Ci-dessous, les différences entre deux révisions de la page.
Les deux révisions précédentes Révision précédente | |
3eme:revisions_confinement_4eme [2020/09/17 20:36] – physix | 3eme:revisions_confinement_4eme [2020/09/17 20:37] (Version actuelle) – physix |
---|
3. Trouver la relation qui relie U et I. U = ….. x I | 3. Trouver la relation qui relie U et I. U = ….. x I |
| |
{{data:image/png;base64,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 |