Osserva la tabella qui sotto. Stabilisci se rappresenta una funzione di proporzionalità diretta / inversa, di una funzione lineare oppure nessuna delle precedenti. Motiva la tua risposta scrivendo l'espressione analitica della funzione.

Osserva la tabella qui sotto. Stabilisci se rappresenta una funzione di proporzionalità diretta / inversa, di una funzione lineare oppure nessuna delle precedenti. Motiva la tua risposta scrivendo l'espressione analitica della funzione.

Osserva la tabella qui sotto. Stabilisci se rappresenta una funzione di proporzionalità diretta / inversa, di una funzione lineare oppure nessuna delle precedenti. Motiva la tua risposta scrivendo l'espressione analitica della funzione.

Osserva la tabella qui sotto. Stabilisci se rappresenta una funzione di proporzionalità diretta / inversa, di una funzione lineare oppure nessuna delle precedenti. Motiva la tua risposta scrivendo l'espressione analitica della funzione.

Quali dei seguenti grafici non rappresenta una funzione?[br][img]data:image/png;base64,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[/img]

Motiva la precedente scelta.

Indica il dominio della funzione rappresentata nel grafico sotto.

Indica l'insieme immagine della funzione rappresentata nel grafico sotto.