ГОСУДАРСТВЕННЫЙ СТАНДАРТ СОЮЗА ССР
ОПОРЫ ДЕРЕВЯННЫЕ ДОРОЖНЫХ ЗНАКОВ
технические условия
ГОСТ 25458—82
Wooden (timber) posts for road signs.
Specifications
Постановлением Государственного комитета СССР по делам строительства от 14 сентября 1982 г. № 214 срок введения установлен
с 01.01.84
Настоящий стандарт распространяется на деревянные опоры, предназначаемые для установки дорожных знаков по ГОСТ 10807—78.
1. ТИПЫ, ОСНОВНЫЕ ПАРАМЕТРЫ И РАЗМЕРЫ
1.1. Опоры для установки дорожных знаков подразделяют на два типа:
1 — со сплошным поперечным сечением;
2 — с ослабленным поперечным сечением (безопасные).
1.2. Опоры типа 1 изготавливают длиной 3500, 4000, 4500, 5000 и 5500 мм, типа 2 — длиной 5500, 6000, 6500, 7000, 7500, 8000 и 8500 мм.
1.3. Параметры опоры в зависимости от типоразмера, числа знаков, устанавливаемых на опоре, и изгибающего момента в расчетном сечении следует выбирать согласно рекомендуемому приложению.
1.4. Форма и основные размеры опор должны соответствовать указанным на чертеже и в таблице.
1.5. Марка опоры состоит из буквенно-цифровых групп, разделенных тире.
Первая группа содержит:
цифровое обозначение типа опоры (см. п. 1.1);
![Рисунок 1](data:image/jpg;base64,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)
|
|
|
|
|
|
|
|
|
|
Марка
|
Основные размеры опоры, м
|
Диаметр отверстия ослабленного
|
Изгибающий момент в расчетном
|
Справочная масса, кг, опоры с поперечным сечением
|
опоры
|
L
|
b
|
t
|
d
|
поперечного сечения dо, мм
|
поперечном сечении М, Нм (кгсм)
|
круглым
|
прямоугольным
|
10Д35—8
|
3500
|
70
|
75
|
90
|
-
|
800 (81,6)
|
13,4
|
11,0
|
10Д40— 8
|
|
|
|
|
|
|
15,3
|
12,6
|
10Д40—11
|
4000
|
55
|
95
|
95
|
|
1100 (112,2)
|
16,9
|
12,5
|
10Д40—18
|
|
95
|
|
110
|
|
1800 (183,5)
|
22,8
|
21,7
|
10Д40—24
|
|
70
|
125
|
125
|
|
2400 (244,7)
|
29,4
|
21,0
|
10Д45—8
|
|
|
75
|
90
|
|
800 (81,6)
|
17,2
|
14,2
|
10Д45—11
|
|
55
|
|
105
|
|
1100 (112,2)
|
23,4
|
14,1
|
10Д45—14
|
|
70
|
95
|
110
|
|
1400 (142,7)
|
25,6
|
18,0
|
10Д45—18
|
4500
|
95
|
|
120
|
|
1800 (183,5)
|
30,5
|
24,4
|
10Д45—24
|
|
70
|
|
125
|
|
2400 (244,7)
|
33,1
|
23,6
|
10Д45—32
|
|
95
|
125
|
135
|
|
3200 (326,3)
|
38,6
|
32,1
|
10Д45—42
|
|
125
|
|
150
|
|
4200 (428,3)
|
47,7
|
41,9
|
10Д50—18
|
|
95
|
95
|
120
|
|
1800 (183,5)
|
33,9
|
27,1
|
10Д50—24
|
|
70
|
|
125
|
|
2400 (244,7)
|
36,8
|
25,3
|
10Д50—32
|
5000
|
95
|
125
|
135
|
|
3200 (326,3)
|
42,9
|
35,6
|
10Д50—42
|
|
125
|
|
150
|
|
4200 (428,3)
|
53,0
|
46,9
|
10Д50—57
|
|
|
145
|
165
|
|
5700 (581,2)
|
64,1
|
54,4
|
10Д55—18
|
|
95
|
95
|
120
|
|
1800 (183,5)
|
37,3
|
29,8
|
10Д55—24
|
|
70
|
125
|
125
|
|
2400 (244,7)
|
40,5
|
28,9
|
10Д55—43
|
|
95
|
145
|
150
|
|
4300 (438,5)
|
58,3
|
45,5
|
10Д55—57
|
5500
|
125
|
|
165
|
|
5700 (581,2)
|
70,5
|
59,8
|
10Д55—78
|
|
95
|
195
|
180
|
|
7800 (795,4)
|
83,9
|
61,1
|
20Д55—66
|
|
145
|
145
|
165
|
40
|
6600 (673,0)
|
70,5
|
69,4
|
20Д60—78
|
|
95
|
195
|
190
|
|
7800 (795,4)
|
101,9
|
66,6
|
20Д60—83
|
6000
|
125
|
|
|
50
|
8300 (846,4)
|
101,9
|
78,8
|
20Д60—96
|
|
145
|
|
95
|
|
9600 (978,9)
|
107,5
|
91,3
|
20Д60—116
|
|
175
|
175
|
210
|
65
|
11600 (1182,9)
|
124,6
|
110,2
|
20Д65—96
|
|
145
|
|
195
|
50
|
9600 (978,9)
|
116,4
|
99,0
|
20Д65—116
|
6500
|
175
|
|
210
|
|
11600 (1182,9)
|
135,0
|
119,4
|
20Д65—119
|
|
145
|
195
|
215
|
65
|
11900 (1213,5)
|
141,5
|
110,3
|
20Д70—160
|
7000
|
195
|
|
230
|
|
16000 (1641,7)
|
174,4
|
159,6
|
20Д70—175
|
|
175
|
215
|
240
|
75
|
17500 (1784,5)
|
189,9
|
157,9
|
20Д75—150
|
7500
|
195
|
195
|
230
|
65
|
15000 (1529,0)
|
186,9
|
171,0
|
20Д75—215
|
|
215
|
215
|
260
|
75
|
21500 (2192,5)
|
238,8
|
208,0
|
20Д80—250
|
8000
|
195
|
245
|
270
|
90
|
25000 (2549,3)
|
274,7
|
229,3
|
20Д85—280
|
8500
|
215
|
|
280
|
|
28000 (2855,2)
|
313,9
|
268,6
|
Примечание. Справочная масса опоры приведена для древесины со средней плотностью 600 кг/м3.
буквенное обозначение наименования опоры — ОД;
длину опоры в дециметрах.
Во второй группе указана величина изгибающего момента в гекто-ньютон-метрах в расчетном сечении.
В марке опор, изготовленных из круглых лесоматериалов или пиломатериалов прямоугольного поперечного сечения, приводят обозначение формы поперечного сечения — соответственно буквы К или П.
Пример условного обозначения опоры типа 1, длиной 4000 мм, рассчитанной на действие изгибающего момента 1800 Нм, изготовленной из пиломатериала прямоугольного поперечного сечения:
10Д4018П
То же, типа 2, с ослабленным поперечным сечением (безопасная), длиной 5500 мм, рассчитанной на действие изгибающего момента 6600 Нм, изготовленной из круглого лесоматериала:
20Д5566К
2. ТЕХНИЧЕСКИЕ ТРЕБОВАНИЯ
2.1. Опоры должны изготавливаться в соответствии с требованиями настоящего стандарта по технологической документации, утвержденной в установленном порядке.
2.2. Для изготовления опор следует применять лесоматериалы круглые хвойных пород по ГОСТ 9463—88 или пиломатериалы хвойных пород по ГОСТ 8486—86 2-го и 3-го сортов.
Допускается изготавливать опоры из древесины других пород — в пределах районов их произрастания — при условии, что ее стойкость против загнивания, твердость и прочность на изгиб не ниже соответствующих показателей для хвойных пород.
2.3. Поверхность круглых лесоматериалов должна быть очищена от коры и сучьев и ровно обтесана.
Грани опор, изготовленных из пиломатериалов, должны быть оструганы.
2.4. Точность изготовления опор
2.4.1. Отклонения размеров опор от номинальных, указанных на чертеже, с учетом припусков на обработку по ГОСТ 7307—75 не должны превышать, мм:
по длине опоры . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . ±20;
по размерам расчетного поперечного сечения . . . . . 2.
2.4.2. Непрямолинейность опор не должна превышать величин, установленных ГОСТ 8486—86 и ГОСТ 9463—88.
2.5. Защиту опор от биологического разрушения следует выполнять по ГОСТ 20022.9—76.
Часть опоры, закапываемую в грунт, следует дополнительно покрывать горячим битумом по ГОСТ 22245—90 на длину 1,7 м от нижнего торца опоры, кроме опор длиной 3,5 м, для которых этот размер должен быть равен 1,4 м.
2.6. Верхнюю (надземную) часть опор следует покрывать стойкими к воздействию климатических факторов лакокрасочными материалами белого цвета. Качество исполнения должно отвечать требованиям ГОСТ 24404—88 для класса покрытия V.
3. ПРАВИЛА ПРИЕМКИ
3.1. Приемку готовых опор следует производить: партиями.
В состав партии входят опоры одной марки, изготовленные в течение одной смены и сопровождающиеся документом установленной формы об их качестве, в котором указывают: номер и дату выдачи документа, наименование и адрес предприятия-изготовителя, номер партии и дату ее изготовления, марку, опоры, число опор в партии, обозначение настоящего стандарта.
При наличии дополнительных требований, оговоренных в заказах на изготовление опор, в документе приводят данные по этим требованиям.
3.2. Приемка партии заключается в проверке соответствия требованиям настоящего стандарта размеров и внешнего вида не менее чем трех опор данной партии.
Если в результате проверки будет установлено несоответствие опоры требованию настоящего стандарта хотя бы по одному показателю, то проводят повторную проверку удвоенного числа опор. Если при повторной проверке хотя бы одна опора не будет соответствовать требованиям настоящего стандарта, то данная партия подлежит приемке поштучно.
4. МЕТОДЫ КОНТРОЛЯ
4.1. Измерение длины опор следует выполнять металлической мерной лентой, соответствующей требованиям ГОСТ 7502—89; измерение ширины граней опор прямоугольного сечения — металлической линейкой, соответствующей требованиям ГОСТ 427—75; измерение диаметра опор круглого поперечного сечения — штангенциркулем, соответствующим требованиям ГОСТ 166—89.
4.2. Прямолинейность профиля опор следует определять посредством поверочной плиты и металлической линейки, предусмотренной в п. 4.1.
4.3. Глубину проникновения антисептиков в древесину определяют по ГОСТ 20022.9—76.
4.4. Внешний вид опор проверяют визуально.
5. МАРКИРОВКА, ХРАНЕНИЕ И ТРАНСПОРТИРОВАНИЕ
5.1. Каждая опора должна иметь маркировку, содержащую марку опоры, номер партии и дату ее изготовления.
5.2. Опоры следует хранить на складе готовой продукции в контейнерах, штабелях или пакетах рассортированными по маркам.
Высота штабеля или пакета должна быть не более 2 м.
5.3. Нижний ряд опор в штабеле или пакете следует укладывать на плотное выровненное основание по деревянным прокладкам.
5.4. Поставка опор потребителю должна осуществляться в контейнерах или пакетах любым видом транспорта.
5.5. Погрузку, транспортирование и разгрузку опор следует производить, соблюдая правила техники безопасности и принимая меры, исключающие возможность их повреждения.
Разгрузка опор сбрасыванием не допускается.
5.6. Погрузку, крепление и транспортирование опор на открытом подвижном составе (полувагоны или платформы) следует осуществлять в соответствии с требованиями Правил перевозок грузов и Технических условий погрузки и крепления грузов, утвержденных Министерством путей сообщения.
При транспортировании опор пакетами должны соблюдаться требования ГОСТ 26663—85.
Транспортная маркировка — по ГОСТ 14192—77.
ПРИЛОЖЕНИЕ
Рекомендуемое
УКАЗАНИЯ ПО ВЫБОРУ ПАРАМЕТРОВ ОПОРЫ ДОРОЖНЫХ ЗНАКОВ
1. Необходимая длина опоры L, м, при различных схемах установки дорожных знаков, приведенных на чертеже, должна удовлетворять условию
L = h1 + h2 + h3 + d,
где h1 — высота части опоры, закрытой знаком (знаками). При этом верхний край знака должен возвышаться над верхом опоры не более чем на 0,15 м; расстояние между краями смежных знаков, размещаемых по вертикали, принимают равным 0,05 м;
h2 — высота части опоры от низа дорожного знака до верха кромки проезжей части автомобильной дороги, принимаемая не менее 1,5—2,0 м;
h3 — разница высот между поверхностью кромки проезжей части и местом установки опоры, принимаемая равной 0,2 м для одностоечных опор, 0,3 м — для двухстоечных и 0,35 м — для трехстоечных;
d — заглубление опоры в грунт, равное 1,5 м (кроме опор длиной 3,5 м, для которых d = l,2 м).
2. Размеры поперечного сечения опоры должны приниматься в зависимости от расчетного сгибающего момента М, Нм (кгсм), возникающего от ветровой нагрузки на щиты знаков, на опоры и определяемого по формуле
N = 1,1 W h,
где 1,1 — коэффициент, учитывающий дополнительный изгибающий момент от ветровой нагрузки, действующей собственно на опору (без знака);
W — расчетная ветровая нагрузка на знак (знаки), Н (кгс),
W = A qsn;
А — расчетная площадь знака (знаков), м2;
qsn — нормативное значение статической составляющей ветровой нагрузки, Па (кгс/м2), qsn = 0,75 q0 k c;
0,75 — коэффициент снижения ветровой нагрузки из-за небольшой высоты опоры;
q0 — скоростной напор ветра; принимаемый равным 539,4 Па (55 кгс/см2);
k — коэффициент, учитывающий изменение скоростного напора ветра по высоте, равный 1;
с — аэродинамический коэффициент, равный 1,4;
h — высота приложения ветровой нагрузки, м.
При указанных значениях изгибающий момент допускается определять по формуле
М = 623,01 A h, Нм (М = 63,525 A h, кгсм)
3. Для двух- и трехстоечных опор (см. схемы 8 и 9), предназначенных для установки дорожных знаков индивидуального проектирования, вычисленный общий изгибающий момент следует уменьшить соответственно в два и три раза.
4. По установленной высоте опоры и расчетному изгибающему моменту выбирается типоразмер опоры по табл. 1 настоящего стандарта.
5. Потребная длина опор и значения расчетных изгибающих моментов для основных схем установки дорожных знаков приведены в табл. 1 п. 2 настоящего приложения.
Расчетные схемы опор для установки дорожных знаков
Схема 1
![Рисунок 2](data:image/jpg;base64,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)
Схема 2
![Рисунок 3](data:image/jpg;base64,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)
Схема 3
![Рисунок 4](data:image/jpg;base64,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)
Схема 4
![Рисунок 5](data:image/jpg;base64,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)
Схема 5
![Рисунок 6](data:image/jpg;base64,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)
Схема 6
![Рисунок 7](data:image/jpg;base64,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)
Схема 7
![Рисунок 8](data:image/jpg;base64,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)
Схема 8
![Рисунок 9](data:image/jpg;base64,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)
Схема 9
![Рисунок 10](data:image/jpg;base64,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)
1 дорожный знак; 2 — опора; 3 — покрытие автомобильной дороги; 4 — обочина (присыпная берма)
Таблица 1
Расчетные показатели опоры для основных схем установки дорожных знаков
|
|
|
|
Номер схемы
|
Типоразмер знака по ГОСТ 1080778
|
Длина опоры L, мм
|
Изгибающий момент М в расчетном сечении опоры, Нм (кгсм)
|
|
I
|
3,50
4,50
|
352,6 (35,36)
440,7 (44,95)
|
1
|
II
|
4,00
4,50
|
491,7 (50,14)
611,6 (62,36)
|
|
III
|
4,00
4,50
|
851,9 (86,86)
1050,0 (107,07)
|
|
IV
|
4,50
5,00
|
1619,2 (165,11)
1971,2 (201,00)
|
|
I
|
4,00
4,50
|
723,3 (73,76)
891,6 (90,91)
|
2
|
II
|
4,00
4,50
|
1021,1 (104,13)
1250,1 (127,47)
|
|
III
|
4,50
5,00
|
1801,6 (183,70)
2180,0 (222,29)
|
|
I
|
4,00
4,50
|
705,3 (71,91)
881,5 (89,89)
|
3
|
II
|
4,00
4,50
|
983,5 (100,27)
1223,3 (124,73)
|
|
III
|
4,00
4,50
|
1703,8 (173,73)
2100,0 (214,15)
|
|
IV
|
4,50
5,00
|
3238,4 (330,22)
3942,4 (402,00)
|
|
I
|
4,00
4,50
|
1446,6 (147,51)
1783,1 (181,82)
|
4
|
II
|
4,00
4,50
|
2042,3 (208,26)
2500,2 (254,96)
|
|
III
|
4,50
5,00
|
3603,1 (367,40)
4360,0 (444,58)
|
|
I
|
4,50
5,00
|
821,6 (83,78)
997,9 (101,76),
|
|
II
|
5,00
5,50
|
1165,7 (118,86)
1405,6 (143,33)
|
5
|
III
|
5,50
6,00
|
2084,2 (212,55)
2480,4 (252,91)
|
|
IV
|
5,50
6,00
|
4125,4 (420,66)
4829,4 (492,45)
|
|
I
|
4,50
5,00
|
1137,2 (115,96)
1401,6 (142,93)
|
6
|
II
|
5,00
5,50
|
1583,0 (161,43)
1942,8 (198,10)
|
|
III
|
5,00
5,50
|
2793,4 (284,85)
3387,7 (345,46)
|
|
IV
|
5,50
6,00
|
4510,6 (459,94)
5503,6 (551,93)
|
Таблица 2
Расчетные показатели опоры для дорожных знаков индивидуального проектирования
|
|
|
|
Номер схемы
|
Размер знака ВН, м
|
Длина опоры L, мм
|
Изгибающий момент М в расчетном сечении опоры, Нм (кгсм)
|
|
1,000,34
|
3,50
4,00
|
396,1 (40,39)
502,0 (51,19)
|
|
1,500,34
|
3,50
4,00
|
594,2 (60,58)
753,3 (76,78)
|
7
|
1,000,51
|
3,50
4,00
|
622,7 (63,50)
781,6 (79,70)
|
|
1,500,51
|
4,00
4,50
|
928,0 (94,63)
1165,0 (118,79)
|
|
1,004,50
|
4,00
4,50
|
864,1 (88,11)
1075,9 (109,71)
|
|
1,500,68
|
4,00
4,50
|
1296,5 (133,11)
1614,2 (164,60)
|
|
2,000,51
|
4,00
4,50
|
654,5 (66,74)
813,3 (82,00)
|
|
2,500,51
|
4,00
4,50
|
818,2 (83,43)
1016,7 (103,31)
|
|
2,000,68
|
4,00
4,50
|
906,5 (92,43)
1118,3 (114,03)
|
8
|
2,500,68
|
4,00
4,50
|
1133,3 (115,56)
1398,0 (142,56)
|
|
3,000,68
|
4,00
4,50
|
1360,0 (138,67)
1677,7 (171,07)
|
|
3,500,68
|
4,00
4,50
|
1586,5 (161,76)
1957,2 (199,56)
|
|
4,000,68
|
4,00
4,50
|
1813,3 (184,89)
2236,9 (228,09)
|
|
4,500,68
|
4,00
4,50
|
2039,7 (207,99)
2516,3 (256,58)
|
|
2,001,02
|
4,50
5,00
|
1467,8 (149,67)
1785,6 (182,02)
|
|
2,501,02
|
4,50
5,00
|
1834,9 (l87,10)
2232,1 (227,60)
|
|
3,001,02
|
4,50
5,00
|
2202,0 (224,54)
2678,6 (273,14)
|
|
3,501,02
|
4,50
5,00
|
2568,9 (261,95)
3125,0 (318,66)
|
|
4,001,02
|
4,50
5,00
|
2935,9 (299,37)
3571,4 (364,17)
|
|
4,501,02
|
4,50
5,00
|
3301,9 (336,69)
4018,3 (409,76)
|
|
2,001,50
|
5,00
5,50
|
2383,0 (242,99)
2850,2 (290,64)
|
8
|
2,501,50
|
5,00
5,50
|
2978,7 (303,74)
3563,6 (363,37)
|
|
3,001,50
|
5,00
5,50
|
3574,5 (364,49)
4275,4 (435,96)
|
|
3,501,50
|
5,00
5,50
|
4171,0 (425,32)
4987,1 (508,53)
|
|
4,001,50
|
5,00
5,50
|
4765,9 (485,98)
5700,5 (581,27)
|
|
4,501,50
|
5,00
5,50
|
5360,9 (546,65)
6413,8 (654,01)
|
|
3,002,00
|
5,50
6,00
|
5233,2 (533,63)
6167,7 (628,92)
|
|
3,502,00
|
5,50
6,00
|
6105,4 (622,56)
7195,6 (733,74)
|
|
4,002,00
|
5,50
6,00
|
6977,6 (711,51)
8223,6 (838,56)
|
|
4,502,00
|
5,50
6,00
|
7849,8 (800,45)
9251,6 (943,38)
|
|
4,002,50
|
6,00
6,50
|
9500,7 (968,79)
11058,3 (1118,52)
|
|
4,502,50
|
6,00
6,50
|
10687,6 (1089,81)
12441,1 (1131,01)
|
|
5,001,02
|
4,50
5,00
|
2500,3 (254,96)
3029,8 (308,96)
|
|
5,501,02
|
4,50
5,00
|
3239,6 (330,34)
3924,9 (400,22)
|
|
5,001,50
|
5,00
5,50
|
4049,5 (412,93)
4828,3 (492,34)
|
|
6,501,50
|
5,00
5,50
|
5264,4 (536,81)
6277,6 (640,04)
|
9
|
5,002,00
|
5,50
6,00
|
5918,6 (603,51)
6956,8 (709,39)
|
|
6,502,00
|
6,00
6,50
|
8285,9 (844,91)
9739,6 (993,15)
|
|
5,002,50
|
6,00
6,50
|
8047,1 (820,56)
9345,0 (952,91)
|
|
6,502,50
|
6,00
6,50
|
10461,1 (1066,73)
12148,6 (1238,78)
|
|
5,003,50
|
7,00
7,50
|
13083,0 (1334,07)
14900,1 (151936)
|
|
6,503,50
|
7,00
7,50
|
17007,9 (1733,93)
19370,1 (1975,17)
|
|
6,504,50
|
8,00
8,50
|
24899,3 (2538,97)
27941,6 (2849,20)
|