How does the system perform the 2^56 modulo 7, if it's 32 bits operating system in cryptography for example?
And how it stored in memory?
How does the system perform the 2^56 modulo 7, if it's 32 bits operating system in cryptography for example? And how it stored in memory? 

On arbitraryprecision arithmeticA 32bit operating system does not limit you from having custom types that exceed that size. Your application can take two 32bit words and treat it like one 64bit number. Most programming languages even have a "doubleword" integral type to simplify matters. You can further extend the concept to create an arbitrary precision integral data type that is only bound by the amount of limited memory. Essentially you have an array of words, and you store your Nbit numbers in the bits of the words of this array. The fact that it's a 32bit operating system does not by itself limit the numeric computation that you can do. A Java See alsoOn mathematics on the ring of integersFinding modular multiplicative inverse or modular exponentiation is a common mathematical/algorithmic task in the fields of cryptography. One identity that you may want to use here is the following:
To find x = 2^{56} (mod 7), you do NOT have to first compute and store 2^{56}. If you have y = 2^{55} (mod 7)  a number between 0..6  you can find x = y * 2 (mod 7). But how do you find y = 2^{55} (mod 7)? Well, one naive way is to apply the process linearly and first try to find z = 2^{54} (mod 7) and so on. This is a linear exponentiation, but you can do better by performing e.g. exponentiation by squaring. That is, if you have say 2^{8}, you can square it to immmediately get 2^{16}. You can then square that to immediately get 2^{32}. SummaryThere are many sophisticated mathematical algorithms applicable to cryptography, and whether or not it's implemented in a program running on a 32bit or a 64bit operating system is not directly relevant. As long as enough memory is available, the computer is more than capable of performing arbitraryprecision arithmetic. Precisely because arbitraryprecision arithmetic is a useful abstraction, many highperformance libraries are available, so that you can build your application on top of a preexisting framework instead of having to build from the ground up. Some highlevel languages even have arbitraryprecision arithmetic builtin. Python, for example, provides arbitrary precision 


You'll note that we never dealt with any large numbers (indeed the largest was 56). Furthermore:
And thus also 


too add to other answers which do a good explanation of a 32 int and modular multiplicative inverse and what not I'll explain what a the 32 bit CPU is
as a side note this has previously happened when CPU's were 16bit 


I think your terminology is a bit confused. A 32 bit operating system or 32bit architecture is one in which machine addresses are limited to 32 bits. It is not at all unusual for a 32 bit architecture to have arithmetic instructions that operate on 64 bit integers and / or 64 bit floating point numbers. So, it is quite likely that a machine with a 32 bit architecture (and running a 32 bit operating system) would use 64 bit arithmetic and store the result in memory as a 64 bit 


Generally, if you know your numbers are going to get very big, you'll use a library like GMP (Gnu MultiPrecision) to handle the math. It does what you'd do on paper if you had 2^32 fingers on you hands. 


One uses that (a * b) mod c = ((a mod c) * (b mod c)) mod c. That means that you can basically do


Modular exponentiation algorithms are used for this kind of operation. This Wikipedia article tells how it is done: http://en.wikipedia.org/wiki/Modular_exponentiation 


Which system? Which architecture? Generally speaking on a 32bit architecture, you are getting overflow results. Some languages have builtin, arbitrarily big, numeral types which can handle these calculations. Examples of this are 


2^56/7
do you mean "two raised to 56th power, divided by 7", or "two raised to 56th power, modulo 7"? You may want to check up on the notational convention if you want to work further in this field. – polygenelubricants Aug 22 '10 at 15:12