Can unsigned long int
hold a ten digits number (1,000,000,000  9,999,999,999) on a 32bit computer.
What are the ranges of unsigned long int
, long int
, unsigned int
, short int
, short unsigned int
and int
?

The minimum ranges you can rely on are:
This means that no,
So that type will be big enough (again, if you have it available). A note for those who believe I've made a mistake with these lower bounds  I haven't. The C requirements for the ranges are written to allow for ones' complement or signmagnitude integer representations, where the lowest representable value and the highest representable value differ only in sign. It is also allowed to have a two's complement representation where the value with sign bit 1 and all value bits 0 is a trap representation rather than a legal value. In other words, 


You should look at the specialisations of the numeric_limits<> template for a given type. Its in the header. 


Have a look at this reference: http://www.cppreference.com/wiki/data%5Ftypes 


The size of the numerical types is not defined in the C++ standard, although the minimum sizes are. The way to tell what size they are on your platform is to use numeric limits For example, the maximum value for a int can be found by:
Computers don't work in base 10, which means that the maximum vale will be in the form of 2^{n}1 because of how the numbers of represent in memory. Take for example two bits (8 bytes)
The right most bit (number) when set to 1 represents 2^{0}, the next bit 2^{1}, then 2^{2} and so on until we get to the left most bit which if the number is unsigned represents 2^{7}. So the number represents 2^{6} + 2^{3} = 64 + 8 = 72, because the 4th bit from the right and the 7th bit right the left are set. If we set all values to 1:
The number is now (assuming unsigned) On my machine and int and a long are the same, each able to hold between 2^{31} to 2^{31}  1. In my experience the most common size on modern 32 bit desktop machine. 


You might want to look at a table of data types, like so: http://msdn.microsoft.com/enus/library/s3f49ktz%28VS.80%29.aspx 


No 


No, only part of ten digits number can be stored in a unsigned long int whose valid range is 0 to 4,294,967,295 . you can refer to this: http://msdn.microsoft.com/enus/library/s3f49ktz%28VS.80%29.aspx 


Other folks here will post links to data_sizes and precisions etc.
this will (depending on compiler and archicture) print 2, 4 or 8, saying 2 bytes long, 4 bytes long etc. Lets assume it's 4. You now want the maximum value 4 bytes can store, the max value for one byte is (in hex)0xFF. The max value of four bytes is 0x followed by 8 f's (one pair of f's for each byte, the 0x tells the compiler that the following string is a hex number). Now change your program to assign that value and print the result
Thats the max value an unsigned int can hold, shown in base 10 representation. Now do that for long's, shorts and any other INTEGER value you're curious about. NB: This approach will not work for floating point numbers (i.e. double or float). Hope this helps 


For unsigned data type there is no sign bit and all bits are for data ; whereas for signed data type MSB is indicated sign bit and remaining bits are for data. To find the range do following things : Step:1 > Find out no of bytes for the give data type. Step:2 > Apply following calculations.
For e.g. For unsigned int size = 4 bytes (32 bits) > Range [0 , (2^(32))  1] For signed int size = 4 bytes (32 bits) > Range [(2^(321)) , (2^(321))  1] 


To find out the limits on your system:
Note that 

