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As the BitSet.get() function uses an int as an argument, I was thinking whether I could store more than 2^32 bits in a BitSet, and if so how would I retrieve them?

I am doing a Project Euler problem where I need to generate primes till 10^10. The algorithm I'm currently using to generate primes is the Erathonesus' Sieve, storing the boolean values as bits in a BitSet. Any workaround for this?

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Try to use BigInteger with 'BigInteger.nextProbablePrime`. For me it works in the way I expect. –  n1ckolas Dec 9 '13 at 16:55
    
The sieve of Eratosthenes is not intended for finding large primes. I would recommend a different approach. Wikipedia's entry recommends the pseudosquares prime sieve. –  Pace Dec 9 '13 at 18:22

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up vote 3 down vote accepted

You could use a list of bitsets as List<BitSet> and when the end of one bitset has been reached you could move to the next one.

However, I think your approach is probably incorrect. Even if you use a single bit for each number you need 10^10 bits which is about 1 GB memory (8 bits in a byte and 1024^3 bytes in a GB). Most Project Euler problems should be solvable without needing that much memory.

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I'm doing the 'Primes With Runs' problem, no. 111. I probably need a better prime generator. Thanks Anyway. –  udiboy1209 Dec 10 '13 at 17:01

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