable
Four-bit counter (D flip-flops)
Enable
Carry
output
Q
D Q
Q3
Q
D Q
Q2
Q
D Q
Q1
Q
Q0
D Q
48
Clock
Counters with parallel load
49

It is common for counters to begin a count with a zero value

An asynchronous clear input can be used for his purpose

It may be desirable for a counter to begin with a non-zero value

Adding circuitry to provide parallel load capability is necessary

A control input, load, is used to select a mode of operation

Load=0, circuit counts

Load=1, parallel load a new value into the counter
Parallel load counter
D1
D2
Q
Q
1
0
D
Q
Q
1
0
Carry
output
D3
load
clock
D0
Q3
D
Q
Q
D
0
1
0
enable
Q2
1
Q
Q1
D
Q
Q0
50