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What is the "only practical method"? I thought the GNFS was currently the fastest algorithm for factoring large integers with no special form.
hey, on a side note, think of how famous the ti-community would be if we factored ANY 2048 bit key, not specifically the nspire's. so, ponder this: if you multiply two 2048 bit keys together, and try to factor that, you now have to locate one of 4 possible prime numbers in a field that is no larger than if you were factoring a single key alone. you've just doubled your chances, which halves the amount of time it takes to do it! with 4 keys together, you could factor one of them in 1/4 the time!!!! actually, its a little longer than that because you're working with a bigger number, but still!!!! ok, so we won't be able to factor the specific key we want, necessarily, but we'll still be famous for being the first people to factor a 2048 bit RSA key!!!
I think you were thinking add, or multiply by two.