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[/img]

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[/img][br][br]Cosa ha venduto? Spiega il tuo ragionamento.

Come possiamo interpretare il valore -58 in questa situazione?

Come possiamo interpretare il valore -10.35 in questa situazione?

Per quale cibo o oggetto ha speso di più? Spiega il tuo ragionamento.

La macchina registra tutte le modifiche del numero delle lattine, cioè conta le vendite e i rifornimenti. Ecco il registro relativo a un intervallo di un ora, suddiviso in blocchi da 5 minuti ciascuno.[br][br] 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[/img][br][br]Che significato ha un numero positivo in questo contesto?

Che significato ha un numero negativo in questo contesto?

Cosa potrebbe significare uno “0” nella seconda colonna, in questo contesto?

Quali numeri —positivi o negativi— indicano che ci sono meno lattine nel distributore?

A che ora si è verificata la variazione maggiore del numero delle lattine nel distributore? 

Questa variazione che effetto ha avuto sul numero delle lattine rimanenti nel distributore?

In quale intervallo di tempo, 8:05–8:09 oppure 8:25–8:29, si è verificata la variazione maggiore del numero di bottiglie nel distributore? Spiega il tuo ragionamento.

Per poter fare una corretta manutenzione, il distributore deve essere periodicamente svuotato. Se ci sono 40 lattine nel distributore ed è necessario fare una manutenzione, che numero verrà indicato nella seconda colonna della tabella?

[size=150][size=100]Teo, Mattia e Chiara vanno in paninoteca un sabato sera. Il conto totale è di €25. Ogni studente dà al cameriere una banconota da €10, e il cameriere prende i €30 e torna con il resto di cinque monete da €1. Ogni studente si prende €1, e lasciano i €2 rimanenti come mancia per il cameriere.[br][br]Mentre se ne vanno via, Chiara pensa: “Aspetta—questa cosa non ha senso. Io ho pagato €10 e ne ho avuto €1 indietro, quindi in fin dei conti ho pagato €9. E lo stesso Teo e Mattia. Quindi tutti e tre assieme abbiamo pagato €27. Poi abbiamo lasciato una mancia di €2. E quindi siamo a un totale di €29. Ma noi abbiamo dato al cameriere €30. Dove è andato a finire l'ultimo Euro?”[/size][/size][br][br][size=100]Ragiona sulla situazione e sulla domanda che si è posta Chiara. Sei d'accordo sul fatto che i conti non tornano? Spiega il tuo ragionamento.[/size]