# How does bcrypt keep up with Moore's law?

I have been seeing recommendations to use bcrypt to hash passwords because of its ability to keep up with Moore's Law.

Apparently the reason for this is because it would take much longer for an attacker to crack a bcrypt hash than a hash generated by a general purpose hash function like SHA256.

How is that possible? How can an algorithm be deliberately slow in spite of Moore's law?

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I believe Bcrypt employs a work factor which can be ramped up to increase the cost of generating a hash as processors get faster. –  Sahil Muthoo Sep 17 '11 at 7:36

An attacker will want to try all 216,553 english words.

Plus another 12 bits of effort for the common variations, which lets say gives a list of 887,001,088 (229) possible passwords.

BCrypt takes about 4,342,912 (i.e. 222) operations to calculate one hash (at cost=12).

A core today provides about 231 cycles/sec; the state of the art is 8 = 23 cores per processor for a total of 23 * 231 = 234 cycles/sec. A server typically has 4 processors, increasing the total to 22 * 234 = 236 cycles/sec. 222 cycles to calculate one hash * 229 possible (common) passwords = 251 cycles to run through all (common) passwords.

This means that it would take a 4-processor, octo-core, server about 251 / 236 = 215 seconds (9 hours) to run through all common passwords.

In reality my password is not common, and uses about 44-bits. 244 passwords * 222 cycles per password = 266 cycles to try all uncommon passwords. 266 / 236 cycles/second = 230 seconds (34 years) to find my password.

Moore's Law's says the processing power doubles every 18 months.

• today: 34 years to find my uncommon password
• 1.5 years: 17 years
• 3 years: 8.5 years
• 4.5: 4.25 years
• 6 years: 2.125 years
• 7.5 years: 1 year
• 9 years: 6 months
• 10.5 years: 3 months
• 12 years: 6 weeks
• 13.5 years: 3 weeks
• 15 years: 10 days
• 17.5 years: 5 days
• 19 years: 63 hours
• 20.5 years: 31 hours

That's now bcrypt holds up against Moore's Law.

Increase the cost factor from 12 to 13 and that will double the times involved.

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