Research Article
A Multiple Criteria Decision Analysis Method for Alternative Assessment Results Obeying a Particular Distribution and Application
Table 5
Comparison of four methods.
| Number | Method 1 | Method 2 | Method 3 | Method 4 | Off-target distance | Rank | Off-target distance | Rank | Alternative value | Rank | Alternative value | Rank |
| 1 | 0.4815 | 42 | 0.4154 | 43 | 0.5667 | 16 | 0.3985 | 40 | 2 | 0.4702 | 44 | 0.3856 | 44 | 0.5965 | 12 | 0.3196 | 44 | 3 | 0.4837 | 41 | 0.4522 | 42 | 0.3877 | 37 | 0.5780 | 15 | 4 | 0.4756 | 43 | 0.4687 | 41 | 0.3877 | 36 | 0.4900 | 28 | 5 | 0.5067 | 40 | 0.4994 | 40 | 0.5667 | 15 | 0.6214 | 11 | 6 | 0.5448 | 7 | 0.5365 | 25 | 0.6562 | 3 | 0.7203 | 4 | 7 | 0.5823 | 3 | 0.5823 | 2 | 0.6562 | 1 | 0.8029 | 2 | 8 | 0.5975 | 1 | 0.5934 | 1 | 0.6264 | 4 | 0.6693 | 7 | 9 | 0.583 | 2 | 0.5744 | 3 | 0.5071 | 21 | 0.4713 | 29 | 10 | 0.577 | 4 | 0.5741 | 4 | 0.4474 | 29 | 0.5420 | 19 | 11 | 0.5714 | 5 | 0.5669 | 5 | 0.5071 | 22 | 0.5191 | 23 | 12 | 0.5607 | 6 | 0.5614 | 6 | 0.4176 | 33 | 0.4525 | 31 | 13 | 0.5369 | 9 | 0.5365 | 26 | 0.3281 | 41 | 0.3331 | 43 | 14 | 0.5403 | 8 | 0.5357 | 27 | 0.5965 | 11 | 0.5458 | 18 | 15 | 0.5325 | 13 | 0.5258 | 32 | 0.4772 | 25 | 0.4489 | 32 | 16 | 0.5274 | 23 | 0.5199 | 37 | 0.4474 | 32 | 0.5174 | 24 | 17 | 0.5285 | 18 | 0.5284 | 31 | 0.3877 | 35 | 0.6314 | 10 | 18 | 0.5337 | 12 | 0.5343 | 30 | 0.5667 | 14 | 0.5699 | 17 | 19 | 0.5279 | 21 | 0.524 | 35 | 0.4772 | 27 | 0.5145 | 25 | 20 | 0.5193 | 35 | 0.5194 | 38 | 0.3281 | 42 | 0.4022 | 39 | 21 | 0.5155 | 38 | 0.5156 | 39 | 0.4772 | 28 | 0.4138 | 36 | 22 | 0.5208 | 33 | 0.5227 | 36 | 0.5369 | 20 | 0.6008 | 14 | 23 | 0.5204 | 34 | 0.5241 | 34 | 0.4772 | 26 | 0.5000 | 27 | 24 | 0.5155 | 39 | 0.5258 | 33 | 0.2983 | 44 | 0.4022 | 38 | 25 | 0.5235 | 26 | 0.5355 | 29 | 0.6264 | 7 | 0.6771 | 6 | 26 | 0.5212 | 31 | 0.5382 | 23 | 0.3579 | 40 | 0.5112 | 26 | 27 | 0.5175 | 37 | 0.5384 | 22 | 0.3579 | 39 | 0.4222 | 35 | 28 | 0.5276 | 22 | 0.5502 | 11 | 0.6264 | 5 | 0.8053 | 1 | 29 | 0.5345 | 11 | 0.5572 | 7 | 0.5965 | 8 | 0.6861 | 5 | 30 | 0.5299 | 16 | 0.5547 | 8 | 0.3579 | 38 | 0.4243 | 34 | 31 | 0.5269 | 24 | 0.552 | 9 | 0.4474 | 30 | 0.4108 | 37 | 32 | 0.5226 | 28 | 0.5433 | 19 | 0.5369 | 18 | 0.3386 | 42 | 33 | 0.5189 | 36 | 0.5357 | 28 | 0.5369 | 19 | 0.3912 | 41 | 34 | 0.5213 | 30 | 0.5409 | 21 | 0.4772 | 24 | 0.6058 | 12 | 35 | 0.5212 | 32 | 0.5381 | 24 | 0.5965 | 10 | 0.4552 | 30 | 36 | 0.5219 | 29 | 0.5419 | 20 | 0.3877 | 34 | 0.6015 | 13 | 37 | 0.523 | 27 | 0.5455 | 17 | 0.4474 | 31 | 0.5742 | 16 | 38 | 0.5254 | 25 | 0.5461 | 15 | 0.6264 | 6 | 0.5411 | 20 | 39 | 0.528 | 20 | 0.5482 | 14 | 0.5369 | 17 | 0.6441 | 9 | 40 | 0.5285 | 19 | 0.5457 | 16 | 0.5667 | 13 | 0.6485 | 8 | 41 | 0.5296 | 17 | 0.5453 | 18 | 0.5965 | 9 | 0.5272 | 22 | 42 | 0.5356 | 10 | 0.551 | 10 | 0.6562 | 2 | 0.7611 | 3 | 43 | 0.5321 | 14 | 0.5488 | 13 | 0.2983 | 43 | 0.4483 | 33 | 44 | 0.5321 | 15 | 0.5492 | 12 | 0.4772 | 23 | 0.5301 | 21 |
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