il102
Electrical
- Nov 1, 2011
- 13
I've read through a lot of old threads on this, and I admit I still do not fully understand. I just want to double check this.
S = P + jQ. The sign of Q is completely dependent on whether the load is leading or lagging, AND which convention you take the sign of P to be in.
For example. For the sake of simplicity lets assume single phase.
Let's say we have a 10MVA, .8 lagging load.
The real power consumption is 10MVA * .8 = 8MW.
The reactive power is sqrt(10^2 - 8^2) = 6MVAR.
The question is, does the load consume 8 + 6J MVA or 8 - 6J MVA. My gut tells me that a lagging load consumes watts and consumes vars, making this an overall load that consumes 8+6J MVA. (alternatively, -8-6J MVA if you arbitrarily reverse the convention of the positive power flow).
For argument's sake, let us prove this. Let's pretend our system is running at 100kV. The current into this load is (10MVA/100kV) = 100 amps. We said the load is lagging at .8 so that means the angle between the current and the voltage is -36.9º. I = (100∟-36.9º) assuming V = (100∟0º).
That means S = V x (I*). S = 10MVA at an angle of positive 36.9º since we took the conjugate. That means S = 8 + 6 MVA. Meaning for a lagging load, the sign is the same for watts and vars. Everything here checks out just fine. Our load is consuming 8 MW and 6 MVAR.
Now lets look at one generator supplying these vars and watts. My gut, which I now think is wrong, would lead me to believe that you need a LEADING generator to supply a LAGGING load. I think I'm about to prove myself wrong but let's see.
Clearly our generator is supplying 10MVA. It also needs to supply MVAR. If we said the power flow into our load is +10MVA that means the power flow out of our generator is -10MVA, right? So our power flow out of the generator is -8-6j MVA I would think. That means S = 10MVA∟36.9º meaning I = 100∟-36.9º. So our generator is lagging as well.
I think I just cleared this up for myself, but I'd appreciate a sanity check.
Bottom line: On an isolated system - a lagging Generator produces VARS that a lagging load consumes. For a lagging generator/load - the sign is always the same for the watts and the vars. For a leading generator/load, the sign is always different for the watts and the vars.
Capacitors could be treated as a LEADING load that produces vars, while a LAGGING induction generator consumes those vars. However, a generator would need to be LAGGING to produce vars that an induction generator consumes.
The subtle difference I believe that was tripping me up was the difference between generator/load.
S = P + jQ. The sign of Q is completely dependent on whether the load is leading or lagging, AND which convention you take the sign of P to be in.
For example. For the sake of simplicity lets assume single phase.
Let's say we have a 10MVA, .8 lagging load.
The real power consumption is 10MVA * .8 = 8MW.
The reactive power is sqrt(10^2 - 8^2) = 6MVAR.
The question is, does the load consume 8 + 6J MVA or 8 - 6J MVA. My gut tells me that a lagging load consumes watts and consumes vars, making this an overall load that consumes 8+6J MVA. (alternatively, -8-6J MVA if you arbitrarily reverse the convention of the positive power flow).
For argument's sake, let us prove this. Let's pretend our system is running at 100kV. The current into this load is (10MVA/100kV) = 100 amps. We said the load is lagging at .8 so that means the angle between the current and the voltage is -36.9º. I = (100∟-36.9º) assuming V = (100∟0º).
That means S = V x (I*). S = 10MVA at an angle of positive 36.9º since we took the conjugate. That means S = 8 + 6 MVA. Meaning for a lagging load, the sign is the same for watts and vars. Everything here checks out just fine. Our load is consuming 8 MW and 6 MVAR.
Now lets look at one generator supplying these vars and watts. My gut, which I now think is wrong, would lead me to believe that you need a LEADING generator to supply a LAGGING load. I think I'm about to prove myself wrong but let's see.
Clearly our generator is supplying 10MVA. It also needs to supply MVAR. If we said the power flow into our load is +10MVA that means the power flow out of our generator is -10MVA, right? So our power flow out of the generator is -8-6j MVA I would think. That means S = 10MVA∟36.9º meaning I = 100∟-36.9º. So our generator is lagging as well.
I think I just cleared this up for myself, but I'd appreciate a sanity check.
Bottom line: On an isolated system - a lagging Generator produces VARS that a lagging load consumes. For a lagging generator/load - the sign is always the same for the watts and the vars. For a leading generator/load, the sign is always different for the watts and the vars.
Capacitors could be treated as a LEADING load that produces vars, while a LAGGING induction generator consumes those vars. However, a generator would need to be LAGGING to produce vars that an induction generator consumes.
The subtle difference I believe that was tripping me up was the difference between generator/load.
