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Ive done some research online and it seems to suggest the recommended key length for RSA encryption is 1024-bits. However i have a question as to how long would it take to factor a 128-bit RSA key length with an average computer used today? Is it possible and how long would it take?

Would much appreciate any help you could give me on this question!

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@MikeChristensen he's talking about RSA keys, so of course it's asymmetric –  Peter Elliott Apr 18 '13 at 16:20
    
Breaking a 512 bit RSA key costs around 100$. 128 is much cheaper. –  CodesInChaos Apr 18 '13 at 16:38
    
did you manage to get an answer for this @ScottD? –  obsessiveCookie Mar 17 at 14:17

2 Answers 2

a implementation of a integer factorization algorithm like elliptic curve method (like GMP-CGM) will take a couple of seconds tops to compute the factors of a 128-bit RSA key on commodity hardware.

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according to some of my classes its on the order of O(e^lognlogn) or like O(e^100). I'm not really sure how long that would take, but it would take a super long time using one computer. You can do other things to make RSA more secure like adding salts and things.

Edit this is from my security class:

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Breaking a 128 bit RSA key is pretty cheap. –  CodesInChaos Apr 18 '13 at 16:51
    
the security of RSA does not rely on the factoring problem ... if you have another way of calculation eulers phi function (get the count of invertable numbers mod N), your are golden ... if you have Phi(N), you have broken RSA without factoring ... currently phi(n)=(p-1)*(q-1) is only solvable if you know p and q (by factoring n) but nobody knows if that's the only way to calculate phi ... RSA can be broken by either solving the factorizing problem or finding another solution for phi(n) both problems are only estaminated to be hard ... not proven ... –  DarkSquirrel42 Apr 18 '13 at 17:21
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@DarkSquirrel42 1) Calculating phi(n) and factoring are equivalent. If you can compute phi(n) you can trivially factor n afterwards. 2) It is theoretically possible to break RSA without factoring or calculating phi(n) or d. But nobody knows how. –  CodesInChaos Apr 18 '13 at 19:24

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