К1
| 8,0
| 1,28
| 11,88
| 8,016
| 1,076
| К2
| 4,32
| 1,00
| 6,11
| 4,32
| 1,00
| К3
| 4,57
| 1,00
| 6,47
| 4,57
| 1,00
| К4
| 3,65
| 1,00
| 5,15
| 3,65
| 1,00
| К5
| 3,85
| 1,05
| 5,44
| 3,85
| 1,002
| К6
| 3,58
| 1,00
| 5,07
| 3,58
| 1,00
| К7
| 6,40
| 1,00
| 9,04
| 6,40
| 1,00
| К8
| 5,76
| 1,02
| 8,14
| 5,76
| 1,00
| К9
| 5,02
| 1,00
| 7,09
| 5,02
| 1,00
| К10
| 5,22
| 1,00
| 7,38
| 5,22
| 1,00
| К11
| 1,99
| 1,00
| 2,82
| 1,99
| 1,00
| Таблица 8.1 – Сводная таблица расчетов токов КЗ.
8.3. Расчет и выбор питающей сети. Определяем экономически целесообразное сечение по формуле:
![](data:image/png;base64,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)
где Jэк – экономическая плотность тока [3, табл. 6.8];
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