ADE7761ARS-REF Analog Devices Inc, ADE7761ARS-REF Datasheet - Page 16
ADE7761ARS-REF
Manufacturer Part Number
ADE7761ARS-REF
Description
IC ENERGY METERING 20-SSOP
Manufacturer
Analog Devices Inc
Datasheet
1.ADE7761ARS-REF.pdf
(28 pages)
Specifications of ADE7761ARS-REF
Rohs Status
RoHS non-compliant
ADE7761
The low frequency output of the ADE7761 is generated by
accumulating this active power information. This low frequency
inherently means a long accumulation time between output
pulses. The output frequency is, therefore, proportional to the
average active power. This average active power information can
in turn be accumulated (for example, by a counter) to generate
active energy information. Because of its high output frequency
and therefore shorter integration time, the CF output is propor-
tional to the instantaneous active power. This is useful for
system calibration purposes that would take place under steady
load conditions.
Power Factor Considerations
The method used to extract the active power information from
the instantaneous power signal (by low-pass filtering) is still
valid even when the voltage and current signals are not in
phase. Figure 21 displays the unity power factor condition and
a displacement power factor (DPF = 0.5), that is, current signal
lagging the voltage by 60°. If one assumes that the voltage and
current waveforms are sinusoidal, the active power component
of the instantaneous power signal (dc term) is given by
This is the correct active power calculation.
CH1
CH2
V × I
(V × I/2) × cos(60°)
TIME
Figure 20. Signal Processing Block Diagram
POWER SIGNAL –p(t)
ADC
ADC
INSTANTANEOUS
p(t) = i(t).v(t)
WHERE:
MULTIPLIER
v(t) = V × cos(ϖt)
i(t) = I × cos(ϖt)
p(t) = V × I {1 + cos (2ϖt)}
HPF
2
ACTIVE POWER SIGNAL
INSTANTANEOUS
LPF
V × I
2
FREQUENCY
FREQUENCY
DIGITAL-TO-
DIGITAL-TO-
CF
F1
F2
Rev. A | Page 16 of 28
Nonsinusoidal Voltage and Current
The active power calculation method also holds true for
nonsinusoidal current and voltage waveforms. All voltage and
current waveforms in practical applications have some
harmonic content. Using the Fourier transform, instantaneous
voltage and current waveforms can be expressed in terms of
their harmonic content:
where:
v(t) is the instantaneous voltage.
V
V
α
where:
i(t) is the instantaneous current.
I
I
β
V × I
O
h
h
h
2
O
h
is the rms value of current harmonic h.
is the dc component.
is the phase angle of the voltage harmonic.
is the phase angle of the current harmonic.
is the rms value of voltage harmonic h.
is the average value.
× cos(60°)
v
t i
) (
) (
t
V × I
0V
=
2
0V
=
I
V
O
O
CURRENT
VOLTAGE
+
Figure 21. Active Power Calculation over PF
+
VOLTAGE
2
2
INSTANTANEOUS
POWER SIGNAL
×
×
INSTANTANEOUS
POWER SIGNAL
h
∑
h
∞
≠
∑
∞
≠
0
I
0
V
h
h
×
×
sin(
sin(
60°
h
h
ω
ω
t
t
+
INSTANTANEOUS
ACTIVE POWER SIGNAL
+
β
α
h
)
CURRENT
h
INSTANTANEOUS
ACTIVE POWER SIGNAL
)
(2)
(1)
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