My solution is: The percentage of faulty boxes is equal to the probability of faulty boxes. In order to make easy my calculation, I calculate the probability of the boxes which have no faulty screws or have at least one faulty screw. Then I can find the probability I am searching for as follows: $$S_{FaultyBox} = 1 - S_{NonFaultyBox}$$ To find the Non-Faulty Box I first find the probability that no box has faulty screws and then I sum to it the probability that it has only one faulty screw as follows: $$S_{NoFaultyScrew} = (1-0.01)^{10}=0.904382$$ (Because they are independent of each other) $$S_{OneFaultyScrew}= \binom{10}{1}0.01^{1}(1-0.01)^{9}=0.091351$$ (Using Bernoulli trials). $$S_{NonfaultyBox} = S_{NofaultyScrew} + S_{OneFaultyScrew} = 0.995733$$ Finally, I find the probability that I was searching for: $$S_{FaultyBox} = 1 - 0.995733 = 0.004267 \Rightarrow 0.4267\%$$