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# Rappresentazione delle Informazioni
## Differenza tra Dati ed Informazioni
Dato e informazione sono spesso utilizzati come sinonimi, ma in realtà i due termini, dal punto di vista informatico, possiedono un significato differente:
### Dato
Un **dato** è un elemento grezzi, non elaborato e privi di significato intrinseco. I dati sono rappresentazioni simboliche di fatti, numeri, caratteri o simboli. I dati possono essere testo, numeri, immagini, suoni, segnali e così via
### Informazione
Una **Informazione** è una visione della realtà derivante dall’**elaborazione** e **interpretazione** dei dati, il significato che associamo ai dati. L'informazione è ciò che emerge quando i dati vengono **organizzati, contestualizzati e interpretati**.
![][image1]
## Proprietà di un dato
Le proprietà dei dati in informatica sono fondamentali per garantire la sicurezza e la gestione adeguata delle informazioni. Le tre principali proprietà dei dati sono:
* **Riservatezza**: La riservatezza dei dati si riferisce alla **protezione** **delle** **informazioni** da accessi non autorizzati. Questo implica che solo le persone o le entità autorizzate possono accedere ai dati. Per garantire la riservatezza, vengono utilizzati metodi di autenticazione e autorizzazione per stabilire chi può accedere ai dati. L'uso di **cifratura** può anche contribuire a proteggere i dati sensibili da occhi indiscreti.
* **Integrità**: L'integrità dei dati è la garanzia che i dati non siano stati alterati o danneggiati in modo non autorizzato o accidentale durante il loro archiviazione, trasmissione o elaborazione. Per garantire l'integrità dei dati, vengono utilizzati **meccanismi di controllo**, come l'hashing che consentono di verificare se i dati sono stati modificati in modo non autorizzato.
* **Disponibilità**: La disponibilità dei dati riguarda la garanzia che i dati siano accessibili quando necessario. Ciò implica la protezione dei dati da interruzioni o danni che potrebbero impedire **l'accesso** o la **fruizione** delle informazioni. Per garantire la disponibilità, vengono utilizzate misure come la pianificazione di backup regolari, la ridondanza dei server e la protezione da eventi dannosi come attacchi informatici o guasti hardware.
Queste tre proprietà, spesso indicate come il "triangolo della sicurezza delle informazioni" o "CIA" (Confidentiality, Integrity, Availability), sono fondamentali per garantire la sicurezza e l'affidabilità dei dati in ambienti informatici. Le organizzazioni adottano strategie e politiche di sicurezza per bilanciare queste proprietà in base alle esigenze specifiche delle loro operazioni e per proteggere le informazioni sensibili da potenziali minacce.
## Differenza tra Dato e Rappresentazione
Un concetto fondamentale da comprendere nell'informatica è la **differenza tra un dato e la sua rappresentazione**. Un dato può essere visto come un valore astratto che può essere espresso in più modi. La **rappresentazione** di un dato è la forma o il formato in cui questo valore viene visualizzato, trasmesso o memorizzato. Ogni dato può avere più rappresentazioni, e la scelta della rappresentazione dipende dal contesto e dall'obiettivo.
Esempio: Consideriamo il numero **4**. Questo è un dato, un valore oggettivo e astratto. Esso può essere rappresentato in diversi modi, come mostrato nella tabella seguente:
| Dato | Rappresentazione |
| ----- | ----- |
| 4 | Numero arabo |
| quattro | Forma scritta in italiano |
| four | Forma scritta in inglese |
| IV | Numero romano |
| ![][image2] | Numero con le mani |
In questo caso, il dato rimane lo stesso (il concetto di "quattro"), ma è espresso in diverse rappresentazioni. Il valore numerico è identico, ma la forma in cui viene visualizzato cambia a seconda della lingua o del sistema di numerazione utilizzato.
Questa distinzione è fondamentale anche nel mondo digitale, dove i dati possono essere memorizzati, trasmessi e elaborati in vari formati. Ad esempio, i numeri possono essere memorizzati in binario, decimale, esadecimale o rappresentati in forma testuale.
## Rappresentazione nei Sistemi Digitali
Nei sistemi informatici, i dati devono essere convertiti in una forma che il computer possa comprendere e processare. In questo contesto, parliamo di **rappresentazione digitale dei dati**. Ogni valore che memorizziamo in un computer è rappresentato attraverso sequenze di bit (0 e 1). Questo formato è noto come **rappresentazione binaria**. Tuttavia, come vedremo più avanti, lo stesso valore può essere rappresentato anche in altre basi numeriche (ottale, decimale, esadecimale), a seconda dell'uso e del contesto.
Ecco alcuni esempi di dati e le loro rappresentazioni digitali:
| Dato | Rappresentazione Binaria | Rappresentazione Esadecimale | Rappresentazione Decimale |
| ----- | ----- | ----- | ----- |
| Lettera "A" | 01000001 | 41 | 65 |
| Numero 10 | 00001010 | 0A | 10 |
| Simbolo "$" | 00100100 | 24 | 36 |
In questi esempi, possiamo vedere come lo **stesso dato** (ad esempio, la lettera "A") abbia **diverse rappresentazioni**:
* **Binario**: La rappresentazione effettiva in cui il computer memorizza il dato.
* **Esadecimale**: Una rappresentazione compatta e conveniente per visualizzare grandi quantità di dati binari.
* **Decimale**: Il formato numerico più familiare all'uomo.
### Rappresentazione e Interpretazione
Quando parliamo di dati e della loro rappresentazione, è essenziale tenere a mente che un computer può interpretare lo **stesso insieme di bit** in modi diversi a seconda del contesto. Prendiamo come esempio la sequenza di bit **01000001**:
* Se interpretata come un numero in decimale, rappresenta il valore **65**.
* Se interpretata come un carattere nella tabella **ASCII**, rappresenta la lettera **A**.
* Se parte di un'immagine, potrebbe rappresentare un pixel con un determinato colore o una componente di un'immagine in formato binario.
## Come rappresentare un numero decimale in binario
Il **sistema decimale** (base 10\) è il sistema di numerazione che utilizziamo comunemente e che si basa su 10 cifre (0-9). Il **sistema binario** (base 2), invece, utilizza solo due cifre, **0** e **1**, ed è il sistema usato dai computer per memorizzare e gestire i dati.
La conversione da decimale a binario si basa sulla divisione successiva del numero decimale per 2, registrando il resto ad ogni divisione. I resti ottenuti, letti dal basso verso l'alto, formano il numero binario corrispondente.
#### Metodo Passo-Passo per la Conversione da Decimale a Binario
1. **Dividi il numero decimale per 2**.
2. **Annota il resto** (sarà 0 o 1).
3. **Continua a dividere il quoziente** per 2, fino a quando il quoziente diventa 0\.
4. Il numero binario è dato dalla sequenza dei resti **letti dal basso verso l'alto**.
#### Esempio di Conversione (da Decimale a Binario):
Convertiamo il numero **27** in binario.
* 27 ÷ 2 \= 13, **resto 1**
* 13 ÷ 2 \= 6, **resto 1**
* 6 ÷ 2 \= 3, **resto 0**
* 3 ÷ 2 \= 1, **resto 1**
* 1 ÷ 2 \= 0, **resto 1**
Ora, leggiamo i resti dal basso verso l'alto: **11011**.
Quindi, il numero **27** in decimale è rappresentato come **11011** in binario.
#### Esempio con un altro numero:
Convertiamo il numero **45** in binario.
* 45 ÷ 2 \= 22, **resto 1**
* 22 ÷ 2 \= 11, **resto 0**
* 11 ÷ 2 \= 5, **resto 1**
* 5 ÷ 2 \= 2, **resto 1**
* 2 ÷ 2 \= 1, **resto 0**
* 1 ÷ 2 \= 0, **resto 1**
Leggiamo i resti dal basso verso l'alto: **101101**.
Quindi, il numero **45** in decimale è rappresentato come **101101** in binario.
## Come rappresentare un numero binario in decimale
La conversione da binario a decimale si basa sul concetto di **peso delle cifre** in un numero binario. Ogni cifra di un numero binario rappresenta una potenza di 2, partendo da destra (posizione 0\) verso sinistra.
#### Metodo Passo-Passo per la Conversione da Binario a Decimale
1. Prendi ogni cifra binaria e moltiplicala per **2 elevato alla posizione** della cifra (partendo da destra con posizione 0).
2. Somma i risultati delle moltiplicazioni per ottenere il numero decimale equivalente.
#### Esempio di Conversione (da Binario a Decimale):
Convertiamo il numero binario **11001** in decimale.
| Cifra binaria | Posizione | Valore della posizione (2^posizione) | Risultato della moltiplicazione |
| ----- | ----- | ----- | ----- |
| 1 | 4 | 2^4 \= 16 | 1 × 16 \= 16 |
| 1 | 3 | 2^3 \= 8 | 1 × 8 \= 8 |
| 0 | 2 | 2^2 \= 4 | 0 × 4 \= 0 |
| 0 | 1 | 2^1 \= 2 | 0 × 2 \= 2 |
| 1 | 0 | 2^0 \= 1 | 1 × 1 \= 1 |
Ora sommiamo i risultati: **16 \+ 8 \+ 0 \+ 0 \+ 1 \= 25**.
Quindi, il numero binario **11001** è uguale a **25** in decimale.
## Altri sistemi di rappresentazione dei numeri
Ora che abbiamo esplorato le conversioni tra il **sistema decimale** e il **sistema binario**, possiamo affrontare brevemente come lavorare con gli altri sistemi di rappresentazione numerica comunemente utilizzati nell'informatica: il **sistema ottale** (base 8\) e il **sistema esadecimale** (base 16). Questi sistemi sono utili perché offrono un modo più compatto per rappresentare numeri binari e sono ampiamente utilizzati nella programmazione e nell'architettura dei computer.
### Sistema Ottale (Base 8\)
Il sistema ottale utilizza otto cifre: da **0** a **7**. È particolarmente utile perché ogni cifra ottale corrisponde a un gruppo di **tre bit** in binario, semplificando la lettura e la conversione di numeri binari di grandi dimensioni.
#### Conversione da Decimale a Ottale
La conversione da decimale a ottale segue un processo simile a quello della conversione in binario, ma qui dividiamo il numero per 8\.
##### Metodo Passo-Passo:
* **Dividi il numero decimale per 8**.
* **Annota il resto**.
* Continua a dividere il quoziente per 8 fino a quando il quoziente diventa 0\.
* Il numero ottale è ottenuto leggendo i resti dal basso verso l'alto.
##### Esempio
Convertiamo **156** in ottale.
* 156 ÷ 8 \= 19, **resto 4**
* 19 ÷ 8 \= 2, **resto 3**
* 2 ÷ 8 \= 0, **resto 2**
Il numero **156** in decimale è **234** in ottale.
#### Conversione da Binario a Ottale:
1. Raggruppa il numero binario in gruppi di **tre bit** a partire da destra.
2. Se il gruppo finale ha meno di tre bit, aggiungi zeri a sinistra per completare il gruppo.
3. Converti ogni gruppo di tre bit nel corrispondente numero ottale.
##### Esempio
Convertiamo il numero binario **10111001** in ottale.
* Dividiamo in gruppi di tre bit: **10 111 001** (aggiungiamo uno 0 a sinistra per completare il gruppo).
* **010** \= 2, **111** \= 7, **001** \= 1\.
Quindi, **10111001** in binario è **271** in ottale.
#### Conversione da Ottale a Binario:
1. Converti ogni cifra ottale nel corrispondente gruppo di tre bit.
2. Unisci tutti i gruppi di bit per ottenere il numero binario.
##### Esempio
Convertiamo il numero ottale **562** in binario.
* **5** \= **101**, **6** \= **110**, **2** \= **010**.
Quindi, **562** in ottale è **101110010** in binario.
### Sistema Esadecimale (Base 16\)
Il sistema esadecimale utilizza **sedici simboli**, ossia le cifre da **0** a **9** e le lettere da **A** a **F**, dove:
* **A** rappresenta 10,
* **B** rappresenta 11,
* **C** rappresenta 12,
* **D** rappresenta 13,
* **E** rappresenta 14,
* **F** rappresenta 15\.
Questo sistema è molto utile nell'informatica perché ogni cifra esadecimale corrisponde a un gruppo di **quattro bit** in binario, semplificando la lettura di lunghe stringhe binarie, come quelle utilizzate nella codifica di colori o indirizzi di memoria.
#### Conversione da Binario a Esadecimale:
1. Raggruppa il numero binario in gruppi di **quattro bit**, partendo da destra.
2. Se il gruppo finale ha meno di quattro bit, aggiungi zeri a sinistra per completarlo.
3. Converti ciascun gruppo nel corrispondente simbolo esadecimale.
##### Esempio
Convertiamo il numero binario **1010111101** in esadecimale.
* Dividiamo in gruppi di quattro bit: **0010** **1011** **1101**.
* **0010** \= 2, **1011** \= B, **1101** \= D.
Quindi, **1010111101** in binario è **2BD** in esadecimale.
#### Conversione da Esadecimale a Binario:
1. Converti ogni cifra esadecimale nel corrispondente gruppo di quattro bit.
2. Unisci i gruppi per ottenere il numero binario.
##### Esempio
Convertiamo il numero esadecimale **3A7** in binario.
* **3** \= **0011**, **A** \= **1010**, **7** \= **0111**.
Quindi, **3A7** in esadecimale è **001110100111** in binario.
[image1]: 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>
[image2]: <data:image/png;base64,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>