# RSA prime decimal digits [closed]

In RSA encryption there is multiply of 2 big primes like: `key=bigPrime1*bigPrime2` I want to know how big is the `key` and `bigPrime`. How many digits do they have in a RSA key?

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## closed as off-topic by owlstead, delnan, GregS, starblue, Brett HaleAug 5 '13 at 8:04

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After 8 months I would expect you to know what is on topic and what is not. –  owlstead Aug 4 '13 at 20:49

These days, 1024-bit keys are probably breakable by governments, most people probably use 2048-bit keys, and high-security environments (banks, governments, criminals, terrorists) probably use 4096-bit (or more) keys. We use 2048-bit keys where I work to protect personally-identifiable information (SSN, birthday) in our database.

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In 2010 a 768-bit key was cracked but it took 2 years and the paper says that a 1024-bit would be several thousand times harder, here is the paper eprint.iacr.org/2010/006.pdf –  kyle k Aug 5 '13 at 1:05
I'm familiar with that paper. But that was a group of academics. I assume the NSA is somewhat ahead of them. And hardware is faster than it was three years ago. Also a dozen professors don't have the budget that the NSA has to throw at a particular factorization. The bottom line is that you should be using something more than 1024-bit RSA if you are serious about crypto. –  user448810 Aug 5 '13 at 2:28