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ECE 476 POWER SYSTEM ANALYSIS

ECE 476 POWER SYSTEM ANALYSIS. Lecture 13 Newton-Raphson Power Flow Professor Tom Overbye Department of Electrical and Computer Engineering. Announcements. Homework 6 is 2.38, 6.8, 6.23, 6.28; you should do it before the exam but need not turn it in. Answers have been posted.

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ECE 476 POWER SYSTEM ANALYSIS

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  1. ECE 476POWER SYSTEM ANALYSIS Lecture 13Newton-Raphson Power Flow Professor Tom Overbye Department of Electrical andComputer Engineering

  2. Announcements • Homework 6 is 2.38, 6.8, 6.23, 6.28; you should do it before the exam but need not turn it in. Answers have been posted. • First exam is 10/9 in class; closed book, closed notes, one note sheet and calculators allowed. Last year’s tests and solutions have been posted. • Abbott power plant and substation field trip, Tuesday 10/14 starting at 12:30pm. We’ll meet at corner of Gregory and Oak streets. • Be reading Chapter 6; exam covers up through Section 6.4; we do not explicitly cover 6.1.

  3. PV Buses • Since the voltage magnitude at PV buses is fixed there is no need to explicitly include these voltages in x or write the reactive power balance equations • the reactive power output of the generator varies to maintain the fixed terminal voltage (within limits) • optionally these variations/equations can be included by just writing the explicit voltage constraint for the generator bus |Vi| – Vi setpoint = 0

  4. Two Bus Newton-Raphson Example For the two bus power system shown below, use the Newton-Raphson power flow to determine the voltage magnitude and angle at bus two. Assume that bus one is the slack and SBase = 100 MVA.

  5. Two Bus Example, cont’d

  6. Two Bus Example, cont’d

  7. Two Bus Example, First Iteration

  8. Two Bus Example, Next Iterations

  9. Two Bus Solved Values Once the voltage angle and magnitude at bus 2 are known we can calculate all the other system values, such as the line flows and the generator reactive power output

  10. Two Bus Case Low Voltage Solution

  11. Low Voltage Solution, cont'd Low voltage solution

  12. Two Bus Region of Convergence Slide shows the region of convergence for different initial guesses of bus 2 angle (x-axis) and magnitude (y-axis) Red region converges to the high voltage solution, while the yellow region converges to the low voltage solution

  13. Using the Power Flow: Example 1 Usingcasefrom Example6.13

  14. Three Bus PV Case Example

  15. Modeling Voltage Dependent Load

  16. Voltage Dependent Load Example

  17. Voltage Dependent Load, cont'd

  18. Voltage Dependent Load, cont'd With constant impedance load the MW/Mvar load at bus 2 varies with the square of the bus 2 voltage magnitude. This if the voltage level is less than 1.0, the load is lower than 200/100 MW/Mvar

  19. Solving Large Power Systems • The most difficult computational task is inverting the Jacobian matrix • inverting a full matrix is an order n3 operation, meaning the amount of computation increases with the cube of the size size • this amount of computation can be decreased substantially by recognizing that since the Ybus is a sparse matrix, the Jacobian is also a sparse matrix • using sparse matrix methods results in a computational order of about n1.5. • this is a substantial savings when solving systems with tens of thousands of buses

  20. Newton-Raphson Power Flow • Advantages • fast convergence as long as initial guess is close to solution • large region of convergence • Disadvantages • each iteration takes much longer than a Gauss-Seidel iteration • more complicated to code, particularly when implementing sparse matrix algorithms • Newton-Raphson algorithm is very common in power flow analysis

  21. Dishonest Newton-Raphson • Since most of the time in the Newton-Raphson iteration is spend calculating the inverse of the Jacobian, one way to speed up the iterations is to only calculate/inverse the Jacobian occasionally • known as the “Dishonest” Newton-Raphson • an extreme example is to only calculate the Jacobian for the first iteration

  22. Dishonest Newton-Raphson Example

  23. Dishonest N-R Example, cont’d We pay a price in increased iterations, but with decreased computation per iteration

  24. Two Bus Dishonest ROC Slide shows the region of convergence for different initial guesses for the 2 bus case using the Dishonest N-R Red region converges to the high voltage solution, while the yellow region converges to the low voltage solution

  25. Honest N-R Region of Convergence Maximum of 15 iterations

  26. Decoupled Power Flow • The completely Dishonest Newton-Raphson is not used for power flow analysis. However several approximations of the Jacobian matrix are used. • One common method is the decoupled power flow. In this approach approximations are used to decouple the real and reactive power equations.

  27. Decoupled Power Flow Formulation

  28. Decoupling Approximation

  29. Off-diagonal Jacobian Terms

  30. Decoupled N-R Region of Convergence

  31. Fast Decoupled Power Flow • By continuing with our Jacobian approximations we can actually obtain a reasonable approximation that is independent of the voltage magnitudes/angles. • This means the Jacobian need only be built/inverted once. • This approach is known as the fast decoupled power flow (FDPF) • FDPF uses the same mismatch equations as standard power flow so it should have same solution • The FDPF is widely used, particularly when we only need an approximate solution

  32. FDPF Approximations

  33. FDPF Three Bus Example Use the FDPF to solve the following three bus system

  34. FDPF Three Bus Example, cont’d

  35. FDPF Three Bus Example, cont’d

  36. FDPF Region of Convergence

  37. “DC” Power Flow • The “DC” power flow makes the most severe approximations: • completely ignore reactive power, assume all the voltages are always 1.0 per unit, ignore line conductance • This makes the power flow a linear set of equations, which can be solved directly

  38. Power System Control • A major problem with power system operation is the limited capacity of the transmission system • lines/transformers have limits (usually thermal) • no direct way of controlling flow down a transmission line (e.g., there are no valves to close to limit flow) • open transmission system access associated with industry restructuring is stressing the system in new ways • We need to indirectly control transmission line flow by changing the generator outputs

  39. Indirect Transmission Line Control What we would like to determine is how a change in generation at bus k affects the power flow on a line from bus i to bus j. The assumption is that the change in generation is absorbed by the slack bus

  40. Power Flow Simulation - Before • One way to determine the impact of a generator change is to compare a before/after power flow. • For example below is a three bus case with an overload

  41. Power Flow Simulation - After Increasing the generation at bus 3 by 95 MW (and hence decreasing it at bus 1 by a corresponding amount), results in a 31.3 drop in the MW flow on the line from bus 1 to 2.

  42. Analytic Calculation of Sensitivities • Calculating control sensitivities by repeat power flow solutions is tedious and would require many power flow solutions. An alternative approach is to analytically calculate these values

  43. Analytic Sensitivities

  44. Three Bus Sensitivity Example

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