The power factor of an AC electric power system is defined as the ratio of active (true or real) power to apparent power
where
Active (Real or True) Power is measured in watts (W) and is the power drawn by the electrical resistance of a system doing useful work
Apparent Power is measured in volt-amperes (VA) and is the voltage on an AC system multiplied by all the current that flows in it. It is the vector sum of the active and the reactive power
Reactive Power is measured in volt-amperes reactive (VAR). Reactive Power is power stored in and discharged by inductive motors, transformers and solenoids
Reactive power is required for the magnetization of a motor but doesn’t perform any action. The reactive power required by inductive loads increases the amounts of apparent power – measured in kilovolt amps (kVA) – in the distribution system. Increasing of the reactive and apparent power will cause the power factor – PF – to decrease.
Power Factor
It is common to define the Power Factor – PF – as the cosine of the phase angle between voltage and current – or the “cosφ”.
PF = cos φ
where
PF = power factor
φ = phase angle between voltage and current
power factor active true reactive apparent power
The power factor of an AC electric power system is defined as the ratio of active (true or real) power to apparent power
where
- Active (Real or True) Power is measured in watts (W) and is the power drawn by the electrical resistance of a system doing useful work
- Apparent Power is measured in volt-amperes (VA) and is the voltage on an AC system multiplied by all the current that flows in it. It is the vector sum of the active and the reactive power
- Reactive Power is measured in volt-amperes reactive (VAR). Reactive Power is power stored in and discharged by inductive motors, transformers and solenoids
Reactive power is required for the magnetization of a motor but doesn’t perform any action. The reactive power required by inductive loads increases the amounts of apparent power – measured in kilovolt amps (kVA) – in the distribution system. Increasing of the reactive and apparent power will cause the power factor – PF – to decrease.
Power Factor
It is common to define the Power Factor – PF – as the cosine of the phase angle between voltage and current – or the “cosφ“.
PF = cos φ
where
PF = power factor
φ = phase angle between voltage and current
The power factor defined by IEEE and IEC is the ratio between the applied active (true) power – and the apparent power, and can in general be expressed as:
PF = P / S
where
PF = power factor
P = active (true or real) power (Watts)
S = apparent power (VA, volts amps)
A low power factor is the result of inductive loads such as transformers and electric motors. Unlike resistive loads creating heat by consuming kilowatts, inductive loads require a current flow to create magnetic fields to produce the desired work.
Power factor is an important measurement in electrical AC systems because
- an overall power factor less than 1 indicates that the electricity supplier need to provide more generating capacity than actually required
- the current waveform distortion that contributes to reduced power factor is caused by voltage waveform distortion and overheating in the neutral cables of three-phase systems
International standards such as IEC 61000-3-2 have been established to control current waveform distortion by introducing limits for the amplitude of current harmonics.
Example – Power Factor
A industrial plant draws 200 A at 400 V and the supply transformer and backup UPS is rated 200 A × 400 V = 80 kVA.
If the power factor – PF – of the loads is 0.7 – only
80 kVA × 0.7
= 56 kW
of real power is consumed by the system. If the power factor is close to 1 (a purely resistive circuit) the supply system with transformers, cables, switch-gear and UPS could be made considerably smaller.
- Any power factor less than 1 means that the circuit’s wiring has to carry more current than what would be necessary with zero reactance in the circuit to deliver the same amount of (true) power to the resistive load.
A low power factor is expensive and inefficient and some utility companies may charge additional fees when the power factor is less than 0.95. A low power factor will reduce the electrical system’s distribution capacity by increasing the current flow and causing voltage drops.
“Leading” or “Lagging” Power Factors
A Power Factor is usually stated as “leading” or “lagging” to show the sign of the phase angle.
- With a purely resistive load the current and voltage changes polarity in step and the power factor will be 1. Electrical energy flows in a single direction across the network in each cycle.
- Inductive loads – transformers, motors and wound coils – consumes reactive power with current waveform lagging the voltage.
- Capacitive loads – capacitor banks or buried cables – generates reactive power with current phase leading the voltage.
Inductive and capacitive loads stores energy in magnetic or electric fields in the devices during parts of the AC cycles. The energy is returned back to the power source during the rest of the cycles.
In systems with mainly inductive loads – typical for industrial plants with many electric motors – the lagging voltage are compensated with capacitor banks.
Power Factor for a Three-Phase Motor
The total power required by an inductive device as a motor or similar consists of
- Active (true or real) power (measured in kilowatts, kW)
- Reactive power – the nonworking power caused by the magnetizing current, required to operate the device (measured in kilovars, kVAR)
The power factor for a three-phase electric motor can be expressed as:
PF = P / [(3)1/2 U I]
where
PF = power factor
P = power applied (W, watts)
U = voltage (V)
I = current (A, amps)
Typical Motor Power Factors
| Power (hp) |
Speed (rpm) |
Power Factor | ||
|---|---|---|---|---|
| 1/2 load | 3/4 load | full load | ||
| 0 – 5 | 1800 | 0.72 | 0.82 | 0.84 |
| 5 – 20 | 1800 | 0.74 | 0.84 | 0.86 |
| 20 – 100 | 1800 | 0.79 | 0.86 | 0.89 |
| 100 – 300 | 1800 | 0.81 | 0.88 | 0.91 |