Its been always a scary question for mechanical engineers working in power plants...
Well, the answer itself is scary too. Here I have tried my best to make you understand this in a simpler way.
First of all its VAR- Volt Ampere Reactive, The big M just stands for Mega! so you can call it KVAR as well when its value is in that range of course.
Here comes the wiki definition:
Now for you I'm quickly mentioning the difference between resistance, capacitance and inductance as it is required for understanding VAR.
Resistor- Opposes the flow of current through it.
Inductor- Opposes the change in current through it.
Capacitor- Opposes the change in voltage across its ends.
Now the time is to understand True, Reactive and Apparent power....
These inductors and capacitors dissipate zero power, yet the fact that they drop voltage and draw current gives the deceptive impression that they actually do dissipate power. This “phantom power” is called the reactive power.
True power P=I2R
First of all we measure electrical power when it is converted to dissipating heat energy.
Now in case of inductor it is assumed to be a pure conductor so it won't get heat up. All it does is take electrical energy in one cycle to produce magnetic field and then in the next cycle it will give that consumed energy back. so in a complete cycle there won't be any net energy consumption or generation.
This is same with the capacitor as it stores electrostatic energy and does the same during a complete cycle.
Now that you know so much, let me remind you of phasor diagram, just have a quick look here
Now do you get it? The electrical guys use this rotating vector for vector manipulations of the electricity as in case of a cocktail of resistive, inductive and capacitive loads.
Hmm... now in the diagram above you can imagine that in a resistive load(First one) the voltage and current are in sync but in case of capacitor(Second one) the current leads the voltage by certain angle and in case of inductor(Last one) it lags.
So if we want to add these current vectors in a mixed loading system,
Now You see, how easily they can be added in a vector way to have a resultant vector. Here the angle ⌽ will show weather the resulting vector is leading or lagging the voltage.
now that you know a lot about blah blah blah... lets get to the point....
This is how your Generator should look like
Since E-jIX= V
where E is EMF, I is current flowing through stator windings and X is reactance of the system
Here is the phasor of normal generator connected to grid load
Here is how I draw the phasor.
Here V is the grid voltage( or GT terminal voltage) ... supposed to be ideally constant so taken on x-axis or as a reference.
The loading of generators are inductive mostly so the current I is lagging.
The EMF E leads the current by 90 degrees in pure inductive loading.
Now here The Apparent Power is
P= VI
And The Reactive Power is
Now apply this to Generator in terms of MW and MVAR in Y and X axis respectively. while multiplying each term by V/X to convert it into power....
So you see how simple it was to come to Generator phasor diagram.
In the above diagram you can see horizontal component of the Apparent power is Mvar and the Vertical component is MW.
NOW!!!
Here comes the Generator capability curve....
"what is MVAR and how does it work? "
Well, the answer itself is scary too. Here I have tried my best to make you understand this in a simpler way.
First of all its VAR- Volt Ampere Reactive, The big M just stands for Mega! so you can call it KVAR as well when its value is in that range of course.
Here comes the wiki definition:
"In electric power transmission and distribution, volt-ampere reactive (var) is a unit used to measure reactive power in an AC electric power system. Reactive power exists in an AC circuit when the current and voltage are not in phase. The correct symbol is var and not Var, VAr, or VAR, but all three terms are widely used. The term var was proposed by the Romanian electrical engineer Constantin Budeanu and introduced in 1930 by the IEC in Stockholm, which has adopted it as the unit for reactive power."
Now for you I'm quickly mentioning the difference between resistance, capacitance and inductance as it is required for understanding VAR.
Resistor- Opposes the flow of current through it.
Inductor- Opposes the change in current through it.
Capacitor- Opposes the change in voltage across its ends.
Now the time is to understand True, Reactive and Apparent power....
These inductors and capacitors dissipate zero power, yet the fact that they drop voltage and draw current gives the deceptive impression that they actually do dissipate power. This “phantom power” is called the reactive power.
True power P=I2R
Reactive Power Q= I2X where x is the reactance of inductive and/or capacitive system
Apparent Power S=I2Z where z is the impedence of mixed system, Z2= R2+X2
Why inductors and capacitors don't consume power? Are you kidding me? no problem... here is the answer...
First of all we measure electrical power when it is converted to dissipating heat energy.
P=I2R
This is same with the capacitor as it stores electrostatic energy and does the same during a complete cycle.
Now that you know so much, let me remind you of phasor diagram, just have a quick look here
Now do you get it? The electrical guys use this rotating vector for vector manipulations of the electricity as in case of a cocktail of resistive, inductive and capacitive loads.
So if we want to add these current vectors in a mixed loading system,
Now You see, how easily they can be added in a vector way to have a resultant vector. Here the angle ⌽ will show weather the resulting vector is leading or lagging the voltage.
now that you know a lot about blah blah blah... lets get to the point....
This is how your Generator should look like
Since E-jIX= V
where E is EMF, I is current flowing through stator windings and X is reactance of the system
Here is the phasor of normal generator connected to grid load
Here is how I draw the phasor.
Here V is the grid voltage( or GT terminal voltage) ... supposed to be ideally constant so taken on x-axis or as a reference.
The loading of generators are inductive mostly so the current I is lagging.
The EMF E leads the current by 90 degrees in pure inductive loading.
Now here The Apparent Power is
P= VI
And The Reactive Power is
Now apply this to Generator in terms of MW and MVAR in Y and X axis respectively. while multiplying each term by V/X to convert it into power....
So you see how simple it was to come to Generator phasor diagram.
In the above diagram you can see horizontal component of the Apparent power is Mvar and the Vertical component is MW.
NOW!!!
Here comes the Generator capability curve....
Now try to digest this much for now!!
I'll continue on the MVAR and Generator Capability Curve next time..... until then questions are welcome!!