Research Article

Finding Optimal Load Dispatch Solutions by Using a Proposed Cuckoo Search Algorithm

Table 26

Optimal solution for Subcase 6.3.

Pi (MW)Pi (MW)Pi (MW)Pi (MW)Pi (MW)Pi (MW)

1219.136456239.93111219.1364166239.9298221219.1364276239.9295
2212.402557287.7776112212.4025167287.7776222212.4025277287.7776
3280.657758238.8802113280.6577168238.8802223280.6577278238.8802
4239.283659426.0203114239.2836169426.0203224239.2836279426.0203
5279.921760275.8712115279.9217170275.8712225279.9217280275.8712
6239.9361219.1364116239.93171219.1364226239.93281219.1364
7287.777662212.4025117287.7776172212.4025227287.7776282212.4025
8238.880263280.6577118238.8802173280.6579228238.8802283280.6577
9426.020364239.2836119426.0203174239.2836229426.0203284239.2836
10275.871265279.9217120275.8712175279.9217230275.8712285279.9217
11217.565166239.93121219.136476239.93231219.1364286239.93
12212.402267287.7776122212.402577287.7776232212.4025287287.7776
13282.668768238.8802123280.657778238.8802233280.6577288238.8802
14240.090569426.0203124239.283679426.0203234239.2836289426.0203
15280.16570275.8712125279.921780275.8712235279.9217290275.8712
16240.466171219.1364126239.93181219.1364236239.93291219.1364
17287.506172212.4025127287.7776182212.4025237287.7776292212.4025
18239.685273280.6577128238.8802183280.6577238238.8802293280.6577
19426.104974239.2836129426.0203184239.2836239426.0203294239.2836
20277.031875279.9217130275.8712185279.9217240275.8712295279.9217
21219.136476239.9301131219.1364186239.9298241219.1364296239.9305
22212.402577287.7776132212.4025187287.7776242212.4025297287.7776
23280.657778238.8802133280.6577188238.8802243280.6577298238.8802
24239.283679426.0203134239.2836189426.0203244239.2836299426.0203
25279.921780275.8712135279.9217190275.8712245279.9217300275.8712
26239.9381219.1363136239.9309191219.1364246239.93301219.1364
27287.777682212.4025137287.7776192212.4025247287.7776302212.4025
28238.880283280.6577138238.8802193280.6577248238.8802303280.6577
29426.020384239.2836139426.0203194239.2836249426.0203304239.2836
30275.871285279.9217140275.8712195279.9217250275.8712305279.9217
31219.136586239.93141219.1364196239.93251219.1364306239.93
32212.402587287.7776142212.4025197287.7776252212.4025307287.7776
33280.657788238.8802143280.6577198238.8802253280.6577308238.8802
34239.283689426.0203144239.2836199426.0203254239.2836309426.0203
35279.921790275.8712145279.9217200275.8712255279.9217310275.8714
36239.9391219.1344146239.93201219.1364256239.93311219.1369
37287.777692212.4025147287.7776202212.4025257287.7776312212.4025
38238.880293280.6577148238.8802203280.6577258238.8802313280.6577
39426.020394239.2836149426.0193204239.2836259426.0203314239.2836
40275.871295279.9217150275.8712205279.9217260275.8712315279.9217
41219.136496239.93151219.1364206239.93261219.1364316239.93
42212.402597287.7776152212.4025207287.7776262212.4025317287.7776
43280.657798238.8802153280.6577208238.8802263280.6577318238.8802
44239.283699426.0203154239.2832209426.0203264239.2836319426.0203
45279.9217100275.8712155279.9217210275.8712265279.9217320275.8710
46239.93101219.1384156239.93211219.1359266239.93
47287.7776102212.4025157287.7776212212.4025267287.7776
48238.8798103280.6577158238.8806213280.6577268238.8802
49426.0203104239.2840159426.0213214239.2836269426.0203
50275.8712105279.9217160275.8712215279.9217270275.8712
51219.1364106239.93161219.1364216239.93271219.1364
52212.4025107287.7776162212.4025217287.7776272212.4025
53280.6577108238.8802163280.6577218238.8802273280.6577
54239.2836109426.0203164239.2836219426.0203274239.2836
55279.9217110275.8712165279.9217220275.8712275279.9217