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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?

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

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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
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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
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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.

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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
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@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
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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...

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

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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
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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.

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

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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].

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In the field of computing we start counting from 0.

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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)
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