Ohms Law

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Ohms Law

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Title: Ohms Law

1
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2
Ohms Law

The Ohms Law states that
Where
I Current (Amps)
V Voltage (Volts)
R Resistance (Ohms)

3
Ohms Law

The formula for Ohms law only apply to ac
circuits that are purely resistive
However, many ac circuits have reactance (X) as
well as resistance measured in ohms
This reactance must be combined with the
resistance to calculate the impedance (Z) and is
also measured in ohms

4
Ohms Law

Therefore,
The result leads to

5
AC Power

Alternating Current (AC) is an electrical current
that periodically reverse its direction of flow
because the polarity of the voltage source
constantly changes
When an AC circuit is connected to a resistance,
the resulting alternating current follows the
same alternating pattern as the voltage source
This pattern is called a sine wave

6
AC Power

A sine wave cycle is one variation of the sine
wave from zero to maximum, back through zero, to
minimum, and back to zero

7
AC Power

The amplitude of the sine wave is expressed as
either voltage or current
The peak value is the current magnitude between
zero and the highest point of the sine wave for
one-half cycle

8
AC Power

The current at any point on a sine wave is called
the instantaneous current (i)
It is also possible to determine the arithmetic
value of the alternating current
The average value is the arithmetical average of
all values in the sine wave for one-half cycle

9
AC Power

The most common method of measuring the amplitude
of a sine wave is its root-mean-square (rms)
value
RMS is the square root of the average of all the
instantaneous currents squared
The rms value of a sine wave is readily
determined by calculus but can perhaps be more
easily understood by simple arithmetic

10
AC Power

The RMS value is 0.707 times the zero-to-peak
value of the sine wave

11
AC Power

Average Value
RMS Value

12
AC Power
13
AC Power

The number of times this cycle occurs in one
second is called frequency and is expressed in
Hertz (Hz)
Another parameter of interests is the length of
time required for the sinusoidal function to pass
through all its possible values

14
AC Power

This time is referred to as the period of the
function and is denoted as T which can be
expressed as
Omega (?) represents the angular frequency of the
sinusoidal function and it is given as

15
Frequency

A cycle per second is referred to as a hertz
In north America, the frequency is 60 Hz
However, in other countries may have different
frequencies
In Thailand, the frequency is 50 Hz

16
AC Power

For the pure resistance circuit, both current and
voltage are in the same phase

17
AC Power

For the pure inductance circuit, current lags
voltage with the angle of 90 degree

18
AC Power
Where
19
AC Power

For the pure capacitance circuit, current leads
voltage with the angle of 90 degree

20
AC Power
Where
21
AC Power

For the series R-L circuit, current lags voltage
with the angle of tan-1?L/R

22
Example

Let
Calculate The Voltage
23
Example
24
AC Power

For the series R-C circuit, current leads voltage
with the angle of tan-11/?CR

25
Example

A sinusoidal voltage is given by
Determine
a) What is the period of the voltage?
b) What is the frequency in hertz?
c) What is the magnitude of v at t 2.778 ms
d) What is the rms value of v

26
Example

Solution
a) Since ? 100p rad/s
b)

27
Example

c) At t 2.778 ms

Hence
d)
28
Phasor Diagram

A diagram of phasor currents and voltages can be
used to analyze the steady-state sinusoidal
operation of a circuit
A phasor diagram shows the magnitude and phase
angle of each phasor quantity in the
complex-number plane
Phase angle are measured counterclockwise from
the positive real axis and magnitude are measured
from the origin of the axes

29
Phasor Diagram
30
Phasor Diagram

For the pure resistance circuit, phasor current
has the same phase (in phase) with the phase
voltage

31
Phasor Diagram

For the series R-L circuit, phasor current lags
the phase voltage with the angle of ? degree

32
Phasor Diagram

For the series R-C circuit, phasor current leads
the phase voltage with the angle of ? degree

33
Phasor Diagram

In this circuit, the parallel combination of R2
and L2 represents a load on the output end of a
distribution line
The distribution line is modeled by the series
combination of R1 and L1

R1
L1

Vs
R2
L2
VL
-
34
Phasor Diagram
Ib

Because we are holding the amplitude of the load
voltage constant, VL is chosen as the reference

R1
j?L1

I
Vs
R2
j?L2
VL
Ia
-
VL
35
Phasor Diagram

We know that Ia is in phase with VL and its
magnitude is
We also know that Ib lag behind VL by 90 degree
and its magnitude is

Ia
VL
VL
Ia
Ib
36
Phasor Diagram

The line current I is equal to the sum of Ia and
Ib
The voltage drop across R1 is in phase with the
line current, and the voltage drop across j?L1
leads the line current by 90 degree

Ia
VL
Ib
I
37
Phasor Diagram

The source voltage is the sum of the load voltage
and the drop along the line

j?L1I
VL
Ia
R1I
Ib
I
38
Phasor Diagram
j?L1I
Vs
j?L1I
Ia
VL
R1I
Ib
R1I
I
39
Configuration

Configuration is the number of phases and the
types of connection between the utility and the
user
For the number of phases, they can be
One Phase
Two Phases
Three Phases

40
Balanced Three-Phase

A set of balanced three-phase voltages consists
of three sinusoidal voltages that have identical
amplitudes and frequency but are out of phase
with each other by exactly 120 degree
Because the phase voltages are out of phase by
120 degree, two possible phase relationship can
exist between a-phase voltage and the b- and
c-phase voltage

41
Balanced Three-Phase

One possibility is for the b-phase voltage to lag
the a-phase voltage by 120 degree, in which case
the c-phase voltage must lead the a-phase voltage
by 120 degree
This phase relationship is known as the abc phase
sequence or positive phase sequence

42
Balanced Three-Phase
VC
VA
VB
Positive Phase Sequence
43
Balanced Three-Phase

Another possibility is for the b-phase voltage to
lead the a-phase voltage by 120 degree, in which
case the c-phase voltage must lag the a-phase
voltage by 120 degree
This phase relationship is known as acb phase
sequence or negative phase sequence

44
Balanced Three-Phase
VB
VA
VC
Negative Phase Sequence
45
Configuration

A three-phase source can be either Wye-connected
or Delta-connected and the three-phase loads can
also be either Wye-connected or Delta-connected

Three-phase Voltage Source
Three-phase Load
Three-phase Line
46
Configuration

Thus, the basic circuit in the above figure can
take four different configurations
Wye-Wye Connection
Wye-Delta Connection
Delta-Wye Connection
Delta-Delta Connection

47
Wye-Wye Connection
A Three-Phase Y-Y System
48
Wye-Wye Connection

Zga, Zgb, and Zgc represent the internal
impedance associated with each phase winding of
the voltage source
Z1a, Z1b, and Z1c represent the impedance of each
phase conductor of the line connecting the source
to the load
Zo is the impedance of the neutral conductor that
connects the source neutral to the load neutral
ZA, ZB, and ZC are the impedance of each phase of
load

49
Wye-Wye Connection

The circuit is a balanced three-phase circuit if
it satisfies all the following criteria
Van, Vbn, and Vcn form a set of balanced
three-phase voltages
Zga Zgb Zgc
Z1a Z1b Z1c
ZA ZB ZC

50
Wye-Wye Connection

If the system is balanced, VN must be zero
VN denote the node voltage between nodes N and n
If VN is zero, there is no difference in
potential between the source neutral, n, and the
load neutral, N
Consequently, the current in the neutral
conductor is zero

51
Wye-Wye Connection

When the system is balanced, three line currents
are

52
Wye-Wye Connection

In a balanced system, the three line currents
form a balanced set of three-phase currents
Thus, the current in each line is equal in
amplitude and frequency and 120 degree out of
phase with the other two line currents
Hence, if the current IaA is calculated, the line
currents IbB and IcC can be obtained without
further computations

53
Wye-Wye Connection

Once the line currents in the circuit are
obtained, calculating any voltages of interest is
relatively simple
Of particular interest is the relationship
between the line-to-line voltages and the
line-to-neutral voltages
Thus, line-to-line voltages at the load terminals
in terms of the line-to-neutral load voltages are

54
Wye-Wye Connection
A
VAB
VAN
ZA
B
ZB
N
VCA
VBN
VBC
ZC
VCN
C
Line-to-Line and Line-to-Neutral Voltages
55
Wye-Wye Connection

To show the relationship between the line-to-line
voltages and the line-to-neutral voltages, a
positive phase sequence is assumed and the
line-to-neutral voltage of the a-phase is used as
the reference

56
Wye-Wye Connection
VCN
VAN
VBN
Vp is Line-to-Neutral Voltage or Phase Voltage
57
Wye-Wye Connection

From the above equations, it can be concluded
that

58
Wye-Wye Connection

The magnitude of the line-to-line voltage is
times the magnitude of the line-to-neutral
voltage
The line-to-line voltages form a balanced
three-phase set of voltages
The set of line-to-line voltages leads the set of
line-to-neutral voltages by 30 degree

59
Wye-Wye Connection
VCN
VAB
VCA
VAN
VBN
VBC
60
Wye-Delta Connection

If the load in a three-phase circuit is connected
in a delta, it can be transformed in to a wye by
using the delta-wye-transformation

61
Wye-Delta Connection
Impedance Transformation from Delta-to-Wye
62
Wye-Delta Connection

When the load is balanced, the impedance of each
leg of the wye is one-third the impedance of each
leg of the delta
To determine the relationship between the phase
currents and line currents, a positive phase
sequence is used

63
Wye-Delta Connection
A
IaA
IAB
ICA
Z?
Z?
IbB
Z?
C
B
IBC
IcC
Relationship Between Line Currents and Phase
Currents in a Balanced Delta-Load
64
Wye-Delta Connection

The previous figure shows that, in the delta
configuration, the phase voltage is identical to
the line voltage

ICA
IAB
IBC
Ip is the phase current
65
Wye-Delta Connection

The line current in terms of the phase current
can be written by Kirchhoffs law as following

66
Wye-Delta Connection

By comparing the phase current and line current,
it can be concluded that
The magnitude of the line current is times
the magnitude of phase current
The set of line currents lags the set of phase
current by 30 degree
If a negative phase sequence is applied, line
currents are larger than phase currents and
lead the phase current by 30 degree

67
Delta-Wye Connection

In the Delta-Wye three phase circuit, the source
is delta-connected and the load is wye-connected
The analysis of the delta-wye connection can be
achieved by replacing the balanced
delta-connected source with a wye equivalent
The wye equivalent of the source by dividing the
internal phase voltages of the delta-source by

68
Delta-Wye Connection

If the phase sequence is positive, the phase
angle of this set of three-phase voltages is
shifted by the angle of -30 degree
However, in the case of negative sequence, the
phase angle of this set of three-phase voltages
is shifted by the angle of 30 degree
The internal impedance of the wye-equivalent is
one third the internal impedance of the
delta-source

69
The Y-equivalent of a balanced, three-phase,
delta-connected source (positive sequence)
70
Delta-Wye Connection

For a positive phase sequence, the set of
delta-source phase current (Iba, Icb, and Iac)
lead the set of line currents IaA, IbB, and IcC)
by 30 degree
For a negative phase sequence, the phase currents
in the source lag the line currents by 30 degree
The magnitude of the phase current is times
the magnitude of the line current

71
Delta-Delta Connection

In the delta-delta circuit, both source and load
are delta-connected
By replacing both source and load with their
wye-equivalent, the analysis of delta-delta
connection can be achieved

72
Configuration

Wye Connection
Delta Connection

73
Example

A three-phase, positive sequence, Y-connected
generator has an impedance of 0.2 j0.5
ohm/phase. The internal phase voltage of the
generator is 120 V. The generator feeds a
balanced, three-phase, Y-connected load having an
impedance of 39 j28 ohm/phase.
The impedance of line connecting the generator to
the load is 0.8 j1.5 ohm/phase.
The a-phase voltage of the generator is specified
as the reference phasor

74
Example

Calculate
a) Line currents (IaA, IbB, and IcC)
b) Line-to-Neutral voltages at the load (VAN,
VBN, VCN)
c) Line voltages at load (VAB, VBC, VCA)

75
Example
IaA
a
A
0.2 O
j0.5 O
0.8 O
j1.5 O
39 O
j28 O
N
76

Solution
a) The a-phase line current

IcC
IaA
IbB
For positive sequence
77

b) The line-to-neutral voltages at load

VCN
For positive sequence
VAN
VBN
78

c) The line-to-line voltages at load
For a positive sequence, the line-to-line
voltages lead the line-to-neutral voltages by 30
degree

VAB
VCN
VCA
VAN
VBN
VBC
79
Configuration

For the number of connections, they can be
Two-wire connections
Three-wire connections
Four-wire connections
Five-wire connections
The electrical system between the generating
source and the customers site is known as the
distribution system

80
Configuration

The wiring between the connection to the
distribution system at the customers site and
the equipment to be powered is called the
premises wiring (system)
The various loads that the electrical system is
required to power have certain characteristics
which affect the amount of power (watts) that is
demanded by these loads

81
Configuration

These characteristics are
Resistance
Inductance
Capacitance
Inductance and capacitance cause a difference
between the real power and the apparent power
required by the load in an AC circuit

82
Premises Wiring (System)
Branch Circuits
Distribution System
Main Feeder
Feeder
Loads
Medium Voltage Supply
Equipment Loads
Main Electrical Service Panel
Pole or Pad-mounted Transformer
Meter
Feeder Panel or Sub-Panel
Receptacles or Hard-wired
Building Service Transformer (if Required)
83
Capacity

The capacity of a given system is the amperage
This can be also be stated in volt-amperes (VA)
or watts (W)
Generally, in an AC circuit, the product of the
measured rms value of the current and the
measured rms value of the voltage equals the
volt-amperes

84
Real and Reactive Power

The VA product is only the Apparent power of
the circuit

VA
VAR
Phase Angle
W
85
Real and Reactive Power

To determine real or true power, one must know
the amount (phase angle) the current leads or
lags the voltage
Real power associates with the purely resistive
This phase angle can vary from 90 degree leading
in a purely capacitive circuit through 0 degree
in a purely resistive circuit, to 90 degree
lagging in a purely inductive circuit

86
Real and Reactive Power
Where
87
Real and Reactive Power

VAR (volt-amperes reactive) is defined two
meanings
The power absorbed by the reactive part of the
load
The power delivered by the capacitive part of the
load
Thus, VAR is simply referred as reactive power

88
Real and Reactive Power
Where
RF is Reactive Factor
89
Example

An electrical load operates at 220 V, 15 A, and
power factor 0.8. Calculate the real and
reactive power.
Solution
Load VA 22015 3300 VA
PF 0.8, cos? 0.8, ? 36.87o

3300 VA
Q
W
90
Example

Real power
Reactive power

91
Watthours

Watts indicate the amount of power that is
consumed by a circuit at any given time
Typically, utility companies charge for power in
kilowatt-hours (kWh)
Hence, multiplying the number of watts consumed
by the number of hours that the watts are being
consumed produces watt-hours

92
Example

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??????????????, ?????? 22 ?????????)
???????????????????????????????? TOU
???????????????????????????????????????????????
????????????????????
On-Peak (?????? - ????? 09.00 - 22.00 ?.) 850 kW
Off-Peak 1 (?????? - ????? 22.00 09.00 ?.) 600
kW
Off-Peak 2 (????? - ???????, ?????????????) 500
kW

93
Example

????????????????
On-Peak (?????? - ????? 09.00 - 22.00 ?.) 40,000
?????
Off-Peak 1 (?????? - ????? 22.00 09.00
?.) 35,000 ?????
Off-Peak 2 (????? ???????, ?????????????) 25,000
?????
?????????????
??????????????????????? 74.14 ???/?????????
??????????????? (Peak) 2.695 ???/?????

94
Example

??????????????? (Off-Peak) 1.1914 ???/?????
????????? 228.17 ???/?????
?????????????? 0.4328 ???/?????
Solution
??????????????????????? 85074.17 63,044.50
???
??????????????? (400002.695)(350001.1914)(25
0001.1914)
172,586.19 ???

95
Example

?????????????? 1000000.4328 43,280 ???
????????? 228.17 ???
??? (1) 279,138.86 ???
?????????????????? (7) (279138.36)(0.07)
19,539.72
?????????????????? 298,678.58 ???

96
Complex power

For circuit operating in sinusoidal-steady-state,
real and reactive power conveniently calculated
from complex power
Complex power is the complex sum of real power
and reactive power which can be defined as

97
Complex power

Where
S is Apparent Power (VA)
P is Real Power (W)
Q is Reactive power (VAR)

98
Complex power

Thus, the apparent, real and reactive power in
three-phase system are calculated as following
In form of phase value

Vp is Line-to-Neutral Voltage or Phase Voltage
99
Complex power

In form of line value

VL is Line-to-Line Voltage
100
Example

The wye source with the rating of 100 kVA and 380
V (line) supplies power the wye load. Load has a
operating power factor of 0.8 lagging. Calculate
Phase voltage at load
Phase current at load
Real power at load
Reactive power at load

101
Example

Solution
a)
b)

102
Example

For wye-connection
c)

103
Example

104
Power Factor

Power factor is defined as the ratio of the real
power to the apparent power
Power factor will be leading or lagging
depending on which way the load shifts the
currents phase with respect to the voltages
phase
Inductive loads cause current to lag behind
voltage, while capacitive loads cause current to
lead voltage

105
Power Factor

From the power triangle, the following equations
can be expressed

S (VA)
Q (VAR)
W
106
Example

An electrical load operates at 240 V rms. The
load absorbs an average power of 8 kW at a
lagging power factor of 0.8. Calculate the
complex power of the load.
Solution
Since the power factor is described as lagging,
it indicates that the load is inductive

107
Example
S
Q
P
108
Example

A 50 kW fully-loaded motor is operating at 595
volts, 3-phase drawing 88 A. Determine operating
power factor.
Solution

88 A
S
Q
Voltage Source 595 V, 3 phase
Motor 50 kW
P 50 kW
109
Example
Since motor is three-phase motor, thus the
apparent power is calculated from
Then, operating power can be calculated by
110
Example

Alternatively, operating power factor can be
calculated in just one step as following

111
Power Factor

Low power factor results in
Power loss in the network
Higher transformer losses
Increased voltage drop in power distribution
networks
Less power distributed via the network
Increasing peak kVA

112
Power Factor Correction

Power factor improvement can be obtained by
adding capacitor into the system
Capacitors produces the necessary leading
reactive power to compensate the lagging reactive
power

113
Power Factor Correction
VA1
VAR1
VA2
VAR2
W
Where Cos ?1 is power factor before power
factor correction Cos ?2 is power factor after
power factor correction VAR1 is reactive power
before power factor correction VAR2 is reactive
power after power factor correction
114
Power Factor Correction

Calculation Method
Suppose the power factor of both before and after
power factor correction are known
Thus

115
Power Factor Correction
Therefore, the required VAR can be calculated
from
116
Power Factor Correction

Where to connect capacitor on the customers
electrical system?
Connect all together at any point past the
utility metering (usually at the service entrance
switchgear)
Divide the total capacitor requirement in
selected amounts and connect to the system about
the load center of the feeder

117
Power Factor Correction

Connect the capacitors as close to the loads,
with which they will be trading VARs, as possible
If a system or part of a system operates with a
varying load, then connect the capacitors through
a series of steps with each step switched
through a contactor that is controlled by power
factor controller

118
Example

Suppose a factory currently has a peak demand at
1250 kW with the operating power factor of 0.65.
If this factory needs to improve its power factor
to 0.95, calculate the require capacitor size.
Solution

VA1
VAR1
PF1 0.65
1250 kW
Before Improving Power Factor
119
Example
Before Improving Power Factor
After Improving Power Factor
VA2
VAR2
1250 kW
120
Example
121
Example

Suppose capacitor bank with a capacity of 50 kVar
is designed for rated 240 V and 60 Hz. If this
capacitor is applied for rated 220 V and 50 Hz,
what is the actual capacity of this capacitor
bank?

122
Example
123
Example
124
Transformer

A schematic represents of a two-winding
transformer with the phasor voltages E1 and E2
across the windings

125
Transformer

From figure the phasor current I1 entering
winding 1, which has N1 turns
The phasor current I2 entering winding 2, which
has N2 turns
Ohms law for the magnetic circuit states that
the net magnetomotive force (mmf) equals the
product of core reluctance (Rc) and the core flux
(?)

126
Transformer

For an ideal transformer, core is assumed to have
infinite permeability, therefore, the core
reluctance is zero

127
Transformer

By applying the Faradays law, voltage at the
primary side can be calculated as
Assuming a sinusoidal-steady-state flux with
constant frequency and replacing e(t) and
by E and ?

128
Transformer

Similarly, the voltage at secondary side is given
as
Therefore,

129
Transformer

Turn ratio (a) is defined as follows
Hence, the basic relation for an ideal
single-phase two-winding transformers are

130
Transformer

Two additional relations concerning complex power
and impedance can be also derived
The complex power entering winding 1

131
Transformer

If an impedance Z2 is connected across winding 2
of the ideal transformer, then
This impedance, when measured from winding 1, is

132
Example

A single-phase two-winding transformer is rated
20 kVA, 480/120 V, 60 Hz. A source connected to
the 480-V winding supplies an impedance load
connected to the 120-V winding.
The load absorbs 15 kVA at 0.8 p.f. lagging when
the load voltage is 118 V. Assume that the
transformer is an ideal. Calculate
a) The voltage across the 480-V winding
b) The load impedance
c) The load impedance referred to the 480-V
winding

133
Example

Solution

Selecting the load voltage E2 as the reference
134
Example
S2 15 kVA
VAR
P
135
Example

a) Turn Ratio
The voltage across winding 1

136
Example

b)
Therefore,
The load impedance is calculated from

137
Example

c) The load impedance referred to the 480-V
winding can be calculated by

138
Per-Unit System

In power system a normalization of variable
called per unit normalization is almost always
used
It is especially convenient if many transformers
and voltage levels are involved
One advantage of the per-unit system is to avoid
the possibility of making serious calculation
errors when referring quantities from one side of
a transformer to the other

139
Per-Unit System

The basic idea is to pick base values for
quantities such as voltages, currents,
impedances, and power
Hence, the quantity in per unit is defined as the
ratio of actual quantity to the base value
quantity

140
Per-Unit System

For Single Phase System

141
Per-Unit System

For Three Phase System

142
Per-Unit System
Per Unit Value
143
Per-Unit System

When only one component, such as a transformer,
is considered, the nameplate ratings of that
component are usually selected as base values
When several components are involved, the system
base values may be different from the nameplate
ratings of any particular device
It is then necessary to convert the per-unit
impedance of a device from the old base to new
base values

144
Per-Unit System

To convert a per-unit impedance from old to
new base use

145
Example

Three zones of a single-phase circuit are
connected by transformers T1 and T2 whose ratings
are shown in figure. By using base values of 30
kVA and 240 V in zone 1
a) Draw the per-unit circuit and determine the
per unit impedances and per-unit source voltage
b) Calculate load current in both in per-unit and
in amperes

146
Example

Solution
a) First the base values in each zone are
determined.
For base kVA will be 30 kVA for the entire
network

Zone 1
Zone 2
Zone 3
Xline 2 O
Zload 0.9 j 0.2 O
30 kVA, 240/480 volts X0.1 pu
20 kVA, 460/115 volts X0.1 pu
147
Example

Thus
For base voltage in zone 1
As moving across a transformer, the voltage base
is changed to the transformer voltage ratings,
hence

148
Example

For base voltage in zone 3
The base impedance in zone 2 and 3 are

149
Example

The base current in zone 3 is calculated from
Per-unit reactance of Transformer 1 is then
calculated from

150
Example

Per-unit reactance of line in zone 2 can be
calculated from
Per-unit reactance of transformer 2 must be
converted from its nameplate rating to the system
base (Vb2)

151
Example