Тип поковки | Эскиз поковки | Соотношение размеров | Номер чертежа и таблицы припусков и предельных отклонений |
Круглого, квадратного и прямоугольного сечений гладкие | ![](data:image/jpg;base64,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)
| L > 1,5D | Черт. 2, табл. 2 |
![](data:image/jpg;base64,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)
| L > 1,5В |
Н ? В ? 1,5H |
Круглого сечения с уступами | ![](data:image/jpg;base64,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)
| L >1,5D | Черт. 3, табл. 2 и 3 |
![](data:image/jpg;base64,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)
| l > 0,3D |
Круглого сечения с фланцем | ![](data:image/jpg;base64,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)
| L >1,5D |
Круглого сечения с буртом | ![](data:image/jpg;base64,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)
| l ? 0,3D |
Круглого сечения с выемкой | ![](data:image/jpg;base64,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)
| L >1,5D | Черт. 3, табл. 2 и 3 |
Квадратного сечения с уступами тех же типов, как и круглого сечения | ![](data:image/jpg;base64,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)
| L >1,5B |
Круглого квадратного сечения с уступами разной конфигурации | ![](data:image/jpg;base64,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)
| L >1,5B |
Диски | ![](data:image/jpg;base64,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)
| H ? 0,5D | Черт. 8, табл. 7 |