Contenu supprimé Contenu ajouté
|
|
|
== Généralités ==
[[
[[Fichier:Index.jpg|vignette]]
]]
== ROUSSELIN--HEDIARD Elouen ==
=== Historique ===
Par conséquent, l'accéléromètre est le capteur le plus adapté et le plus utilisé pour la mesure des vibrations et des chocs.
==== Principe des capteurs sismiques ====
[[data:image/jpeg;base64,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]]==== Principe des capteurs sismiques ====
[[Fichier:Antenne sismique Toulx.JPG|right|thumb|400px| ]]
L'étude préliminaire des capteurs sismiques permet de mieux comprendre le principe de base des accéléromètres.
|
