# Amazon Interview about Success probability [duplicate]

Possible Duplicate:
Failure rate of a system

If a system has a 10% independent chance of failing in any given hour, what are the chances of it failing in a given 2 hour period or n-hours period? Note: 10% failure probability in 1 hour has nothing to do with 10% of the time . It's just that a system has a 10% independent chance of failing in any given hour

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## marked as duplicate by Matt Ball, Michael Petrotta, Donal Fellows, evilone, Atanas KorchevDec 1 '12 at 8:37

This question is probably a better fit for math.stackexchange.com –  cegfault Dec 1 '12 at 6:12
sorry about that..!! –  sammy123 Dec 1 '12 at 6:15
This might help - stackoverflow.com/a/6819375/1791606 –  Qoop Dec 1 '12 at 6:17
@Qoop- Ya, I checked that but in that question, failing probability is 10% of the time but in this question, failing probability of 10% is not 10% of the time, it's just related to the system. I hope you understand what I mean. Thanks for your help. I appreciate that. –  sammy123 Dec 1 '12 at 6:22

• Let `P``fail` be the probability that the system fails in any given hour.
• Then `P``nofail`, the probability that the system does not fail in any given hour, is `1 - P``fail`.
• The chance of it not failing in 2 hours is (`P``nofail`)`2`, since it must independently not-fail in each of those hours, and the joint probability of two independent events is the product of the probability of each event (that is, `P(A ∩ B) = P(A)*P(B)`).
• More generally, then, the `chance of it not failing in n hours` is (`P``nofail`)`n` .
• The chance of it failing in `n` hours is `1 - (chance of not failing in n hours)`.