# Why is the max value for a 32 bit int 2^32 - 1 and not 2^32

The maximum value for any integer is 2^32-1. why do we have to minus the 1? Why isn't the maximum value 2^32?

-
In what context ? –  Arihant Nahata Apr 24 '11 at 15:52

The `-1` is because integers start at 0, but our counting starts at 1.

So, `2^32-1` is the maximum value for a 32-bit unsigned integer (32 binary digits). `2^32` is the number of possible values.

To simplify why, look at decimal. `10^2-1` is the maximum value of a 2-digit decimal number (99). Because our intuitive human counting starts at 1, but integers are 0-based, `10^2` is the number of values (100).

-
And what if I have 64 bit machine and OS and Java ?? Does it increases to 2 ^ 64 - 1 ?? –  Hardik Thaker Sep 28 '13 at 19:24
It doesn't matter what the platform is. The maximum value you can store in an N-bit unsigned integer that's 0-based is always `2^N-1`. –  tenfour Sep 28 '13 at 23:45
thanks for this information :D –  Hardik Thaker Sep 29 '13 at 11:02
@tenfour and so for a signed integer it would be 2^N-2. Would I be correct to say that? –  alumns Jan 5 at 19:03
The max value of a signed integer depends on how the integer is stored. A lot of times it's 2^(n-1)-1 on the positive side and -2^(n-1) on the negative side, but you should consult your documentation for your language/system. –  Hexxagonal Mar 3 at 23:39

232 in binary is one followed by 32 zeroes, for a total of 33 bits. That doesn't fit in a 32-bit int value.

-
And what if I have 64 bit machine and OS and Java ?? Does it increases to 2 ^ 64 - 1 ?? –  Hardik Thaker Sep 28 '13 at 19:23
@HardikThaker - Yes, it does. (Actually, in Java, `Integer.MAX_VALUE`--for 32 bit integers--is 2^31 - 1 and `Long.MAX_VALUE`--for 64 bit integers--is 2^63 - 1 because the sign bit is reserved.) –  Ted Hopp Sep 29 '13 at 0:03
Ohh thanks a lot for this information. :) –  Hardik Thaker Sep 29 '13 at 11:01
@Ted Hopp What sign bit? There is no such thig as a sign bit. –  Ingo Nov 5 '13 at 8:20
@Ingo - "There is no such thig as a sign bit" Huh? In most languages I know there is indeed a sign bit. Java (which is what I was talking about specifically in the comment) uses a signed, two's-complement representation for most integer types (`char` excluded). Refer to the Wikipedia article on Two's complement and you can read all about the sign bit. Also refer to the Wikipedia article on Sign bit. –  Ted Hopp Nov 5 '13 at 12:58
show 9 more comments

`2^32` in binary:

``````1 00000000 00000000 00000000 00000000
``````

`2^32 - 1` in binary:

``````11111111 11111111 11111111 11111111
``````

As you can see, `2^32` takes `33` bits, whereas `2^32 - 1` is the maximum value of a `32` bit integer.

The reason for the seemingly "off-by-one" error here is that the lowest bit represents a one, not a two. So the first bit is actually `2^0`, the second bit is `2^1`, etc...

-
And what if I have 64 bit machine and OS and Java ?? Does it increases to 2 ^ 64 - 1 ?? –  Hardik Thaker Sep 28 '13 at 19:25

'Cos in most programming languages, '0' is a value too.

-
And mathematics too :-) –  Stephen C Apr 24 '11 at 15:53
Depends if you're talking whole or natural numbers ;) –  Russell Troywest Apr 24 '11 at 15:55
@Russel Well even for natural numbers 0 is often included, so not even Mathematicians ever agreed on that (but really it's just one of the more useful numbers out there - if at all we should get rid of 27 or whatever :p ) –  Voo Apr 24 '11 at 15:59
@RussellTroywest Peano and Frege told us what natural numbers are, and of course they started from 0. Despite this, in some contexts it is understodd that the set N \ {0} is used and referred to as "natural numbers". –  Ingo Nov 5 '13 at 8:24

The numbers from 0 to N are not N. They are N+1. This is not obvious to the majority of people and as a result many programs have bugs because if this reason.

-
And bugs too, even. –  Thorbjørn Ravn Andersen Apr 24 '11 at 16:11

If you're just starting out with programming, I suggest you take a look at this wiki article on signed number representations

As Vicente has stated, the reason you subtract 1 is because `0` is also an included number. As a simple example, with 3 bits, you can represent the following non-negative integers

``````0 : 000
1 : 001
2 : 010
3 : 011
4 : 100
5 : 101
6 : 110
7 : 111
``````

Anything beyond that requires more than 3 digits. Hence, the max number you can represent is 2^3-1=7. Thus, you can extend this to any `n` and say that you can express integers in the range `[0,2^n -1]`. Now you can go read that article and understand the different forms, and representing negative integers, etc.

-

In what context?

Usually, it's because said index starts from `0`, inclusive.

So if you have, for example, `2^32` memory addresses, they will be in the range `[0, 2^32-1]`.

-

In the field of computing we start counting from 0.

-

In most programming languages integer is a signed value (see two's complement).

For example, in Java and .NET integer most left byte is reserved for sign:

• `0` => positive or zero number
• `1` => negative number

Then the maximum value for `32-bit` number is limited by `2^31`. And adding `-1` we get `2^31 - 1`.

Why does `-1` appear?

Look at more simple example with unsigned Byte (8-bits):

``````  1  1  1  1  1  1  1  1
128 64 32 16  8  4  2  1  <-- the most right bit cannot represent 2
--- --------------------
128 + 127 = 255
``````

As other guys pointed out the most right bit can have a maximum value of `1`, not `2`, because of `0/1` values.

``````Int32.MaxValue = 2147483647 (.NET)
``````
-