Suppose that a "Fly-to-Buy" Lot Acceptance Test for a missile systems consisted of samples of size four (n = 4) and a accept criterion , c = 0.
If the true population reliability was 0.95 (i.e., fraction defective = 0.05), what would be the probability of accepting the lot?
If the buyer considers a "good" lot to have 5% defective, and a "bad" lot to have 25% defective, what is the probability that the buyer will reject a "bad" lot?
If the buyer considers a "good" lot to have 5% defective, and a "bad" lot to have 25% defective, what is the probability that the buyer will reject a "good" lot?
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