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Is this a 'real' task, that can be written on any language ( C/C++, for example )

So, my task is 'generate' random number with length over 50 digits ( maximum = 200 )?

Then, i must check this number on primality test.

So, is this task 'real' and how many time/resources it will consume?

alternative way is to generate prime Mersenn numbers or other numbers from special class ( which class could be used? )

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closed as not a real question by CyberSpock, PlasmaHH, larsmans, Mankarse, Christian Rau Feb 9 '12 at 11:46

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center. If this question can be reworded to fit the rules in the help center, please edit the question.

2  
what do you mean by "real"? Are you asking us if this is homework? you should know... –  PlasmaHH Feb 9 '12 at 11:31
    
Proving a number is prime is incredibly difficult (well, trivial but very very slow). GMP (The GNU Multiple Precision Arithmetic Library) has a probable prime function which can run tests (you can tell it how many iirc) to tell you if a number is "probably" prime. gmplib.org/manual/… It's a little fiddly to use because it was really meant to be C, but you can use it reasonably well from c++. –  BoBTFish Feb 9 '12 at 11:35
    
'real' - task, which need only one computer and time-consuming is not an hour. personal usage, yes. –  gaussblurinc Feb 9 '12 at 12:02
    
@BoBTFish: This is not true. Deciding whether given number is prime can be done in polynomial time, (the algorithm)[primes.utm.edu/prove/prove4_3.html] was presented in 2002 by Agrawal, Kayal and Saxena. In practice, we use probabilistic Rabin/Miller which is also fine since it is also polynomial provided ERH is true (what most mathematicians believe). –  Krystian Feb 9 '12 at 12:33
    
@Krystian: where did he say it is not possible to do in polynomial time? AKS is still difficult and slow for ~200 digit numbers. –  PlasmaHH Feb 9 '12 at 12:39

2 Answers 2

up vote 2 down vote accepted

There are efficient probabilistic algorithms for primality testing like Miller-Rabin that are usually used for such purposes.

Picking a random number and testing for primality using a randomized algorithm is efficient since the density of primes guarantees you that for n-bit numbers you need to pick around n numbers to test.

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Use the Miller-Rabin primality test. Also, you'll need a library for big decimals, as numbers of 50 digits do not fit in a native datatype.

Here is a Javascript implementation of Miller-Rabin, which does 50 iterations of Miller-Rabin. It completes in a couple of seconds.

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