Mit kell tudni arról amikor egy konnektorban 2 fázis, 2 földelés, és 2 nulla található? Ez a 6 vezeték párosával be is van kötve. Szabályos ez így? Tudomásom szerint 3 vezetéknek kéne csak lennie.
válasza:
válasza: válasza:Valoszinű ugy mint a képen több konnektor van bekötve.
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