![Skupna risba 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)
Skupna risba stopnicah
![Splošni pogled na](data:image/png;base64,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Splošni pogled na
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fazi](data:image/png;base64,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)
Risanje fazi
Priporočila
Odstopanje od formule za 16.7%
Priporočamo, da zmanjša število korakov za več kot 2Pomanjkanje globine stopnice: 230 mm
Priporočamo večjo Ispružanje F o 50 mmPriporočljiv naklon stopnišča 36.9°
Lestev Neprijetna
Osnovni podatki
Lift 1500 mm
Dolžina lestve v smislu 2000 mm
Skupno število stopnic 10
Debelina pohodne ploskve 50 mm
Dolžina nosu 30 mm
Dolžina podesta 500 mm
Debelina podesta 100 mm
Debelina rame 50 mm
Debelina pohodne ploskve 60 mm
Nosilec
Dolžina strožjih 2500 mm
Skupni naklon stopnišča 36.9°
Velikost koraka
Višina stopnice 150 mm
Globina stopnic 230 mm
Prostornina betona
Obseg strani 0.04 kubičnih metrov
Obseg eni fazi 0.012 kubičnih metrov
Obseg vseh ravneh 0.12 kubičnih metrov
Znesek dodatne debeline 0.1 kubičnih metrov
Armatura
Število ventili 30 kosov
Število ventili 24 m
Teža palice 9.47 kg
Skupna prostornina betona 0.26 kubičnih metrov
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