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Maximum Value of Mutual Inductance and coupling coefficient

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Electric Circuit Analysis by K. S. Suresh Kumar

14.2 the tWo-WIndIng tranSforMer

14.1.3
Maximum Value of Mutual Inductance and coupling coefficient
The maximum value of mutual inductance that a two-coil coupled system can have is the geometric
mean of self-inductances of the two coils – i.e., L L
1 2
. This maximum value is realised when the flux
produced by a current in one coil links totally with the other coil. This is impossible to achieve physically
and can only be approached in practice. Winding both the coils over a common core made of some high
permeability material like laminated iron makes M very close to (but less than) L L
1 2
in practice.
The ratio between the actual mutual inductance realised to the theoretical maximum value is defined
as coupling coefficient and is symbolised by k. Coupling coefficient is a positive number between 0
and 1. It is difficult to achieve anything more than few tenths for k-value in air-cored coils; however,
coils wound on common core made of iron can have k-value very close to unity.
M
k L L
k
=
≤ ≤
1 2
0
1
H;
14.2
the tWo-WIndIng tranSforMer
A system of two coils with constant values of L
1
, L
2
and M with two pairs of terminals identified for
application of excitation and/or measurement of response is called a two-winding linear transformer.
Such a two-winding transformer will be referred to simply
as a transformer in this section.
Fig. 14.2-1 shows a two-coil system with self-
inductance values of L
1
, L
2
and mutual inductance value
of M. Also shown are two independent voltage sources
driving the circuit at two pairs of terminals.
The mesh equations of the circuit are written assuming
that the coils have zero winding resistance values.
L
di
dt
M
di
dt
v t
M
di
dt
L
di
dt
v t
1
1
2
1
1
2
2
2
−
=
−
+
=
( )
( )
The current i
2
leaves the dot in the second coil and therefore the mutually induced voltage in the
first coil appears with negative polarity at the dot. Hence, the negative sign for mutually induced
voltage in the first mesh equation. The current i
1
enters the dot of the first coil and therefore the
mutually induced voltage in the second coil appears with positive polarity at the dot. When mesh
Fig. 14.2-1
A transformer with
voltage source drive
at both ports
M
+
–
+
–
i
1
i
2
L
1
L
2
v
2
(
t
)
v
1
(
t
)

14.8
Magnetically Coupled Circuits
equation is written by traversing the loop in clockwise direction the self-induced voltage and mutually
induced voltages will enter with opposite signs. Hence, the negative sign for mutually induced voltage
in the second mesh equation.
+
+
+
–
–
–
+
–
i
y
i
y
L
1
L
2
M
d
d
t
i
x
i
x
M
d
d
t
(a)
i
1
i
2
v
2
(
t
)
v
1
(
t
)
+
–
+
–
L
1
L
2
–
M
M
–
M
(b)
i
1
i
2
v
2
(
t
)
v
1
(
t
)
Fig. 14.2-2
Two circuit models for a transformer (a) model using linear dependent sources
(b) Conductive equivalent model
Refer to Fig. 14.2-2. The reader may easily verify that the circuit in Fig. 14.2-2 (a) and the circuit
(b) have the same mesh equations as those of the circuit in Fig. 14.2-1. Hence, the coupled set of
coils may be replaced by two decoupled coils and two linear dependent sources as in circuit model
Fig. 14.2-2 (a) as far as the v–i behaviour at the terminals is concerned. This circuit model preserves
the conductive decoupling – i.e., the galvanic isolation – that exists between the two sides of the
circuit.
A coupled set of two coils can also be replaced by a T-shaped equivalent circuit comprising
three pure decoupled inductors as in circuit model in Fig. 14.2-2 (a) as far as the v–i behaviour
at the terminals is concerned. This circuit model hides the galvanic isolation that is present in the
transformer. Therefore, it is called the conductive equivalent circuit of coupled coils. Note that one
inductance (either L
1
-
M or L
2
-
M) can be negative-valued for sufficiently large value of coupling
coefficient. There is no negative inductance in the physical world. But then, the inductors that appear
in the conductive equivalent circuit of coupled coils are not physical inductors – they are mathematical
inductors that are arranged to result in same set of circuit equations as those of the coupled coils.
Therefore, they can assume negative values – we do not have to construct them!
Note that a certain dot polarity was assumed for the equivalent models established above. The
equivalent models for the second relative dot polarity are shown in Fig. 14.2-3.
L
1
L
2
M
(a)
L
1
+
M
L
2
+
M
–
M
(c)
+
+
–
–
i
x
i
x
i
y
i
y
L
1
M
d
d
t
(b)
L
2
M
d
d
t
Fig. 14.2-3
Circuit models for coupled coils
The circuit in Fig. 14.2-3 (b) shows the dependent source based circuit model for the two-coil
system in (a) and the circuit in Fig. 14.2-3 (c) shows the conductive equivalent circuit of the two-coil
system in Fig. 14.2-3 (a). Note the reversal of polarity in the case of dependent sources and change in
inductance values in the case conductive equivalent circuit.
Differentiation in time is replaced by multiplication by j
w
in the phasor equivalent circuit for
sinusoidal steady-state analysis in the equivalent circuit employing dependent sources. Winding
resistance can be included as series resistors on both sides in both equivalent circuits.

The Two-Winding Transformer
14.9

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