Aanbevelingen
Voldoet aan formule comfortabele trap
Voldoende diepte van stap
Comfortabele trap hoek 39.8°
Comfortabele trap
![Zijaanzicht](data:image/png;base64,)
Zijaanzicht
![Vooraanzicht](data:image/png;base64,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)
Vooraanzicht
![Stappenschema](data:image/png;base64,)
Stappenschema
![bovenaanzicht](data:image/png;base64,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)
bovenaanzicht
![Tekening 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)
Tekening trapboom
![Tekening van de treden](data:image/png;base64,)
Tekening van de treden
Eerste gegevens
De hoogte van de trap 2500 mm
De lengte van het traphuis op de grond 3000 mm
Aantal treden 13
Dikte van de treden 50 mm
Trapneus 50 mm
trapbomen
lengte kosoura 3873 mm
De traphoek is 39.8°
Stapgrootte
Optrede 192 mm
Aantrede 281 mm
De hoogte van de stijgers 142 mm
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