It seems like the question was asked to make you ask them:

- What is the largest value that you want the
`integer`

type to encode?

Let's assume they said we want `MAX_VALUE`

to be the maximum value an integer type can have.

This brings us to the equation. Since we are encoding it using bits we need `log_2(MAX_VALUE)`

bits to encode any positive value of size up to `MAX_VALUE`

. The logarithm of base 2 is there because with a bit pattern of size `n`

you can encode up to `2^n`

different values. So if you want to know how long your maximum bit pattern needs to be to encode `MAX_VALUE`

you need to calculate the `log`

since:

```
2^(log_2(MAX_VALUE)) = MAX_VALUE
```

Now this is okay, unless you also want to encode the number 0. If you want to encode 0 as well then there are MAX_VALUE+1 numbers between 0 and MAX_VALUE so you need `log_2(MAX_VALUE+1)`

bits to encode them all.

Another important question is what is the `MIN_VALUE`

that we want to encode?

So in total you have `MAX_VALUE + 1 + abs(MIN_VALUE)`

different values, so you will need :

```
bits_needed = log_2(MAX_VALUE + 1 + abs(MIN_VALUE))
```

As others have mentioned, in java `int`

has `max_value = 2,147,483,647`

and `min_value = -2,147,483,648`

. When you do the calculation you get `log_2(4294967296)`

which is equal to 32. So 32 bits is the size of the integer type in java.

`log_2(MAX_VALUE)`

) for unisgned int – gbtimmon Nov 5 '12 at 18:44