MCP3909RD-3PH3 Microchip Technology, MCP3909RD-3PH3 Datasheet - Page 83

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MCP3909RD-3PH3

Manufacturer Part Number
MCP3909RD-3PH3
Description
REF DESIGN FOR MCP3909 W/18F2520
Manufacturer
Microchip Technology
Datasheets
1.MCP3909T-ISS.pdf (44 pages)
2.MCP3909T-ISS.pdf (104 pages)
3.MCP3909RD-3PH3.pdf (88 pages)
4.MCP3909-ISS.pdf (40 pages)

Specifications of MCP3909RD-3PH3

Main Purpose
Power Management, Energy/Power Meter
Utilized Ic / Part
MCP3909, PIC18F2520, PIC18F4550
Lead Free Status / RoHS Status
Lead free / RoHS Compliant
Secondary Attributes
-
Embedded
-
Primary Attributes
-
Lead Free Status / RoHS Status
Lead free / RoHS Compliant, Lead free / RoHS Compliant
© 2009 Microchip Technology Inc.
EQUATION C-18:
Make g(t) = f(t) • cos(K•ω•t), it can be proved that g(t) is also a periondic function with T
as its period. Averaging g(t) in the range of [0 ~ T] results in:
EQUATION C-19:
So a
EQUATION C-20:
EQUATION C-21:
Where N, n and η
EQUATION C-22:
EQUATION C-23:
Where:
EQUATION C-24:
k
= 2 × g(t). Therefore, a
i
are constants. The equation may therefore be written as:
I
i
b
k
=
g t ( )
k
b
=
can be obtained if only g(t) can be calculated.
a
a
k
----- -
N
2
k
k
=
n
----- -
N
=
2
=
=
=
n
η
n
i
1
-- -
T
2g t ( )
------
N
=
n
×
1
i
2
n
i
Power Calculation Theory
=
×
n
N
=
0
=
×
b
T
0
N
I
0
k
N
0
f t ( )
i
R
n
I
i
η
⋅ ⋅
i
=
×
=
1
=
f
i
⋅ ⋅
i
N
×
0
⋅ ⋅
f
c
i
η
f
cos
----- -
N
2
k
sin
i
2
i
cos
n
cos
sin
(
f
n
i
k
k
i
ϕ
=
×
(
k
k
cos
i
k
ω
N
2
----- - i
0
N
=
π
η
2
----- - i
N
2
----- - i
i
N
π
0 n N
t
π
k
)dt
g
i
----- - i
N
×
)
DS51723A-page 83

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