For example:
unsigned int i = ~0;
Result: Max number I can assign to i
and
signed int y = ~0;
Result: 1
Why do I get 1
? Shouldn't I get the maximum number that I can assign to y
?
For example:
Result: Max number I can assign to and
Result: Why do I get 

Both This makes it easier for the CPU to do the math as it needs no special exceptions for negative numbers. For example, try adding See more at: 


Usually, but not necessarily. The expression
The initialisation
will always result in
As stated above, only if the representation of signed integers uses two's complement (which nowadays is by far the most common representation). 


Assuming 32 bit ints:



Paul's answer is absolutely right. Instead of using ~0, you can use:
And now if you check values:
you can see max values on your system. 


No, because 


You must be on a two's complement machine. 


Look up http://en.wikipedia.org/wiki/Two%27s_complement, and learn a little about Boolean algebra, and logic design. Also learning how to count in binary and addition and subtraction in binary will explain this further. The C language used this form of numbers so to find the largest number you need to use 0x7FFFFFFF. (where you use 2 FF's for each byte used and the leftmost byte is a 7.) To understand this you need to look up hexadecimal numbers and how they work. Now to explain the unsigned equivalent. In signed numbers the bottom half of numbers are negative (0 is assumed positive so negative numbers actually count 1 higher than positive numbers). Unsigned numbers are all positive. So in theory your highest number for a 32 bit int is 2^32 except that 0 is still counted as positive so it's actually 2^321, now for signed numbers half those numbers are negative. which means we divide the previous number 2^32 by 2, since 32 is an exponent we get 2^31 numbers on each side 0 being positive means the range of an signed 32 bit int is (2^31, 2^311). Now just comparing ranges: unsigned 32 bit int: (0, 2^321) signed 32 bit int: (2^31, 2^321) unsigned 16 bit int: (0, 2^161) signed 16 bit int: (2^15, 2^151) you should be able to see the pattern here. to explain the ~0 thing takes a bit more, this has to do with subtraction in binary. it's just adding 1 and flipping all the bits then adding the two numbers together. C does this for you behind the scenes and so do many processors (including the x86 and x64 lines of processors.) Because of this it's best to store negative numbers as though they are counting down, and in two's complement the added 1 is also hidden. Because 0 is assumed positive thus negative numbers can't have a value for 0, so they automatically have 1 (positive 1 after the bit flip) added to them. when decoding negative numbers we have to account for this. 


1
is the maximum number you can put into a an integer, but with maximum defined as the absoltue binary value :) – Hristo Iliev Oct 30 '12 at 21:37