Eigenschappen:
- 80 mm diepe treden met ZARGES Safer Step Technology voor staan zonder vermoeidheid.
- Bijzonder groot werkplatform met aluminium ribbelplaat-laag (ca. 380 mm x 390 mm).
- Praktisch aluminium gereedschap bakje voor kleine delen en gereedschap.
- Standaard met twee leuningen voor veilig omhoog- en omlaag klimmen.
- Optimale stabiliteit door twee stabiele perlonbanden als spreidbeveiliging.
- Treden en bomen uit geëxtrudeerde aluminium profielen.
- Optimale stabiliteit door twee stabiele perlonbanden als spreidbeveiliging.
Opmerking
- Verrijdbare uitvoering vanaf 5 treden mogelijk.
![saferstep](data:image/png;base64,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)
![2_hands_free](data:image/png;base64,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 & 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)
Ladderlengte m Platformhoogte m Werkhoogte m Breedte Treden Gewicht
1,75 0,78 2,80 0,60 3 8 kg
2,04 1,06 3,10 0,62 4 10 kg
2,32 1,32 3,35 0,65 5 11 kg
2,60 1,58 3,60 0,68 6 13 kg
3,16 2,07 4,10 0,74 8 15 kg
3,72 2,59 4,60 0,80 10 20 kg
4,28 3,11 5,10 0,86 12 22 kg