Статический расчет производим для секции водосливной плотины. Расчет ведем при наихудшем сочетании действующих нагрузок: в верхнем бьефе уровень воды находится на отметке НПУ, а в нижнем бьефе на минимальном уровне. Сбор нагрузок производится по расчетной схеме (М 1:500). Обозна-ние
| Площадь
фигуры
| Толщина
d
| Сила, кН
| плечо, м
| моменты, кН∙м.
| гор
| вер
| +
| -
| Вес водослива
| G1
| 9∙25,47∙24
| 14
|
| 77021
| 8
| 616170
|
| G2
| 8∙6,2∙24
| 14
|
| 16666
| 16,5
| 274982
|
| G3
| 0,5∙24∙25,47∙24
| 14
|
| 102695
| 4,5
|
| 462128
| G4
| 0,5∙5,84∙6,2∙24
| 14
|
| 6083
| 18,5
|
| 112534
|
| ∑
|
|
| 202465
|
| 891153
| 574662
| Вес быков
| G5
| 20∙35,5∙24
| 4
|
| 68160
| 10,5
| 715680
|
| G6
| 5∙6,5∙24
| 4
|
| 3120
| 23
| 71760
|
| G7
| 0,5∙5∙7,5∙24
| 4
|
| 1800
| 22,1
| 39780
|
| G8
| 0,5∙5,5∙5,5∙24
| 4
|
| 1452
| 1,3
|
| 1888
| G9
| 21∙23,5∙24
| 4
|
| 47376
| 10
|
| 473760
|
| ∑
|
|
| 121908
|
| 827220
| 475648
| Вес воды на водосливе
| V1
| 8∙26,3∙9,81
| 14
|
| 28896
| 16,5
| 476790
|
| V2
| 4∙7,02∙9,81
| 14
|
| 3857
| 10,5
| 40493
|
| V3
| 0,5∙4,05∙4,3∙9,81
| 14
|
| 1196
| 13,31
| 517283
| 15917
| V4
| 5,84∙4,3∙9,81
| 14
|
| 3449
| 17,48
|
| 60286
|
| ∑
|
|
| 37398
|
| 517283
| 76204
| Гидростатическое давление с Нб и гидростатическое давление с Вб
| W1
| 0,5∙26,3∙26,3∙9,81
| 18
| 61069
|
| 11,46
|
| 699854
| W2
| 25,01∙6,2∙9,81
| 18
| 27381
|
| 3
|
| 82143
| W3
| 0,5∙10,5∙10,5∙9,81
| 18
| -9734
|
| 3,5
| 34069
|
|
| ∑
|
| 78716
|
|
| 34069
| 781997
| Взвешивающее противодавление и фильтрационное противодавление
| Wвз
| 41∙10,5∙9,81
| 18
|
| -76018
| 0
| 0
| 0
| Wф1
| 13,35∙3,8∙9,81
| 18
|
| -8958
| 10,11
|
| 90564
| Wф2
| 14∙3,59∙9,81
| 18
|
| -8875
| 18,68
|
| 165783
|
|
|
|
| -93851
|
|
| 256348
|
| ∑
|
| 78716
| 267920
|
| 2269724
| 2164858
|
| ∑
|
|
|
|
| 104866
|
|
Сумма горизонтальных сил ∑Q = 78716 кН.
Сумма вертикальных сил ∑Р = 267920 кН.
Сумма моментов ∑М = 104866 кН∙м.
Схема нагрузок (М1:500):
![](data:image/png;base64,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) Схема нагрузок (М1:500):
![](data:image/png;base64,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)
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