Envoyé par WeldSquad
Bonjour,
J'imagine que la question à été posée de nombreuse fois mais je n'ai pas trouvé de réponse.
Quelle est la position de soudage d'un assemblage en T à pleine pénétration ? PB ou PC ?
Je pose la question sur ce forum car de nombreux avis autour de moi divergent. Pour ma part, je penche pour la position PC.
![](data:image/png;base64,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)
Bonjour, la réponse est dans le dessin , dans la norme ISO 6947 et dans le bon sens : PB .
En PC ou corniche , il faudrait baisser l'énergie de soudage pour éviter l'écoulement du bain de soudage.... [ il suffit de tourner l'image à 45 degré pour comprendre et laisser faire la gravité ].
Courage 😀 vous allez être confronté à des experts qui soutiendront le contraire.