AD640* [ETC]
DC-Coupled Demodulating 120 MHz Logarithmic Amplifier ; 直流耦合解调120 MHz的对数放大器\n型号: | AD640* |
厂家: | ETC |
描述: | DC-Coupled Demodulating 120 MHz Logarithmic Amplifier
|
文件: | 总16页 (文件大小:281K) |
中文: | 中文翻译 | 下载: | 下载PDF数据表文档文件 |
DC-Coupled Demodulating
a
120 MHz Logarithmic Amplifier
AD640*
FEATURES
signal output at +50 dB (referred to input) is provided to operate
AD640s in cascade.
Complete, Fully Calibrated Monolithic System
Five Stages, Each Having 10 dB Gain, 350 MHz BW
Direct Coupled Fully Differential Signal Path
Logarithmic Slope, Intercept and AC Response are
Stable Over Full Military Temperature Range
Dual Polarity Current Outputs Scaled 1 mA/Decade
Voltage Slope Options (1 V/Decade, 100 mV/dB, etc.)
Low Power Operation (Typically 220 mW at ؎5 V)
Low Cost Plastic Packages Also Available
The logarithmic response is absolutely calibrated to within ±1 dB
for dc or square wave inputs from ±0.75 mV to ±200 mV, with
an intercept (logarithmic offset) at 1 mV dc. An integral X10
attenuator provides an alternative input range of ±7.5 mV to
±2 V dc. Scaling is also guaranteed for sinusoidal inputs.
The AD640B is specified for the industrial temperature range of
–40°C to +85°C and the AD640T, available processed to MIL-
STD-883B, for the military range of –55°C to +125°C. Both are
available in 20-lead side-brazed ceramic DIPs or leadless chip
carriers (LCC). The AD640J is specified for the commercial
temperature range of 0°C to +70°C, and is available in both
20-lead plastic DIP (N) and PLCC (P) packages.
APPLICATIONS
Radar, Sonar, Ultrasonic and Audio Systems
Precision Instrumentation from DC to 120 MHz
Power Measurement with Absolute Calibration
Wide Range High Accuracy Signal Compression
Alternative to Discrete and Hybrid IF Strips
Replaces Several Discrete Log Amp ICs
This device is now available to Standard Military Drawing
(DESC) number 5962-9095501MRA and 5962-9095501M2A.
PRODUCT HIGHLIGHTS
PRODUCT DESCRIPTION
1. Absolute calibration of a wideband logarithmic amplifier is
unique. The AD640 is a high accuracy measurement device,
not simply a logarithmic building block.
2. Advanced design results in unprecedented stability over the
full military temperature range.
3. The fully differential signal path greatly reduces the risk of
instability due to inadequate power supply decoupling and
shared ground connections, a serious problem with com-
monly used unbalanced designs.
4. Differential interfaces also ensure that the appropriate ground
connection can be chosen for each signal port. They further
increase versatility and simplify applications. The signal input
impedance is ~500 kΩ in shunt with ~2 pF.
The AD640 is a complete monolithic logarithmic amplifier. A single
AD640 provides up to 50 dB of dynamic range for frequencies
from dc to 120 MHz. Two AD640s in cascade can provide up to
95 dB of dynamic range at reduced bandwidth. The AD640 uses a
successive detection scheme to provide an output current propor-
tional to the logarithm of the input voltage. It is laser calibrated to
close tolerances and maintains high accuracy over the full military
temperature range using supply voltages from ±4.5 V to ±7.5 V.
The AD640 comprises five cascaded dc-coupled amplifier/limiter
stages, each having a small signal voltage gain of 10 dB and a –3 dB
bandwidth of 350 MHz. Each stage has an associated full-wave
detector, whose output current depends on the absolute value of its
input voltage. The five outputs are summed to provide the video
output (when low-pass filtered) scaled at 1 mA per decade (50 µA
per dB). On chip resistors can be used to convert this output cur-
rent to a voltage with several convenient slope options. A balanced
5. The dc-coupled signal path eliminates the need for numerous
interstage coupling capacitors and simplifies logarithmic
conversion of subsonic signals.
(continued on page 4)
FUNCTIONAL BLOCK DIAGRAM
RG1
17
RG0
16
RG2
15
LOG OUT
14
LOG COM
13
1k⍀
1k⍀
12 +V
INTERCEPT POSITIONING BIAS
S
18
19
COM
FULL-WAVE
DETECTOR
FULL-WAVE
DETECTOR
FULL-WAVE
DETECTOR
FULL-WAVE
DETECTOR
FULL-WAVE
DETECTOR
ATN OUT
20
1
SIG +IN
SIG –IN
ATN LO
11
10
SIG +OUT
SIG –OUT
10dB
10dB
10dB
10dB
10dB
AMPLIFIER/LIMITER
AMPLIFIER/LIMITER
AMPLIFIER/LIMITER
AMPLIFIER/LIMITER
AMPLIFIER/LIMITER
2
27⍀
30⍀
3
4
ATN COM
ATN COM
BL2
ITC
9
8
270⍀
5
6
7
SLOPE BIAS REGULATOR
GAIN BIAS REGULATOR
ATN IN
BL1
–V
S
*Protected under U.S. patent number 4,990,803.
REV. C
Information furnished by Analog Devices is believed to be accurate and
reliable. However, no responsibility is assumed by Analog Devices for its
use, nor for any infringements of patents or other rights of third parties
which may result from its use. No license is granted by implication or
otherwise under any patent or patent rights of Analog Devices.
One Technology Way, P.O. Box 9106, Norwood, MA 02062-9106, U.S.A.
Tel: 781/329-4700
Fax: 781/326-8703
World Wide Web Site: http://www.analog.com
© Analog Devices, Inc., 1999
AD640–SPECIFICATIONS
(V =
S
؎
5 V, TA = +25
؇
C, unless otherwise noted)
DC SPECIFICATIONS
Model
AD640J
AD640B
Typ
AD640T
Typ
Parameter
Conditions
Min
Typ
Max
Min
Max
Min
Max
Units
TRANSFER FUNCTION1
IOUT = IY LOG |VIN/VX| for VIN = ± 0.75 mV to ± 200 mV dc
SIGNAL INPUTS (Pins 1, 20)
Input Resistance
Input Offset Voltage
vs. Temperature
Over Temperature
vs. Supply
Input Bias Current
Input Bias Offset
Differential
Differential
500
50
0.8
500
50
0.8
500
50
0.8
kΩ
µV
µV/°C
µV
µV/V
µA
500
200
200
300
25
TMIN to TMAX
2
7
1
2
7
1
2
7
1
25
25
µA
Common-Mode Range
–2
+0.3
–2
+0.3
–2
+0.3
V
INPUT ATTENUATOR
(Pins 2, 3, 4, 5 and 19)
Attenuation2
Pin 5 to Pin 19
Pins 5 to 3/4
20
300
20
300
20
300
dB
Ω
Input Resistance
SIGNAL OUTPUT (Pins 10, 11)
Small Signal Gain3
50
±180
75
50
± 180
75
50
± 180
75
dB
mV
Ω
Peak Differential Output4
Output Resistance
Either Pin to COM
Either Pin to COM
Quiescent Output Voltage
–90
–90
–90
mV
LOGARITHMIC OUTPUT5 (Pin 14)
Voltage Compliance Range
Slope Current, IY
–0.3
0.95
+VS –1 –0.3
+VS –1
1.02
–0.3
0.98
VS –1
1.02
V
mA
1.00
1.05
0.98
1.00
1.00
Accuracy vs. Temperature
0.002
0.002
0.002
%/°C
mA
%/V
mV
µV/°C
mV
µV/V
TMIN to TMAX
+VS = 4.5 V to 7.5 V
0.98
0.95
0.90
1.02
0.4
1.05
Accuracy vs. Supply
Intercept Voltage6, VX
vs. Temperature
Over Temperature
vs. Supply
0.08
1.00
0.5
1.0
1.15
0.08
1.00
0.5
0.4
1.05
0.08
1.00
0.5
0.85
0.95
TMIN to TMAX
±VS = 4.5 V to 7.5 V
1.10
2
2
2
Logarithmic Offset
(Alt. Definition of VX)
vs. Temperature
Over Temperature
vs. Supply
Intercept Voltage Using Attenuator
Zero Signal Output Current7
ITC Disabled
–61.5 –60.0 –58.7
0.004
–60.5
–60.0
0.004
–59.5
–60.5
–60.9
9.0
–60.0 –59.5
0.004
dBV
dB/°C
dB
dB/V
mV
mA
mA
mA
TMIN to TMAX
±VS = 4.5 V to 7.5 V
–59.1
0.017
0.017
10.0
–0.2
–0.27
2.3
0.017
8.25
10.0
–0.2
–0.27
2.3
11.75
9.0
11.0
10.0
–0.2
–0.27
2.3
11.0
Pin 8 to COM
Maximum Output Current
APPLICATIONS RESISTORS
(Pins 15, 16, 17)
1.000
0.35
0.995
1.000
0.35
1.005
0.6
0.995
1.000 1.005
kΩ
DC LINEARITY
VIN ±1 mV to ± 100 mV
1.2
0.35
0.6
dB
TOTAL ABSOLUTE DC
ACCURACY
VIN = ± 1 mV to ±100 mV8
Over Temperature
Over Supply Range
VIN = ± 0.75 mV to ±200 mV
Using Attenuator
0.55
1.0
2
3
2
3
0.55
1.0
0.9
1.7
1.0
2.0
0.55
1.0
0.9
1.8
1.0
2.0
dB
dB
dB
dB
TMIN to TMAX
±VS = 4.5 V to 7.5 V
VIN = ± 10 mV to ± 1 V
Over Temperature
0.4
0.6
1.2
2.5
3
0.4
0.6
1.2
1.5
2.0
2.5
0.4
0.6
1.2
1.5
2.0
2.5
dB
dB
dB
TMIN to TMAX
VIN = ± 7.5 mV to 2 V
3.5
POWER REQUIREMENTS
Voltage Supply Range
Quiescent Current9
+VS (Pin 12)
؎
4.5
؎
7.5
؎
4.5
؎
7.5
؎
4.5
؎
7.5
V
TMIN to TMAX
TMIN to TMAX
9
35
15
60
9
35
15
60
9
35
15
60
mA
mA
–VS (Pin 7)
REV. C
–2–
AD640
(V = ؎5 V, T = +25؇C, unless otherwise noted)
AC SPECIFICATIONS
S
A
Model
AD640J
Typ
AD640B
Typ
AD640T
Typ
Parameter
Conditions
Min
Max
Min
Max
Min
Max
Units
SIGNAL INPUTS (Pins 1, 20)
Input Capacitance
Noise Spectral Density
Tangential Sensitivity
Either Pin to COM
1 kHz to 10 MHz
BW = 100 MHz
2
2
–72
2
2
–72
2
2
–72
pF
nV/√Hz
dBm
3 dB BANDWIDTH
Each Stage
All Five Stages
350
145
350
145
350
145
MHz
MHz
Pins 1 & 20 to 10 & 11
LOGARITHMIC OUTPUTS5
Slope Current, IY
f< = 1 MHz
0.96
0.88
0.82
1.0
1.04
1.00
0.98
0.98
0.91
0.86
1.0
1.02
0.97
0.94
0.98
0.91
0.86
1.0
1.02
0.97
0.94
mA
mA
mA
mA
mA
f = 30 MHz
f = 60 MHz
f = 90 MHz
f = 120 MHz
0.94
0.90
0.88
0.85
0.94
0.90
0.88
0.85
0.94
0.90
0.88
0.85
Intercept, Dual AD640s10, 11
f< = 1 MHz
–90.6 –88.6 –86.6
–89.6
–88.6
–87.6
–86.3
–83.9
–80.3
–87.6
–89.6
–88.6 –87.6
–87.6
–86.3
–83.9
–80.3
dBm
dBm
dBm
dBm
dBm
f = 30 MHz
f = 60 MHz
f = 90 MHz
f = 120 MHz
–87.6
–86.3
–83.9
–80.3
AC LINEARITY
–40 dBm to –2 dBm12
–35 dBm to –10 dBm12
–75 dBm to 0 dBm10
–70 dBm to –10 dBm10
–75 dBm to +15 dBm13
f = 1 MHz
f = 1 MHz
f = 1 MHz
f = 1 MHz
f = 10 kHz
0.5
2.0
1.0
3.0
2.0
3.0
0.5
1.0
0.5
1.5
1.0
1.5
0.5
1.0
0.5
1.5
1.0
1.5
dB
dB
dB
dB
dB
0.25
0.75
0.5
0.25
0.75
0.5
0.25
0.75
0.5
0.5
0.5
0.5
PACKAGE OPTION
20-Lead Ceramic DIP Package (D)
20-Terminal Ceramic LCC (E)
20-Lead Plastic DIP Package (N)
20-Lead Plastic Leaded Chip Carrier (P)
AD640BD
AD640BE
AD640TD
AD640TE
AD640]N
AD640JP
AD640BP
155
NUMBER OF TRANSISTORS
NOTES
155
155
1Logarithms to base 10 are used throughout. The response is independent of the sign of V IN
.
2Attenuation ratio trimmed to calibrate intercept to 10 mV when in use. It has a temperature coefficient of +0.30%/ °C.
3Overall gain is trimmed using a ± 200 µV square wave at 2 kHz, corrected for the onset of compression.
4The fully limited signal output will appear to be a square wave; its amplitude is proportional to absolute temperature.
5Currents defined as flowing into Pin 14. See FUNDAMENTALS OF LOGARITHMIC CONVERSION for full explanation of scaling concepts. Slope is measured
by linear regression over central region of transfer function.
6The logarithmic intercept in dBV (decibels relative to 1 V) is defined as 20 LOG10 (VX/1 V).
7The zero-signal current is a function of temperature unless internal temperature compensation (ITC) pin is grounded.
8Operating in circuit of Figure 24 using ± 0.1% accurate values for RLA and RLB. Includes slope and nonlinearity errors. Input offset errors also included for
VIN >3 mV dc, and over the full input range in ac applications.
9Essentially independent of supply voltages.
10Using the circuit of Figure 27, using cascaded AD640s and offset nulling. Input is sinusoidal, 0 dBm in 50 Ω = 223 mV rms.
11For a sinusoidal signal (see EFFECT OF WAVEFORM ON INTERCEPT). Pin 8 on second AD640 must be grounded to ensure temperature stability of intercept
for dual AD640 system.
12Using the circuit of Figure 24, using single AD640 and offset nulling. Input is sinusoidal, 0 dBm in 50 Ω = 223 mV rms.
13Using the circuit of Figure 32, using cascaded AD640s and attenuator. Square wave input.
All min and max specifications are guaranteed, but only those in boldface are 100% tested on all production units. Results from those tests are used to calculate
outgoing quality levels.
Specifications subject to change without notice.
THERMAL CHARACTERISTICS
JC (؇C/W)
JA (؇C/W)
20-Lead Ceramic DIP Package (D-20)
20-Terminal Ceramic LCC (E-20A)
20-Lead Plastic DIP Package (N-20)
20-Lead Plastic Leaded Chip Carrier (P-20A)
25
25
24
28
85
85
61
75
REV. C
–3–
AD640
(continued from page 1)
ABSOLUTE MAXIMUM RATINGS*
Supply Voltage . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . ±7.5 V
Input Voltage (Pin 1 or Pin 20 to COM) . . . . –3 V to +300 mV
Attenuator Input Voltage (Pin 5 to Pin 3/4) . . . . . . . . . . . ±4 V
Storage Temperature Range D, E . . . . . . . . . –65°C to +150°C
Storage Temperature Range N, P . . . . . . . . . –65°C to +125°C
Ambient Temperature Range, Rated Performance
Industrial, AD640B . . . . . . . . . . . . . . . . . . . –40°C to +85°C
Military, AD640T . . . . . . . . . . . . . . . . . . . –55°C to +125°C
Commercial, AD640J . . . . . . . . . . . . . . . . . . . 0°C to +70°C
Lead Temperature Range (Soldering 60 sec) . . . . . . . . +300°C
6. The low input offset voltage of 50 µV (200 µV max) ensures
good accuracy for low level dc inputs.
7. Thermal recovery “tails,” which can obscure the response
when a small signal immediately follows a high level input,
have been minimized by special attention to design details.
8. The noise spectral density of 2 nV/√Hz results in a noise floor of
~23 µV rms (–80 dBm) at a bandwidth of 100 MHz. The dy-
namic range using cascaded AD640s can be extended to 95 dB
by the inclusion of a simple filter between the two devices.
*Stresses above those listed under Absolute Maximum Ratings may cause perma-
nent damage to the device. This is a stress rating only; functional operation of the
device at these or any other conditions above those indicated in the operational
section of this specification is not implied. Exposure to absolute maximum rating
conditions for extended periods may affect device reliability.
CHIP DIMENSIONS AND
BONDING DIAGRAM
Dimensions shown in inches and (mm).
ORDERING GUIDE
Temperature
Range
Package
Description
Package
Option
Model
AD640JN
AD640JP
AD640BD
AD640BE
0°C to +70°C
0°C to +70°C
–40°C to +85°C 20-Lead Ceramic DIP
–40°C to +85°C 20-Terminal Ceramic
LCC
20-Lead Plastic DIP
20-Lead PLCC
N-20
P-20A
D-20
E-20A
P-20A
D-20
AD640BP
AD640TD/883B
–40°C to +85°C 20-Lead PLCC
–55°C to +125°C 20-Lead Ceramic DIP
5962-9095501MRA –55°C to +125°C 20-Lead Ceramic DIP
D-20
AD640TE/883B
–55°C to +125°C 20-Terminal Ceramic
LCC
E-20A
E-20A
5962-9095501M2A –55°C to +125°C 20-Terminal Ceramic
LCC
AD640TCHIPS
AD640EB
–55°C to +125°C Die
Evaluation Board
AD640JP-REEL
AD640JP-REEL7
0°C to +70°C
0°C to +70°C
13" Tape and Reel
7" Tape and Reel
P-20A
P-20A
CONNECTION DIAGRAMS
20-Lead PLCC (P) Package
20-Lead Ceramic DIP (D) Package
20-Lead Plastic DIP (N) Package
20-Terminal Ceramic LCC (E) Package
1
2
20 SIG +IN
SIG –IN
ATN LO
ATN COM
ATN COM
ATN IN
19
18
17
16
15
14
13
12
11
ATN OUT
CKT COM
RG1
2
3
1
20 19
3
2
1
20 19
3
18
17
16
15
14
4
5
6
7
8
CKT COM
RG1
ATN COM
ATN IN
BL1
18 CKT COM
4
5
6
7
8
PIN 1
IDENTIFIER
ATN COM
ATN IN
BL1
4
17
16
15
14
RG1
AD640
TOP VIEW
(Not to Scale)
5
RG0
AD640
TOP VIEW
(Not to Scale)
AD640
TOP VIEW
(Not to Scale)
RG0
RG0
6
BL1
RG2
RG2
–V
S
RG2
–V
S
7
–V
S
LOG OUT
LOG COM
LOG OUT
ITC
LOG OUT
ITC
8
ITC
BL2
9
10 11 12 13
9
10 11 12 13
9
+V
S
10
SIG –OUT
SIG +OUT
CAUTION
ESD (electrostatic discharge) sensitive device. Electrostatic charges as high as 4000 V readily
accumulate on the human body and test equipment and can discharge without detection.
Although the AD640 features proprietary ESD protection circuitry, permanent damage may
occur on devices subjected to high energy electrostatic discharges. Therefore, proper ESD
precautions are recommended to avoid performance degradation or loss of functionality.
WARNING!
ESD SENSITIVE DEVICE
–4–
REV. C
Typical DC Performance Characteristics–AD640
1.015
1.010
1.005
1
1.20
1.006
1.004
1.002
1.000
0.998
0.996
0.994
1.15
1.10
1.05
1.00
0.95
0.995
0.990
0.985
0.980
0.90
0.85
–60 –40 –20
0
20 40 60 80 100 120 140
4.5
5.0
5.5
6.0
6.5
7.0
7.5
–60 –40 –20
0
20 40 60 80 100 120 140
TEMPERATURE – ؇C
POWER SUPPLY VOLTAGES – ؎Volts
TEMPERATURE – ؇C
Figure 3. Slope Current, IY vs.
Supply Voltages
Figure 2. Intercept Voltage, VX, vs.
Temperature
Figure 1. Slope Current, IY vs.
Temperature
14
13
12
11
10
9
1.015
+0.4
+0.3
1.010
1.005
INPUT OFFSET VOLTAGE
DEVIATION WILL BE WITHIN
SHADED AREA.
+0.2
+0.1
0
1.000
0.995
0.990
0.985
–0.1
–0.2
–0.3
8
7
–60 –40 –20
0
20 40 60 80 100 120 140
4.5
5.0
5.5
6.0
6.5
7.0
7.5
–60 –40 –20
0
20 40 60 80 100 120 140
TEMPERATURE – ؇C
POWER SUPPLY VOLTAGES – ؎Volts
TEMPERATURE – ؇C
Figure 4. Intercept Voltage, VX, vs.
Supply Voltages
Figure 5. Intercept Voltage (Using
Attenuator) vs. Temperature
Figure 6. Input Offset Voltage
Deviation vs. Temperature
2.5
2.0
1.5
1.0
0.5
0
2.5
2.0
1.5
1.0
0.5
0
2
1
0
2.4
2.2
2.0
1.8
1.6
1.4
1.2
1.0
0.8
0.6
0.4
0.2
0
–0.2
–0.4
0.1
1.0
10.0
100.0
1000.0
–60 –40 –20
0
20 40 60 80 100 120 140
–60 –40 –20
0
20 40 60 80 100 120 140
INPUT VOLTAGE – mV
(EITHER SIGN)
TEMPERATURE – ؇C
TEMPERATURE – ؇C
Figure 8. Absolute Error vs. Tem-
perature, VIN = ؎1 mV to ؎100 mV
Figure 9. Absolute Error vs.
Temperature, Using Attenuator.
Figure 7. DC Logarithmic Transfer
Function and Error Curve for Single
AD640
VIN = ؎10 mV to ؎1 V, Pin 8
Grounded to Disable ITC Bias
REV. C
–5–
AD640–Typical AC Performance Characteristics
–2.5
–2.5
–2.0
–1.5
–1.0
+125؇C
+25؇C
30MHz
+25؇C
+125؇C
–55؇C
60MHz
90MHz
120MHz
–2.0
–1.5
–1.0
–0.5
0
+1
0
–55؇C
+125؇C
+25؇C
–1
–2
–5
0
+125؇C
–55؇C
–55؇C
AD640 ؎V = 5 VOLTS
TEMPERATURE = +25؇C
AD640
FREQUENCY = 60MHz
S
0.5
–50
0.5
–50
–40
–30
–20
–10
0
–40
–30
–20
–10
0
INPUT LEVEL – dBm
INPUT LEVEL – dBm
Figure 10. AC Response at 30 MHz, 60 MHz, 90 MHz and
120 MHz, vs. dBm Input (Sinusoidal Input)
Figure 13. Logarithmic Response and Linearity at 60 MHz,
TA for TA = –55؇C, +25؇C, +125؇C
90
89
88
87
86
85
84
83
82
81
80
1.0
0.95
0.90
0.85
0.80
0
10 20 30 40 50 60 70 80 90 100 110 120
INPUT FREQUENCY – MHz
DC
30
60
90
120
150
FREQUENCY – MHz
Figure 11. Slope Current, IY, vs. Input Frequency
Figure 14. Intercept Level (dBm) vs. Frequency
(Cascaded AD640s – Sinusoidal Input)
Figure 12. Baseband Pulse Response of Single AD640,
Inputs of 1 mV, 10 mV and 100 mV
Figure 15. Baseband Pulse Response of Cascaded
AD640s, Inputs of 0.2 mV, 2 mV, 20 mV and 200 mV
–6–
REV. C
AD640
LOG OUT
Q9
LOG COM
Q10
CIRCUIT DESCRIPTION
The AD640 uses five cascaded limiting amplifiers to approxi-
mate a logarithmic response to an input signal of wide dynamic
range and wide bandwidth. This type of logarithmic amplifier
has traditionally been assembled from several small scale ICs
and numerous external components. The performance of these
semidiscrete circuits is often unsatisfactory. In particular, the
logarithmic slope and intercept (see FUNDAMENTALS OF
LOGARITHMIC CONVERSION) are usually not very stable
in the presence of supply and temperature variations even after
laborious and expensive individual calibration. The AD640
employs high precision analog circuit techniques to ensure sta-
bility of scaling over wide variations in supply voltage and tem-
perature. Laser trimming, using ac stimuli and operating
conditions similar to those encountered in practice, provides fully
calibrated logarithmic conversion.
COMMON
SIG IN
R3
75⍀
R4
75⍀
Q1
Q2
SIG OUT
R1
85⍀
R2
85⍀
Q3 Q4
Q5
Q7
Q6
Q8
–V
S
1.09mA 1.09mA 565A
PTAT PTAT
565A
2.18mA
PTAT
Figure 16. Simplified Schematic of a Single AD640 Stage
deviation or ripple in the transfer function of ±0.15 dB from the
ideal response when the input is either a dc voltage or a square
wave. The slope of the transfer function is unaffected by the
input waveform; however, the intercept and ripple are waveform
dependent (see EFFECT OF WAVEFORM ON INTERCEPT).
The input will usually be an amplitude modulated sinusoidal
carrier. In these circumstances the output is a fluctuating current at
twice the carrier frequency (because of the full wave detection)
whose average value is extracted by an external low-pass filter,
which recovers a logarithmic measure of the baseband signal.
Each of the amplifier/limiter stages in the AD640 has a small
signal voltage gain of 10 dB (×3.162) and a –3 dB bandwidth of
350 MHz. Fully differential direct coupling is used throughout.
This eliminates the many interstage coupling capacitors usually
required in ac applications, and simplifies low frequency signal
processing, for example, in audio and sonar systems. The
AD640 is intended for use in demodulating applications. Each
stage incorporates a detector (a full wave transconductance
rectifier) whose output current depends on the absolute value of
its input voltage.
Circuit Operation
With reference to Figure 16, the transconductance pair Q7, Q8
and load resistors R3 and R4 form a limiting amplifier having a
small signal gain of 10 dB, set by the tail current of nominally
2.18 mA at 27°C. This current is basically proportional to abso-
lute temperature (PTAT) but includes additional current to
compensate for finite beta and junction resistance. The limiting
output voltage is ±180 mV at 27°C and is PTAT. Emitter fol-
lowers Q1 and Q2 raise the input resistance of the stage, provide
level shifting to introduce collector bias for the gain stage and
detectors, reduce offset drift by forming a thermally balanced
quad with Q7 and Q8 and generate the detector biasing across
resistors R1 and R2.
Figure 16 is a simplified schematic of one stage of the AD640.
All transistors in the basic cell operate at near zero collector to
base voltage and low bias currents, resulting in low levels of ther-
mally induced distortion. These arise when power shifts from one
set of transistors to another during large input signals. Rapid
recovery is essential when a small signal immediately follows a
large one. This low power operation also contributes signifi-
cantly to the excellent long-term calibration stability of the AD640.
The complete AD640, shown in Figure 17, includes two bias
regulators. One determines the small signal gain of the amplifier
stages; the other determines the logarithmic slope. These bias
regulators maintain a high degree of stability in the resulting
function by compensating for potentially large uncertainties
in transistor parameters, temperature and supply voltages. A
third biasing block is used to accurately control the logarithmic
intercept.
Transistors Q3 through Q6 form the full wave detector, whose
output is buffered by the cascodes Q9 and Q10. For zero input
Q3 and Q5 conduct only a small amount (a total of about
32 µA) of the 565 µA tail currents supplied to pairs Q3–Q4 and
Q5–Q6. This “pedestal” current flows in output cascode Q9 to
the LOG OUT node (Pin 14). When driven to the peak output
of the preceding stage, Q3 or Q5 (depending on signal polarity)
conducts lost of the tail current, and the output rises to 532 µA.
The LOG OUT current has thus changed by 500 µA as the
input has changed from zero to its maximum value. Since the
detectors are spaced at 10 dB intervals, the output increases by
By summing the signals at the output of the detectors, a good
approximation to a logarithmic transfer function can be achieved.
The lower the stage gain, the more accurate the approximation,
but more stages are then needed to cover a given dynamic
range. The choice of 10 dB results in a theoretical periodic
RG1
17
RG0
16
RG2
15
LOG OUT
14
LOG COM
13
1k⍀
1k⍀
12 +V
INTERCEPT POSITIONING BIAS
S
18
19
COM
FULL-WAVE
DETECTOR
FULL-WAVE
DETECTOR
FULL-WAVE
DETECTOR
FULL-WAVE
DETECTOR
FULL-WAVE
DETECTOR
ATN OUT
20
1
SIG +IN
SIG –IN
ATN LO
11
10
SIG +OUT
SIG –OUT
10dB
10dB
10dB
10dB
10dB
AMPLIFIER/LIMITER
AMPLIFIER/LIMITER
AMPLIFIER/LIMITER
AMPLIFIER/LIMITER
AMPLIFIER/LIMITER
2
27⍀
30⍀
3
4
ATN COM
ATN COM
BL2
ITC
9
8
270⍀
5
6
7
SLOPE BIAS REGULATOR
GAIN BIAS REGULATOR
ATN IN
BL1
–V
S
Figure 17. Block Diagram of the Complete AD640
–7–
REV. C
AD640
50 µA/dB, or 1 mA per decade. This scaling parameter is
trimmed to absolute accuracy using a 2 kHz square wave. At
frequencies near the system bandwidth, the slope is reduced due
to the reduced output of the limiter stages, but it is still rela-
tively insensitive to temperature variations so that a simple ex-
ternal slope adjustment in restore scaling accuracy.
2.5
2.0
1.5
1.0
0.5
0
–55؇C
+25؇C
1
0
–1
–2
+85؇C
+125؇C
The intercept position bias generator (Figure 17) removes the
pedestal current from the summed detector outputs. It is ad-
justed during manufacture such that the output (flowing into
Pin 14) is 1 mA when a 2 kHz square-wave input of exactly
±10 mV is applied to the AD640. This places the dc intercept at
precisely 1 mV. The LOG COM output (Pin 13) is the comple-
ment of LOG OUT. It also has a 1 mV intercept, but with an
inverted slope of –1 mA/decade. Because its pedestal is very
large (equivalent to about 100 dB), its intercept voltage is not
guaranteed. The intercept positioning currents include a special
internal temperature compensation (ITC) term which can be
disabled by connecting Pin 8 to ground.
–0.5
1
10
100
INPUT VOLTAGE – mV
1000
10000
Figure 19. Logarithmic Output and Absolute Error vs. DC
or Square Wave Input at TA = –55°C, +25°C, +85°C and
+125°C, Input via On-Chip Attenuator
roughly a square waveform. The signal path may be extended
using these outputs (see OPERATION OF CASCADED
AD640s). The logarithmic outputs from two or more AD640s
can be directly summed with full accuracy.
The logarithmic function of the AD640 is absolutely calibrated
to within ±0.3 dB (or ±15 µA) for 2 kHz square-wave inputs of
±1 mV to ±100 mV, and to within ±1 dB between ±750 µV and
±200 mV. Figure 18 is a typical plot of the dc transfer function,
showing the outputs at temperatures of –55°C, +25°C and
+125°C. While the slope and intercept are seen to be little af-
fected by temperature, there is a lateral shift in the endpoints of
the “linear” region of the transfer function, which reduces the
effective dynamic range. The cause of this shift is explained in
Fundamentals of Logarithmic Conversion section.
A pair of 1 kΩ applications resistors, RG1 and RG2 (Figure 17)
are accessed via Pins 15, 16 and 17. These can be used to con-
vert an output current to a voltage, with a slope of 1 V/decade
(using one resistor), 2 V/decade (both resistors in series) or
0.5 V/decade (both in parallel). Using all the resistors from two
AD640s (for example, in a cascaded configuration) ten slope
options from 0.25 V to 4 V/decade are available.
2.5
+125؇C
+25؇C
–55؇C
FUNDAMENTALS OF LOGARITHMIC CONVERSION
The conversion of a signal to its equivalent logarithmic value
involves a nonlinear operation, the consequences of which can be
very confusing if not fully understood. It is important to realize
from the outset that many of the familiar concepts of linear
circuits are of little relevance in this context. For example, the
incremental gain of an ideal logarithmic converter approaches
infinity as the input approaches zero. Further, an offset at the
output of a linear amplifier is simply equivalent to an offset at
the input, while in a logarithmic converter it is equivalent to a
change of amplitude at the input—a very different relationship.
2
2.0
1.5
1.0
0.5
0
1
0
–1
–2
–55؇C
+25؇C
+125؇C
–0.5
We assume a dc signal in the following discussion to simplify the
concepts; ac behavior and the effect of input waveform on cali-
bration are discussed later. A logarithmic converter having a
voltage input VIN and output VOUT must satisfy a transfer func-
tion of the form
0.1
1.0
10.0
INPUT VOLTAGE – mV
100.0
1000.0
Figure 18. Logarithmic Output and Absolute Error vs. DC
or Square Wave Input at TA = –55°C, +25°C, Input Direct
to Pins 1 and 20
The on chip attenuator can be used to handle input levels 20 dB
higher, that is, from ±7.5 mV to ±2 V for dc or square wave
inputs. It is specially designed to have a positive temperature
coefficient and is trimmed to position the intercept at 10 mV dc
(or –24 dBm for a sinusoidal input) over the full temperature
range. When using the attenuator the internal bias compensa-
tion should be disabled by grounding Pin 8. Figure 19 shows
the output at –55°C, +25°C, +85°C and +125°C for a single
AD640 with the attenuator in use; the curves overlap almost
perfectly, and the lateral shift in the transfer function does not
occur. Therefore, the full dynamic range is available at all
temperatures.
V
OUT = VY LOG (VIN/VX)
Equation (1)
where Vy and Vx are fixed voltages which determine the scaling
of the converter. The input is divided by a voltage because the
argument of a logarithm has to be a simple ratio. The logarithm
must be multiplied by a voltage to develop a voltage output.
These operations are not, of course, carried out by explicit com-
putational elements, but are inherent in the behavior of the
converter. For stable operation, VX and VY must be based on
sound design criteria and rendered stable over wide temperature
and supply voltage extremes. This aspect of RF logarithmic
amplifier design has traditionally received little attention.
When VIN = VX, the logarithm is zero. VX is, therefore, called
the Intercept Voltage, because a graph of VOUT versus LOG (VIN)
—ideally a straight line—crosses the horizontal axis at this point
The output of the final limiter is available in differential form at
Pins 10 and 11. The output impedance is 75 Ω to ground from
either pin. For most input levels, this output will appear to have
–8–
REV. C
AD640
(see Figure 20). For the AD640, VX is calibrated to exactly
1 mV. The slope of the line is directly proportional to VY. Base
10 logarithms are used in this context to simplify the relation-
ship to decibel values. For VIN = 10 VX, the logarithm has a
value of 1, so the output voltage is VY. At VIN = 100 VX, the
output is 2 VY, and so on. VY can therefore be viewed either as
the Slope Voltage or as the Volts per Decade Factor.
When the attenuator is not used, the PTAT variation in VX
will result in the intercept being temperature dependent. Near
300K (27°C) it will vary by 20 LOG (301/300) dB/°C, about
0.03 dB/°C. Unless corrected, the whole output function would
drift up or down by this amount with changes in temperature. In
the AD640 a temperature compensating current IYLOG(T/TO)
is added to the output. This effectively maintains a constant
intercept VXO. This correction is active in the default state (Pin
8 open circuited). When using the attenuator, Pin 8 should be
grounded, which disables the compensation current. The drift
term needs to be compensated only once; when the outputs of
two AD540s are summed, Pin 8 should be grounded on at least
one of the two devices (both if the attenuator is used).
IDEAL
V LOG (V /V )
Y
IN
X
ACTUAL
2V
V
Y
SLOPE = V
Y
Y
Conversion Range
Practical logarithmic converters have an upper and lower limit
on the input, beyond which errors increase rapidly. The upper
limit occurs when the first stage in the chain is driven into limit-
ing. Above this, no further increase in the output can occur and
the transfer function flattens off. The lower limit arises because
a finite number of stages provide finite gain, and therefore at
low signal levels the system becomes a simple linear amplifier.
0
INPUT ON
LOG SCALE
ACTUAL
V
= V
V
= 10V
V
= 100V
IN
X
IN
X
IN X
IDEAL
Figure 20. Basic DC Transfer Function of the AD640
Note that this lower limit is not determined by the intercept
voltage, VX; it can occur either above or below VX, depending
on the design. When using two AD640s in cascade, input offset
voltage and wideband noise are the major limitations to low
level accuracy. Offset can be eliminated in various ways. Noise
can only be reduced by lowering the system bandwidth, using a
filter between the two devices.
The AD640 conforms to Equation (1) except that its two out-
puts are in the form of currents, rather than voltages:
I
OUT = IY LOG (VIN/VX)
Equation (2)
IY the Slope Current, is 1 mA. The current output can readily be
converted to a voltage with a slope of 1 V/decade, for example,
using one of the 1 kΩ resistors provided for this purpose, in
conjunction with an op amp, as shown in Figure 21.
EFFECT OF WAVEFORM ON INTERCEPT
R2
1mA PER
DECADE
The absolute value response of the AD640 allows inputs of
either polarity to be accepted. Thus, the logarithmic output in
response to an amplitude-symmetric square wave is a steady
value. For a sinusoidal input the fluctuating output current will
usually be low-pass filtered to extract the baseband signal. The
unfiltered output is at twice the carrier frequency, simplifying the
design of this filter when the video bandwidth must be maxi-
mized. The averaged output depends on waveform in a roughly
analogous way to waveform dependence of rms value. The effect
is to change the apparent intercept voltage. The intercept volt-
age appears to be doubled for a sinusoidal input, that is, the
averaged output in response to a sine wave of amplitude (not rms
value) of 20 mV would be the same as for a dc or square wave
input of 10 mV. Other waveforms will result in different inter-
cept factors. An amplitude-symmetric-rectangular waveform
has the same intercept as a dc input, while the average of a
baseband unipolar pulse can be determined by multiplying the
response to a dc input of the same amplitude by the duty cycle.
It is important to understand that in responding to pulsed RF
signals it is the waveform of the carrier (usually sinusoidal) not
the modulation envelope, that determines the effective intercept
voltage. Table I shows the effective intercept and resulting deci-
bel offset for commonly occurring waveforms. The input wave-
form does not affect the slope of the transfer function. Figure 22
shows the absolute deviation from the ideal response of cascaded
AD640s for three common waveforms at input levels from
–80 dBV to –10 dBV. The measured sine wave and triwave
responses are 6 dB and 8.7 dB, respectively, below the square
wave response—in agreement with theory.
R1
48.7⍀
AD844
C1
330pF
OUTPUT VOLTAGE
1V PER DECADE
FOR R2 = 1k⍀
100mV PER dB
for R2 = 2k⍀
15
14
13
12
11
SIG
+OUT
LOG LOG +V
OUT COM
S
AD640
SIG
–V
ITC BL2 –OUT
S
6
10
7
9
8
Figure 21. Using an External Op Amp to Convert the
AD640 Output Current to a Buffered Voltage Output
Intercept Stabilization
Internally, the intercept voltage is a fraction of the thermal volt-
age kT/q, that is, VX = VXOT/TO, where VXO is the value of VX
at a reference temperature TO. So the uncorrected transfer
function has the form
I
OUT = IY LOG (VIN TO/VXOT)
Equation (3)
Now, if the amplitude of the signal input VIN could somehow be
rendered PTAT, the intercept would be stable with tempera-
ture, since the temperature dependence in both the numerator
and denominator of the logarithmic argument would cancel.
This is what is actually achieved by interposing the on-chip
attenuator, which has the necessary temperature dependence to
cause the input to the first stage to vary in proportion to abso-
lute temperature. The end limits of the dynamic range are now
totally independent of temperature. Consequently, this is the
preferred method of intercept stabilization for applications
where the input signal is sufficiently large.
REV. C
–9–
AD640
Table I.
Intercept
The accuracy at low signal inputs is also waveform dependent.
The detectors are not perfect absolute value circuits, having a
sharp “corner” near zero; in fact they become parabolic at low
levels and behave as if there were a dead zone. Consequently,
the output tends to be higher than ideal. When there are enough
stages in the system, as when two AD640s are connected in
cascade, most detectors will be adequately loaded due to the
high overall gain, but a single AD640 does not have sufficient
gain to maintain high accuracy for low level sine wave or triwave
inputs. Figure 23 shows the absolute deviation from calibration
for the same three waveforms for a single AD640. For inputs
between –10 dBV and –40 dBV the vertical displacement of the
traces for the various waveforms remains in agreement with the
predicted dependence, but significant calibration errors arise at
low signal levels.
Input
Waveform
Peak
or RMS
Error (Relative
to a DC Input)
Factor
Square Wave
Sine Wave
Sine Wave
Triwave
Triwave
Gaussian Noise
Either
Peak
rms
Peak
rms
1
2
0.00 dB
–6.02 dB
–3.01 dB
–8.68 dB
–3.91 dB
–5.52 dB
1.414(√2)
2.718 (e)
1.569(e/√3)
1.887
rms
Logarithmic Conformance and Waveform
The waveform also affects the ripple, or periodic deviation from
an ideal logarithmic response. The ripple is greatest for dc or
square wave inputs because every value of the input voltage
maps to a single location on the transfer function and thus
traces out the full nonlinearities in the logarithmic response.
SIGNAL MAGNITUDE
AD640 is a calibrated device. It is, therefore, important to be
clear in specifying the signal magnitude under all waveform
conditions. For dc or square wave inputs there is, of course, no
ambiguity. Bounded periodic signals, such as sinusoids and
triwaves, can be specified in terms of their simple amplitude
(peak value) or alternatively by their rms value (which is a mea-
sure of power when the impedance is specified). It is generally bet-
ter to define this type of signal in terms of its amplitude because
the AD640 response is a consequence of the input voltage, not
power. However, provided that the appropriate value of inter-
cept for a specific waveform is observed, rms measures may be
used. Random waveforms can only be specified in terms of rms
value because their peak value may be unbounded, as is the case
for Gaussian noise. These must be treated on a case-by-case
basis. The effective intercept given in Table I should be used for
Gaussian noise inputs.
By contrast, a general time varying signal has a continuum of
values within each cycle of its waveform. The averaged output is
thereby “smoothed” because the periodic deviations away from
the ideal response, as the waveform “sweeps over” the transfer
function, tend to cancel. This smoothing effect is greatest for a
triwave input, as demonstrated in Figure 22.
2
SQUARE WAVE INPUT
0
–2
–4
SINE WAVE INPUT
–6
On the other hand, for bounded signals the amplitude can be
expressed either in volts or dBV (decibels relative to 1 V). For
example, a sine wave or triwave of 1 mV amplitude can also be
defined as an input of –60 dBV, one of 100 mV amplitude as
–20 dBV, and so on. RMS value is usually expressed in dBm
(decibels above 1 mW) for a specified impedance level. Through-
out this data sheet we assume a 50 Ω environment, the customary
impedance level for high speed systems, when referring to signal power
in dBm. Bearing in mind the above discussion of the effect of
waveform on the intercept calibration of the AD640, it will be
apparent that a sine wave at a power of, say, –10 dBm will not
produce the same output as a triwave or square wave of the
same power. Thus, a sine wave at a power level of –10 dBm has
an rms value of 70.7 mV or an amplitude of 100 mV (that is, √2
times as large, the ratio of amplitude to rms value for a sine
wave), while a triwave of the same power has an amplitude
which is √3 or 1.73 times its rms value, or 122.5 mV.
–8
TRIWAVE INPUT
–10
–80
–70
–60
–50
–40
–30
–20
–10
INPUT AMPLITUDE IN dB ABOVE 1V, AT 10kHz
Figure 22. Deviation from Exact Logarithmic Transfer
Function for Two Cascaded AD640s, Showing Effect of
Waveform on Calibration and Linearity
4
2
SQUARE WAVE INPUT
0
–2
–4
SINE WAVE INPUT
“Intercept” and “Logarithmic Offset”
If the signals are expressed in dBV, we can write the output in a
simpler form, as
–6
–8
TRIWAVE INPUT
–10
I
OUT = 50 µA (InputdBV – XdBV
)
Equation (4)
where InputdBV is the input voltage amplitude (not rms) in dBV
and XdBV is the appropriate value of the intercept (for a given
waveform) in dBV. This form shows more clearly why the intercept
is often referred to as the logarithmic offset. For dc or square
wave inputs, VX is 1 mV so the numerical value of XdBV is –60,
and Equation (4) becomes
–12
–70
–60
–50
–40
–30
–20
–10
INPUT AMPLITUDE IN dB ABOVE 1V, AT 10kHz
Figure 23. Deviation from Exact Logarithmic Transfer
Function for a Single AD640; Compare Low Level
Response with that of Figure 22
–10–
REV. C
AD640
I
OUT = 50 µA (InputdBV + 60)
Equation (5)
Erie RPE113-Z5U-105-K50V). Ferrite beads may be used
instead of supply decoupling resistors in cases where the supply
voltage is low.
Alternatively, for a sinusoidal input measured in dBm (power in
dB above 1 mW in a 50 Ω system) the output can be written
Active Current-to-Voltage Conversion
I
OUT = 50 µA (InputdBm + 44)
Equation (6)
The compliance at LOG OUT limits the available output volt-
age swing. The output of the AD640 may be converted to a
larger, buffered output voltage by the addition of an operational
amplifier connected as a current-to-voltage (transresistance)
stage, as shown in Figure 21. Using a 2 kΩ feedback resistor
(R2) the 50 µA/dB output at LOG OUT is converted to a volt-
age having a slope of +100 mV/dB, that is, 2 V per decade. This
output ranges from roughly –0.4 V for zero signal inputs to the
AD640, crosses zero at a dc input of precisely +1 mV (or
–1 mV) and is +4 V for a dc input of 100 mV. A passive
prefilter, formed by R1 and C1, minimizes the high frequency
energy conveyed to the op amp. The corner frequency is here
shown as 10 MHz. The AD844 is recommended for this appli-
cation because of its excellent performance in transresistance
modes. Its bandwidth of 35 MHz (with the 2 kΩ feedback resis-
tor) will exceed the baseband response of the system in most
applications. For lower bandwidth applications other op amps
and multipole active filters may be substituted (see, for example,
Figure 32 in the APPLICATIONS section).
because the intercept for a sine wave expressed in volts rms is at
1.414 mV (from Table I) or –44 dBm.
OPERATION OF A SINGLE AD640
Figure 24 shows the basic connections for a single device, using
100 Ω load resistors. Output A is a negative going voltage with a
slope of –100 mV per decade; output B is positive going with a
slope of +100 mV per decade. For applications where absolute
calibration of the intercept is essential, the main output (from
LOG OUT, Pin 14) should be used; the LOG COM output can
then be grounded. To evaluate the demodulation response, a
simple low-pass output filter having a time constant of roughly
500 µs (3 dB corner of 320 Hz) is provided by a 4.7 µF (–20%
+80%) ceramic capacitor (Erie type RPE117-Z5U-475-K50V)
placed across the load. A DVM may be used to measure the
averaged output in verification tests. The voltage compliance at
Pins 13 and 14 extends from 0.3 V below ground up to 1 V
below +VS. Since the current into Pin 14 is from –0.2 mA at
zero signal to +2.3 mA when fully limited (dc input of >300 mV)
the output never drops below –230 mV. On the other hand, the
current out of Pin 13 ranges from 0.2 mA to +2.3 mA, and if
desired, a load resistor of up to 2 kΩ can be used on this output;
the slope would then be 2 V per decade. Use of the LOG COM
output in this way provides a numerically correct decibel read-
ing on a DVM (+100 mV = +1.00 dB).
Effect of Frequency on Calibration
The slope and intercept of the AD640 are calibrated during
manufacture using a 2 kHz square wave input. Calibration de-
pends on the gain of each stage being 10 dB. When the input
frequency is an appreciable fraction of the 350 MHz bandwidth
of the amplifier stages, their gain becomes imprecise and the
logarithmic slope and intercept are no longer fully calibrated.
However, the AD640 can provide very stable operation at fre-
quencies up to about one half the 3 dB frequency of the ampli-
fier stages. Figure 10 shows the averaged output current versus
input level at 30 MHz, 60 MHz, 90 MHz and 120 MHz. Fig-
ure 11 shows the absolute error in the response at 60 MHz and
at temperatures of –55°C, +25°C and +125°C. Figure 12 shows
the variation in the slope current, and Figure 13 shows the
variation in the intercept level (sinusoidal input) versus frequency.
Board layout is very important. The AD640 has both high gain
and wide bandwidth; therefore every signal path must be very
carefully considered. A high quality ground plane is essential,
but it should not be assumed that it behaves as an equipotential
plane. Even though the application may only call for modest
bandwidth, each of the three differential signal interface pairs
(SIG IN, Pins 1 and 20, SIG OUT, Pins 10 and 11, and LOG,
Pins 13 and 14) must have their own “starred” ground points to
avoid oscillation at low signal levels (where the gain is highest).
If absolute calibration is essential, or some other value of slope
or intercept is required, there will usually be some point in the
user’s system at which an adjustment may be easily introduced.
For example, the 5% slope deficit at 30 MHz (see Figure 12)
may be restored by a 5% increase in the value of the load resis-
tor in the passive loading scheme shown in Figure 24, or by
inserting a trim potentiometer of 100 Ω in series with the feed-
back resistor in the scheme shown in Figure 21. The intercept
Unused pins (excluding Pins 8, 10 and 11) such as the attenua-
tor and applications resistors should be grounded close to the
package edge. BL1 (Pin 6) and BL2 (Pin 9) are internal bias
lines a volt or two above the –VS node; access is provided solely
for the addition of decoupling capacitors, which should be con-
nected exactly as shown (not all of them connect to the ground).
Use low impedance ceramic 0.1 µF capacitors (for example,
DENOTES A SHORT, DIRECT CONNECTION
TO THE GROUND PLANE.
10⍀
+5V
ALL UNMARKED CAPACITORS ARE
0.1F CERAMIC (SEE TEXT)
OUTPUT A
OUTPUT B
NC
20
19
18
17
16
15
14
13
12
11
R
100⍀
0.1%
R
LB
100⍀
0.1%
OPTIONAL
TERMINATION
RESISTOR
LA
SIG ATN CKT RG1 RG0 RG2 LOG LOG +V
SIG
+OUT
S
4.7F
4.7F
+IN OUT COM
OUT COM
1k⍀ 1k⍀
AD640
SIGNAL
INPUT
SIG
SIG ATN ATN ATN ATN
–IN LO COM COM IN
–V
7
BL1
6
ITC BL2 –OUT
S
1
4
8
9
10
2
3
5
NC
NC
4.7⍀
OPTIONAL
–5V
OFFSET BALANCE
RESISTOR
NC = NO CONNECT
Figure 24. Connections for a Single AD640 to Verify Basic Performance
–11–
REV. C
AD640
CASCADED OPERATION explains how the offset can be
automatically nulled to submicrovolt levels by the use of a nega-
tive feedback network.
can be adjusted by adding or subtracting a small current to the
output. Since the slope current is 1 mA/decade, a 50 µA incre-
ment will move the intercept by 1 dB. Note that any error in
this current will invalidate the calibration of the AD640. For
example, if one of the 5 V supplies were used with a resistor to
generate the current to reposition the intercept by 20 dB, a
±10% variation in this supply will cause a ±2 dB error in the
absolute calibration. Of course, slope calibration is unaffected.
Using Higher Supply Voltages
The AD640 is calibrated using ±5 V supplies. Scaling is very
insensitive to the supply voltages (see dc SPECIFICATIONS)
and higher supply voltages will not directly cause significant
errors. However, the AD640 power dissipation must be kept
below 500 mW in the interest of reliability and long-term stabil-
ity. When using well regulated supply voltages above ±6 V, the
decoupling resistors shown in the application schematics can be
increased to maintain ±5 V at the IC. The resistor values are
calculated using the specified maximum of 15 mA current into
the +VS terminal (Pin 12) and a maximum of 60 mA into the
–VS terminal (Pin 7). For example, when using ±9 V supplies, a
resistor of (9 V–5 V)/15 mA, about 261 Ω, should be included in
the +VS lead to each AD640, and (9 V–5 V)/60 mA, about 64.9 Ω,
in each –VS lead. Of course, asymmetric supplies may be dealt
with in a similar way.
Source Resistance and Input Offset
The bias currents at the signal inputs (Pins 1 and 20) are typi-
cally 7 µA. These flow in the source resistances and generate
input offset voltages which may limit the dynamic range because
the AD640 is direct coupled and an offset is indistinguishable
from a signal. It is good practice to keep the source resistances
as low as possible and to equalize the resistance seen at each
input. For example, if the source resistance to Pin 20 is 100 Ω, a
compensating resistor of 100 Ω should be placed in series with
Pin l. The residual offset is then due to the bias current offset,
which is typically under 1 µA, causing an extra offset uncertainty
of 100 µV in this example. For a single AD640 this will rarely be
troublesome, but in some applications it may need to be nulled
out, along with the internal voltage offset component. This may
be achieved by adding an adjustable voltage of up to ±250 µV at
the unused input. (Pins l and 20 may be interchanged with no
change in function.)
Using the Attenuator
In applications where the signal amplitude is sufficient, the on-
chip attenuator should be used because it provides a tempera-
ture independent dynamic range (compare Figures 18 and 19).
Figure 26 shows this attenuator in more detail. R1 is a thin-film
resistor of nominally 270 Ω and low temperature coefficient
(TC). It is trimmed to calibrate the intercept to 10 mV dc (or
–24 dBm for sinusoidal inputs), that is, to an attenuation of
nominally 20 dBs at 27°C. R2 has a nominal value of 30 Ω and
has a high positive TC, such that the overall attenuation factor
is 0.33%/°C at 27°C. This results in a transmission factor that is
proportional to absolute temperature, or PTAT. (See Intercept
Stabilization for further explanation.) To improve the accuracy
of the attenuator, the ATN COM nodes are bonded to both
Pin 3 and Pin 4. These should be connected directly to the “SIG-
NAL LOW” of the source (for example, to the grounded side of
the signal connector, as shown in Figure 32) not to an arbitrary
point on the ground plane.
In most applications there will be no need to use any offset
adjustment. However, a general offset trimming circuit is shown
in Figure 25. RS is the source resistance of the signal. Note: 50 Ω
rf sources may include a blocking capacitor and have no dc path to
ground, or may be transformer coupled and have a near zero resis-
tance to ground. Determine whether the source resistance is zero,
25 Ω or 50 Ω (with the generator terminated in 50 Ω) to find
the correct value of bias compensating resistor, RB, which
should optimally be equal to RS, unless RS = 0, in which case
use RB = 5 Ω. The value of ROS should be set to 20,000 RB to
provide a ±250 µV trim range. To null the offset, set the source
voltage to zero and use a DVM to observe the logarithmic out-
put voltage. Recall that the LOG OUT current of the AD640
exhibits an absolute value response to the input voltage, so the offset
potentiometer is adjusted to the point where the logarithmic output
“turns around” (reaches a local maximum or minimum).
SIG
+IN
ATN
OUT
20
19
18
17
16
R1
AD640
R2
R
S
(SOURCE RESISTANCE
OF TERMINATED
GENERATOR)
20
19
FIRST
AMPLIFIER
R3
R4
AD640
1
2
1
2
3
4
5
R
B
ATN
LO
SIG
–IN
ATN
ATN ATN
COM COM
IN
+5V
20k⍀
–5V
R
OS
INPUT
Figure 26. Details of the Input Attenuator
Figure 25. Optional Input Offset Voltage Nulling Circuit;
See Text for Component Values
R4 is identical to R2, and in shunt with R3 (270 Ω thin film)
forms a 27 Ω resistor with the same TC as the output resistance
of the attenuator. By connecting Pin 1 to ATN LOW (Pin 2)
this resistance minimizes the offset caused by bias currents. The
offset nulling scheme shown in Figure 25 may still be used, with
the external resistor RB omitted and ROS = 500 kΩ. Offset sta-
bility is improved because the compensating voltage introduced
at Pin 20 is now PTAT. Drifts of under 1 µV/°C (referred to
Pins 1 and 20) can be maintained using the attenuator.
At high frequencies it may be desirable to insert a coupling
capacitor and use a choke between Pin 20 and ground, when
Pin 1 should be taken directly to ground. Alternatively, trans-
former coupling may be used. In these cases, there is no added
offset due to bias currents. When using two dc coupled AD640s
(overall gain 100,000), it is impractical to maintain a sufficiently
low offset voltage using a manual nulling scheme. The section
–12–
REV. C
AD640
It may occasionally be desirable to attenuate the signal even
further. For example, the source may have a full-scale value of
±10 V, and since the basic range of the AD640 extends only to
±200 mV dc, an attenuation factor of ×50 might be chosen.
This may be achieved either by using an independent external
attenuator or more simply by adding a resistor in series with
ATN IN (Pin 5). In the latter case the resistor must be trimmed
to calibrate the intercept, since the input resistance at Pin 5 is
not guaranteed. A fixed resistor of 1 kΩ in series with a 500 Ω
variable resistor calibrate to an intercept of 50 mV (or –26 dBV)
for dc or square wave inputs and provide a ±10 V input range.
The intercept stability will be degraded to about 0.003 dB/°C.
to null the input offset and minimize drift due to input bias
offset. It is recommended that the input attenuator be used,
providing a practical input range of –74 dBV (±200 µV dc) to
+6 dBV (±2 V dc) when nulled using the adjustment circuit
shown in Figure 25.
Eliminating the Effect of First Stage Offset
Usually, the input signal will be sinusoidal and U1 and U2 can
be ac coupled. Figure 28a shows a low resistance choke at the
input of U2 which shorts the dc output of U1 while preserving
the hf response. Coupling capacitors may be inserted (Fig-
ure 28b) in which case two chokes are used to provide bias
paths for U2. These chokes must exhibit high impedance over
the operating frequency range.
OPERATION OF CASCADED AD640S
Frequently, the dynamic range of the input will be 50 dB or
more. AD640s can be cascaded, as shown in Figure 27. The
balanced signal output from U1 becomes the input to U2. Re-
sistors are included in series with each LOG OUT pin and
capacitors C1 and C2 are placed directly between Pins 13 and 14
to provide a local path for the RF current at these output pairs.
C1 through C3 are chosen to provide the required low-pass
corner in conjunction with the load RL. Board layout and
grounding disciplines are critically important at the high gain
(X100,000) and bandwidth (~150 MHz) of this system.
11
11
20
20
U2
U2
U1
U1
1
1
10
10
a.
b.
Figure 28. Two Methods for AC-Coupling AD640s
Alternatively, the input offset can be nulled by a negative feed-
back network from the SIG OUT nodes of U2 to the SIG IN
nodes of U1, as shown in Figure 29. The low-pass response of
the feedback path transforms to a closed-loop high-pass re-
sponse. The high gain (×100,000) of the signal path results in a
commensurate reduction in the effective time constant of this
network. For example, to achieve a high-pass corner of 100 kHz,
the low-pass corner must be at 1 Hz.
The intercept voltage is calculated as follows. First, note that if
its LOG OUT is disconnected, U1 simply inserts 50 dB of
gain ahead of U2. This would lower the intercept by 50 dB, to
–110 dBV for square wave calibration. With the LOG OUT of
U1 added in, there is a finite zero signal current which slightly
shifts the intercept. With the intercept temperature compensa-
tion on U1 disabled this zero signal output is –270 µA (see DC
SPECIFICATIONS) equivalent to a 5.4 dB upward shift in the
intercept, since the slope is 50 µA/dB. Thus, the intercept is at
–104.6 dBV (–88.6 dBm for 50 Ω sine calibration). ITC may be
disabled by grounding Pin 8 of either U1 or U2.
In fact, it is somewhat more complicated than this. When the ac
input sufficiently exceeds that of the offset, the feedback be-
comes ineffective and the response becomes essentially dc
coupled. Even for quite modest inputs the last stage will be
limiting and the output (Pins 10 and 11) of U2 will be a square
wave of about ±180 mV amplitude, dwelling approximately
equal times at its two limit values, and thus having a net average
value near zero. Only when the input is very small does the high-
pass behavior of this nulling loop become apparent. Consequently,
the low-pass time constant can usually be reduced considerably
without serious performance degradation.
Cascaded AD640s can be used in dc applications, but input
offset voltage will limit the dynamic range. The dc intercept is
6 µV. The offset should not be confused with the intercept, which is
found by extrapolating the transfer function from its central “log
linear” region. This can be understood by referring to Equation
(1) and noting that an input offset is simply additive to the value
of VIN in the numerator of the logarithmic argument; it does not
affect the denominator (or intercept) VX. In dc coupled applica-
tions of wide dynamic range, special precautions must be taken
The resistor values are chosen such that the dc feedback is ade-
quate to null the worst case input offset, say, 500 µV. There
DENOTES A CONNECTION TO THE GROUND PLANE;
OBSERVE COMMON CONNECTIONS WHERE SHOWN.
ALL UNMARKED CAPACITORS ARE 0.1F CERAMIC.
SEE TEXT FOR VALUES OF NUMBERED COMPONENTS.
+5V
1mA/DECADE
OUTPUT
–50mV/DECADE
10⍀
10⍀
10⍀
10⍀
NC
C1
C2
C3
R = 50⍀
L
20
18
16
14
13
12
20
18
16
14
13
12
19
17
15
11
19
17
15
11
SIG ATN CKT RG1 RG0 RG2 LOG LOG +V
SIG
+OUT
SIG ATN CKT RG1 RG0 RG2 LOG LOG +V
SIG
+OUT
S
S
+IN OUT COM
OUT COM
+IN OUT COM
OUT COM
SIGNAL
INPUT
1k⍀ 1k⍀
1k⍀ 1k⍀
R1
U1 AD640
U2 AD640
SIG
SIG
SIG ATN ATN ATN ATN
–IN LO COM COM IN
SIG ATN ATN ATN ATN
–IN LO COM COM IN
–V
7
–V
7
BL1
6
ITC BL2 –OUT
BL1
6
ITC BL2 –OUT
S
S
1
3
4
5
8
9
10
1
3
4
5
8
9
10
2
2
R2
NC
NC
NC = NO CONNECT
4.7⍀
4.7⍀
–5V
Figure 27. Basic Connections for Cascaded AD640s
–13–
REV. C
AD640
14A
must be some resistance at Pins 1 and 20 across which the offset
compensation voltage is developed. The values shown in the
figure assume that we wish to terminate a 50 Ω source at Pin 20.
The 50 Ω resistor at Pin 1 is essential, both to minimize offsets
due to bias current mismatch and because the outputs at Pins
10 and 11 can only swing negatively (from ground to –180 mV)
whereas we need to cater for input offsets of either polarity.
R4
R3
A
= –40mV
4.99k⍀
4.99k⍀
VE
–200V
20
R1
11
11
10
20
C1
C2
INPUT
50⍀
U2
U1
R2
50⍀
1
1
10
–700V
R5
4.99k⍀
R6
4.99k⍀
A
= –140mV
VE
For a sine input of 1 µV amplitude (–120 dBV) and in the
absence of offset, the differential voltage at Pins 10 and 11 of
U2 would be almost sinusoidal but 100,000 times larger, or
100 mV. The last limiter in U2 would be entering saturation. A
1 µV input offset added to this signal would put the last limiter
well into saturation, and its output would then have a different
average value, which is extracted by the low-pass network and
delivered back to the input. For larger signals, the output ap-
proaches a square wave for zero input offset and becomes rect-
angular when offset is present. The duty cycle modulation of
this output now produces the nonzero average value. Assume a
maximum required differential output of 100 mV (after averag-
ing in C1 and C2) as shown in Figure 29. R3 through R6 can
now be chosen to provide ±500 µV of correction range, and with
these values the input offset is reduced by a factor of 500. Using
4.7 µF capacitors, the time constant of the network is about
1.2 ms, and its corner frequency is at 13.5 Hz. The closed loop
high-pass corner (for small signals) is, therefore, at 1.35 MHz.
4A
Figure 29. Feedback Offset Correction Network
–3 dB frequency of the filter must be above the highest fre
quency to be handled by the converter; if not, nonlinearity in
the transfer function will occur. This can be seen intuitively by
noting that the system would then contract to a single AD640 at
very high frequencies (when U2 has very little input). At inter-
mediate frequencies, U2 will contribute less to the output than
would be the case if there were no interstage attenuation, result-
ing in a kink in the transfer function.
More complex filtering may be considered. For example, if the
signal has a fairly narrow bandwidth, the simple chokes shown
in Figure 28 might be replaced by one or more parallel tuned
circuits. Two separate tuned circuits or transformer coupling
should be used to eliminate all undesirable hf common mode
coupling between U1 and U2. The choice of Q for these circuits
requires compromise. Frequency sensitive nonlinearities can
arise at the edges of the band if the Q is set too high; if too low,
the transmission of the signal from U1 to U2 will be affected
even at the center frequency, again resulting in nonlinearity in
the conversion response. In calculating the Q, note that the
resistance from Pins 10 and 11 to ground is 75 Ω. The input
resistance at Pins 1 and 20 is very high, but the capacitances at
these pins must also be factored into the total LCR circuit.
Bandwidth/Dynamic Range Trade-Offs
The first stage noise of the AD640 is 2 nV/√Hz (short circuited
input) and the full bandwidth of the cascaded ten stages is about
150 MHz. Thus, the noise referred to the input is 24.5 µV rms,
or –79 dBm, which would limit the dynamic range to 77 dBs
(–79 dBm to –2 dBm). In practice, the source resistances will
also generate noise, and the full bandwidth dynamic range will
be less than this.
PRACTICAL APPLICATIONS
A low-pass filter between U1 and U2 can limit the noise band-
width and extend the dynamic range. The simplest way to do
this is by the addition of a pair of grounded capacitors at the
signal outputs of U1 (shown as C1 and C2 in Figure 32). The
We show here two applications, using cascaded AD640s to
achieve a wide dynamic range. As already mentioned, the use of
a differential signal path and differential logarithmic outputs
R13
1.13k⍀ (SEE TEXT)
4.7⍀
+6V
DENOTES A CONNECTION TO THE GROUND PLANE;
OBSERVE COMMON CONNECTIONS WHERE SHOWN.
ALL UNMARKED CAPACITORS ARE 0.1F CERAMIC.
SEE TEXT FOR VALUES OF NUMBERED COMPONENTS.
LOG
U3
OUTPUT
AD844
+50mV/dB
4.7⍀
–6V
(LO)
R4
100⍀
R3
100⍀
+6V
68⍀
68⍀
C1
47pF
C2
47pF
NC
11
20
20
19
18
17
16
15
14
13
12
11
19
18
17
16
15
14
13
12
R1
SIG ATN CKT RG1 RG0 RG2 LOG LOG +V
+IN OUT COM
SIG
+OUT
SIG ATN CKT RG1 RG0 RG2 LOG LOG +V
+IN OUT COM
SIG
+OUT
S
S
OUT COM
OUT COM
1k⍀ 1k⍀
1k⍀ 1k⍀
L1
SIGNAL
INPUT
(SEE
TEXT)
U1 AD640
U2 AD640
SIG
SIG
SIG ATN ATN ATN ATN
–IN LO COM COM IN
SIG ATN ATN ATN ATN
–IN LO COM COM IN
–V
7
–V
7
BL1
6
ITC BL2 –OUT
BL1
6
ITC BL2 –OUT
S
S
1
4
8
9
10
1
4
8
9
10
2
3
5
2
3
5
R2
NC
NC
18⍀
18⍀
NC = NO CONNECT
–6V
Figure 30. Complete 70 dB Dynamic Range Converter for 50 MHz–150 MHz Operation
–14–
REV. C
AD640
diminishes the risk of instability due to poor grounding. Never-
theless, it must be remembered that at high frequencies even
very small lengths of wire, including the leads to capacitors,
have significant impedance. The ground plane itself can also
generate small but troublesome voltages due to circulating cur-
rents in a poor layout. A printed circuit evaluation board is
available from Analog Devices (Part Number ADEB640) to
facilitate the prototyping of an application using one or two
AD640s, plus various external components.
A transimpedance op amp (U3, AD844) converts the summed
logarithmic output currents of U1 and U2 to a ground referenced
voltage scaled 1 V per decade. The resistor R5 is nominally 1 kΩ
but is increased slightly to compensate for the slope deficit at the
operating frequency, which can be determined from Figure 12.
The inverting input of U3 forms a virtual ground, so that each
logarithmic output of U1 and U2 is loaded by 100 Ω (R3 or
R4). These resistors in conjunction with capacitors C1 and C2
form independent low-pass filters with a time constant of about
At very low signal levels various effects can cause significant
deviation from the ideal response, apart from the inherent non-
linearities of the transfer function already discussed. Note that
any spurious signal presented to the AD640s is demodulated and
added to the output. Thus, in the absence of thorough shielding,
emissions from any radio transmitters or RFI from equipment
operating in the locality will cause the output to appear too
high. The only cure for this type of error is the use of very care-
ful grounding and shielding techniques.
+1
0
4
3
2
1
–1
50 MHz–150 MHz Converter with 70 dB Dynamic Range
Figure 30 shows a logarithmic converter using two AD640s
which can provide at least 70 dB of dynamic range, limited
mostly by first stage noise. In this application, an rf choke (L1)
prevents the transmission of dc offset from the first to the sec-
ond AD640. One or two turns in a ferrite core will generally
suffice for operation at frequencies above 30 MHz. For ex-
ample, one complete loop of 20 gauge wire through the two
holes in a Fair-Rite type 2873002302 core provides an inductance
of 5 µH, which presents an impedance of 1.57 kΩ at 50 MHz.
The shunting effect across the 150 Ω differential impedance at
the signal interface is thus fairly slight.
0
–70
–60
–50
–40
–30
–20
–10
0
INPUT LEVEL – dBm IN 50⍀
Figure 31. Logarithmic Output and Nonlinearity for Circuit
of Figure 30, for a Sine Wave Input at f = 80 MHz
5 ns. These capacitors should be connected directly across Pins
13 and 14, as shown, to prevent high frequency output currents
from circulating in the ground plane. A second 5 ns time con-
stant is formed by feedback resistor R5 in conjunction with the
transcapacitance of U3.
The signal source is optionally terminated by R1. To minimize
the input offset voltage R2 should be chosen to match the dc
resistance of the terminated source. (However, the offset voltage
is not a critical consideration in this ac-coupled application.)
This filtering is adequate for input frequencies of 50 MHz or
above; more elaborate filtering can be devised for pulse
applications requiring a faster rise time. In applications where
only a long term measure of the input is needed, C1 and C2 can
Note that all unused inputs are grounded; this improves the
isolation from the outputs back to the inputs.
C4
4.7F
DENOTES A CONNECTION TO THE GROUND PLANE;
OBSERVE COMMON CONNECTIONS WHERE SHOWN.
ALL UNMARKED CAPACITORS ARE 0.1F CERAMIC.
C5
0.1F
C3
100F
1/2
9.1V
R1
49.9⍀
1/2
AD712
7
AD712
R2
R3
2
3
+6V
TO U1
AND U2
+15V
50k⍀ 50k⍀
5
6
1
TO U3
U3a
AND U4
U3b
–6V
–15V
+15V
R4
200k⍀
9.1V
C6
0.1F
LOG
OUTPUT
+100mV/dB
0.1F
0.1F
R5
TO U3
AND U4
200k⍀
+6V
68⍀
68⍀
–15V
1/2
AD712
1
R6
3.3M⍀
5k⍀
3
2
A
NC
17
B
U4a
20
19
17
15
11
20
18
16
14
13
12
19
18
16
15
14
13
12
11
C1
(SEE
TEXT)
C7
4.7F
SIG ATN CKT RG1 RG0 RG2 LOG LOG +V SIG
SIG ATN CKT RG1 RG0 RG2 LOG LOG +V SIG
+IN OUT COM
S
S
+IN OUT COM
OUT COM
+OUT
OUT COM
+OUT
1k⍀ 1k⍀
1k⍀ 1k⍀
OFFSET
NULLING
FEEDBACK
OFFSET
U2 AD640
SIG ATN ATN ATN ATN
U1 AD640
NULLING
FEEDBACK
C2
(SEE
TEXT)
SIG ATN ATN ATN ATN
–IN LO COM COM IN BL1 –V ITC BL2 –OUT
SIG
SIG
C8
4.7F
–IN LO COM COM IN BL1 –V ITC BL2 –OUT
S
S
1/2
AD712
1
2
4
8
9
10
3
5
6
7
1
4
8
9
10
2
3
5
6
7
5k⍀
5
6
B
7
R7
3.3M⍀
A
U4b
18⍀
18⍀
NC = NO CONNECT
SIGNAL INPUT
–6V
Figure 32. Complete 95 dB Dynamic Range Converter
REV. C
–15–
AD640
be increased and U3 can be replaced by a low speed op amp.
Figure 31 shows typical performance of this converter.
high-pass filter is only operative for very small inputs; see page
13.) Figure 33 shows the performance for square wave inputs.
Since the attenuator is used, the upper end of the dynamic
range now extends to +6 dBV and the intercept is at –82 dBV.
The noise limited dynamic range is over 100 dB, but in practice
spurious signals at the input will determine the achievable range.
10 Hz–100 kHz Converter with 95 dB Dynamic Range
To increase the dynamic range it is necessary to reduce the
bandwidth by the inclusion of a low-pass filter at the signal
interface between U1 and U2 (Figure 32). To provide operation
down to low frequencies, dc coupling is used at the interface
between AD640s and the input offset is nulled by a feedback
circuit.
2
9
8
7
6
0
–2
Using values of 0.02 µF in the interstage filter formed by capaci-
tors C1 and C2, the hf corner occurs at about 100 kHz. U3
(AD712) forms a 4-pole 35 Hz low-pass filter. This provides
operation to signal frequencies below 20 Hz. The filter response
is not critical, allowing the use of an electrolytic capacitor to
form one of the poles.
5
4
3
2
R1 is restricted to 50 Ω by the compliance at Pin 14, so C3
needs to be large to form a 5 ms time constant. A tantalum
capacitor is used (note polarity). The output of U3a is scaled
+1 V per decade, and the X2 gain of U3b raises this to +2 V per
decade, or +100 mV/dB. The differential offset at the output of
U2 is low-pass filtered by R6/C7 and R7/C8 and buffered by
voltage followers U4a and U4b. The 16s open loop time constant
translates to a closed loop high-pass corner of 10 Hz. (This
1
0
–1
–90 –80 –70 –60 –50 –40 –30 –20 –10
0
1
10 dBV
31.6 100 316 1m 3.16m 10m 31.6m 100m 316m
3.16
V
INPUT AMPLITUDE AT 10kHz
Figure 33. Logarithmic Output and Nonlinearity for Circuit
of Figure 32, for a Square Wave Input at f = 10 kHz
OUTLINE DIMENSIONS
Dimensions shown in inches and (mm).
20-Lead Ceramic DIP (D) Package
20-Lead Plastic DIP (N) Package
0.430 (10.16)
1.070 (27.18)
11
10
20
1
0.310
(7.874)
TYP
0.250
(6.350)
TYP
0.320 (8.13)
0.300 (7.62)
0.300 (7.62)
0.280 (7.11)
20
11
10
1
0.300 (7.62)
TYP
PIN 1
1.010 (25.65)
0.990 (25.15)
0.045 (1.143)
0.025 (0.635)
PIN 1
0.180
(4.572)
MAX
0.125 (3.18)
MIN
0.095
(2.41)
0.085
(2.16)
0.014 (0.356)
0.008 (0.203)
SEATING
PLANE
0.012 (0.30)
0.008 (0.20)
0.210 (5.33)
0.150 (3.81)
0.100
(2.54) (0.838)
TYP TYP
0.033
0.021 (0.533)
0.015 (0.381)
SEATING
PLANE
15؇
0؇
0.020 (0.51)
0.015 (0.38)
0.10
(2.54)
0.054 (1.37)
0.040 (1.01)
0.300 (7.62)
20-Terminal Ceramic LCC (E) Package
20-Lead PLCC (P) Package
0.082 ؎0.018
(2.085 ؎0.455)
0.350 ؎0.008
(8.89 ؎0.20)
0.173 ؎0.008
(4.385 ؎0.185)
SQ
0.040
؋
45؇ (1.02
؋
45؇) REF 3 PLCS
0.105 ؎0.015
(2.665 ؎0.375)
13
19
0.390 ؎0.005
SQ
14
18
(9.905 ؎0.125)
PIN 1
INDEX
0.020 (0.51) MIN
20
0.050
(1.27)
0.025 ؎0.003
(0.635 ؎0.075)
1
0.035 ؎0.01
R
0.045 ؎0.003
(1.143 ؎0.076)
3
19
(0.89 ؎0.25)
PIN 1
IDENTIFIER
18
14
4
8
8
4
0.029 ؎0.003
(0.737 ؎0.076)
9
3
0.20
؋
45؇ (0.51
؋
45؇) REF
0.020
(0.51)
MAX
TOP VIEW
(PINS DOWN)
0.050
(1.27)
BOTTOM VIEW
0.017 ؎0.004
(0.432 ؎0.101)
9
13
0.025 (0.64) MIN
0.020 (0.51)
MAX
0.060 (1.53) MIN
0.353 ؎0.003
(8.966 ؎0.076)
SQ
–16–
REV. C
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