Critères d’acceptation des échantillons
Publié le
05 décembre 2018
PARTAGER SUR :
Cet article doit permettre au demandeur de connaître les motifs pour lesquels un prélèvement est susceptible de ne pouvoir être traité par le laboratoire et faire l'objet d'un avis de non-conformité.
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
Hq1wjxntLFW0DRbn