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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
PymEVmOAnYxfhLhs