Вывод: Несущая способность сваи под наружную стену обеспечена. Принимаем сваю С-60-30
6. расчет фундамента под колонну Грузовая площадь для сбора нагрузок:
А=6∙6=36 м2.
|
| № п/п
| Нагрузки
| Нормативная нагрузка
| γс
| Расчетная нагрузка, кН
|
| на ед. площ., кН/м2
| от грузовой площ., кН
|
| Постоянные нагрузки
|
| От покрытия
|
| 1
| "Техноэласт"-2 слой
| 0,05
| 1,8
| 1,1
| 1,98
|
| 2
| Стяжка из плоского шифера т.20мм
| 0,54
| 19,44
| 1,3
| 25,27
|
| 3
| Плиты теплоизоляционные ППЖ -200
| 2,00
| 72
| 1,3
| 93,6
|
| 4
| Газобетонная крошка т.20-100мм
| 0,45
| 16,2
| 1,3
| 21,06
|
| 5
| Пароизоляция пленка"Ютафол" - 2 слоя
| 0,05
| 1,8
| 1,3
| 2,34
|
| 6
| Железобетонная монолитная плита
| 2,75
| 99
| 1,1
| 108,9
|
|
| итого
|
| 210,2
|
| 253,15
|
| От покрытия технического этажа
|
| 7
| Стяжка цементно-песчанная t = 0,04м γ=17кН/м3
| 0,68
| 24,48
| 1,3
| 31,8
|
| 8
| Утеплитель «Пеноплекс» t = 0,04м
| 0,014
| 0,5
| 1,3
| 0,65
|
| 9
| Пароизоляция пленка"Ютафол" - 2 слоя
| 0,05
| 1,8
| 1,3
| 2,34
|
| 10
| Железобетонная монолитная плита
| 2,75
| 99
| 1,1
| 108,9
|
|
| итого
|
| 127,75
|
| 143,7
|
| От межэтажные перекрытия
|
| 11
| Междуэтажные плиты перекрытия на 6-и этажах
| 16,5
| 594
| 1,1
| 563,4
|
| 12
| Вес конструкции пола на 6-х этажах
| 4,56
| 164,16
| 1,3
| 213,4
|
| 13
| От перегородок
| 0,50
| 18
| 1,1
| 19,8
|
|
| итого
|
| 776,16
|
| 796,6
|
| От прогонов
|
| 12
| Вес конструкций
| 4,32
| 933
| 1,1
| 1026,3
|
| 13
| От веса колонны
|
| 5,18
| 1,1
| 5,7
|
|
| итого
|
| 938,2
|
| 1032
|
|
| Итого:
|
| 2052,3
|
| 2225,45
|
|
|
|
|
|
|
|
| Временные нагрузки
|
|
|
|
|
| 15
| От снега
| 2,24
|
|
|
|
|
| Кратковременная
| 0,75
| 4,137
| 1,43
| 5,915
|
|
| Длительного действия
| 1,49
| 8,273
| 1,43
| 11,830
|
| 16
| На перекрытии с учетом ψn1
| 1,5
|
|
|
|
|
| Кратковременная
| 0,50
| 1,728
| 1,4
| 2,420
|
|
| Длительного действия
| 1,00
| 3,457
| 1,3
| 4,494
|
|
| Итого:
|
| 17,595
|
| 24,660
|
|
-коэффициент сочетания нагрузок;
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)
;
Нормативные нагрузки на 1м стены для расчета по II группе:
кН; кН; кН. |