Definition of reactive power: Difference between revisions

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{{Menu_Power_Factor_Correction}}  
{{Menu_Power_Factor_Correction}}
 
For most electrical loads like motors, the current I is lagging behind the voltage V by an angle φ.
For most electrical loads like motors, the current I is lagging behind the voltage V by an angle φ.


'''If currents and voltages are perfectly sinusoidal signals''', a vector diagram can be used for representation.
'''If currents and voltages are perfectly sinusoidal signals''', a vector diagram can be used for representation.


In this vector diagram, the current vector can be split into two components: one in phase with the voltage vector (component I<sub>a</sub>), one in quadrature (lagging by 90 degrees) with the voltage vector (component I<sub>r</sub>). See '''Fig. L1'''.
In this vector diagram, the current vector can be split into two components: one in phase with the voltage vector (component I<sub>a</sub>), one in quadrature (lagging by 90 degrees) with the voltage vector (component I<sub>r</sub>). See {{FigRef|L1}}.


I<sub>a</sub> is called the '''active''' component of the current.
I<sub>a</sub> is called the '''active''' component of the current.
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I<sub>r</sub> is called the '''reactive''' component of the current.
I<sub>r</sub> is called the '''reactive''' component of the current.


{{FigImage|DB422580|svg|L1|Current vector diagram}}


[[Image:Fig_L01.jpg|none]]
The previous diagram drawn up for currents also applies to powers, by multiplying each current by the common voltage V. See {{FigRef|L2}}.
 
 
'''''Fig. L1 :''''' ''Current vector diagram''
 
 
The previous diagram drawn up for currents also applies to powers, by multiplying each current by the common voltage V.


We thus define:
We thus define:
* '''Apparent power''': S = V x I (kVA)
* '''Active power''': P = V x Ia (kW)
* '''Reactive power''': Q = V x Ir (kvar)


Apparent power: S = V x I (kVA) <br>
{{FigImage|DB422581|svg|L2|Power vector diagram}}
Active power: P = V x Ia (kW)<br>
Reactive power: Q = V x Ir (kvar)<br>


In this diagram, we can see that:
In this diagram, we can see that:
* Power Factor: P/S = cos φ
* '''Power Factor''': P/S = cos φ


This formula is applicable for sinusoidal voltage and current. This is why the Power Factor is then designated as "Displacement Power Factor".
This formula is applicable for sinusoidal voltage and current. This is why the '''Power Factor''' is then designated as '''"Displacement Power Factor"'''.
* Q/S = sinφ
* Q/S = sinφ
* Q/P = tanφ
* Q/P = tanφ


A simple formula is obtained, linking apparent, active and reactive power: = +
A simple formula is obtained, linking apparent, active and reactive power:  
 
<math>S^2 = P^2 + Q^2 </math>


A power factor close to unity means that the apparent power S is minimal. This means that the electrical equipment rating is minimal for the transmission of a given active power P to the load. The reactive power is then small compared with the active
A power factor close to unity means that the apparent power S is minimal. This means that the electrical equipment rating is minimal for the transmission of a given active power P to the load. The reactive power is then small compared with the active
power.
power.


A low value of power factor indicates the opposite condition.


[[Image:Fig_L02.jpg|none]]
'''Useful formulae''' (for balanced and near-balanced loads on 4-wire systems):
 
* '''Active power P''' (in kW)
 
**Single phase (1 phase and neutral): P = V.I.cos φ
'''''Fig. L2 :''''' ''Power vector diagram''
**Single phase (phase to phase): P = U.I.cos φ
 
**Three phase (3 wires or 3 wires + neutral): P = √3.U.I.cos φ
 
* '''Reactive power Q''' (in kvar)
[[Image:FigL05.jpg|none]]
**Single phase (1 phase and neutral): Q = V.I.sin φ
 
**Single phase (phase to phase): Q = U.I.sin φ
 
**Three phase (3 wires or 3 wires + neutral): Q = √3.U.I.sin φ
'''''Fig. L2b :''''' ''Calculation power diagram''
* '''Apparent power S''' (in kVA)
 
**Single phase (1 phase and neutral): S = V.I
 
**Single phase (phase to phase): S = U.I
A low value of power factor indicates the opposite condition.
**Three phase (3 wires or 3 wires + neutral): S = √3.U.I


Useful formulae (for balanced and near-balanced loads on 4-wire systems):
where:
* Active power P (in kW)
&nbsp; -&nbsp; Single phase (1 phase and neutral): P = V.I.cos φ <br>
&nbsp; -&nbsp; Single phase (phase to phase): P = U.I.cos φ <br>
&nbsp; -&nbsp; Three phase (3 wires or 3 wires + neutral): P = √3.U.I.cos φ
* Reactive power Q (in kvar)
&nbsp; -&nbsp; Single phase (1 phase and neutral): P = V.I.sin φ <br>
&nbsp; -&nbsp; Single phase (phase to phase): Q = U.I.sin φ <br>
&nbsp; -&nbsp; Three phase (3 wires or 3 wires + neutral): P = √3.U.I.sin φ
* Apparent power S (in kVA)
&nbsp; -&nbsp; Single phase (1 phase and neutral): S = V.I <br>
&nbsp; -&nbsp; Single phase (phase to phase): S = U.I <br>
&nbsp; -&nbsp; Three phase (3 wires or 3 wires + neutral): P = √3.U.I


where:<br>
{{def
V = Voltage between phase and neutral <br>
|V| Voltage between phase and neutral  
U = Voltage between phases <br>
|U| Voltage between phases  
I = Line current <br>
|I| Line current  
φ = Phase angle between vectors V and I.
|φ| Phase angle between vectors V and I.}}


An example of power calculations (see '''Fig. L3''')
== An example of power calculations (see {{FigRef|L3}}) ==


{| style="width: 797px; height: 177px" cellspacing="1" cellpadding="1" width="797" border="1"
{{tb-start|id=Tab1330|num=L3|title=Example in the calculation of active and reactive power|cols=5}}
{| class="wikitable"
|-
|-
| bgcolor="#0099cc" colspan="2" | '''Type of circuit'''
! colspan="2" | Type of circuit  
| bgcolor="#0099cc" | '''Apparent power S (kVA)'''
! Apparent power S (kVA)  
| bgcolor="#0099cc" | '''Active power P (kW)'''
! Active power P (kW)  
| bgcolor="#0099cc" | '''Reactive power Q (kvar)'''
! Reactive power Q (kvar)
|-
|-
| colspan="2" | Single-phase (phase and neutral) &nbsp;
| colspan="2" | Single-phase (phase and neutral)
| S = VI  
| S = VI  
| P = VI cos <span class="texhtml">φ</span>
| P = VI cos φ  
| Q = VI sin <span class="texhtml">φ</span>
| Q = VI sin φ
|-
|-
| colspan="2" | Single-phase (phase to phase) &nbsp;
| colspan="2" | Single-phase (phase to phase)
| S = UI  
| S = UI  
| P = UI cos φ  
| P = UI cos φ  
| Q = UI sin <span class="texhtml">φ</span>
| Q = UI sin φ
|-
|-
| valign="top" rowspan="2" | Example&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;
| colspan="2" | Example: 5 kW of load cos φ = 0.5
| 5 kW of load  
| 10 kVA  
| valign="top" rowspan="2" | 10 kVA  
| 5 kW  
| valign="top" rowspan="2" | 5 kW  
| 8.7 kvar
| valign="top" rowspan="2" | 8.7 kvar
|-
| cos <span class="texhtml">φ</span> = 0.5
|-
|-
| colspan="2" | Three phase 3-wires or 3-wires + neutral  
| colspan="2" | Three phase 3-wires or 3-wires + neutral  
| S = <math>\sqrt 3</math> UI  
| S = <math>\sqrt 3</math> UI  
| P = <math>\sqrt 3</math> UI cos <span class="texhtml">φ</span>
| P = <math>\sqrt 3</math> UI cos φ  
| Q = <math>\sqrt 3</math> UI sin <span class="texhtml">φ</span>
| Q = <math>\sqrt 3</math> UI sin φ
|-
|-
| valign="top" rowspan="3" | Example  
| rowspan="3" | Example  
| Motor Pn = 51 kW  
| Motor Pn = 51 kW  
| valign="top" rowspan="3" | 65 kVA  
| rowspan="3" | 65 kVA  
| valign="top" rowspan="3" | 56 kW  
| rowspan="3" | 56 kW  
| valign="top" rowspan="3" | 33 kvar
| rowspan="3" | 33 kvar
|-
|-
| cos <span class="texhtml">φ</span>= 0.86
| cos φ= 0.86
|-
|-
| <span class="texhtml">ρ</span>= 0.91 (motor efficiency)
| ρ= 0.91 (motor efficiency)
|}
|}


The calculations for the three-phase example above are as follows:


'''''Fig. L3 :''''' ''Example in the calculation of active and reactive power''
{{def|Pn| delivered shaft power {{=}} 51 kW}}


 
{{def|P| active power consumed }}
The calculations for the three-phase example above are as follows:
 
Pn = delivered shaft power = 51 kW<br>
P = active power consumed


<math>P=\frac {Pn}{\rho}=\frac{51}{0.91}=56\, kW</math>  
<math>P=\frac {Pn}{\rho}=\frac{51}{0.91}=56\, kW</math>  
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S = apparent power
S = apparent power


<math>S=\frac{P}{cos \phi}=\frac {56}{0.86}= 65\, kVA</math>
<math>S=\frac{P}{cos \varphi}=\frac {56}{0.86}= 65\, kVA</math>


So that, on referring to diagram '''Figure L3''' or using a pocket calculator, the value of tan <span class="texhtml">φ</span> corresponding to a cos <span class="texhtml">φ</span> of 0.86 is found to be 0.59
So that, on referring to {{FigureRef|L16}} or using a pocket calculator, the value of tan φ corresponding to a cos φ of 0.86 is found to be 0.59


Q = P tan <span class="texhtml">φ</span> = 56 x 0.59 = 33 kvar (see '''Figure L15''').
Q = P tan φ = 56 x 0.59 = 33 kvar (see {{FigureRef|L4}}).


Alternatively:
Alternatively:


<math>Q=\sqrt{S^2 - P^2}=\sqrt{65^2 - 56^2}=33\, kvar</math>
<math>Q=\sqrt{S^2 - P^2}=\sqrt{65^2 - 56^2}=33\, kvar</math>
{{FigImage|DB422582|svg|L4|Calculation power diagram}}

Latest revision as of 17:50, 20 December 2019

For most electrical loads like motors, the current I is lagging behind the voltage V by an angle φ.

If currents and voltages are perfectly sinusoidal signals, a vector diagram can be used for representation.

In this vector diagram, the current vector can be split into two components: one in phase with the voltage vector (component Ia), one in quadrature (lagging by 90 degrees) with the voltage vector (component Ir). See Fig. L1.

Ia is called the active component of the current.

Ir is called the reactive component of the current.

Fig. L1 – Current vector diagram

The previous diagram drawn up for currents also applies to powers, by multiplying each current by the common voltage V. See Fig. L2.

We thus define:

  • Apparent power: S = V x I (kVA)
  • Active power: P = V x Ia (kW)
  • Reactive power: Q = V x Ir (kvar)
Fig. L2 – Power vector diagram

In this diagram, we can see that:

  • Power Factor: P/S = cos φ

This formula is applicable for sinusoidal voltage and current. This is why the Power Factor is then designated as "Displacement Power Factor".

  • Q/S = sinφ
  • Q/P = tanφ

A simple formula is obtained, linking apparent, active and reactive power:

[math]\displaystyle{ S^2 = P^2 + Q^2 }[/math]

A power factor close to unity means that the apparent power S is minimal. This means that the electrical equipment rating is minimal for the transmission of a given active power P to the load. The reactive power is then small compared with the active power.

A low value of power factor indicates the opposite condition.

Useful formulae (for balanced and near-balanced loads on 4-wire systems):

  • Active power P (in kW)
    • Single phase (1 phase and neutral): P = V.I.cos φ
    • Single phase (phase to phase): P = U.I.cos φ
    • Three phase (3 wires or 3 wires + neutral): P = √3.U.I.cos φ
  • Reactive power Q (in kvar)
    • Single phase (1 phase and neutral): Q = V.I.sin φ
    • Single phase (phase to phase): Q = U.I.sin φ
    • Three phase (3 wires or 3 wires + neutral): Q = √3.U.I.sin φ
  • Apparent power S (in kVA)
    • Single phase (1 phase and neutral): S = V.I
    • Single phase (phase to phase): S = U.I
    • Three phase (3 wires or 3 wires + neutral): S = √3.U.I

where:

V = Voltage between phase and neutral
U = Voltage between phases
I = Line current
φ = Phase angle between vectors V and I.

An example of power calculations (see Fig. L3)

Fig. L3 – Example in the calculation of active and reactive power
Type of circuit Apparent power S (kVA) Active power P (kW) Reactive power Q (kvar)
Single-phase (phase and neutral) S = VI P = VI cos φ Q = VI sin φ
Single-phase (phase to phase) S = UI P = UI cos φ Q = UI sin φ
Example: 5 kW of load cos φ = 0.5 10 kVA 5 kW 8.7 kvar
Three phase 3-wires or 3-wires + neutral S = [math]\displaystyle{ \sqrt 3 }[/math] UI P = [math]\displaystyle{ \sqrt 3 }[/math] UI cos φ Q = [math]\displaystyle{ \sqrt 3 }[/math] UI sin φ
Example Motor Pn = 51 kW 65 kVA 56 kW 33 kvar
cos φ= 0.86
ρ= 0.91 (motor efficiency)

The calculations for the three-phase example above are as follows:

Pn = delivered shaft power = 51 kW

P = active power consumed

[math]\displaystyle{ P=\frac {Pn}{\rho}=\frac{51}{0.91}=56\, kW }[/math]

S = apparent power

[math]\displaystyle{ S=\frac{P}{cos \varphi}=\frac {56}{0.86}= 65\, kVA }[/math]

So that, on referring to Figure L16 or using a pocket calculator, the value of tan φ corresponding to a cos φ of 0.86 is found to be 0.59

Q = P tan φ = 56 x 0.59 = 33 kvar (see Figure L4).

Alternatively:

[math]\displaystyle{ Q=\sqrt{S^2 - P^2}=\sqrt{65^2 - 56^2}=33\, kvar }[/math]

Fig. L4 – Calculation power diagram
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