Activité 2

Observe la représentation graphique de la fonction [math]f[/math]

Quel est le tableau de signes qui correspond à la représentation graphique ci-dessus. [br]Tu peux t'aider en faisant varier la valeur de x en déplaçant le point bleu x sur l'axe.

[img]data:image/png;base64,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[/img] [img]data:image/png;base64,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[/img] 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[/img] 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olT1tXiljtueWvimJvMvSWycyr5fF7VanXT85Zff/21EomEhoeHNzxpv5alpSWlUimFYbipQgMArK/rpVKpVOQ4jm7evKnZ2dlNX0qcSCQ0NzenTz/9VOl0es0T8Gspl8tKp9OamJjQkydP2pp2AwC0J9Lpr50iToeyccq6Wtxyxy1vTRxzk7m3RH6fCgBg56BUAADWUCoAAGsoFQCANZQKAMAaSgUAYA2lAgCwhlIBAFhDqQAArKFUAADWUCoAAGsoFQCANZQKAMAaSgUAYA2lAgCwhlIBAFjDf9IFALCGIxUAgDWUCgDAGkoFAGANpQIAsIZSAQBYQ6kAAKyhVAAA1lAqAABrKBUAgDWUCgDAGkoFAGANpQIAsIZSAQBYQ6kAAKyhVAAA1lAqAABrKBUAgDWUCgDAGkoFAGDN/wNwkTA8TzXwfAAAAABJRU5ErkJggg==[/img]

Activité 2

Information: Activité 2